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2019-2005
CHAPTERWISE TOPICWISE
SOLVED PAPERS
NEET + AIIMS,JIPMER
AMU, BHU, BVP, Manipal, UPCPMT, EAMCET, KCET, WBJEE...
PHYSICS Authors
Digvijay Singh Mansi Garg, Manish Dangwal
ARIHANT PRAKASHAN (Series), MEERUT
ARIHANT PRAKASHAN (SERIES), MEERUT All Rights Reserved
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PREFACE Once you have an idea of what you are going to be asked in a test, you are more comfortable to tackle it, and your performance in the test improves dramatically. Once you know the importance of different chapters and topics from the syllabi for a exam by going through chapterwise and topical segregation of previous years' questions, you can strategically plan out your preparation for the exam by allotting your time accordingly for the chapters or the topics of the chapters. This book Chapterwise & Topicwise Medical Entrances Solved Papers Physics has Previous Years’ Medical Entrance Questions with their Solutions to fulfill the above mentioned needs of understanding the nature & pattern of questions being asked in NEET and other Medical Entrances.
The Salient Features of the Book are ! It covers all the questions with explanations from year 2005 to 2019 for all
Medical entrance exams in India (both National as well as Regional). ! Chapterwise division and topical categorisation has been done keeping in
mind the syllabi of NEET & NCERT Textbooks and the learning facilitation to the students in the subject of Physics. ! Questions of all Medical entrances are grouped according to the year. ! Extreme care is taken, while solving the questions and compiling their
answers for their accuracy. We hope that the book will be of utmost help to you in your NEET Preparation and propel you to success. Suggestions for further improvement will be welcomed. Publisher
CONTENTS PART I Based on Class XIth NCERT 1. Units and Measurements
1-20
Units Errors and Significant Figures Dimensions 2. Motion in a Straight Line
21-41
Distance, Displacement and Velocity Uniform and Non-uniform Motion Graphs in Motion 42-71
Vectors Terms Related to Motion in a Plane Projectile Motion Uniform and Non-uniform Circular Motion Relative Velocity
Newton’s Laws of Motion Conservation of Linear Momentum and Impulse Equilibrium of Forces Motion of Connected Bodies Friction and Its Laws Motion on Rough Surfaces (plane & Inclined) Dynamics Of Circular Motion 5. Work, Energy and Power Work Energy Work-energy Theorem and Vertical Circle Power Collision
108-144
178-204
Newton’s Law of Gravitation Acceleration Due to Gravity Gravitational Potential Energy and Escape Velocity Motion of Satellite and Kepler’s Laws of Planetary Motion 8. Mechanical Properties of Solids
72-107
145-177
Position and Motion of Centre of Mass Torque, Couple and Angular Momentum Moment of Inertia Rotational Energy and Power Dynamics of Rotational Motion Rolling Motion 7. Gravitation
3. Vector Analysis and Motion in a Plane
4. Laws of Motion
6. System of Particles and Rotational Motion
205-217
Stress and Strain Hooke’s Law : Young’s, Bulk and Rigidity Modulus Poisson’s Ratio, Stress-strain Curve and Thermal Stress Elastic Potential Energy Stored in a Stretched Wire 9. Mechanical Properties of Fluids
218-245
Fluid Pressure and Density Pascal’s Law and Archimedes’ Principle Fluid Flow, Bernoulli’s Theorem and Stokes’ Law Surface Tension and Surface Energy Excess Pressure (Pressure Difference) Angle of Contact and Capillarity
10. Thermal Properties of Matter
246-281
Thermometry Thermal Expansion Specific Heat Capacity, Calorimetry and Latent Heat Thermal Conduction and Convection Radiation I (Kirchhoff’s Law and Black Body) Radiation II (Wien’s Law, Stefan’s Law and Newton’s Law of Cooling) 11. Thermodynamics
282-303
First Law of Thermodynamics Thermodynamic Processes Heat Engine, Second Law of Thermodynamics and Carnot Engine 12. Kinetic Theory of Gases
304-323
Kinetic Theory of Gases, Gas Laws and Ideal Gas Equation
Degrees of Freedom, Law of Equipartition of Energy and Specific Heat Capacity 13. Oscillations
324-357
Displacement and Phase in SHM Velocity, Acceleration and Energy of SHM Time Period and Frequency System Executing SHM (Simple Pendulum and Spring Mass System) Free, Damped, Forced Oscillations & Resonance and Superposition of SHM 14. Waves
358-406
Basic of Mechanical Waves Progressive Waves Interference and Superposition of Waves Beats Stationary Waves : Vibrations of Strings and Organ Pipes
Various Velocities & Kinetic Energy of Gas and Mean Free Path
Doppler’s Effect
PART II Based on Class XIIth NCERT 15. Electrostatics I
407-435
Electric Charge and Coulomb’s Law Electric Field Electric Dipole Electric Flux and Gauss’s Theorem 16. Electrostatics II (Electric Potential and Capacitance) Electric Potential and Potential Energy Capacitance and Capacitors Grouping of Capacitors
436-476
17. Current Electricity
477-530
Electric Conduction, Ohm’s Law, Resistance and Carbon Resistors Combination of Resistors Cells & Their Combinations and Kirchhoff’s Laws Different Measuring Instruments Heating Effect of Current 18. Moving Charges and Magnetism
531-572
Biot-savart’s Law and Ampere’s Circuital Law Motion of a Charged Particle in a Magnetic Field
Force and Torque on a Current Carrying Conductor Moving Coil Galvanometer 19. Magnetism and Matter
573-595
Bar Magnet and Magnetic Dipole Earth’s Magnetism Magnetic Materials 20. Electromagnetic Induction
595-611
612-641
Introduction to AC and Power Consumption in AC Circuits AC Circuits Growth and Decay of Current Transformer 22. Electromagnetic Waves
642-651
Properties of Electromagnetic Waves Electromagnetic Spectrum 23. Ray Optics and Optical Instruments
652-701
Reflection of Light at Plane and Spherical Mirrors Refraction of Light at Plane Surface Total Internal Reflection Prism and Lens Scattering of Light Human Eye and Optical Instruments
702-728
Nature of Light and Huygen's Principle Interference of Light Diffraction of Light Polarisation of Light 25. Dual Nature of Matter and Radiation
Magnetic Flux and Faraday’s & Lenz’s Laws Motional EMF Inductance (Self and Mutual Inductance) Applications of EMI (Motor and Dynamo) 21. Alternating Current
24. Wave Optics
729-755
Cathode Rays and Positive Rays Photoelectric Effect Dual Nature of Matter : De-broglie Waves 26. Atoms and Nuclei
756-804
Rutherford a-particle Scattering Experiment and Atomic Model Bohr Model and Hydrogen Spectrum Nucleus and Radioactivity Nuclear Fission & Fusion and Binding Energy X-Rays 27. Semiconductor Electronics
805-843
Energy Bands Theory (Metals, Semiconductors and Insulator) p-n Junction Diode Transistors Digital Circuit 28. Communication System
844-857
Basics of Communication System and Optical Fibre Communication Ground, Space and Sky Wave Communication Modulation and Demodulation
01 Units and Measurements Quick Review Physical Quantities All the quantities which are used to describe the laws of physics are called physical quantities, e.g. length, mass, volume, etc. To express the measurement of a physical quantity, we need to know two things as given below (i) The unit in which the quantity is measured. (ii) The numerical value or the magnitude of the quantity. i.e. The number of times that unit is contained in the given physical quantity = nu 1 ∴ n∝ u ⇒ nu = constant where, n = numerical value of the physical quantity and u = size of unit.
Table below gives the seven fundamental quantities and their SI units Base Quantity
SI Units Name
Symbol
Definition
Length
Metre
m
The metre is the length of the path travelled by light in vacuum during a time interval of 1/299792458 of a second.
Mass
Kilogram
kg
The kilogram is equal to the mass of the international prototype of the kilogram (a platinum-iridium alloy cylinder) kept at international Bureau of Weights and Measures at Sevres, near Paris, France.
Time
Second
s
Electric current
Ampere
A
The second is the duration of 9192631770 periods of the radiation corresponding to the transition between the two hyperfine levels of the ground state of the cesium-133 atom. The ampere is that constant current which if maintained in two straight parallel conductors of infinite length, of negligible circular cross-section and placed 1 m apart in vacuum, would produce a force between these conductors equal to 2 × 10−7 N/m of length.
Physical Units The standard amount of a physical quantity chosen to measure the physical quantity of same kind is called a physical unit.
Fundamental Quantities and Fundamental Units Those physical quantities which are independent of other physical quantities and not defined in terms of other physical quantities, are called fundamental or base quantities. The units of these quantities are called fundamental or base units.
ThermoKelvin dynamic temperature
K
The kelvin is the fraction 1/273.16 of the thermodynamic temperature of the triple point of water.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Base Quantity
SI Units Name
Amount of substance
Mole
Luminous intensity
Candela
Symbol mol
Systems of Unit Definition
A complete set of units which is used to measure all kinds of fundamental and derived quantities is called a system of units. Some of the commonly used systems of units are as follows
The mole is the amount of substance of a system which contains as many elementary entities as there are atoms in 0.012 kg of carbon-12.
cd
The candela is the luminous intensity in a given direction of a source that emits monochromatic radiation of frequency 540 × 1012 Hz and that has a radiant intensity in that direction of 1/683 watt/steradian
Derived Quantities and Derived Units The quantities which can be expressed in terms of the fundamental quantities are called derived quantities. The units of these quantities are called derived units. −1
e.g. Unit of speed = ms can be derived from fundamental unit, i.e. unit of length and time as Distance m Speed = = = ms −1 Time s
Supplementary Quantities and Supplementary Units Other than fundamental and derived quantities, there are two more quantities called as supplementary quantities. The units of these quantities are known as supplementary units. Table below gives the supplementary quantities and their SI units Supplementary Quantity Plane angle
SI Units Name Radian
Symbol Definition rad One radian is the angle subtended at the centre by an arc equal in length to the radius of the circle. ds
dθ r
Solid angle
Steradian
sr
(i) CGS System In this system, the units of length, mass and time are centimetre (cm), gram (g) and second (s), respectively. The unit of force is dyne and that of work or energy is erg.
(ii) FPS System In this system, the units of length, mass and time are foot, pound and second, respectively. The unit of force in this system is poundal.
(iii) MKS System In this system, the units of length, mass and time are metre (m), kilogram (kg) and second (s), respectively. The unit of force is newton (N) and that of work or energy is joule (J).
(iv) International System (SI) of Units This system of units helps in revolutionary changes over the MKS system and is known as rationalised MKS system. It is helpful to obtain all the physical quantities in physics.
Some Other Units (Not Contained in SI Units) Length
(i) 1 micron = 1 µm = 10−6 m (ii) 1 nanometre = 1 nm = 10−9 m (iii) 1 angstrom = 1 Å = 10−10 m = 10−8 cm = 10−4 µm (iv) 1 fermi = 1fm = 10−15 m
(v) 1 astronomical unit = 1 AU = 1.496 × 1011 m (vi) 1 light year = 1ly = 9.467 × 1015 m (vii) 1 parsec = 3.08 × 1016 m = 3.26 ly = 206267 AU
Mass
ds i.e. dθ = r One steradian is the solid angle subtended at the centre of a sphere, by that surface of the sphere, which is equal in area to the square of radius of the sphere.
(i) 1 quintal = 100 kg (ii) 1 tonne or 1metric ton = 1000 kg = 10 quintal (iii) 1 megagram = 103 kg (iv) 1 gigagram = 106 kg (v) 1 teragram = 109 kg
(vi) 1 slug = 14.57 kg (vii) 1 pound = 1 lb = 0.4536 kg
r dΩ
O
dA
Time
(i) 1 millisecond = 10−3 s (ii) 1 microsecond = 10−6 s
i.e.
dΩ =
dA r2
(iii) 1 shake = 10−8 s (v) 1 picosecond = 10−12 s
(iv) 1 nanosecond = 10−9 s
3
UNITS AND MEASUREMENTS
(vii) 1 hour = 60 min = 3600 s (viii) 1 day = 24 h = 86400 s (ix) 1 year = 365 days = 3.15 × 107 s (x) 1 century = 100 years Common SI prefixes and symbols for multiples and sub-multiples are given in tabular form below Factor 1018 1015 1012 109 106 103 102 101
Multiple Prefix Exa Peta Tera Giga Mega Kilo Hecto Deca
Symbol E P T G M k h da
Sub-multiple Factor Prefix Symbol atto a 10−18 femto f 10−15 −12 pico p 10 nano n 10−9 micro µ 10−6 milli m 10−3 −2 centi c 10 deci d 10−1
Errors The difference between the true value and the measured value of a quantity is called error of measurement. In general, the errors can be classified as given below (i) Systematic Error The error which associates with system itself. e.g., (a) Instrumental error, (b) Imperfection in technique or procedure (c) Personal errors (d) Errors due to external cause. (ii) Random Error The error which occurs irregularly and is random in magnitude and direction. (iii) Least Count Error The error which associates with the resolution or the smallest limiting value that an instrument can measure. Some mathematical terms used for error calculation are given below (i) Absolute Error The difference between the true value and the measured value of a quantity is called absolute error, ∆a n = a mean − a n n a where, a mean = ∑ i i =1 n (ii) Mean Absolute Error The arithmetic mean of the magnitude of absolute errors in all the measurement is called mean absolute error. | ∆a1 | + | ∆a 2 | + . . . + | ∆a n | ∆a = n (iii) Relative Error or Fractional Error The ratio of mean absolute error to the true value is called relative error. Mean absolute error ∆a Relative error = = True value am (iv) Percentage Error The relative error expressed in percentage is called percentage error. ∆a Percentage error = × 100% am
Combination of Errors (i) Error in Addition or Subtraction Let x = a + b or x = a − b If the measured values of two quantities a and b are ( a ± ∆a ) and ( b ± ∆b ), where ∆a, ∆b are the absolute errors in the measurement of a and b, then maximum absolute error in their addition or subtraction is ∆x = ± ( ∆a + ∆b ) (ii) Error in Multiplication or Division a Let x = a × b or x = b If the measured values of a and b are ( a ± ∆a ) and ( b ± ∆b ), then maximum relative error, ∆x ∆a ∆b =± + a x b (iii) Error in a quantity Raised to a Power Let z = a p b q / c r If the measured values of a, b and c are ( a ± ∆a ), ( b ± ∆b ) and ( c ± ∆c ), then maximum error, ∆a ∆z ∆b ∆c = ± p + q + r b c a z Note
◆
◆
◆
Accuracy is the closeness of measurements to the true value of physical quantity. Precision is the resolution or limit to which the physical quantity is measured. Least count of Vernier callipers = 1MSD (Main Scale Division) − 1VSD (Vernier Scale Division)
Significant Figures The rules for determining the number of significant figures are as given below Rule 1 All the non-zero digits are significant. e.g. x = 1234, has four significant figures. All the zeroes between two non-zero digits are significant, no matter where the decimal point is, if at all. e.g. x = 1007, has four significant figures and x = 10.07 also contains four significant figures. Rule 3 If the number is less than one, the zeroes on the right of decimal point and to the left of first non-zero digit are not significant. e.g. In 0. 0055704, the underlined zeroes are not significant. The zero between 7 and 4 is significant. The number of significant figure is 5. Rule 4 In a number without a decimal point, the terminal or trailing zeroes are not significant. e.g. x = 3210, has three significant figures, the trailing zeroes are not significant.
Rule 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Trailing zeroes in a number with a decimal point are significant. e.g. 3.500, has four significant figures. Rule 6 The multiplying or dividing factors, which are neither rounded numbers nor numbers representing measured values are exact and have infinite number of significant digits as per the condition. e.g. In radius, r = d / 2and circumference, S = 2πr, the factor 2 is an exact number. It can be written as 2.0, 2.00 and 2.000 etc., as required. Rule 5
a quantity as a × 10b is called scientific notation. e.g. The speed of light is given as 3.00 × 108 m/s, so the order of magnitude of the speed of light is 8.
Dimensions of Physical Quantities The dimensions of a physical quantity are the powers (or exponents) to which the fundamental quantities must be raised to represent that quantity. Mass Mass e.g. Density = = Volume (Length) 3 or
Rounding Off The process of omitting the non-significant digits and retaining only the desired number of significant digits, incorporating the required modifications to the last significant digit is called rounding off the number.
Rules for Rounding Off a Measurement Rule 1 If the number lying to the right of cut-off digit is less than 5, then the cut-off digit is retained as such. However, if it is more than 5, then the cut-off digit is increased by 1. e.g. x = 6.24 is rounded off to 6.2 to two significant digits and x = 5.328 is rounded off to 5.33 to three significant digits. Rule 2 If the insignificant digit to be dropped is 5, then the rule is (i) if the preceding digit is even, the insignificant digit is simply dropped. (ii) if the preceding digit is odd, the preceding digit is raised by 1. e.g. x = 6.265 is rounded off to x = 6.26 to three significant digits and x = 6.275 is rounded off to x = 6.28 to three significant digits. Rule 3 The exact numbers like π, 2, 3 and 4 etc., that appear in formulae and are known to have infinite significant figures, can be rounded off to a limited number of significant figures as per the requirement.
Order of Magnitude Any physical quantity can be expressed in the form of a × 10b (in terms of magnitude), where a is a number lying between 1 and 10 and b is any negative or positive exponent of 10, then the exponent b is called the order of magnitude of the physical quantity, and the expression of
Density = (Mass) (Length) −3
Thus, the dimensions of density are 1 in mass and − 3 in length. The dimensions of all other fundamental quantities are zero.
Dimensional Formula and Dimensional Equation The expression of a physical quantity in terms of its dimensions is called its dimensional formula. e.g., Dimensional formula for density is [ ML−3 T 0 ], the dimensional formula of force is [ MLT −2 ] and that for acceleration is [M 0 LT −2 ]. An equation which contains a physical quantity on one side and its dimensional formula on the other side, is called the dimensional equation of that quantity. Dimensional equations for a few physical quantities are given below Speed [ v ] = [ M 0 LT −1 ] Area [ A ] = [ M 0 L2 T 0 ] Force [ F] = [ MLT −2 ]
Principle of Homogeneity This principle states that, the dimensions of each term on both sides of an equation must be the same.
Dimensional Analysis and its Applications The method of studying a physical phenomenon on the basis of dimensions is called dimensional analysis. The following are the three main used of dimensional analysis (i) To convert a physical quantity from one system of units to another. (ii) To check the correctness of a given physical relation. (iii) To derive a relationship between different physical quantities.
Topical Practice Questions All the exam questions of this chapter have been divided into 3 topics as listed below Topic 1
—
UNITS
05–07
Topic 2
—
ERRORS AND SIGNIFICANT FIGURES
07–11
Topic 3
—
DIMENSIONS
12–20
Topic 1 Units 2019 1 The SI unit of thermal conductivity is (a) J m −1 K −1 (c) W m −1 K −1
[NEET]
(b) W m K −1 (d) J m K −1
ratio of the SI unit and the CGS unit of muscle? [Manipal] (a) 105 (b) 103 (c) 107 (d) 10−5
12 Match the following columns.
2014 2 Unit of emf is (a) joule/ampere henry-ampere (c) second
Column I
[WB JEE]
[Kerala CEE]
Column II P. volt (ampere)−1
(b) volt/ampere
A.
Capacitance
(d) joule/coulomb
B.
Magnetic induction Q. volt-sec (ampere)−1
C.
Inductance
R. newton (ampere)−1 (metre)−1
D.
Resistance
S. coulomb2 (joule)−1
3 If the unit of force is kN, the length is 1 km and time 100 s, then what will be the unit of mass? [KCET] (a) 1000 kg (b) 1 kg (c) 10000 kg (d) 100 kg 2012 4 The damping force on an oscillator is directly proportional to the velocity. The unit of the constant of proportionality is (b) kgms−2 (a) kgms−1 [CBSE AIPMT] (d) kgs (c) kgs−1 5 SI unit of permittivity is (a) C 2 m 2 N 2 (c) C 2 m 2 N –1 2011
2008 11 If ‘muscle times speed equals power’, then what is the
(b) C 2 m –2 N –1 (d) C –1 m 2 N –2
[AIIMS, Manipal]
6 The SI unit of activity of a radioactive sample is (a) curie (b) rutherford [J&K CET] (c) becquerel (d) millicurie 2010 7 Unit of electrical conductivity is (a) ohm (b) siemen (c) m mho−1 (d) mho m−1
[UP CPMT]
8 The unit of magnetic moment is (b) JT −1 (a) TJ −1 −2 (c) Am (d) Am −1
[Guj CET]
9 The unit of specific conductivity is (b) Ω cm −2 (a) Ω cm −1 (d) Ω −1cm −1 (c) Ω −1 cm
[Manipal]
10 Which one of the following quantities has not been expressed in proper units? [Kerala CEE] (a) Torque Nm (b) Stress Nm −2 (c) Modulus of elasticity Nm −2 (d) Power Nms −1 (e) Surface tension Nm −2
A (a) Q (c) R (e) Q
B R S S
C S P P
D P Q R
A (b) S (d) S
B R P
C Q Q
D P R
2007 13 Parsec is the unit of (a) time (c) frequency
[BHU]
(b) distance (d) angular acceleration
2006 2π 14 Given that, y = A sin ( ct − x ) , where y and x are λ measured in metre. Which of the following statements is true? [AFMC] (a) The unit of λ is same as that of x and A. (b) The unit of λ is same as that of x but not of A. 2π (c) The unit of c is same as that of . λ 2π (d) The unit of ( ct − x ) is same as that of . λ 15 Which one of the following is not a derived unit? [Kerala CEE]
(a) Frequency (c) Gravitational constant (e) Electric current
(b) Planck’s constant (d) Charge
16 The magnitude of any physical quantity [Punjab PMET] (a) depends on the method of measurement (b) does not depend on the method of measurement (c) is more in SI system than in CGS system (d) directly proportional to fundamental unit of mass, length and time 17 The volume of a cube in m 3 is equal to the surface area of the cube in m 2 . The volume of the cube is [DUMET] (a) 64 m 3 (b) 216 m 3 (c) 512 m 3 (d) 195 m 3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
18 The unit of Stefan’s constant is (a) Wm −2 K −1 (b) Wm K −4 −2 −4 (c) Wm K (d) Nm −2 K −4
[KCET]
19 What is the SI unit of electric field intensity? (a) cm (b) Vm −1 −1 (c) Am (d) None of these
[Guj CET]
20 If the magnetic flux is represented in weber, then the unit of magnetic induction will be [Guj CET] (a) Wbm −2 (b) Wbm (d) Wbm −1 (c) Wbm 2
22 Density of liquid in CGS system is 0.625 g cm −3 . What is its magnitude in SI system? [J&K CET] (a) 0.625 (b) 0.0625 (c) 0.00625 (d) 625 23 Some physical quantities are given in the Column I, the related units are given in the Column II. Match the correct pairs in the columns. [DUMET] Column I
2005 21 If the unit of force and length are doubled, then the unit of energy will be (a) 1/4 times the original (c) 2 times the original (e) None of these
[Kerala CEE]
(b) 1/2 times the original (d) 4 times the original
Column II Wbm −1
A.
Magnetic field intensity
P.
B.
Magnetic flux
Q. Wbm −2
C.
Magnetic potential
R. Wb
D.
Magnetic induction
S.
A (a) S (c) P
B R S
C P Q
D Q R
Am −1
A (b) S (d) R
B R P
C Q S
D P Q
Answers 1 (c) 11 (a) 21 (d)
2 (c) 12 (b) 22 (d)
3 (c) 13 (b) 23 (a)
4 (c) 14 (a)
5 (b) 15 (e)
6 (c) 16 (b)
7 (d) 17 (b)
8 (b) 18 (c)
9 (d) 19 (b)
10 (e) 20 (a)
Explanations 1 (c) The SI unit of thermal conductivity −1
−1
is Wm K .
2
dI (c) From the formula of emf, ε = L dt henry-ampere ε= ⇒ second
3 (c) We know that, F = ma As,
v s a= = t t⋅t
So, a = st −2 From Eqs. (i) and (ii), we get ⇒ F = mst −2
…(i) s Qv = t …(ii)
Given, F = kN = 103 N, 3
s = 1km = 10 m = 1000m and t = 100s Let x kg be unit of mass, then Putting these values, we get f = (x kg)(1000 m )(100 s)−2 1 ⇒ 1000 = x × 1000 × 10000 ∴ x = 10000kg = 104 kg
4 (c) Given, damping force ∝ velocity ⇒
F ∝ v ⇒ F = kv F k= v
unit of F kgms−2 = unit of v ms–1 –1 = kgs
unit of k =
5 (b) From Coulomb’s law, 1 q1q2 4 πε 0 r2 q q or ε 0 = 1 22 4 πFr ∴ Unit of ε 0 (permittivity) F=
C2 = C2m −2 N−1 = Nm 2
6 (c) The SI unit of activity of a radioactive sample is becquerel.
7 (d) Unit of electrical conductivity is mho m –1 or siemen m –1.
8 (b) Magnetic moment is the strength of
magnet. Its SI unit is Am 2 or NmT −1 or JT −1.
9. (d) Specific conductivity 1 Specific resistance 1 = = (Ω cm)−1 Ωcm = Ω −1cm −1 =
10 (e) The unit of surface tension is Nm −1, so the given unit of surface tension Nm −2 is incorrect.
11 (a) Muscle × Speed = Power Power Work = Speed Time × Speed Force × Displacement = Displacement
or Muscle =
= Force Now, ratio of SI unit and CGS unit of muscle SI unit of force = CGS unit of force kg × m × s−2 = g × cm × s−2 = 103 × 102 = 105
12 (b) Capacitance, C =
Q Q2 = = (coulomb)2 joule−1 V W
Magnetic induction, B=
newton F = il ampere × metre
= (newton) (ampere)−1 (metre)−1
7
UNITS AND MEASUREMENTS
Inductance, e volt L= = dl / dt ampere /second −1
= volt-sec(ampere) volt V Resistance, R = = I ampere = volt (ampere)−1 A → S , B → R, C → Q, D → P
13 (b) The parsec is a unit of distance and
14
one parsec is approximately equal to 3.08 × 1016 m. 2π (a) Here, (ct − x ) is dimensionless. λ ct Hence, is also dimensionless and unit λ x of it is same as that of . Therefore, unit λ of λ is same as that of x. Also, unit of y is same as that of A, which is also the unit of x. Hence, statement (a) is correct.
15 (e) The units of all physical quantities other than length, mass, time, electric current, temperature, luminous intensity and amount of substance are obtained by raising one or more of the
fundamental units to suitable power. Such units are called derived units. Hence, option (e) is correct.
16 (b) The magnitude of any physical quantity does not depend on the method of measurement because magnitude is a absolute value.
19 (b) Electric field intensity, E = − ∴ SI unit of E = V / m or Vm −1.
Magnetic flux Area ∴ Unit of magnetic induction weber Wb = = = Wbm −2 metre2 m 2
20 (a) Magnetic induction =
17 (b) Let length of side of the cube be a, then volume of the cube = a3 Also, surface area of the cube = 6a2
21 (d) Energy = Work = Force × Length
Given, volume of cube = surface area of cube a3 = 6a2 ⇒ a = 6m Thus, volume of the cube = (6)3 = 216 m 3
18 (c) According to Stefan’s law, the energy radiated per second or power radiated is given by P = σAT 4 P σ= ⇒ AT 4 Therefore, unit of σ is W = Wm −2 K−4 m 2K4
∂V ∂r
22
So, on doubling unit of force and length, then the unit of energy will be 4 times the original. mass (d) We know that, density = volume In CGS units, d = 0.625 g cm −3 0.625 × 10−3 kg 10−6 m 3 = 625 kg m −3
In SI units, d =
23 (a) Unit of magnetic field intensity
is Am −1. Unit of magnetic flux is Wb (weber). Unit of magnetic potential is Wbm −1. Unit of magnetic induction is Wbm −2. A → S , B → R, C → P, D → Q
Topic 2 Errors and Significant Figures 2019 1 In an experiment, the percentage of error occurred in the
3 Calculate the mean percentage error in five observations, 80.0, 80.5, 81.0, 81.5 and 82. [AIIMS] (a) 0.74% (b) 1.74% (c) 0.38% (d) 1.38%
measurement of physical quantities A , B , C and D are 1%, 2%, 3% and 4% respectively. Then the maximum percentage of error in the measurement X , where, A 2 B 1/ 2 X = 1/ 3 3 will be C D [NEET] 3 (a) 16% (b) −10% (c) 10% (d) % 13
2018 4 R = 65 ± 1 Ω L, l = 5 ± 0.1mm and d = 10 ± 0.5 mm. Find
2 The main scale of a Vernier calliper has n divisions/cm. n divisions of the Vernier scale coincide with ( n − 1) divisions of main scale. The least count of the vernier callipers is [NEET] 1 1 (a) cm (b) cm ( n + 1) ( n − 1) n 1 1 cm (c) 2 cm (d) n ( n + 1) n
5 A student measured the diameter of a small steel ball using a screw gauge of least count 0.001 cm. The main scale reading is 5 mm and zero of circular scale division coincides with 25 divisions above the reference level. If screw gauge has a zero error of −0.004 cm, the correct diameter of the ball is [NEET] (a) 0.053 cm (b) 0.525 cm (c) 0.521 cm (d) 0.529 cm
error in calculation of resistivity. (a) 21% (b) 13% (c) 16% (d) 41%
[JIPMER]
8
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
6 In an experiment to measure, the height of a bridge by dropping stone into water underneath. If the error in measurement of time is 0.2s at the end of 4s, then the error in estimation of height of bridge will be (neglect the water resistance, i.e. thrust) [AIIMS] h
(a) ± 19.68 m (c) ± 7.84 m
(b) ± 17.22 m (d) ± 12.22 m
2014 7 If the absolute errors in two physical quantities A and B are a and b respectively, then the absolute error in the value of A − B is [EAMCET] (a) b − a (b) a =/ b (c) a + b (d) a − b
2013 8 A physical quantity Q is found to depend on x3 y2 . The z percentage error in the measurements of x, y and z are 1%, 2% and 4% respectively. What is the percentage error in the quantity Q ? [KCET] (a) 4% (b) 3% (c) 11% (d) 1% observables x, y and z obeying relation Q =
2012 9 In an experiment, four quantities a, b, c and d are measured with percentage error 1%, 2%, 3% and 4% respectively. Quantity P is calculated as follows a3 b2 , % error in P is cd (a) 14% (b) 10% (c) 7% P=
[NEET]
(d) 4%
10 The error in the measurement of radius of sphere is 0.3%, what is the percentage error in the measurement of its volume? [UP CPMT] 4 (a) 0.3 % (b) 0.6% (c) 0.9% (d) π( 0. 3) 3 3 11 In a slide calliper, (m + 1) number of Vernier divisions is equal to m number of smallest main scale divisions. If d unit is the magnitude of the smallest main scale division, then the magnitude of the Vernier constant is [WB JEE] (a) d / ( m + 1) unit (b) d / m unit (c) md / ( m + 1) unit (d) ( m + 1) d / m unit 2k 3 l 2 . 12 A physical quantity x is given by x = m n The percentage error in the measurements of k, l, m and n are 1%, 2%, 3% and 4% respectively. The value of x is uncertain by [AMU] (a) 8% (b) 10% (c) 12% (d) None of these
2010 13 The length of a strip measured with a metre rod is 10.0 cm. Its width measured with a vernier calipers is 1.00 cm. The least count of the metre rod is 0.1 cm and that of vernier calipers 0.01 cm. What will be error in its area? [BVP] (a) ± 13% (b) ± 7% (c) ± 4% (d) ± 2%
14 Each side of a cube is measured to be 7.203 m. What are the total surface area and the volume of the cube to appropriate significant figures? [Manipal] (a) 373.7 m 2 , 311.3 m 3 (b) 311.3 m 2 , 373.7 m 3 (c) 273.4 m 2 , 342.4 m 3 (d) 423.4 m 2 , 437.4 m 3 15 You measure two quantities as A = 1.0 m ± 0.2 m, B = 2.0m ± 0.2 m. We should report correct value for AB as [AMU] (a) 1.4m ± 0.4m (b) 1.41m ± 0.15 m (c) 1.4 m ± 0.3 m (d) 1.4m ± 0.2m 16 The length and breadth of a rectangular sheet have been measured by a measuring scale to an accuracy of 0.1 cm. If the measured values are 35.2 cm and 21.7 cm, respectively, then find the relative error in the area of the sheet. [Manipal] (b) ± 4 × 10− 3 (a) ± 8 × 10− 2 (d) ± 9 × 10− 6 (c) ± 7.45 × 10− 3 17 Choose the incorrect statement out of the following. [AMU] (a) Every measurement by any measuring instrument has some errors. (b) Every calculated physical quantity that is based on measured values has some errors. (c) A measurement can have more accuracy but less precision and vice-versa. (d) The percentage error is different from relative error.
2009 18 The number of significant figures in the numbers 4.8000 × 104 and 48000.50 are respectively, (a) 5 and 6 (b) 5 and 7 (c) 2 and 7 (d) 2 and 6
[Kerala CEE]
19 Percentage error in the measurement of mass and speed are 2% and 3% respectively. The error in the estimation of kinetic energy obtained by measuring mass and speed will be [AIIMS] (a) 12% (b) 10% (c) 2% (d) 8% 20 If the length of a pendulum is increased by 2%, then in a day, the pendulum [Kerala CEE] (a) loses 764 s (b) loses 924 s (c) gains 236 s (d) loses 864 s (e) gains 346 s
9
UNITS AND MEASUREMENTS
2008 21 If the error in the measurement of radius of a sphere is 2%, then the error in the determination of volume of the sphere will be [CBSE AIPMT] (a) 4% (b) 6% (c) 8% (d) 2%
22 Assertion The error in the measurement of radius of the sphere is 0.3%. The permissible error in its surface area is 0.6%. Reason The permissible error is calculated by the ∆ A 4 ∆r formula . = [AIIMS] A r (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 23 The period of oscillation of a simple pendulum in the experiment is recorded as 2.63 s, 2.56 s, 2.42 s, 2.71 s and 2.80 s respectively. The average absolute error is [AMU] (a) 0.1 s (b) 0.11 s (c) 0.01 s (d) 1.0 s
2007 24 If voltage V = (100 ± 5) V and current I = (10 ± 0. 2) A, the percentage error in resistance R is (a) 5.2% (b) 25% (c) 7% (e) 2.5%
[Kerala CEE]
(d) 10%
25 A wire has a mass ( 0. 3 ± 0. 003) g, radius ( 0. 5 ± 0. 005) mm and length ( 0.6 ± 0.006) cm. The
maximum percentage error in the measurement of its density [WB JEE] (a) 1 (b) 2 (c) 3 (d) 4
2006 26 The length, breadth and thickness of a block are given by l = 12 cm, b = 6 cm and t = 2.45 cm. The volume of the block according to the idea of significant figures should be (a) 1 × 102 cm 3 (b) 2 × 102 cm 3 [MP PMT] 2 3 (c) 1.764 × 10 cm (d) None of these
2005 27 If the radius of a sphere is (5.3 ± 0.1) cm. Then, percentage error in its volume will be 1 100 100 (a) 3 + 6.01 × (b) × 0.01 × 3 5.3 5.3 3 × 0.1 0.1 (c) (d) × 100 × 100 5.3 5.3
[AFMC]
28 If the length of rod A is 3.25 ± 0 .01 cm and that of B is 4.19 ± 0.01` cm, then the rod B is longer than rod A by (a) 0. 94 ± 0.00 cm (b) 0. 94 ± 0.01 cm [J&K CET] (c) 0. 94 ± 0.02 cm (d) 0. 94 ± 0.005 cm 29 The radius of a sphere is measured to be (2 .1 ± 0. 5) cm. Calculate its surface area with error limits [JCECE] (a) (55.4 ± 26.4) cm 2 (b) (55.4 ± 0.02) cm 2 (c) (55.4 ± 2.64) cm 2 (d) (55.4 ± 0. 26) cm 2
Answers 1 (a) 11 (c) 21 (b)
2 (c) 12 (c) 22 (c)
3 (a) 13 (d) 23 (b)
4 (b) 14 (b) 24 (c)
5 (d) 15 (d) 25 (d)
6 (c) 16 (c) 26 (b)
7 (c) 17 (d) 27 (c)
8 (c) 18 (b) 28 (c)
9 (a) 19 (d) 29 (a)
10 (c) 20 (d)
Explanations A 2 B 1/ 2 C 1/ 3D 3 The percentage error in X is given by ∆X ∆A × 100 = 2 × 100 A X 1 ∆B 1 ∆C + × 100 + × 100 2 B 3 C
1 (a) Given, X =
∆D + 3 × 100 …(i) D ∆A ∆B × 100 = 1%, × 100 = 2%, A B ∆C ∆D × 100 = 3%, × 100 = 4% C D
Given,
Substituting these values in Eq. (i), we get ∆X × 100 X 1 1 = 2 (1%) + (2%) + (3%) + 3(4%) 2 3 = 2% + 1% + 1% + 12% = 16% Thus, maximum % error in X is 16%.
2 (c) As it is given that, n divisions of
Vernier scale coincide with (n − 1) divisions of main scale, i.e. n(VSD) = (n − 1)MSD (n − 1) …(i) ⇒ 1VSD = MSD n
The least count is the difference between one Main Scale Division (MSD) and one Vernier Scale Division (VSD). ∴Least Count (LC) = 1MSD − 1VSD (n − 1) = 1MSD − MSD n [From Eq. (i)] (n − 1) 1 = 1 − MSD = MSD n n 1 Given, 1MSD = cm n 1 1 1 ⇒ LC = × cm = 2 cm n n n
10
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
3 (a) Mean of the five observations,
80.0 + 80.5 + 810 . + 815 . + 82 µ= 5 405.0 = = 81 5 ∴ Mean error . −µ| | 80 − µ | + | 80.5 − µ | + | 810 + |815 . − µ | + |82 − µ | = 5 . − 81| | 80 − 81| + | 80.5 − 81| + | 810 + | 815 . − 81| + |82 − 81| = 5 1 + 0.5 + 0 + 0.5 + 1 3 = = = 0.6 5 5 0.6 × 100% ∴ Mean % error = 81 = 0.74%
1 2
6 (c) We know that, s = ut + at 2 or
∆ρ = 0.0153 + 01 . + 0.02 ρ ∆ρ or ≈ 0.1353 ρ
= 78.4 m ∆t = 0.2 s t=4s Now, for error, ∆h ∆t = ± 2 t h 0.2 = ± 2 = ± 0.1 4
or
∆h = ± 0.1 × h = ± 01 . × 78.4 = ± 7.84 m
7 (c) The absolute error in the value A –
B will be ∆x = ± (a + b), where, a and b are absolute errors in quantity A and B, respectively.
x3 y2 z According to percentage error formula, ∆z ∆Q ∆x ∆y × 100 = 3 +2 + × 100 z Q y x
8 (c) Given, Q =
∆y ∆x = 1%, = 2% Q x y ∆z = 40% and z = 3 × 1% + 2 × 2 % + 1 × 4 % = 3% + 4% + 4% = 11%
or
9 (a) Given, P = ∆P × 100 ∴ P
So, error in calculation of resistivity is 13.5% ≈ 13%.
a3b2 cd
3∆a 2∆b ∆c ∆d = + + + × 100 a b c d ∆b ∆a × 100 =3 × 100 + 2 b a ∆d ∆c × 100 + × 100 + d c ∆ a ∆ b Q × 100% = 1%, × 100 = 2%, a b ∆c ∆d c × 100 = 3 % and d × 100 = 4%
5 (d) Given, least count of screw gauge,
LC = 0.001 cm Main Scale Reading (MSR ) = 5 mm = 0.5 cm Number of coinciding divisions on the circular scale, i.e. Vernier Scale Reading, (VSR ) = 25 Here, zero error = − 0.004 cm Final reading obtained from the screw gauge is given as MSR + VSR × LC − zero error Final reading from the screw gauge = 0.5 + 25 × 0.001 − (−0.004) = 0.5 + 0.025 + 0.004 = 0.5 + 0.029 = 0.529 cm Thus, the diameter of the ball is 0.529 cm.
Q a = g 1 × 9.8 × (4 )2 Q u = 0 2
Given,
4 (b) Given, R = 65 Ω, ∆R = 1Ω,
l = 5 × 10−3 m, ∆l = 0.1 × 10−3 m, d = 10 × 10−3 m and ∆d = 0.5 × 10−3 m. RA Q Resistivity, ρ = l Rπ (d / 2 ) 2 πRd 2 or ρ= = l 4l ∆ρ ∆R ∆ d ∆l = +2 + ∴ ρ R d l 0.5 × 10−3 01 ∆ρ 1 . × 10−3 = + 2 ∴ + ρ 65 5 × 10−3 10 × 10−3
h = (0) t +
10
= (3 × 1) + (2 × 2) + (1 × 3) + (1 × 4 ) = 3 + 4 + 3 + 4 = 14% ∆r (c) Error in radius, = 0.3% r 4 3 Volume of sphere = πr 3 ∆r ∴ Error in volume = 3 × r = (3 × 0.3)% = 0.9%
11 (c) (m + 1) Vernier scale division = m main scale division. One division on Vernier scale m = main scale division. m + 1 Vernier constant md m = unit d= m + 1 m+1 2k 3l2 m n Percentage error in x
12 (c) Given, x =
1 %n 2 ∆k ∆l =3 × 100 + 2 × 100 k l ∆m 1 ∆n + × 100 + × 100 m 2 n 1 = 3 × 1% + 2 × 2 % + 1 × 3 % + × 4% 2 = 12% = 3%k + 2%l + %m +
13 (d) Area of strip ( A ) = lb where, l = length and b = breadth. The percentage error in area is given by ∆b ∆l ∆A × 100 = × 100 + × 100 b l A =
0.1 0.01 × 100 + × 100 = ± 2% 10 1
14 (b)The number of significant figures in the measured length is 4. The calculated area and the volume should therefore be rounded off to 4 significant figures. Surface area of the cube = 6 (7.203)2 = 311.299254 = 311.3 m 2 Volume of the cube = (7.203)3 = 373.714754 = 373.7 m 3
15. (d) Given, A = 1.0 m ± 0.2 m, B = 2.0 m ± 0.2 m Let, Y = AB = (1.0)(2.0) = 1.414 m Rounding off to two significant digit Y = 1.4 m ∆Y 1 ∆A ∆B = + Y 2 A B 1 0.2 0.2 0.6 = + = 2 1.0 2.0 2 × 2.0 0.6Y 0.6 × 1.4 ⇒ ∆Y = = = 0 . 212 2 × 2.0 2 × 2.0
11
UNITS AND MEASUREMENTS
Rounding off to one significant digit ∆ Y = 0. 2 m Thus, correct value for AB = r + ∆ r = 1.4 ± 0.2m
16 (c) Here, length of sheet
= 2.841 × 10−3 + 4.608 × 10−3 = 7.449 × 10−3 = ± 7.45 × 10−3
17 (d) When the relative error is expressed in percentage, we call it as percentage error. Thus, statement (d) is incorrect while all other statements regarding measurement of a quantity are correct.
18 (b) 4.8000 × 104 has 4 , 8, 0, 0, 0 (5 significant digits). 48000.50 has 4 , 8, 0, 0, 0, 5, 0 (7 significant digits). For number more than 1 digit, after decimal place are significant. Power of 10 does not affect number of significant figures or digits. 1 (d) Kinetic energy, K = mv 2 2 Fractional error in kinetic energy, ∆K ∆m 2∆v = + K m v Percentage error in kinetic energy is ∆m 2∆v = × 100 + × 100 m v Given, ∆m ∆v × 100 = 2% and × 100 = 3% m v So, percentage error in kinetic energy = 2 + (2 × 3) = 2 + 6 = 8%
20 (d) Time period, T = 2π or
V =
or
4 πR 3 3
l g
∆T 1 ∆l = T 2 l
For 1 s , 1 ∆l 1 ∆T = T = × 0.02 × T 2 l 2 = 0.01 T For a day, the pendulum loses, ∆T = 24 × 60 × 60 × 0.01 = 864 s
∆V 3∆R = V R
∆R × 100 = 2% R ∆V × 100 = 3 × 2% = 6% V
Given,
22 (c) Surface area of sphere, A = 4 πr2 (error will not be involved in constant 4π ) ∆A 2∆r Fractional error, = A r ∆A × 100 = 2 × 0.3% = 0.6% A ∆A 4 ∆r is false. but = A r
23 (b) Average value 2.63 + 2.56 + 2.42 + 2.71 + 2.80 = 5 = 2.62 s Now, | ∆T1 | = | 2.62 − 2.63 | = 0.01 | ∆T2 | = | 2.62 − 2.56 | = 0.06 | ∆T3 | = | 2.62 − 2.42 | = 0.20 | ∆T4 | = | 2.62 − 2.71| = 0.09 | ∆T5 | = | 2.62 − 2.80 | = 018 . | ∆T1 | + | ∆T2 | + | ∆T3 | + | ∆T4 | + | ∆T5 | ∆T = 5 0.54 = = 0.108 5 ~ 0.11 s ∆T −
24 (c) Given, voltage, V = (100 ± 5) V, Current, I = (10 ± 0.2) A From Ohm’s law, V = IR V Resistance, R = ∴ I Maximum percentage error in resistance, ∆R ∆V × 100 = × 100 R V ∆I + × 100 I 5 0.2 = × 100 + × 100 100 10 = 5 + 2 = 7%
25 (d) Density, ρ = ∴
The fractional error in V is
l = (35.2 ± 01 . ) cm and breadth of sheet b = (217 . ± 01 . ) cm ∴ Relative error in surface area of the sheet, ∆l ∆b 01 . 01 . ∆s = + = + s max l b 35.2 217 .
19
4 3
21 (b) Volume of a sphere = π (radius)3
∆ρ × 100 = ρ
m πr2L
∆m + 2∆r + ∆L × 100 m r L
0.005 0.003 = × 100 + 2 × × 100 0.3 0.5 0.006 + × 100 (given) 0.6 = 1 + 2 + 1 = 4% So, the maximum percentage error in density = 4% .
26 (b) Using the relation for volume,
V = Length × Breadth × Thickness = 12 × 6 × 2.45 = 176.4 cm 3 V = 1.764 × 102 cm 3
The minimum number of significant figure is 1 in breadth. Hence, the volume will contain only one significant figure. Therefore, volume, V = 2 × 102 cm 3. 4 3
27 (c) Volume of sphere, V = πr3 Percentage error in volume 3 × ∆r = × 100 r . 3 × 01 = × 100 5.3
28 (c) Length of rod A,
LA = 3.25 ± 0.01cm and length B, LB = 4.19 ± 0.01cm Then, the rod B is longer than rod A by a length, ∆l = LB − LA ∆l = (4.19 ± 0.01) − (3.25 ± 0.01) ∆l = (0.94 ± 0.02) cm
29 (a) Surface area, S = 4 πr 2 = 4 ×
22 × (2.1)2 7
= 55.44 = 55.4 cm 2 ∆S ∆r Further, = 2⋅ S r ∆r or ∆S = 2 (S ) r =
2 × 0.5 × 55.4 2.1
= 26.38 = 26.4 cm 2 ∴
S = (55.4 ± 26.4) cm 2
Topic 3 Dimensions 2019 1 If mass [M], distance [L] and time [T] are fundamental quantities, then find the dimensions of torque. [JIPMER] (d) [ML2 T] (a) [ML2 T −2 ] (b) [MLT −2 ] (c) [MLT]
2 What is dimensions of energy in terms of linear momentum [p], area [A] and time [T]? (a) [p1 A1 T1 ] (b) [ p 2 A 2 T −1 ] 1 1 / 2 −1 (c) [ p A T ] (d) [ p1/ 2 A1/ 2 T −1 ]
2018 3 Dimensions of force is (a) [M 2 L1 T −1 ] (c) [ M 2 L−1 T −2 ]
(b) [ M1 L1 T −2 ] (d) [ M1 L1 T −1 ]
[JIPMER]
[JIPMER]
4 If the formula, X = 3YZ 2 , X and Z have dimensions of capacitance and magnetic induction. The dimensions of Y in MKSQ system are [AIIMS] (b) [ML2 T 8 Q4 ] (a) [M −3 L−2 T 4 Q4 ] (d) [M −2 L−2 TQ2 ] (c) [M −2 L−3 T 2 Q4 ]
2017 5 A physical quantity of the dimensions of length that can
e2 is [c is velocity of light, be formed out of c, G and 4πε 0 G is universal constant of gravitation and e is charge] 1/ 2 1/ 2 1 e2 e2 2 (a) 2 G (b) c G c 4πε 0 4πε 0 [NEET] 1/ 2 1 e2 1 e2 (d) G (c) 2 c 4πε 0 c G 4πε 0
2016 6 Planck’s constant ( h ), speed of light in vacuum ( c ) and Newton’s gravitational constant (G ) are three fundamental constants. Which of the following combinations of these has the dimensions of length? [NEET] hG hG hc Gc (d) (b) 5/ 2 (c) (a) 3/ 2 G c c h 3/ 2
2015 7 If energy ( E ) , velocity ( v ) and time (T ) are chosen as the fundamental quantities, the dimensional formula of surface tension will be [AIPMT] (a) [ E v −2 T −1 ] (b) [E v −1 T −2 ] (c) [E v −2 T −2 ] (d) [E −2 v −1 T −3 ]
2014 8 If force (F), velocity (v) and time (T) are taken as fundamental units, then the dimensions of mass is [CBSE AIPMT] (b) [FvT –2 ] (a) [FvT −1 ] –1 −1 –1 (c) [Fv T ] (d) [Fv T]
9 The dimensional formula for Reynold’s number is (a) [M 0 L0 T 0 ] (b) [MLT] [MHT CET] (c) [ML–1 T] (d) [MLT –1 ] x 10 The relation between force F and density d is F = . d The dimensions of x is [MHT CET] 3/ 2 –1/ 2 –2 1/ 2 –1/ 2 –2 (a) [M L T ] (b) [M L T ] (c) [M 3/ 2 L–1 T –2 ] (d) [M1/ 2 L–1 T –2 ] 11 If n denotes a positive integer, h the Planck’s constant, q the charge and B the magnetic field, then the quantity nh has the dimensions of 2πqB [WB JEE] (a) area (b) length (c) speed (d) acceleration 12 In which of the following pairs, the two physical quantities have different dimensions? [WB JEE] (a) Planck’s constant and angular momentum (b) Impulse and linear momentum (c) Moment of inertia and moment of a force (d) Energy and torque 13 What is the dimensional formula of gravitational constant G? [UK PMT] (a) [M –1 L3 T −2 ] (b) [M 2 L−3 T −2 ] (c) [M –1 L2 T −2 ] (d) [M –1 L3 T –1 ] 14 The dimensional formula of magnetic flux is [Guj CET] (a) [ML2 T −2 A −1 ] (b) [ML2 T −3 A −1 ] (c) [M –1 L–2 T 2 A] (d) [ML3 T −2 A −1 ] 15 The dimensional formula for electric field is [Guj CET] 2 −3 −2 2 −3 −1 (b) [ML T A ] (a) [ML T A ] (d) [M 0 L0 T 0 A 0 ] (c) [MLT −3 A −1 ] 2013 1 16 The dimensions of ε 0 E 2 (ε 0 is permittivity of free 2 space, E is electric field) are [AIIMS] (a) [MLT −1 ] (b) [ML2 T −3 ] (c) [ML−1 T −2 ] (d) [ML2 T −1 ]
13
UNITS AND MEASUREMENTS
17 The displacement of an oscillating particle is given by y = A sin ( Bx + Ct + D ). The dimensional formula for (ABCD) is [UP CPMT] 0 −1 0 0 0 −1 (a) [M L T ] (b) [M L T ] (d) [M 0 L0 T 0 ] (c) [M 0 L–1 T −1 ] 18 If C and R stands for capacitance and resistance, then the dimensions of CR is [Manipal] (a) [M 0 L0 T] (b) [ML0 T] (c) [M 0 L0 T 2 ] (d) not expressible in terms of M, L and T 2012 19 The dimensions of angular momentum are [WB JEE] 0 –1 2 –1 –1 2 (a) [M LT ] (b) [ML T ] (c) [MLT ] (d) [M LT –2 ]
2011 20 The dimensions of (µ 0 ε 0 ) −1/ 2 are −1
(b) [LT −1 ] (d) [L1/ 2 T −1/ 2 ]
(a) [L T] (c) [L−1/ 2 T1/ 2 ]
[CBSE AIPMT]
21 Surface tension has the same dimensions as that of (a) coefficient of viscosity (b) impulse [Kerala CEE] (c) momentum (d) spring constant (e) frequency 22 What is the dimensions of surface tension? [WB JEE] (a) [MLT 0 ] (b) [MLT −1 ] (c) [ML0 T −2 ] (d) [ML0 T −1 ] 23 The dimensions of impulse are (a) [MLT −1 ] (b) [ML2 T −1 ] −1 −1 (c) [ML T ] (d) [MT −1 ]
[J&K CET]
24 If C be the capacitance andV be the electric potential, then the dimensional formula of CV 2 is [KCET] 2 −2 0 −2 −1 (a) [ML T A ] (b) [MLT A ] (c) [M 0 LT −2 A 0 ]
(d) [ML−3 TA] − αZ
α kθ , where p is pressure, Z is e β distance, k is Boltzmann constant and θ is temperature. The dimensional formula of β will be [AFMC]
25 The relation p =
(a) [M 0 L2 T 0 ] (c) [ML0 T −1 ]
(b) [ML2 T] (d) [M 0 L2 T −1 ]
RT −αV / RT , then dimensional formula of α is e V −b [UP CPMT] (a) p (b) R (c) T (d) V
26 If p =
27 Velocity v is given by v = at 2 + bt + c, where t is time. What are the dimensions of a, b and c respectively? (a) [LT −3 ], [LT −2 ] and [LT −1 ] [UP CPMT] (b) [LT −1 ], [LT −2 ] and [LT −3 ] (c) [LT −2 ], [LT −3 ] and [LT −1 ] (d) [ LT −1 ], [LT −3 ] and [LT −2 ]
28 The dimensions of electromotive force in terms of current [A] are [BVP] (a) [ML−2 A −2 ] (b) [ML2 T −2 A −2 ] (c) [ML2 T −2 A −2 ]
(d) [ML2 T −3 A −1 ]
29 Dimensions of capacitance are −1 −2
4
2
(a) [M L T A ] (c) [ML2 T −3 A −1 ]
[Manipal] −3
−1
(b) [MLT A ] (d) [M −1 L−2 T 3 A −1 ]
30 From the dimensional consideration, which of the following equations is correct? [Haryana PMT] (a) T = 2π
R3 GM
(b) T = 2π
GM
(c) T = 2π
GM
(d) T = 2π
R2 GM
2
R3
R 31 If E , M , L and G denote energy, mass, angular momentum and gravitational constant respectively, then the quantity [AMU] ( E 2 L2/ M 5G 2 ) has the dimensions of (a) angle (b) length (c) mass (d) None of these 32. A uniform wire of length L, diameter D and density ρ is stretched under a tension T. The correct relation between its fundamental frequency f, the length L and the diameter D is [KCET] 1 1 (a) f ∝ (b) f ∝ LD L D 1 1 (d) f ∝ (c) f ∝ 2 D LD 2
33 The dimensions of resistance are same as those of …, where, [KCET] his the Planck’s constant and eis the charge. h2 h2 (b) (a) 2 e e h h (d) (c) 2 e e 34 The dimensional formula of resistivity(s) [Guj CET] (a) [M 0 L1 T −1 A −1 ] (b) [M 0 L0 T −1 A −1 ] (c) [M1 L1 T −1 A −3 ] (d) [M1 L3 T −3 A −2 ] 35 The equation of state of some gases can be expressed as a p + 2 (V − b ) = RT , where p is absolute the pressure, V V is the volume, T is absolute temperature and a and b are constants. The dimensional formula of a is [JCECE] (b) [M −1 L5 T −2 ] (a) [ML5 T −2 ] (d) [ML−5 T −2 ] (c) [ML−1 T −2 ] 36 If force F, length L and time T be considered fundamental units, then units of mass will be [VMMC] (a) [FLT −2 ] (b) [FL−2 T −1 ] (c) [FL−1 T 2 ] (d) [F 2 LT −2 ]
14
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2009 37 An object is moving through the liquid. The viscous damping force acting on it is proportional to the velocity. Then, dimensional formula of constant of proportionality is [UP CPMT, Punjab PMET] (b) [MLT −1 ] (a) [ML−1 T −1 ] (d) [ML0 T −1 ] (c) [M 0 LT −1 ]
2008 38 Which two of the following five physical parameters have the same dimensions? I. Energy density III. Dielectric constant V. Magnetic field (a) I and IV (c) I and II
[CBSE AIPMT]
II. Refractive index IV. Young’s modulus (b) III and V (d) I and V
39 The speed of light c, gravitational constant G and Planck’s constant h are taken as fundamental units in a system. The dimensions of time in this new system should be [AIIMS] (a) [G1/ 2 h 1/ 2c −5/ 2 ] (b) [G−1/ 2 h 1/ 2c1/ 2 ] 1/ 2 1/ 2 −3/ 2 (c) [G h c (d) [G1/ 2 h 1/ 2c1/ 2 ] ] 40 The physical quantity having the dimensions [AFMC] [M −1 L−3 T 3 A 2 ] is (a) resistance (b) resistivity (c) electrical conductivity (d) electromotive force 41 If p represents radiation pressure, c represents speed of light and Q represents radiation energy striking a unit area per second, then non-zero integers x, y and z such that [BHU] p x Q y c z is dimensionless, are (a) x = 1, y = 1, z = − 1 (b) x = 1, y = − 1, z = 1 (c) x = − 1, y = 1, z = 1 (d) x = 1, y = 1, z = 1 42 Dimensions of resistance in an electrical circuit, in terms of dimension of mass M, length L, time T and current A, would be [UP CPMT] (a) [ML2 T −3 A −1 ] (b) [ML2 T −2 ] (c) [ML2 T −1 A −1 ] (d) [ML2 T −3 A −2 ] −1
43 The velocity v (in cms ) of a particle is given in terms of time t (in second) by the equation b v = at + t+c The dimensions of a, b and c are (a) (b) (c) (d)
a [L2 ] [LT 2 ] [LT – 2 ] [L]
b [T] [LT] [L] [LT]
c [LT 2 ] [L] [T] [T 2 ]
[Manipal]
44 The physical quantities not having same dimensions are (a) torque and work [RPMT] (b) momentum and Planck’s constant (c) stress and Young’s modulus (d) speed and (µ 0 ε 0 ) −1/ 2 45 Given that T stands for time period and l stands for the length of simple pendulum. If g is the acceleration due to gravity, then which of the following statements about the relation T 2 = l / g is correct? [MP PMT] (a) It is correct both dimensionally as well as numerically. (b) It is neither dimensionally correct nor numerically. (c) It is dimensionally correct but not numerically. (d) It is numerically correct but not dimensionally. 46 If force F , work W and velocity v are taken as fundamental quantities, then the dimensional formula of time T is [Punjab PMET] (a) [WFv] (b) [WFv −1 ] (c) [W −1 F −1 v] (d) [WF −1 v −1 ] 47 If power P, surface tension T and Planck’s constant h are arranged, so that the dimensions of time in their dimensional formulae are in ascending order, then which of the following is correct? [EAMCET] (a) P , T , h (b) P , h, T (c) T , P , h (d) T , h, P 48 Consider the following equation of Bernoulli’s theorem 1 p + ρv 2 + ρgh = k (constant). 2 The dimensions of k/p are same as that of which of the following? [DUMET] (a) Thrust (b) Pressure (c) Angle (d) Viscosity 49 If E = energy, G = gravitational constant, I = impulse and GIM 2 are same as that of M = mass, then dimensions of E2 [BCECE] (a) time (b) mass (c) length (d) force
2007 50 The speed v of ripples on the surface of water depends on surface tension σ, density ρ and wavelength λ . The square of speed v is proportional to [AIIMS] ρ σ λ (c) (a) (b) (d) ρλσ σλ ρλ σρ 51 The ratio of the dimensions of Planck’s constant and that of the moment of inertia is the dimension of [AFMC] (a) frequency (b) velocity (c) angular momentum (d) time 52 Which of the following units denotes the dimensions [ ML2 / Q2 ] , where Q denotes the electric charge? (a) Wbm −2 (b) Henry (H) [BHU] (c) Hm −2 (d) Weber (Wb)
15
UNITS AND MEASUREMENTS
53 Using mass M , length L, time T and current A as fundamental quantities, the dimensions of permeability are [UP CPMT] (b) [ML−2 T −2 A −1 ] (a) [M −1 LT −2 A] (d) [MLT −1 A −1 ] (c) [MLT −2 A −2 ] 54 The only mechanical quantity which has negative dimension of mass is [J&K CET] (a) angular momentum (b) torque (c) coefficient of thermal conductivity (d) gravitational constant e2 55 The dimension of , where e, ε 0 , h and c are 4πε 0 hc electric charge, electric permittivity, Planck’s constant and velocity of light in vacuum respectively [Punjab PMET] (a) [M 0 L0 T 0 ] (b) [ML0 T 0 ] 0 0 (c) [M LT ] (d) [M 0 L0 T] 56 The position of the particle moving along Y-axis is given as y = At 2 − Bt 3 , where y is measured in metre and t in second. Then, the dimensions of B are [AMU] (b) [LT −1 ] (a) [LT −2 ] (d) [MLT −2 ] (c) [LT −3 ] 57 Write dimensional formula for the intensity of radiation. [Guj CET] (b) [ML0 T −3 ] (a) [ML0 T 3 ] 2 −2 (d) [ML2 T −3 ] (c) [ML T ] 58 A gas bubble formed from an explosion under water oscillates with a period T proportional to p a d b E c , where p is pressure, d is the density of water and E is the total energy of explosion. The values of a, b and c are [BCECE] (a) a = 1, b = 1, c = 2 (b) a = 1, b = 2, c = 1 5 1 1 (c) a = , b = , c = 6 2 3 5 1 1 (d) a = − , b = , c = 6 2 3 2006 59 If σ = surface charge density, ε = electric permittivity, then the dimensions of σ/ε is same as [Punjab PMET] (a) electric force (b) electric field intensity (c) pressure (d) electric charge 60 The magnetic force on a point charge is F = q ( v × B ). Here, q = electric charge, v = velocity of point charge [AMU] B = magnetic field. The dimensions of B are (a) [MLT −1 A] (b) [M 2 LT −2 A −1 ] (c) [MT −2 A −1 ] (d) None of these
61 Some physical constants are given in Column I and their dimensional formulae are given in Column II. Match the correct pairs in the columns. [EAMCET] Column I A. Planck’s constant B. Gravitational constant C. Bulk modulus
Column II −1 −2
P. [ML T ] Q. [ML−1T −1 ] R. [ML2T −1 ]
D. Coefficient of viscosity S. [M −1L3T −2 ]
(a) (b) (c) (d)
A S Q R R
B R P Q S
C Q R P P
D P S S Q
62 What is dimensional formula of thermal conductivity? (a) [MLT −1 Q−1 ] (b) [MLT −3 Q−1 ] [DUMET] (c) [M 2 LT −3 Q−2 ] (d) [ML2 T −2 Q]
2005 63 Assertion Specific gravity of a fluid is a dimensionless quantity. [AIIMS] Reason It is the ratio of density of fluid to the density of water. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
64 In a system of units, if force F, acceleration A and time T are taken as fundamental units, then the dimensional formula of energy is [BHU] (a) [FA 2 T] (b) [FAT 2 ] (c) [F 2 AT] (d) [FAT] 65 If a, b, c and d are mass, length, time and current respectively, then b 2 a / c 3 d has the dimension of [Haryana PMT]
(a) capacitance (c) permittivity
(b) electric field (d) electric potential
66 The dimensions of self-inductance L are [J&K CET] (a) [ML2 T −2 A −2 ] (b) [ML2 T −1 A −2 ] (d) [ML−2 T −2 A −2 ] (c) [ML2 T −1 A −1 ] 67 Suppose refractive index µ is given as µ = A + B /λ 2 , where A and B are constants and λ is wavelength, then the dimension of B is same as that of [AMU] (a) wavelength (b) pressure (c) area (d) volume 68 A force F is given by F = at + bt 2 , where t is time. What are the dimensions of a and b? [DUMET] (a) [MLT −1 ] and [MLT 0 ] (b) [MLT −3 ] and [ML2 T −4 ] (c) [MLT −4 ] and [MLT] (d) [MLT −3 ] and [MLT −4 ]
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers (a) (a) (d) (d) (b) (a) (d)
1 11 21 31 41 51 61
2 12 22 32 42 52 62
(c) (c) (c) (a) (d) (b) (b)
3 13 23 33 43 53 63
(b) (a) (a) (c) (c) (c) (a)
4 14 24 34 44 54 64
(a) (a) (a) (d) (b) (d) (b)
(a) (c) (a) (a) (c) (a) (d)
5 15 25 35 45 55 65
(a) (c) (a) (c) (d) (c) (a)
6 16 26 36 46 56 66
7 17 27 37 47 57 67
(c) (b) (a) (d) (a) (b) (c)
8 18 28 38 48 58 68
(d) (a) (d) (a) (c) (d) (d)
9 19 29 39 49 59
(a) (b) (a) (a) (a) (b)
10 20 30 40 50 60
(a) (b) (a) (c) (a) (c)
Explanations 1 (a) Dimensions of torque,
5 (a) As, force, F =
τ=F×r = [ MLT −2 ][ L ]
⇒
= [ ML2T −2 ]
2 (c) Dimensions of energy in terms of linear momentum ( p) area (A) and time (T), is related of … (i) E = pa A bT c Writing dimensional formula of both side, we get [ ML2T −2 ] = [ MLT −1 ]a [ L2 ]b [ T ]c 2 −2]
[ ML T
a a + 2b
] = [M L
T
−a + c
]
Comparing the exponents, a = 1, a + 2b = 2 2b = 1 1 b= 2 − a + c = − 2 − 1+ c = − 2 ⇒ c= −1 ∴From Eq. (i), we have ⇒ E = [ pA1/ 2T −1 ]
3 (b) We know that, m(d ) [ M ][ L ] = T2 t2 1 1 −2 = [M L T ]
F = ma =
4 (a) According to question, [ X ] = [C ]
= [ M −1 L−2 T 2 Q2 ] and [ Z ] = [ B ] = [ MT −1 Q−1 ] Q
[X ] Y= 2 [Z ] Y=
[M −1L−2T 2Q2 ] [M 2T −2Q−2 ]
Y = [ M −3 L−2 T 4 Q4 ]
e2 4πε 0 r2
7 (c) We know that, Surface tension, (S ) =
2
e = r2 ⋅ F 4πε 0
So, [ S] =
Putting dimensions of r and F, we get e2 3 −2 …(i) ⇒ = [ ML T ] 4πε 0 Gm2 r2 −1 3 −2 ⇒[G ] = [ M L T ]
Also, force, F =
…(ii)
1 1 and = = [ L−2 T 2 ] …(iii) c2 [ L2 T −2 ] Now, checking optionwise 1 Ge2 = 2 c 4 πε 0 −2
2
1/ 2
6
= [ L T ][ L T
− 4 1/ 2
]
= [L ]
6 (a) In forms of h, c and G length can be expressed as L = (h)a (c)b (G )c.
Writing dimensions on both sides, we get [M 0 LT 0 ] = [ M L2T −1 ] a [ LT −1 ] b [M −1 L3T −2 ] c = M a − c L2a + b + 3 c T − a − b − 2 c On comparing powers of M, L and T on both sides, we get a − c = 0, 2a + b + 3 c = 1 and − a − b − 2c = 0 On solving, we get 1 3 a = c = and b = − 2 2 ∴ Dimensions of length, L = (h)1/ 2 (c)−3/ 2 (G )1/ 2 =
hG c3/ 2
Force[ F ] Length [ L ]
[ MLT −2 ] = [ ML0T −2 ] [L ]
Energy (E ) = Force × Displacement ⇒
[ E ] = [ ML2 T -2 ] Displacement Velocity (v ) = Time ⇒ [ v ] = [ LT −1 ]
As,
S ∝ Ea vb T c
where, a, b, c are constants. From the principle of homogeneity, [ LHS] = [ RHS] ⇒ [ ML0 T −2 ] = [ ML2 T −2 ]a [ LT −1 ]b [ T] c ⇒ [ ML0 T −2 ] = [ Ma L2a + b T −2a − b + c] Equating the power on both sides, we get a = 1, 2a + b = 0 ⇒ b = − 2 − 2a − b + c = − 2 ⇒ c = (2a + b) − 2 =0−2=−2 So, [ S] = [ Ev –2T −2 ] v 8 (d) We know that, F = ma Q a = mv Ft F= ⇒ ⇒ m= t v ∴ Dimensions of [F][T] [M] = = [Fv −1T] [v]
t
9 (a) Reynold’s number describes the ratio of inertial force per unit area to viscous force per unit area for a flowing fluid. Thus, Reynold’s number is the ratio of two physical quantity of same dimension which cancel out each other. Hence, Reynold’s number is dimensionless [M 0L0T 0 ] quantity.
17
UNITS AND MEASUREMENTS
x d Substituting dimensions, x [MLT −2 ] = [ML−3 ]
Putting the dimensions of all the known physical quantities given in Eq. (i), we get i.e. [ F ] = [ M × a ] = [MLT −2], [r]
10 (a) Given, F =
⇒
x = [M
= [L],[m] = [M]
3/ 2 −1/ 2
L
T
−2
]
[G ] =
nh
11 (a) where, n and 2π are 2πqB dimensionless quantities. [ h ] = [ mvr ] qvB F [ qB ] = = v v mvr [ mvr ][ v ] = ∴ F / v [F ] [ mv 2r ] = [ r2 ] = Area = mv 2 r So,
12 (c) (a) Planck’s constant =
Energy Frequency
⇒
newton × metre2 ampere - metre newton × metre = ampere
kg ms−2 × m = = kgm 2s−2A−1 A = [ML2T −2A−1 ]
15 (c) The unit of electric field E is =
16
and linear momentum =Mass × Velocity
= [MLT −2 ][L] = [ML2T −2 ] (d) Energy = [ML2T −2 ] and torque = [ML2T −2 ]
13 (a) From Newton’s law of gravitation, Gm1m2 r2 where, F = force between two bodies m1 , m2 = masses of two bodies, r = distance between the masses and G = universal gravitational constant. F ⋅ r2 …(i) ⇒ G= m1m2 F=
newton kg-ms– 2 = coulomb amp -s
= kg-m s – 3 amp −1
= [MLT −2 ][T] = [MLT −1 ]
and moment of force = force × distance
From Ohm’s law, V = iR , therefore unit of resistance, V volt R= = i ampere = kg-m 2s−3ampere−2 ∴ Dimensions of R = [ML2T −3A−2 ] ∴ Dimensions of RC = [M −1L−2T 4A2 ][ML2T −3A−2 ]
=
(b) Impulse = Force × Time
= [M][L2 ] = [ML2 ]
[G] = [M L T ] Unit of A
[ML2T −2 ] = [ML2T −1 ] [T −1 ] and angular momentum = moment of inertia × angular velocity
= [M][LT −1 ] = [MLT −1 ] (c) Moment of inertia =Mass × (Distance) 2
−1 3 −2
14 (a) Dimensions of φ B = Unit of B ×
=
= [ML2 ] × [T −1 ] = [ML2T −1 ]
[MLT −2 ][L2 ] L3T −2 = [M 2 ] M
Hence, dimensions of C are [M −1L−2T 4A2 ] .
17
∴ Dimensions of electric field are [MLT −3A−1]. 1 (c) Quantity ε 0E 2 is the electrostatic 2 energy per unit volume. [ML2T −2 ] ∴ Its dimensions = [L3 ] = [ML−1T −2 ] (b) Displacment, y = A sin ( Bx + Ct + D ) A = y = [L] As each term inside the brackets is dimensionless, so 1 B = = [L−1 ] x 1 C = = [T −1 ] t and D is dimensionless. ∴ [ ABCD ] = [L][L−1 ][T −1 ] = [M 0L0T −1 ]
18 (a) The capacitance of a conductor is defined as the ratio of the charge given to the rise in the potential of the conductor. q q2 W i.e. C = = V = V W q ampere2-s2 C = kg-m 2 / s2
= [M 0L0T] Alternative In a CR circuit, the product of CR is the capacitive time constant of the circuit. If C is in farad, R is in ohm, then time constant is in second. Hence, dimensions of CR = [M 0L0T] .
19 (b) Dimensions of angular momentum, L = p × r = [MLT −1][L] = [ML2T −1 ]
20 (b) This expression is for the speed of light and the dimensions of speed of light is [LT −1 ] .
21 (d) Surface tension, S =
Force [ MLT −2 ] = = [ MT −2 ] Length [L ]
Spring constant, R Force [ MLT −2 ] = = Elongation [L ] = [ MT −2 ] F l Dimensions of F Dimensions of T = Dimensions of L
22 (c) We know that, T =
=
[MLT −2 ] = [ML0T −2 ] [L]
23 (a) The dimensions of impulse are
= Ft = [MLT −2 ] [T] = [MLT −1 ]
1 2 Dimensions of CV 2 = Dimensions of energy, E = [ML2T −2A0 ]
24 (a) We know that, energy, E = CV 2
25 (a) In the given equation, be dimensionless. kθ ∴ α= Z
αZ should kθ
18
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
[ML2T −2 K−1 ] [K] = [MLT −2 ] [L] α [MLT −2 ] α and p = ⇒ [β ] = = −1 −2 β p [ML T ] ⇒ [α ] =
= [M 0 L2T 0 ]
26 (a) Given, p =
RHS = 2π
RT −αV / RT e V −b
31 (d) Dimensions of E = [ML T ] Dimensions of M = [M] Dimensions of L = [ML2T −1 ] Dimensions of G = [M −1L3T −2 ]
−1
So, dimensions of [ at ] = [LT ] [ a ] = [LT −3 ]
⇒
[ b ] [T] = [LT ]
⇒
[ b ] = [LT −2 ]
= [ML2T −2 ]
f =
28 (d) Electromotive force = Potential V =
W [ML2T −2 ] = q [AT] 2 −3
−1
= [ML T A ]
29 (a) The capacitance C of a conductor is defined as the ratio of charge q given to raise the potential V of the conductor, i.e. q C = V Coulomb Coulomb = ∴ Farad = Volt Joule / Coulomb (Coulomb)2 Joule (amp - s)2 = newton -m
=
2
2
=
amp - s (kg -m s−2 ) × m
=
amp 2 -s4 kg-m 2
= kg−1 m −2 s4 amp 2 So, the dimensions of capacitance are [M −1L−2T 4A2 ].
So, using dimensions, we have [ML0T 0 ] = [MLT −2 ] a [L] b [T] c = [ M a La + b T − 2a + c ] ⇒ a = 1, a + b = 0 ⇒ b = −1 and −2a + c = 0 ⇒ c=2 So, unit of mass is [FL−1T 2 ] .
⇒
[k ] =
1 2L
⇒
1 f = 2L
∴
f ∝
Energy Volume [ML2T −2 ] = [L3 ]
38. (a) I. Energy density =
T µ 1 T = D 2 LD ρπ 4
T πρ
1 LD (as T , π and ρ are constants)
[ML2T −1 ] h 33 (c) Now, for 2 = 2 e
As, we know that dimensional formula of resistance is [ML 2T 3A −2]. RA (d) The resistivity(s) is ρ = L V W W Resistance, R = = (Q q = it) = i qi i 2t = ⇒
= [ML−1T −2 ] II. Refractive index has no dimensions. III. Dielectric constant has no dimensions. IV. Young’s modulus, Fl [MLT −2 ][L] Y= = A∆l [L]2[L]
[AT]
= [ML2T −3A−2 ]
34
−2 F MLT = 1 − v LT
= [ML0T −1 ]
32 (a) Fundamental frequency,
Dimensions of [ c ] = [LT ]
⇒
2 −1 2
E L [ML T ] [ML T ] 5 2 = [M] 5 [M −1 L3T −2 ] 2 M G
−1
difference
2 −2 2
2 2
36 (c) Let [M] ∝ [Fa Lb T c ]
37 (d) We have, F ∝ v ⇒ F = kv
∴ Dimensions of
Dimensions of [ bt ] = [LT −1 ] −1
R3 . GM
2 −2
[ v ] = [L][T ]
⇒
[L] [M L T ] [M] −1 3 −2
Thus, LHS = RHS for T = 2π
−1
[ a ] [T 2 ] = [LT −1 ]
= [ML5T −2 ]
= [T] = [T]
27 (a) Dimensions of velocity are
⇒
= [ML−1T −2 ][L6 ]
R3 GM
2
= [ML−1T −2 ]
2
∴ Dimensions of
3
=
αV is dimensionless. RT 2 −2 −1 RT [ML T θ ] [θ ] Hence, [α ] = = V [L3 ]
So,
This is dimensional formula of pressure ( p).
a V2 = Dimensions of p. Dimensions of a = Dimensions of p × Dimensions of V 2
R3 GM Substituting the dimensions, LHS = T = [T]
30 (a) Taking, T = 2π
2 −2
[ML T ] [A2T] 2 −3
= [ML−1T −2 ] V. Magnetic field, F [MLT −2 ] B= = [A][L] Il = [MT −2A−1 ]
39 (a) Time ∝ cxG yhz ⇒ T = k cxG yhz ⇒ [M 0L0T] = [LT −1 ] x [M −1L3T −2 ] y [ML2T −1 ] z
−2
R = [ML T A ]
Thus, dimensional formula of ρ is = [ M 1L3T −3A−2 ]
35 (a) In equation p, V and T are pressure, volume and temperature, respectively. a p + 2 (V − b) = RT V
0 0
⇒ [M L T] = [M
− y + z x + 3 y + 2z
L
T −x − 2 y − z ] Comparing the powers of M, L and T, we get …(i) − y+ z = 0 …(ii) x + 3 y + 2z = 0 …(iii) −x − 2 y − z = 1
19
UNITS AND MEASUREMENTS
On solving Eqs. (i), (ii) and (iii), we get 5 1 x=− , y=z= 2 2 Hence, dimensions of time are [G1/ 2h 1/ 2c−5/ 2 ].
b −1 t + c = [ v ] = [LT ] [ b ] = [LT −1 ][T] = [L]
or
44 (b) Planck’s constant, h = Js = [ML2T −2 ][T]
40 (c) Electrical conductivity,
= [ML2T −1 ]
1 ne2τ [L−3 ][AT]2[T] = σ= = ρ m [M] 1 −1 −3 2 3 or [ σ ] = = [M L A T ] [ρ ]
41
Momentum, p = kg -ms−1 = [M][L][T] −1 = [MLT −1 ]
45 (c) The correct relation for time period
of simple pendulum is T = 2π (l/ g )1/ 2. So, the given relation is numerically incorrect as the factor of 2π is missing. But, it is dimensionally correct.
Force (b) Pressure = Area [F ] [ p] = = [ML−1T −2 ] , [A] [ c ] = [LT −1 ]
46 (d) Let T ∝ F aW b v c −2 a
[E ] [Q ] = = [MT −3 ] [ A ][T ]
[ T ] = [ M a + b ][ La + 2b + c ][ T −2a − 2b − c ]
0 0 0
y z
[ML−1T −2 ]x [LT −1 ] z [MT −3 ] y = [M 0 L0 T 0 ] ⇒
Mx+
y
L− x + z T −2x − z − 3 y = [M 0 L0 T 0 ]
∴
x+ y=0 −x + z = 0 −2 x − z − 3 y = 0
...(i) ...(ii) ...(iii)
On solving Eqs. (i), (ii) and (iii), we get x = 1, y = − 1, z = 1.
42 (d) Resistance, Potential difference R= Current =
W Q V = Q
V W = I qI
So, dimensions of R [Dimensions of work] = [Dimensions of charge] [Dimensions of current] =
[ML2T −2 ] = [ML2T −3A−2 ] [AT][A]
43 (c) Given, v = at + or ∴
b t+c
[ at ] = [ v ] = [LT −1 ] [a] =
…(i) −1 c
[T] = [MLT ] [ML T ] [LT ]
As given, p Q c = [M L T ] x
2 −2 b
[LT −1 ] = [LT −2 ] [T]
Dimension of c = [ t ] = [T ] (we can add quantities of same dimensions only).
On comparing the powers, we get …(ii) a+ b=0 …(iii) a + 2b + c = 0 …(iv) −2a − 2b − c = 1 On solving Eqs. (ii), (iii) and (iv), we get a = − 1, b = 1, c = − 1 Therefore, from Eq. (i), [T ] = k[F−1Wv −1 ] Taking k = 1in SI system, we have [T] = [W F−1 v −1 ]
47 (a) Dimensions of power, Work [ML2T −2 ] = = [ML2T −3 ] Time [T] Dimensions of surface tension, Force [MLT −2 ] T = = = [ML0T −2 ] [L] Length P=
Dimensions of Planck’s constant, Energy h= Frequency [ML2T −2 ] = [ML2T −1 ] = [T −1 ] From the dimensional formulae, the ascending order of time is power(P ), surface tension (T ) and Planck’s constant (h).
48 (c) The given equation of Bernoulli’s theorem is p+
1 2 ρv + ρgh = k 2
where, p is pressure, ρ is density, g is acceleration due to gravity and h is height. We know that, every equation relating physical quantities should be in dimensional balance. It means dimensions of terms on both sides must be same. Hence, k has same dimensions as p and k so is dimensionless. Out of the given p four options, angle is a dimensionless quantity.
49 (a) Dimensions of
GIM 2 E2
[M −1L3 T −2 ] [MLT −1 ][M 2 ] [ML2T −2 ]2 = [T]= dimension of time
=
50 (a) Let v ∝ σ aρb λc Equating dimensions on both sides, we get [M 0LT −1 ] ∝ [MT −2 ] a [ML−3 ] b [L] c ∝ [M ] a + b [L ]−3b + c[T ] − 2a Equating the powers of M, L, T on both sides, we get ...(i) a+ b=0 ...(ii) −3b + c = 1 ...(iii) −2a = − 1 On solving Eqs. (i), (ii) and (iii) we get 1 −1 1 a= ,b= ,c=− 2 2 2 ⇒ v ∝ σ 1/ 2ρ −1/ 2λ−1/ 2 σ ∴ v2 ∝ ρλ
51 (a) The ratio =
Planck’s constant (h) E / v = Moment of inertia (I ) I
=
E × T (kg-m 2/s2 ) × s = I (kg - m 2 )
1 1 = = = Frequency s Time h Thus, dimension of is same as that of I frequency. 1 2
52 (b) Magnetic energy = LI 2 =
LQ 2 2t 2
where, L = inductance, I = current, Q = charge and t = time. Energy has the dimensions = [ML2T −2 ]
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Equating the dimensions, we have [ML2T −2 ] = henry ×
On comparing dimensions of similar terms, we have [M 0L0T ] = k [ M a + b + cL− a − 3b + 2c
[Q2 ] [T 2 ]
T −2a − 2c ]
[ML2 ] henry = [Q2 ]
⇒
On comparing powers of M, we have …(i) 0=a+ b+ c
53 (c) Magnetic field due to straight
On comparing powers of L, we have …(ii) 0 = − a − 3b + 2c On comparing powers of T, we have …(iii) 1 = − 2a − 2c On solving Eqs. (i), (ii) and (iii), we have 5 1 1 a=− ,b= ,c= 6 2 3
solenoid, B = µ 0nI B ∴ µ0 = nI [MLT −2 ] / [AL] = [L−1A] = [MLT −2A−2 ]
54 (d) Dimensional formula of angular momentum, L = [ML2T −1 ]
conducting infinite sheet is E =
or ∴
Gravitational constant, G = [M −1L3T −2 ]
= [MT −2A−1 ]
61 (d) Dimensions of Planck’s constant = [ML2T −1 ] Dimensions of gravitational constant = [M −1L3T −2 ]
55 (a) As, we know [ e ] = [ AT ], [ ε 0 ] = [M −1 L−3 T 4A2 ] , [ h ] = [ML2T −1 ] and [ c ] = [LT −1 ]
Dimensions of Bulk modulus
e2 So, 4πε 0hc A2T 2 = −1 −3 4 2 2 −1 −1 × × M L T A ML T LT
So, [L] = B [T 3 ] ⇒
Dimensions of coefficients of viscosity = [ML−1T −1 ] A → R, B → S , C → P, D → Q ∆ Q T – T0 (b) Rate of heat flow, = 1 l ∆t K A [ML2T −2 ][L] [K ] = [L2 ][Q][T]
B = [LT −3 ]
57 (b) Intensity of radiation is energy flowing per second per unit area, i.e. [Energy] [Intensity] = [Time] [Area] =
= [ML−1T −2 ]
62
56 (c) As, y = B [T 3 ]
F = q v B sinθ F [MLT −2 ] [B]= = −1 qv [AT][LT ]
[ML2T −2 ] = [ML0T −3 ] [T][L2 ]
58 (d) Given, T ∝ pa d b E c
= [MLT −3 Q−1 ]
63 (a) Relative density of a fluid =
Density of fluid Density of water
As the density of any substance has same units, hence relative density is dimensionless.
64 (b) Energy, E ∝ [F] a [A] b [T ] c
We have [M 0L0T] = [ML−1T −2 ] a [ML−3 ] b [ML2T −2 ] c
Writing the dimensions on both sides, we have [ML2T −2 ] = k [MLT −2 ] a [LT −2 ] b [T] c
[ E ] = [FAT 2 ]
65 (d) Dimensions of ab2 [M][L2 ] [ML2T −2 ] = = [AT] c3d [T 3 ][A]
σ . ε
60 (c) Magnetic force, F = q ( v × B)
K = [MLT −3 K−1 ]
= [M 0 L0T 0 ]
∴
=
Hence, option (b) is correct.
Coefficient of thermal conductivity,
Thus, gravitational constant has negative dimension in mass.
Taking dimensional balance of equation into consideration and equating the dimensions of both sides, we get …(i) a=1 …(ii) a+ b=2 …(iii) −2a − 2b + c = − 2 On solving Eqs. (i), (ii) and (iii), we get a = 1, b = 1, c = 2
59 (b) The electric field intensity due to
Torque, τ = [ML2T −2 ] T − T2 ∆Q = KA 1 ∆t L
[ML2T −2 ] = k [ M a La + bT −2a − 2b + c ]
Work = Electric potential Charge
66 (a) Self-inductance, e ∆t =e ∆ I / ∆t ∆I volt -second Unit of L = ∴ ampere (joule/coulomb) second = ampere newton - metre -second = coulomb-ampere newton -metre ⇒ Unit of L = ampere2 L=
∴
[L ] =
[MLT −2 ] [L] [A2 ]
= [ML2T −2A−2 ]
67 (c) As, µ =
Velocity of light in vacuum Velocity of light in medium
The refractive index µ is dimensionless, so each term on right hand side is dimensionless. B Hence, 2 is also dimensionless. λ This implies that dimensions of B will have the dimensions of λ2, i.e. of area.
68 (d) Given, F = at + bt 2 Only similar quantities can be equated, hence dimensions of the terms on both sides of the equation must be same. [MLT −2 ] = a[T ] ⇒ a = [MLT −3 ] Similarly, [MLT −2 ] = b[T ]2 ⇒
b = [MLT −4 ]
02 Motion in a Straight line Quick Review Rest If the position of an object does not change w.r.t. its surrounding or with the passage of time, it is said to be at rest. e.g. Book lying on the table, a person sitting on a chair, etc.
co-ordinates are needed to specify the position of the object. Y (x, y, z) M
Motion
O
• If the position of an object is continuously
changing w.r.t. its surrounding, then it is said to be in the state of motion. • On the basis of the number of co-ordinates required to specify the object, motion of object can be classified as (i) One-dimensional Motion The motion of an object is considered as 1-D (one-dimensional), if only one co-ordinate is needed to specify the position of the object at any time. –X
+X
O x
(ii) Two-dimensional Motion The motion of an object is considered as 2-D (two-dimensional), if two co-ordinates are needed to specify the position of the object at any time. In 2-D motion, the object moves in a plane. Y (x, y) M O
X
Z
Scalar and Vector Quantities Physical quantities are studied under two heads, scalars and vectors. Both types of quantity can be defined as follows (i) Scalar Quantity If only the magnitude is required to specify a physical quantity, that physical quantity is known as scalar quantity. e.g. Mass, length, time, speed, etc. (ii) Vector Quantity If magnitude as well as direction both are required to specify a physical quantity, that physical quantity is known as vector quantity. e.g. Displacement, velocity, acceleration, etc.
Distance The total length of the path covered by the object in a given time interval is known as its distance or path length travelled. It is a scalar quantity. Its unit is metre (m).
Displacement X
(iii) Three-dimensional Motion The motion of an object is considered as 3-D (three-dimensional), if all the three
• The change in position of an object in a particular
direction is termed as displacement, i.e. the minimum difference between the final and initial positions of the object in a given time. It is denoted by ∆x. Mathematically, it is represented by Displacement, ∆x = x 2 − x1
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
where, x1 and x 2 are the initial and final positions of the object, respectively. It is a vector quantity. Its unit is metre. • Displacement of motion may be zero but path length or distance can never be zero. • Displacement may be positive, negative or zero.
Uniform Motion in a Straight Line A body is said to be in a uniform motion, if it travels equal distances in equal interval of time along a straight line.
Non-uniform Motion in a Straight Line • A body is in non-uniform motion, if it travels equal
displacement in unequal intervals of time. • During the non-uniform motion, the speed of the body or its direction of motion or both change with time.
Speed The path length or the distance covered by an object divided by the time taken by the object to cover that distance is called the speed of that object. Distance travelled Speed = Time taken Speed is a scalar quantity. Its SI unit is ms −1 .
Average Speed Average speed of an object is defined as the total distance travelled divided by the total time taken. Total distance travelled Average speed, v av = Total time taken
Instantaneous Speed • Speed at an instant is defined as the limit of the average
speed as the time interval ( ∆t ) becomes infinitesimally small or approaches to zero. • Mathematically, instantaneous speed at any instant of time (t) is expressed as ∆s ds Instantaneous speed, si = lim or si = ∆t → 0 ∆ t dt where, ds is the distance covered in time dt.
Velocity The rate of change in position or displacement of an object with time is called the velocity of that object. Displacement Velocity = Time It is a vector quantity. Its unit is ms −1 .
Average Velocity Average velocity of a body is defined as the change in position or displacement (∆x ) divided by the time interval ( ∆t ) in which that displacement occurs.
Average velocity of body is given by ∆x x 2 − x 1 vav = = ∆t t 2 − t1
Instantaneous Velocity • Velocity at an instant is defined as the limit of average
velocity as the time interval ( ∆t ) becomes infinitesimally small or approaches to zero. • Mathematically, instantaneous velocity at an instant of time (t) is given by dx ∆x or vi = vi = lim ∆t → 0 ∆ t dt where, dx is displacement for time dt.
Acceleration The time rate of change of velocity is known as acceleration. Change in velocity Acceleration = Time taken It is a vector quantity. Its unit is ms −2 .
Average Acceleration The average acceleration is the ratio of the change in velocity to the time taken to undergo this change. a av =
v( t 2 ) − v( t 1 ) ∆v = t 2 − t1 ∆t
Instantaneous Acceleration Instantaneous acceleration is the acceleration at any instant of time or at any given point. ∆ v dv a = lim = ∆t → 0 ∆ t dt Note If we simply call velocity or speed or acceleration, it means instantaneous one, respectively.
Equations of Uniformly Accelerated Motion Motion of a body moving with constant acceleration can be expressed by following equations (i) v = u + at 1 2 (ii) s = ut + at 2 (iii) v2 = u 2 + 2as a (iv) snth = u + (2n − 1) 2
(Velocity-time equation) (Displacement-time equation) (Displacement-velocity equation) (Displacement in nth second)
where, v = final velocity, u = initial velocity, a = acceleration, t = time and s = displacement.
23
MOTION IN A STRAIGHT LINE
• For fast calculations in objective problems remember the
Equations of Motion for Object Falling Under Gravity
following results (i) Maximum height attained by a particle, thrown u2 upward from ground, h = 2g (ii) Velocity of particle at the time of striking the ground, when released ( u = 0) from a height h, v = 2gh 2h (iii) Time of collision with ground, t = g
When the object fall under the influence of gravity, its motion is uniformly accelerated motion. Hence, equations of motion are applicable in this case also. • For upward motion, i.e. an object is thrown vertically upwards 1 v = u − gt, h = ut − gt 2 2 and v 2 = u 2 − 2gh.
Graphs in One-dimensional Motion
Note In upward motion, g is taken as negative.
There are three types of graphs representing motion in one dimension (i) Position-time graph (s-t) (ii) Velocity-time graph (v-t) (iii) Acceleration-time graph (a-t) The tabular forms of s-t, v-t and a-t graphs are given for one-dimensional motion with uniform velocity or with constant acceleration.
• For downward motion, i.e. an object is thrown vertically
downwards
and
1 v = u + gt, h = ut + gt 2 2 2 2 v = u + 2gh.
Note In downward motion, g is taken as positive.
• If an object is dropped (from some height)
v = gt 1 h = gt 2 2 v 2 = 2gh
Note • Area under v-t graph gives the value at displacement covered in given time. • Area under the acceleration-time ( a -t ) graph between t1 to t2 gives the change in velocity, i.e. v2 − v1 = Area under a-t graph
Note If an object is dropped from some height, then initial velocity is taken as zero. Different Cases
t2
= ∫ a ⋅ dt t1
s-t Graph
At rest
v-t Graph —
s
t
O s
1 s= at 2 2 t
O s
Uniformly retarded motion
s
O
t
O
v u
t
O
t
v = u+ at t
v s=ut – 1 at 2 2 t0
t
Slope is positive
a a = constant
v = at O
O
t
O
v
s=ut+ 1 at 2 2
O
Slope = Zero
a v = constant
s = vt
Uniformly accelerated motion with u ≠ 0 but s = 0 at t = 0.
—
—
v
s
Uniformly accelerated motion with u = 0, s = 0 at t = 0.
Slope of v-t Graph
t
O
Uniform motion
a-t Graph
t
O
Slope is positive
a
O
t
Slope is negative
a v = u – at t t0
O
t
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Different Cases
s-t Graph
Non-uniform accelerated motion
v-t Graph
—
—
Slope is positive
t
Slope is first increase, then decreases
v
t
O
A body falling freely under gravity
O
s
O –g
–v
+v
u2 2g 2u g
t
Slope is negative
t
Slope is negative
–a
u g
O u g
O
+a
t
t
–s
A body is projected vertically upwards
Slope of v-t Graph
v
O
Non-uniform decelerated motion
a-t Graph
+a
2u g t
O –g
–v
–a
t
Non-Uniformly Accelerated Motion When particle is not uniformly accelerated, i.e. acceleration of particle is not constant or acceleration is a function of time, then the following relations hold for one-dimensional motion ds (i) v = dt
dv dv ds dv = × =v dt ds dt ds (iii) ds = vdt (iv) dv = adt or vdv = ads (ii) a =
Topical Practice Questions All the exam questions of this chapter have been divided into 3 topics as listed below Topic 1
—
DISTANCE, DISPLACEMENT AND VELOCITY
25–27
Topic 2
—
UNIFORM AND NON-UNIFORM MOTION
27–38
Topic 3
—
GRAPHS IN MOTION
38–41
Topic 1 Distance, Displacement and Velocity 2019 1 A person travelling in a straight line moves with a constant velocity v1 for certain distance x and with a constant velocity v 2 for next equal distance. The average velocity v is given by the relation [NEET] 1 1 1 2 1 1 (b) = (a) = + + v v1 v 2 v v1 v 2 v v + v2 (c) = 1 (d) v = v1 v 2 2 2
2 Find the average velocity when a particle complete the circle of radius 1m in 10 s. [JIPMER] −1 −1 (a) 2 ms (b) 3.14 ms (c) 6.28 ms −1 (d) Zero
2018 3 A runner starts from O and goes to O following path OQRO in 1 h. What is net displacement and average speed? [JIPMER] R
O
(a) 0, 3.57 kmh −1 (c) 0, 2.57 kmh −1
2014 6 A car covers the first half of the distance between the two
places at 40 kmh −1 and another half at 60 kmh −1 . The average speed of the car is [UK PMT] (a) 40 km/h (b) 48 km/h (c) 50 km/h (d) 60 km/h
7 A ball is thrown vertically upwards after reaching a maximum height h returns to the starting point after a time of 10 s. Its displacement is [Kerala CEE] (a) h (b) 2h (c) 10h (d) 20h (e) zero 2013 8 Which of the following can be zero, when a particle is in motion for sometime? [WB JEE] (a) Distance (b) Displacement (c) Speed (d) None of these
2011 9 A body is moving with velocity 30 ms −1 towards east. 1km
Q
(b) 0, 0 kmh −1 (d) 0, 1 kmh −1
2017 4 Preeti reached the metro station and found that the escalator was not working. She walked up the stationary escalator in time t 1 . On other days, if she remains stationary on the moving escalator, then the escalator takes her up in time t 2 . The time taken by her to walk up on the moving escalator will be [NEET] t1 + t 2 t1 t 2 t1 t 2 (a) (b) (c) (d) t 1 − t 2 2 t 2 − t1 t 2 + t1
5 Which of the following statements is true for a car moving on the road? [Manipal] (a) With respect to the frame of reference attached to the ground, the car is at rest. (b) With respect to the frame of reference attached to the person sitting in the car, the car is at rest. (c) With respect to the frame of reference attached to the person outside the car, the car is at rest. (d) None of the above
After 10 s, its velocity becomes 40 ms −1 towards north. The average acceleration of the body is [CBSE AIPMT] (a) 7 ms −2 (c) 5 ms −2
(b) 7 ms −2 (d) 1 ms −2
10 The displacement of a car is given as − 240 m, here, negative sign indicates [CBSE AIPMT] (a) direction of displacement (b) negative path length (c) position of car is at point whose coordinate is − 120 (d) no significance of negative sign
2010 11 The sign ( + ve or − ve) of the average velocity depends only upon (a) the sign of displacement (b) the initial position of the object (c) the final position of the object (d) None of the above
[BHU]
12 A wheel completes 2000 revolutions to cover the 9.5 km distance, then the diameter of the wheel is [JCECE] (a) 1.5 km (b) 1.5 m (c) 7.5 cm (d) 7.5 m
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
13 Select the incorrect statements and mark the correct option given below. [JCECE] I. Average velocity is path length divided by the time interval. II. In general, speed is greater than the magnitude of the velocity. III. A particle moving in a given direction with a non-zero velocity can have zero speed. IV. The magnitude of an average velocity is the average speed. (a) II and III (b) I and IV (c) I, III and IV (d) All of these 2009 14 A cyclist moving on a circular track of radius 40 m completes half a revolution in 40 s. Its average velocity is [JCECE] (a) zero (b) 2 ms −1 (c) 4π ms −1 (d) 8π ms −1
2008 15 A particle moving in a straight line covers half the distance
with speed of 3 ms −1 . The other half of the distance is covered in two equal time intervals with speed of 4.5 ms −1 and 7.5 ms −1 , respectively. The average speed of the particle during this motion is [Kerala CEE] (b) 5 ms −1
(a) 4 ms −1 (e) 6 ms −1
(c) 5.5 ms −1 (d) 4.8 ms −1
2007 16 A car moves from X to Y with a uniform speed vu and returns to Y with a uniform speed v d . The average speed for this round trip is [CBSE AIPMT] 2v d v u (b) v u v d (a) vd + vu v v v + vd (c) d u (d) u vd + vu 2
Answers 1 (b) 11 (a)
2 (d) 12 (b)
3 (a) 13 (d)
4 (c) 14 (b)
5 (b) 15 (a)
6 (b) 16 (a)
7 (e)
8 (b)
9 (c)
10 (a)
Explanations 1 (b) For distance x, the person moves
3 (a)Q Runner starts from O and goes to
with constant velocity v1 and for another x distance, he moves with constant velocity of v2, then Total distance travelled, D = x + x = 2x Total time taken, x x Distance + Qt = T = t1 + t2 = Velocity v1 v2 Average velocity, total distance D vav = = T total time 2x 2 v= = x x 1 1 + + v1 v2 v1 v2 ⇒
4
[Qvav = v]
2 1 1 = + v v1 v2
2 (d) When a particle completes one revolution in circular motion, then average displacement travelled by particle is zero. Hence, average velocity average displacement = ∆t 0 = =0 ∆t
O, so net displacement is zero. Q Average speed Total distance OQ + QR + RO = = Total time Total time 1 km + (2πr) (1/ 4 ) + 1 km = 1h π = 2 + = 3.57 kmh −1 2 h (c) Speed of walking = = v1 t1 h Speed of escalator = = v2 t2 Time taken when she walks over moving escalator h t= v1 + v2 1 1 v1 v2 1 = + ⇒ = + t h h t1 t2 tt ⇒ t= 12 t1 + t2
5 (b) For a car in motion, if we describe this event w.r.t. a frame of reference attached to the person sitting inside the car, the car will appear to be at rest as the person inside the car (observer) is also moving with same velocity and in the same direction as car.
6 (b) As from the question, d A d/2 t1 v=40 kmh–1
C
B d/2 t2 v=80 kmh–1
Average speed of the car vav is given by Total distance travelled by the car (d ) Total time taken (t1 + t2 ) ...(i) So, now time taken in 1st half of the distance, Distance d = t1 = Time = Velocity 2 × 40 d (∴ distance = and velocity = 40 kmh −1) 2 d t1 = ⇒ 80 and time taken for 2nd half, t2 d d (Q distance = and = 2 × velocity 2 velocity = 60 kmh −1) d d So, = t2 = 2 × 60 120 Now, average velocity, d [from Eq. (i)] vav = d d + 80 120
27
MOTION IN A STRAIGHT LINE
d × 80 × 120 = 48 kmh −1 200d s2 (e) The position of an object is always expressed w.r.t. some reference point. If the initial position of an object w.r.t. a h reference point is s1 and after sometime, it changes to s2, then the magnitude of the displacement of the object is s1 s2 − s1. But here, object moves back to s1. So, its displacement is zero. (Q s1 = s2 = h) =
7
8 (b) Displacement of a particle may be zero, because final position of the particle may coincide with its initial position.
9 (c) Average acceleration Change in velocity Total time | v f − vi | 302 + 402 a= = ∆t 10 900 + 1600 = = 5 ms−2 10 =
10 (a) The displacement of a car is given as –240 m, here negative sign indicates the direction of displacement.
11 (a) Since, average velocity, v=
∆ x Displacement = ∆ t Time-interval
Thus, average velocity depends on the displacement and hence it depends on the sign of the displacement.
12 (b) Distance covered in n revolutions is
13
n⋅ π D = l ⇒ 2000 π D = 9500 Given, n = 2000, and distance, l = 9500 m 9500 So, D= = 1.5 m 2000 × π Displacement (d) I. Average velocity = Time taken ∆r vav = ∆t II. For a given time interval, Distance ≥ | Displacement | i.e. average speed may be greater than or equal to average velocity ∴ Average speed ≥ | Average velocity | III. A particle moving in a given direction with a non-zero velocity cannot have zero speed. IV. In general, average speed is not equal to the magnitude of average velocity.
15 (a) If t1 and 2t2 are the time taken by particle to cover first and second half distance, respectively x/2 x t1 = = 3 6 and x1 = 4. 5t2 and x2 = 7. 5t2 x As, x1 + x2 = 2 x x So, 4. 5t2 + 7. 5t2 = ⇒ t2 = 24 2 x x x Total time, t = t1 + 2t2 = + = 6 12 4 Total distance x / 2 + x / 2 ∴ uav = = x/4 total time So, average speed = 4 ms−1. Distance travelled Time taken Let t1 and t2 be times taken by the car to go from X to Y and then from Y to X, respectively. XY XY Then, t1 + t2 = + vu vd
16 (a) Average speed =
v +v = XY u d vu vd
14 (b) As given, R = 40
m and t = 40 s Here, net displacement is equal R to the diameter of circular track, i.e. Displacement = 2R Average velocity Displacement 2R 2 × 40 = = = = 2 ms−1 Time taken t 40
Total distance travelled = XY + XY = 2 XY Therefore, average speed of the car for this round trip is 2 XY vav = vu + vd XY vu vd or vav =
2vu vd vu + vd
Topic 2 Uniform and Non-uniform Motion 2019 1 Speeds of a particle at 3rd and 8th second are 20 ms −1 and zero respectively, then average acceleration between 3rd and 8th second will be [JIPMER] (a) 3 ms −2 (b) 4 ms −2 (c) 5 ms −2 (d) 6 ms −2
2018 2 A toy car with charge q moves on a frictionless horizontal plane surface under the influence of a uniform electric
field E. Due to the force qE, its velocity increases from 0 to 6 ms −1 in one second duration. At that instant, the direction of the field is reversed. The car continues to move for two more seconds under the influence of this field. The average velocity and the average speed of the toy car between 0 to 3 s are respectively [NEET] −1 −1 (a) 1 ms , 3.5 ms (b) 1 m/s, 3 m/s (c) 2 ms −1 , 4 ms −1 (d) 1.5 ms −1 , 3 ms −1
28
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
3 Assertion A body is momentarily at rest at the instant, if it reverse the direction. Reason A body cannot have acceleration, if its velocity is zero at a given instant of time. [AIIMS] (a) Assertion and Reason both are correct and Reason is correct explanation of Assertion. (b) Assertion and Reason both are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct. 4 Velocity is given by v = 4t (1− 2t ), then find the value of time at which velocity is maximum. [AIIMS] (a) 0.25 s (b) 1 s (c) 0.45 s (d) 4 s 5 A ball is thrown upwards with a speed u from a height h above the ground. The time taken by the ball to hit the ground is [JIPMER] (a) 2h / g (b) 8h / g (c)
u 2 + 2gh g
(d)
u 2h + g g
2017 6 The x and y co-ordinates of the particle at any time are
x = 5 t − 2 t 2 and y = 10 t respectively, where x and y are in metres and t in seconds. The acceleration of the particle at t = 2s is [NEET] (c) − 4 m/s 2 (d) − 8 m/s 2 (a) 0 (b) 5 m/s 2
7 A body is projected vertically upwards. The times corresponding to height h while ascending and while descending are t 1 and t 2 , respectively. Then, the velocity of projection will be (take g as acceleration due to gravity) [JIPMER] g t1 t 2 g ( t1 + t 2 ) t t (c) g t 1 t 2 (d) g 1 2 (b) (a) 2 ( t1 + t 2 ) 2
2016 8 Two cars P and Q start from a point at the same time in a straight line and their positions are represented by x P ( t ) = at + bt 2 and x Q ( t ) = ft − t 2 . At what time do the cars have the same velocity? [NEET] a− f a+ f a+ f f −a (b) (c) (d) (a) 1+ b 2 ( b − 1) 2 (1+ b ) 2 (1+ b )
2015 9 A particle of unit mass undergoes one-dimensional motion such that its velocity varies according to v( x ) = β x −2n , where β and n are constants and x is the position of the particle. The acceleration of the particle as a function of x is given by [AIPMT] 2 −2 n −1 2 −4 n −1 (a) −2nβ x (b) −2nβ x (c) −2β 2 x −2n+1
(d) −2nβ 2 e −4n+1
2014 10 A particle moves with constant acceleration along a straight line starting from rest. The percentage increase in its displacement during the 4th second compared to that in the 3rd second is [WB JEE] (a) 33% (b) 40% (c) 66% (d) 77%
11 A body of mass 10 kg is moving with a constant velocity of 10 ms −1 . When a constant force acts for 4 s on it, it moves with a velocity 2 ms −1 in the opposite direction. The acceleration produced in it is [OJEE] –2 −2 (a) 3 ms (b) −3 ms −2 (c) 0.3 ms (d) − 0.3 ms −2 12 A particle starts moving from rest with uniform acceleration. It travels a distance x in first 2 s and distance y in the next 2 s, then [EAMCET] (a) y = 3x (b) y = 4x (c) y = x (d) y = 2x 13 A body starts from rest and moves with constant acceleration for t sec. It travels a distance x1 in first half of [KCET] time and x 2 in next half of time, then (a) x 2 = x1 (b) x 2 = 2x1 (c) x 2 = 3x1 (d) x 2 = 4x1
2013 14 A stone falls freely under gravity. It covers distances h1 , h2 and h3 in the first 5 s, the next five second and the further next 5s, respectively. The relation between h1 , h2 [NEET] and h3 is h2 h3 (a) h1 = 2h2 = 3h3 (b) h1 = = 3 5 (c) h2 = 3h1 and h3 = 3h2 (d) h1 = h2 = h3
2012 15 The motion of a particle along a straight line is described
by equation x = 8 + 12t − t 3 , where x is in metre and t is in second. The retardation of the particle, when its velocity becomes zero [CBSE AIPMT] −2 (a) 24 ms (b) zero −2 (c) 6ms (d) 12 ms −2
16 A particle moves along the X-axis. The position x of a particle w.r.t. time from origin given by x = b0 + b1 t + b2 t 2 . The acceleration of particle is [AIIMS] (d) 2b2 (c) b2 (b) b1 (a) b0 17 A particle is travelling along a straight line OX. The distance x (in metre) of the particle from O at a time t is given by x = 37 + 27t − t 3 , where t is time in second. The distance of the particle from O when it comes to rest is [WB JEE] (a) 81 m (b) 91 m (c) 101 m (d) 111 m
29
MOTION IN A STRAIGHT LINE
18 From the top of a tower, 80 m high from the ground, a stone is thrown in the horizontal direction with a velocity of 8 ms –1 . The stone reaches the ground after a time t and falls at a distance of d from the foot of the tower, then the time t and distance d are given respectively by (assuming, g = 10 ms −2 ) [WB JEE] (a) 6 s, 64 m (b) 6 s, 48 m (c) 4 s, 32 m (d) 4 s, 16 m
2010 19 A body starts from rest with a uniform acceleration. If its velocity after n second is v, then its displacement in the last 2 s is [WB JEE] 2v ( n + 1) v ( n + 1) (a) (b) n n v ( n − 1) 2v ( n − 1) (d) (c) n n
20 A stone falls freely from rest and the total distance covered by it in the last second of its motion equals the distance covered by it in the first three seconds of its motion. The stone remains in the air for [WB JEE] (a) 6 s (b) 5 s (c) 7 s (d) 4 s 21 A body falls freely from the top of a tower. It covers 36% of the total height in the last second before striking the ground level. The height of the tower is [Haryana PMT] (a) 50 m (b) 75 m (c) 100 m (d) 123 m 22 From the top of a tower, a particle is thrown vertically downwards with a velocity of 10 ms −1 . The ratio of distances covered by it in the 3rd and 2nd second of its motion is (take, g = 10 ms −2 ) [Punjab PMET] (a) 5 : 7 (c) 3 : 6
(b) 7 : 5 (d) 6 : 3
23 A body A is thrown up vertically from the ground with a velocity v 0 and another body B is simultaneously dropped from a height H. They meet at a height H/ 2 , if v 0 is equal to [AMU] 2g 1 (a) 2gH (b) gH (c) (d) gH H 2 24 The ratios of the distance travelled in successive intervals of time by a body falling from rest are [AMU] (a) 1 : 3 : 5 : 7 : 9 : ... (b) 2 : 4 : 6 : 8 : 10 : ... (c) 1 : 4 : 7 : 10 : 13 : ... (d) None of these
2009 25 A car starts from rest and accelerates uniformly to a speed
of 180 kmh −1 in 10 s. The distance covered by the car in this time interval is [Kerala CEE] (a) 500 m (b) 250 m (c) 100 m (d) 200 m (e) 150 m
26 A stone is thrown vertically upwards. When the stone is at a height equal to the half of its maximum height, its speed will be 10 ms −1 , then the maximum height attained by the stone is (take, g = 10 ms −2 ) [Punjab PMET] (a) 5 m (c) 20 m
(b) 150 m (d) 10 m
2008 27 The distance travelled by a particle starting from rest and moving with an acceleration 4 ms −2 , in the third 3 second is [CBSE AIPMT] (a) 6 m (b) 4 m 10 19 (d) m (c) m 3 3
28 A particle moves in a straight line with a constant acceleration. It changes its velocity from 10 ms −1 to 20 ms −1 while passing through a distance 135 m in t s. The value of t (in second) is [CBSE AIPMT] (a) 10 (b) 1.8 (c) 12 (d) 9 29 A parachutist after bailing out falls 50 m without friction. When parachute opens, it decelerates at 2 ms −2 . He reaches the ground with a speed of 3 ms −1 . At what height, did he bail out? [AIIMS] (a) 91 m (b) 182 m (c) 293 m (d) 111 m 30 A car starting from rest accelerates at the rate f through a distance s, then continues at a constant speed for time t and then decelerates at the rate f / 2 to come to rest. If the total distance travelled is 15 s, then [AIIMS] 1 2 (a) s = ft (b) s = ft 6 1 2 1 (c) s = (d) s = ft 2 ft 72 4 31 An automobile travelling with a speed of 60 kmh −1 , can brake to stop within a distance of 20 m. If the car is going twice as fast, i.e. 120 kmh − 1 , the stopping distance will be [BHU] (a) 20 m (b) 40 m (c) 60 m (d) 80 m 32 If the velocity of a particle is v = At + Bt 2 , where A and B are constants, then the distance travelled by it between 1s and 2s is [NEET] 3 7 (a) 3A + 7B (b) A + B 2 3 A B 3 (d) A + 4B (c) + 2 3 2
30
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
33 A car moving with a speed of 50 kmh −1 can be stopped by brakes after atleast 6 m. If the same car is moving at a speed of 100 kmh −1 , the minimum stopping distance is (a) 12 m (b) 18 m [MP PMT] (c) 24 m (d) 6 m 34 A boy standing at the top of a tower of 20 m height drops a stone. Assuming g = 10 ms −2 , the velocity with which it hits the ground is [CBSE AIPMT] −1 −1 (b) 40 ms (a) 20 ms (c) 5 ms −1 (d) 10 ms −1
2007 35 The position x of a particle with respect to time t along
X -axis is given by x = 9t 2 − t 3 , where x is in metre and t in sec. What will be the position of this particle when it achieves maximum speed along the + X - direction? [CBSE AIPMT]
(a) 32 m (c) 81 m
(b) 54 m (d) 24 m
36 A ball thrown vertically upwards with an initial velocity of 1.4 ms −1 returns in 2 s. The total displacement of the ball is [Manipal] (a) 22.4 cm (b) zero (c) 44.8 m (d) 33.6 m 37 A particle moving along X-axis has acceleration f, at time t t is given by f = f 0 1 − , where f 0 and T are T constants. The particle at t = 0 has zero velocity. In the time interval between t = 0 and the instant when f = 0, the particle’s velocity ( v x ) is [CBSE AIPMT] 2 (b) f 0T (a) f 0T 1 (d) f 0T (c) f 02T 2 2 38 A man throws balls with the same speed vertically upwards one after the other at an interval of 2s. What should be the speed of the throw, so that more than two balls are in the sky at any time? (Take, g = 9.8 ms −2 ) (a) Any speed less than 19.6 ms −1 [AFMC] −1 (b) Only with speed 19.6 ms (c) More than 19.6 ms −1 (d) Atleast 9.8 ms −1 39 Two bodies A (of mass 1 kg) and B (of mass 3 kg) are dropped from heights of 16 m and 25 m, respectively. The ratio of the time taken by them to reach the ground is [Manipal]
(a) 5/4 (c) 5/12
(b) 12/5 (d) 4/5
40 When a bullet is fired at a target, its velocity decreases by half, after penetrating 30 cm into it. The additional thickness, that it will penetrate before coming to rest is [Kerala CEE]
(a) 30 cm (e) 20 cm
(b) 40 cm
(c) 10 cm
(d) 50 cm
41 A body is moving with a uniform acceleration covers 200 m in the first 2 s and 220 m in the next 4 s. Find the value of velocity in ms −1 after 7 s. [J&K CET] (a) 10 (b) 15 (c) 20 (d) 30 42 The acceleration of a particle is increasing linearly with time t as bt. The particle starts from the origin with an initial velocity v 0 . The distance travelled by the particle in time t will be [AMU] 1 1 (b) v 0 t + bt 3 (a) v 0 t + bt 2 3 3 1 3 1 (c) v 0 t + bt (d) v 0 t + bt 2 6 2 43 A conveyor belt is moving horizontally at a speed of 4 ms −1 . A box of mass 20 kg is gently laid on it. It takes 0.1 s for the box to come to rest. If the belt continues to move uniformly, then the distance moved by the box on the conveyor belt is [AMU] (a) zero (b) 0.2 m (c) 0.4 m (d) 0.8 m 44 A particle moving with a uniform acceleration travels 24 m and 64 m in the first two consecutive intervals of 4 s each. Its initial velocity will be [BCECE] (d) 4 ms −1 (c) 1 ms −1 (b) 3 ms −1 (a) 5 ms −1
2006 45 The displacement of a particle starting from rest
(at t = 0) is given by s = 6t 2 – t 3 The time in second at which the particle will obtain zero velocity again is [AIIMS] (a) 2 (b) 4 (c) 6 (d) 8
46 A body falls from a height h = 200 m. The ratio of distance travelled in each 2 s, during t = 0 to 6 s of the journey is [Manipal] (a) 1 : 4 : 9 (b) 1 : 2 : 4 (c) 1 : 3 : 5 (d) 1 : 2 : 3 47 From the top of a tower a stone is thrown up and reaches the ground in time t 1 = 9 s. A second stone is thrown down with the same speed and reaches the ground in time t 2 = 4 s. A third stone is released from rest and reaches the ground in time t 3 , which is equal to [Kerala CEE] 5 (a) 6.5 s (b) 6 s (c) s (d) 65 s 36 (e) 64 s
31
MOTION IN A STRAIGHT LINE
48 A ball is thrown upwards, it takes 4 s to reach back to the ground. Find the value of its initial velocity. [RPMT] −1 −1 (b) 10 ms (a) 30 ms −1 (c) 40 ms (d) 20 ms −1 49 A ball is thrown from height h and another from 2h. The ratio of time taken by the two balls to reach the ground is [MP PMT]
(a) 1: 2
(b) 2 : 1
(c) 2 : 1
(d) 1 : 2
50 A car accelerates from rest at a constant rate for first 10 s and covers a distance x. It covers a distance y in next 10 s at the same acceleration. Then, which of the following is true? [Punjab PMET] (a) x = 3 y (b) y = 3x (c) x = y (d) y = 2x 51 The velocity of a particle at an instant is 10 ms −1 . After 3 s its velocity will become 16 ms −1 . The velocity at 2 s, before the given instant would have been [AMU] (a) 6 ms −1
(b) 4 ms −1
(c) 2 ms −1
(d) 1 ms −1
52 A body is projected vertically upwards with a velocity u. It crosses a point in its journey at a height h twice just after 1s and 7 s. The value of u in ms −1 is (take, g = 10 ms −2 ) [EAMCET] (a) 50 (b) 40 (c) 30 (d) 20 −1
53 A metro train starts from rest and in 5 s achieves 108 kmh . After that it moves with constant velocity and comes to rest after travelling 45 m with uniform retardation. If total distance travelled is 395 m, find total time of travelling. [DUMET] (a) 12.2 s (b) 15.3 s (c) 9 s (d) 17.2 s 54 The distance covered by an object (in metre) in given by s = 8t 3 – 7t 2 + 5t, find its speed at t = 2 sec [Manipal] (a) 76 ms −1 (b) 72 ms −1 (c) 86 ms −1 (d) 82 ms −1
2005 55 The displacement x of a particle varies with time t as
x = ae −αt + beβt , where a, b, α and β are positive constants. The velocity of the particle will [CBSE AIPMT] (a) go on decreasing with time (b) be independent of α and β (c) drop to zero when α = β (d) go on increasing with time
56 When a ball is thrown up vertically with velocity v0 , it reaches a maximum height of h. If one wishes to triple the maximum height, then the ball should be thrown with velocity [AIIMS] (b) 3v 0 (a) 3v 0 (c) 9v 0 (d) 3/ 2 v 0
57 If a car at rest, accelerates uniformly and attains a speed of 72 kmh −1 in 10 s, then it covers a distance of [BHU] (a) 50 m (b) 100 m (c) 200 m (d) 400 m 58 The velocity of bullet is reduced from 200 ms −1 to 100 ms −1 while travelling through a wooden block of thickness of 10 cm. The retardation assuming to be uniform, will be [RPMT] 4 −2 4 −2 (a) 15 × 10 ms (b) 13.5 × 10 ms 4 −2 (c) 12 × 10 ms (d) None of these 59 A man is 45 m behind the bus, when the bus start accelerating from rest with acceleration 2. 5 ms −2 . With what minimum velocity should the man start running to catch the bus? [J&K CET] −1 −1 (a) 12 ms (b) 14 ms (c) 15 ms −1 (d) 16 ms −1 60 A particle moves along X-axis as x = 4 ( t − 2) + a ( t − 2) 2 . Which of the following is true? [J&K CET] (a) The initial velocity of particle is 4 (b) The acceleration of particle is 2a (c) The particle is at origin at t = 0 (d) None of the above 61 From the top of a tower two stones, whose masses are in the ratio 1 : 2 are thrown on straight up with an initial speed u and the second straight down with the same speed [KCET] u. Then, neglecting air resistance (a) the heavier stone hits the ground with a higher speed (b) the lighter stone hits the ground with a higher speed (c) Both the stones will have the same speed when they hit the ground (d) the speed can’t be determined with the given data 62 A particle moves along Y-axis in such a way that its y-coordinate varies with time t according to the relation y = 3 + 5t + 7t 2 . The initial velocity and acceleration of the particle are respectively [BCECE] (a) 14 ms −1 , − 5 ms −2 (b) 19 ms −1 , − 9 ms −2 (c) −14 ms −1 , − 5 ms −2 (d) 5 ms −1 , 14 ms −2
63 An object travels North with a velocity of 10 ms −1 and then speeds upto a velocity of 25 ms −1 in 5 s. The acceleration of the object in these 5 s is [JCECE] (a) 12 ms −2 in North direction (b) 3 ms −2 in North direction (c) 15 ms −2 in North direction (d) 3 ms −2 in South direction
32
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPER
Answers (b) (b) (d) (d) (a) (a) (c)
1 11 21 31 41 51 61
2 12 22 32 42 52 62
(b) (a) (b) (b) (c) (b) (d)
3 13 23 33 43 53 63
(c) (c) (b) (c) (b) (d) (b)
4 14 24 34 44 54
(a) (b) (a) (a) (c) (a)
(c) (d) (b) (b) (b) (d)
5 15 25 35 45 55
6 16 26 36 46 56
(c) (d) (d) (b) (c) (a)
7 17 27 37 47 57
(b) (b) (c) (d) (b) (b)
8 18 28 38 48 58
(d) (c) (d) (c) (d) (a)
9 19 29 39 49 59
(b) (d) (c) (d) (a) (c)
10 20 30 40 50 60
(b) (b) (c) (c) (b) (b)
Explanations 1 (b) Time interval between 8th and 3rd second, ∆t = 8 − 3 = 5 s, i.e. ∆t = 5s Change in velocity, ∆v = 20 − 0 = 20 ms −1 ∴Average acceleration ∆v 20 = = = 4 ms −2 ∆t 5
2 (b) According to the question, For the time duration 0 < t < 1s, the velocity increase from 0 to 6 ms −1. As the direction of field has been reversed, for 1 < t < 2 s, the velocity firstly decreases from 6 ms−1 to 0. Then, for 2 < t < 3 s; as the field strength is same; the magnitude of acceleration would be same, but velocity increases from 0 to − 6 ms−1. 0< t m3 ), ( m + m2 − m3 )g a= 1 ( m1 + m2 + m3 ) 2 m1 m3 g Tension, T1 = ( m1 + m2 + m3 )
T=
a B m2
F
=
(i) For two bodies of unequal masses ( m1 > m2 ) suspended from a pulley
T2
a
m − m2 (a) Acceleration, a = 1 g m1 + m2
a
T1 a m1
T m2 T a m1
m1 (a) Acceleration, a = g m1 + m2 mm (b) Tension, T = 1 2 g m1 + m2
T1 T1 a
T2 a
m1
(ii) For a body ( m2 ) accelerated on a horizontal smooth surface by a falling body ( m1 ) through a pulley
m2
m1
(m 1 > m 2 )
Net acceleration, Net acceleration force a= Total mass ( m1 − m2 )g = ( m1 + m2 + M ) ( M + 2 m2 ) m1 g Tension, T1 = m1 ( g − a ) = ( M + m1 + m2 ) T2 = m2 ( g + a ) =
and
( M + 2 m1 ) m2 g ( M + m1 + m2 )
(vi) For a pulley and block system on a smooth double inclined plane as shown in figure, we have
(iii) For the motion on a smooth inclined plane,
N2
a
m1 N1
m2
T T m1 m 1g
m − m2 sin θ (a) Acceleration, a = 1 g m1 + m2 (b) Tension, T =
m2
4 m3 ( m1 + m2 )g ( m1 + m2 + m3 )
M
T m2
2m1 m2 (b) Tension, T = g m1 + m2
θ θ s in g m2g m2g cos θ m2 θ
m3
(v) For a pulley and block arrangement on a horizontal smooth surface as shown in figure
II. Objects Attached through Pulleys
m2
a
and total tension, T = 2T2
m1 F F and a = m1 + m2 m1 + m2
N
T2
2 m3 ( m1 + m2 )g T2 = ( m1 + m2 + m3 )
(ii) Motion of blocks connected by string a A m1
T
m1 m2 (1 + sin θ )g ( m1 + m2 )
m
gs 2
in θ θ2 2
m2g cos θ2 θ1 θ2 m1g cos θ2 m2 g m1 g
Net acceleration, a =
a m
1g
θ1
sin
θ
1
( m1 sin θ1 − m2 sin θ 2 ) g ( m1 + m2 )
and tension in string, T = m1 ( g sin θ1 − a ) m m (sin θ1 + sin θ 2 ) g = 1 2 ( m1 + m2 )
75
LAWS OF MOTION
Motion of a Chain due to its Own Weight If a chain is placed on the table by some portion hanging in air, then maximum length (l) of chain that can hang in air kL without sliding is given by l = 1+ k
l
Mathematically, f k ≤ µ k N , where µ k is the coefficient of kinetic friction.
length hanging from table length lying on the table
where,
k=
and
L = total length of chain.
Friction Whenever a body moves or tends to move over the surface of another body, a force comes into play which acts parallel to the surface of contact and opposes the relative motion. This opposing force is called friction. Types of friction
External friction
Static friction
Internal friction
Limiting friction
(iii) Kinetic Friction The force of friction that acts between two objects when one object is actually moving over the surface of another is called kinetic friction. Kinetic friction is proportional to the normal force, which presses the two surfaces together.
Kinetic friction
Kinetic friction is further divided into following two types, Sliding friction and Rolling friction • Rolling friction is quite small as compared to sliding friction. • In rolling, the surfaces at contact do not rub each other.
Angle of Friction The angle which the resultant of the force of limiting friction and normal reaction makes with the direction of normal reaction is known as angle of friction. Angle of friction, λ = tan −1 (µ s ) µ s = tan λ
N
F
λ µN (f)
mg
Angle of Repose Sliding friction
Rolling friction
(i) Static Friction Force of friction which comes into play between two bodies before one body has not actually starts moving over the other is called static friction and it is denoted by f s .
The minimum angle of inclination of plane with the horizontal at which the body placed on the plane just begins to slide down, is known as angle of repose. N
The static frictional force is given by f s ≤ µ s N , where µ s is the coefficient of static friction. (ii) Limiting Friction Maximum force of static friction which comes into play when a body just starts moving over the surface of another body is called limiting friction. Thus, f s ≤ f s (max) . The value of limiting friction ( f s (max) ) between two given surfaces is directly proportional to the normal reaction ( R ) between the two surfaces i. e.
f s (max) ∝ R or f s (max) = µ s R R Applied force fs w
where, or
R = w = mg, m = mass of the block f s(max) Limiting friction µs = = Normal reaction R
The proportionality constant µ s is called coefficient of static friction. It is defined as the ratio of limiting friction to the normal reaction.
s Mg
inφ φ
R λ
f1
φ Mg
Mg cos φ
Angle of repose (φ) = Angle of friction ( λ )
Motion of a Body on Rough Inclined Plane R (i) When the angle of inclination is greater than a angle of repose and the θ body is sliding down the sin g rough inclined plane with θ m some acceleration a, then a = g sin θ − µ k g cos θ
R (ii) When the angle of inclination α is less than angle of repose and the α body is pulled down the sin g m α plane with uniform P+ velocity by applying an external force P, then P = µ k mg cos α − mg sin α
µR θ mg cos θ mg
µR α mg cos α mg
76
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
(iii) When the angle of inclination is less than angle of repose and the block is pulled down with certain acceleration a, then force is P = µmg cos α − mg sin α + ma R a sin + α a
α
m
m
P+
µR
α mg cos α mg
(iv) Inclination may be greater than or less than the angle of repose, but the body is projected up the plane with some initial velocity. In this case, the net retardation acting on the body is given by R
P
a
θ sin g µR m + θ
θ mg cos θ mg
Motion of Car on Level Road • When a car of mass m is
turning on the level road without skidding, centripetal force on the car must be equal or less than static friction.
v
R α sin R µ m + α g
a
P
α mg cos α mg
P = mg sin α + (µ k mg cos α ) + ma
mg
[ω → coefficient of friction]
µg ≥
mv 2max r
or v max ≤ µ. rg
v max = µrg
Motion of a Car on Banked Road • Maximum velocity of car on banked road is given by
µ + tan θ v max = rg 1 − µ tan θ R R cos θ θ
R sin θ O
mg cos α
P = mg sin α − µ k mg cos α (vi) Force required to pull the body up the plane with constant acceleration
r
∴ Maximum velocity on a curved road to avoid skidding is
P
mg
F
mv 2max r
F
α sin g µR m + α
O
F≥
i.e.
a = g sin θ + µ k g cos θ (v) Force required to pull the body up the plane with constant velocity R
R
θ
mg
R
R cos θ
A A Outer θ F cos θ edge R sin θ θ raised F F sin θ X B O θ mg
where, θ = inclination of road and
r = radius of turn.
If µ = 0, then
v = rg tan θ
Bending of Cyclist on Banked Road In order to take circular turn of radius r with speed v, the cyclist should bend himself through an angle θ from v2 vertical direction such that tan θ = . rg
Topical Practice Questions All the exam questions of this chapter have been divided into 7 topics as listed below Topic 1 — NEWTON’S LAWS OF MOTION
77–80
Topic 2
—
CONSERVATION OF LINEAR MOMENTUM AND IMPULSE
80–83
Topic 3
—
EQUILIBRIUM OF FORCES
84–87
Topic 4
—
MOTION OF CONNECTED BODIES
88–94
Topic 5
—
FRICTION AND ITS LAWS
95-98
Topic 6
—
MOTION ON ROUGH SURFACES (PLANE & INCLINED)
99-103
Topic 7
—
DYNAMICS OF CIRCULAR MOTION
104-107
77
LAWS OF MOTION
Topic 1 Newton’s Laws of Motion 2019 1 Assertion A glass ball is dropped on concrete floor can easily get broken compared if it is dropped on wooden floor. Reason On concrete floor, glass ball will take less time to come to rest. [AIIMS] (a) Both Assertion and Reason are true and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are true, but Reason is not the correct explanation of Assertion. (c) Assertion is true but Reason is false. (d) Both Assertion and Reason are false.
2018 2 Sand is being dropped on a conveyor belt at the rate of M kgs −1 . The force necessary to keep the belt moving with a constant velocity is v ms −1 will be
(a) Mv newton Mv newton (c) 2
Reason A reference frame in which Newton’s laws of motion are applicable is non-inertial. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. (e) Assertion is incorrect but Reason is correct.
7 An object of mass 10 kg moves at a constant speed of 10 m/s. A constant force that acts for 4 s on the object, gives it a speed 2 m/s in opposite direction. The force acting on the object is [WB JEE] (a) – 3N (b) – 30 N (c) 3 N (d) 30 N
2011 8 Diwali rocket is ejecting 50 g of gases/s at a velocity of 400 ms −1 . The accelerating force on the rocket will be
(b) 2 Mv newton
[RPMT]
(d) zero
(a) 22 dyne
2014 3 A balloon with mass m is descending down with an
acceleration a (where, a < g). How much mass should be removed from it so that it starts moving up with an acceleration a? [CBSE AIPMT] 2 ma 2 ma ma ma (d) (a) (b) (c) g+a g−a g+a g−a
4 The linear momentum of a particle varies with time t as p = a + bt + ct 2 . Then, which of the following is correct? [EAMCET ]
(a) Velocity of particle is inversely proportional to time (b) Displacement of the particle is independent of time (c) Force varies with time in a quadratic manner (d) Force is dependent linearly on time
5 The rate of mass of the gases emitted from rear of a rocket is initially 0.1 kgs −1 . If the speed of the gas relative to the rocket is 50 ms −1 and mass of the rocket is 2 kg, then the acceleration of the rocket (in ms −2 ) is [J&K CET] (a) 5 (b) 5.2 (c) 2.5 (d) 25
2013 6 Assertion The driver in a vehicle moving with a constant speed on a straight road is in a non-inertial frame of reference.
(b) 20 N
(c) 20 dyne
(d) 100 N
9 A rocket of mass 1000 kg is to be projected vertically upwards. The gases are exhausted vertically downwards with velocity 100 ms −1 with respect to the rocket. What is the minimum rate of burning of fuel, so as to just lift the rocket upwards against the gravitational attraction? (Take,g = 10 ms −2 ) [AMU] (a) 50 kgs −1 (b) 100 kgs −1 (c) 200 kgs −1 (d) 400 kgs −1 10 In a non-inertial frame, the second law of motion is written as [DUMET] (a) F = ma (b) F = ma + Fp (d) F = 2 ma (c) F = ma − Fp where, Fp is pseudo-force while a is the acceleration of the body relative to the non-inertial frame.
2010 11 A 5000 kg rocket is set for vertical firing. The exhaust
speed is 800 ms −1 . To give an initial upward acceleration of 20 ms −2 , the amount of gas ejected per second to supply the needed thrust will be [JCECE] (a) 137.5 kgs −1 (b) 185.5 kgs −1 (c) 127.5 kgs −1 (d) 187.5 kgs −1
78
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
12 A force F1 of 500 N is required to push a car of mass 1000 kg slowly at constant speed on a levelled road. If a force F2 of 1000 N is applied, then the acceleration of the car will be [Manipal] (a) zero (b) 1.5 ms −2 (d) 0.5 ms −2 (c) 1 ms −2
17 Same force acts on two bodies of different masses 3 kg and 5 kg initially at rest. The ratio of times required to acquire same final velocity is [Kerala CEE] (a) 5 : 3 (b) 25 : 9 (c) 9 : 25 (d) 3 : 5 (e) 3 : 5 18 A body of mass 0.1 kg attains a velocity of 10 ms −1 in 0.1 s. The force acting on the body is [RPMT] (a) 10 N (b) 0.01 N (c) 0.1 N (d) 100 N
−1
13 A ball of mass 0.5 kg is moving with a velocity of 2 ms . It is subjected to a force of x newton in 2 s. Because of this force, the ball moves with a velocity of 3 ms −1 . The value of x is [Manipal] (a) 5 N (b) 8.25 N (c) 0.25 N (d) 1 N
2009 14 A ball hits a vertical wall horizontally at 10 m/s and
19 Which motion does not require force to maintain it? (a) Uniform circular motion [Harayana PMT] (b) Elliptical motion (c) Uniform straight line motion (d) Projectile motion
bounces back at 10 m/s, then [UP CPMT] (a) there is no acceleration because 10 m/s – 10 m/s = 0. (b) there may be an acceleration because its initial direction is horizontal. (c) there is an acceleration because there is a momentum change. (d) even though there is no change in momentum, there is a change in direction. Hence, it has an acceleration.
20 A machine gun is mounted on a 200 kg vehicle on a horizontal smooth road (friction negligible). The gun fires 10 bullets/s with a velocity of 500 ms −1 . If the mass of each bullet of 10 g, what is the acceleration produced in the vehicle? [BHU] (a) 25 cm s −2 (b) 30 cm s −2 (c) 50 cm s −2 (d) 50 cm s −2
2008 15 A body of mass 2 kg has an initial velocity of 3 ms −1 along
2005 21 The mass of a ship is 2 × 107 kg. On applying a force of 25 × 105 N, it is displaced through 25 m. After the displacement, the speed acquired by the ship will be
OE and it is subjected to a force of 4 N in a direction perpendicular to OE. The distance of body from O after 4 s will be [Manipal] t=4s s Acceleration = a 2 O
(a) 12 m (c) 8 m
s
(a) 12. 5 ms −1
(b) 5 ms −1
(c) 3.7 ms −1
(d) 2.5 ms −1
[RPMT]
22 A ball of mass m moves with speed v and it strikes normally with a wall and reflected back normally. If its time of contact with wall is t, then find force exerted by ball on the wall. [BCECE] 2 mv mv (a) (b) t t mv (c) mvt (d) 2t
s1 v = 3 ms–1, t = 4 s E
(b) 20 m (d) 48 m
2007 16 When a car moves on a road with uniform speed of
30 kmh −1 , then the net resultant force on the car is [BHU] (a) the driving force, drives the car in the direction of propagation of car. (b) the resistive force, acts opposite to the direction of propagation of car. (c) zero (d) None of the above
23 A gun fires N bullets per second, each of mass m with velocity v. The force exerted by the bullets on the gun is [J&K CET]
mv (b) N mv 2 (d) N
(a) vNm (c) mvN 2
Answers 1 11 21
(a) (d) (d)
2 12 22
(a) (d) (a)
3 13 23
(a) (c) (a)
4 14
(d) (c)
5 15
(c) (b)
6 16
(d) (c)
7 17
(b) (e)
8 18
(b) (a)
9 19
(b) (c)
10 20
(c) (a)
79
LAWS OF MOTION
Explanations 1 (a) Force exerted by concrete floor is
2
more as compared to wooden floor due to greater change in momentum. Since on concrete floor, glass ball will take less time to come to rest, so a glass ball is dropped on concrete floor can easily get broken compared to if it is dropped on wooden floor. Hence, both Assertion and Reason are true and Reason is the correct explanation of Assertion. d (mv ) (a) Force required, F = dt dm = v dt As velocity v is constant, hence F = Mv newton dm ∴ given, M = dt
3 (a) When the balloon is descending down with an acceleration a, mg − B = ma …(i) B a where, B = buoyant mg force. Here, we should assume that while removing some mass the volume of balloon and hence buoyant force will not change. Let the new mass of the balloon is m′, so …(ii) B − m′ g = m′ a On solving Eqs. (i) and (ii), we get mg − m′ g = ma + m′ a ⇒ m(g − a) = m′ (g + a) m(g − a) m′ = g+a So, mass removed, ∆m = m − m′ (g − a) = m 1 − (g + a) g + a − g + a =m g+a =
2ma g+a
4 (d) Given, p = a + bt + ct 2 Differentiating with respect to t (time), we get dp = 0 + b + 2ct dt
5
From Newton’s second law of motion, dp F∝ dt ⇒ F ∝ t, force is dependent linearly on time. ∆v v ∆m (c) As, a = = ⋅ ∆t m ∆t F 1 ∆p v ∆m = Q a = = m m ∆t m ∆t ⇒
a=
50 × 0.1= 2.5 ms−2 2
6 (d) A frame (vehicle) which moving with constant speed, i.e. acceleration = 0 is an inertial frame of reference and Newton’s laws of motion are applicable in it Hence, option (d) is correct.
7 (b) From the first equation of motion, v = u + at v − u = at v−u ⇒ a= t Given, u = 10 m / s, v = − 2 m / s and t = 4 s. − 2 − 10 a= = − 3 m/s2 4 So, force acting on the object F = ma = 10 × (− 3) = − 30 N ⇒
8 (b) The accelerating force on the rocket = upward thrust =
∆m ⋅v ∆t
∆m = 50 × 10−3 kgs−1 and ∆t v = 400 ms−1 So, accelerating force Given,
= 50 × 10−3 × 400 = 20 N
9 (b) The velocity of exhaust gases with respect to the rocket = 100 ms−1 The minimum force on the rocket to lift it Fmin = mg = 1000 × 10 = 10000 N Hence, minimum rate of burning of fuel is given by dm Fmin 10000 = = dt v 100 = 100 kgs−1
10 (c) In a non-inertial frame, the second
law of motion is written as F = ma − Fp
where, Fp is the pseudo force while a is the acceleration of the body relative to non-inertial frame.
11 (d) By Newton’s second law, we have ∆v ∆m ⇒ F = v − ∆t ∆t ∆m Hence, we have v = m (a + g ) ∆t [∴ anet = (a + g )] Here, mass of the rocket, m = 5000 kg
F = ma = m
Exhaust speed, v = 800 ms−1 Acceleration, a = 20 ms−2 Putting these values in the above equation, ∆m ⇒ × 800 = 5000 (10 + 20) ∆t ∆m 5000 × 30 = ∴ ∆t 800 = 187 . 5 kgs−1
12 (d) We know that a force of 500 N does not produce any acceleration as it pushes the car slowly at constant speed. Out of 1000 N force, only 500 N produces acceleration, thus acceleration produced, force 500 a= = = 0.5 ms−2 mass 1000
13 (c) For a body of mass m on applying
a force F for a time ∆t, the body suffers a velocity change ∆v, then ∆v F = ma = m ∆t …(i) ⇒ F∆t = m∆v So, we have F = x N, ∆t = 2s, v1 = 2 ms−1
⇒
v2 = 3 ms−1 , m = 0.5 kg
Substituting these values in Eq. (i), we get 0.5 x= = 0.25 N ⇒ 2
14 (c) As the ball bounces back with the same speed, so change in momentum, ∆p = 2 mv Also, we know that force = rate of change of momentum. So, force will act on the ball. So, there is an acceleration.
80
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
mv ⇒t ∝ m F (Q Final velocity and force are same) Given, m1 = 3 kg, m2 = 5 kg t1 m1 Hence, = t2 m2 t1 3 = ⇒ t2 5 ⇒
15 (b) The acceleration of the body perpendicular to OE is a A s2
s
O
E s1, t=4s v=3ms–1
F 4 = = 2 ms−2 m 2 Displacement along OE, a=
s1 = vt = 3 × 4 = 12 m Displacement perpendicular to OE, i.e. along OA 1 1 s2 = at 2 = × 2 × (4 )2 = 16 m 2 2 The resultant displacement s = s12 + s22 = 144 + 256 = 20 m
16 (c) The external force on the body always produces some acceleration in the object. This implies that there is a variable speed. As speed of car (object) is uniform, so there will be no net force on the car.
18
Now, force = change in momentum in 1s = 5 × 10 = 50 N 50 Hence, acceleration = ms−2 200
t=
= 25 cm s−2
21 (d) According to the Newton’s second law of motion, F = ma F 25 × 105 or a= = m 2 × 107 = 12.5 × 10−2 ms−2
∆v (a) As, F = ma = m × ∆t Hence, by putting the values 10 = 01 = 10 N . × 01 .
The relation for final velocity is
19 (c) When body is moving uniformly along a straight line and there is no force of friction, acceleration/retardation on the body, a=0 ∴ F = ma = 0 i.e. no external force is required.
v 2 = u2 + 2as ⇒ ∴
20 (a) Momentum carried by each bullet
dp mv F= = dt t
= Mv = 0.010 × 500 kg - ms−1 = 5 kg - ms−1
v = 6.25 = 2.5 ms−1
22 (a) Initial velocity of ball = v
For accelerated motion, force is necessary. In uniform circular motion, elliptical motion and projectile motion direction of velocity changes due to which force is imposed.
17 (e) From Newton’s second law,
v 2 = 0 + 2 × (12.5 × 10−2 ) × 25
23
When it strikes the wall normally and reflected back, then final velocity = − v Change in velocity = v − (− v ) = 2v Force exerted by the ball on the wall is given by Newton’s second law, i.e., m∆v m(2v ) 2mv F = ma = = = ∆t t t ∆p Nm (v − u) (a) As, F = = ∆t ∆t = Nmv (as u = 0 and ∆t = 1s)
Topic 2 Conservation of Linear Momentum and Impulse 2019 1 A gun applies a force F on a bullet which is given by F = (100 − 0.5 × 105 t ) N. The bullet emerges out with speed 400 m/s. Then, find out the impulse exerted till force on bullet becomes zero. [AIIMS] (a) 0.2 N-s (b) 0.3 N-s (c) 0.1 N-s (d) 0.4 N-s
2 Assertion Even though net external force on a body is zero, momentum need not to conserved. Reason The internal interaction between particles of a body cancels out momentum of each other. [AIIMS] (a) Both Assertion and Reason are true and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are true, but Reason is not the correct explanation of Assertion. (c) Assertion is true, but Reason is false. (d) Both Assertion and Reason are false.
81
LAWS OF MOTION
2018 3 A force of 10N acts on a body of mass 0.5 kg for 0.25s starting from rest. What is its impulse? (c) 0.5 N-s
[JIPMER]
(d) 0.75 N-s
2016 4 A rigid ball of mass m strikes a rigid wall at 60° and gets reflected without loss of speed as shown in the figure. The value of impulse imparted by the wall on the ball will be [NEET] v
v
(c) mv/ 2
(d) mv/ 3
2014 5 The force F acting on a particle of mass m is indicated by the force-time graph shown below. The change in momentum of the particle over the time interval from zero to 8 s is [CBSE AIPMT] 6
F(N)
3 0
2
4
–3
(a) 24 N-s
6
8
t(s)
(b) 20 N-s
(c) 12 N-s
(d) 6 N-s
2012 6 A stone is dropped from a height h. It hits the ground with a
[CBSE AIPMT]
F
4 8
t
–2
(a) 8 N-s
(b) 4π N-s
14 16
(c) 1.6 N-s
(d) 0.2 N-s
(c) 2π N-s
F(N) 20 10 0
2
4
6
10 t (s)
The velocity of the particle after 10 s is (b) 10 ms −1 (a) 20 ms −1 −1 (d) 50 ms −1 (c) 75 ms (e) 26 m / s
[Kerala CEE]
11 The object at rest suddenly explodes into three parts with the mass ratio 2 : 1: 1. The parts of equal masses move at right angles to each other with equal speeds. The speed of the third part after the explosion will be [EAMCET] (a) 2v (b) v/ 2 (c) v/ 2 (d) 2v
2006 12 A 0.5 kg ball moving with a speed of 12 ms −1 strikes a hard wall at an angle of 30° with the wall. It is reflected with the same speed and at the same angle. If the ball is in contact with the wall for 0.25 s, the average force acting on the wall is [BHU] (a) 48 N (b) 24 N (c) 12 N (d) 96 N
13 Impulse is [J&K CET] (a) a scalar (b) equal to change in the momentum of a body (c) equal to rate of change of momentum of a body (d) a force
2
6
(b) 0.8 N-s
10 12
°
7 The force-time (F-t) graph for linear motion of a body initially at rest is shown in figure. The segments shown are circular, the linear momentum gained in 4 s is
2
8 t (s)
30
certain momentum p. If the same stone is dropped from a height 100% more than previous height, the momentum when it hits the ground will change by [CBSE AIPMT] (a) 68% (b) 41% (c) 200% (d) 100%
0
6
4
2
10. A particle of mass 2 kg is initially at rest. A force acts on it whose magnitude changes with the time. The force-time graph is shown below.
60°
(b) 2mv
0
(a) 0.4 N-s
60°
(a) mv
2 x (m)
°
m
one-dimensional motion of a body of mass 0.4 kg. The magnitude of each impulse is [AIEEE]
30
(a) 0.25 N-s (b) 2.5 N-s
2008 9. The figure shows the position-time (x-t) graph of
(d) 8π N-s
8 A bullet of mass 10 g is fired from a gun of mass 1 kg with recoil velocity of gun 5 m/s. The muzzle velocity will be (a) 30 km/min (b) 60 km/min [Manipal] (c) 30 m/s (d) 500 m/s
14 A disc of mass 100 g is kept floating horizontally in air by firing bullets, each of mass 5 g with the same velocity at the same rate of 10 bullets per second. The bullets rebound with the same speed in opposite direction. The velocity of each bullet at the time of impact is [AMU] (a)196 cm s −1 (b) 9.8 cm s −1 (c) 98 cm s −1 (d) 980 cm s −1
82
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2005 16 A bullet of mass 0.1 kg is fired with a speed of 100 ms −1 . The mass of gun being 50 kg. Then, the velocity of recoil becomes [Punjab PMET] (b) 0.5 ms −1 (a) 0.05 ms −1 (d) 0.2 ms −1 (c) 0.1 ms −1
15 In the figure given, the position-time graph of a particle of mass 0.1 kg is shown. The impulse at t = 2s is [AIIMS] 6 x (m)
4 2 2
4 t (second)
17 A force of 10 N acts on a body of mass 20 kg for 10 s. The magnitude of impulse is [AMU] −1 −1 (b) 100 kg - ms (a) 50 kg - ms (c) 300 kg - ms −1 (d) 1000 kg - ms −1
6
(a) 0.2 kg - ms −1
(b) − 0.2 kg - ms −1
(c) 0.1 kg - ms −1
(d) − 0.4 kg - ms −1
Answers (c) (b)
1 11
(d) (b)
2 12
3 13
(b) (b)
4 14
(a) (d)
5 15
(c) (a)
6 16
(b) (d)
7 17
(c) (b)
(d)
8
9
(b)
10
(d)
Explanations i.e. F ext = 0, then momentum of the system remains conserved. The internal interaction between particles of a body do not contribute to change in total momentum of body. Hence both Assertion and Reason are false.
1 (c) Force applied by gun, 5
F = (100 − 0.5 × 10 t ) N Speed of bullet, v = 400 m/s, When F = 0, then 5
100 − 0.5 × 10 t = 0 t = 2 × 10−3 s
⇒
3 (b) Given, F = 10N, vi = 0, m = 0.5 kg
Impulse, I = ∫ Fdt
and ∆t = 0.25 s As impulse, J = pf − pi
2 × 10−3
=
∫
(100 − 0.5 × 105 t ) dt
−3
= 100 × 2 × 10
−3
2 × 10
4 5
0.5 × 10 − 2 × 4 × 10−6 − 0
= 0.2 − 01 . = 01 . N-s
2 (d) By Newton’s second law of motion, net external force applied on a system is equal to rate of change of momentum. dp i.e. Fext = dt If F ext = 0, then dp =0 dt ⇒
p = constant.
So, total change in momentum for 0 to 8 s ∆pnet = ∆p1 + ∆p2 + ∆p3 = (+ 6 − 6 + 12) = 12 kg -m/s = 12 N-s
6 (b) Velocity, v = 2gh
= mv cos 60°− (− mv cos 60° ) = 2mv cos 60° 1 = 2mv × = mv 2
5 (c) The area under F-t graph gives the change in momentum. For 0 to 2 s, 1 ∆p1 = × 2× 6 = 6kgms −1 2 For 2 to 4 s, ∆p2 = 2 × (− 3) = − 6 kg - ms−1
…(i)
and momentum, p = mv …(ii) From Eqs. (i) and (ii), we have p∝ h
Also,
0
t2 = 100t − 0.5 × 105 ⋅ 2
J = F ⋅ ∆t = 10 × 0.25 = 2.5 = 2.5 N-s (a) As we know that, impulse is imparted due to change in perpendicular components of momentum of ball. J = ∆p = mv f − mvi
For 4 to 8 s, ∆p3 = (4) × 3 = + 12 kg - ms−1
h2 h1 100 h2 = h + h × = 2h 100 p2 2h = = 2 p1 h
Here, ⇒ ∴
p2 = p1
⇒
p2 = 1. 414 p1 p − p1 × 100 % change = 2 p1 1.414 p1 − p1 = × 100 p1 0.414 p1 = × 100 = 41% p1
7 (c) Linear momentum gained from 0 to 4s = Area enclosed by graph from 0 to 4 s πr2 π (2)2 = 2π N-s = = 2 2
83
LAWS OF MOTION
Given,
10 m1 = 10 g = kg, 1000
m2 = 1 kg and v2 = −5 m/s. ∴ Velocity of muzzle, + 1× 5 v1 = = 500 m/s 10/1000
9 (b) From the graph, it is a straight line
10. (d) As we know, area under the F - t curve or
or or or
= change in momentum 1 × 2 × (10) + 2 × 10 2 1 1 + (10 + 20) × 2 + × 4 × 20 2 2 = m (v − u) 10 + 20 + 30 + 40 = 2(v − 0) 100 = 2v v = 50 m s−1
11 (b) Let the speed of the third part be v3. Applying the law of conservation of momentum, we have
⇒
p12 p12
+ +
p22 p22
=p = p2
⇒
m2v 2 + m2v 2 = 4 m2v32
⇒
2m2v 2 = 4 m2v32, v v3 = 2
⇒
12 (b) The vector OA represents the momentum of the object before the collision and the vector OB that after the collision. B
OB sin 30° 60°
13 (b) The product of impulsive force and time for which it acts is called impulse i.e. J = F∆t = m∆v = change in momentum of the body. It is a vector quantity.
14 (d) From the law of conservation of momentum, total momentum of bullets = momentum of disc i.e. 2m′ vn = mg where, m′ = mass of the bullet and m = mass of the disc ∴
°
Impulse J = pf − pi = − 0.4 − 0.4 = − 0.8 N-s ∴ | J | = 0.8 N-s
⇒ (m × v )2 + (m × v )2 = (2m × v3 )2
30
so it represents uniform motion. Because of impulse direction of velocity changes as can be seen from the slope of the graph. 2 Initial velocity, v1 = = 1ms−1 2 −2 Final velocity, v2 = = − 1ms−1 2 Hence, pi = mv1 = 0.4 N-s and pf = m v2 = − 0.4 N-s
(m1v1 )2 + (m2v2 )2 = (m3v3 )2
15 (a) The impulse is given by
The vector AB represents the change in momentum of the object ∆p. As the magnitude of OA and OB are equal, the components of OA and OB along the wall are equal and in the same direction, while those perpendicular to the wall are equal and opposite. Thus, the change in momentum is only due to the change in direction of the perpendicular components. Hence, ∆p = OB sin 30° − (− OA sin 30° ) = mv sin 30° − (− mv sin 30° ) = 2 mv sin 30° This time rate of change of momentum will appear in the form of average force acting on the wall. ∴ F × t = 2 mv sin 30° 2mv sin 30° or F= t Given, m = 0.5 kg, v = 12 ms−1 , t = 0 . 25 s, θ = 30° 2 × 0 . 5 × 12 × sin 30° Hence, F = 0 .25 = 24 N
mg 100 × 980 = 2m′ n 2 × 5 × 10
= 980 cm s−1 I = change in momentum = ∆p = m∆v ∆x =m ∆t
OA sin 30°
A
v=
O
60°
°
gives m1v1 + m2v2 = 0 m1v1 = − m2v2 − m2v2 ⇒ v1 = m1
⇒
30
8 (d) Conservation of linear momentum
1 sin 30° = 2
Given, m = 01 . kg, ∆x 4.0 −1 = ms ∆t 2 4 I = 0.1 × 2 = 0.2 kg- ms−1
16 (d) From the law of conservation of
momentum, total initial momentum = final momentum
⇒
m1u1 + m2u2 = m1v1 + m2v2
∴ 0.1 × 0 + 50 × 0 = 0.1 × 100 + 50 (− v2 ) ⇒ ∴
0 = 10 − 50v2 v2 =
10 = 0.2 ms−1 50
17 (b) The impulse of the body is given by J = F × ∆t = 10 × 10 = 100 kg-ms−1
84
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 3 Equilibrium of Forces 2019 1 A truck is stationary and has a bob suspended by a light
2012 4 In the figure given, the system is in equilibrium. What is the
string, in a frame attached to the truck. The truck, suddenly moves to the right with an acceleration of a. The pendulum will tilt [NEET (Odisha) ] (a) to the left and the angle of inclination of the g pendulum with the vertical is sin −1 a (b) to the left and angle of inclination of the pendulum a with the vertical is tan −1 g (c) to the left and angle of inclination of the pendulum a with the vertical is sin 1− g (d) to the left and angle of inclination of the pendulum g with the vertical is tan −1 a
maximum value that w can have if the friction force on the 40 N block cannot exceed 12.0 N? [AMU]
2 A particle moving with velocity v is acted by three forces shown by the vector triangle PQR. The velocity of the particle will [NEET]
40 N
w
(a) 3.45 N (c) 10.35 N
Q
(a) decrease (b) remain constant (c) change according to the smallest force QR (d) increase
2011 5 Two forces in the ratio1: 2 act simultaneously on a particle. The resultant of these forces is three times the first force. The angle between them in [Kerala CEE] (a) 0° (b) 60° (c) 90° (d) 45° (e) 30°
2008 7 Three forces acting on a body are shown in the figure. To
2018 3 A mass M is hung with a light inextensible string as shown
have the resultant force only along the y-direction, the magnitude of the minimum additional force needed is [CBSE AIPMT] y
in the figure. Find the tension of the horizontal string.
4N
B A
P
60°
2N
Mg
2 Mg
(b) 3 Mg
1N 30°
30° T1
M
(a)
(b) 6.92 N (d) 12.32 N
6 The resultant of two forces acting at an angle of 120° is 10 kg-wt and is perpendicular to one of the forces. That force is [KCET] (a) 10 3 kg-wt (b) 20 3 kg-wt 10 (c) 10 kg-wt (d) kg -wt 3
P
R
30°
[JIPMER]
(c) 2 Mg
(d) 3 Mg
(a) 0.5 N 3 (c) N 4
(b) 1.5 N (d) 3 N
x
85
LAWS OF MOTION
8 Two equals forces are acting at a point with an angle of 60° between them. If the resultant force is equal to 40 3 N, the magnitude of each force is [Kerala CEE] (a) 40 N (b) 20 N (c) 80 N (d) 30 N (e) 10 N
13 If a street light of mass M is suspended from the end of a uniform rod of length L in different possible patterns as shown in figure, then [AIIMS] Cable
(A)
9 A body of mass 60 kg suspended by means of three strings, P , Q and R as shown in the figure is in equilibrium. The tension in the string P is [Kerala CEE] 30° R 90° P
3/4
(C) 1/2
14 Two particles of equal mass are connected to a rope AB of negligible mass, such that one is at end A and the other dividing the length of the rope in the ratio 1: 2 from B. The rope is rotated about end B in a horizontal plane. Ratio of the tensions in the smaller part to the other is (ignore effect of gravity) [J&K CET] (a) 4 : 3 (b) 1: 4 (c) 1: 2 (d) 1: 3
Q M = 60 kg
(a) 130.9 g N (c) 50 g N (e) 100 g N
(B)
(a) pattern A is more sturdy (b) pattern B is more sturdy (c) pattern C is more sturdy (d) all will have same sturdiness
Rod
Wall
Cable
Cable
(b) 60 g N (d) 103.9 g N
10 A body is under the action of two mutually perpendicular forces of 3 N and 4 N. The resultant force acting on the body is [J&K CET] (a) 7 N (b) 1 N (c) 5 N (d) zero (e) 10 N 11 A 100 kg gun fires a ball of 1 kg horizontally from a cliff of height 500 m. It falls on the ground at a distance of 400 m from the bottom of the cliff. The recoil velocity of the gun is (take, g = 10 ms −2 ) [AMU] (a) 0.2 ms −1 (b) 0.4 ms −1 (c) 0.6 ms −1 (d) 0.8 ms −1
15 A weight w is suspended from the mid-point of a rope, whose ends are at the same level. In order to make the rope perfectly horizontal, the force applied to each of its ends must be [AMU] (a) less than w (b) equal to w (c) equal to 2w (d) infinitely large
2005 16 The below figure is the part of a horizontally stretched net. Section AB is stretched with a force of 10 N. The tensions in the sections BC and BF are [KCET] E 150°
150° D
2006 12 An explosion breaks a rock into three parts in a horizontal
120° G
plane. Two of them go off at right angles to each other. The first part of mass 1 kg moves with a speed of 12ms −1 and the second part of mass 2 kg moves 8 ms −1 speed. If the third part flies off with 4ms −1 speed, then its mass is (a) 3 kg (b) 5 kg (c) 7 kg (d) 17 kg
C
90°
F
B 120°
120° A
(a) 10 N, 11 N (b) 10 N, 6 N (c) 10 N, 10 N (d) cannot be calculated due to insufficient data
Answers 1 11
(b) (b)
2 12
(b) (b)
3 13
(b) (a)
4 14
(b) (d)
5 15
(a) (d)
6 16
(d) (c)
7
(a)
8
(a)
9
(d)
10
(c)
86
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (b) As the truck move to the right, so the bob will move to the left due to inertia of rest with acceleration a.
be T1 and T2 respectively. For vertical equilibrium of P, B
Thus, the given situation can be drawn as a
⇒
30° 60° T2 P
A
7 (a) Minimum additional force needed
T1
a
x 1 = 3 10 10 kg-wt x= 3
⇒
y
4N
1N
30°
M
60°
(a)
Mg
ma
θ mg sin θ
mg (b)
Now from equilibrium of forces in above digram (b), we get ma cosθ = mg sin θ sin θ ma = ⇒ cos θ mg The tangent angle is ma tanθ = mg
Substituting the value of T2 from Eq. (i), T1 = (2Mg ) × ( 3 / 2 ) = 3 Mg
4 (b) For equilibrium at point p, T = T ′ cos 30° and T ′ sin 30° = w T = µR = 12 N ∴
12 = T ′ cos 30° 12 × 2 24 = T′ = 3 3
⇒
−1
a θ = tan g
⇒
T′ sin 30° P T
40
30° T′ 30°
by three sides of a triangle taken in order, then they will be in equilibrium.
w
As, T ′ sin 30° = w 24 1 w= × = 6.92 N ⇒ 3 2
P
5 (a) Suppose, the forces are of R
Q
⇒ Fnet = FPQ + FQR + FRP = 0 Fnet = m × a dv =m =0 dt dv ⇒ =0 dt or v = constant So, the velocity of particle remain constant.
3 (b) As there is a load at P, so tension in AP and PB will be different. Let these
magnitude F and 2F, then the resultant of these forces is 3F = F + 2F As,
R 2 = P 2 + Q 2 + 2PQ cos θ
So,
9F 2 = F 2 + 4 F 2 + 4 F 2 cos θ
⇒
cos θ = 1
⇒
F = − (Fresultant )x Fresultant = [(4 − 2)(cos 30$j − sin 30i$ ) + (cos 60i$ + sin 60$j)] 3 $ 1 $ 1 $ 3 $ j − i + i + j = 2 2 2 2 2 3 $ $ $i = 3 + j + − i + 2 2 $i 1 3 3$ 3 3 $ = − $i + j j = − + 2 2 2 2 $i ⇒ Fx = − 2 Hence, | F | = 0.5 N
T′ cos 30°
2 (b) As the three forces are represented
2N
8 (a) Let equal forces F1 = F2 = F newton Angle between the forces, θ = 60° Resultant force, R = 40 3 N Now, R = F12 + F22 + 2F1F2 cos θ ∴ 40 3 = F 2 + F 2 + 2FF cos 60° ∴ 40 3 = 2F 2 + 2F 2 ×
1 2
1 ⇒ 40 3 = 3F ⇒ Q cos 60° = 2 ⇒
F = 40 N
9 (d) The free body diagram of mass M is shown in figure.
θ = 0°
6 (d) The figure can be drawn as below F3
Here,
F2 120° 30°
R cos 60°
F1
1 tan 30° = 3
°
⇒
θ
θ
T2 cos 60° = Mg i.e., …(i) T2 = 2 Mg and for horizontal equilibrium of P, T1 = T2 sin 60° = T2 ( 3 / 2 )
60
ma cos θ
T
R R sin 60°
M
60 kg
87
LAWS OF MOTION
Taking component of forces R cos θ = Mg ⇒ R cos 60° = Mg and R sin 60° = T
...(i) ...(ii)
By Eqs. (i) and (ii), we get T ⇒ tan 60° = Mg ⇒
T = Mg tan 60°
or
T = 60 × g × 3 = 103.9 gN
Negative sign shows that the direction of recoil of the gun is opposite to that of the ball.
14 (d) Let x be the distance from A to O and L the the total length of the string. Then, tension or ratio of moments is
12 (b) Linear momentum is conserved for such explosion due to internas forces. Hence, p1 + p2 + p3 = 0 (Q p = mv )
A m
v1=12 ms–1
=
1 kg
u=0
1 x
O
2
L
T1 m1 (L − x ) 3 − 2 1 = = = = T2 m2 L 3 3
15 (d) For equilibrium of body,
10 (c) The resultant force will be FR =
F12
+
F12
+
2F12
2T cos θ
v2=8 ms–1
F2 cos θ 2 kg
= 32 + 4 2 + 2 × 3 × 4 cos 90° =5N
∴
11 (b) Given, Mass of the gun, M = 100 kg Mass of the ball, m = 1kg height of the cliff, h = 500 m and g = 10 ms−2 Time taken by the ball to reach the ground is 2h t= g =
2 × 500 m 10 ms−2
= 10 s Horizontal distance covered = ut ∴ 400 = u × 10 where, u is the velocity of the ball, i.e. u = 40 ms−1 According to law of conservation of linear momentum, we get 0 = Mv + mu mu v=− M (1 kg)(40 ms−1 ) =− 100 kg = −0.4 ms−1
B
m
⇒
m=? T
v3=4 ms–1
1 × 12 i$+ 2 × 8$j+p3 = 0 12 $i+16 $j+ p = 0 p3 = − (12 i$ + 16$j) 2
∴
p3 = (12) + (16)
⇒ 2
= 144 + 256 = 20kg-ms −1 p3 = m3v3 20 p m3 = 3 = = 5 kg v3 4
Now, ⇒
13 (a) For equilibrium of street light, net torque on rod should be zero. mg × x = T × y mgx or T = y T
w = 2T cos θ w T = 2 cos θ
For the string to be horizontal, θ = 90° w ∴ T = ⇒ T =∞ 2 cos 90°
16 (c) As shown in figure C
T1 cos 30°
T1 30° 90°
T1 sin 30° F T2 sin 30° T2 30° B T2 cos 30° 90° 10 N A
T1 cos 30° = T2 cos 30° mg
y
T
w
3
⇒
θ θ
x
For T to be minimum, y should be maximum. Hence, pattern A is more sturdy.
(let) ∴ T1 = T2 = T Again, T1 sin 30° + T2 sin 30° = 10 and 2T sin 30° = 10 1 ⇒ 2T ⋅ = 10 2 ⇒ T = 10 N Thus, the tension in section BC and BF are 10 N and 10 N respectively.
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 4 Motion of Connected Bodies 2018 1 In the figure, block A and B of masses 2mand mare connected with a string and system is hanged vertically with the help of a spring. Spring has negligible mass. Find out magnitude of acceleration of masses 2m and m just after the instant when the string of mass m is cut [AIIMS] g (a) g , g (b) g , 2 g g g (d) , (c) , g 2 2 2 9 2 In the figure, mass of a ball is times 5 mass of the rod. Length of rod is 1 m. The level of ball is same as rod level. Find out time taken by the ball to reach at upper end of rod. [AIIMS] (a) 1.4 s (c) 3.25 s
(b) 2.45 s (d) 5 s
5 Two masses 10 kg and 20 kg respectively are connected by a massless spring as shown in figure. A force of 200 N acts on the 20 kg mass. At the instant shown is figure, the 10 kg mass has acceleration of 12 m/ s 2 . The value of acceleration of 20 kg mass is [JIPMER] 10 kg
B m
T1
m
T2
m
T3
(d) 30 m/ s 2
A B C 4 kg, 2 kg and 1 kg respectively, are in contact on a frictionless surface, as shown in the figure. If a force of 14 N is applied on the 4 kg block, then the contact force between A and B is
(a) 2 N Rod
(b) 6 N
1 3 1 F , T2 = F , T3 = F 4 2 4 1 1 1 (b) T1 = F , T2 = F , T3 = F 4 2 2 3 1 1 (c) T1 = F , T2 = F , T3 = F 4 2 4 3 1 1 (d) T1 = F , T2 = F , T3 = F 4 2 2
(a) T1 =
[AIPMT] (d) 18 N
(c) 8 N
2014 7 A system consists of three
ball
m
4 Two blocks A and B of masses 3m and m respectively are connected by a massless and inextensible string. The whole system is suspended by a massless spring as shown in figure. The magnitudes of acceleration of A and B immediately after the string is cut, are respectively g g (a) g , (b) , g 3 3 g g (c) g , g (d) , 3 3
(b) 10 m/ s 2 (c) 20 m/ s 2
2015 6 Three blocks A , B and C of masses
by a force F on a smooth horizontal surface as shown in figure. The tension T1 , T2 and T3 will be [AIIMS] m
F 20 kg 200 N
(a) 4 m/ s 2
2017 3 Four blocks of same mass connected by strings are pulled
F
F
2m A
P
m2
m3
masses m1 , m2 and m3 connected by a string passing over a pulley P. The mass m1 hangs freely and m2 and m3 are m1 on a rough horizontal table (the coefficient of friction = µ). The pulley is frictionless and of negligible mass. The downward acceleration of mass [CBSE AIPMT] m1 is (assume, m1 = m2 = m3 = m) g (1 − gµ ) 2gµ (a) (b) 9 3 g (1 − 2µ ) g (1 − 2µ ) (d) (c) 3 2
8 The tension in the string in the pulley system shown in the figure is [JIPMER]
A
3m
B m
6 kg
[NEET] 10 kg
(a) 75 N (c) 7.5 N
(b) 80 N (d) 30 N
89
LAWS OF MOTION
9 Three identical blocks of masses m = 2 kg are drawn by a force 10.2 N on a frictionless surface. What is the tension (in N) in the string between the blocks B and C ? [UK PMT] 2kg
2kg
2kg
C
B
A
(a) 9.2 (c) 3.4
F
2008 14 Three blocks of masses m1 , m2 and m3 kg are placed in
contact with each other on a frictionless table. A force F is applied on the heaviest mass m1 , the acceleration of m3 will be [BHU] F
(b) 8 (d) 9.8
10 Three blocks with masses m, 2m and 3m are connected by strings as shown in the figure. After an upward force F is applied on block m, the masses move upward at constant speed v. What is the net force on the block of mass 2m? (g is the acceleration due to gravity) [NEET] F 2m
m
3m
(a)
F m1
(c)
F m2 + m3
m1
m2
m3
F m1 + m2 F (d) m1 + m2 + m3
(b)
15 Two blocks of masses 7 kg and 5 kg are placed in contact with each other on a smooth surface. If a force of 6 N is applied on the heavier mass, the force on the lighter mass is [Kerala CEE]
(a) Zero (c) 3 mg
2011 11 Two bodies of masses of 4 kg and 6 kg are tied to the ends of a massless string. The string passes over a frictionless pulley. The acceleration of the system is [Kerala CEE] g g g g (a) (b) (c) (d) 2 3 5 10 g (e) 4
12 Block A of mass 2 kg is placed over block B of mass 8 kg. The combination is placed over a rough horizontal surface. Coefficient of friction between B and the floor is 0.5. Coefficient of friction between the blocks A and B is 0.4. A horizontal force of 10 N is applied on the block B. The force of friction between the blocks A and B is ( g = 10 ms −2 ) [KCET] A 2 kg B 8 kg
(a) 100 N (c) 50 N
F
(b) 2 mg (d) 6 mg
10 N
(b) 40 N (d) zero
13 A man of mass 60 kg is riding in a lift. The weight of the man, when the lift is accelerating upwards and downwards at 2 ms −2 , are respectively (take, g = 10 ms −2 ) [AMU] (a) 720 N and 480 N (b) 480 N and 720 N (c) 600 N and 600 N (d) None of these
7 kg 5 kg
(a) 3.5 N (c) 7 N (e) 6 N
(b) 2.5 N (d) 5 N
16 Three blocks of masses 2 kg, 3 kg and 5 kg are connected to each other with a light string and are then placed on a frictionless surface as shown in the figure. The system is pulled by a force F = 10 N, then tension T1 is equal to 10 N
(a) 1 N (c) 8 N
2 kg
T1
3 kg
T2
[Kerala CEE]
5 kg
(b) 5 N (d) 10 N
17 A block of mass M is pulled along a horizontal frictionless surface by a rope of mass m. If a force P is applied at the free end of the rope, then the force exerted by the rope on the block is [RPMT] Pm Pm (a) (b) M +m M −m PM (c) P (d) M +m 18 A light spring balance changes from the block of the other light spring balance and a block of mass M kg hangs from the former one. Then, the correct statement about the scale reading is [RPMT] (a) Both the scales read M kg each (b) the scale of the lower one reads M kg and of the upper one zero (c) the readng of the two scales can be anything but the sum of the readings will be M kg (d) Both the scales read M / 2 kg
90
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
19 The apparent weight of a person inside a lift is w1 when lift moves up with a certain acceleration and is w 2 when lift moves down with same acceleration. The weight of the person when lift moves up with constant speed is [Punjab PMET] w1 + w 2 w1 − w 2 (b) (a) 2 2 (c) 2 w1 (d) 2 w 2 20 A 60 kg man stands on a spring scale in the lift. At some instant he finds, scale reading has changed from 60 kg to 50 kg for a while and then comes back to the original make. What should we conclude? [AFMC] (a) The lift was in constant motion upwards. (b) The lift was in constant motion downwards. (c) The lift while in constant motion upwards, is suddenly stopped. (d) The lift while in constant motion downwards, is suddenly stopped. 21 A man weight 80 kg. He stands on a weighing scale in a lift which is moving upwards with a uniform acceleration of 5 ms −2 . What would be the reading on the scale? ( take, g = 10 ms −2 ) [BHU] (a) 800 N (b) 1200 N (c) Zero (d) 400 N 22 A spring balance and a physical balance are kept in a lift. In these balances, equal masses are placed. If now the lift starts moving upwards with constant acceleration, then (a) the reading of spring balance will increase and the equilibrium position of the physical balance will disturb. [Punjab PMET] (b) the reading of spring balance will remain unchanged and physical balance will remain in equilibrium. (c) the reading of spring balance will decrease and physical balance will remain in equilibrium. (d) the reading of spring balance will increase and the physical balance will remain in equilibrium. 23 A body of mass 8 kg is suspended through two light springs X and Y connected in series as shown in figure. The readings in X and Y respectively are [Kerala CEE] X
Y 8 kg
(a) 8 kg, zero (c) 6 kg, 2 kg (e) 8 kg, 8 kg
(b) zero, 8 kg (d) 2 kg, 6 kg
2007 24 The coefficient of static friction, µ s between a block A of mass 2 kg and the table as shown in the figure is 0.2. What would be the maximum mass value of block B so that, the two blocks do not move? The string and the pulley are assumed to be smooth and massless ( Take, g = 10 ms −2 ) . 2 kg
A
B
(a) 2.0 kg (c) 0.2 g
(b) 4.0 kg (d) 0.4 kg
[Manipal]
25 Two masses m1 = 5 kg and m2 = 4.8 kg tied to a string are hanging over a light frictionless pulley. What is the acceleration of the masses, when system is free to move? ( Take, g = 9.8 ms −2 ) [MP PMT] (a) 0.2 ms −2 (c) 5 ms
−2
(b) 9.8 ms −2 (d) 4.8 ms
m2
m1
−2
26 A coin is dropped in a lift. It takes time t1 to reach the floor when lift is stationary. It takes time t 2 when lift is moving up with constant acceleration. Then, [Punjab PMET] (a) t 1 > t 2 (b) t 2 > t 1 (c) t 1 = t 2 (d) t 1 >> t 2 27 The mass of a lift is 500 kg. When it ascends with an acceleration of 2 ms −2 , the tension in the cable will be (Take, g = 10 ms −2 ). [JCECE] (a) 6000 N (b) 5000 N (c) 400 N (d) 1000 N
2006 28 In the given figure the pulley is assumed massless and frictionless. If the frictional force on the object of mass m is f, then its acceleration in terms of the force F will be equal to
F m
[JCECE]
(a) ( F − f )/ m
F (b) − f / m 2
(c) F / 2m
(d) None of these
2005 29 A heavy uniform chain lies on a horizontal top of table. If the coefficient of friction between the chain and the table is 0.25, then the maximum percentage of the length of the chain that can hang over one edge of the table is (a) 20% (b) 25% [Manipal] (c) 35% (d) 15%
91
LAWS OF MOTION
30 Three blocks of masses m1 , m2 and m3 are connected by massless strings as shown on a frictionless table. They are pulled with a force of 40 N. If m1 = 10 kg, m2 = 6 kg and [AMU] m3 = 4 kg, then tension T2 will be m1
T1
(a) 10 N
T2
m2
(b) 20 N
m3
31 A person is standing in an elevator. In which situation, he finds himself weightless? [AIIMS] (a) When the elevator moves upward with constant acceleration. (b) When the elevator moves downward with constant acceleration. (c) When the elevator moves upward with uniform velocity. (d) When the elevator moves downward with uniform velocity.
40 N
(c) 32 N
(d) 40 N
Answers 1 11 21 31
(c) (c) (b) (b)
2 12 22
(a) (d) (d)
3 13 23
(c) (a) (e)
4 14 24
(b) (d) (d)
5 15 25
(a) (b) (a)
6 16 26
(b) (c) (a)
7 17 27
(c) (d) (a)
8 18 28
(a) (a) (c)
(c) (a) (a)
9 19 29
10 20 30
(a) (c) (c)
Explanations 1 (c) When the system is in equilibrium, then the spring force is 3 mg. When the string is cut, then net force on block A = 3 mg − 2 mg = mg Hence, acceleration of block A at that instant mg g force on block A a= = = 2m 2 mass of block A When string is cut, then block B falls freely with an acceleration equal to g.
2 (a) Let a1 and a2 be accelerations of a ball (upward) and rod (downward), respectively. 2T
T
So, acceleration of ball w.r.t. rod = a1 + a2 = 3g / 29 Now, displacement of ball w.r.t. rod when it reaches the upper end of rod is 1m. Using equation of motion, 1 s = ut + at 2 2 1 3 × 10 2 s=0+ × t 2 29 t = 58/ 30 = 14 . s (approx)
3 (c) Given situation can be represented as, F ← m1 → T1 ← m2 → T2 ← m3 → T3 ← m4 T1 =
a1
a2
9 mg 5
(m2 + m3 + m4 ) F m1 + m2 + m3 + m4
m1 = m2 = m3 = m4 = m 3 T1 = F ∴ 4 (m3 + m4 )F Similarly, T2 = m1 + m2 + m3 + m4 Given,
mg
Clearly, from the diagram 2 a1 = a2 …(i) Now, for the ball 9 9 …(ii) 2T − mg = ma1 5 5 and for the rod, mg − T = ma2 …(iii) On solving Eqs. (i), (ii) and (iii), we get g m/s 2 ↑ (upward) a1 = 29 2g a2 = m/s 2 ↓ (downward) 29
∴
T2 =
1 F 2
Also,
T3 =
m4F m1 + m2 + m3 + m4
⇒
T3 =
1 F 4
4 (b) Initially system is in equilibrium with a total weight of 4mg over spring. kx (3m+m) A 3m 4 mg
B m
Cutting plane
∴ kx = 4 mg When string is cut at the location as shown above. Free body diagram for m is So, force on mass, m = mg ∴ Acceleration of mass maB = g For mass 3m, free body diagram is kx=4mg a
3m 3 mg
If aA = acceleration of block of mass 3m, then Fnet = 4 mg − 3mg g 3 So, accelerations for blocks A and B g are and aB = g aA = 3 ⇒ 3m ⋅ aA = mg or aA =
5 (a) Equation of motion of mass m1 = 10 kg is F1 = m1a1 = 10 × 12 = 120 N
m mg
92
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Force on 10kg mass is 120 N to the right. As action and reaction are equal and opposite, the reactions force F- on 20 kg mass F = 120 N to the left.
8 (a) Equations for the given system For 10 kg mass, 10 g − T = 10 a For 6 kg mass, T − 6 g = 6 a
∴Equation of motion of mass m2 = 20 kg is 200 − F = 20 a2 200 − 120 = 20a2
12 (d) Total mass of blocks A and a T
20a2 = 80 80 a2 = = 4 m / s2 20
F = µR = 0.5 × 10 × 10 = 50 N
6 kg 10 kg
mB = 2 kg mC = 1kg a
9
F
A
B
a
⇒ ⇒
T C
F′
the blocks a 2 T T 3 2 3 m m µmg
B
A
F
Alternative method
7 (c) First of all consider the forces on
a
T1
For body A, F − T1 = ma …(i) For body B, T1 − T = ma …(ii) For body C, …(iii) T = ma Adding these equations, F = 3 ma 10.2 a= = 1.7 ms−2 3×2 From Eq. (iii), we get T = 2 × 1.7 = 3.4 N
F − F′ = 4 a F′ = 14 − 4 × 2 = 6N
T1
From Eqs. (i) and (ii), we get T = 75N (c) Given, m1 = m2 = m3 = 2 kg, F = 10.2 N in a frictionless surface as shown in free body diagram.
C
So, total mass, M = 4 + 2 + 1 = 7 kg Now, F = ma 14 = 7a ⇒ ⇒ a = 2ms −2 For block A, FBD is as shown F
B = 2 + 8 = 10 kg Friction between surface and combination of A and B
T a
6 (b) Given, mA = 4 kg and
…(i) …(ii)
For mass 4 kg, T − 4 g = 4 a …(i) For mass 6 kg, 6 g − T = 6 a ...(ii) On adding both equations, We get 2g = 10 a g a= ⇒ 5
µmg
T1 1
10
mg
For the Ist block, [Q m1 = m2 = m3 ] …(i) mg − T1 = m × a Let us consider 2nd and 3rd block as a system So, T1 − 2 µmg = 2m × a …(ii) On solving Eqs. (i) and (ii), we get mg (1 − 2 µ ) = 3m × a g ⇒ a = (1 − 2 µ ) 3
11
Acceleration can be found as net acceleration of a system, i.e. Total net force a= Total mass 10 . 2 10.2 = = = 1.7 m/s2 (2 + 2 + 2) 6 So, net tension in string between the blocks B and C is T = m × a = 2 × 1.7 = 3.4 N (a) Since, all the blocks are moving with constant velocity, then the net force on all blocks will be zero. Since, a = 0 ⇒ F = 0 (c) From the figure,
a
a T
T 4g
6g
(Q R = mg) Here applied force on box B is 10 N that is less than 50 N. So, the system will be in rest. Because of this there will be no friction between blocks A and B.
13 (a) When the lift is accelerating upwards with a constant acceleration a, then the apparent weight, w = m (g + a) = 60 (10 + 2) = 60 × 12 = 720 N When the lift is accelerating downwards at the rate a, then apparent weight, w′ = m(g − a) = 60 (10 − 2) = 60 × 8 = 480 N
14 (d) The acceleration of mass m3 = common acceleration of the system F Force applied = = m1 + m2 + m3 Total mass
15 (b) Since, surface is smooth, therefore both the blocks move with same acceleration (say a). Common acceleration of two blocks system F 6 1 a= = = ms−2 M + m 7+ 5 2 ∴ Force on the lighter mass, 1 F ' = ma = 5 × = 2 . 5 N 2
16 (c) Total mass of the system, M = m1 + m2 + m3 = 2 + 3 + 5 = 10 kg Force on the system, F = 10 N F = 1 ms−2 ∴ Acceleration, a = M Now, tension T1 can be calculated as T1 = (m2 + m3 ) a = 8 ×1 = 8 N
93
LAWS OF MOTION
17 (d) Let the acceleration of system (rope + block) is a along the direction of applied force. Then, a m P
M Frictionless surface
P a= M +m Draw the FBD of block and rope as shown in figure
T
M
Acceleration of lift, a = 5 ms−2 When lift is moving upwards, the reading of weighting scale will be equal to R.
19 (a) When lift moves up with constant acceleration a, then w1 − mg = ma
m T
21 (b) Mass of man, M = 80 kg
So, both scales will read M kg.
a
a
So, we can conclude that lift was moving upwards with constant speed and suddenly stops.
For equilibrium of S 2 , T2 = T1 where, T2 = Reading of spring S 1 For equilibrium of S 1 , T2 = T3 Hence, T1 = T2 = Mg
P
…(i) R
w1
a
a m
where, T is the tension. For block, T = Ma MP T = ⇒ M +m
mg
The equation of motion gives
mg
18 (a) The arrangement is shown in figure
When lift moves down with constant acceleration a, then …(ii) mg − w2 = ma
R − mg = ma ⇒
R = mg + ma = m(g + a) R = 80 (10 + 5) = 80 × 15 = 1200 N
w2
22 (d) In lift, a fictitious force will act
m a
Light spring balance
S1
mg
From Eqs. (i) and (ii), we get …(iii) w1 + w 2 = 2mg When lift moves up with constant speed, its acceleration is zero. So, w − mg = 0 …(iv) w = mg
Light spring balance
S2
M
Now, draw the free body diagram of the spring balances and block. T3
T2
20 (c) For upward accelerations, apparent
T1 S1
S2
Block Mg
T2
T1
For equilibrium of block, T1 = Mg where, T1 = Reading of spring of S 2
From Eqs. (iii) and (iv), we get w1 + w2 = 2w w + w2 ⇒ w= 1 2
.
weight = m(g + a) If lift suddenly stops during upward motion, then apparent weight = m(g − a) because instead of acceleration, we will consider retardation. In the problem, it is given that scale reading initially was 60 kg and due to sudden jerk reading decreases and finally comes back to the original mark, i.e. 60 kg.
downwards. So, the reading of the spring balance will increase. In case of physical balance, the fictitious force will act on both the pans, so the equilibrium is not affected.
23 (e) As the springs are light in weight, therefore tension in both springs will be same. So, both springs will show same reading 8 kg.
24 (d) Let the mass of the block B is M. R µmg
fs
2 kg
T
mg
T M Mg
In equilibrium, T − Mg = 0 ⇒ T = Mg If blocks do not move, then T = fs where, fs = frictional force = µ s R = µ s mg
…(i)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
∴
T = µ s mg
…(ii)
Thus, from Eqs. (i) and (ii), we have Mg = µ s mg ⇒ M = µ sm Given, µ s = 0.2, and m = 2 kg ⇒ M = 0.2 × 2 = 0.4 kg
25 (a) On releasing, the motion of the system will be according to figure. …(i) m1g − T = m1a …(ii) and T − m2g = m2a On solving above equations, we get m − m2 …(iii) a= 1 g m1 + m2
The acceleration of the block is T F . a= = m 2m
When lift moves up, g′ = g + a 1 s = g′ t22 2 2s 2 t2 = g+a
⇒ ⇒
t22 < t12
i.e., or
t2 < t1 t1 > t2
29 (a) Let the length of the chain be L and length of the chain hanging be ‘l ’, For equilibrium of the chain, M M lg = µ (L − l )g L L
27 (a) By equation of motion, T − mg = ma ⇒ T = m(g + a)
Given, m = 500 kg, g = 10 ms−2 , and a = 2 ms−2 ⇒
a T
T
a
m 2g m 1g
Given, m1 = 5 kg, m2 = 4.8 kg and g = 9.8 ms−2
block, we will need the tension in the string, that can be obtained by considering the pulley as the system.
∴
5 − 4.8 a = × 9.8 5 + 4.8 = 0.2 ms–2
26 (a) From equation of motion, we have s = ut +
1 2 gt 2
where, u is initial velocity, t is time, g is acceleration due to gravity. At the time of dropping, u = 0 1 Q s = gt12 2 s 2 t12 = ⇒ g
A
m
B T
⇒
l µ = L 1+µ
⇒
l 0 . 25 = L 1. 25
30 (c) Since, the table is frictionless, i.e. it
28 (c) To find the acceleration of the
T
l = (L − l ) µ
1 = × 100 % = 20% 5
T = 500 (10 + 2) = 6000 N
C
⇒
F
The forces acting on the pulley are (i) F towards right (ii) T towards left by the portion BC of the string and (iii) T towards left by the portion BA of the string. Since, there is no vertical motion. Then, vertical force if any, add to zero. As the pulley is massless, the equation of motion is F − 2T = 0 ⇒ T =F /2
is smooth. Therefore, force on the blocks is given by F = (m1 + m2 + m3 ) a F ⇒ a= m1 + m2 + m3 40 = 10 + 6 + 4 40 = = 2 ms−2 20 Now, the tension between 10 kg and 6 kg masses is given by T2 = (m1 + m2 )a = (10 + 6) 2 = 16 × 2 = 32 N
31 (b) When elevator is moving downward with constant acceleration a, then net weight of the person is given by w′ = m(g − a) = 0 (at a = g ) i.e. the person finds him weightless.
95
LAWS OF MOTION
Topic 5 Friction and Its Laws 2019 1 A body of mass m is kept on a rough horizontal surface (coefficient of friction = µ). Horizontal force is applied on the body, but it does not move. The resultant of normal reaction and the frictional force acting on the object is given F, where F is [NEET (Odisha)] (a) | F | = mg + µ mg (b) | F | = µmg (c) | F | ≤ mg 1 + µ 2
(d) | F | = mg
2018 2 Assertion Angle of repose is equal to angle of limiting friction. Reason When a body is just at the point of motion, the force of friction of this stage is called as limiting friction. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
3 Which one of the following statements is incorrect? (a) Frictional force opposes the relative motion. [NEET] (b) Limiting value of static friction is directly proportional to normal reaction. (c) Rolling friction is smaller than sliding friction. (d) Coefficient of sliding friction has dimensions of length.
2017 4 A boy is pushing a ring of mass 3 kg and radius 0.6 m with a stick as shown in figure. The stick applies a force of 3N on the ring and rolls it without slipping with an acceleration of 0.4 m/s 2 . Coefficient of friction between stick and ring is F / 10, then F is given by [AIIMS] stick a C
(a) 2 N (c) 6 N
(b) 4 N (d) 3 N
5 A long block A of mass M is at rest on a smooth horizontal surface. A small block B of mass M / 2 is placed on A at one end and projected along A with some velocity v. The coefficient of friction between the block is µ. Then, the
accelerations of blocks A and B before reaching a common velocity will be respectively [JIPMER] B A
µg µg (towards right), (towards left) 2 2 (b) µg (towards right), µg (towards left) µg (c) (towards right), µg (towards left) 2 µg (d) µg (towards right), (towards left) 2
(a)
2012 6 A box of mass 2 kg is placed on the roof of a car. The box would remain stationary until the car attains a maximum acceleration. Coefficient of static friction between the box and the roof of the car is 0.2 and g = 10 ms −2 . The maximum acceleration of the car, for the box to remain stationary, is [WB JEE] −2 −2 −2 (d) 2 ms −2 (c) 4 ms (b) 6 ms (a) 8 ms
2011 7 An object is moving on a plane surface with uniform velocity10 ms −1 in presence of a force 10 N. The frictional force between the object and the surface is [DUMET] (a) 1 N (b) – 10 N (c) 10 N (d) 100 N
2009 8 A monkey of mass mkg slides down a light rope attached to a fixed spring balance, with an acceleration a. The reading of this balance is w kg, then (g = acceleration due to gravity) [AIIMS] wg (a) m = g−a a (b) m = w 1 + g (c) the force of friction exerted by the rope on the monkey is m ( g − a ) newton (d) the tension in the rope is wg newton.
2008 9 A marble block of mass 2 kg lying on ice when given a
velocity of 6 ms −1 is stopped by friction in 10 s. Then, the coefficient of friction is [RPMT] (a) 0.02 (b) 0.03 (c) 0.06 (d) 0.01
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
10 Consider a vehicle going on a horizontal road towards East. Neglect any force by the air. The frictional force on the vehicle by the road [DUMET] (a) is zero if the vehicle is moving with a uniform velocity (b) is towards East if the vehicle is accelerating (c) must be towards East (d) must be towards West 11 A man slides down on a telegraphic pole with an acceleration equal to one-fourth of acceleration due to gravity. The frictional force between the man and the pole is equal to, in terms of man’s weight w is [Punjab PMET] 3w w w (d) w (b) (c) (a) 4 4 2 12 A smooth block is released at rest on a 45° incline and then slides a distance d. The time taken to slide is n times as much to slide on a rough incline, than on a smooth incline. The coefficient of friction is [AIIMS] 1 1 (a) µ k = 1 − 2 (b) µ k = 1 − 2 n n 1 1 (d) µ s = 1 − 2 (c) µ s = 1 − 2 n n 13 A block of mass 2 kg is placed on the surface of a trolley of mass 20 kg which is on a smooth surface. The coefficient of friction between the block and the surface of the trolley is 0.25. If the horizontal force of 2 N acts on the block, the acceleration of the system in ms −2 is ( take, g = 10 ms −2 ) (a) 1.8 (b) 1.0 [Punjab PMET] (c) 0.9 (d) 0.09
2007 14 If coefficient of static friction is µ s and coefficient of kinetic friction is µ k , which is correct? [UP CPMT] (a) µ s = µ k (b) µ s > µ k (c) µ s < µ k (d) Cannot predict
15 A force of 49 N is just able to move a block of wood weighing 10 kg on a rough horizontal surface. Its coefficient of friction is [RPMT] (a) 1 (b) 0.7 (c) 0.5 (d) zero 16 With increase of temperature, the frictional force acting between two surfaces [J&K CET] (a) increases (b) remains the same (c) decreases (d) becomes zero 17 A rough vertical board has an acceleration a so that a 2 kg block pressing against it does not fall. The coefficient of friction between the block and the board should be
a
(b) < g / a
(c) = g / a
19 A block of mass 2 kg rests on a horizontal surface. If a horizontal force of 5 N is applied on the block the frictional force on it is (µ k = 0.4, µ s = 0.5) [J&K CET] (a) 5 N (b) 10 N (c) 8 N (d) zero 20 A body of mass 2 kg is placed on a rough horizontal plane. The coefficient of friction between the body and the plane is 0.2. Then, [AMU] (a) body will move in forward direction, if F = 5 N. (b) body will move in backward direction with an acceleration 0.6 ms −2 , if force F = 3 N. (c) body will be in rest condition, if F = 3 N. (d) Both (a) and (c) are correct. 21 A block of mass 10 kg is placed on a rough horizontal surface whose coefficient of friction is 0.5. If a horizontal force of 100 N is applied on it, then acceleration of the block will be [JCECE] (c) 15 ms −2 (d) 0.5 ms −2 (a) 10 ms −2 (b) 5 ms −2
2005 22 A body is moving along a rough horizontal surface with an
initial velocity 6 ms −1 . If the body comes to rest after travelling a distance 9 m, then the coefficient of sliding friction will be [Punjab PMET] (a) 0.4 (b) 0.2 (c) 0.6 (d) 0.8
23 A cubical block of mass m rests on a rough horizontal surface. µ is the coefficient of static friction between the block and the surface. A force mg acting on the cube at an angle θ with vertical side of the cube pulls the block. If the block is to be pulled along the surface, then the value [EAMCET] cot (θ/ 2) should be (a) less than µ (b) greater than µ (c) equal to µ (d) not dependent on µ 24 What is the maximum value of force F, such that the block, shown in the arrangement does not move? [Manipal]
2 kg
(d) > a / g
[BHU]
(a) The coefficient of friction between two surfaces increases as the surface in contact are made rough. (b) The force of friction acts in the direction opposite to the applied force. (c) Rolling friction is greater than sliding friction. (d) The coefficient of friction between wood and wood is less than 1.
F
[Punjab PMET]
(a) > g / a
2006 18 Which of the following statements is not true?
60°
(a) 20 N (c) 12 N
1 M = √3 kg µ =2√3
(b) 10 N (d) 15 N
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LAWS OF MOTION
Answers 1 11 21
(c) (c) (b)
(a) (a) (b)
2 12 22
3 13 23
(d) (d) (b)
4 14 24
(a) (b) (a)
5 15
(c) (c)
(d) (b)
6 16
7 17
(b) (a)
8 18
(c) (c)
9 19
(c) (a)
10 20
(b) (d)
Explanations 1 (c) The situation can be drawn as F
N
FH
f
Now, according to the figure, f ′ = Ma 3 − fs = Ma or fs = 3 − Ma = 3 − 3 × 0.4 = 1.8 N Now, taking torque about O, we have fs R − fk R = I ⋅ α Stick
mg
The frictional force, f = µN = µ mg [Q N = mg] From Free body diagram (FBD), the resultant force is |F | = N 2 + f 2 = (mg )2 + (µmg )2 = mg 1 + µ 2 This is the minimum force required to move the object. But as the body is not moving ∴ | F | ≤ mg 1 − µ 2
2 (a) Angle of repose is equal to angle of limiting friction and maximum value of static friction is called the limiting friction. Hence, option (a) is correct.
3 (d) The opposing force that comes into play when one body is actually sliding over the surface of the other body is called sliding friction. The coefficient of sliding is given as µ S = N / Fsliding where, N is the normal reaction and Fsliding is the sliding force. As, the dimensions of N and Fsliding are same. Thus, µ S is a dimensionless quantity. When body is rolling, then it reduces the area of contact of surfaces, hence rolling friction is smaller than sliding friction. Hence, statment (d) is incorrect.
4 (a) Here, mass of ring, M = 3 kg Radius of ring, r = 0.6 m Force applied, f = 3 N Acceleration, a = 0.4 m/s 2 Coefficient of friction between stick and ring = F / 10
a=0.4m/s2
c
fs fk
2
= MR × a / R = MRa a (Qα = angular acceleration = and R I = MR 2) or 1.8 × 0.6 − fk × 0.6 = 3 × 0.6 × 0.4 fk = 1.8 − 1.2 = 0.6 N If µ is the coefficient of kinetic friction, then fk = µ × 3 f 0.6 ⇒ µ= k = 3 3 2 F = 0.2 = = 10 10 Hence, on compairing, we get F = 2N
5 (c) The force causing the motion of A is frictional force between A and B, µM B g = M AaA So, acceleration of A, M µg (towards right) aA = µ B g = MA 2 Block B experiences frictions force toward left, M B aB = µM B g (towards left) ⇒ aB = µg
6 (d) Given, m = 2 kg, µ = 0.2 and Here, ⇒
g = 10 m/s2 ma = µmg a = µg = 0.2 × 10 = 2 ms−2
7 (b) When an object moves in a plane surface with uniform velocity in the presence of a force, then the frictional
force between the object and the surface has opposite value of the present force. So, the frictional force between the object and the surface is – 10 N.
8 (c) The reading of the spring balance = Tension in the rope = Force of friction between the rope and monkey = mg − ma = m(g − a) N
9 (c) Let the coefficient of friction be µ, the retardation will be µg. From equation of motion, v = u + at ⇒ 0 = 6 − µg × 10 6 µ= = 0.06 ⇒ 100
10 (b) When vehicle is moving with uniform velocity, its acceleration is zero and external force applied is zero. Given force of friction is zero. When vehicle is accelerating towards East, force exerted by rear wheels on the ground make force of friction acting in the forward direction, i.e. toward East.
11 (c) Man is sliding down the telegraphic pole with acceleration g /4. So, mg mg − F = 4 mg ⇒ F = mg − 4 3mg 3w ⇒ F= ⇒ F= 4 4
F g/4
mg
12 (a) When friction is absent
a1 = g sin θ 1 …(i) s1 = a1 t12 2 When friction is present, then a2 = g sin θ − µ k g cos θ 1 …(ii) s2 = a2 t22 2 Since distance traveled is same, From Eqs. (i) and (ii), we get 1 2 1 2 a1 t1 = a2 t2 2 2
⇒ a1 t12 = a2 (nt1 )2
(Q t2 = nt1 )
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
⇒ ⇒ ⇒ ⇒
a1 = n2a2 a2 g sin θ − µ k g cos θ 1 = = 2 a1 g sin θ n g sin 45° − µ k g cos 45° 1 = 2 g sin 45° n 1 1 1 − µ k = 2 or µ k = 1 − 2 n n
18 (c) Rolling friction is smaller than sliding friction.
19 (a) The block diagram is as shown below N
Trolley
Block mg
Static friction is given as 5 Fs = µ s N = µ s mg = × 2 × 10 = 10 N 10 As, Fs > F (applied force).
fL
Since, F = 2N, F < fL So, both will move together with acceleration 2 aB = aT = 20 + 2 1 = = 0.09 ms−2 11
14 (b) Value of coefficient of static friction (µ s ) is always greater than coefficient of kinetic friction (µ k), i.e. µ s > µ k.
15 (c) For the block to move, ∴
F = µR ⇒
mg
F = 5 N, µ k = 0.4 and g = 10 ms–2
F
µ=
F F = R mg
Given, F = 49 N, m = 10 kg, g = 9.8 ms−2 49 ∴ µ= = 0.5 10 × 9.8
Frictional force on block = F (applied force).
friction force between board and block will balance the weight of the block, F
should be greater than or equal to limiting friction, (i. e. µN ). The limiting friction is f2 = µN = µ mg = 0. 2 × 2 × 9.8 = 3.92 N (a) Since, applied force F = 5 N, so body starts to move in forward direction. (b) Here, applied force is lesser than limiting friction. So, body does not move. (c) Body will not move as F < Fs . Hence, option (d) is correct.
21 (b) Force that produces acceleration is given by F
R
mg
The net force in the direction of F is F ′ = F − fs Given, F = 100 N, m = 10kg andµ = 0.5 fs = µR = 0.5 × 10 × 10 = 50N
R
m
ma
mg
µR > mg g ⇒ µ(ma) > mg ⇒ µ > a
i.e.
F > mg ⇒
m at angle θ with the vertical side of cube and pulls the block. The forces acting on the block are as follows : (i) Applied force mg at an angle θ with vertical side of cube. (ii) Weight mg of cube vertically downward. F 60°
F =5N
fs
17 (a) For the limiting condition, upward
Coefficient of sliding friction is given by 2 µ = a/ g = = 0.2 10
f
20 (d) For moving the body, applied force
16 (b) Frictional force does not depend upon temperature.
18 a = 36 a = 2 ms−2
⇒
23 (b) A force mg acts on a cube of mass
Given, m = 2 kg, µ s = 0.5,
R fL
F=5N
m
F
13 (d) The force of limiting friction between the block and trolley fL = µR = µmg = 0.25 × 2 × 10 = 5 N
⇒ (6)2 − 2 × a × 9 = 0
F ′ = 100 − 50 = 50 N Also, acceleration, F ′ 50 a= = = 5 ms−2 m 10
22 (b) Given, u = 6 ms−1 , s = 9 m, v = 0 By third equation of motion, v 2 = u2 − 2as
F sin 60°
W = 10 √3
(iii) Reaction of surface vertically upward. (iv) Friction force f . Resolving the components of mg along horizontal and vertical, i.e. mg sin θ and mg cos θ. Component mg sin θ moves the block in forward direction. From this, we have …(i) mg sin θ > f Also, mg cos θ + R = mg or R = mg (1 − cos θ ) and f = µR = µmg (1 − cos θ ) …(ii) From Eqs. (i) and (ii), we have mg sin θ > µmg (1 − cos θ ) sin θ > µ (1 − cos θ ) ⇒ 2 sin θ / 2 cos θ / 2 > µ 2 sin 2 θ / 2 cos θ / 2 ⇒ >µ sin θ / 2 ⇒ cot θ / 2 > µ
24 (a) As friction, f = µR From the diagram given below F cos 60° = µ (w + F sin 60° )
…(i)
F 60°
1 M = √3 kg µ =2√3
1 and w = 10 3 in 2 3 Eq. (i), we get F = 20 N. Substituting µ =
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LAWS OF MOTION
Topic 6 Motion on Rough Surfaces (Plane & Inclined) 2018 1 A wooden wedge of mass M and inclination angle (α ) rest on a smooth floor. A block of mass m is kept on wedge. A force F is applied on the wedge as shown in the figure such that block remains stationary with respect to wedge. So, magnitude of force F is [AIIMS]
2017 5 A box of mass 8 kg is placed on a rough inclined plane of inclination 30°. Its downward motion can be prevented by applying a horizontal force F, then value of F for which friction between the block and the incline surface is minimum, is [JIPMER] (a)
m
F
(a) ( M + m ) g tan α (c) mg cos α
(b) g tan α (d) ( M + m )g cosec α
3 A body of mass 5 kg is suspended by a spring balance on an inclined plane as shown in figure.
m 30°
[AIIMS]
(d) 10 N
4 A block of mass m is placed on a smooth inclined wedge ABC of inclination θ as shown in the figure. The wedge is given an acceleration a towards the right. The relation between a and θ for the block to remain stationary on the wedge is [NEET] A
m a q
C
(a) a = g cos θ (c) a =
g cosec θ
B
(b) a =
g sin θ
(d) a = g tan θ
(b) 40 3
(c)
40 3
(d) 80 3
[AIIMS]
2 A piece of ice slides down a rough inclined plane at 45° inclination in twice the time that it takes to slide down an identical but frictionless inclined plane. What is the coefficient of friction between ice and incline? [AIIMS] 3 4 3 7 (a) (b) (c) (d) 7cot θ 7cot θ 4cot θ 9cot θ
So, force applied on spring balance is (a) 50 N (b) 25 N (c) 500 N
3
6 A body of mass 5 × 10− 3 kg is launched upon a rough inclined plane making an angle of 30° with the horizontal. Obtain the coefficient of friction between the body and the plane if the time of ascent is half of the time of descent.
α M
80
(a) 0.346
(b) 0.921
(c) 1.926
(d) 2.912
7 The upper half of an inclined plane of inclination θ is perfectly smooth while the lower half rough. A block starting from rest at the top of the plane will again come to rest at the bottom if the coefficient of friction between the block and the lower half of the plane is given by (a) µ = 2 tan θ (b) µ = tan θ [JIPMER] (c) µ = 2 / (tan θ ) (d) µ = 1/ tan θ 2014 8 A wooden block of mass 8 kg slides down an inclined plane of inclination 30° to the horizontal with constant acceleration 0.4 m/s 2 . The force of friction between the block and the inclined plane is ( Take, g = 10 m /s 2 ) (a) 12.2 N (b) 24.4 N [MHT CET] (c) 36.8 N (d) 48.8 N 9 To determine the coefficient of friction between a rough surface and a block, the surface is kept inclined at 45° and the block is released from rest. The block takes a time t in moving a distance d. The rough surface is then replaced by a smooth surface and the same experiment is repeated. The block now takes a time t / 2 in moving down the same distance d. The coefficient of friction is [WB JEE] (a) 3/4 (b) 5/4 (c) 1/2 (d) 1/ 2 10 A body of mass m is placed on a rough surface with coefficient of friction µ, inclined at θ. If the mass is in equilibrium, then [KCET] −1 1 −1 (a) θ = tan µ (b) θ = tan µ −1 m −1 µ (c) θ = tan (d) θ = tan m µ
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2013 11 A smooth inclined plane is
inclined at an angle θ with the horizontal. A body starts from rest and slides down the inclined surface, then the time taken by the body to reach the bottom is 2h (a) g 1 (c) sin θ
(b) 2h g
l
h
θ
[CBSE AIPMT]
2l g
(d) sin θ
2h g
2012 12 A body of mass 100 g is sliding from an inclined plane of inclination 30°. What is the frictional force, if µ = 0.7? [CBSE AIPMT] 2 0.7 2 (a) 0.7 (b) N N 3 3 0.7 3 (d) (c) 0.7 3 N N 2
13 Three blocks of masses m1 = 2.0kg, m2 = 4.0kg and m3 = 6.0 kg are connected by strings on a frictionless inclined plane of 60°, as shown in the figure. A force F = 120 N is applied upward along the incline to the uppermost block, causing an upward movement of the blocks. The connecting cords are light. The values of [AMU] tensions T1 and T2 in the cords are m3 m2 m1
F
T1 60°
2007 18 An object is kept on a smooth inclined plane of length l and of height 1 m. The horizontal acceleration to be imparted to the inclined plane so that the object is stationary relative to incline is [RPMT] g g (a) g l 2 − 1 (b) g ( l 2 − 1) (c) (d) 2 2 l −1 l −1
2006 19 A block of wood of 1 kg resting on an inclined plane of
2005 20 If the coefficient of friction of a plane inclined at 45° is 0.5.
(b) T1 = 60 N, T2 = 60 N (d) T1 = 20 N, T2 = 100 N
Then, acceleration of a body sliding freely on it will be
2011 14 A cubical block rests on an inclined plane of coefficient of friction µ = 1/ 3. What should be the angle of inclination so that the block just slides down the inclined plane? (a) 30° (b) 60° [J&K CET] (c) 45° (d) 90°
2008 15 A body of mass M starts sliding down on the inclined plane, where the critical angle is ∠ACB = 30° as shown in figure. The kinetic friction will be [DUMET] (b) 3 Mg (a) Mg / 3 (c) 3 (d) None of these
17 Two fixed frictionless A inclined plane making an B angle 30° and 60° with the vertical are shown in the figure. Two blocks A and 60° 30° B are placed on the two planes. What is the relative vertical acceleration of A with respect to B ? [AIEEE] –2 (a) 4.9 ms in horizontal direction (b) 9.8 ms –2 in vertical direction (c) zero (d) 4.9 ms –2 in vertical direction
angle 30°, just starts moving down. If the coefficient of friction is 0.2, its velocity (in ms −1 ) after 5 s is ( Take, g = 10 ms −2 ) [EAMCET] (a) 12.75 (b) 16.35 (c) 18.25 (d) 20
T2
(a) T1 = 20 N, T2 = 60 N (c) T1 = 30 N, T2 = 50 N
16 A body of mass 10 kg is lying on a rough plane inclined at an angle of 30° to the horizontal and the coefficient of friction is 0.5. The minimum force required to pull the body up the plane is [EAMCET] (a) 914 N (b) 91.4 N (c) 9.14 N (d) 0.914 N
C 30° Mg A
B
[RPMT]
(a)
9.8 2 2
ms
−2
(b)
9.8 2
ms
−2
(c) 9.8 ms
−2
(d) 4.8 ms −2
21 The force required to just move a body up an inclined plane is double the force required to just prevent it from sliding down. If θ is the angle of friction and φ is the angle which the plane makes with horizontal, then [Haryana PMT] (a) tan φ = 2 tan θ (b) tan φ = 3 tan θ (c) tan φ = tan θ (d) tan θ = 3 tan φ 22 A body takes time t to reach the bottom of an inclined plane of angle θ with the horizontal. If the plane is made rough, time taken now is 2t. The coefficient of friction of the rough surface is [DUMET] 3 2 1 1 (a) tan θ (b) tan θ (c) tan θ (d) tan θ 4 3 4 2
101
LAWS OF MOTION
Answers 1 11 21
(a) (c) (b)
2 12 22
(c) (d) (a)
3 13
(b) (a)
4 14
(d) (a)
(a) (a)
5 15
6 16
(a) (b)
7 17
(a) (b)
(c) (c)
8 18
(a) (b)
9 19
10 20
(a) (a)
Explanations 1 (a) Since, F = (M + m )a N
s1 = s2, u = 0 On the rough incline, a1 = g (sin θ − µ cosθ ), t1 = time taken On the frictionless incline, a2 = g sinθ t2 = time taken, t1 = 2 t2 1 As, s = ut + at 2 2 1 So, s1 = 0 + g (sin θ − µ cosθ )t12 2 1 and, s2 = 0 + g sinθt22 2 As s1 = s2 , 1 1 g (sin θ − µ cosθ )t12 = g sin θt22 2 2 sin θ − µ cosθ t22 ⇒ = 2 sin θ t1
⇒
t2 1 − µ cot θ = 2 2 (2 t2 ) 1 − µ cot θ = 1/ 4 1 3 µ cot θ = 1 − = 4 4
N
θ
in θ gs
θ
θ
mg cos θ
θ=30° mg
6 (a) According to question, the situation can be shown as R
4 (d) According to the question, the free body diagrom of the given condition will be R cosq q ma (Pseudo force)
µR
R sinq
B
a C
Similarly, R cos θ = mg
…(ii)
Dividing Eq. (i) by Eq (ii), we get R sin θ ma = R cos θ mg tan θ =
a g
sin
Mo
n
θ
θ=30°
θ mg cosθ mg
⇒
v 2 = u2 − 2a1s
i.e.
0 = u2 − 2a1s
∴
u = 2a1s
Also,
v = u − a1t
i.e.
0 = u − a1t1
⇒
t1 = u / a1
∴
t1 =
2a1s = a1
Retardation, a1 = or
tio
Case 1 For body projected up the plane v=0
Since, the wedge is accelerating towards right with a, thus a pseudo force acts in the left direction in order to keep the block stationary. As, the system is in equilibrium. ∴ ΣFx = 0 or ΣFy = 0 …(i) ⇒ R sin θ = ma
⇒
mg
R
q mg q
F
F cosθ = mg sin θ F = mg tanθ 80 = 3
= mg sinθ = 5 × 10 × sin 30° 1 = 5 × 10 × = 25 N 2
A
θ os
N
mg
m
2 (c) Given, θ = 45°,
⇒
Fc
m
θ
mg sin α α
Normal N = (mg cos α + ma sin α ) So, apply pseudo force on the block by observing it from the wedge. Now, as in free body diagram of block, we get ma cosα = mg sin α sin α a=g ⇒ cosα …(ii) ⇒ a = g tanα Now, from Eqs. (i) and (ii), we get F = (M + m )g tanα
⇒
5 (a) For friction to be minimum,
rough inclined plane = g sinθ. ∴ Force applied on spring balance
in
ma sin α α mg cos α mg
3 4 cot θ
3 (b) Acceleration of the body down the
gs
a ma
co s α α
µ=
∴
m
ma
…(i)
a = g tan θ
∴ The relation between a and g for the block to remain stationary on the wedge is a = g tan θ.
As,
2s a1
… (i)
µR + mg sin 30° m
R = mg cos 30° µmg cos 30° + mg sin 30° a1 = m = µg
3 g + 2 2
… (ii)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
8 (c) Here, mg sin θ − f = ma
θ
l
⇒ 8 × 10 sin 30° − 8 × 0.4 = f ⇒
40 – 3.2 = f ⇒
9 (a) If the same wedge is made rough, then time taken by it to come down becomes n times more. The coefficient of friction.
mg cos θ (reaction) mg
mg
mg sin θ
θ
Work done against friction on rough surface = µ (mg cos θ) × L/2
Work done by friction = µ × (reaction) × distance = 0 + µ (mg cosθ ) × (L / 2) = µ (mg cosθ ) × (L / 2) Now, work done = change in KE mgL sin θ = µ (mg cosθ ) × (L / 2)
= 0.7 ×
3 0.7 3 = N 2 2
13 (a) The free body diagram are given below
Bl oc F
θ
θ
° s
θ
2
F
m
3
co 3g
m m 1g
sin
30
placed on a rough inclined surface and it is just on the point of sliding down, with coefficient of friction µ inclined at angle θ as shown in figure. At the equilibrium point O, O
θ
force, F = µmg cos θ
= 0.7 × 100 × 10−3 × 10 cos 30°
10 (a) Consider a body of mass m is
R
Loss in PE = Gain in KE
12 (d) Fricti on
T
Work done against friction is zero for smooth surface
1 µ = 1 − 2 tan θ n 1 ⇒ µ = 1 − 2 tan 45° 2 4 −1 3 µ= ⇒ µ= ⇒ 4 4
⇒
T2
° 60° 30 s 0° o 3 c
2
= mg Lsin θ
Smooth surface 45°
Rough surface 45°
Hence,
a
block descends the plane, rise in kinetic energy = fall in potential energy
But
m
7 (a) Suppose length of plane is L. When
2l g sin θ h h sin θ = ⇒ l= sin θ l 2 h ⋅ t= g sin θ sin θ 1 2h t= sin θ g 2s = g′
∴ Time taken, t =
1
Solving for µ, we get 3 1. 732 µ= = 5 5 ⇒ µ = 0 ⋅ 346
d
d
h
θ
f = 36.8 N
co
g µg 3 3 g µg + = 4 − 2 2 2 2
g
⇒ mg sin θ − ma = f
Bl oc
Now, squaring both sides, we get … (v) a1 = 4 a2 Substituting values of a1 and a2 from Eqs. (ii) and (iv) in Eq. (v), we get
90°−θ
mg
k
2s 1 2s = a1 2 a2
inclined g′ = g cos (90° − θ ) = g sin θ
ma mg sin θ
m
Substituting values of t1 and t2 from Eqs. (i) and (iii), we get
11 (c) Acceleration due to gravity along
f
a 30 ° T 1T 1
Downward acceleration, mg sin 30° − µR a2 = m mg sin 30° − µmg cos 30° = m g µg 3 …(iv) = − 2 2 Given, t1 = t2 / 2
a
… (iii)
s
t2 = 2s / a2
This is maximum value of θ for mass m to be at rest. For smaller θ, body will be at rest, i.e. in equilibrium So, angle of repose, i.e. θ = tan −1 µ.
⇒ tan θ = µ / 2 ∴ µ = 2tan θ
k
Case 2 For body coming down the plane, 1 s = ut + a2t22 2 ⇒ u=0
g m2
60° mg cos θ
mg
In case of limiting condition, …(i) F = mg sin θ Normal force, R = mg cos θ …(ii) Now, comparing Eqs. (i), (ii), we get F mg sin θ = R mg cos θ (Q force of friction F = µR) ⇒ µ = tan θ ⇒ θ = tan −1 (µ )
For the motion of mass m1, T1 − m1g cos 30° = m1a For the motion of mass m2,
…(i)
T2 − T1 − m2g cos 30° = m2a and for the motion of mass m3,
…(ii)
…(iii) F − T2 − m3g cos 30° = m3a Adding Eqs. (i), (ii) and (iii), we get F − (m1 + m2 + m3 ) g cos 30° = (m1 + m2 + m3 )a
103
LAWS OF MOTION
⇒ ⇒
F − g cos 30° = a m1 + m2 + m3 120 3 − 10 × =a 12 2 3 a = 10 1 − 2
Now, T1 = m1 (a + g cos 30° ) 10 3 3 = 2 10 − + 10 = 20 N 2 2 T2 = a (m1 + m2 ) + (m1 + m2 ) g cos 30° = 6 × 10 = 60 N
1 l When horizontal acceleration is imparted to the inclined plane, then a pseudo acceleration acts on the object.
18 (c) Here, sin θ = (from the figure)
c ma
R
θ
sin mg
θ
θ
θ
os
θ
mg
ma
14 (a) As, tan θ = µ ⇒
tan θ = 1/ 3
⇒ tan θ = tan 30° Angle of inclination, θ = 30°
15 (a) As, coefficient of friction = tangent angle of repose ⇒ µ = tan θ 1 = tan 30° = 3 Therefore, kinetic friction 1 Mg = Mg × = 3 3
For equilibrium of body on the inclined plane, ma cos θ = mg sin θ ⇒
a = g tan θ = g
⇒
a=
17 (d) As equation along the inclined plane. mg sinθ = ma ∴ a = g sinθ where, a is along the inclined plane. Now, vertical component of acceleration is a′ = g sin 2 θ. ∴Relative vertical acceleration of A with respect to B is a′A − a′B = g g (sin 2 60 ° − sin 2 30 ° ) = = 4.9 ms−2 2 (in vertical direction)
l −1
g 2
l −1
plane is given by
sin mg θ
θ
on the inclined plane is given by a = g (sin θ − µ cos θ ) = 9.8 (sin 45° − 0. 5 cos 45° ) 1 9.8 1 = 9.8 − 0.5 × ms−2 = 2 2 2 2 mg (sin φ + µ cos φ ) = 2mg (sin φ − µ cos φ ) ⇒ tan φ = 3µ As, µ = tan θ So, tan φ = 3 tan θ
22 (a) The free body diagram shows the various forces acting on the block. When plane is frictionless, then acceleration, a = g sin θ. Let time taken is t1. Since, body starts from rest, initial velocity u = 0 1 ∴ s = ut + at12 2 1 ⇒ s = g sin θt12 2 2s ⇒ t1 = g sin θ R
fs
16 (b) For equilibrium of body on the inclined plane, F = mg (sin θ + µ cos θ ) = 10 × 9.8 (sin 30° + 0.5 cos 30° ) = 91.4 N
1 2
19 (b) Acceleration of block down the R
20 (a) The acceleration of the body sliding
21 (b) According to the question,
m + gc m os a sin θ θ
⇒
o θ gc mg m
Fk
sθ
For the motion of body along the incline, µmg cos θ − mg sin θ a= m (as, R = mg cos θ and fs = µR) = 0.2 × 10 × cos 30°−10 × sin 30° 3 1 =2× − 10 × 2 2 = 3.278 From the equation of motion, v = u − at Velocity after 5 s, v = 0 + 3 . 278 × 5 = 16.35 ms−1
s mg
inθ
θ
θ mg
mg cosθ
When the plane is made rough, then acceleration a = g (sin θ − µ cos θ ), where µ is coefficient of friction. 2s t2 = g (sin θ − µ cos θ ) Given, t2 = 2t1 ∴
2s 2s =2 g (sin θ − µ cos θ ) g sin θ
1 4 = sin θ − µ cos θ sin θ ⇒ ⇒ ⇒
sin θ = 4 sin θ − 4 µ cos θ 4 µ cos θ = 3 sin θ 3 µ = tan θ 4
104
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 7 Dynamics of Circular Motion 2019 1 A block of mass 10 kg is in contact against the inner wall of
2013 5 A car of mass 1000 kg moves on a circular track of radius
a hollow cylindrical drum of radius 1 m. The coefficient of friction between the block and the inner wall of the cylinder is 0.1. The minimum angular velocity needed for the cylinder to keep the block stationary when the cylinder is vertical and rotating about its axis, will be (g = 10 m/s 2 )
20 m. If the coefficient of fricition of 0.64, then the maximum velocity with which the car can move is
[NEET]
2012 6 A car of mass 1000 kg negotiates a banked curve of radius
10 rad/s (a) 2π (c) 10π rad/s
(b) 10 rad/s (d) 10 rad/s
2017 2 One end of the string of length l is connected to a particle of mass m and the other end is connected to a small peg on a smooth horizontal table. If the particle moves in circle with speed v, the net force on the particle (directed towards center) will be (T represents the tension in the string) mv 2 (a) T (b) T + [NEET] l mv 2 (c) T − (d) zero l
2016 3 A car is negotiating a curved road of radius R. The road is
banked at angle θ. The coefficient of friction between the tyres of the car and the road is µ s . The maximum safe velocity on this road is [NEET] µ + tan θ (a) gR s 1− µ s tan θ
(c)
g µ s + tan θ R 2 1− µ s tan θ
(b)
g µ s + tan θ R 1− µ s tan θ
µ + tan θ (d) gR 2 s 1− µ s tan θ
2014 4 A person is driving a vehicle at a uniform speed of 5 ms −1 on a level curved track of radius 5 m. The coefficient of static friction between tyres and road is 0.1. Will the person slip while taking the turn with the same speed? (Take, g = 10 ms −2 .) [KCET] 2 2 −2 (a) A person will slip, if v = 5 m s (b) A person will slip, if v 2 > 5 m 2s −2 (c) A person will slip, if v 2 < 5 m 2s −2 (d) A person will not slip, if v 2 > 5 m 2s −2
[WB JEE]
(a) 22.4 m/s (c) 11.2 m/s
(b) 5.6 m/s (d) None of these
90 m on a frictionless road. If the banking angle is 45°, the speed of the car is [CBSE AIPMT] (a) 20 ms −1 (b) 30 ms −1 (c) 5 ms −1 (d) 10 ms −1
7 A circular race track of radius 300 m is banked at an angle of 15°. If the coefficient of friction between the wheels of the race car and the road is 0.2. Find optimum speed of the race car to avoid wear and tear on its tyres and maximum permissible speed to avoid slipping. [AMU] (a) v o = 48 ms −1 and v max = 60 ms −1 (b) v o = 281 . ms −1 and v max = 38.1 ms −1 (c) v o = 62.2 ms −1 and v max = 73.4 ms −1 (d) None of the above
2011 8 A car is moving in a circular horizontal track of radius
10.0 m with a constant speed of 10.0 ms − 1 . A plumb bob is suspended from the roof of the car by a light rigid rod of length 10.0 m. The angle made by the rod with the track is (take, g = 10 ms − 2 ) [AFMC] (a) zero (b) 30° (c) 45° (d) 60°
2008 9 Assertion A body of mass 1 kg is making 1 rps in a circle of radius 1 m. Centrifugal force acting on it is 4π 2 N. mv 2 . Reason Centrifugal force is given by F = r [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
105
LAWS OF MOTION
10 A cyclist is travelling with velocity v on a banked curved road of radius R. The angle θ through which the cyclist leans inwards is given by [J&K CET] Rg 2 (b) tan θ = v Rg (a) tan θ = 2 v v2R v2 (d) tan θ = (c) tan θ = R Rg
2005 16 The angle of banking is independent of
17 A small body of mass mslides without friction from the top of a hemisphere of radius r. The point at which the body will be detached from the surface of hemisphere is r r [Haryana PMT] (a) (b) 3 2 2 (d) 2 r (c) r 3
11 Assertion (A) A ball connected to a string is in circular motion on a frictionless horizontal table and is in equilibrium. Reason (R) Magnitude of the centripetal force is equal to the magnitude of the tension in the string. [EAMCET] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) A is correct but R is incorrect (d) A is incorrect but R is correct
18 A particle describes a horizontal circle in a conical funnel whose inner surface is smooth with speed of 0.5 ms − 1 . What is the height of the plane of circle from vertex of the funnel? [J&K CET] (a) 0.25 m (b) 2 cm (c) 4 cm (d) 2.5 cm
2007 12 A 500 kg car takes a round turn of radius 50 m with a
19 A ball of mass 0.25 kg attached to the ends of a string of length 1.96 m is rotating in a horizontal circle. The string will break, if tension is more than 25 N. What is the maximum velocity with which the ball can be rotated? (b) 5 ms −1 (a) 3 ms −1 [AMU] −1 (d) 14 ms −1 (c) 9 ms
velocity of 36 kmh − 1 . The centripetal force is (a) 250 N (b) 750 N [MHT CET] (c) 1000 N (d) 1200 N
13 A motorcycle is going on an overbridge of radius R. The driver maintains a constant speed. As the motorcycle is ascending on the overbridge, the normal force on it (a) increases (b) decreases [JCECE] (c) remains the same (d) fluctuates erratically
20 A coin placed on a rotating turn table just slips, if it is placed at a distance of 8 cm from the centre. If angular speed of the turn table is doubled, then it will just slip at a distance of [DUMET] (a) 1 cm (b) 2 cm (c) 4 cm (d) 8 cm
2006 14 Angle of banking for a vehicle speed of 10 ms − 1 for a
21 A particle is moving in a circle of radius R with constant speed v. If radius is doubled, then its centripetal force to keep the same speed gets [BCECE] (a) twice as great as before (b) half (c) one-fourth (d) remains constant
radius of curvature 10 m is (assume, g = 10 ms − 2 ) [J&K CET]
1 (b) tan − 1 (c) 60° 2
(a) 30°
[MHT CET]
(a) speed of vehicle (b) radius of curvature of road (c) height of inclination (d) None of the above
(d) 45°
22 A car is racing on a circular track of 180 m radius with a speed of 32 ms − 1 . What should be the banking angle of the road to avoid chances of skidding of the vehicle at this speed without taking into consideration the friction between the tyres and the road? [JCECE] (a) 45° (b) 60° (c) 30° (d) 15°
15 Two stones of masses m and 2m are whirled in horizontal r circles, the heavier one in a radius and the lighter one in 2 radius r. The tangential speed of lighter stone is n times that of the value of heavier stone when they experience same centripetal forces. The value of n is [CBSE AIPMT] (a) 2 (b) 3 (c) 4 (d) 1
Answers 1 11 21
(b) (a) (b)
2 12 22
(a) (c) (c)
3 13
(a) (a)
4 14
(b) (d)
5 15
(c) (a)
6 16
(b) (c)
7 17
(b) (c)
8 18
(c) (d)
9 19
(a) (d)
10 20
(d) (b)
106
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (b) Given, mass of cylinder m = 10 kg, radius of cylinder, r = 1m and coefficient of friction, µ = 01 .. The given situation can be as shown in the figure given below fl
3 (a) According to question, a car is negotiating a curved road of radius R. The road is banked at angle θ and the coefficient of friction between the tyres of car and the road is µ s . So, this given situation can be drawn as shown in figure below.
fl cos θ
fl
2 (a) Consider the string of length l connected to a particle as shown in the figure v O
Fc
T l
Speed of the particle is v. As, the particle is in uniform circular motion, net force on the particle must be equal to centripetal force which is provided by the tension (T ). ∴ Net force = Centripetal force = Tension in string mv 2 ⇒ =T l
= 0.64 × 200
θ
fl sin θ
mg
Considering the case of vertical equilibrium. N cos θ = mg + fl sin θ …(i) ⇒ mg = N cosθ − fl sin θ Considering the case of horizontal equilibrium, mv 2 …(ii) N sin θ + fl cos θ = R Divide Eqs. (i) and (ii), we get v 2 sin θ + µ s cosθ ( fl ∝ µ s ) = Rg cosθ − µ s sin θ ⇒ ⇒
sin θ + µ s cosθ v = Rg cosθ − µ s sin θ tan θ + µ s v = Rg 1 − µ s tan θ
4 (b) We know that, mv 2max …(i) F= r and …(ii) F = µ s mg From the Eqs. (i) and (ii) for maximum speed of vehicle mv 2max µ s mg ≥ r where, vmax = maximum velocity of vehicle Given, µ s = 0.1, r = 5 m and g = 10 ms−2 vmax = µ s rg 2 vmax = 0.1 × 5 × 10 = 5 m 2s−2
So, person or vehicle will slip, if v 2 > 5 m 2s−2
= 128 = 112 . m/s v2 rg
Given, θ = 45° , r = 90 m and g =10 m/s2
θ
mg
g ω≥ ⇒ rµ Thus, the minimum angular velocity is g 10 ω min = = = 10 rad/s rµ 1 × 01 .
v = µrg Given, µ = 0.64 and r = 20 m v = 0.64 × 20 × 10 ∴
6 (b) The angle of banking, tan θ =
θ
N sin θ
From the above figure, it can be concluded that the block will be stationary when the limiting friction ( fl ) is equal to or greater than the downward force or weight of block, i.e. …(i) fl ≥ mg Also, the magnitude of limiting friction between two bodies is directly proportional to the normal reaction (N) between them, i.e. fl ∝ N or fl = µ N …(ii) From Eqs. (i) and (ii), we get µN ≥ mg or µ( mrω 2 ) ≥ mg [Q N = mrω 2 ]
given by
N cos θ
fc=mrω2 r
5 (c) Maximum velocity of the car is
∴ tan 45° =
v2 90 × 10
v = 90 × 10 × tan 45°
⇒
Speed of car, v = 30 m /s
7 (b) Here, µ s = 0.2, R = 300 m, θ = 15° vo (optimal velocity) = gR tan θ = 9.8 × 300 × tan15° = 28.1 ms − 1 gR (µ s + tan 15° ) 1 − µ s tan 15°
and vmax = =
9.8 × 300 (0.2 + 2 − 3) 1 − 0.2 (2 − 3)
= 38.1 ms − 1
8 (c) If angle of banking is θ, then tan θ =
mv 2 / r mg
⇒ tan θ =
v2 rg
Given, v = 10, r = 10 m and g = 10 ms− 2 So, tan θ = ∴
(10)2 =1 10 × 10
θ = 45°
9 (a) From relation, the centrifugal force, mv 2 m (rω )2 = = mrω 2 r r = mr (2πν )2 = 4 π 2 mrν 2
F=
= 4 π 2 × 1 × 1 × 12 = 4 π 2 N
10 (d) The angle made by cyclist with the vertical is given by v2 tan θ = Rg where, v = speed of cycle and R = radius of circular track.
107
LAWS OF MOTION
As, lighter stone in n times that of the value of heavier stone when they experience same centripetal forces, we get
11 (a) In a circular motion, the direction of resultant force is towards centre and its magnitude is mv 2 F= r or F = mrω 2 Thus, a centripetal force of magnitude mv 2 which is equal to the tension in r string is needed to keep the particle moving in a circle with constant speed.
12 (c) Given, m = 500 kg 5 ms− 1 18 = 10ms− 1 and r = 50 m
v = 36 kmh −1 = 36 ×
( Fc ) heavier = ( Fc ) lighter ⇒
2m(v )2 m(nv )2 = ⇒ n2 = 4 ⇒ n = 2 (r / 2) r
16 (c) As, angle of banking of road is
velocity block leaves contact at
cos θ =
motorcyclist Mg cos θ − N = or
Mv R
2
H v
g
co
s
θ
N θ
cos θ =
2
M
M
N θ R
B
As the motorcyclist moves upward on the bridge, θ decreases and therefore N increases and becomes maximum at the highest point (i.e. point H in the diagram). v2 rg 10 × 10 tan θ = =1 10 × 10
14 (d) As, tan θ =
θ = 45°
15 (a) Given, that two stones of masses m and 2m are whirled in horizontal circles, the heavier one in a radius r/2 and lighter one in radius r as shown in figure. v2 r/2 2 m
m
v1
⇒ cos θ =
h r
2r 3
18 (d) Equating the vertical forces, we get
Ncosθ
Mg
⇒
⇒
h = r cos θ =
∴
O
∴
OA AB
N sinθ
r1ω 12 = r2ω 22
⇒
From the diagram for the equilibrium of a particle A …(i) N sin θ = mg 2 mv and …(ii) = N cos θ R Rg …(iii) ∴ tan θ = 2 v Also, in ∆ OAB R …(iv) tan θ = h On equating Eqs. (iii) and (iv), we get v2 h= g (0.5)2 = 0.025 m = 2.5 cm 10
mv 2 R 1 F∝ R 1 F∝ R1 1 F2 ∝ R2 F2 R1 = F1 R2 F=
⇒ or
O
h=
r1ω 12 ω 22
21 (b) The centripetal force,
θ
⇒
r2 =
Given, r1 = 8 cm ,ω 1 = ω and ω 2 = 2ω 8 × ω2 8 ∴ r2 = = = 2 cm (2ω )2 4
A mg
h
It is given by F = mrω 2
Since, F1 = F2
2 3
Q In ∆AOB, Mv R
N = Mg cos θ −
h
A
13 (a) Reaction of normal force on the
v = 196 = 14 ms− 1
where, r is radius of circle, m is mass and ω is angular speed. F1 r1ω 12 ∴ = F2 r2ω 22
B θ r
∴
frame of reference which is rotating about its axis, experiences a centrifugal force.
17 (c) When released from top with zero O
mv 2 r Fr 2 ⇒ v = m 25 × 196 . 2 = 196 ⇒ v = 0.25 F=
20 (b) A body placed on a non-inertial
v2 , i.e. it does not rg depend upon height of inclination. given as, tan θ =
Now, the centripetal force, mv 2 500 × (10)2 F= = = 1000 N r 50
19 (d) The centripetal force,
and ⇒ Given, ∴ or
R2 = 2R1 1 F2 R1 = = F1 2R1 2 F F2 = 1 2
22 (c) As, tan θ = ⇒ ∴
tan θ =
v2 rg ( 32)2 180 × 9.8
θ = 30°
05 Work, Energy and Power Quick Review Some Particular Cases of Work Done
Work Work done by a force on the body is equal to the scalar (or dot product) product of force and displacement of the body in the direction of force. It is expressed as W = F ⋅s = Fs cos θ where, θ = angle between the force (F) and displacement (s). • It can be positive, negative or zero as given below (i) If θ is acute, cos θ will be positive, thus work done will be positive and force tries to increase the speed of the body. (ii) If θ is 90°, cos θ will be zero, thus work done will be zero and there will be no change in the speed of the body due to force. (iii) When a body moves in a circle, the work done by the centripetal force is always zero as F ⊥ s, hence θ = 90°, W = Fs cos 90° = 0 (iv) If θ is greater than 90° (up to 180°), cos θ is negative. Hence, W is negative and force tries to decrease the speed of the body. • If the force is constant, work done is independent of the actual path taken by the particle. • Total work done within the two limits of displacements x1 and x 2 by a variable force is given x2
by
W=
∫ Fdx
x1
(i) If an object moves on a rough surface, then R F
f mg
(a) Work done by the reaction force R or mg is W1 = 0, because force and displacement are perpendicular to each other. (b) Work done by the pulling force F, W2 = Fs cos 0° = Fs (c) Work done by the frictional force, W3 = fs cos 180° = − fs (d) Net work done (W net ) due to all these forces, Wnet = W1 + W2 + W3 = 0 + Fs − fs = ( F − f ) s where,
f = force of friction.
If the angle between the force and displacement is θ , then for displacement s, net work done (W ), W net = Fs cos θ − fs = ( F cos θ − f )s (ii) A labourer lift a stone of mass m upto a height h, then he applies a force F ( = mg ) on the stone upwards.
109
WORK, ENERGY AND POWER
Therefore, work done (W) by him,
W=
F = mg
1 2 kx m = area of MNO 2 M
h
Area =
1 2 2 kxm
Fs
kxm x
N
mgh
O Fs = – kx
xm
W = Fh cos 0° = Fh = mgh However, work done (Wg ) by gravitational force, Wg = mgh cos 180° = − mgh
Work done by Conservative and Non-Conservative Forces • Work done by or against the conservative force on a body
is independent of the path followed by the body. Examples of conservative forces are, field forces such as gravitational, electric, magnetic and spring forces. • Work done by or against the non-conservative force in a moving body depends on the path between initial and final positions. Examples of non-conservative forces are, natural opposing forces like friction, viscous forces, etc.
• If the external force is in opposite direction to the spring
force, then in expansion from x1 to x 2 . Work done W by the spring force Fs on the object, x2 x2 1 W = ∫ Fs dx = ∫ ( − kx ) dx = − k ( x 22 − x12 ) x1 x1 2 • Work done W by the external force Fapp on the spring, F
x2 x1 x1 x2
W = Negative In compression
Work Done by a Spring Force • Spring force, Fs = − kx, where k is a force constant or
spring constant or stiffness of the spring and x is the extension or compression in the length of the spring. • Following are the various cases for the work done by spring force (i) If x is positive, then spring force Fs is in opposite direction of pulling force F or opposite to the displacement. The work done on the object by the applied force = (1/ 2) kx 2 and work done on the object by the spring force, W = − (1/ 2) kx 2 (ii) If x = 0, Fs = 0, so W = 0. (iii) If x is negative and Fs is positive. In this situation, force Fs and displacement x are in opposite direction. Therefore, work done on the object by the spring force is W = − (1/ 2) kx 2 and work done on the spring by the applied force is W = (1/ 2)kx 2 . • In the figure given below, the graph between the spring
force Fs and x is plotted. If in compression of the spring from x m to x = 0, the spring force and direction of displacement is same, then work done,
W′ = ∫ Therefore,
x2 x1
Fapp dx = ∫
x
W = Positive In expansion x2 x1
kx dx = +
1 k ( x 22 − x12 ) 2
W′ = −W
Energy • The capacity or ability to do work is known as energy. • Energy can exist in various forms such as mechanical
energy (sum of potential and kinetic energy), sound energy, heat energy, nuclear energy, etc.
Various Types of Mechanical Energy (i) Kinetic Energy The energy possessed by virtue of its motion is called kinetic energy. • It is expressed as 1 KE = mv 2 , 2 where, m = mass of the body and v = velocity of the body. • Relation between kinetic energy and linear p2 momentum is expressed as K = . 2m
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
(ii) Potential Energy It is the energy possessed by a body or system by virtue of its position of configuration. Following are the types of potential energy (a) Gravitational Potential Energy It is expressed as U = mgh where, m = mass of the body, g = acceleration due to gravity.
(b) Elastic Potential Energy It is expressed as 1 U = kx 2 2 where, k = spring constant and
x = compression or expansion in the spring.
Work-Energy Theorem Work done by all the forces (conservative, nonconservative, external or internal) acting on a particle or an object is equal to the change in its kinetic energy. 1 Thus, W net = ∆KE = K f − K i = m( v 2f − v i2 ) 2 ⇒Wconservative + Wnon-conservative + Wexternal force = ∆KE
Application of Work-Energy Theorem for Motion in Vertical Circle When a body tied to a string is moving in a vertical circle, then the velocities and tension at different positions are given in table below, according to the diagram C
D h
Position of the Body
θ
Ev B
The time rate at which the work is done by the force is said to be the power due to that force. ∆W P= ∆t dW P= ⇒ dt where, work is expressed in terms of variable t time. Also, P = F ⋅ v = Fv cos θ where, F = force applied on the body and
v = velocity of the body.
If the force and velocity of a body are at right angle, then power delivered will be zero.
Collision • It is an isolated event, in which two or more colliding
bodies exert strong forces on each other for a short duration of time. • It is of two types, elastic and inelastic collision. • For every type of collision, linear momentum of colliding body or system is conserved, i.e. m1 u 1 + m2 u 2 = m1 v1 + m2 v2 where, m1 and m2 = masses of the body which undergo collision, u 1 = initial velocity of the body of mass m1 , v1 = final velocity of the body of mass m1
Tension (T)
At lowest point (A)
5gL
6 mg
At highest point (C)
gL
0
At horizontal position (E or D)
3gL
3 mg
3gL + 2gL cosθ
mv 2 + mg cosθ r
At any angle θ (B)
The total mechanical energy (sum of kinetic energy and potential energy) of a system is conserved, if the forces acting on it, are conservative.
u 2 = initial velocity of the body of mass m2 ,
mg cosθ A u mg sinθ
Velocity
Energy can neither be created nor be destroyed, it can only be transformed from one form to another form.
Power
h = height of the body and
Law of Conservation of Energy
and v2 = final velocity of the body of mass m2 . • But kinetic energy of the colliding body and system is conserved in elastic collision only. • Coefficient of Restitution (e) It is the ratio of relative velocity of separation after collision to the relative velocity of approach before collision. It is expressed as | v − v1 | , where 0 ≤ e ≤ 1. e= 2 | u1 − u 2 | • For elastic collision, e = 1and for inelastic collision,
0 < e < 1.
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WORK, ENERGY AND POWER
• For bodies with masses m1 and m2 respectively, following
Along Y -axis, 0 = m1 v1 sin θ − m2 v 2 sin φ
are the important relations for head-on collision. When collision is elastic, Final velocities for m1 , i.e. ( m − m2 ) 2m2 u 2 v1 = 1 u1 + m1 + m2 m1 + m2 and for m2 , v 2 =
2m1 u1 ( m − m1 ) + 2 m1 + m2 m1 + m2
(ii) When collision is inelastic (a) Final velocities for m1 , m − em2 (1+ e )m2 v1 = 1 u1 + u2 m1 + m2 m1 + m2 (1+ e )m1 m − em1 and for m2 , v 2 = u1 + 2 u2 m1 + m2 m1 + m2 (b) Loss in kinetic energy, 1 m1 m2 ( u1 − u 2 ) 2 (1− e 2 ) ∆K loss = 2 ( m1 + m2 ) • If after collision, approaching bodies move with a
common velocity, i.e. e = 0 (get stuck with one another), then collision is said to be perfectly inelastic. • For perfectly elastic oblique collision, Along X -axis, m1 u1 + m2 u 2 = m1 v1 cos θ + m2 v 2 cos φ
v1 m1 u1
m1
m2
Before collision
θ φ
u2 After collision m2 v2
• If two bodies of equal masses undergo perfectly elastic
oblique collision then scattering angle θ + φ =
π and 2
u12 = v12 + v 22 .
Rebounding of a Ball on Collision with Floor (i) Speed of the ball after n th rebound, v n = e n v 0 = e n 2gh (ii) Height covered by the ball after nth rebound, hn = e 2n h (iii) Total distance covered s by the ball before it stops 1 + e2 bouncing, s = h 1 − e2 where, h = height of the ball dropped from ground and
e = coefficient of restitution.
Topical Practice Questions All the exam questions of this chapter have been divided into 5 topics as listed below Topic 1 — WORK
112–117
Topic 2
—
ENERGY
118–125
Topic 3
—
WORK-ENERGY THEOREM AND VERTICAL CIRCLE
126–130
Topic 4
—
POWER
131–134
Topic 5
—
COLLISION
134-144
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 1 WorK 2019 1 A force F = 20 + 10 y acts on a particle in y-direction, where F is in newton and y is in metre. Work done by this force to move the particle from y = 0 to y = 1m is [NEET]
(a) 5 J
(b) 25 J
(c) 20 J
(d) 30 J
2018 2 When a rubber band is stretched by a distance x, it exerts
a restoring force of magnitude F = ax + bx 2 , where a and b are constants. The work done in stretching the unstretched rubber band by L is [JEE Main] 1 2 3 2 3 (a) aL + bL (b) ( aL + bL ) 2 2 3 aL bL 1 aL2 bL3 (d) (c) + + 2 3 2 2 3
3 If a machine perform 4000 J output work and 1000 J is inside loss due to friction, then find the efficiency. (a) 80% (b) 30% [JIPMER] (c) 25% (d) 60%
2017 4 A spring of force constant k is cut into lengths of ratio 1 : 2 : 3. They are connected in series and the new force constant is k′. If they are connected in parallel and force constant is k′ ′, then k ′ : k ′ ′ is [NEET] (a) 1 : 6 (b) 1 : 9 (c) 1 : 11 (d) 1 : 14 5 A particle acted upon by constant forces 4i$ + $j − 3k$ and 3$i + $j − k$ is displaced from the point $i + 2$j + 3k$ to the point 5i$ + 4$j + k$ . The total work done by the forces in SI unit is (a) 20 (e) 35
[Kerala CEE]
(b) 40
(c) 50
(d) 30
6 A force F = − k ( y$i + x$j ) where k is a positive constant, acts on a particle moving in the x- y plane. Starting from the origin, the particle is taken along the positive X-axis to the point ( a, 0) and then parallel to the Y-axis to the point ( a, a ). The total work done by the force on the particle is [AIIMS]
(a) − 2ka 2 (c) − ka
2
(b) 2ka 2 (d) ka
2
7 A spring stores 1 J of energy for a compression of 1 mm. The additional work to be done to compress it further by 1 mm is [Kerala CEE] (a) 1 J (b) 2 J (c) 3 J (d) 4 J (e) 0.5 J 8 Assertion A spring of force constant k is cut into two pieces having lengths in the ratio 1 : 2. The force constant of series combination of the two parts is 3k / 2. Reason The spring connected in series are represented [AIIMS] by k = k1 + k 2 (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2015 9 Force of 50 N acting on a body at an angle θ with horizontal. If 150 J work is done by displacing it 3 m, then θ is [OJEE] (a) 60° (b) 30° (c) 0° (d) 45°
2014 10 A string of length L and force constant k is stretched to obtain extension l. It is further stretched to obtain extension l1 . The work done in second stretching is 1 1 [MHT CET] (b) kl12 (a) kl1 ( 2l + l1 ) 2 2 1 1 (d) k ( l12 − l 2 ) (c) k ( l 2 + l12 ) 2 2
2013 11 A uniform force of (3$i + $j ) N acts on a particle of mass 2 kg. Hence, the particle is displaced from position (2$i + k$ ) m to position (4$i + 3$j − k$ ) m. The work done by the force on the particle is [NEET] (a) 9 J
(b) 6 J
(c) 13 J
(d) 15 J
12 How much work must be done by a force on 50 kg body in order to accelerate it from rest to 20 ms −1 in 10 s? (a) 10−3 J (c) 2 × 103 J
(b) 104 J (d) 4 × 104 J
[UP CPMT]
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WORK, ENERGY AND POWER
13 The vessels A and B of equal volume and weight are immersed in water to depth h. The vessel A has an opening at the bottom through which water can enter. If the work done in immersing A and B are W A and WB respectively, then [WB JEE] (a) W A = WB (b) W A < WB (c) W A > WB (d) None of these 14 A particle is displaced from a position ( 2i$ − $j + k$ ) to another position ( 3$i + 2$j − 2k$ ) under the action of the force ( 2i$ + $j − k$ ). The work done by the force in an arbitrary unit is (a) 8 (c) 12
[Manipal]
(b) 10 (d) 16
19 A gardener pushes a lawn roller through a distance 20 m. If he applies a force of 20 kg-wt in a direction inclined at 60° to the ground, the work done by him is [J&K CET] (a) 1960 J (b) 196 J (c) 1.96 J (d) 196 kJ 20 A force F = − ( yi$ + x$j ) acts on a particle moving in the X-Y plane. Starting from the origin, the particle is taken along the positive X -axis to the point ( 2a, 0) and then parallel to the Y -axis to the point ( 2a, 2a ) . The total work done on the particle is [AMU] 2 2 2 2 (a) −4a (b) −2a (c) 4a (d) 2a
21 The work done by an applied variable force, F = x + x 3 from x = 0 m to x = 2 m, where x is displacement, is
2011 15 Force F on a particle moving in a straight line varies with distance d as shown in the figure. The work done on the particle during its displacement of 12 m is [CBSE AIPMT]
[DUMET]
(a) 6 J
(b) 8 J
(c) 10 J
(d) 12 J
2010 22 A plate of mass m, length b and breadth a is initially lying on a horizontal floor with length parallel to the floor and breadth perpendicular to the floor. The work done to rotate and lie on its breadth is [CBSE AIPMT] b b (b) mg a + (a) mg 2 2
F(N)
2
3
(a) 21 J (c) 13 J
7 12
b − a (c) mg 2
x(m)
(b) 26 J (d)18 J
16 A person is holding a bucket by applying a force of 10 N. He moves a horizontal distance of 5m and then climbs up a vertical distance of 10m. Find the total work done by him. [Manipal] (a) 50 J (b) 150 J (c) 100 J (d) 200 J 17 A moon of mass m orbits a planet of mass M in a perfectly circular orbit of radius R, with a force of gravitational attraction between the two bodies of Fg . How much work is done on the moon by the planet during a single orbit of the moon? [CBSE AIPMT] (c) Fg 2π R (d) Fg π R 2 (a) 0 (b) Fg R 18 Applied force versus position graph of an object is given below. Find the work done by the forces on the object. [AIIMS]
b + a (d) mg 2
23 A force F acting on an object varies with distance x as shown here. The force is in newton and x is in metre. The work done by the force in moving the object from x = 0 m to x = 6 m is [BVP] 3 F(N) 2 1 1 2 3 4 5 6 7 x(m)
(a) 4.5 J
(b) 13.5 J
(c) 9 J
(d) 18 J
2009 24 If W1 , W2 and W3 are the work done in moving a particle from A and B along three different paths 1, 2 and 3 respectively (as shown) in the gravitational field of a point [AMU] mass M, the relation between W1 , W2 and W3 is
F(N) 6 4
B
1 15 5
8
11
x(m)
M
2 3
A –5
(a) 30 J
(b) 34 J
(c) 33 J
(d) 20 J
(a) W1 > W2 > W3 (c) W1 < W2 < W3
(b) W1 = W2 = W3 (d) W2 > W1 > W3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
25 The work done by a force acting on a body is as shown in the graph. The total work done in covering an initial distance of 20 m is [KCET] 20 15 F(N) 10
2007 34 A vertical spring with force constant k is fixed on a table.
5 0
(a) 225 J
33 When a spring is stretched by a distance x, it exerts a force, given by F = ( −5x − 16x 3 ) N. The work done, when the spring is stretched from 0.1 m to 0.2 m is [BCECE] −2 −2 (b) 12 .2 × 10 J (a) 8.7 × 10 J −1 (c) 8.7 × 10 J (d) 12.2 × 10−1 J
5 10 15 20 25 30 s(m)
(b) 200 J
(c) 400 J
(d) 175 J
2008 26 A particle of mass 100 g is thrown vertically upwards with a
speed of 5 ms −1 . The work done by the force of gravity during the time, the particle goes up is [UP CPMT] (a) − 0. 5 J (b) – 1.25 J (c) 1.25 J (d) 0.5 J 27 When the bob of a simple pendulum swings, the work done by tension in the string is [BHU] (a) > 0 (b) < 0 (c) zero (d) maximum
28 A block of mass m = 2 kg is pulled by a force F = 40 N upwards through a height h = 2 m. Find the work done on the block by the applied force F and its weight mg. ( Take, g = 10 ms −2 ) [EAMCET] (a) 80 J, − 45 J (b) 40 J, 35 J (c) zero, 0.25 J (d) 80 J, − 40 J 29 The work done by a particle moving with a velocity of 0.7 c (where, c is the velocity of light) in empty space free of electromagnetic field and far away from all matter is [Manipal]
(a) positive (b) negative (c) zero (d) infinite 30 A spring of spring constant 5 × 103 Nm −1 is stretched initially by 5 cm from the unstretched position. Then, the work required to stretch it further by another 5 cm is (a) 12.50 N-m (b) 18.75 N-m [MP PMT] (c) 25.00 N-m (d) 6.25 N-m 31 300 J of work is done in sliding a 2 kg block up an inclined plane of height 10 m (taking, g = 10 ms −2 ). Work done against friction is [RPMT] (a) 200 J (b) 100 J (c) zero (d) 1000 J 32 A body of mass 3 kg is under a constant force which causes a displacement s in metre in it, given by the relation s = (1/ 3) t 2 , where t is in second. Work done by the force in 2 s is [Haryana PMT] 5 3 8 19 (a) (b) J (c) J (d) J J 19 8 3 5
A ball of mass m at a height h above the free upper end of the spring falls vertically on the spring, so that the spring is compressed by a distance d. The net work done in the process is [CBSE AIPMT] 1 (a) mg ( h + d ) + kd 2 2 1 (b) mg ( h + d ) − kd 2 2 1 2 (c) mg ( h − d ) − kd 2 1 (d) mg ( h − d ) + kd 2 2
35 A body moves a distance of 10 m along a straight line under an action of 5 N force. If, work done is 25 J, then angle between the force and direction of motion of the body will be [BCECE] (a) 75° (b) 60° (c) 45° (d) 30°
2006 36 The work done by a force, F = ( −6x 3 ) $i N, in displacing a particle from x = 4 m to x = − 2 m is (a) 360 J (b) 240 J (c) − 240 J (e) 408 J
[Kerala CEE]
(d) − 360 J
2005 37 A ball of mass m moves with speed v and strikes a wall having infinite mass and it returns with same speed, then the work done by the ball on the wall is [Punjab PMET] (a) zero (b) mv J (c) m / v J (d) v / m J
38 The relationship between the force F and position x of a body is as shown in figure. The work done in displacing the body from x = 1m to x = 5 m will be [KCET] 10 F (N)
5 0
1
2
–5
3
4 5
6 x (m)
–10
(a) 30 J
(b) 15 J
(c) 25 J
(d) 20 J
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WORK, ENERGY AND POWER
Answers 1 11 21 31
(b) (a) (a) (b)
2 12 22 32
(c) (b) (c) (c)
3 13 23 33
(a) (b) (b) (a)
4 14 24 34
(c) (a) (b) (b)
5 15 25 35
(b) (c) (b) (b)
6 16 26 36
(c) (c) (b) (d)
7 17 27 37
(c) (a) (c) (a)
8 18 28 38
(d) (b) (d) (b)
9 (c) 19 (a) 29 (c)
10 (d) 20 (a) 30 (b)
Explanations 1 (b) Work done by a force F, which is variable in nature in moving a particle from y1 to y2 is given by W =
y2
∫ F ⋅ dy
… (i)
y1
Given, force, F = 20 + 10 y, y1 = 0 and y2 = 1 m Substituting the given values in Eq. (i), we get 1 1 10 y2 W = ∫ (20 + 10 y)dy = 20 y + 2 0 0 2
= 20 (1 − 0) + 5(1 − 0) = 25 J ∴Work done will be 25 J.
2 (c) We know that change in potential energy of a system corresponding to a conservative internal force as, f
U f − U i = − W = − ∫ F ⋅ dr i
Given that, F = ax + bx 2 We know that work done in stretching the rubber band by L is given by |dW | = |Fdx | ⇒
L
When the pieces are connected in series, the resultant force constant 1 1 1 1 = + + k′ k1 k2 k3 6x 1 1 1 1 = + + ⇒ k′ = 11 k ′ x 2x 3x In parallel, the net force constant, k ′′ = x + 2x + 3x = 6x k ′ 6x /11 The required ratio = = 1 : 11 k ′′ 6x
8
k 1 = 2k , k 2 = k
5 (b) Work done, W = F ⋅ ds
= (F1 + F2 ) ⋅ (s2 − s1 ) = {(4 i$ + $j − 3k$ ) + (3i$ + $j − k$ )} {(5$i + 4 $j + k$ ) − ($i + 2$j + 3k$ )} $ = (7i + 2$j − 4 k$ ) ⋅ (4 $i + 2$j − 2k$ ) = 28 + 4 + 8 = 40 J
2k 3 So, both Assertion and Reason are incorrect.
9 (c) Given, F = 50 N, W = 150 J and s = 3 m Work done, W = Fs cosθ 150 = 50 × 3 × cosθ 150 cosθ = = 1 ⇒ θ = 0° 150
As, W = ∫ F ⋅ dr
$$ ) ⋅ (dxi$ + dy$j) So, W = − k ∫ ( y$i + xj W = − k ∫ ( ydx + xdy)
10 (d) Work done in stretching a string to
Y
2
0
(a , a )
L
bx 3 ax + = 2 0 3 0
aL2 a × (0)2 b × L3 b × (0)3 + − = − 2 3 3 2 aL2 bL3 Hence, | W | = + 2 3 Wo (a)Q Efficiency = × 100 Wi Given, W o = 4000 J and W i = 4000 + 1000 = 5000J 4000 Q Efficiency (η) = × 100 5000 η = 80%
4 (c) When the spring is cut into pieces, they will have the new force constant. The spring is divided into 1 : 2 : 3 ratio.
r (0, 0)
= − k ∫ d (xy)
(a, 0)
k′ =
Q
6 (c) Given, F = − k ( y$i + x$j)
⇒
The additional work done = W 2 − W 1 = 4 −1 = 3 J F 1 (d) As we know, k = ⇒ k∝ l l k 2 l1 1 = = ⇒ k 1 l2 2 1 1 1 1 1 3 In series, = + = + = k ′ k 1 k 2 2k k 2k
| W | = ∫ (ax + bx ) dx 2 L
3
W 2 = 4 × 10−6 × 106 = 4 J
X
[Q ydx + xdy = ∫ d (xy)]
Hence, W = − k [ xy ]((0a,, 0a)) = − ka2
7 (c) Given, W 1 = 1 J and x = 1 × 10−3 m Work done to compress it 1 mm, 1 1 W 1 = kx12 ⇒ 1 = × k × (1 × 10−3 )2 2 2 ⇒ k = 2 × 106 Work done to compress it further by 1 mm, 1 W 2 = kx22 2 1 = × 2 × 106 × (1 × 10−3 + 1 × 10−3 )2 2
11
obtain an extension l, 1 W 1 = kl 2 2 Similarly, work done in stretching a string to obtain an extension l1 is, 1 W 2 = kl12 2 ∴ Work done in second case, W 1 = W 2 − W 1 = k (l12 − l 2 ) 2 (a) Given, force, F = (3i$ + $j) N, and
r1 = (2$i + k$ ) m r = (4 i$ + 3$j − k$ ) m 2
∴ Displacement, s = r2 − r1 = (4 i$ + 3$j − k$ ) − (2i$ + k$ ) = (2i$ + 3$j − 2k$ ) m ∴ Work done, W = F ⋅ s = (3i$ + $j) ⋅ (2i$ + 3$j − 2k$ ) [Q $i ⋅ $i = $j ⋅ $j = k$ ⋅ k$ = 1] = 3 × 2+ 3 + 0 = 6 + 3 = 9 J
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
12 (b) Given, m = 50 kg, v = 20 ms −1 and t = 10 s As, equation of motion, v = u + at ⇒ 20 = 0 + a × 10 20 = a × 10 ⇒ a = 2 m/s2 Now, distance s = ut +
1 2 at 2
1 × 2 × 10 × 10 or s = 100 m 2 Hence, W = F ⋅ s = ma ⋅ s ⇒s = 0 +
= 50 × 2 × 100 = 104 J
13 (b) Because water enters into the
vessel A, it becomes heavier. Gravity helps it to sink. External work required for immersing A is obviously less than that for immersing B. Hence, W A < W B .
Work done between 8 to 11 m, 1 W 3 = (6)(3) = 9 J 2 Work done between 11to 15 m, 1 W 4 = (−5)(4 ) = 10 J 2 ∴ W net = W 1 + W 2 + W 3 + W 4 = 34 J
16 (c) Given F = 10 N, s = 5 m and θ = 90°(for horizontal motion) ∴ Work done, W 1 = Fs cosθ = 10 × 5 × cos 90° = 0 For vertical, motion, θ = 0° , s = 10 m ∴Work done, W 2 = Fs cos θ = 10 × 10 × cos 0° = 100 J ∴ Total work done, W = W 1 + W 2 = (0 + 100) J = 100 J
17 (a) For an orbiting moon, the gravitational force is perpendicular to the displacement, hence work done by gravitational force is zero. i.e. W = Fgs cos 90° = 0
18 (b) As, work done = area under f -x graph. So, work done between 0 to 5 m, W 1 = (4 ) (5) = 20 J Work done between 5 to 8m, (6 + 4 ) × 3 = 15 J W2 = 2
26
C D F
5 10 15 20 25 30 s(in m)
= Area ABCD + Area CEFD 1 1 = × (15 + 10) × 10 + × (10 + 20) × 5 2 2 = 125 + 75 = 200 J (b) The height (h) traversed by a particle while going up is h=
= − (4 a2 )2 + (4 a2 )2 = − 4 a2
u2 25 = 2g 2 × 9.8 v=0
21 (a) Given, F = x + x 3 x = 0 to
A 0
F ⋅ s = − [ 2a$i + 2a$j ] ⋅ [ 2ai$ + 2a$j ]
and
B
10 5
Work done is independent of path followed, F = [ y$i + x$j ]
= (2i$ + $j − k$ ) ⋅ (i$ + 3$j − 3k$ )
graph 1 = 2 × (7 − 3) + × 2 × (12 − 7) 2 1 = 8 + × 10 = 8 + 5 = 13 J 2
15 F(in N)
20 (a) We know that, work done = F ⋅ s
s = [ 2a, 2a ] − [ 0, 0 ] = (2a − 0), (2a − 0) = (2a, 2a) F = − [ y$i − x$j] = 2ai$ + 2a$j
E
20
θ = 60° and s = 20 m ∴Work done, W = F s cosθ = 20 × 9.8 × 20 × cos 60° = 1960 J
= (2i$ + $j − k$ ) ⋅ [(3i$ + 2$j − 2k$ ) − (2i$ − $j + k$ )] (given)
15 (c) As, work done = Area under (F-x)
25 (b) Work done, W = Area ABCEFDA
19 (a) Given, F = 20 kg-wt = 20 × 9.8 N ,
14 (a) Work done, W = F ⋅ r
W = 2 + 3 + 3 = 8 unit
initial and final positions of the body and not on the nature of path followed by it. So, W1 = W2 = W3
u=5 ms−1
x =2 m
We know that, work done, W = ∫ Fdx
100 g = 0.1 kg
Work done by the gravity force, W = mgh 25 = 0.1 × g × cos180° 2 × 9.8
2
⇒
W = ∫ (x + x 3 )dx
⇒
x2 x4 W = + 4 0 2
0
2
4 16 + 2 4 W =6J W =
22 (c) As, we know that, the centre of mass of rectangular plate is at the geometric centre of body, so initial a height of centre of gravity = 2 b Final height of centre of gravity = 2 b − a b a Work done = mg − = mg 2 2 2 (QW = mgh)
23 (b) Work done in moving the object
when displaced from x = 0 to x = 6 m is W = area of square + area of triangle 1 W = 3 × 3 + × 3 × 3 (from graph) 2 = 9 + 4.5 = 13.5 J
24 (b) Gravitational force is conservative force work done by or against the force in moving a body depends only on the
27
(angle between the force and displacement is 180°) 25 = −1.25 J ∴ W = − 0.1 × 2 (c) As, tension in the string is along the radius of circular path and the displacement of the bob is along the circumference of the path. Hence, again F and s are at 90° and so W = 0.
28 (d) Given, m = 2 kg, F = 40 N and h = 2m As weight = mg = 2 × 10 = 20 N Work done by the applied force, W F = Fh cos 0° As the angle between force and displacement is 0°, therefore work done by applied force, W F = 40 × 2 × 1 = 80 J Similarly, work done by its weight, W mg = mg × h × cos180° = 20 × 2 × − 1= − 40 J
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WORK, ENERGY AND POWER
29 (c) Acceleration of the particle, dv d a= = (0.7 c) = 0 (Q c = constant) dt dt Force on the particle, F = ma = 0 Thus, work done by a particle will be zero.
30 (b) Given, k = 5 × 103 Nm −1 and x1 = x2 = 5 cm = 5 × 10−2 m Work done, W 1 =
1 2 kx1 2
1 × 5 × 103 × (5 × 10−2 )2 = 6.25 J 2 Work done in stretching the spring by 10 cm, i.e. 5 cm + 5 cm 1 W 2 = k (x1 + x2 )2 2 1 = × 5× 103 (5× 10−2 + 5× 10−2 )2 2 = 25 J Net work done, W net = W 2 − W 1 = 25 − 6.25 = 18.75 J = 18.75 N-m =
31 (b) Net work done in sliding a body up to a height h on an inclined plane = Work done against the gravitational force + Work done against the frictional force …(i) ⇒ W = Wg + W f But W = 300 J Given, m = 2 kg and h = 10 m W g = mgh = 2 × 10 × 10 = 200 J Putting these values in Eq. (i), we get 300 = 200 + W f ⇒ W f = 300 − 200 = 100 J
=
d 2 2 × t = dt 3 3
Hence, Eq. (iii) becomes 2 2 1 2 W = ms = m × t 2 = mt 2 3 3 3 9 Given, m = 3 kg, t = 2 s 2 8 W = × 3 × (2)2 = J ∴ 9 3
33 (a) Given,F = (−5x − 16x 3 ) N ⇒
F = − (5 + 16x 2 )x
...(i)
As, Fs = − kx ...(ii) Now from Eqs. (i) and (ii), we get k = 5 + 16x 2
Hence, from Eqs. (i) and (ii), we get d 2s d 2s W = ma s = m 2 s …(iii)Q a = 2 dt dt Now, we have ∴
d 2s d d = dt 2 dt dt
s=
1 2 t 3
1 2 t 3
1 θ = cos−1 = 60° 2
⇒
Hence, angle between the force and the direction of the body is 60°.
36 (d) As, work done = ∫ F ⋅ dx Given,
Therefore, work done in stretching the spring from position x1 to x2 is 1 1 W = k 2x22 − k 1x12 2 2 We have x1 = 0.1m and x2 = 0.2 m. 1 ∴ W = [ 5 + 16 (0.2)2 ](0.2)2 2 1 − [ 5 + 16 (0.1)2 ](0.1)2 2 = 2.82 × 4 × 10−2 − 2.58 × 10−2 = 8.7 × 10−2 J
34 (b) Situation is shown in the figure. When mass m falls vertically on the spring, then the spring is compressed by a distance d. m h m d
F = − (6x 3 )$i N 4
W = − ∫ 6x 3dx,
∴
−2
4
x4 W = −6 4 −2 6 ⇒ W = − [(4 )4 − (−2)4 ] 4 6 = − [ 256 − 16 ] 4 = − 1.5 × 240 Hence, W = − 360 J
⇒
37 (a) As, work done = force × displacement As, there is no displacement produced in the wall, so work done by the ball on the wall is zero. Alternative Method As, there is no change in kinetic energy of the ball, so according to work-energy theorem, work done should be zero.
38 (b) As, work done = area enclosed by
32 (c) As, work done = force × displacement i.e. …(i) W =F ×s But from Newton’s second law, we have force = mass × acceleration …(ii) i.e. F = ma
Given, W = 25 J, F =5N and ∆s = 10 m W ∴ cosθ = F ⋅ ∆s 25 1 = = 5 × 10 2
F-x graph from x = im to x = 5 m
Hence, net work done (W net ) in the process is W = Potential energy stored in the spring + Loss of potential energy of 1 mass = mg (h + d ) − kd 2 2
35 (b) Work is measured by the product of the applied force and the displacement of the body in the direction of the force. Work = Force × Displacement W = (F cosθ ) × ∆s
10 F(N) 5 0 –5
A
B
I
C 1 M
2 N
D E H 3 4 F
J 5 6 x (m)
G
–10
= Area of ABNM + area of CDEN − area of EFGH + area of HIJ 1 = 1 × 10 + 1 × 5 − 1 × 5 + × 1 × 10 2 = 10 + 5 − 5 + 5 = 15 J
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 2
Energy 2019 1 Initially spring in its natural length, now a block at mass 0.25 kg is released, then find out the value of maximum force by system on the floor. [AIIMS] 0.25 kg
2 kg
(a) 15 N
(b) 20 N
(c) 25 N
(d) 30 N
2 When a block of mass M is suspended by a long wire of length L, the length of the wire becomes (L + l). The elastic potential energy stored in the extended wire is [NEET] 1 1 (c) MgL (d) Mgl (a) MgL (b) Mgl 2 2 −1
3 The rate of decrease of kinetic energy is 9.6 Js . Find the magnitude of force acting on particle when its speed is 3 ms −1 . [JIPMER] (a) 3.2 N (b) 4.8 N (c) 2.4 N (d) 5.6 N
2018 4 Kinetic energy of a particle is increased by 4 times. What will be the relation between initial and final momentum? (a) p 2 = 2 p1 (b) p 2 = p1 / 2 [JIPMER] (c) p 2 = p1 (d) p 2 = 4 p1
2017 5 The figure shows a mass m on a
k
m
F frictionless surface. It is connected to rigid wall by the mean of a massless spring of its constant k. Initially, the spring is at its natural position. If a force of constant magnitude starts acting on the block towards right, then the speed of the block when the deformation in spring is x, will be [AIIMS]
(a)
2F ⋅ x − kx 2 m
(b)
F ⋅ x − kx 2 m
(c)
x( F − k ) m
(d)
F ⋅ x − kx 2 2m
6 A skier starts from rest at point A and slides down the hill without turning or breaking. The friction coefficient is µ. When he stops at point B, his horizontal displacement is s. What is the height difference between points A and B?
(The velocity of the skier is small, so that the additional pressure on the snow due to the curvature can be neglected. Neglect also the friction of air and the dependence of µ on the velocity of the skier.) [JIPMER] µ (a) h = µs (b) h = s (c) h = 2µs (d) h = µs 2
7 A person of weight 70 kg wants to loose 7 kg by going up and down 12m high stairs. Assume he burns twice as much fat while going up than going down. If 1 kg of fat is burnt on expending 9000 k-cal. How many times must he go up and down to reduce his 7 kg weight?(Take, g = 10 ms − 2 ) (a) 18 × 103 times (b) 24 × 103 times [AIIMS] (c) 30 × 103 times
(d) 21 × 103 times
2015 8 A load of mass m falls from a height h on the scale pan hung from a spring as shown in figure. If the spring constant is k and mass of the scale pan is zero and the mass m does not bounce relative to the pan, then the amplitude of vibration is
mg mg + k k
[AIIMS]
(b) mg / k 1 + 2hk / mg
(a) mg (c)
m h
1 + 2hk mg
(d) None of these
2013 9 Two bodies of masses m and 2 m have equal kinetic energies. The ratio of their linear momenta is 1 1 (a) 1 (b) (c) (d) 2 2 2
[KCET]
10 Assertion According to the law of conservation of mechanical energy, change in potential energy is equal and opposite to the change in kinetic energy. Reason Mechanical energy is not conserved. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect (d) Both Assertion and Reason are incorrect. (e) Assertion is incorrect but Reason is correct.
119
WORK, ENERGY AND POWER
2012 11 The graph of kinetic energy ( K ) of a body versus velocity ( v ) is represented as
[UP CPMT] K
K
(b)
(a)
18 The graph below represents the potential energyU as a function of position r for a particle of mass m. If the particle is released from rest at position r0 , what will its speed be at position 3r0 ? [CBSE AIPMT]
v
v
K
K
(d)
(c) v
17 A body is projected horizontally with a velocity of u ms −1 at an angle β with the horizontal. The kinetic energy at the highest point is (3 / 4)th of the initial kinetic energy. The value of β is [WB JEE] (a) 30° (b) 45° (c) 60° (d) 120°
U(r) 3 U0
v
12 A particle is projected from the ground with a kinetic energy E at an angle of 60° with the horizontal. Its kinetic energy at the highest point of its motion will be [WB JEE] E E E E (a) (c) (d) (b) 2 4 8 2
2011 13 Two bodies of masses 4 kg and 5 kg are moving with equal momentum. Then, the ratio of their respective kinetic energies is [Kerala CEE] (a) 4 : 5 (b) 2 : 1 (c) 1 : 3 (d) 5 : 4 (e) 1 : 2
14 A body of mass 5 kg is thrown vertically up with a kinetic energy of 490 J. The height at which the kinetic energy of the body becomes half of the original value is [KCET] (acceleration due to gravity = 9.8 ms −2 ) (a) 5 m (b) 2.5 m (c) 10 m (d) 12.5 m
2010 15 A particle which is constrained to move along the x-axis, is subjected to a force in the same direction which varies with the distance x of the particle from the origin is F ( x ) = − kx + ax 3 . Here, k and a are positive constants. For x ≥ 0, the functional from of the potential energy U ( x ) of the particle is [Manipal] U(x)
U(x)
(a)
(b) X
X U(x)
U(x)
(c)
(d) X
X
16 A particle of mass 2 mg moves with constant speed and is found to pass two points 5.0 m apart in a time interval of 5 ms. Find the kinetic energy of the particle. [AMU] (a) 1 J (b) 2 J (c) 3 J (d) 4 J
2 U0 U0
O
1r0
2r0
3r0
4r0
r
3U 0 4U 0 2U 0 (b) (c) (d) m m m (e) The particle will never reach position 3r0
(a)
6U 0 m
19 For a moving particle (mass m, velocity v) having a momentum p, which one of the following correctly describes the kinetic energy of the particle? [J&K CET] 2 2 p p v v (a) (d) (b) (c) 2m 2m 2m 2m 20 An open water tight railway wagon of mass 5 × 103 kg coasts at an initial velocity of 1.2 ms −1 without friction on a railway track. Rain falls vertically downwards into the wagon. What change occurs in kinetic energy of the wagon, when it has collected 103 kg of water? [AFMC] (a) 900 J (b) 300 J (c) 600 J (d) 1200 J
2009 21 A particle of mass m at rest is acted upon by a force P for a time t. Its kinetic energy after an interval t is [Manipal] Pt P 2t 2 P 2t 2 P 2t 2 (c) (d) (a) (b) 2m m 2m 3m
22 If the linear momentum of a body is increased by 50%, then the kinetic energy of that body increases by [KCET] (a) 100% (b) 125% (c) 225% (d) 25%
2008 23 A body is thrown vertically up with certain initial velocity. The potential and kinetic energies of the body are equal at a point P in its path. If the same body is thrown with double the velocity upwards, the ratio of potential and kinetic energies of the body when it crosses the same point is [Punjab PMET] (a) 1 : 1 (b) 1 : 4 (c) 1 : 7 (d) 1 : 8
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
24 In the figure shown, a ball of mass 1 kg is rolled with a kinetic P energy of 330 J. It reaches R 15 m through the path PQR. Find the speed of the ball at R, if its potential energy at P is zero (a) 52 m/s (b) 45 m/s (c) 40 m/s
32 A bread gives 21 kJ energy to a boy of mass 40 kg. If the efficiency is 28%, then the height that can be climbed by him using this energy is [BHU]
Q
30 m
[AMU]
(d) 31 m/s
25 Potential energy of a particle is to α coordinate by equation x 2 − 2x will be equilibrium at [MP PET] (a) x = 0.5 (b) x = 2 (c) x = 1 (d) x = 4 26 Two bodies of masses m1 and m2 are acted upon by constant force F for a time t. They start from rest and acquire kinetic energies E1 and E 2 , respectively. Then, E1 is E2 [KCET] (a)
m1 m2 m1 + m2
(b)
m1 m2
(c)
m2 m1
(d) 1
27 A particle moves in a straight line with retardation proportional to its displacement. Its loss of kinetic energy for any displacement x is proportional to [JCECE] x 2 (c) x (d) log e x (b) e (a) x
2007 28 A free α-particle and a free proton, which are separated by a distance of 10−10 m are released. The KE of α-particle when at infinite separation is (a) 46 × 10−19 J (b) 23 × 10−19 J (c) 36.8 × 10−19 J (d) 9.2 × 10−19 J
[AFMC]
29 A spherical ball of mass 20 kg is stationary at the top of a hill of height 100 m. It rolls down a smooth surface to the ground, then climbs up another hill of height 30 m and finally rolls down to a horizontal base at a height of 20 m above the ground. The velocity attained by the ball is (a) 40 ms −1 (b) 20 ms −1 [AIIMS] (c) 10 ms −1
(d) 10 30 ms −1
30 Two bodies A and B having masses in the ratio of 3 : 1 possess the same kinetic energy. The ratio of linear momentum of B to A is [UP CPMT] (a) 1 : 3 (c) 1: 3
(a) 22.5 m
R
(b) 3 : 1 (d) 3 : 1
31 A cubical vessel of height 1 m is full of water. What is the amount of work done in pumping water out of the vessel? (take, g = 10 ms −2 ) [WB JEE] (a) 1250 J (b) 5000 J (c) 1000 J (d) 2500 J
(b) 15 m
(c) 10 m
(d) 5 m
33 A particle is released from a height h. At a certain height, its kinetic energy is two times its potential energy. Height and speed of the particle at that instant are [BVP] gh h 2gh h (a) , (b) , 2 3 3 3 3 2h 2gh h (c) (d) , 2gh , 3 3 3 34 A particle of mass m1 is moving with a velocity v1 and another particle of mass m2 is moving with a velocity v 2 . Both of them have the same momentum but their different kinetic energies are E1 and E 2 , respectively. If m1 > m2 , then [MP PMT] E1 m1 (a) E1 < E 2 (b) = E 2 m2 (c) E1 > E 2 (d) E1 = E 2 35 40 J
U(x)
20 J x0
x1
x2
x3
x4
x5
x
– 20 J – 40 J
The potential energy functionU ( x ) is associated with a conservative force F and described by the graph given above. If a particle being acted upon by this force has a kinetic energy of 1.0 J at position x 0 . What is the [AIIMS] particle’s kinetic energy at position x 4 ? (a) 60 J (b) 7.0 J (c) 2.0 J (d) −7.0 J
36 Two springs of spring constant 1500 Nm −1 and 3000 Nm −1 , respectively are stretched with the same force. They will have potential energy in ratio [BCECE] (a) 1 : 2 (b) 2 : 1 (c) 1 : 4 (d) 4 : 1
2006 37 If we throw a body upwards with velocity of 4 ms −1 , at what height does its kinetic energy reduce to half of the [AFMC] initial value? (Take, g = 10 ms −2 ) (a) 4 m (b) 2 m (c) 1 m (d) 0.4 m
38 If the kinetic energy of a body is increased two times, its momentum will [RPET] (a) half (b) remain unchanged (c) be doubled (d) increase 2 times
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WORK, ENERGY AND POWER
2005 41 A machine which is 75% efficient, uses 12 J of energy in
39 A steel ball of mass 5 g is thrown downwards with velocity 10 ms −1 from height 19.5 m. It penetrates sand by 50 cm. The change in mechanical energy will be (take, g = 10 ms −2 ) [DUMET] (a) 1 J (b) 1.25 J (c) 1.51 J (d) 1.75 J
lifting 1 kg mass through a certain distance. The mass is then allowed to fall through the same distance. The velocity at the end of its fall is [BHU]
40 Which of the following graphs shows variation of the elastic potential energy (U ) with displacement position x ? U
(a)
(b) x
x
U
U
(c)
(c) 24 ms −1
(d) 32 ms −1
43 An apple gives 20 kJ energy to a boy. How much height can he climb by using this energy, if his efficiency is 20%? (Mass of boy = 40 kg) [RPMT]
(d) x
(b) 18 ms −1
42 When a man increases his speed by 2 ms −1 , he finds that his kinetic energy is doubled, the original speed of the man is [DUMET] (b) 2( 2 + 1) ms −1 (a) 2( 2 − 1) ms −1 (c) 4.5 ms −1 (d) None of these
[J&K CET] U
(a) 12 ms −1
x
(a) 22.5 m
(b) 15 m
(c) 10 m
(d) 5 m
Answers 1 11 21 31 41
(c) (c) (b) (b) (b)
2 12 22 32 42
(b) (c) (b) (b) (b)
3 13 23 33 43
(a) (d) (b) (b) (c)
4 14 24 34
(a) (a) (d) (a)
5 15 25 35
(a) (d) (c) (b)
6 16 26 36
(a) (a) (c) (b)
7 17 27 37
(d) (a) (a) (d)
8 18 28 38
(b) (c) (d) (d)
9 19 29 39
(c) (a) (a) (b)
10 20 30 40
(d) (c) (c) (c)
Explanations 1 (c) If x be the compression in the spring, when a block of 0.25 kg is released. From energy conservation, Potential energy of spring = Potential energy of block 1 2 kx = mgx 2 where, k is force constant of spring. kx = 2 mg = 2 × 0.25 g kx = 0.5 g i.e. Force applied by the spring on the block, F = kx ⇒ F = 0.5 g
From Free body diagram, N
stored as elastic potential energy in wire and given by
2kg
F
L
L
2g
∴ Maximum force by system on the floor, N = F + 2g = 0.5 g + 2 g = 2. 5g (Q g = 10 ms −2) = 25 N
2 (b) In stretching a wire, the work done against internal restoring force is
l M Mg
U =W =
1 × Force (F ) 2
× Elongation (l ) 1 1 1 = Fl = × Mg × l = Mgl 2 2 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
3 (a) Given, rate of decrease in kinetic energy, dK = 9.6 Js −1 dt When speed, v = 3 ms −1, then force F =? 1 Kinetic energy, K = mv 2 2 Differentiating with respect to t, we get dv dK 1 dv = m2v = vm dt dt dt 2 dp = vm dt dp dK Q force, F = m = vF dt dt 1 dK ∴ F= ⋅ v dt 1 = × 9.6 3 = 3.2 N
4 (a) Relation between kinetic energy and momentum is p1 = 2mK 1 Q Kinetic energy is increased by 4 times, then K2 = 4K1 Hence, p2 = 2mK 2 = 2m (4 K 1 ) p2 = 2 2mK 1 or
p2 = 2 p1
5 (a) Free body diagram of block is shown below N kx
F mg
Now, from the energy conservation, W = ∆K 1 ⇒ W F + W sp = mv 2 2 1 2 1 2 ⇒ F ⋅ x − kx = mv 2 2 ∴
v=
2F ⋅ x − kx 2 m
where, x0 is maximum elongation in spring and mgx0 is the potential energy due to elongation. 1 ⇒ kx02 − mgx0 − mgh = 0 2 2mg 2mg x0 − h=0 ⇒ x02 − k k
6 (a) According to question, the situation is shown in the figure Q A
O ∆L
s
∆L θ
∆s
P
B
∆s
For a sufficiently, safe-horizontal displacement ∆s can be considered straight. If the corresponding length of path element is ∆L, the friction force is given by ∆F = µmg (∆L cosθ ) From ∆OPQ , ∆s cosθ = ∆L ∆s So, ∆F = µmg∆L = µmg∆s ∆L
= (mg / k ) 1 + 2hk / mg
9 (c) Kinetic energy is the energy possessed by a body due to its velocity. 1 …(i) K = mv 2 2 where, m is its mass
Adding up, we find that along the whole path, the total work done by the friction force is µmgs. By energy conservation, this must equals to the decrease mgh in potential energy of skier. ∴ µmgs = mgh Hence, h = µs
Momentum ( p) = mass (m) × velocity (v ) ...(ii) From Eqs. (i) and (ii), we get p = 2mK = p ∝ m Given, m1 = m, and m2 = 2m p1 1 ∴ = p2 2
7 (d) Given, m = 70 kg, g = 10 ms − 2 and h = 12 m In going up and down once. mgh Number of k-cals burnt = mgh+ 2 =
10 (d) According to the law of conservation of mechanical energy, for conservative forces, the sum of kinetic energy and potential energy remains constant and throughout the motion it is independent of time. This is the law of conservation of mechanical energy, i.e. KE + PE = total energy = constant.
3 3 70 × 10 × 12 mgh = × 2 2 4.2 × 1000
= 3 k-cal Total number of k-cal to be burnt for loosing 7 kg of weight = 7 × 9000 = 63000 k-cal ∴Number of times the person has to go up and down the stairs 63000 = = 21000 3 3
= 21 × 10 times
8 (b) Given, spring constant = k From law of conservation of energy, 1 mgh = kx02 − mgx0 2
2
2mg 2mg h +4× k k x0 = 2 Here, we take positive sign. Amplitude = elongation in spring for lowest extreme position − elongation in spring for equilibrium position So, amplitude = x0 − x1 [Q x1 = 0 ] 2mg ± k
11
Hence, both Assertion and Reason are incorrect. 1 (c) As we know that, KE = mv 2 2 So, kinetic energy is directly proportional to the square of velocity. K ∝ v2 As this equation resembles equation of parabola as m is constant, hence option (c) represents a parabola.
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WORK, ENERGY AND POWER
12 (c) At ground, kinetic energy,
1 2 mu 2 At highest point, ux ≠ 0 and uy = 0 E=
1 m(u cos 60° )2 (Qθ = 60°) 2 E ⇒ E′ = 4
So, E′ =
13 (d) As, KE =
p2 2m
The kinetic energy is inversely proportional to the mass of the body, while momentums are equal, so 1 KE ∝ m KE 1 m2 5 Hence, = = KE 2 m1 4
14 (a) Given, m = 5 kg , (KE)i = 490 J and (KE) f = 245 J By the law of conservation of energy, (KE)i = (KE) f + mgh 490 = 245 + 5 × 9.8 × h h=
490 − 245 245 = =5m 5 × 9.8 49
15 (d) We know that, dU dx dU = − F ⋅ dx
⇒ ⇒
x
U = − ∫ (− kx + ax ) dx 3
0
U =
Also we get, U = negative for x >
2k a
From the given function, we can see that F = 0 at x = 0 i.e. slope of U -x graph is zero at x = 0. Hence, option (d) is correct.
16 (a) Given, mass = 2 mg = 2 × 10−6 kg, Distance = 5.0 m and time, t = 5 ms = 5 × 10−3 s Now, velocity distance 5 m /s = = time 5 × 10−3 = 1000 m/s
1 point would be equal to m (u cosβ )2 as 2 the vertical component of the velocity is zero. 1 ⇒ KE = mu2 cos2 β 2
21 (b) Given, force, P = ma 1 2 mv 2 1 m2 (v 2 ) 1 m2a2t 2 = = 2 m 2 m (Q v = at, as u = 0)
As the kinetic energy, K =
u sin β
22
β u cos β
The initial kinetic energy (K) is the maximum kinetic energy. So, KE = K cos2 β 3 Given, K cos2 β = K 4 3 ⇒ cos β = 2 So, β = 30°
2
So,
9 K 2 p22 150 = = = 4 K 1 p12 100
K 9 Thus, 2 − 1 × 100 = − 1 ×100 4 K1 = 125%
23 (b) In the first case, at a point P, its kinetic and potential energies are equal, i.e.
...(i)
So, by putting the values in Eq. (i), 1 3U 0 + 0 = 2U 0 + mv 2 2 2U 0 v= ⇒ m
19 (a) Kinetic energy of a particle,
1 2 mv 2 p2 or K = , where p is the momentum. 2m (Q p = mv ) K =
20 (c) If v′ is the final velocity of the wagon, then applying the principle of conservation of linear momentum, we get ⇒ mv = m′ v′ where m, v′ are final mass and velocity of wagon. Given, m = 5 × 103 kg, v = 12 . ms −1 and
P 2t 2 (Q P = ma) 2m (b) Kinetic energy of the body, p2 K = 2m Since the mass remains constant, so K ∝ p2. =
u
conservation of energy, U i + Ki = U f + K f
kx 2 ax 4 − 2 4 ∴ We get, U = 0 at x = 0 2k and x= a ⇒
17 (a) The kinetic energy at the highest
18 (c) According to the law of
F=
v ′ = 1 ms−1 1 1 Change in KE = m′ v′ 2 − mv 2 2 2 1 3 = (6 × 10 ) × 12 2 1 − (5 × 103 ) × (1.2)2 = 600 J 2
1 mv 2 2 1 = × 2 × 10−6 (103 )2 = 1 J 2
and KE =
m′ = (5 × 103 + 103 ) kg
⇒ 5 × 103 × 1.2 = (5 × 103 + 103 ) × v ′
v
PE = KE P h O
Ground
v2 1 2 mv = mgh ⇒ h = 2g 2
…(i)
In the second case, when body’s velocity is 2v, then at the same point P. The ratio of potential and kinetic energy is v2 mg × PE 1 2g = = 1 KE m(2v )2 4 2
24 (d) Given, mass of ball = 1.0 kg KE = 330 J To find, speed of ball at R Q P 15 m
30 m
R
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
According to conservation of energy, (KE)at P + (PE)at P = (KE)at R = (PE)at R 1 1 mv12 + mgh = mv22 + 0 2 2 1 330 + 1 × 10 × 15 = × 1 × v 2 2 2 (330 + 150) = v 2 960 = v 2 ⇒
v = 31 m / s
25 (c) Given, the potential energy of particle, U = x 2 − 2x
For stable equilibrium position,
dU =0 dx
⇒ 0 = 2x − 2, ⇒ x = 1 d 2 Hence, 0 = (x − 2x ) dx
If the initial momentum of two particles system is zero, their final momentum must also be zero. ∴Numerical value of the momentum of each particle = p p2 KE of proton = = E (say ) 2m Kinetic energy of α-particle p2 E = = 2(4 m) 4 Total kinetic energy E = E + = 46.08 × 10−19 J 4 4 ∴ E = × 46 × 10−19 J 5 = 36.8 × 10−19 J 36.8 × 10−19 4 = 9.2 × 10−19 J
∴KE of α-particle =
26 (c) Momentum acquired by the bodies, p1 = p2 = Ft Now, their kinetic energies, p2 p2 and E2 = E1 = 2m1 2m2 E1 m2 = E2 m1
∴
where a is the acceleration, x is the displacement and k is a proportionality constant. v dv = −k x dx ⇒ v dv = − kx dx Let for any displacement from 0 to x, the velocity changes from v0 to v. ⇒
∫v
h1 = 30 m
0
⇒
2
v − 2
0
v02
=−
kx 2 2
h2 = 20 m
v 2 − v02 mk x 2 ⇒ m =− 2 2 ⇒
= 2 × 10 × 80 = 40 ms−1
30 (c) Kinetic energy of the body is given by 1 2 mv 2
and linear momentum, p = mv From Eqs. (i) and (ii), we get
∆K ∝ x 2
EK =
(∆K is loss in kinetic energy)
28 (d) As, kinetic energy of both
α-particle and proton = potential energy of the two particles =
1 2 mv + mgh2 2 1 ⇒ mg (H − h2 ) = mv 2 2 ⇒ v = 2g (100 − 20) mgH =
EK =
(2e)(e) 2 × (1.6 × 10−19 )2 × 9× 109 = 4 πε 0r 10−10 (Q r = 10−10 m) = 46.08 × 10−19 J
∴
m2v 2 p2 = 2m 2m
p = 2mEK
When EK1 = EK2 p12 p2 = 2 ⇒ 2m1 2m2 or
p1 = p2
m1 m2
p2 1 = p1 3
31 (b) The total volume of water in vessel, 1 m 2
l
Centre of mass l l
V = l3 = 1 m3 Given, m = 1 × 1000 = 1000 kg From conservation of energy, 1 W = mgh = 1000 × 10 × = 5000 J 2
Energy of one bread = 21 kJ = 21 × 103 J
h1
x
v dv = − ∫ kx dx
(given)
utilizes potential energy = mgh In order to climb, he will use the efficient energy. Also, 1 kJ = 103 J
conservation of energy,
H = 100 m
or
3 1
p1 = p2
32 (b) In order to climb a height h, the boy
29 (a) According to the law of
27 (a) From given information a = − kx,
v
⇒
…(i) …(ii)
Efficiency of boy = 28% Hence, energy consumed by the boy, 28 …(i) E= × 21000 = 5880 J 100 From the law of conservation of energy, this energy is utilized in giving potential energy mgh, where g is the acceleration due to gravity. …(ii) ∴ mgh = 40 × 9.8 × h Equating Eqs. (i) and (ii), we have 40 × 9.8 × h = 5880 5880 h= = 15 m ⇒ 40 × 9.8
33 (b) Total mechanical energy = mgh. KE 2 = PE 1 2 1 KE = mgh and PE= mgh 3 3
As given, ⇒
Height from the ground at this h instant, h′ = 3 Speed of particle at this instant, v = 2g (h − h′ ) gh 2h = 2g = 2 3 3
125
WORK, ENERGY AND POWER
34 (a) Kinetic energy, E = or ∴
p2 2m
37 (d) Initial kinetic energy of the body 1 1 = Mv 2 = M (4 )2 = 8M 2 2 Let at height h, the kinetic energy reduces to half, i.e. it becomes 4M. It is also equal to potential energy.
p = 2mE p1 = p2
m1E1 m2E2
But it is given that, p1 = p2 ∴ m1E1 = m2E2 E1 m2 ⇒ = E2 m1 Now, if m1 > m2 m1 >1 ⇒ m2
…(i)
Hence, Mgh = 4 M 4 4 or h = = = 0.4 m g 10
42 (b) Man possesses kinetic energy,
38 (d) Kinetic energy of particle, p12 2m p12 = 2mK K =
…(ii)
Thus, Eqs. (i) and (ii) give E1 / E2 < 1 ⇒ E1 < E2 of energy, U i + Ki = U f + K f where,U i , K i are initial PE and KE of a particle at x0 andU f , K f are final PE and KE of particle at x4. So, 4.0 + 10 . = −2.0 + K f ⇒ K f = 7.0 J
36 (b) The work done in pulling the string is stored as potential energy in the spring, 1 …(i) U = kx 2 2 where, k is spring constant and x is distance through which it is pulled. Also for spring, force ∝ displacement
v2 = (v + 2) ms−1 When K 2 = 2K 1
p22 = 2m × 2K , ⇒ ⇒
p22
=
2 p12 ,
Then,
p2 = 2 p1
39 (b) The change in mechanical energy, ∆U = mg (h + x ) +
1 2 mv 2
and
∆U = 0.005 × 10(19.5 + 0.5) 1 + × 0.005 × (10)2 2 1 ∆U = 0.005 × 10 × 20 + × 0.005 × 100 2 = 1.25 J
Hence, parabolic graph is obtained.
and
k 2 = 3000 Nm −1
∴
U 1 k 2 3000 2 = = = U 2 k 1 1500 1
orU 1 : U 2 = 2 : 1
...(ii)
[Q From above equation, v=−
∴
x
2
v2 − 4 v − 4 = 0
g = 10 ms .
U
⇒ F = kx where, k is spring constant. F Putting, x = in Eq. (i), we get k
⇒
K1 v2 = 2K 1 (v + 2)2
−2
energy (U ) with displacement (x ) is 1 given as U = kx 2 ⇒U ∝ x 2 2
Pulled
⇒
K 1 v12 = K 2 v22
Given, m = 5g = 0.005 kg, h = 19.5 m x = 50 cm = 0.5 m , v = 10 ms−1
40 (c) The variation of elastic potential
Given, k 1 = 1500 Nm −1
because of its velocity (v ). When m is mass of man, then 1 K = mv 2 2 Given, v1 = v , m1 = m2 = m
When kinetic energy = 2K
35 (b) According to law of conservation
F2 1 F U = k = 2 k 2k
Applying the law of conservation of energy, 1 2 mv = 9 2 2×9 18 v= = ⇒ m 1 = 18 ms−1
41 (b) Potential energy of the mass at a height above the surface is given by 75 …(i) = × 12 = 9 J 100 Now, KE of the mass at the end of fall 1 …(ii) = mv 2 2
b ± b2 − 4 ac 2a
a = 1, b = − 4, c = − 4] This gives, 4 + 16 + 16 2 4 + 32 = 2 = 2( 2 + 1) ms −1
v1 =
v1 = 2( 2 + 1) ms−1
43 (c) Energy of one apple = 20 × 103 J Efficiency of the boy = 20% = 0. 20 Mass of the boy, m = 40 kg Here the actual energy consumed by the boy is given by …(i) 0.2 × 20000 = 4000 J and the energy consumed by the boy in climbing h metre height is given by = mgh = 40 × 9.8 × h J …(ii) Equating Eqs. (i) and (ii), we get 40 × 9.8 × h = 4000 J 4000 h= = 10 m 40 × 9.8
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 3
Work-Energy Theorem and Vertical Circle 2019 1 An object of mass 500 g, initially at rest acted upon by a variable force whose x component varies with x in the manner shown. The velocities of the object a point x = 8 m and x = 12 m, would be the respective values of (nearly) [NEET (Odisha)] F (N) 20
2016 6 What is the minimum velocity with which a body of mass
10 4
5 8
10 12
m must enter a vertical loop of radius R, so that it can complete the loop? [NEET]
x (m)
–10 –20 –25 −1
−1
−1
−1
(a) 18 ms and 24.4 ms (b) 23 ms and 24.4 ms −1 −1 (c) 23 ms and 20.6 ms (d) 18 ms −1 and 20.6 ms −1
2 A mass mis attached to a thin wire and whirled in a vertical circle. The wire is most likely to break when [NEET] (a) the wire is horizontal (b) the mass is at the lowest point (c) inclined at an angle of 60° from vertical (d) the mass is at the highest point 3 Find the maximum radius of circle, so that the block can complete the circular motion. [JIPMER] H=5cm
(a) 5 cm
(b) 3 cm
R
(c) 2 cm
(d) 4 cm
2018 4 A body initially at rest and sliding along a frictionless track from a height h (as shown in the figure) just completes a vertical circle of diameter AB = D. The height h is equal to [NEET] B
h
(a)
7 D 5
Reason In this event, the velocity at the highest point will be zero. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
(c)
3 D 2
(b) 3gR
(c) 5gR
(d) gR
7 A particle of mass 10 g moves along a circle of radius 6.4 cm with a constant tangential acceleration. What is the magnitude of this acceleration, if the kinetic energy of the particle becomes equal to 8 × 10−4 J by the end of the second revolution after the beginning of the motion? [NEET] −2 −2 −2 (d) 01 (a) 015 . ms −2 . ms (b) 0.2 ms . ms (b) 018
2015 8 A block of mass 10 kg, moving in x-direction with a
constant speed of 10 ms −1 , is subjected to a retarding force F = 01 . x Jm −1 during its travel from x = 20 m to 30 m. Its final kinetic energy will be [CBSE AIPMT] (a) 475 J (b) 450 J (c) 275 J (d) 250 J
2012 9 One end of a string of length 1.0 m is tied to a body of mass 0.5 kg. It is whirled in a vertical circle with angular frequency 4 rads −1 . The tension in the string when the body is at the lower most point of its motion will be equal to (take, g = 10 ms −2 ) [AMU] (a) 3 N
A
(b) D
(a) 2gR
(d)
5 D 4
2017 5 Assertion For looping a vertical loop of radius, r the minimum velocity at lowest point should be 5gr.
(b) 5 N
(c) 8 N
(d) 13 N
2011 10 A body of mass 6 kg is acted upon by a force which
t2 m, where t is 4 the time in second. The work done by the force in 2 s is causes a displacement in it given by x =
[WB JEE]
(a) 12 J
(b) 9 J
(c) 6 J
(d) 3 J
127
WORK, ENERGY AND POWER
11 A can filled with water is revolved in a vertical circle of radius 4 m, so that the water does not fall down. The time period for a revolution is about [JCECE] (a) 2 s (b) 4 s (c) 8 s (d) 10 s 12 A stone of mass m is tied to a string and is moved in a vertical circle of radius r making n rev/min. The total tension in the string when the stone is at the lowest point is (a) mg (b) m( g + πnr 2 ) [VITEEE] π 2 n 2 r (d) m g + 900
(c) m( g + nr )
2010 13 A 10 kg mass moves 3.0 m
4
Force
against a retarding force shown in the figure. If the force is zero at the beginning, then how much kinetic energy is changed?[VMMC] (a) 6 J (b) − 6 J (c) 12 J (d) − 12 J
1 0
1
2 3 Distance
C
D
B
(c) C
(d) D
2008 15 A body of mass 10 kg initially at rest acquires velocity 10 ms −1 . What is the work done?
[DUMET]
(b) 500 J (d) –50 J
16 Consider a drop of rain water having mass 1 g falling from a height of 1 km. It hits the ground with a speed of 50 ms −1 . Take, g constant with a value of 10 ms −2 . The work done by the (i) gravitational force and (ii) resistive force of air is (a) (i) −10 J and (ii) − 8.25 J [NEET] (b) (i) 1.25 J and (ii) − 8.25 J (c) (i) 100 J and (ii) 8.75 J (d) (i) 10 J and (ii) − 8.75 J 17 A body of mass 1 kg is rotating in a vertical circle of radius 1 m. What will be the difference in its kinetic energy at the top and bottom of the circle? (Take, g = 10 ms − 2 ) [Manipal] (a) 10 J
(b) 20 J
(c) 20 N
(d) 6 N
19 A particle is moving in a vertical circle. The tensions in the string when passing through two positions at angles 30° and 60° from vertical (lowest position) are T1 and T2 respectively, then [Punjab PMET] (a) T1 = T2 (b) T2 > T1 (c) T1 > T2 (d) tension in the string always remains the same 20 According to the work-energy theorem, the work done by the net force on a particle is equal to the change in its (a) kinetic energy (c) linear momentum (e) acceleration
(b) potential energy (d) angular momentum
21 A body is just being revolved in a vertical circle of radius R with a uniform speed. The string breaks when the body is at the highest point. The horizontal distance covered by the body after the string breaks is [MP PMT] (a) 2R (b) R (c) R 2 (d) 4R
2007 22 An open knife edge of mass m is dropped from a height h
A
(a) − 500 J (c) 50 J
(b) 26 N
[Kerala CEE]
2
vertical circle. If string breaks at the position of maximum tension, it will break at [PMET]
(b) B
(a) 30 N
3
2009 14 A stone is attached to one end of a string and rotated in a
(a) A
18 A ball of mass 0.6 kg attached to a light inextensible string rotates in a vertical circle of radius 0.75 m such that it has speed of 5 ms − 1 when the string is horizontal. Tension in string when it is horizontal on other side is (take, g = 10 ms − 2 ) [Punjab PMET]
(c) 30 J
(d) 50 J
on a wooden floor. If the blade penetrates s into the wood, the average resistance offered by the wood to the blade is h [AMU] (a) Mg (b) Mg s 2 h h (c) Mg 1 − (d) Mg 1 + s s
23 A stone is tied to a string of length l and is whirled in a vertical circle with the other end of the string at the centre. At a certain instant of time, the stone is at its lowest position and has a speed u. The magnitude of the change in velocity of string when horizontal (g being acceleration due to gravity) is [Manipal] (a) 2( u 2 − gl )
(b) u 2 − gl
(c) u − u 2 − 2gl
(d) 2gl
2006 24 A particle accelerating uniformly has velocity v at time t1 . What is work done in time t? (a)
1 mv t2 2 t 12 2
mv 2 (c) 2 t 2 t1
[DUMET] 2
(b)
1 mv 2 t 2 t1
2mv 2 (d) 2 t 2 t1
128
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 (c) 11 (b) 21 (a)
2 (b) 12 (d) 22 (b)
3 (c) 13 (b) 23 (a)
4 (d) 14 (b) 24 (a)
5 (c) 15 (b)
6 (c) 16 (d)
7 (d) 17 (b)
8 (a) 18 (c)
9 (d) 19 (c)
10 (d) 20 (a)
Explanations 1 (c) The area under the
2 (b) Let the mass m which is attached to
force-displacement curve give the amount of work done. From work-energy theorem, …(i) W = ∆KE ∴ At x = 8 m, W = Area ABDO + Area CEFD = 20 × 5 + 10 × 3 = 130 J
a thin wire and is whirled in a vertical circle is shown in the figure below
l B
A
20
A C
10 0
O
E F
D 5
4
8
K
L
J 10
M 12
x(m)
–10 G
–20 –25
I H −3
Given, m = 500 g = 500 × 10 kg Using Eq. (i), we get 1 2 mv 2
⇒ 130 =
1 × 500 × 10−3 × v 2 2 v = 2 130 =
⇒
= 22.8 ms −1 ≈ 23 ms −1 At x = 12 m, W = Area ABDO + Area CEFD + Area FGHIJ + Area KLMJ W = 20 × 5 + 10 × 3 + (−20 × 2 ) 1 + × − 5 × 2 + 10 × 2 2 [Q Area FGHIJ = Area FGIJ + Area GHI] = 100 + 30 − 40 − 5 + 20 = 105 J Using Eq. (i), we get 1 ∴ 105 = × 500 × 10−3 × v 2 2 ~ 20.6 ms −1 ⇒ v = 2 105 −
From Eqs. (i) and (ii), we get 2gH ≥ 5gR
C
D
T m
⇒
B
⇒
P θ mg cos θ mg
mv 2 ⇒ T − mg cosθ = l where, l = length of wire and v = linear velocity of the particle whirling in a circle. mv 2 T = mg cosθ + ⇒ l At point A, θ = 0° mv 2 TA = mg + ⇒ l At point B, θ = 90° mv 2 ⇒ TB = l At point C , θ = 180° mv 2 ⇒ TC = − mg + l At point D , θ = 90° mv 2 ⇒ TD = TB = l So, from the above analysis, it can be concluded that the tension is maximum at point A, i.e. the lowest point of circle, So chance of breaking is maximum.
3 (c) From energy conservation, 2
Rmax
frictionless surface, then its total mechanical energy remains conserved. According to the conservation of mechanical energy, (TE )initial = (TE )final ⇒ (KE )i + (PE )i = (KE ) f + (PE ) f 0 + mgh = gh =
⇒
1 2 mvA + 0 2
vA2 or 2
h=
vA2 2g
…(i)
In order to complete the vertical circle, the velocity of the body at point A should be vA = vmin = 5gR where, R is the radius of the body. Here,
R=
AB D = 2 2
5 gD 2 Substituting the value of vA in Eq. (i), we get
⇒
h=
vmin = vA =
5 gD 2 2g
2
=
5 gD 5 = D 2 × 2g 4
5 (c) At the lowest point of a vertical circle, the minimum velocity at bottom vmin = 5gr Velocity at highest point (v ) = gr
1 mv 2 2
⇒ v = 2 gH or v = 2gH
2H R 2H 2(5) = = = 2 cm R 5
R≤
4 (d) If a body is moving on a
The tension in the string at any point P be T . According to Newton’s law of motion, in equilibrium, net force towards the centre = centripetal force
mgH =
To complete circular loop, minimum speed at bottom point should be …(ii) vmin = 5gR
…(i)
So, Assertion is correct but Reason is incorrect.
129
WORK, ENERGY AND POWER
6 (c) According to question,
⇒ at =
we have C
Let the tension at point A be TA , so from Newton’s law TA − mg =
R …(i)
KE at point
∴ at = 01 . ms −2
R TC TB
mv 2c A
B v0
mg
1 2 mvc 2 Energy at point C 1 …(ii) = mvc2 + mg × 2R 2 Applying Newton’s second law at point C, mvc2 Tc + mg = R To complete the loop Tc ≥ 0 mvc2 …(iii) So, mg = ⇒ vc = gR R From Eqs. (ii) and (iii) by conservation of energy, 1 2 1 2 mv0 = mvc + 2mgR 2 2 ⇒ mv02 = mgR + 2mgR × 2 (Q vc = gR ) A=
⇒
v02
⇒
v0 = 5gR
16 × 10− 2 v2 = 8πr 8 × 314 . × 6.4 × 10−2 {Q from Eq. (i), v 2 = 16 × 10−2}
= gR + 4 gR
7 (d) Given, mass of particle, m = 0.01 kg. Radius of circle along which particle is moving, r = 6.4 cm and initial kinetic energy, K i = 0. Q Final kinetic energy of particle, K f = 8 × 10−4 J 1 2 ⇒ mv = 8 × 10− 4 J 2 16 × 10− 4 …(i) ⇒ v2 = = 16 × 10− 2 0.01 As, it is given that kinetic energy of particle is equal to 8 × 10− 4 J by the end of second revolution after the beginning of motion of particle. It means, its intial velocity (u) is 0 ms −1 at this moment. Q By Newton’s third equation of motion, v 2 = u2 + 2at s ⇒ v 2 = 2at s or v 2 = 2at (4 πr) {Q particle covers 2 revolutions}
Alternative Method By applying work-energy theorem, Change in KE = Work done by all forces. Hence, K f − K i = F × s + 0 because work done by all forces include work done by tangential force and work done by centripetal force. −4
8 × 10
− 0 = m × a × (2 × 2πR ) 8 × 10− 4
a=
4×
22 × 6.4 × 10− 2 × 0.01 7
= 0.099 = 01 . ms− 2
8 (a) From work-energy theorem, Work done = Change in KE ⇒ W = K f − Ki x2
⇒ K f = W + K i = ∫ Fx dx + x1
=∫
30 20
(−01 . . x dx ) +
1 2 mv 2
1 × 10 × 102 2
= −0.05 [ 302 − 202 ] + 500 = − 0.05 [ 900 − 400 ] + 500 ⇒ K f = −25 + 500 = 475 J
+ 0.5 × 10
mg O
r
4 (Q r = um) 10 2 = 2 × 314 ≈ 4s . × 316 .
m = 0.5 kg
= 0.5 × (4 )2 × 1
circular path, it is acted upon by a centripetal force directed towards the centre. Water will not fall, if weight of water is balanced by centripetal force. Therefore, mv 2 … (i) ⇒ v 2 = rg mg = r Circumference of a circle is 2πr. 2πr … (ii) Time for a revolution = v The speed of can at the top of circle to just complete the A vertical circle is rg.
= 2 × 314 .
9 (d) Given, r = 1m,
As, the tension in the string, T = mω 2r + mg
11 (b) When a body is set to revolve on a
On putting the value of v from Eqs. (i) and (ii) we get r 2πr T = = 2π g rg
30
ω = 4 rads −1
W = (KE ) f − (KE )i = 3 − 0 = 3 J.
i.e. v = rg
x2 . + 500 = − 01 2 20
and
Hence, the initial kinetic energy would 1 be equal to (KE )i = m[ v (0)]2 = 0 and 2 similarly the final kinetic energy would be 1 1 (KE ) f = m[ v (2)]2 = × 6 × (1)2 = 3 2 2 So, we see that the work done by the force is equal to
A
12 (d) Tension at lowest point, Tnet = mg + T
mω 2r+mg
= 13 N
10 (d) From the question, we see that, the mass of the body is 6 kg and the t2 displacement is given by x = m. So, 4 the velocity would be equal to dx t v= = . dt 2 Thus, velocity at time t = 0, v(0) = 0 2 and velocity at time t = 2s, v(2) = = 1. 2
mv 2 r
= mg + mrω
m 2 2
2πn = mg + mr 60 (given) 2 2 π nr = m g + 900
r O C Tnet mg
13 (b) According to the work-energy theorem, Loss in kinetic energy = Work done = Area of F-s curve 1 = × base × perpendicular 2 1 = − × 3× 4 = −6J 2
130
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
14 (b) The body is describing a vertical circle, A
C
D
22 (b) Velocity at the time when knife edge strikes wooden floor is 2gh.
and r = 1m = 2 × 10 × 1 × 1 = 20 J
mg cosθ B mg sinθ
18 (c) Tension in the string when it makes mg
mv 2 ∴ T − mg cosθ = l mv 2 ⇒ T = mg cosθ + l Tension is maximum when cosθ = 1 and velocity is maximum. Both conditions are satisfied at θ = 0°, i.e. at lowest point B.
15 (b) Given, m = 10 kg,u = 0 and v = 10 ms −1 By work-energy theorem, 1 W = ∆K = × 10 × (10)2 − 0 = 500 J 2
16 (d) Given, m = 1 kg = 10−3 kg, 3
h = 1 km = 10 m , v = 50 ms and g = 10 ms
1 1 m1v12 − mv22 2 2 1 = m(5gr − gr) = 2gmr 2 Given, g = 10 ms −2, m = 1kg ∆ KE =
−1
−2
By work-energy theorem, we have change in energy = work done by all of the forces. Work done by grventational force, W g = mgh = 10−3 × 10 × 1 × 103 = 10J Now, from work-energy theorm, we have ∆K = Wgravity + W air reistance 1 ⇒ × mv 2 = mg + W air resistance 2 1 ⇒W air resistance = mv 2 − mgh 2 −3 1 = 10 time 50 × 50 − 103 = −8.75 J 2
17 (b) Kinetic energy is the energy possessed by a body of mass m due to its 1 velocity v, KE = mv 2 2 Velocity at the top is gr and that at the
A 1m O 1m B
bottom is 5gr. Hence, required difference in kinetic energy
angle θ with the vertical, mv 2 T = + mg cosθ r When the string is horizontal, θ = 90°
∴T =
mv 2 mv 2 + mg × 0 = r r
Given, m = 0.6 kg , r = 0.75 m and v = 5 ms −1 0.6 × (5)2 = 20 N 0.75
=
mv 2 + mg cosθ r Taking the tensions at two values of θ, mv 2 For θ = 30°, T1 = + mg cos 30° r mv 2 3mg 3 = + Q cos 30° = r 2 2
19 (c) T =
mv 2 For θ = 60°, T2 = + mg cos 60° r =
mv 2 mg + 2 r
Q cos 60° =
1 2
∴ T1 > T2
20 (a) According to the work-energy theorem, work done by a force in displacing a body on a horizontal level measures the change in its kinetic energy.
21 (a) As, the body just completes the circular path, hence critical speed at the highest point, vH = gR which is totally horizontal. As, the string breaks at the highest point, hence from here onward the body will follow parabolic path. Time taken by the body to reach the ground, 2h 2 × 2R t= = g g Hence, horizontal distance covered by the body 4R = vH × t = gR × = 2R g
The velocity 2gh is reduced to zero while travelling distance s. If F is the average retardation, then by work-energy theorem, we have 1 h 0 − Mv 2 = − Fs ⇒ F = Mg 2 s u′
23 (a) When stone is
at its lowest position, l it has only kinetic O energy, given by l 1 u K = mu2 2 At a horizontal position, it has energy, 1 E = U + K = mu′ 2 + mgl 2 According to the law of conservation of energy, K = E 1 1 ∴ mu2 = mu′ 2 + mgl 2 2 1 1 2 ⇒ mu′ = mu2 − mgl 2 2 ⇒
u′ 2 = u2 − 2gl u′ = u2 − 2gl
⇒
…(i)
The velocities vectorially given below +u
–u
∆u
u′
So, the magnitude of change in velocity, | ∆u | = | u | = u ′ 2 + u2 + 2u′ u cos 90° | ∆u | = u′ 2 + u2 = 2(u2 − gl ) [from Eq. (i)]
24 (a) Velocity of the particle accelerating uniformly in time t1, v ...(i) t1 Velocity of the particle after time t, vt [from Eq. (i)] v′ = at = t1 According to the work-energy theorem, v = at1 ⇒ a =
Work done by all the forces = Change in KE 1 i.e. W = ∆K or W = mv′ 2 − 0 2 2 1 mv 2 2 1 vt = m = 2 t 2 t1 2 t1
131
WORK, ENERGY AND POWER
Topic 4
Power 2018 1 1000 N force is required to lift a hook and 10000 N force is requires to lift a load slowly. Find power required to lift hook with load with speed v = 0.5 ms −1 . [JIPMER] (a) 5 kW (b) 1.5 kW (c) 5.5 kW (d) 4.5 kW
2016 2 A body of mass 1 kg begins to move under the action of a
time dependent force F = ( 2ti$ + 3t 2 $j ) N, where $i and $j are unit vectors along X and Y -axes. What power will be developed by the force at the time (t)? [NEET] 2 4 3 4 (a) ( 2t + 4t ) W (b) ( 2t + 3t ) W 3
5
(c) ( 2t + 3t ) W
3
(d) (2t + 3t ) W
motion with constant acceleration. The power delivered to it at a time t is proportional to [UK PMT] 1/ 2 (b) t (a) t (d) t 2 (c) t 3/ 2
4 If two persons A and B take 2 s and 4 s, respectively to lift an object to the same height h, then the ratio of their powers is [Kerala CEE] (a) 1: 2 (b) 1: 1 (c) 2 : 1 (d) 1: 3 (e) 3 : 1 5 If a machine gun fires n bullets per second each with kinetic energy K, then the power of the machine gun is [Kerala CEE]
(a) nK (e)
K (b) (c) n
2
n K
(a) 43200 (c) 72
(d) nK
n K
2013 6 A machine is delivering constant power to drive a body along a straight line. What is the relation between the distance travelled by the body against time? [WB JEE] 2 3 2 −3 (a) s ∝ t (b) s ∝ t 3 2 (c) s ∝ t (d) s ∝ t 3
7 A car of mass m starts from rest and accelerates, so that the instantaneous power delivered to the car has a constant magnitude P0 . The instantaneous velocity of this car is proportional to [CBSE AIPMT] (a) t 2 P0 (b) t 1/ 2 (c) t −1/ 2 (d) t / m
(b) 432 (d) 7.2
2011 9 A box is moved along a straight line by a machine delivering constant power. The distance moved by the body in time t is proportional to [WB JEE] 1
3
(a) t 2
(b) t 4
(c) t
2014 3 A body is initially at rest. It undergoes one dimensional
2
8 The machine gun fires 240 bullets per minute. If the mass of each bullet is 10 g and the velocity of the bullets is 600 ms −1 , the power (in kW) of the gun is [AFMC]
3 2
(d) t 2
2010 10 A tap supplies water at 22° C, a man takes 1L of water per min at 37° C from the geyser. The power of the geyser is (a) 525 W (b) 1050 W [BVP] (c) 1775 W (d) 2100 W
11 A body of mass 10 kg moves with a velocity 2 ms −1 along a circular path of radius 8 m. The power produced by the body will be [Manipal] (b) 98 Js −1 (a) 10 Js −1 (c) 49 Js −1 (d) zero 12 A car of mass 1000 kg accelerates uniformly from rest to a velocity of 54 kmh −1 in 5 s. The average power of the engine during this period in watt is (neglect friction). (a) 2000 W (b) 22500 W [VMMC] (c) 5000 W (d) 2250 W
2008 13 Water falls from a height of 60 m at the rate of 15 kgs −1 to operate a turbine. The losses due to frictional forces are 10% of energy. How much power is generated by the turbine? (Take, g = 10 ms −2 ) [CBSE AIPMT] (a) 8.1 kW (c) 12.3 kW
(b) 10.2 kW (d) 7.9 kW
14 An object of mass m moves horizontally, increasing in speed from 0 to v in a time t. The power necessary to accelerate the object during this time period is [Manipal] mv 2 t mv 2 (a) (b) 2 2 mv 2 2 (c) 2 mv (d) 2t
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
19 A body of mass 2 kg is projected at 20 ms −1 at an angle 60° above the horizontal. Power due to the gravitational force at its highest point is [J&K CET] (a) 200 W (b) 100 3 W (c) 50 W (d) zero
15 A particle of mass mis moving in a circular path of constant radius r such that centripetal acceleration, a c varying with time is a c = k 2 rt 2 , where k is a constant. What is the power delivered to the particle by the force acting on it? (a) 2mkr 2 t (b) mkr 2 t 2 [BHU] 2 2 (d) mk 2 rt 2 (c) mk r t
2005 20 A man does a given amount of work in 10s. Another man
16 An engine pumps up 100 kg of water through a height of 10 m in 5 s. Given that the efficiency of engine is 60%. If g = 10 ms −2 , the power of the engine is [BCECE] (a) 3.3 kW (c) 0.033 kW
does the same amount of work in 20 s. The ratio of the output power of first man to the second man is [J&K CET] (a) 1 (b) 1/ 2 (c) 2/1 (d) None of these
(b) 0.33 kW (d) 33 kW
2006 17 In 2 min, the energy dissipated by a lamp is 3000 J. Find the power of the lamp. (a) 20 W (c) 10 W
21 A particle of mass m is driven by a machine that delivers a constant power k watts. If the particle starts from rest, the force on the particle at time t is [AIIMS] mk −1/ 2 (a) (b) mk t −1/ 2 t 2 1 (c) 2mk t −1/ 2 (d) mk t −1/ 2 2
[CBSE AIPMT]
(b) 25 W (d) 24 W
18 An engineer claims to have made an engine delivering 10 kW power with fuel consumption of 1 gs −1 . The calorific value of fuel is 2 kcal g −1 . This claim is [MHT CET] (a) valid (b) invalid (c) dependent on engine design (d) dependent on load
22 A quarter horse power motor runs at a speed of 600 rpm. Assuming 40% efficiency, the work done by the motor in one rotation will be [Manipal] (a) 7.46 J (b) 7400 J (c) 7.46 erg (d) 74.6 J
Answers 1 (c) 11 (d) 21 (a)
2 (c) 12 (b) 22 (a)
3 (b) 13 (a)
4 (c) 14. (d)
5 (d) 15 (c)
6 (a) 16 (a)
7 (b) 17 (b)
8 (d) 18 (b)
9 (c) 19 (a)
10 (b) 20 (c)
Explanations 1 (c) Net force required to lift a hook and
load, Fnet = 1000 + 10000 = 11000 N Q Power required to the lift hook, W P= t We know that, W = Fnet d F d d ∴ P = net = Fnet = Fnet v t t d Qv = t or P = 11000 × 0.5 = 5500 W = 5.5 kW
2 (c) According to question, a body of mass 1 kg begins to move under the action of time dependent force, F = (2ti$ + 3t$j)N where, $i and $j are unit vectors along X and Y-axes.
Q ⇒ ⇒
F = ma
⇒
a=
F m
(2ti$ + 3t 2$j) {Q m = 1kg} a= 1 a = (2ti$ + 3t 2$j) ms −2
dv Q Acceleration, a = ⇒ dv = adt dt Integrating both sides, we get dv = adt = (2ti$ + 3t 2$j) dt
∫
∫
∫
v = t 2i$ + t 3$j Q Power developed by the force at the time t will be given as P = F ⋅ v = (2t$i + 3t 2$j).(t 2i$ + t 3$j) = (2t. t 2 + 3t 2. t 3 ) P = (2t 3 + 3t 5 ) W
3 (b) Let a body of mass m initially at rest attains velocity v after a time t as shown in the figure. t=0 m v=0
a
t=t m v=v
The constant force F produces a constant acceleration a. We know that, power is the rate of doing work. So, for instantaneous displacement dx, we can write dW dx P= = F⋅ = F⋅ v dt dt where, v is instantaneous velocity. For one-dimensional forward motion, we can write
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WORK, ENERGY AND POWER
F ⋅ v = | F | | v | cos 0° = (F ) (v ) So, power delivered to the block by the force F at any time t is …(i) P = (F ) (v ) Now, by equation of motion along x vx = ux + axt ⇒ v = 0 + at …(ii) ⇒ v = at From Eqs. (i) and (ii), we get P = (F ) (at ) = (ma) (at ) [Q F = ma ] = (ma2 ) t ⇒ P ∝ t 2
[given, ma = constant]
4 (c) Given, t1 = 2 s, t2 = 4 s h1 = h2 = h mgh1 mgh2 As, and PB = …(i) PA = t1 t2 mgh1 / t1 ⇒ PA : PB = mgh2 / t2 and
h t t 4 2 = 1 2 = 2 = = h1 t1 t1 2 1 ⇒ PA : PB = 2 : 1
5 (d) The power of the machine gun total work done = = time 1 mv = n⋅ 2 t
2
1 n ⋅ mv 2 2 t
1 2 Q K = mv , t = 1 s 2
= [ML T ] = constant
ML2 ∴ 3 = constant T [L2 ] ∝ [T 3 ] or s2 ∝ t 3
dv dv 7 (b) As, P0 = Fv = m v = mv dt
dt
⇒ P0 ⋅ dt = mvdv Integrating both sides, we get
∫0 P0 dt = ∫ mv dv ⇒ ⇒
2
mv 2 2P0t 2 ⇒ v ∝ t 1/ 2 v = m
P0t =
Power of gun =
8 (d) Given, n = 240, = 4 bullets per second, m = 10 g = 10 × 10−3 kg, t = 1s and v = 600 ms −1 Work done by the gun = Total kinetic energy of the bullets
54 × 5 = 15 ms −1 and t = 5 s 18 From equation of motion, velocity,
=
Work done Time taken
v = u + at 15 − 0 = 3 ms−2 ⇒ a= 5 1 1 Hence, Pav = Fv = mav 2 2 1 = × 1000 × 3 × 15 2 = 22500 W
2 × 10 × 10−3 × 600 × 600 = 1 = 7.2 kW
9 (c) We are given that, a box is moved along a straight line by a machine under constant power. So, we have power, P = Fv = mav dv P P = m v or ∫ vdv = ∫ dt dt m ⇒
v 2 Pt = ⇒v = 2 m
⇒
dx = dt
⇒
∫ dx =
⇒
x=
⇒
x ∝ t 3/ 2
2P t m
Power generated by the turbine 90 Mgh 90 Pgen = Pi × = × 100 t 100 M −1 Given, = 15 kg s , t
2P 1/ 2 t dt m∫
g = 10 ms−2 and h = 60 m.
2P t 3/ 2 m 3/ 2
t = 60 s
11 (d) Given, m = 10 kg, v = 2ms−1 and R=8m As, force, Fc =
90%.
dx Qv = dt
∆T = T2 − T1 = (37 − 22)° C and m = 1L of water per min, i.e.
13 (a) As, losses are 10%, so efficiency is
2P t m
As, power, P =
2 −3
∴
W m × s × ∆T = t t (where, s = specific heat of water) 1 × 4200 × (37 − 22) = 60 = 1050 W
6 (a) As dimensions of power
12 (b) Given, m = 100 kg, v = 54 kmh −1
= 2 × 10 × 10−3 × 600 × 600
10 (b) Given, T1 = 22° C, T2 = 37° C,
∴The power of the machine gun = nK
∴
1 1 = n mv 2= 4 × × 10 × 10−3 × (600)2 2 2
mv 2 10 × (2)2 = = 5N R 8
Power is defined as the rate of change of energy in a system or the time rate of doing work. dE dW P= = ⇒ dt dt
14
Putting the given values, we get 90 ∴ Pgen = (15 × 10 × 60) × 100 = 8.1 kW W (d) Power, P = t Since, K i = initial KE = 0 1 K f = final KE = mv 2 2 From work-energy theorem, Work done = Change in KE 1 2 K f − K i 2 mv − 0 ∴ P= = t t ⇒
P=
mv 2 2t
15 (c) Centripetal acceleration, ac =
v2 = k 2rt 2 r
Also, work = force ⋅ displacement
v 2 = k 2r2t 2 1 As, KE = mv 2 2 1 So, KE = mk 2r2t 2 2
= F ⋅ d = F ⋅ d cosθ Since, for circular motion, displacement is zero and θ = 90°. So, W =0 Hence, power is also zero.
According to work-energy theorem, change in kinetic energy is equal to the work done. 1 W = mk 2r2t 2 ∴ 2
⇒
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Thus, power delivered to the particle, dW d 1 P= = mk 2r2t 2 = mk 2r2t dt dt 2
16 (a) Efficiency of engine, η = 60% work / time Thus, power = η 100 mgh = × 60 t Given, m = 100 kg, h = 10 m , t = 5 s and g = 10 ms−2 mgh Applying power = t 100 100 × 10 × 10 Hence, power = × 60 5 = 3.3 × 103 W = 3.3 kW W = 3000 J W 3000 Power, P = = t 120 ∴ P = 25 W and
or ⇒
θ = 60° P = 2 × 20 × 10 × cos 60° 1 P = 2 × 20 × 10 × 2 P = 200 W
20 (c) The rate of doing work is defined as power. Work done Time P1 W 1 / t1 = P2 W 2 / t2
i.e. Power =
−1
= 2 × 10 cal s
×1g s
−1
= 2 × 103 × 4.2 Js−1 = 8.4 kW As, Poutput > Pinput , hence the claim given in question is never possible. Since, energy is always conserved.
−1
power So F ⋅ v = constant = k (watts) dv mdv ⇒ m ⋅ v = k [Q F = ] dt dt k ⇒ ∫ vdv = m ∫ dt ⇒
v2 k = t⇒v = 2 m
1
dv d 2kt 2 F =m =m dt dt m 1 − 1 = 2km ⋅ t 2 = 2
2k t m
1
mk − 2 ⋅t 2
22 (a) Given, power =
1 1 HP = × 746 4 4
= 186.5 W (Q 1 HP = 746 W) Power used to do work = 40% × 186.5 40 = × 186.5 100 ⇒
21 (a) As the machine delivers a constant
Now, Pinput = 2 × 10 calg 3
and ⇒
Given, t1 = 10 s, t2 = 20 s, W 1 = W 2 P1 t2 2 = = ∴ P2 t1 1
18 (b) Given, Poutput = 10 kW 3
P = F ⋅ v = Fv cosθ where, F is the force, v is the velocity and θ is the angle between F and v. [Q F = mg] P = mgv cosθ Given, m = 2 kg, v = 20 ms−1
∴
17 (b) Given, t = 2 min = 120 s
Now, force on the particle is given by
19 (a) Power (P ) is given as
P = 74.6 W
Speed = 600 rpm 600 = = 10 rps 60 = 2π (10) rads −1 = 20π rads −1 W t W
We have, 40% × P = ⇒ ⇒
74.6 =
1 rotations 20π W = 7.46 J 2π ×
Topic 5
Collision 2019 1 Body A of mass 4m moving with speed u collides with another body B of mass 2mat rest. The collision is head-on and elastic in nature. After the collision, the fraction of energy lost by the colliding body A is [NEET] 8 4 5 1 (b) (c) (d) (a) 9 9 9 9 $ $ 2 An object flying in air with velocity ( 20i + 25j − 12k$ ) suddenly breaks in two pieces whose masses are in the ratio 1: 5. The smaller mass flies off with a velocity (100$i + 35$j + 8k$ ). The velocity of the larger piece will be [NEET (Odisha)]
(a) 4i$ + 23$j − 8k$ (c) 20$i + 15$j − 80k$
(b) − 100$i − 35$j − 8k$ (d) − 20$i − 15$j − 80k$
3 A body of mass 5 × 103 kg moving with speed 2 ms −1 collides with a body of mass 15 × 103 kg inelastically and sticks to it. Then, loss in kinetic energy of the system will be (a) 7.5 kJ (b) 15 kJ [AIIMS] (c) 10 kJ (d) 5 kJ 4 Assertion There is no loss in energy in elastic collision. Reason Linear momentum is conserved in elastic collision. [AIIMS] (a) If both assertion and reason are true and reason is the correct explanation of assertion. (b) If both assertion and reason are true, but reason is not the correct explanation of assertion. (c) If assertion is true, but reason is false. (d) If both assertion and reason are false.
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WORK, ENERGY AND POWER
5 A particle of mass 5m at rest suddenly breaks on its own into three fragments. Two fragments of mass m each move along mutually perpendicular direction with each speed v. The energy released during the process is [NEET (Odisha)] 3 5 3 4 (b) mv 2 (c) mv 2 (d) mv 2 (a) mv 2 5 3 2 3 6 One object of mass 20 kg is moving with speed 10 ms −1 in west direction another object of mass 10 kg is moving with 15 ms −1 in north direction. Both collide and stick together. Choose the correct alternative. [JIPMER] (a) There kinetic energy is conserved as it is inelastic collision. (b) There kinetic energy is conserved as it is elastic collision. (c) There momentum is conserved as it is inelastic collision. (d) There momentum is conserved as it is elastic collision. 7 Two objects of mass m each moving with speed u ms −1 collide at 90°, then final momentum is (assume collision is inelastic) [JIPMER] (a) mu (b) 2 mu (c) 2 mu (d) 2 2 mu
2018 8 A moving block having mass m, collides with another stationary block having mass 4m. The lighter block comes to rest after collision. When the initial velocity of the lighter block is v, then the value of coefficient of restitution ( e ) will be [NEET] (a) 0.8 (b) 0.25 (c) 0.5 (d) 0.4
9 Body of mass M is much heavier than the other body of mass m. The heavier body with speed v collides with the lighter body which was at rest initially elastically. The speed of lighter body after collision is [AIIMS] v (a) 2 v (b) 3 v (c) v (d) 2 10 Assertion Two particles moving in the same direction do not lose all their energy in completely inelastic collision. Reason Principle of conservation of momentum holds true for all kinds of collisions. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct. 11 A ball of 0.5 kg collided with wall at 30° and bounced back elastically. The speed of ball was 12ms −1 . The contact remained for 1s. What is the force applied by wall on ball? [JIPMER]
(a) 12 3 N
(b) 3 N
(c) 6 3 N
(d) 3 3 N
2017 12 A block C of mass m is moving with velocity v0 and collides elastically with block A of mass m and connected to another block B of mass 2m through spring of spring constant k. What is the value of k, if x 0 is compression of spring when, velocity of A and B is same? [JIPMER] C
(a)
mv 02
x 02 2 3 mv 0 (c) 2 x 02
v0
A
B
(b)
mv 02
2 x 02 2 2 mv 0 (d) 3 x 02
13 A body of mass 4kg moving with velocity 12 ms −1 collides with another body of mass 6kg at rest. If two bodies stick together after collision, then the loss of kinetic energy of system is [AIIMS] (a) zero (b) 288 J (c) 172.8 J (d) 144 J 2016 14 A bullet of mass 10 g moving horizontal with a velocity of 400 ms −1 strikes a wood block of mass 2 kg which is suspended by light inextensible string of length 5 m. As result, the centre of gravity of the block found to rise a vertical distance of 10 cm. The speed of the bullet after it emerges of horizontally from the block will be [NEET] (a) 100 ms −1 (b) 80 ms −1 (c) 120 ms −1 (d) 160 ms −1 15 Two identical balls A and B having velocities of 0.5 ms −1 and − 0.3 ms −1 respectively collide elastically in one dimension. The velocities of B and A after the collision respectively will be [NEET] −1 −1 (a) − 0.5 ms and 0.3 ms (b) 0.5 m/s −1 and − 0.3 ms −1 (c) − 0.3 ms −1 and 0.5 ms −1 (d) 0.3 ms −1 and 0.5 ms −1 2015 16 Two particles of masses m1 and m2 move with initial velocities u1 and u 2 . On collision, one of the particle gets excited to higher level, after absorbing energy ε. If final velocities of particles be v1 and v 2 , then we must have (a) m12 u1 + m22 u 2 − ε = m12 v1 + m22 v 2 [CBSE AIPMT] 1 1 1 1 m1 u12 + m2 u 22 = m1 v12 + m2 v 22 − ε 2 2 2 2 1 1 1 1 2 2 2 (c) m1 u1 + m2 u 2 − ε = m1 v1 + m2 v 22 2 2 2 2 1 2 2 1 2 2 1 2 2 1 2 2 (d) m1 u1 + m2 u 2 + ε = m1 v1 + m2 v 2 2 2 2 2
(b)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2014 17 A body of mass 4m is lying in xy-plane at rest. It suddenly explodes into three pieces. Two pieces each of mass m move perpendicular to each other with equal speeds v. The total kinetic energy generated due to explosion is (b) ( 3/ 2) mv 2 [CBSE AIPMT] (a) mv 2 2 (c) 2mv (d) 4 mv 2
2013 18 An explosion breaks a rock into three parts in a horizontal plane. Two of them go off at right angles to each other. The first part of mass 1 kg moves with a speed of 12 ms −1 and second part of mass 2 kg moves with 8 ms −1 speed. If the third part lies off which 4 ms −1 speed, then its mass is [NEET] (a) 3 kg (b) 5 kg (c) 7 kg (d) 17 kg
19 A ball of mass m elastically collides with a wall with velocity v, then change in its momentum is equal to (a) 2 m (b) 2 mv [KCET] (c) 8 mv (d) zero
2012 20 A spherical ball A of mass 4 kg, moving in a straight line strikes another spherical ball B of mass 1 kg at rest. After the collision, A and B move with velocities v1 ms −1 and v 2 ms −1 , respectively making angles of 30° and 60° with respect to the original direction of motion of A. The ratio v1 / v 2 will be [WB JEE] 3 4 (a) (b) 4 3 1 (c) (d) 3 3
21 Two spheres A and B of masses, m1 and m2 , respectively collide. A is at rest initially and B is moving with velocity v along X-axis. After collision, B has a velocity v / 2 in a direction perpendicular to the original direction. The mass [CBSE AIPMT] A moves after collision in the direction (a) same as that of B (b) opposite to that of B (c) θ = tan −1 (1/ 2) to the X-axis − 1 (d) θ = tan −1 to the X-axis 2
2011 22 If two bodies stick together after collision and move as a single body, the collision is said to be [J&K CET] (a) perfectly inelastic (b) elastic (c) inelastic (d) perfectly elastic
23 A bullet of mass m moving with velocity v strikes a suspended wooden block of mass M. If the block rises to a height h, then initial velocity of the block will be (a) 2gh (c)
m 2gh M +m
M +m (b) gh m M+m (d) 2gh M
[Haryana PMT]
24 A particle of mass m1 moves with velocity v1 and collides with another particle at rest of equal mass. The velocity of the second particle after the elastic collision is [DUMET] (a) 2v1 (b) v1 (c) −v1 (d) 0
2010 25 A ball falls from a height of 20 m on the floor and rebounds to a height of 5 m. Time of contact is 0.02 s. Find the acceleration during impact. [Manipal] (a)1200 ms −2 (b)1000 ms −2 (c) 2000 ms −2 (d) 1500 ms −2
2009 26 In a head-on elastic collision of a very heavy body moving at v with a light body at rest, then velocity of the heavy body after collision is [KCET] (a) v (b) 2v (c) zero (d) v / 2
27 A body of mass 2 kg makes an elastic collision with another body at rest and continues to move in the original direction with one-fourth its original speed. The mass of the second body which collides with the first body is [Manipal]
(a) 2 kg (c) 3 kg
(b) 1.2 kg (d) 1.5 kg
2008 28 A shell of mass 200 g is ejected from a gun of mass 4 kg by an explosion that generates 1.05 kJ of energy. The initial velocity of the shell is [CBSE AIPMT] (a) 100 ms −1 (b) 80 ms −1 (c) 40 ms −1 (d) 120 ms −1
29 For a system to follow the law of conservation of linear momentum during a collision, the condition is [AFMC] (i) total external force acting on the system is zero. (ii) total external force acting on the system is finite and time of collision is negligible. (ii) total internal force acting on the system is zero. (a) Only (i) (b) Only (ii) (c) Only (iii) (d) Only (i) or (ii)
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WORK, ENERGY AND POWER
30 Assertion Quick collision between two bodies is more violent than a slow collision; even when the initial and final velocities are identical. Reason The momentum is greater in first case. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 31 In the figure, pendulum bob on left side is pulled a side to a height h from its initial position. After it is released it collides with the right pendulum bob at rest, which is of same mass. After the collision, the two bobs stick together and rise to a height [Punjab PMET]
h O
3h 4 h (c) 2
2h 3 h (d) 4 (b)
(a)
32 A sphere of mass m moving with constant velocity u, collides with another stationary sphere of same mass. If, e is the coefficient of restitution, the ratio of the final velocities of the first and second spheres is [Punjab PMET] 1+ e 1− e 1+ e e (b) (c) (d) (a) 1− e 1+ e e 1− e 33 Two balls of same mass each m are moving with same velocities, v on a smooth surface as shown in figure. If all collisions between the masses and with the wall are perfectly elastic, the possible number of collisions between the bodies and wall together is [EAMCET] v
(a) 1 (c) 3
v
(b) 2 (d) infinity
m 34 A body of mass m strikes another body at rest of mass . 9 Assuming the impact to be inelastic, the fraction of the initial kinetic energy transformed into heat during the contact is [EAMCET] (a) 0.1 (b) 0.2 (c) 0.5 (d) 0.64
2007 35 A bomb of mass 3.0 kg explodes in air into two pieces of masses 2.0 kg and 1.0 kg. The smaller mass goes at a speed of 80 ms −1 . The total energy imparted to the fragments is (a) 1.07 kJ (b) 2.14 kJ [UP CPMT] (c) 2.4 kJ (d) 4.8 kJ 36 A body from height h is dropped. If the coefficient of restitution is e, then calculate the height achieved after one bounce. [UP CPMT] (b) h1 = e 4 h h (c) h1 = eh (d) h1 = e 37 A body of mass m moving with velocity v makes a head-on collision with another body of mass 2m which is initially at rest. The loss of kinetic energy of the colliding body (mass m) is [Punjab PMET] (a) (1/ 2) of its initial kinetic energy (b) (1/ 9) of its initial kinetic energy (c) (8 / 9) of its initial kinetic energy (d) (1/ 4) of its initial kinetic energy (a) h1 = e 2 h
38 For inelastic collision between two spherical rigid bodies, (a) the total kinetic energy is conserved [MP PMT] (b) the linear momentum is not conserved (c) the total mechanical energy is not conserved (d) the linear momentum is conserved 39 A bomb of 12 kg explodes into two pieces of masses 4 kg and 8 kg. The velocity of 8 kg mass is 6 ms −1 . The kinetic energy of the other mass is [UP CPMT] (a) 348 J (b) 332 J (c) 324 J (d) 288 J 40 A body of mass m1 collides elastically with another body of mass m2 at rest. If the velocity of m1 after collision becomes 2/3 times of its initial velocity, the ratio of their masses, is [J&K CET] (a) 1 : 5 (b) 5 : 1 (c) 5 : 2 (d) 2 : 5 41 A stationary bomb explodes into two parts of masses in the ratio of 1 : 3. If the heavier mass moves with a velocity 4 ms −1 , what is the velocity of the lighter part? [J&K CET] −1 (a) 12 ms opposite to heavier mass (b) 12 ms −1 in the direction of heavier mass (c) 6 ms −1 opposite to heavier mass (d) 6 ms −1 in the direction of heavier mass
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2006 42 Which of the following is not an example of perfectly inelastic collision?
47 A body of mass m is moving towards east and another body of equal mass and speed is moving towards the north. If after collision both stick together, then their speed after collision would be [DUMET] (a) v (b) v / 2 (d) v / 2 (c) 2v
[AMU]
(a) A bullet fired into a block if bullet gets embedded into block (b) Capture of electrons by an atom (c) A man jumping on to a moving boat (d) A ball bearing striking another ball bearing
43 A bullet of mass 20 g and moving with 600 ms −1 collides with a block of mass 4 kg hanging with the string. What is velocity of bullet when it comes out of block, if block rises to height 0.2 m after collision? [DUMET] −1 −1 −1 (a) 200 ms (b) 150 ms (c) 400 ms (d) 300 ms −1 44 In two separate collisions, the coefficients of restitutions, e1 and e 2 are in the ratio 3 : 1. In the first collision, the relative velocity of approach is twice the relative velocity of separation. Then, the ratio between the relative velocity of approach and relative velocity of separation in the second collision is [EAMCET] (a) 1 : 6 (b) 2 : 3 (c) 3 : 2 (d) 6 : 1
2005 45 A bomb of mass 30 kg at rest explodes into two pieces of masses 18 kg and 12 kg. The velocity of 18 kg mass is 6 ms −1 . The kinetic energy of the other mass is (a) 256 J (b) 486 J [CBSE AIPMT] (c) 524 J (d) 324 J
46 A shell of mass 20 kg at rest explodes into two fragments wose masses are in the ratio 2 : 3. The smaller fragment moves with a velocity of 6 ms −1 . The kinetic energy of the larger fragment is [KCET] (a) 96 J (b) 216 J (c) 144 J (d) 360 J
48 A ball falling freely from a height of 4.9 ms −1 hits a horizontal surface. If e = 3/ 4, then the ball will hit the surface second time after [DUMET] (a) 0.5 s (b) 1.5 s (c) 3.5 s (d) 3.4 s 49 A moving body of mass m and velocity 3 kmh −1 collides with a body at rest and of mass 2m and then sticks to it. Now the combined mass starts to move, then the combined velocity will be [RPMT] (a) 4 kmh −1 (b) 3 kmh −1 (c) 2 kmh −1 (d) 1 kmh −1 50 A body of 1 kg mass explodes into three fragments. The ratio of their masses is 1 : 1 : 3. The fragments of same mass move perpendicular to each other with speed 30 ms −1 , while the heavier part remains in the initial direction. The speed of heavier part is [BCECE] (a) 10/ 2 ms −1 (c) 20 2 ms −1
(b) 10 2 ms −1 (d) 30 2 ms −1
51 A body of mass 4 kg moving with velocity 12 ms −1 collides with another body of mass 6 kg at rest. If two bodies stick together after collision, then the loss of kinetic energy of system is [J&K CET] (a) zero (b) 288 J (c) 172.8 J (d) 144 J
Answers 1 11 21 31 41 51
(a) (c) (c) (d) (a) (c)
2 12 22 32 42
(a) (d) (a) (b) (d)
3 13 23 33 43
(a) (c) (a) (c) (a)
4 14 24 34 44
(b) (c) (b) (a) (d)
5 15 25 35 45
(d) (c) (d) (d) (b)
6 16 26 36 46
(c) (c) (a) (a) (a)
7 17 27 37 47
(c) (b) (b) (c) (d)
8 18 28 38 48
(b) (b) (a) (d) (b)
9 19 29 39 49
(a) (b) (a) (d) (d)
10 20 30 40 50
(a) (a) (a) (b) (b)
WORK, ENERGY AND POWER
Explanations 1 (a) The given situation of collision can be drawn as 4m
2m u
u '= 0
2m 1 u= u 6m 3 ∴Net decreases in kinetic energy of A, ∆KE = (KE )A − (KE′ )A = 2mu2 − 2mv12 =
A B 144442444443
= 2m(u2 − v12 )
Before collision 4m v1
v2
Velocity, v1 = 2 ms −1 and mass of another body m2 = 15 × 103 kg
∆EK =
∴The fractional decreases in kinetic energy is
A B 144442444443 After collision
Applying conservation of linear momentum, Initial momentum of system = Final momentum of system ⇒ (4 m)u + (2m)u′ = (4 m)v1 + (2m)v2 4 mu + (2m) × 0 = 4 mv1 + 2mv2 or … (i) 2 u = 2v1 + v2 The kinetic energy of A before collision, 1 KE A = (4 m)u2 = 2 mu2 2 Kinetic energy of B before collision, (KE)B = 0 The kinetic energy of A after collision , 1 (KE′ )A = (4 m)v12 = 2 mv12 2 Kinetic energy of B after collision, 1 (KE′ )B = (2m)v22 = mv22 2 As, initial kinetic energy of the system = final kinetic energy of the system ⇒ (KE′ )A + (KE′ )B = (KE′ )A + (KE′ )B 2 mu2 + 0 = 2mv12 + mv22 2mu2 = 2mv12 + mv22 or 2u2 = 2v12 + v22
m1 = 5 × 103 kg
For perfectly inelastic collision (e = 0), Loss in kinetic energy of system,
Substituting the value of v1, we get u2 16 mu2 ∆KE = 2m u2 − = 9 9
2m
3 (a) Given, mass of body,
… (ii)
Solving Eqs. (i) and (ii), we get 1 4 v1 = u and v2 = u 3 3 or the final velocity of A can be directly calculated by using the formula. The velocity after collision is given by m − m2 2m2u2 v1 = 1 u1 + m1 + m2 m1 + m2 4 m − 2m 2(2m) × 0 = u+ 4 m + 2m (4 m + 2m) [Q u2 = u′ = 0 ]
=
1 ∆KE 16 mu2 8 = = × 2 9 (KE )A 9 2 mu
1 5 × 103 × 15 × 103 × 22 × 2 5 × 103 + 15 × 103
= 7.5 × 103 J = 7.5 kJ
4 (b) In elastic collision, total energy,
2 (a) Let m be the mass of an object flying with velocity v in air. When it split into two pieces of masses in ratio 1 : 5, the mass of smaller piece is m/6 5m . and of bigger piece is 6 This situation can be interpreted diagrammatically as below v1 m/6 m
1 m1m2 × v12 2 m1 + m2
v 5m/6 v2
kinetic energy and momentum remain conserved, therefore no loss in energy occurs in elastic collision. Hence, both Assertion and Reason are correct but Reason is not the correct explanation of Assertion.
5 (d) The particle of mass 5m breaks in three fragments of mass m, m and 3m respectively. Two fragments of mass m each move in perpendicular direction with velocity v and the left fragment will move in a direction with velocity v′ such that the total momentum of the system must remain conserved. v
As the object breaks in two pieces, so the momentum of the system will remains conserved, i.e. the total momentum (before breaking) = total momentum (after breaking) 5m m mv = v 1 + v2 6 6 v 5v 2 …(i) v= 1+ ⇒ 6 6 Given, v = 20i$ + 25$j − 12k$ and
v 1 = 100i$ + 35$j + 8k$
Putting these values in Eq. (i), we get (100$i + 35$j + 8k$ ) 5v 2 = + 6 6 ⇒ = (120i$ + 150$j − 72k$ ) = (100$i + 35$j + 8k$ ) + 5v 2 ⇒
1 $ (20i + 115$j − 80k$ ) 5 = 4 $i + 23$j − 16k$
v2 =
5m
m
v
m
v=0
3m v
By law of conservation of momentum, 5 m × 0 = mv$i + mv$j + 3mv ′ ⇒
v v v ′ = − i$ − $j 3 3 2
∴
v v | v′ | = − + − 3 3
2
v 2 3 ∴ Energy released, 2 v 2 1 1 1 E = mv 2 + mv 2 + × 3m 2 2 2 3 mv 2 4 2 = mv 2 + = mv 3 3 =
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6 (c) When object of mass 20 kg is
moving with speed 10 ms −1 in west direction collide with object of mass 10 kg and stick together, hence it is perfectly inelastic collision. In inelastic collision, only momentum is conserved.
7 (c) Speed of objects = u ms −1 Since, both objects collide with 90°. Hence, by the law of conservation of momentum, Total moment before collision = Total momentum after collision | mu$i + mu$j| = p f
m2u2 + m2u2 = pf pf = 2 mu
⇒
8 (b) Since, the collision mentioned is an elastic head-on collision. Thus, according to the law of conservation of linear momentum, we get m1u1 + m2u2 = m1v1 + m2v2 where, m1 and m2 are the masses of the two blocks, respectively, u1 and u2 are their initial velocities and v1 and v2 are their final velocities, respectively. Given, m1 = m, m2 = 4 m u1 = v , u2 = 0 and v1 = 0 mv + 4 m × 0 = 0 + 4 mv2 ⇒ mv = 4 mv2 v …(i) or v2 = 4 As, the coefficient of restitution is given as relative velocity of separation after collision e= relative velocity of approach v −0 v2 − v1 =− =−4 0− v u2 − u1
[from Eq. (i)]
= 1/ 4 ∴ e = 0.25
9 (a) From conservation of momentum,
Mv + m × 0 = Mv1 + mv2 …(i) ⇒ M (v − v1 ) = mv2 Again, from the conservation of kinetic energy (as collision is of elastic nature) 1 1 1 1 Mv 2 + m × 0 = Mv12 + mv22 2 2 2 2 ⇒
M (v 2 − v12 ) = mv22
…(ii)
On solving Eqs. (i) and (ii), we get M (v − v1 ) mv2 = M (v + v1 )(v − v1 ) mv22 …(iii) v2 = v + v1
12 (d) Using the law of conservation of linear momentum, we have mv0 = mv + 2mv ⇒ v = v0 / 3 m C
Now, solving Eqs. (i) and (iii), we get (M − m ) v 2Mv and v2 = v1 = (M + m ) (M + m )
m
2m
A
B
Using law of conservation of energy, we have 1 2 1 2 1 mv0 = kx0 + (3m)v 2 2 2 2 where, x0 is compression in the string. v2 ∴ mv02 = kx02 + (3m) 0 9 2 mv 0 kx02 = mv02 − ⇒ 3 2mv02 ⇒ kx02 = 3 2mv02 ∴ k= 3x02
As M >> m So, v1 = v and v2 = 2 v Hence, velocity of ligter body (m)is 2v.
10 (a) If two particles are initially moving in the same direction, then their resultant momentum will not be zero. Therefore, their resultant momentum cannot be zero after a completely inelastic collision. As, kinetic energy is directly proportional to the square of the momentum, hence kinetic energy cannot be zero. This implies, not all the energy in inelastic collision is lost. So, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
v0
1 2
13 (c) Loss of KE = m1u12 − =
11 (c) Given, m = 0.5 kg, v = 12 ms −1,
m12u12 2 (m1 + m2 )
m1m2u12 2(m1 + m2 )
Given, m1 = 4 kg, u1 = 12 ms −1,
∆t = 1s and θ = 30°
m
∴ θ
m2 = 6 kg and u2 = 0 1 4×6 (12)2 ∆ KE = 2 (4 + 6)
1 24 × × (12)2 2 10 12 = × 144 10 = 172.8 J (c) Given, m1 = 10 g = 0.01 kg, =
θ
m
Force applied by wall on ball, ( pf )H − ( pi )H ∆p or F = F= ∆t ∆t Q In this elastic collision, final and initial velocity will be same but direction change. ( pf )H = mv cosθ and ( pi )H = − mv cosθ mv cosθ + mv cosθ QF = ∆t 2mv cosθ F= ∆t 2 × 0.5 × 12 × cos 30° F= 1 F = 6 3N
14
u1 = 400 ms −1, m2 = 2 kg and h = 10 cm = 01 . m According to the law of conservation of momentum, pi = pf ⇒ m1u1 = m2v + m1v′ ⇒ (0.01) × 400 + 0 = 2v + (0.01) v′ …(i) Also velocity v of the block just after the collision is v = 2gh = 2 × 10 × 0.1 = 2
…(ii)
From Eqs. (i) and (ii), we have 4 + 0 = 2 2 + 0.01v′ 4 = 2.8 + 0.01v′ v′ = 12 . / 0.01 ⇒ 120 ms −1 Speed of bullet, v′ = 120 ms −1
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WORK, ENERGY AND POWER
1 2 1 2 1 mv + mv + (2m) v′ 2 2 2 2 2 v 2 = mv + m × 2
15 (c) As, we know in a elastical collision
=
of two identical bodies, i.e. mA = mB , the particles mutually exchange their velocities. So, (vi )A = 0.5ms −1
= mv 2 +
(vi )B = −0.3ms −1.
and
After collision, (v f )A = − 0.3ms −1 (v f )B = 0.5 ms −1.
and
16 (c) Total initial energy 1 1 = m1u12 + m2u22 2 2 Since, after collision one particle absorb energy ε. ∴ Total final energy 1 1 = m1v12 + m2v22 + ε 2 2 From conservation of energy, 1 1 m1u12 + m2u22 2 2 1 1 = m1v12 + m2v22 + ε 2 2 1 1 2 2 ⇒ m1u1 + m2u2 − ε 2 2 1 1 = m1v12 + m2v22 2 2
17 (b) The situation is shown mv +Y –X
18 (b) Given, m1 = 1 kg, v1 = 12 ms −1, m2 = 2 kg, v2 = 8 ms −1, θ 3 = 4 ms −1 and m3 = ?
⇒
p3 = − (12i$ + 16$j) p3 = (12)2 + (16)2
∴
= 144 + 256 = 20 kg-ms−1 p3 = m3v3 p 20 m3 = 3 = = 5 kg v3 4
Now, ⇒
19 (b) Let the direction in which ball is moving be taken as positive, after collision with the wall the direction of velocity is reversed. Hence, change in momentum is (initial momentum - final momentum). = mv − (− mv ) = 2 mv as below. Along Y-axis, momentum remains as zero. A
–Y
2mv = Resultant momenta of two small masses ⇒ 2 (mv ) = (2m) × v′ ⇒
v v′ = 2
So, total kinetic energy generated by the explosion
m1 × 0 + m2 × 0 = − m1v′ sinθ + m2 m2v = m1v′ sinθ 2 mv sinθ = 2 2m1v′
12$i + 16$j + p3 = 0
⇒
2mv′
According to question, the third part of mass 2m will move as shown in the figure, because the total momentum of the system after explosion must remain zero. Let the velocity of third part is v′, then from the conservation of momentum
According to law of conservation momentum along Y-axis, we get
We have p1 + p2 + p3 = 0 ∴ 1 × 12$i + 2 × 8$j + p3 = 0 [Q p = mv ]
20 (a) The situation of collision is given 45° mv +X
45°
mv 2 3 2 = mv 2 2
According to law of conservation of linear momentum along X-axis, we get m1 × 0 + m2 × v = m1v′ cosθ m2v = m1v′ cosθ mv …(i) or cosθ = 2 m1v′
A
B
4 kg
1 kg
v1
30° 60°
B
v2
Conservation of momentum in perpendicular direction, 4 v1 sin 30° = v2 sin 60° 3 v1 = 4 v2
⇒
21 (c)
B m2
v/2 m2 B A rest m1
…(ii)
from Eqs. (i) and (ii), we get 1 tanθ = 2 1 or θ = tan −1 to the X-axis. 2
22 (a) If two bodies stick together after collision and move as a single body, the collision is said to be perfectly inelastic.
23 (a) Final kinetic energy of te block along wit te bullet wen te bullet strikes 1 = (m + M )v 2 2 Due to tis kinetic energy te block will rise to a height h. Its potential energy = (m + M ) gh So, by the law of conservation of 1 energy, (M + m)v 2 = (M + m)gh 2 ⇒
v = 2gh
24 (b) Given, mass m1 = m2, velocity, u1 = v1 and u2 = 0 For elastic collision, m − m1 2m1u1 v2 = 2 u2 + m1 + m2 m1 + m2 After putting the given values, we get 2m1v1 v2 = 2m1
Y
v
v 2
⇒ v2 = v1
θ A m1
X v'
25 (d) According to Newton’s second law of motion, the force acting on a body is equal to the rate of change of momentum during the impact
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F= Also, ⇒
∆p ∆t
p − p1 F = ma ⇒ ma = 2 ∆t m v2 − (− m v1 ) v2 + v1 a= = m ∆t ∆t
Given, h2 = 20 m, h1 = 5 m and ∆t = 0.02 s a = 2g × h2 + 2g × h1 So,
Solving Eqs. (i) and (ii), we have v2 = 100 ms−1
2 × 10 × 20 + 2 × 10 × 5 0.02 (Q v = 2gh)
a=
26 (a) In such collision, velocity of heavy body after the collision is M − m vf = v [Q M >> m ] M + m vf =
M v=v M
be u. For second body, initial velocity, u2 = 0 (at rest), Mass of first body, m1 = 2 kg, Mass of second body = m2 and v1 =
u 4
Law of conservation of linear momentum gives m1u1 + m2u2 = m1v1 + m2v2 u ⇒ 2u + 0 = 2 + m2v2 4 3u …(i) m2v2 = ⇒ 2 Conservation of kinetic energy gives 1 1 1 1 m1u12 + m2u22 = m1v12 + m2v22 2 2 2 2 ⇒ 2 1 1 1 u 1 m1u + m2 (0) = m1 + m2v22 2 2 2 4 2 15u2 8 From Eqs. (i) and (ii), we get m2 = 1.2 kg.
...(ii)
28 (a) Law of conservation of momentum yields m1v1 + m2v2 = 0 Given, m1 = 4 kg, and
m2 = 200 g = 0.2 kg E = 105 . kJ = 1050 J
F=
dp dt
dp =0 dt ⇒ p = constant Thus, if total external force acting on the system is zero during collision, then the linear momentum of the system remains conserved. F = 0, then
30 (a) As momentum, p = mv or p ∝ v, i.e. momentum is directly proportional to its velocity, so the momentum is greater in a quicker collision between two bodies than in slower one.
27 (b) Let initial velocity of first body
⇒ m2v22 =
29 (a) From Newton’s second law, If
20 + 10 = = 1500 ms−2 0.02
So,
…(i) ⇒ 4 v1 + (0.2)v2 = 0 Law of conservation of energy yields, 1 1 m1v12 + m2v22 = 1050 2 2 1 1 2 ⇒ × 4 v1 + × 0.2 × v22 = 1050 2 2 2 or …(ii) 2v1 + 0.1 v22 = 1050
Hence, due to greater momentum quicker collision between two bodies will be more violent even initial and final velocities are identical.
31 (d) When bob A strikes the bob B, then ⇒
mu = (m + m)v′ u v′ = 2
...(i)
A h
B O
The potential energy of A at height h gets converted into kinetic energy of this mass, at point O, i.e. 1 mgh = mu2 2 [from Eq. (i)] u = 2gh ⇒ 2gh gh = 2 2 Let the combined mass moves to a height h′, then total mass = 2m 1 Then, 2mgh′ = (2m)v ′ 2 2 gh h gh′ = ⇒ h′ = ⇒ 4 4
∴
v′ =
32 (b) Let v1 , v2 be the final velocities of the two spheres. Applying the law of conservation of linear momentum, mu = m(v1 + v2 ) or v1 + v2 = u …(i) Again the coefficient of restitution is given by v − v1 e= 2 u …(ii) ⇒ v2 − v1 = eu Solving Eqs. (i) and (ii), we get u v1 = (1 − e) 2 u and v2 = (1 + e) 2 v1 1 − e = ⇒ v2 1 + e
33 (c) The speeds of balls remain unchanged after collisions. Then, there are only three collisions between balls and wall together, which are as (i) Second ball collide with wall and reverse its direction. (ii) Collision between first and second ball. (iii) Second ball collide with wall again.
34 (a) The loss in kinetic energy which is transformed into heat 1 m1m2 2 = (u1 − u2 ) 2 m1 + m2 m Given, m1 = m, m2 = , 9 u1 = u, u2 = 0 m m× 1 9 × (u − 0)2 Loss of energy = 2 m+ m 9 =
1m 2 u 2 10
Now, initial kinetic energy =
1 mu2 2
Required fraction loss in kinetic energy = initial kinetic energy 1m 2 u = 2 10 1 2 mu 2 1 = = 0.1 10
35 (d) From the law of conservation of momentum, when no external force acts upon a system of two (or more)
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WORK, ENERGY AND POWER
bodies, then the total momentum of the system remains constant.
m = 3 kg m2 = 1 kg, v2 = 80 ms
–1
Momentum before explosion = Momentum after explosion Since, bomb is initially at rest, its velocity is zero. Hence, mv = m1v1 + m2v2 3 × 0 = 2v1 + 1 × 80 80 = − 40 ms−1 2 1 1 Total energy, KE = m1v12 + m2v22 2 2 1 1 = × 2 × (− 40)2 + × 1 × (80)2 2 2 = 1600 + 3200 = 4800 J = 4.8 kJ v1 = −
36 (a) When a body falls from a height h, it strikes the ground with a velocity, u = 2gh. Let it rebounds with a velocity v and rise to a height h1. Therefore, v = 2gh1 e=
v h = 1 h u
h1 = h
e=
h2 = h1
h3 =L h2
Clearly, h1 = e2h, h2 = e4h … and so on. Similarly, after nth rebound, hn = e2nh and h1 = e2h.
37 (c) Given, m2 = 2m, m1 = m
u1 = v, u2 = 0 Final velocity of first body in collision, m − m2 2m2 v1 = 1 u1 + u2 m1 + m2 m1 + m2 m − 2m 2 × 2m ⇒ v1 = u1 + ×0 m + 2m m + 2m v 3
Initial kinetic energy =
∴Change in kinetic energy v2 8 1 1 = m v 2 − = mv 2 2 9 92 8 = × initial kinetic energy 9
38 (d) In an inelastic collision, the particles do not regain their shape and size completely after collision. Some fraction of mechanical energy is retained by the colliding particles in the form of deformation as potential energy. Thus, the kinetic energy of particles no longer remains conserved. However, in the absence of external forces, law of conservation of linear momentum still holds good.
39 (d) As, the initial momentum of the bomb was zero, therefore after explosion the two parts should possess numerically equal momentum, i.e. mAvA = mB vB where, mA , vA and mB vB are masses velocity of each piece. ⇒
If the successive heights to which the body rebounds again and again are h2 , h3 , K , then
⇒ v1 = −
2 1 v2 1 v m − = m 2 9 2 3
m1 = 2 kg, v1
Bomb
⇒
Kinetic energy after collision is given by
(Q u2 = 0) 1 2 mv 2
4 vA = 8 × 6 ⇒ vA = 12 ms−1
Kinetic energy of the other mass, 1 1 (KE )A = mAvA2 = × 4 × (12)2 2 2 = 288 J
40 (b) For elastic collision, m − m2 2m2 v1 = 1 u1 + u2 m1 + m2 m1 + m2 If the second ball is at rest, i.e. u2 = 0, then m − m2 v1 = 1 u1 m1 + m2 2 u1 3 m − m2 2 u1 = 1 u1 m1 + m2 3
Given, v1 = ⇒
⇒ 2m1 + 2m2 = 3m1 − 3m2 m 5 ⇒ m1 = 5m2 ⇒ 1 = m2 1
41 (a) The ratio of masses = 1 : 3 Therefore, m1 = x kg, m2 = 3x kg Applying law of conservation of momentum, m1v1 + m2v2 = 0
⇒ x × v1 + 3x × 4 = 0 ⇒ v1 = − 12 ms−1 Therefore, velocity of lighter mass is opposite to that of heavier mass.
42 (d) Whenever there is a collision between two bodies, the total momentum of the bodies remains conserved. If after the collision of two bodies, the total kinetic energy of the bodies remains the same as it was before collision, then it a perfectly elastic collision. A ball bearing striking another ball bearing is an example of elastic collision. If two bodies stick together after the collision, then the collision is said to be perfectly inelastic collision. Options (a), (b) and (c) are examples of perfectly inelastic collisions.
43 (a) According to the law of conservation of linear momentum, m1v = m1v1 + m2v2 where, v is the velocity of bullet before the collision, v1 is velocity of the bullet after the collision and v2 is the velocity of block. Given, m1 = 20 g = 0.02 kg, v = 600 ms −1, m2 = 4 kg and h = 0.2 m ∴ 0.02 × 600 = 0.02v1 + 4 v2 (Q v2 = 2gh = 2 × 10 × 0.2 = 2ms−1) ⇒
0.02v1 = 12 − 8 4 v1 = = 200 ms−1 0.02
⇒
44 (d) The coefficient of restitution, e= ∴ and But ⇒ ∴ ⇒
velocity of separation velocity of approach (vseparation )1 1 e1 = = (vapproach )1 2 e2 =
(vseparation )2 (vapproach )2
e1 3 e 1 = ⇒ 2= e2 1 e1 3 1 e2 = e1 × 3 (vseparation )2 1 1 = × (vapproach )2 2 3 (vapproach )2 (vseparation )2
=
6 1
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45 (b) Applying law of conservation of linear momentum, m1u1 = m2u2 Given, m1 = 18 kg, m2 = 12 kg u1 = 6 ms−1 , u2 = ? ∴
18 × 6 = 12u2 18 × 6 ⇒ u2 = = 9 ms−1 12 Thus, kinetic energy of 12 kg mass 1 1 K 2 = m2u22 = × 12 × (9)2 2 2 = 6 × 81= 486 J
46 (a) Total mass of the shell = 20 kg Ratio of the masses of the fragments = 2: 3 Masses of the fragments are 8 kg and 12 kg. Now, according to the law of conservation of momentum m1v1 = m2v2 ⇒ 8 × 6 = 12 × v ⇒ v = 4 ms ∴ Kinetic energy = =
48 (b) From equation of motion, v 2 = u2 + 2gh where, v is final velocity, u is initial velocity and h is height, Given, h = 4.9 m, g = 9.8 ms−2 and u=0 So, v = 2gh = 2 × 9.8 × 4.9 = 9.8 ms −1 Coefficient of restitution (e) of an object is a unique fractional value representing the ratio of relative velocities before and after an impact. 3 ∴ v′ = × 9.8 4 Time taken from first bounce to second bounce, 3 1 2v ′ t= = 1.5 s ⇒ t = 2 × × 9.8 × 9.8 g 4
−1
1 2 mv 2
47 (d) In inelastic collision, most of the kinetic energy of the body is lost in the form heat. Thus, in inelastic collision kinetic energy is not conserved but total energy and momentum are still conserved.
Velocity of second body, u2 = 0 After combination, total mass of the body, M = m + 2m = 3m Now, from the law of conservation of momentum, m1u1 + m2u2 = Mv 3mv = m × 3 + 2m × 0 [Q M = 3m] ⇒
v = 1 kmh
−1
50 (b) Let u be the velocity and θ is the direction of the third piece as shown below m
B
i E j θ
S
Hence, we have mvi$ + mv$j = 2mv′ ⇒ | 2mv′ | = m | vi$ + v$j|
⇒
2mv′ = m v 2 + v 2 v′ =
v 2 v = 2 2
∴
v = 10 2 ms−1
The third piece will move with a velocity of 10 2 ms−1 in a direction making an angle of 135° with either of the pieces.
51 (c) In an inelastic collision, kinetic energy is not conserved but the total energy and momentum remains conserved.
Velocity of the first body, u1 = 3 kmh −1 Mass of second body at rest, m2 = 2m
N
⇒
= 180° − 45° = 135° Putting the value of θ in Eq. (i), we get 30m = 3mv cos 45° 3mv = 2
49 (d) Mass of the body, m1 = m
1 × 12 × (4 )2 = 96 J 2
W
These give, 3mv cosθ = 3mv sin θ or cosθ = sin θ ∴ θ = 45° Thus, ∠AOC = ∠BOC
C
θ O
A m
3m
Equating the moment of the system along OA and OB to zero, we get …(i) m × 30 − 3m × v cosθ = 0 and m × 30 − 3m × v sinθ = 0 …(ii)
m2 = 6 kg u2 = 0
m1 = 4 kg u1 = 12 ms–1
Momentum before collision = Momentum after collision m1u1 + m1u2 = m1v1 + m2v2 ⇒
4 × 12 = (4 + 6)v
⇒
v = 4.8 ms−1
Kinetic energy before collision 1 = m1u12 2 1 = × 4 × (12)2 = 288 J 2 Kinetic energy after collision 1 = (m1 + m2 )v 2 2 1 = (4 + 6)(4.8)2 = 115.2 J 2 ∴Loss in kinetic energy of system = 288 J − 115.2 J =172.8 J
06 System of Particles and Rotational Motion Quick Review Similarly, xCM for n particles system,
Rigid Body The body whose particles maintain the same relative positions w.r.t. other particles of the same body even under the action of external unbalanced force is known as rigid body.
Rotational Motion In rotation motion about a fixed axis, every particle of the rigid body moves in a circle which lies in a plane perpendicular to the axis and has its centre on the axis. Every point in the rotating rigid body has the same angular velocity at any instant of the time.
Pure Translation Motion In pure translation motion, every particle of the body moves with the same velocity at any instant of time.
Centre of Mass Centre of mass of a system is the point that behaves as whole mass of the system is concentrated on it. For rigid bodies, centre of mass is independent of the state of the body, i.e. whether it is in rest or in accelerated motion, centre of mass will remain same. • Centre of mass of a two particles system, m x + m2 x 2 xCM = 1 1 m1 + m2
xCM =
m1 x1 + m2 x 2 +.........+ mn x n = m1 + m2 + ......... + mn
n
∑ mi xi
i=1 n
∑ mi
i=1
• Velocity of centre of mass (n-particles system),
v=
m1 v1 + m2 v2 + ... + mn vn m1 + m2 + ... + mn
• Acceleration of centre of mass,
a=
m1 a1 + m2 a 2 + ...+ mn a n m1 + m2 + ...+ mn
• Momentum of centre of mass,
p=
m1 p1 + m2 p2 + ....+ mn pn m1 + m2 + .... + mn
Position of Centre of Mass of Symmetrical Bodies Three points given below are, which are very important regarding the centre of mass of symmetrical bodies (i) For the bodies symmetrical about both the axes (X or Y) or all the three axes ( X , Y , Z ), the centre of mass will lie at point of intersection of symmetrical axes. (ii) The bodies which are symmetrical about one axis, then centre of mass will lie on that axis. Determine only that coordinate about which there is symmetry. (iii) If an arrangement or body is not symmetrical about any axis, then determine all the required coordinates.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Centre of mass of some symmetrical bodies are given in a table below Name of Body
Figure
Uniform sphere (hollow or solid)
Position of COM Centre of the sphere
C
Uniform circular ring
Centre of the ring C
Uniform circular disc
Centre of the disc C
Uniform rod
Centre of the rod Point of intersection of diagonals
C
Triangular lamina
Point of intersection of the medians C
Rectangular cubical block
The turning effect of the force about the axis rotation is called torque or moment of force. Mathematically, it is expressed as Torque, τ = r × F The magnitude of torque | τ| is τ = rF sin θ = Frsin θ τ = Fr⊥ where, r⊥ is the perpendicular distance of the line of action of F from a point. If the body is rotating counter clockwise, then the torque is taken positive otherwise negative.
Angular Momentum
C
A plane square lamina
Torque
Point of intersection of the diagonal
C
Angular momentum (L) can be defined as moment of linear momentum about a point. The angular momentum of a particle of mass m moving with velocity v (having a linear momentum p= mv) about a point O is defined by the following vector product. L=r× p or angular momentum, L = m(r × v) L = mrv sin θ where, θ = angle between r and v. L can be represented as L = rp sin θ = rp ⊥ where, p ⊥ ( p sin θ) is the component of p in a direction perpendicular to r. and
Cylinder (Hollow or Solid)
Middle point of the axis of the cylinder C
Cone or pyramid h
Uniform semi-circular wire
C
C
h/4
C (0, 0) O
2R Coordinates 0, or π (0, 0.64R) of CM
2R π
O (0, 0)
Uniform semi-circular plate or disc
On the axis of the cone at a distant 3h / 4 from the vertex, where h is the height of the cone.
R
where, r⊥ is the perpendicular distance of the linear momentum vector (p) from origin. • Relation between Torque and Angular Momentum Rate of change of angular momentum is equal to the torque applied. dL Rate of change of angular momentum, =τ dt
Torque and Angular Momentum for a System of Particles For a system of particles or a rigid body with n-particles, the total angular momentum of the system is the vector sum of the angular momenta of the individual particles. n
L = L 1 + L 2 + L 3 + L + L n = ∑ Li i =1
R
0, 4R 3π
L = pr sin θ = pr⊥
4 R Coordinates 0, or 3π (0, 0.42R ) of CM
Differentiating the above expression with time, we get n dL dL i = Σ dt i = 1 dt n dL dL i But Σ is the net torque on the system, so = τ net . i = 1 dt dt
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SYSTEM OF PARTICLES AND ROTATIONAL MOTION
Above expression shows Newton’s second law for system of particles which state that the net external torque τ net acting on a system of particles is equal to the time rate of change of the system’s total angular momentum L.
Conservation of Angular Momentum Without any external torque, angular momentum of a system of particles remain constant. This is known as the conservation of angular momentum. If τ ext = 0 ⇒ L initial = L final If L is constant, then its all three components will also be constant. i.e. Lx = constant, L y = constant and L z = constant.
Equilibrium of a Rigid Body A rigid body is said to be in equilibrium, if both of its linear momentum and angular momentum are not changing with time.
Rotational Equilibrium Only If the net torque acting on the rigid body is zero but net force is non-zero, then rigid body is in rotational equilibrium only.
Translational Equilibrium Only If the net force acting on the rigid body is zero but net torque is non-zero, then rigid body is in translational equilibrium only.
Couple A pair of equal and opposite forces with parallel lines of action are known as a couple. A couple produces rotation without translation. A S
N B F
r1 r2
F
Let a couple with forces − F and F acting at A and B points with position vectors r1 and r 2 with respect to some origin O. The moment of couple = total torque = r1 × ( − F ) + r 2 × F = r 2 × F − r1 × F = ( r 2 − r1 ) × F
Principle of Moment When an object is in rotational equilibrium, then algebraic sum of all torques acting on it is zero. Clockwise torques are taken negative and anti-clockwise torques are taken positive.
Centre of Gravity If a body is supported on a point such that total gravitational torque about this point is zero, then this point is called centre of gravity of the body.
Moment of Inertia The property of a body by virtue of which it opposes the torque tending to change its state of rest or of uniform rotation about an axis is called rotational inertia or moment of inertia. • For a very simple case, the moment of inertia of a single particle about an axis is given by I = mr 2 where, m is the mass of the particle and r is distance from the axis under consideration. • The moment of inertia of a system of particles about an axis is given by I = Σ mi ri2 i
where, ri is the perpendicular distance from the axis of the ith particle, which has a mass mi .
Radius of Gyration The radius of gyration of a body about a given axis is the perpendicular distance of a point from the axis at which the whole mass of the body could be concentrated without any change in the moment of inertia of the body about that axis. If a body has mass M and radius of gyration is k, then moment of inertia, I = Mk 2
⇒ k = I/M
where, k is radius of gyration. Radius of gyration is also defined as the root mean square value of distance of all the particles about the axis of rotation. i.e.
k=
r12 + r22 + r32 + K + rn2 n
Theorem of Parallel Axes It states that, moment of inertia of a rigid body about any axis is equal to its moment of inertia about a parallel axis through its centre of mass plus the product of the mass of the body and the square of the perpendicular distance between the two axes.
CM
R
Two such axes are shown in figure for a body of mass M. If R is the distance between the axes and I CM and I are the respective moments of inertia about these axes, then I = I CM + MR 2
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Let X and Y axes be chosen in the plane of the body and Z-axis perpendicular to this plane, three axes being mutually perpendicular, then according to the theorem
Theorem of Perpendicular Axes It states that, the moment of inertia of a plane lamina about an axis perpendicular to its plane is equal to the sum of the moments of inertia of the lamina about any two mutually perpendicular axes in its plane and intersecting each other at the point, where the perpendicular axis passes through it.
Z
Y
ri
xi
P yi
O
I Z = I X + IY where, I X , I Y and I Z are the moments of inertia about the X , Y and Z-axes respectively.
X
I Z = I X + IY
Moment of Inertia of Simple Geometrical Objects S.No. 1.
Name of Body
Axis of Rotation
Figure
Thin circular (i) About an axis passing through ring, radius R CG and perpendicular to its plane
Moment of Inertia
Radius of Gyration (k)
k 2 /R 2
MR 2
R
1
1 MR 2 2
R 2
1 2
1 MR 2 2
R 2
1 2
1 MR 2 4
R 2
1 4
ML2 12
L 12
ML2 3
L 3
M 2 [ l + b2 ] 12
l 2 + b2 12
R
(ii) About its diameter
2.
Circular disc, (i) Perpendicular to disc at centre radius R R
(ii) About its diameter
3.
Long uniform (i) About an axis passing through thin rod its centre of mass and perpendicular to the rod L
(ii) About an axis passing through its edge and perpendicular to the rod
4.
Rectangular lamina
Passing through the centre of mass and perpendicular to the plane.
L
b l
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SYSTEM OF PARTICLES AND ROTATIONAL MOTION
S.No. 5.
Name of Body Hollow cylinder, radius R
Moment of Inertia
Radius of Gyration (k)
k 2 /R 2
MR 2
R
1
2MR 2
2R
2
L2 R 2 M + 2 12
L2 R 2 + 12 2
L2 R 2 M + 2 3
L2 R 2 + 3 2
1 MR 2 2
R 2
1 2
3 MR 2 2
3 R 2
3 2
(iii) About an axis passing through its CG and perpendicular to its own axis
L2 R 2 M + 4 12
L2 R 2 + 12 4
(iv) About the diameter of one of the faces of the cylinder
L2 R 2 M + 4 3
Axis of Rotation
Figure
(i) About its own axis R L
(ii) Tangential (Generator)
(iii) About an axis passing through its CG and perpendicular to its own axis
(iv) About the diameter of one of faces of the cylinder
R
6.
Solid cylinder (i) About its own axis
(ii) Tangential (Generator)
L
L2 R 2 + 3 4
150
S.No.
7.
8.
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Name of Body
Axis of Rotation
Moment of Inertia
Figure
k 2 /R 2
2 MR 2 3
2 R 3
2 3
(ii) About a tangential axis
5 MR 2 3
5 R 3
5 3
Solid sphere, (i) About its diametric axis radius R
2 MR 2 5
2 R 5
2 5
7 MR 2 5
7 R 5
7 5
Spherical shell
(i) About its diametric axis
R
R
(ii) About a tangential axis
9.
Radius of Gyration (k)
Hollow sphere of inner radius R1 and outer radius R2
(i) About its diametric axis
2 M 5
R1
R25 − R15 3 3 R2 − R1
R2
(ii) Tangential
2 M 5
R25 − R15 + MR22 3 3 R2 − R1
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SYSTEM OF PARTICLES AND ROTATIONAL MOTION
Rotational Kinetic Energy
Rolling Motion
The energy due to rotational motion of a body is known as rotational kinetic energy. 1 Rotational KE = Iω 2 2 where, ω = angular velocity of particles and I = moment of inertia.
Kinematic Equation of Rotational Motion The kinematic equations for rotational motion with uniform angular acceleration are given below 1 (i) ω = ω 0 + αt (ii) θ = ω 0 t + αt 2 2 (iii) ω 2 − ω 20 = 2α (θ − θ 0 ) where, θ 0 and ω 0 are initial angular displacement and angular velocity, θ and ω are final angular displacement and angular velocity and α is angular acceleration.
Some Important Formula • Instantaneous power in rotational motion, P = τω. • Relation between torque and angular acceleration, τ = Iα.
Dynamics of Rotational Motion about a Fixed Axis From the given table, we compare linear motion and rotational motion about a fixed axis, i. e. Z-axis. Comparison of Translational and Rotational Motion Pure rotational Angular position, θ
Pure translation Position, x dx Velocity, v = dt Acceleration, a =
Angular velocity, ω = dv dt
dθ dt
Angular acceleration, α =
dω dt
Mass, m Newton’s second law, F = ma
Rotational inertia, I Newton’s second law, τ = Iα
Work done, W = ∫ F dx
Work done, W = ∫ τ dθ
1 Kinetic energy, K = mv 2 2 Power, P = Fv Linear momentum, p = mv
1 Kinetic energy, K = Iω 2 2 Power, P = τω Angular momentum, L = Iω
When a body performs translation motion as well as rotational motion, then this type of motion is known as rolling motion. • Kinetic Energy of Rolling Motion A body rotating about its axis with angular velocity ω and its centre of mass moving with velocity vCM , then kinetic energy of rolling is given as KE rolling = KE translational + KE rotational 1 1 2 MvCM + Iω 2 2 2 • Various physical quantities of a body, rolling on an inclined plane without slipping are listed below =
(i) Acceleration of the body, g sin θ a= k2 1+ 2 R where, θ = angle of inclination. (ii) Velocity of the body when it reaches the bottom, 2gh v= k2 1+ 2 R (iii) Time taken by a rolling body to reach the bottom, t=
2h (1 + k 2 / R 2 ) 1 g sin θ
2 2 • A body with smaller value of k / R will take less
time to reach the bottom. • Change in kinetic energy due to rolling ( v 2 > v1 ) =
1 k2 2 m 1+ ( v 2 − v12 ) 2 R2
Topical Practice Questions All the exam questions of this chapter have been divided into 6 topics as listed below Topic 1 — POSITION AND MOTION OF CENTRE OF MASS
152–155
Topic 2
—
TORQUE, COUPLE AND ANGULAR MOMENTUM
156–160
Topic 3
—
MOMENT OF INERTIA
160–167
Topic 4
—
ROTATIONAL ENERGY AND POWER
167–169
Topic 5
—
DYNAMICS OF ROTATIONAL MOTION
170-172
Topic 6
—
ROLLING MOTION
172-177
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Position and Motion of Centre of Mass 2018 1 Three bodies having masses 5 kg, 4 kg and 2 kg is moving
at the speed of 5 ms −1 , 4 ms −1 and 2 ms −1 respectively along X -axis. The magnitude of velocity of centre of mass is [AIIMS] (a) 1.0 ms −1 (b) 4 ms −1 (c) 0.9 ms −1 (d) 1.3 ms −1
2017 2 Two masses of 6 and 2 unit are at positions (6$i −7$j) and ( 2$i + 5$j − 8k$ ), respectively. The coordinates of the centre of mass are (JIPMER) (a)(2,−5,3) (b) (5,−5, −3) (c)(5,−4,−2) (d) (5,−4,−4)
2014 3 The position of centre of mass of a system of particles does not depend upon the (a) mass of particles (b) symmetry of the body (c) position of the particles (d) relative distance between the particles (e) nature of particles
[Kerala CEE]
2012 4 Three masses are placed on the X-axis, 300 g at origin, 500 g at x = 40 cm and 400 g at x = 70 cm. The distance of the centre of mass from the origin is [CBSE AIPMT] (a) 40 cm (b) 45 cm (c) 50 cm (d) 30 cm
5 Two persons of masses 55 kg and 65 kg respectively, are at the opposite ends of a boat. The length of the boat is 3.0 m and weighs 100 kg. The 55 kg man walks up to the 65 kg man and sits with him. If the boat is in still water, the centre of mass of the system shifts by [CBSE AIPMT] (a) 3.0 m (b) 2.3 m (c) zero (d) 0.75 m
2011 6 In the diagram shown below,
O
m1
m1 and m2 are the masses of x1 x2 two particles and x1 and x 2 are their respective distances from the origin O. The centre of mass of the system is m x + m2 x 2 m + m2 (a) 1 2 (b) 1 m1 + m2 2 m1 x1 + m2 x 2 m1 m2 + x1 x 2 (c) (d) m1 + m2 m1 + m2
m2
[J&K CET]
2010 7 The centre of mass of a system of three particles of masses 1 g, 2 g and 3 g is taken as the origin of a coordinate system. The position vector of a fourth particle of mass 4 g such that the centre of mass of the four particles system lies at the point (1, 2, 3) isα ( $i + 2$j + 3k$ ), whereα is a constant. The value of α is 10 5 (a) (b) 3 2
[AMU]
1 (c) 2
2 (d) 5
8 A block of mass m slides with velocity v along a frictionless level surface towards a block of mass 4 m initially at rest. The velocity of centre of mass is [AMU] (a) v / 5 (b) v / 4 (c) 5v / 2 (d) ( 4 / 5)v 9 The centre of mass of three particles of masses 1 kg, 2 kg and 3 kg is at (3, 3, 3) with reference to a fixed coordinate system. Where should a fourth particle of mass 4 kg be placed, so that the centre of mass of the system of all particles shifts to a point (1, 1, 1)? [JCECE] (a) ( −1, − 1, − 1) (b) ( −2, − 2, − 2) (c) ( 2, 2, 2) (d) (1, 1, 1)
2008 10 Two bodies of different masses of 2 kg and 4 kg moving
with velocities 2 ms −1 and 10 ms −1 towards each other, due to mutual gravitational attraction. What is the velocity of their centre of mass? [BHU] (a) 5 ms −1 (b) 6 ms −1 (c) 8 ms −1 (d) zero
11 A system consisting of two masses connected by a massless rod lies along the X -axis. A 0.4 kg mass is at a distance x = 2 m while a 0.6 kg mass is at a distance x = 7 m. The x-coordinate of the centre of mass is (a) 5 m (b) 3.5 m [Kerala CEE] (c) 4.5 m (d) 4 m (e) 3 m 12 Identify the correct statement for the rotational motion of a rigid body. [J&K CET] (a) Individual particles of the body do not undergo accelerated motion. (b) The centre of mass of the body remains unchanged. (c) The centre of mass of the body moves uniformly in a circular path. (d) Individual particles and centre of mass of the body undergo an accelerated motion.
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SYSTEM OF PARTICLES AND ROTATIONAL MOTION
2007 13 Four point masses P , Q, R and S with respective masses 1 kg, 1 kg, 2 kg and 2 kg form the corners of a square of side a. The centre of mass of the system will be farthest from [Kerala CEE] (a) P only (b) R and S (c) R only (d) P and Q (e) P and R
2006 14 A small disc of radius 2 cm is cut from a disc of radius 6 cm. If the distance between their centres is 3.2 cm, what is the shift in the centre of mass of the disc? [AFMC] (a) 0.4 cm (b) 2.4 cm (c) 1.8 cm (d) 1.2 cm
15 A straight rod of length L has one of its ends at the origin and the other at x = L. If the mass per unit length of the rod is given by Ax, here A is constant, then where is its centre of mass? (a) L/3 (b) L/2 (c) 2L/3 (d) 3L/4 [BHU]
17 Three identical spheres of mass m each are placed at the corners of an equilateral triangle of side 2m. Taking one of the corners as the origin, the position vector of the centre of mass is [J&K CET] $i (b) (a) 3( i$ − $j ) + $j 3 $i + $j $j (c) (d) i$ + 3 3 18 Four particles, each of mass 1 kg are placed at the corners of a square OABC of side 1 m. O is at the origin of the coordinate system. OA and OC are aligned along positive X-axis and positive Y-axis, respectively. The position vector of the centre of mass is (in metre) [EAMCET] 1 $ $ 1 $ $ $ $ $ $ (d) ( i − j ) (b) ( i + j ) (c) ( i − j ) (a) i + j 2 2 2005 19 A cricket bat is cut at the location of its centre of mass as shown. Then, [Kerala CEE] (a) the two pieces will have the same mass (b) the bottom piece will have larger mass (c) the handle piece will have larger mass (d) mass of handle piece is double the mass of bottom piece (e) None of the above
16 Find the velocity of centre of mass of the system shown in the figure. [AMU] y 1 kg x
2 kg
2 ms–1
30°
20 Three particles each of mass 1 kg are placed at the corners of a right angled triangle AOB, O being the origin of the coordinate system (OA and OB along positive x-direction and positive y-direction). If OA = OB = 1 m, the positive vector of the centre of mass (in metre) is [EAMCET] $ $ $i + $j $i − $j 2( i + j ) (a) (d) ( i$ − $j ) (b) (c) 3 3 3
2 ms–1
2 + 2 3 2 $i − $j (a) 3 3 2 − 2 3 1 i$ − $j (c) 3 3
(b) 4$i (d) None of these
Answers 1 (b) 11 (a)
2 (c) 12 (c)
3 (e) 13 (d)
4 (a) 14 (a)
5 (c) 15 (b)
6 (c) 16 (a)
7 (b) 17 (d)
8 (a) 18 (b)
9 (b) 19 (b)
10 (d) 20 (a)
Explanations 1 (b) As, we know vCM
m v + m2v2 + m3v3 = 1 1 m1 + m2 + m3
Given, m1 = 5 kg, v1 = 5 ms −1, −1
m2 = 4 kg, v2 = 4 ms , m3 = 2 kg and v3 = 2 ms −1. So, by putting the values, 5 × 5 + 4 × 4 + 2 × 2 25 + 16 + 4 vCM = = 5+ 4 + 2 11 45 −1 = 4.09 ≈ 4 ms ∴ vCM = 11
2 (c) Given, masses, m1 = 6 unit and
m2 = 2 unit Positions = 6$i − 7$j and 2$i + 5$j − 8k$ To find centre of mass, m x + m2x2 xCM = 1 1 m1 + m2 6×6+ 2×2 = 6+ 2 36 + 4 = = 5$i 8 m y + m2 y2 yCM = 1 1 m1 + m2
6 × (− 7) + 2 × (+ 5) 6+ 2 − 42 + 10 = = – 4 $j 8 m z + m2z2 zCM = 1 1 m1 + m2 6 × (0) + 2 × (− 8) = 2+ 6 − 16 = = − 2k$ 8 ∴ Centre of mass lies on 5$i – 4 $j − 2k$ .. =
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3 (e) The position of centre of mass
4 (a) Given, m1 = 300 g, x1 = 0 cm (origin), m2 = 500 g, x2 = 40 cm, m3 = 400 g and x3 = 70 cm Distance of the centre of mass from the origin, m x + m2x2 + m3x3 xCM = 1 1 m1 + m2 + m3 300(0) + 500(40) + 400(70) xCM = 300 + 500 + 400 20000 + 28000 48000 xCM = = 1200 1200 ⇒ xCM = 40 cm
m1z1 + m2z2 + m3z3 + m4z4 m1 + m2 + m3 + m4 4 × 3α ⇒ 3= 10 5 α= ⇒ 2 (a) Given, m1 = m, v1 = v m2 = 4 m, and v2 = 0 m v + m2v2 As vCM = 1 1 m1 + m2 m × v + 4m × 0 v So, vCM = = m + 4m 5 zCM =
(rCM ) of a system of particles does not depend upon the nature of particles. Σmi ri rCM = Σmi
8
6 (c) The centre of mass of the system is given by m1
O
m2
x1 x2
x=
m1x1 + m2x2 m1 + m2
7 (b) The coordinates (x , y, z) of masses 1 g, 2 g, 3 g and 4 g are (x1 = 0, y1 = 0, z1 = 0) (x2 = 0, y2 = 0, z2 = 0) (x3 = 0, y3 = 0, z3 = 0) [Q Centre of mass of particles 1g,2g and 3g is at origin] (x4 = α , y4 = 2α , z4 = 3α ) m x + m2x2 + m3x3 + m4x4 xCM = 1 1 m1 + m2 + m3 + m4 4α = 1+ 2 + 3 + 4 4α 5 ⇒ 1= ⇒α= 10 2 m1 y1 + m2 y2 yCM = m1 + m2 4 × 2α 2= ⇒ 10 20 5 α= = ⇒ 8 2 xCM =
4α 10
given byn Σ ∆mi xi i=1 , xCM = n Σ ∆M j
+ m3 y3 + m4 y4 + m3 + m4
13 (d) Centre of mass C 1 from point P =
yCM =
j=1 n
zCM =
1 × 0 + 2 × a 2a = 1+ 2 3 (1 kg) Q
(1 kg) P C1
Σ ∆mi yi
i=1 n
S (2 kg)
Σ ∆M j
j=1
Σ ∆mi zi
i=1 n
Σ ∆M j
j=1
Let us consider masses 1g,2g and 3g are placed at point (3,3,3). Since, this point is centre of mass of these particles. 1 × x1 + 2 × x2 + 3 × x3 = (1 + 2 + 3)3 As, x1 = x2 = x3 = 3 ...(i) x1 + 2x2 + 3x3 = 18 xCM = yCM = zCM = 1 (given) 1(1 + 2 + 3 + 4 ) = x1 + 2x2 + 3x3 + 4 x4 …(ii) Solving Eqs. (i) and (ii), we get 4 x4 = 10 − 18 ⇒ x4 = − 2 Similarly, y4 = − 2, z4 = − 2 The fourth particle must be placed at the point (−2, − 2, − 2).
C2
CM
n
R (2 kg)
Therefore, distance of centre of mass C 1 from point S 2a a =a− = 3 3 Similarly, centre of mass C 2 of point mass placed at corners Q and R, from point Q = 2a / 3 Distance of centre of mass C 2 from point 2a a R=a− = 3 3 Centre of mass of all four point masses is at the mid-point of the line joining C 1 and C 2 , which is farthest from points P and Q.
14 (a) a O
b O1
O2
x-axis
10 (d) As gravitational forces of attraction are mutual and internal. So, centre of mass is not affected (in the absence of external force). Velocity of centre of mass is zero. Fext = a mCM
11 (a) The x-coordinate of centre of mass [QxCM =1]
the centre of mass of the body moves uniformly in a circular path. Whereas individual particle undergo accelerated motion, Hence, option (c) is correct.
9 (b) Centre of mass of a solid body is
5 (c) Here, on the entire system, net external force on the system is zero. Hence, centre of mass remains unchanged. Q Fext = µACM ⇒ Fext = 0 or ACM = 0
12 (c) In rotational motion of a rigid body,
is given by m x + m2x2 x= 1 1 m1 + m2 Given, m1 = 0.4 kg, x1 = 2 m, m2 = 0.6 kg and x2 = 7 m. 0.4 × 2 + 0.6 × 7 5 Hence, x = = 0.4 + 0.6 1 =5m
x2
x1
Let radius of complete disc is a and that of small disc is b. Also, let centre of mass now shifts to O2 at a distance x2 from original centre. The position of new centre of mass is given by xCM =
− σπb2x1 σπa2 − σπb2
where, σ = mass per unit area. Given, a = 6 cm, b = 2 cm and x1 = 3.2 cm
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SYSTEM OF PARTICLES AND ROTATIONAL MOTION
Hence,
17 (d) The x-coordinate of centre of mass
− σ × π (2)2 × 3.2 xCM = σ × π × (6)2 − σ × π × (2)2 12. 8π =− = − 0.4 cm 32π Negative sign indicates the shift from the centre.
is
Σ mi xi Σ mi mO xO + mAxA + mB xB = mO + mA + mB
x=
B (1, 2)
length dx of the rod located at a M dx. L
Y x O (0,0)
X dx
x=0
x=L
L
The x-coordinate of the centre of mass is given by 1 1 L M xCM = x dm = x dx ∫ M ∫0 L M L L 1 x2 = = L 20 2 The y-coordinate is 1 yCM = y dm = 0 M∫ and similarly, z CM = 0 Hence, the centre of mass is at L , 0, 0 or at the middle point of the 2 L rod, i.e. at . 2
16 (a) Given, m1 = 1 kg, v1 = 2 i,^ m2 = 2 kg ^
So, vCM ^ 1 × 2i$ + 2(2 cos 30° i − 2 sin 30° $j) = 1+ 2 ^
2m
60°
(0, 0) O
A
1m
=
(2, 0)
m × 0 + m ×1+ m × 2 m+ m+ m
=1 Σ mi yi y= Σ mi m × 0 + m (2 sin 60° ) + m × 0 = m+ m+ m
^
^
2i + 2 3 i − 2 j 3 2 + 2 3 ^ 2 ^ = i− j 3 3
d1 Mupper
Position vector of centre of mass is ^ ^i + j . 3
18 (b) We can show the situation as B (1,1)
(0, 1) C
Q ⇒
1m
O
A (1,0)
The centre of mass of square is at point D (x , y). The position coordinates of point D 0 + 1+ 1+ 0 0 + 1+ 1+ 0 (x , y) ≡ , 1 + 1 + 1 + 1 1 + 1 + 1 + 1 1 1 ≡ , 2 2 Q xCM =
mO xO + mAxA + mB xB + mC xC mO + mA + mB + mC
d1 > d2 M bottom > M upper
20 (a) Three particles each of mass 1 kg are placed at the three corners of a right angled triangle. (0,1) B m3
m1
m2
O (0,0)
A (1,0)
Given, m1 = m2 = m3 = 1 (x1 , y1 ) = (0, 0), (x2 , y2 ) = (1, 0), (x3 , y3 ) = (0, 1), (xCM , yCM ) = ?
D (x, y)
1m
d2 Mbottom
As, M upper d1 = M bottom d2
3m 1 y= = 3m 3
^
andv2 = 2 cos 30° i − 2 sin 30° j m v + m2 v2 As, vCM = 1 1 m1 + m2
⇒ vCM =
2m
19 (b) Centre of mass is the point where the weighted relative position of the distributed mass sums to zero. The centre of mass of the bat is near the bottom end of the bat, which shows more mass at bottom.
15 (b) Let the mass of an element (dm) of distance x away from left end is
Hence, position vector of centre of mass D is 1^ 1^ ^ ^ = xi + yj= i + j 2 2 1 ^ ^ = (i + j) 2
⇒
xCM =
m1x1 + m2x2 + m3x3 m1 + m2 + m3
xCM =
1× 0 + 1× 1 + 1× 0 1 = 1+ 1+ 1 3
m1 y1 + m2 y2 + m3 y3 m1 + m2 + m3 1× 0 + 1× 0 + 1× 1 1 = = 1+ 1+ 1 3
yCM = ⇒
yCM
∴
rCM = xCM i + yCM j
^
= ⇒
rCM =
1^ 1^ i+ j 3 3 ^
^
i+ j 3
^
Topic 2 Torque, Couple and Angular Momentum 2018 1 The moment of the force F = 4i$ + 5$j − 6k$ at ( 2, 0, − 3), about the point ( 2, − 2, − 2) is given by (a) −7$i − 8$j − 4k$ (b) −4$i − $j − 8k$ (c) −8i$ − 4$j − 7k$ (d) −7i$ − 4$j − 8k$
[NEET]
2 A thin horizontal circular disc is rotating about a vertical axis passing through its centre. An insect is at rest at a point near the rim of disc. The insect now moves along a diameter of the disc to reach its other end. During the journey of the insect, the angular speed of the disc [AIIMS] (a) continuously decreases (b) continuously increases (c) first increases and then decreases (d) remains unchanged 3 A solid sphere is rotating freely about its symmetry axis in free space. The radius of the sphere is increased keeping its mass same. Which of the following physical quantities would remain constant for the sphere? [NEET] (a) Rotational kinetic energy (b) Moment of inertia (c) Angular velocity (d) Angular momentum
2017 4 Which of the following statements are correct?
[NEET]
I. Centre of mass of a body usually coincides with the centre of gravity of the body. II. Centre of mass of a body is the point at which the total gravitational torque on the body is zero. III. A couple on a body produce both translational and rotational motion in a body. IV. Mechanical advantage greater than one means that small effort can be used to lift a large load. (a) II and IV (b) I and II (c) II and III (d) III and IV
5 A constant torque of 3.14 N-m is exerted on a pivoted wheel. If the angular acceleration of the wheel is 4π rad s −2 , then the moment of inertia of the wheel is (b) 2.5 kg-m 2 (a) 0.25 kg-m 2 [J&K CET] 2 (d) 25 kg-m 2 (c) 4.5 kg-m
2016 6 A force F = 5i$ + 2$j − 5k$ acts on a particle whose position vector is r = $i − 2$j + k$ . What is the torque about the origin ? [KCET] (a) 8$i + 10$j + 12 k$ (b) 8$i + 10$j − 12 k$ (c) 8$i − 10$j − 8k$ (d) 10$i − 10$j − k$
7 Angular momentum L is given by L = p ⋅ r. The variation of [AMU] log L and log p is shown by log L
log L I
II log p
log p
log L
log L
III
IV log p
(a) I (c) III
log p
(b) II (d) IV
2015 8 A rod of weight w is supported by two parallel knife edges A and B and is in equilibrium in a horizontal position. The knives are at a distance d from each other. The centre of mass of the rod is at distance x from A. The normal reaction on A is [CBSE AIPMT] wx wd (a) (b) d x w( d − x ) w( d − x ) (c) (d) x d
2012 9 A circular platform is mounted on a frictionless vertical axle. Its radius r = 2 m and its moment of inertia about the axle is 200 kg-m 2 . It is initially at rest. A 50 kg man stands on the edge of the platform and begins to walk along the edge at the speed of 1ms –1 relative to the ground. Time taken by the man to complete one revolution is [CBSE AIPMT] 3π (a) π s (b) s 2 π (c) 2π s (d) s 2
157
SYSTEM OF PARTICLES AND ROTATIONAL MOTION
2011 10 The instantaneous angular position of a point on a rotating
wheel is given by the equation θ( t ) = 2t 3 − 6t 2 . The torque on the wheel becomes zero at [CBSE AIPMT] (a) t = 0. 5 s (b) t = 0. 25 s (c) t = 2 s (d) t = 1s
11 A force F = 2.0 N acts on a particle P in the x- z plane. The force F is parallel to X -axis. The particle P (as shown in the figure) is at a distance 3 m and the line joining P with the origin makes angle 30° with the X -axis. The magnitude of torque on P w.r.t. origin O (in N-m) is [AMU] z
F 3m
P
30° x
(a)2 (c)4
y
the rod about A is
ml 2 , the initial angular acceleration of 3
the rod will be
[CBSE AIPMT] l
A
(a)
2g 3l
B
(b) mg
l 2
(c)
3 gl 2
(d)
3g 2l
16 A particle of mass m moves in the xy- plane with a velocity v along the straight line AB. If the angular momentum of the particle with respect to origin O is L A when it is at A and LB when it is at B, then Y
O B
(b)3 (d) 5
2010 12 A small object of mass m is attached to a light string which passes through a hollow tube. The tube is hold by one hand and the string by the other. The object is set into rotation in a circle of radius R and velocity v. The string is then pulled down, shortening the radius of path of r. What is conserved? [UP CPMT] (a) Angular momentum (b) Linear momentum (c) Kinetic energy (d) None of the above
13 A particle of mass mis projected with a velocity vmaking an angle of 45° with the horizontal. The magnitude of angular momentum of the projectile about an axis of projection when the particle is of maximumheight his [BVP] 3 mv (a) zero (b) 4 2g mv 2 (c) (d) m ( 2gh 3 ) 2g 14 A particle with the position vector r has linear momentum p. Which of the following statements is true in respect of its angular momentum L about the origin? [Kerala CEE] (a) L acts along p. (b) L acts along r. (c) L is maximum when p and r are parallel. (d) L is maximum when p is perpendicular to r. (e) L is minimum when p is perpendicular to r. 2007 15 A uniform rod AB of length l and mass m is free to rotate about point A. The rod is released from rest in the horizontal position. Given that the moment of inertia of
A O
X
[CBSE AIPMT]
(a) L A > LB (b) L A = LB (c) the relationship between L A and LB depends upon the slope of the line AB (d) L A < LB
17 Let F be the force acting on a particle having position vector r and τ be the torque of this force about the origin. Then, [DCE] (a) r ⋅ τ = 0 and F⋅ τ ≠ 0 (b) r ⋅ τ ≠ 0 and F⋅ τ = 0 (c) r ⋅ τ ≠ 0 and F⋅ τ ≠ 0 (d) r ⋅ τ = 0 and F⋅ τ = 0 18 A wheel having moment of inertia 2 kg -m 2 about its vertical axis, rotates at the rate of 60 rpm about this axis. The torque which can stop the wheel’s rotation in one minute would be [Manipal] 2π π π π −1 −1 −1 (a) (d) Nm (b) Nm (c) Nm Nm −1 15 12 15 18 19 A particle is projected with a speed v at 45° with the horizontal. The magnitude of angular momentum of the projectile about the point of projection when the particle is at its maximum height h is [Kerala CEE] mvh 2 mv 2 h mvh 3 (d) (c) (a) zero (b) 2 2 2 mvh (e) 2 20 If the torque of the rotational motion will be zero, then the constant quantity will be [BVP] (a) angular momentum (b) linear momentum (c) angular acceleration (d) centripetal acceleration
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
21 A thin rod of mass m and length 2l is made to rotate about an axis passing through its centre and perpendicular to it. If its angular velocity changes from 0 toω in time t, the torque acting on it is [AMU] ml 2ω ml 2ω ml 2ω 4ml 2ω (b) (c) (d) (a) 12t 3t t 3t 2006 22 A particle of mass ( m) = 5 units is moving with a uniform speed v = 3 2 units in the xoy - plane along the line y = x + 4. The magnitude of the angular momentum of the particle about the origin is [Manipal] (a) 60 units (b) 40 2 units (c) zero (d) 7.5 units 23 A thin circular ring of mass M and radius R rotates about an axis through its centre and perpendicular to its plane, with a constant angular velocityω .Four small spheres each of mass m(negligible radius) are kept gently to the opposite ends of two mutually perpendicular diameters of the ring. The new angular velocity of the ring will be [Kerala CEE] M (a) 4 ω (b) ω 4m M M + 4 m (c) (d) ω ω M M − 4 m M (e) ω M + 4m
24 A disc of mass 2 kg and radius 0.2 m is rotating with angular velocity 30 rad s −1 . What is angular velocity, if a mass of 0.25 kg is put on periphery of the disc? (b) 36 rad s −1 (d) 26 rad s −1
(a) 24 rad s −1 (c) 15 rad s −1
[DUMET]
2005 25 A horizontal platform is rotating with uniform angular velocity around the vertical axis passing through its centre. At some instant of time, a viscous fluid of mass m is dropped at the centre and is allowed to spread out and finally fall, the angular velocity during this period (a) decreases continuously [AIIMS] (b) decreases initially and increases again (c) remains unaltered (d) increases continuously
26 Assertion For a system of particles under central force field, the total angular momentum is conserved. Reason The torque acting on such a system is zero. [AIIMS]
(a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
Answers 1 (d) 11 (b) 21 (b)
2 (c) 12 (a) 22 (a)
3 (d) 13 (b) 23 (e)
4 (b) 14 (d) 24 (a)
5 (a) 15 (d) 25 (b)
6 (d) 16 (b) 26 (a)
7 (d) 17 (d)
8 (d) 18 (c)
9 (c) 19 (e)
10 (d) 20 (a)
Explanations 1 (d) Moment of force is defined as the cross product of the force and the force arm. Given, F = 4 i$ + 5$j − 6$j , r1 = 2$i + 0$j − 3k$ and r2 = 2$i − 2$j − 2k$ Moment of force = r × F = (r2 − r1 ) × F = [ ( 2i$ − 2$j − 2k$ ) − (2i$ + 0$j − 3k$ )] × [ 4 i$ + 5$j − 6k$ ] = [ 0 $i + 2$j − 1k$ ] × [ 4 $i + 5$j − 6k$ ] $i $j k$ = 0 2 −1 4
5 −6
= $i [(−6 × 2) − (−1 × 5)] − $j[(−6 × 0) − (−1 × 4 )] + k$ [(0 × 5) − 2 × 4 ] = −7i$ − 4 $j − 8k$
2 (c) Moment of inertia of the insect disc
1 system, MI = MR 2 + mx 2 2 where, m = mass of insect and x = distance of insect from centre. Clearly, as the insect moves along the diameter of the disc. Moment of inertia first decreases and then increases. By conservation of angular momentum, angular speed first increases and then decreases.
3 (d) As, we know that external torque, dL dt where, L is the angular momentum. Since, in the given condition, dL τ ext = 0 ⇒ =0 dt or L = constant τ ext =
Hence, when the radius of the sphere is increased keeping its mass same, only the angular momentum remains constant. But other quantities like moment of inertia, rotational kinetic energy and angular velocity changes.
4 (b) Usually, the centre of gravity coincides with the centre of mass for bodies, when the gravitational field is uniform for bodies of small height. Since, the gravitational force can be taken to be centered or confined at the centre of gravity of body, so the torque of gravitational force about the centre of gravity must be zero. A couple always produces the rotation without translation. Mechanical advantage is the ratio of the force produced by a machine to the force applied on it. It is used in assessing the performance of a machine So, option (b) is correct.
159
SYSTEM OF PARTICLES AND ROTATIONAL MOTION
9 (c) Given, r = 2 m, I = 200 kg-m 2,
5 (a) Given, τ ext = 314 . N-m α = 4 π rads
and
6
−2
m = 50 kg and v = 1ms
As, τ ext = I α τ 1 314 . So, I = ext = = = 0.25 kg-m 2 d 4π 4 (a) Given, F = 5i$ + 2$j − 5k$ r = $i − 2$j + k$
and
$j
On conservating angular momentum, Iω = mvr ⇒ 200 × ω = 50 × 1 × 2 1 or ω = rads−1 2 Linear velocity, v = r ω = 1 ms−1
momentum, L = r × p = rmv sin φ (− k$ )
2π = πr = 2π s Q t = ω
k$
= 1 −2
16 (b) From the definition of angular
2πr 2πr Time taken, t = = 1 − (−1) 2
We know that, τ = r × F So, torque about the origin will be given by
$i
where, m is mass of rod and l is length. Torque (τ = lα ) acting on centre of gravity of rod is given by l l or Iα = mg τ = mg 2 2 ml 2 l 3g or α = or α = mg 3 2 2l
−1
Y φ
10 (d) According to question, torque,
1
5 +2 −5 = $i (10 − 2) − $j (− 5 − 5) + k$ (2 + 10) = 8$i + 10$j + 12k$
7 (d) Angular momentum, L = rp Taking log on both sides, we get loge L = loge p + loge r loge L
τ = Iα = 0 it means that α = 0 d 2θ or α= 2 =0 dt Given, θ(t ) = 2t 3 − 6t 2 dθ So, = 6t 2 − 12t dt d 2θ d 2θ = 12t − 12 Q α = 2 = 0 dt dt
12t − 12 = 0 ⇒ t = 1 s
A P d
loge p
∴The graph is drawn between loge L and loge p is a straight line, which is not pass through the origin.
8 (d) As the weight w balances the normal reactions. A
B
where, τ is perpendicular to both r and F. So, r ⋅τ as well as, F ⋅ τ has to be zero.
N1
N2 w
…(i) w = N1 + N2 Now balancing torque about the COM, i.e. anti-clockwise momentum = clockwise momentum ⇒ N 1x = N 2 (d − x )
So,
Putting the value of N 2 from Eq. (i), we get N 1x = (w − N 1 ) (d − x ) ⇒ N 1x = wd − wx − N 1d + N 1x ⇒ ⇒
18 (c) Given, I = 2 kg-m 2 , ω0 =
12 (a) In the absence of external torque, angular momentum remains constant
N 1d = w(d − x ) w(d − x ) N1 = d
v 2 sin 2 θ v 2 sin 2 45° v 2 = = 2g 4g 2g
(Q θ = 45°) At highest point, momentum mv = mv cos 45° = 2 Angular momentum mv v 2 mv 3 = × = 2 4 g 4 2g
19 (e) When a particle is projected with a speed v at 45° with the horizontal, then the velocity of the projectile at maximum height, v v′ = v cos 45° = 2 Angular momentum of the projectile about the point of projection is
14 (d) We know that, L = r × p. Angular momentum L is maximum when p is perpendicular to r.
15 (d) The moment of inertia of the uniform rod about an axis through one end and perpendicular to its length is ml 2 I = 3
60 × 2π rad s−1, ω = 0 and t = 60 s 60
The torque required to stop the wheel’s rotation is ω − ω τ = Iα = I 0 t 2 × 2π × 60 π = Nm −1 ∴ τ= 60 × 60 15
whereas linear momentum and kinetic energy changes.
=
X
17 (d) We know that, τ = r × F
13 (b) Maximum height attained d–x
x
r O
Therefore, the magnitude of L is L = mvr sin φ = mvd, where d = r sin φ is the distance of closest approach of the particle to the origin. As d is same for both the particles, hence, LA = LB .
11 (b) As, torque,
τ = F ⋅ r sin θ = 2 × 3 × sin 30° (given) 1 ⇒ τ = 6 × = 3 N-m 2
B
20
= mv′ h v mvh =m h= 2 2 dL (a) As, torque, τ = dt If τ = 0, then L = constant Hence, option (a) is correct.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
21 (b) Since, τ = Iα
= 4 sin 45° = 2
So,
m(2l ) τ= 12
or
τ=
or
4 ml 2ω ml 2ω τ= = 12t 3t
ω t
2
ml QI = 12
m × 4 l2 × ω 12 × t
The direction of momentum in the XOY plane is given by Y
momentum gives …(i) Iω = constant When viscous liquid dropped at the centre of horizontal table and it is made to spread out, then its moment of inertia increases. From Eq. (i), its angular velocity decreases. But when it starts falling then its moment of inertia starts decreasing and so its angular velocity increases again.
Iω = constant i.e. we can write, I 1ω 1 = I 2ω 2 or MR 2ω = (M + 4 m) R 2 ω 2 or
M ω2 = ω M + 4 m
24 (a) If no external torque acts on a
mv 45°
O
25 (b) Law of conservation of angular
angular momentum,
= Mass × Velocity = (5) × (3 2 ) = 15 2 (given)
45°
1 × 2 × (0.2)2 × 30 2 1 = × (2 + 2 × 0.25)(0.2)2 × ω 2 2 or 1.2 = 0.05ω 2 or ω 2 = 24 rad s−1
Angular momentum = Momentum × Perpendicular length = 15 2 × 2 2 = 60 units
23 (e) According to conservation of
22 (a) Momentum of the particle
Z
4 =2 2 2
4 X
y=x + 4 Slope of the line = 1 = tanθ θ = 45° Intercept of its straight line = 4 Length of the perpendicular Z from the origin of the straight line
system of particles, then angular momentum of the system remains constant, i.e. τ = 0 dL ⇒ = 0 ⇒ L = I ω = constant dt ⇒ I 1ω 1 = I 2ω 2 1 1 ⇒ Mr2ω 1 = (M + 2m)r2ω 2 …(i) 2 2 Given, M = 2 kg, m = 0.25 kg, r = 0.2 m and ω 1 = 30 rad s−1.
26 (a) When a body rotates about an axis under the action of an external torque τ, then the rate of change of angular momentum of the body is equal to the dJ torque, i.e. =τ dt If external torque is zero (τ = 0), then dJ = 0 ⇒ dJ = 0 dt ⇒ J = constant As torque is zero, due to central forces. Thus, angular momentum remains conserved.
Hence, after putting the given values in Eq. (i), we get
Topic 3 Moment of Inertia 2019 1 Two discs having mass ratio 1 : 2 and diameter ratio 2 : 1, then find the ratio of moment of inertia. (a) 2 : 1 (b) 1 : 1 (c) 1 : 2 (d) 2 : 3
[JIPMER]
2018 2 Find ratio of radius of gyration of a disc and ring of same radii at their tangential axis in plane. 5 5 (b) (a) 6 3 2 (c) 1 (d) 3
2017 3 ABC is right angled triangular plane of uniform thickness. The sides are such that AB > BC as shown in figure. I 1 , I 2 , I 3 are moments of inertia about AB, BC and AC, respectively. Then, which of the following relations is correct? [JIPMER] A I1
[JIPMER]
B
(a) I 1 = I 2 = I 3 (c) I 3 < I 2 < I 1
I3
I2
C
(b) I 2 > I 1 > I 3 (d) I 3 > I 1 > I 2
SYSTEM OF PARTICLES AND ROTATIONAL MOTION
2016 4 From a disc of radius R and mass M, a circular hole of diameter R, whose rim passes through the centre is cut. What is the moment of inertia of the remaining part of the disc about a perpendicular axis, passing through the centre? [NEET] 2 2 (b) 11 MR /32 (a) 13 MR /32 (d) 15 MR 2 /32 (c) 9 MR 2 /32
2016 5 A light rod of length l has two masses m1 and m2 attached to its two ends. The moment of inertia of the system about an axis perpendicular to the rod and passing through the centre of mass is [NEET] m1 m2 2 m1 + m2 2 (a) (b) l l m1 + m2 m1 m2 (d) m1 m2 l 2 (c) ( m1 + m2 )l 2
2015 6 Three identical spherical shells, each of mass
X
m and radius r are placed as shown in figure. Consider an axis XX ′, which is touching to two shells and passing through diameter of third shell. Moment of inertia of the system consisting of these three spherical shells X′ about XX ′ axis is [CBSE] 11 2 16 (a) mr (d) 4 mr 2 (b) 3 mr 2 (c) mr 2 5 5
2014 7 Moment of inertia of ring about its diameter is I. The moment of inertia of the same ring about that axis perpendicular to its plane and passing through centre is [KCET] I I (a) (b) 2I (c) (d) 4I 2 4
2013 8 Moment of inertia of a disc about an axis which is tangent and parallel to its plane is I. Then, the moment of inertia of disc about a tangent but perpendicular to its plane will be [MHT CET] 3I 5I 3I 6I (a) (b) (c) (d) 4 6 2 5
9 Assertion Two circular discs of equal mass and thickness made of different materials, will have same moment of inertia about their central axes of rotation. Reason Moment of inertia depends upon the distribution of mass in the body. [AIIMS ] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
161
10 Moment of inertia of circular loop of radius R about the axis of rotation parallel to horizontal diameter at a distance [WB JEE] R/2 from it is (b) (1/ 2) MR 2 (a) MR 2 (c) 2MR 2 (d) ( 3/ 4 )MR 2 11 A rod of length L is composed of a uniform length (1/2) L of wood whose mass in mw and a uniform length (1/2) L of brass whose mass is mb . The moment of inertia I of the rod about an axis perpendicular to the rod and through its centre is equal to [AMU] (a) ( mw + mb ) L2 / 12 (b) ( mw + mb ) L2 / 6 (c) ( mw + mb ) L2 / 3 (d) ( mw + mb ) L2 / 2
2011 12 The moment of inertia of a thin uniform rod of mass M and length L about an axis passing through its mid-point and perpendicular to its length is I 0 .Its moment of inertia about an axis passing through one of its ends and perpendicular to its length is [CBSE AIPMT] 2 2 (b) I 0 + 2ML (a) I 0 + ML /4 (d) I 0 + ML2 /2 (c) I 0 + ML2
13 Moment of inertia of a hollow cylinder of mass M and radius r about its own axis is [Kerala CEE] 2 2 2 2 (a) Mr (b) Mr 3 5 1 2 1 (d) Mr 2 (c) Mr 3 2 (e) Mr 2 14 One solid sphere A and another hollow sphere B are of same mass and same outer redius. Their moments of inertia about their diameters are respectively, I A and I B such that (a) I A = I B (b) I A > I B [J&K CET] (c) I A < I B (d) None of these
2010 15 The ratio of the radii of gyration of a circular disc and a circular ring of the same radii about a tangential axis perpendicular to plane of disc or ring is [AFMC] 3 (a) 1: 2 (b) 5 : 6 (c) 2 : 3 (d) 2
16 The moment of inertia of two equal masses each of mass m at separation L connected by a rod of mass M, about an axis passing through centre and perpendicular to length of rod is [VMMC] ( M + 3m )L2 ( M + 6m )L2 (b) (a) 12 12 ML2 ML2 (d) (c) 4 12
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
17 If the moment of inertia of a disc about an axis tangential and parallel to its surface be I, then what will be the moment of inertia about the axis tangential but perpendicular to the surface? [VMMC] 6 3 (b) I (a) I 5 4 3 5 (c) I (d) I 2 4 18 The moment of inertia of a circular disc of radius 2 m and mass 1 kg about an axis passing through the centre of mass but perpendicular to the plane of the disc is 2 kg-m 2 . Its moment of inertia about an axis parallel to this axis but passing through the edge of the disc is (see the given figure). [KCET] X
Y
X'
Y'
(b) 4 kg-m 2 (d) 6 kg-m 2
(a) 8 kg-m 2 (c) 10 kg-m 2
21 Two spheres of equal masses, one of which is a thin spherical shell and the other a solid, have the same moment of inertia about their respective diameters. The ratio of their radii will be [MHT CET] (a) 5 : 7 (b) 3 : 5 (c) 3 : 5 (d) 3 : 7 22 The radius of gyration of a rod of length L and mass M about an axis perpendicular to its length and passing through a point at a distance L/3 from one of its ends is [Punjab PMET]
23 The moment of inertia of a rod of mass M, length l about an axis perpendicular to it through one end is [J&K CET] (a) Ml 2 / 12 (b) ( 2 / 3) Ml 2 (c) ( 3 / 2) Ml 2 (d) Ml 2 / 3 24 Two identical rods of mass M and length l are lying in a horizontal plane at an angleα . The moment of inertia of the system of two rods about an axis passing through O and perpendicular to the plane of the rods is [J&K CET] α
2008 19 A thin rod of length L and mass M is bent at its mid-point into two halves, so that the angle between them is 90°. The moment of inertia of the bent rod about an axis passing through the bending point and perpendicular to the plane defined by the two halves of the rod is [CBSE AIPMT] ML2 ML2 (b) (a) 24 12 ML2 2ML2 (c) (d) 6 24
20 For the given uniform square lamina ABCD, whose centre is O. [AIIMS] D
F
C
(a) 2I AC = I EF (b) I AD = 3I EF (c) I AD = 4I EF (d) I AC = 2I EF
E
• X
(a) Ml 2 / 3 (c) Ml 2 / 4
(b) Ml 2 / 12 (d) Ml 2 / 6
25 Two identical concentric rings each of mass mand radius R are placed perpendicularly. What is the moment of inertia about axis of one of the rings? [DUMET] (a) ( 3/ 2) MR 2 (b) 2MR 2 (c) 3MR 2 (d) (1/ 4 )MR 2
2007 26 The moment of inertia of a rod about an axis through its
O
A
L2 (b) 9 5 (d) L 2
7 (a) L 6 L (c) 3
B
1 ML2 (where, M is the 12 mass and L is the length of the rod). The rod is bent in the middle, so that two halves make an angle 60° . Now the moment of inertia about the same axis is [RPET] (a) ML2 / 18 (b) ML2 / 12 (c) ML2 / 20 (d) ML2 / 8 3
centre and perpendicaular to it is
163
SYSTEM OF PARTICLES AND ROTATIONAL MOTION
27 Three particles, each of mass m gram are situated at the vertices of an equilateral triangle ABC of side l cm (as shown in the figure). The moment of inertia of the system about a line AX perpendicular to AB and in the plane of ABC, in g -cm 2 units will be [MP PMT] X m
C
I A
I
m
B m
I
(a) (3/4) ml 2 (c) (5/4) ml 2
Y
(b) 2 ml 2 (d) (3/2) ml 2
2006 28 Three rings each of mass M and radius R are arranged as shown in figure. The moment of inertia of the system about the axis XX ′ will be [CBSE AIPMT] X
C
X'
(a) ( 7/ 2) MR 2 (c) ( 3/ 2) MR 2
(b) 3R 2 (d) 5MR 2
29 The moment of inertia of a solid sphere about an axis passing through centre of gravity is ( 2/ 5)MR 2 , then its radius of gyration about a parallel axis at a distance 2R from first axis is [MHT CET] 22 (a) 5R (b) R 5 (c)
5 R 2
(d)
31 A uniform circular disc of radius R lies in the xy-plane with its centre coinciding with the origin of the coordinate system. Its moment of inertia about an axis lying in the xy-plane, parallel to the X-axis and passing through a point on the Y-axis at a distance y = 2R is I 1 . Its moment of inertia about an axis lying in a plane perpendicular to xy-plane passing through a point on the X-axis at a distance [EAMCET] x = d is I 2 . If I 1 = I 2 , the value of d is 19 17 15 13 (a) (b) (c) (d) R R R R 2 2 2 2
2005 32 Out of the given bodies (of same mass) for which the moment of inertia will be maximum, about the axis passing through its centre of gravity and perpendicular to its plane? (a) Disc of radius a [RPMT] (b) Ring of radius a (c) Square lamina of side 2a (d) Four rods of length 2a making a square
A
B
30 Five particles of each mass 2 kg are attached to the rim of a circular disc of radius 0.1 m and negligible mass. Moment of inertia of the system about the axis passing through the centre of the disc and perpendicular to its place is [Manipal] (b) 0.1 kg-m 2 (a) 1 kg-m 2 2 (d) 0.2 kg-m 2 (c) 2 kg-m
12 R 5
33 Assertion I S and I H are the moments of inertia about the diameters of a solid and thin walled hollow sphere respectively. If the radii and the masses of the above spheres are equal, I H > I S . Reason In solid sphere, the mass is continuously and regularly distributed about the centre whereas the mass, to a large extent, is concentrated on the surface of hollow sphere. [EAMCET] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are true but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
Answers 1 11 21 31
(a) (a) (c) (c)
2 12 22 32
(a) (a) (c) (d)
3 13 23 33
(b) (e) (d) (a)
4 (a) 14 (c) 24 (d)
5 (a) 15 (d) 25 (a)
6 (d) 16 (b) 26 (b)
7 (b) 17 (a) 27 (c)
8 (d) 18 (d) 28 (a)
9 (a) 19 (b) 29 (b)
10 (d) 20 (c) 30 (b)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations axis BC so I 2 is maximum, mass is nearest to axis AC so I 3 is minimum.
1 (a) Given, mass ratio of two discs, m 1 m1 : m2 = 1 : 2, i.e. 1 = m2 2 d 2 r 2 and diameter ratio 1 = ⇒ 1 = d2 1 r2 1
Hence, the correct sequence will be I 2 > I 1 > I 3.
4 (a) Considering the information given
...(i) ⇒ I remain = I − I (R / 2) The mass of smaller disc cut out M mR / 2 = (area of bigger disc) (area of smaller disc) M πR 2 M = ⇒ mR / 2 = 2 4 4 πR
2 I disc = mk disc
5mr2 2 = mk disc 4 5 2 k disc r = 4
Q Moment of inertia of a disc, (mass)(radius)2 I= 2
For ring, moment of inertia about the diameter, mr2 Ia = 2 and moment of inertia about the tangential axis
Putting the values in Eq. (i), we get
3 mr2 + mr2 = mr2 2 2 Let the radius of gyration of ring is k ring . I ring = I a + mr2 =
2 I ring = mk ring
5
2 2 MR 2 (M / 4 ) ( R / 2) M R = − + 2 2 4 2 MR 2 MR 2 MR 2 = − + 2 16 32 MR 2 MR 2 + 2MR 2 = − 2 32 MR 2 3MR 2 16MR 2 − 3MR 2 = − = 2 32 32 13MR 2 ∴ I remain = 32 (a) COM of m1 and m2 masses lies at O m r + m2r2 and r = 1 1 , then m1 + m2
m1r1 = m2r2 r1 m1
X
6 (d) The total moment of inertia of the system is I = I 1 + I 2 + I 3 …(i) Here, I 1 =
m r m
2 2 mr 3
r r
2
1
m 3
2 2 X′ mr + mr2 3 [From parallel axis theorem] 5 = mr2 3 From Eq. (i), we get 2 5 2 10 I = mr2 + 2 × mr2 = mr2 + 3 3 3 3 2 I = 4 mr
I2 = I3 =
7 (b) For a ring, I z = MR 2 From perpendicular axis theorem, ...(i) Ix + I y = Iz Given, I x = I y = I From Eq. (i), we get 2I = I z
8 (d) The moment of inertia of the disc about an axis parallel to its plane is I t = I d + MR 2 Id C
O
A
It
B
R
...(i)
D
r2 O
⇒ m2
l
and
2
m1m2l 2 (m1 + m2 )
w
3 (b) The moment of inertia of a body about an axis depends not only on the mass of the body but also on the distribution of mass about the axis. For a given body, mass is same, so it will depend only on the distribution of mass about the axis. The mass is farthest from
R/2
If the above figure is considered, then moment of inertia of disc will be given as I = I remain + I (R / 2)
mr2 5mr2 I disc = + mr2 = 4 4 Let the radius of gyration of disc is k disc.
⇒
m2l m1l = m1 + m2 m1 + m2 m1 + m2 =
and moment of inertia about the tangential axis, I disc = I d + mr2
5 6
2
R
the diameter,I d = mr2 / 4
5 r 4 = 3 r 2
I = ∑ mi ri2 ⇒ I = m1r12 + m2r22
I
2 (a) For disc, moment of inertia about
k disc = k ring
∴Moment of inertia of the point masses about the given axis is
in the question, let us draw the figure
∴Ratio of their moment of inertia, m1r12 2 2 2 m r I1 1 2 = 2 2 = 1 . 1 = = 2 1 1 I 2 m2r2 m2 r2 2 ∴ I1 : I2 = 2 : 1
3 2 2 mr = mk ring 2 3 k ring = r 2
From Eqs. (i) and (ii), we get m2l m1l and r2 = r1 = m1 + m2 m1 + m2
r1 + r2 = l
...(ii)
1 MR 2 + MR 2 4 1 2 Q I d = MR 4 5 4I 2 2 ...(i) = MR or MR = 4 5
I =
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SYSTEM OF PARTICLES AND ROTATIONAL MOTION
9 (a) The moment of inertia is given by
I = Σmr2. The moment of inertia depends on the mass and distribution of mass w.r.t. the axis of rotation in the body, so that moment of inertia of two circular discs having equal mass and thickness made of different material will be same.
10 (d) Applying theorem of parallel axes, R I = I CM + M 2
2
[Q I CM =
11 (a) Moment of inertia of wood rod
15 (d) Radius of gyration, K = As,
So,
K disc =
3 2 = 3 2 2
K disc = K ring
90°
Moment of inertia of each part through its one end =
L 12
∴
12 (a) According to parallel axes theorem, we have Ix' y'
l 2
2
13 (e) Moment of inertia of a hollow cylinder about its axis = Mr2.
14 (c) Let same mass and same outer radii of solid sphere and hollow sphere be
2
1 ML2 ML2 ML2 + = 3 8 8 12
is d. So, I EF = IGH (due to symmetry) and I AC = I BD (due to symmetry)
2
ML 12
D
ML2 mL2 + 12 2 (M + 6m) L2 = 12
I = I1 + I2 =
a tangent to surface and parallel, 5 I = MR 2 4 or MR 2 = (4 / 5)I Moment of inertia I of disc about the tangent perpendicular to plane, 3 I ′ = MR 2 2 34 6 ⇒ I′ = I = I 2 5 5
18 (d) According to parallel axes theorem, I X ′Y′ = I XY + MR 2
F
C
2
mL2 L L I2 = m + m = 2 2 2
17 (a) Moment of inertia I of a disc about L
1 M L 1 M L + 3 2 2 3 2 2
20 (c) Let the each side of square lamina m
2
and
2
2
I =
O
I1 =
1 M L 3 2 2
Hence, net moment of inertia through its middle point O,
=
m
Y
M/2 L/2
I
l/2
M/2
O
X
2
L I x′ y′ = I xy + Md 2 = I 0 + M 2 ML2 ⇒ I x' y' = I 0 + 4
each part of it will have same length L M and mass as shown in figure. 2 2
mR 2 + mR 2 = 2R m
2
L2 (L / 2)2 M 2 = mb × = mb × 12 3 Total moment of inertia, M = M1 + M2 L2 L2 = mw + mb × 12 12
IO=Ixy
I m
1 mR 2 + mR 2 3 2 = R m 2
K ring =
L (L / 2) = mw 12 3 Moment of inertia of brass rod about one end,
= (mw + mb )
19 (b) Since, rod is bent at the middle, so
16 (b) Moment of inertia of a rod about XY,
about one end,
M 1 = mw ×
Given, I XY = 2 kgm −2, M = 1kg and R = 2 m. ⇒ I XY = 2 + (1)(2)2 = 6 kg-m 2
IA < IB
1 MR 2] 2
1 MR 2 3 ⇒ I = MR 2 ⇒ I = MR 2 + 2 4 4
2
M and R, respectively. The moment of inertia of solid sphere A about its diameter, 2 …(i) I A = MR 2 5 The moment of inertia of hollow sphere (spherical shell) B about its diameter, 2 …(ii) I B = MR 2 3 It is clear from Eqs. (i) and (ii), we get
L/2
Now, moment of inertia about a tangent perpendicular to its plane is 1 I ′ = MR 2 + MR 2 2 3 3 4 6 I ′ = MR 2 = × I = I ⇒ 2 2 5 5 [Q by using Eq. (i)]
G
A
O
E d
H
B
Now, according to the perpendicular axes theorem, I AC + I BD = I 0 or …(i) 2I AC = I 0 and I EF + IGH = I 0 or …(ii) 2I EF = I 0 From Eqs. (i) and (ii), we get I AC = I EF From parallel axis theorem, md 2 ∴ I AD = I EF + 4 2 md 2 md md 2 = + as I EF = 12 12 4 2 md So, I AD = = 4 I EF 3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
21 (c) Let the radii of the thin spherical shell and the solid sphere are R1 and R2, respectively. Then, the moment of inertia of the spherical shell about its diameter 2 …(i) I = MR12 3 and the moment of inertia of the solid sphere is given by 2 …(ii) I = MR22 5 It is given that the masses and moment of inertia for both the bodies are equal, then from Eqs. (i) and (ii), we get 2 2 MR12 = MR22 3 5 ⇒ ⇒
R12 3 R = ⇒ 1= R2 R22 5
3 5
R1 : R2 = 3 : 5
22 (c) Moment of inertia of the rod about a perpendicular axis PQ passing through centre of mass C, I CM = ML2 /12.
with a = l / 2, we get I′ =
2
Ml +M 12
2
Ml l = 2 3
Moment of inertia = m(0)2 + m(l )2 + m(l sin 30° )2
2
= ml 2 +
24 (d) The angle between the rods will not make any difference, hence I = I1 + I2 Ml2 Ml2 Ml2 = + = 12 12 6 where, I 1 = I 2 = moment of inertia of rod of length L and mass M about an axis passing through its centre of mass and perpendicular to the rod.
25 (a) Since, the axis of two rings are also perpendicular to each other, therefore applying the perpendicular axis theorem 1 3 I = MR 2 + MR 2 = MR 2 2 2
P B
I = I A + I B + IC
As, I B = IC =
3 MR 2 2
tangential to rim and parallel to diameter 1 3 3 So, I = MR 2 + MR 2 + MR 2 2 2 2 =
7 MR 2 2
29 (b) Moment of inertia, I = Mk 2 ⇒
I k= M
Let N be the point which divides the length of rod AB in ratio 1 : 3. This point will be at a distance L/6 from C. Thus, the moment of inertia I′ about an axis parallel to PQ and passing through the point N. 2 L I ′ = I CM + M 6 ML2 ML2 ML2 + = 12 36 9 If k be the radius of gyration, then =
I′ = M
23 (d) For the rod of mass M and length l,
=
1 3
M L 2 2
R
According to theorem of parallel axis, I = I CG + M (2R )2
2
Hence, net moment of inertia through its middle point O is 2
1 M L 1 M L + 3 2 2 3 2 2
I=
2
1 ML2 ML2 ML2 + = 3 8 8 12
27 (c) Moment of inertia of the system about AX is given by I AX = mArA2 + mB rB2 + mC rC2 rC
l
a
C
A
l
l= rB
30 (b) Given, m = 2 kg, R = 01 . m and n = 5
Since, the mass of the disc is negligible, therefore moment of inertia of the system
30 °
l
where, I CG is moment of inertia about an axis through centre of gravity. 2 22 ∴ I = MR 2 + 4 MR 2 = MR 2 5 5 22 22 or Mk 2 = MR 2 ⇒ k = R 5 5
The moment of inertia of the given system = moment of inertia of disc + moment of inertia of particles
2
Ml 12 Using the parallel axes theorem,
R
Moment of inertia of each part through its one end
X
M
Moment of inertia of rod, I =
2
O
=
L2 L = 9 3
I
L/
O
L 3
Q
I ′ = I + Ma2
∴
where, M is the total mass of the body.
A
k=
A but this is a tangent in the plane of ring for ring B and ring C.
N
C L
28 (a) The axis XX ′ is a diameter for ring
26 (b) Since, rod is bent at the middle, so each part of it will have same length L M and mass as shown in figure. 2 2
ml 2 5 2 = ml 4 4
B
= moment of inertia of particles = nmR 2 = 5 × 2 × (0.1)2 = 0.1 kg - m 2
167
SYSTEM OF PARTICLES AND ROTATIONAL MOTION
31 (c) Moment of inertia, MR + M (2R )2 I1 = 4 Y
(2R, 0)
I1
(d, 0)
X
MR 2 17MR 2 = + 4 MR 2 = 4 4 Moment of inertia, MR 2 + Md 2 I2 = 2 Given, I 1 = I 2 17MR 2 MR 2 ∴ = + Md 2 4 2
17 MR 2 MR 2 − 4 2
15 15 2 R = R 2 4 1 (d) For disc, I = ma2 2 For ring, I = ma2 For square of side 2a, M 2 I = [(2a)2 + (2a)2 ] = Ma2 12 3 For square of rod of length 2a, d2 =
⇒
32 O
Md 2 =
⇒
2
(2a)2 I = 4 M + Ma2 12 16 ⇒ I = Ma2 3 Hence, moment of inertia is maximum for square of four rods.
33 (a) The moment of inertia of solid sphere about its diameter, 2 I S = MR 2 5 The moment of inertia of a thin walled hollow sphere about its diameter is IH =
2 (R25 − R15 ) M 5 (R23 − R13 )
where, R1 and R2 are its internal and external radii Since,
R25 − R15 > R2 3 3 R2 − R1
∴ IH > IS The reason is that in solid sphere the whole mass is uniformly and continuously distributed about its centre in whole volume while in hollow sphere the mass is distributed on the surface of sphere.
Topic 4 Rotational Energy and Power 2017
2016 3 Two rotating bodies A and B of masses m and 2m with
1 Two discs of same moment of inertia rotating about their regular axis passing through centre and perpendicular to the plane of disc with angular velocities ω 1 and ω 2 . They are brought into contact face to face coinciding the axis of rotation. The expression for loss of energy during this process is [NEET] 1 1 (a) I (ω 1 + ω 2 ) 2 (b) I (ω 1 − ω 2 ) 2 2 4 I 2 (d) (ω 1 − ω 2 ) 2 (c) I (ω 1 − ω 2 ) 8 2 A uniform rod of length l is free to rotate in a vertical plane about a fixed horizontal axis through B. The rod begins rotating from rest from its unstable equilibrium position. When it has turned through an angle θ, its angular velocity ω is given by θ 6g (a) sin l 2
θ 6g (b) cos l 2
6g (c) sin θ l
6g (d) cos θ l
A A′ l
θ
[JIPMER]
moments of inertia I A and I B ( I B > I A ) have equal kinetic energy of rotation. If L A and LB be their angular momentum respectively, then [NEET] LB (b) L A = 2LB (c) LB > L A (d) L A > LB (a) L A = 2
4 A solid sphere of mass m and radius R is rotating about its diameter. A solid cylinder of same mass and same radius is also rotating about its geometrical axis with an angular speed twice that of the sphere. The ratio of their kinetic [NEET] energies of rotation ( E sphere / E cylinder ) will be (a) 2 : 3 (b) 1 : 5 (c) 1 : 4 (d) 3 : 1
2014 5 Two bodies have their moments of inertia I and 2I, respectively about their axis of rotation. If their kinetic energies of rotation are equal, their angular velocity will be in the ratio [UK PMT] (d) 1: 2 (a) 2 : 1 (b) 1: 2 (c) 2 : 1
6 A body having a moment of inertia about its axis of rotation equal to 3 kg-m 2 is rotating with angular velocity of 3 rad s –1 . Kinetic energy of this rotating body is same as that of a body of mass 27 kg moving with a velocity v. The value of v is [KCET] (a) 1 ms –1 (b) 0.5 ms –1 (c) 2 ms –1 (d) 1.5 ms –1
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2010 7 A body of mass 10 kg moves with a velocity of 2 ms −1 along a circular path of radius 8 m. The power produced by the body will be [Manipal] (b) 98 Js −1 (a) 10 Js −1 (d) zero (c) 49 Js −1 8 A person, with outstretched arms, is spinning on a rotating stool. He suddenly brings his arms down to his sides. Which the following is true about his kinetic energy K and angular momentum L? [AMU] (a) Both K and L increase (b) Both K and L remain unchanged (c) K remains constant, L increases (d) K increases but L remains constant
2008 9 Circular disc of mass 2 kg and radius 1 m is rotating about an axis perpendicular to its plane and passing through its centre of mass with a rotational kinetic energy of 8 J. The angular momentum in (J-s) is [EAMCET] (a) 8 (b) 4 (c) 2 (d) 1
2007 10 The moment of inertia of a flywheel having kinetic energy 360 J and angular speed of 20 rad s −1 is
(a) 18 kg -m 2 (c) 2. 5 kg -m 2 (e) 0. 9 kg -m 2
[Kerala CEE]
(b) 1.8 kg -m 2 (d) 9 kg -m 2
11 A thin metal disc of radius of 0.25 m and mass 2 kg starts from rest and rolls down on an inclined plane. If its rotational kinetic energy is 4 J at the foot of inclined plane, then the linear velocity at the same point, is in ms −1 [J&K CET] (c) 2 3 (d) 3 2 (a) 2 (b) 2 2
2005 12 Two bodies have their moments of inertia I and 2I respectively about their axis of rotation. If their kinetic energies of rotation are equal, their angular momenta will be in the ratio [CBSE AIPMT] (c) 2 : 1 (d) 1: 2 (a) 1 : 2 (b) 2 : 1
13 A stick of length L and mass M lies on a frictionless horizontal surface on which it is free to move in any way. A ball of mass m moving with speed v collides elastically with the stick as shown in figure below . If after the collision, the ball comes to rest, then what should be the mass of the ball? [JIPMER] L m
.
(a) m = 2M
(b) m = M
(c) m = M / 2 (d) m = M / 4
14 An object of mass mis attached to light string which passes through a hollow tube. The object is set into rotation in a horizontal circle of radius r1 . If the string is pulled shortening the radius to r2 , the ratio of new kinetic energy to the original kinetic energy is [JCECE] r (a) 2 r1
2
r (b) 1 r2
2
(c)
r1 r2
(d)
r2 r1
Answers 1 (b) 11 (b)
2 (a) 12 (d)
3 (c) 13 (d)
4 (b) 14 (b)
5 (c)
6 (a)
7 (d)
8 (d)
9 (b)
10 (b)
Explanations 1. (b) When no external torque acts on system, then angular momentum of system remains constant. Angular momentum before contact = I 1ω 1 + I 2ω 2 Angular momentum after the discs brought into contact = I net ω = (I 1 + I 2 ) ω So, final angular speed of system, I ω + I 2ω 2 ω= 1 1 I1 + I2 Now, to calculate loss of energy, we subtract initial and final energies of system.
Loss of energy 1 1 1 = Iω 21 + Iω 22 − (2I ) ω 2 2 2 2 1 = I (ω 1 − ω 2 )2 4 A ω 2. (a) When the rod rotates through an l/2 angle θ, the centre of gravity falls G h through a distance C G′ h. θ
From ∆BCG′ (l / 2) − h cosθ = l/2 l or h = (1 − cosθ ) 2
B
l Decrease in PE = mg (1 − cosθ ) …(i) 2 The decrease in PE is equal to the kinetic energy of rotation 1 1 ml 2 2 (KE)rotational = Iω 2 = ω …(ii) 2 2 3 A′
ml 2 Q I = 3 From Eqs. (i) and (ii), we get 1 ml 2 2 l ω = mg (1 − cosθ ) 2 3 2 ⇒
ω=
6g θ sin l 2
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SYSTEM OF PARTICLES AND ROTATIONAL MOTION
3. (c) As we know that, the kinetic energy of a rotating body, 1 1 I 2ω 2 L2 KE = I ω 2 = = 2 2 I 2I Also, angular momentum, L = I ω Thus,
Given, m = 27 kg (mass of the body), ω = 3 rads −1 (angular velocity) and
KA = KB L I 1 L2A 1 L2B = ⇒ A = A LB IB 2 IA 2 IB
⇒
LA = LB
IA ⇒ IB
∴
LA < LB
L∝ I [Q I B > I A ]
4 (b) KE of a rotating rigid body, 1 2 Iω 2 ∴ KE of sphere, 1 1 2 1 K s = Iω 21 = ⋅ mR 2ω 21 = mR 2ω 21 2 2 5 5 2 Q I = mR 2 5 KE of cylinder, 1 1 1 KC = ⋅ mR 2ω 22 = mR 2ω 22 2 2 4 1 Q I = mR 2 2 2 2 mR ω 1 KS 4 ω 21 5 ∴ = = 2 2 5 ω 22 KC mR ω 2 4 1 4 ω 21 = = 5 (2ω 1 )2 5 (given, ω 2 = 2ω 1) KE =
5 (c) Consider two bodies A and B are having moment of inertia I and 2I. K A = Kinetic energy of rotation for the 1 body A = Iω 2A 2 and K B = Kinetic energy of rotation for 1 the body B = (2I )ω 2B 2 where, ω A is angular speed of the body A andω B is angular speed of the body B. According to the question, K A = K B 1 2 1 Iω A = (2I )ω B2 ⇒ 2 2 ⇒
ω 2A = 2 ωA
2ω 2B
⇒ =2 ωB
⇒
ωA = 2 ωB
⇒ ωA : ωB = 2 : 1
6 (a) We know that, kinetic energy, K =
1 2 1 2 mv = Iω 2 2
I = 3 kg-m (moment of inertia).
⇒ mv 2 = Iω 2 v2 =
2
⇒
2
⇒
3 × 32 27
Iω 2 m 27 =1 ⇒ v2 = 27
11 (b) Rotational kinetic energy = (1/ 2)Iω 2 ∴ Rotational KE =
⇒ v2 =
v = 1 = 1 ms–1
Given, KE = 4 J, r = 0.25 m and m = 2 kg 4=
7. (d) Power is defined as the rate of change of energy in a system or the time rate of doing work. dE dW P= = dt dt Also, work = force × displacement =F ×d In a circular motion, displacement is zero, therefore d d P= (F × d ) = (0) = 0 dt dt
8 (d) If the person on rotating suddenly brings his arms down to his sides, then his kinetic energy increases due to increase in its angular velocity and angular momentum L remains constant.
9 (b) Rotational kinetic energy
⇒
1 = Iω 2 = 8 J 2 1 1 2 2 × mr ω = 8 2 2 (Q m = 2 kg and r = 1m)
or
1 × 2 × (1)2ω 2 = 8 4 ω 2 = 16
or
ω = 4 rad s−1
or
Angular momentum, 1 L = Iω = mr2ω 2 1 = × 2 × (1)2 × 4 2 = 4 J -s
10 (b) Rotational kinetic energy of flywheel, K = 360 J and angular speed of flywheel, ω = 20 rad s−1 1 Rotational kinetic energy, K = Iω 2 2 ∴ Moment of inertia, 2K 2 × 360 = 1.8 kg - m 2 I = 2 = (20)2 ω
1 1 2 v 2 mr 2 r 22 1 2 where, I = mr 2
⇒ ⇒
2 11 2 v (2)r 2 r 22
v2 = 8 v = 2 2 ms−1
12 (d) Rotational kinetic energy remains same. 1 1 i.e. I 1ω 12 = I 2 ω 22 2 2 1 1 2 or (I 1ω 1 ) = (I 2 ω 2 )2 2I 1 2I 2 ⇒ But ⇒
L21 L22 L or 1 = = I1 I2 L2
I1 I2
I 1 = I , I 2 = 2I L1 I 1 = = L2 2I 2
⇒ L1 : L2 = 1 : 2
13 (d) Applying the law conservation of momentum, mv = MV mv ...(i) V = ⇒ M By conservation of angular momentum, mv (L) ML2 = ω 2 12 6mv ...(ii) ML As the collision is elastic, we have 1 2 1 1 mL2 2 mv = MV 2 + ω ...(iii) 2 2 2 12
⇒
ω=
Substituting the values from Eqs. (i) and (ii) in Eq. (iii), we get m=M /4
14 (b) Kinetic energy (K ) of rotation is K = (1/ 2)Iω 2 where, ω = v / r, r is radius of circle. 1 v2 K r2 ∴ K = I 2 ⇒ 1 = 22 K 2 r1 2 r ⇒
K 2 r12 r1 = = K 1 r22 r2
2
Topic 5 Dynamics of Rotational Motion 2019 1 If object starts from rest and covers angle of 60 rad in 10 s
2014 6 A rotating wheel changes angular speed from 1800 rpm to
in circular motion, then magnitude of angular acceleration will be [JIPMER] −2 −2 (a) 1.2 rad s (b) 1.5 rad s (c) 2 rad s −2 (d) 2.5 rad s −2
3000 rpm to 20 s. What is the angular acceleration assuming to be uniform? [KCET] –2 –2 (b) 90π rad s (a) 60π rad s (c) 2π rad s –2 (d) 40π rad s –2
2 A solid cylinder of mass 2 kg and radius 4 cm is rotating about its axis at the rate of 3 rpm. The torque required to stop after 2π revolutions is [NEET] (a) 2 × 10−3 N-m (b) 12 × 10−4 N-m (c) 2 × 106 N-m (d) 2 × 10−6 N-m
2008 7 A wheel has angular acceleration of 3.0 rad s −2 and an
radius 40 cm. What is the angular acceleration of the cylinder, if the rope is pulled with a force of 30 N? [NEET] (a) 25 ms −2 (b) 0.25 rad s −2 −2 (c) 25 rad s (d) 5 ms −2
initial angular speed of 2.00 rad s −1 . In a time of 2 s, it has rotated through an angle (in rad) of [AIIMS] (a) 6 (b) 10 (c) 12 (d) 4 8 When a ceiling fan is switched OFF, its angular velocity reduces to half its initial value after it completes 36 rotations. The number of rotations it will make further before coming to rest is (assuming angular retardation to be uniform) [Kerala CEE] (a) 10 (b) 20 (c) 18 (d) 12 (e) 16
2016 4 A uniform circular disc of radius 50 cm at rest is free to turn
2007 9 A ring and a disc of different masses are rotating with the
2017 3 A rope is wound around a hollow cylinder of mass 3 kg and
about an axis which is perpendicular to its plane and passes through its centre. It is subjected to a torque which produces a constant angular acceleration of 2.0 rad s −2 . Its net acceleration in ms −2 , at the end of 2.0 s is a approximately [NEET] (a)7.0 (b)6.0 (c)3.0 (d) 8.0
2015 5 A mass m moves in a circle on a smooth horizontal plane with velocity v 0 at a radius R 0 . The mass is attached to a string which passes through a smooth hole in plane as shown. vO m RO
same kinetic energy. If we apply a retarding torque τ on the ring, it stops after completing n revolutions in all. If same torque is applied to the disc, how many revolutions would it complete in all before stopping? [Manipal] (a) 4n (b) 2n (c) n (d) n/ 2
10 A tube of length L is filled completely with an incompressible liquid of mass M and closed at both the ends. The tube is then rotated in a horizontal plane about one of its ends with a uniform angular velocityω. The force exerted by the liquid at the other end is [MP PMT] MLω 2 ML2ω ML2ω 2 2 (a) (b) (c) MLω (d) 2 2 2
2006 11 A particle performs uniform circular motion with an
The tension in the string is increased gradually and finally mmoves in a circle of radius R 0 /2. The final value of the kinetic energy is [CRSE AIPMT] 1 2 1 2 2 (b) mv 0 (a) mv 0 (d) mv 02 (c) 2mv 0 4 2
angular momentum L. If the frequency of particle motion is doubled and its kinetic energy is halved, the angular momentum becomes [AMU] (a) 2L (b) 4L L L (d) (c) 2 4
Answers 1 (a) 11 (d)
2 (d)
3 (c)
4 (d)
5 (c)
6 (c)
7 (b)
8 (d)
9 (c)
10 (a)
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SYSTEM OF PARTICLES AND ROTATIONAL MOTION
Explanations 1 (a) Given, initial angular velocity of object, ω 0 = 0 Angular displacement, θ = 60 rad and ∆t = 10 s From equation of rotational motion, 1 θ = ω 0t + αt 2 2 1 60 = 0 × t + × α × 102 2 60 ⇒ α= 50 ⇒ α = 12 . rads −2
2 (d) Given, mass of cylinder, m = 2 kg Radius of cylinder, r = 4 cm = 4 × 10−2 m Rotational velocity, ω = 3 rpm 2π π rads −1 and θ = 2π × =3× = 60 10 revolution = 2π × 2π = 4 π 2 rad. The work done in rotating an object by an angle θ from rest is given by W = τθ As the cylinder is brought to rest, so the work done will be negative. According to work-energy theorem, Work done = Change in rotational kinetic energy 1 1 1 − τθ = Iω 2f − Iω 2i = I (ω 2f − ω i2 ) 2 2 2 I (−ω 2i ) ⇒ τ= [Q ω f = 0 ] 2θ 2 1 1 ω = mr2 i 2 2 θ 1 I = mr2 (for cylinder ) 2 =
1 2 ω2 mr 4 θ
[Qω i = ω] 2
=
1 1 π × 2 × (4 × 10−2 )2 × × 10 4 4π 2
π2 1 1 × 2 × 16 × 10−4 × × 4 100 4 π 2 2 = × 10−4 = 2 × 10−6 N-m 100 =
3 (c) Torque (τ ) acting on a body and angular acceleration (α ) produced in it are related as τ = Iα
Consider a hollow cylinder, around which a rope is wounded. Torque acting on the cylinder due to the force F is τ = Fr. Now, we have τ = Iα where, I = moment of inertia of the cylinder about the axis through the centre ⇒ I = mr2 Given, F = 30 N, m = 3 kg and r = 40 cm = 40 × 10−2 m Angular acceleration, Fr τ α= = 2 I mr F 30 = = mr 3 × 40 × 10−2 100 = = 25 rads−2 4
4. (d) According to given question, a uniform circular disc of radius 50 cm at rest is free to turn about an axis having perpendicular to its plane and passes through its centre. This situation can be shown by the figure given below 0.5m
∴ Angular acceleration, α = 2 rad s −2 (given) Angular speed, ω = αt = 4 rad s −1 Q Centripetal acceleration, 2
2
ac = ω r = (4 ) × 0.5 = 16 × 0.5 ac = 8 ms −2 Q Linear acceleration at the end of 2s, a t = αr = 2 × 0.5 ⇒ a t = 1ms −2 Therefore, the net acceleration at the end of 2.0 s is given by a = ac2 + a t2 a = (8)2 + (1)2 = 65 ⇒ a ≈ 8 ms −2
5. (c) Conserving angular momentum, Li = Lf R0 ⇒ mv0R0 = mv′ (given) 2 ⇒ v′ = 2v0 So, final kinetic energy of the particle, 1 1 K f = mv′ 2 = m(2v0 )2 2 2 1 2 = 4 mv0 = 2mv02 2
6. (c) We know that, ω = 2πn ⇒ ω1 = 2πn1 where, n1 = 1800 rpm, n2 = 3000 rpm and ∆t = 20 s. 1800 So, ω 1 = 2π × = 2π × 30 = 60π 60 3000 Similarly, ω 2 = 2πn2 = 2π × 60 = 2π × 50 = 100 π If the angular velocity of a rotating wheel about an axis changes by change in angular velocity in a time interval ∆t, then the angular acceleration of rotating wheel about that axis is Change in angular velocity α= Time interval ω2 − ω1 ∆t 100π − 60π ⇒ α= 20 40π α= = 2π rad s−2 20 α=
7 (b) The kinematical equation for angular motion is 1 θ = ω 0t + αt 2 2 Given, α = 3.0 rad s−2 , ω 0 = 2. 0 rad s−1 and t = 2 s 1 × 3 × (2)2 2 θ = 4 + 6 = 10 rad
Hence, θ = 2 × 2 + or
8 (d) We know that, ω 2 = ω 20 + 2α θ n where, ω is final angular velocity, ω 0 is initial angular velocity, α is angular retardation and θ n is the angle turned in number of rotations. Given, for Ist case, final angular velocity,
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
ω=
ω0 and θ = 36 × 2π 2
9. (c) Because kinetic energy K R and retarding torque τ are same, therefore in accordance with the relation Los in kinetic energy = Work done by torque = τθ = τ 2πn So, both the ring and the disc stop after completing equal number of revolutions n.
ω 20 = ω 20 + 2α × 36 × 2π 4
∴ or − or
3ω 20 = 144 πα 4 3ω 20 α=− 4 × 144 π
Negative sign signifies angular retardation.
10 (a) Let the length of a small element of
Again, for the IInd case, ω ω i = 0 and ω f = 0 2 ω 20 3ω 20 So, −2× × θ′ 0= 4 4 × 144 π θ′ =
ω 20
× 4 × 144 π = 24π 4 × 2 × 3ω 20
Hence, number of rotations it makes before coming to rest is θ′ 24 π n= = = 12 2π 2π
tube be dx. Mass of this element M dm = dx L ω
dx F
F + dF
r
where, M is the mass of filled liquid and L is the length of tube. Force on this element, dF = dm × xω 2 F
∫ 0 dF =
M 2 L ω x dx L ∫0
or
F=
M 2 L2 MLω 2 ω = 2 L 2
or
F=
1 MLω 2 2
11 (d)Q Angular momentum, L = mvr = mr2ω
…(i) 1 2 Also, kinetic energy, K = mv 2 1 1 or K = m(rω )2 = mr2ω 2 2 2 1 Lω K = (mr2ω )ω = ⇒ 2 2 [Q from Eq. (i)] 2K ⇒ L= ω Given, ω′ = 2ω 1 or K′ = K 2 Hence, new angular momentum, 1 2 K 2 L 2K ′ L′ = = = ω′ 2ω 4
Topic 6 Rolling Motion 2019 1 A sphere pure rolls on a rough inclined plane with initial velocity 2.8 ms −1 . Find the maximum distance on the inclined plane. [AIIMS]
(b) 5.48 m
(c) 1.38 m
body possesses translational kinetic energy ( K t ) as well as rotational kinetic energy ( K r ) simultaneously. The ratio [NEET] K t :( K t + K r ) for the sphere is (a) 10 : 7 (b) 5 : 7 (c) 7 : 10 (d) 2 : 5
2017 5 A bicycle wheel rolls without slipping
30º
(a) 2.74 m
2018 4 A solid sphere is in rolling motion. In rolling motion, a
(d) 3.2 m
2 A disc of radius 2 m and mass 100 kg rolls on a horizontal floor. Its centre of mass has speed of 20 cms −1 . How much work is needed to stop it? [NEET] (a) 30 kJ (b) 2 J (c) 1 J (d) 3 J 3 A solid cylinder of mass 2 kg and radius 50 cm rolls up an inclined plane of angle inclination 30°. The centre of mass of cylinder has speed of 4 ms −1 . The distance travelled by the cylinder on the inclined surface will be (take, g = 10 ms −2 ) [NEET (Odisha)] (a) 2.2 m (b) 1.6 m (c) 1.2 m (d) 2.4 m
on a horizontal floor. Which one of the following is true about the motion of points on the rim of the wheel, relative to the axis at the wheel’s centre?
[JIPMER ]
(a) Points near the top move faster than points near the bottom (b) Points near the bottom move faster than points near the top (c) All points on the rim move with the same speed (d) All points have the velocity vectors that are pointing in the radial direction towards the centre of the wheel
SYSTEM OF PARTICLES AND ROTATIONAL MOTION
173
6 Assertion The total kinetic energy of a rolling solid sphere is the sum of translational and rotational kinetic energies. Reason For all solid bodies, total kinetic energy is always twice of translational kinetic energy. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2011 12 A solid sphere of mass M rolls without slipping on an
7 A thin hollow sphere of mass m is completely filled with a liquid of mass m. When the sphere rolls with a velocity v, kinetic energy of the system is (neglect friction) [AIIMS] (a)(1/ 2) mv 2 (b)mv 2 (c)( 4 / 3) mv 2 (d)( 4 / 5) mv 2
and of the same radius roll down an inclined smooth plane from rest to the same distance, then the ratio of the times taken by them is [Haryana PMT] 2 2 (a) 15 : 14 (b) 15 : 14 (c) 14 : 15 (d) 14 : 15
8 A cylinder rolls up an inclined plane, reaches some height and then rolls down (without slipping throughout these motions). The directions of the frictional force acting on the cylinder are [JIPMER] (a) up the incline while ascending and down the incline while descending (b) up the incline while ascending as well as descending (c) down the incline while ascending and up the incline while descending (d) down the incline while ascending as well as descending 2016
2008 14 Assertion The velocity of a body at the bottom of an
9 A disc and a sphere of same radius but different masses roll off on two inclined planes of the same altitude and length. Which one of the two objects gets to the bottom of the plane first? [NEET] (a) Sphere (b) Both reach at the same time (c) Depends on their masses (d) Disc 2014 10 A uniform solid spherical ball is rolling down a smooth inclined plane from a height h. The velocity attained by the ball when it reaches the bottom of the inclined plane is v. If the ball is now thrown vertically upwards with the same velocity v, the maximum height to which the ball will rise is [WB JEE] (a) 5h/ 8 (b) 3h/ 5 (c) 5h / 7 (d) 7h / 9 2013 11 A small object of uniform density rolls up a curved surface with an initial velocity v′. It reaches upto a maximum height of 3v 2 / 4g with respect to the initial position. The object is [NEET] (a) ring (b) solid sphere (c) hollow sphere (d) disc
inclined plane of inclination θ. What should be the minimum coefficient of friction, so that the sphere rolls down without slipping ? [NEET] 2 2 5 (a) tan θ (b) tan θ (c) tan θ (d) tan θ 5 7 7
2010 13 When a uniform solid sphere and a disc of the same mass
inclined plane of given height is more when it slides down the plane, compared to when it rolling down the same plane. Reason In rolling down, a body acquires both, kinetic energy of translation and rotation. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
15 A solid cylinder is rolling down on an inclined plane of angle θ. The coefficient of static friction between the plane and cylinder is µ s . Then, condition for the cylinder not to slip is [J&K CET] (a) tan θ ≥ 3µ s (b) tan θ > 3µ s (d) tan θ < 3µ s (c) tan θ ≤ 3µ s
2006 16 A solid cylinder rolls down an inclined plane of height 3 m and reaches the bottom of plane with angular velocity of 2 2 rad s −1 . The radius of cylinder must be (take, g = 10 ms −2 ) [Kerala CEE] (a) 5 cm (b) 0.5 cm (c) 10 cm (d) 5 m (e) 10 cm
2005 17 A drum of radius R and mass M , rolls down without slipping along an inclined plane of angle θ. The frictional force [CBSE AIPMT] (a) converts translational energy to rotational energy (b) dissipates energy as heat (c) decreases the rotational motion (d) decreases the rotational and translational motion
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
18 At any instant, a rolling body may be considered to be in pure rotation about an axis through the point of contact. This axis is translating forward with speed [JCECE] (a) equal to centre of mass (b) zero (c) twice of centre of mass (d) None of the above 19 A coin is of mass 4.8 kg and radius 1 m rolling on a horizontal surface without sliding with angular velocity 600 rot min −1 . What is total kinetic energy of the coin? (a) 360 J (b) 1440 π 2 J [Manipal] 2 (c) 4000 π J (d) 600 π 2 J
21 A ball rolls without slipping. The radius of gyration of the ball about an axis passing through its centre of mass is k. If radius of the ball be R, then the fraction of total energy associated with its rotational energy will be [BHU] k2 R2 (b) 2 (a) 2 k + R2 k + R2 k2 + R2 k2 (c) (d) R2 R2 22. A solid sphere is rolling on a frictionless surface, shown in figure with a translational velocity v ms −1 . If it is to climb the inclined surface, then v should be [AIIMS]
20 A body is rolling down an inclined plane. If KE of rotation is 40% of KE in translatory state, then the body is a
(a) ≥
[DUMET]
(a)ring
10 gh 7
(b) ≥ 2gh
(c) 2gh
(b)cylinder (c) hollow ball (d) solid ball
(d)
10 gh 7
Answers 1 (c) 11 (d) 21 (a)
2 (d) 12 (b) 22 (a)
3 (d) 13 (c)
4 (b) 14 (b)
5 (a) 15 (c)
6 (c) 16 (d)
7 (c) 17 (a)
8 (b) 18 (a)
9 (a) 19 (b)
10 (c) 20 (d)
Explanations 1 (c) Given, initial velocity of sphere, u = 2.8 ms −1
v 2 = u2 − 2 as
Acceleration on the inclined plane, g sinθ …(i) a= k2 1+ 2 R where, k and R are the radius of gyration and radius of sphere, respectively. Moment of inertia of sphere, 2 I = mk 2 = mR 2 5 k2 2 …(ii) = R2 5 From Eqs. (i) and (ii), we have a=
g sin 30° 2 1+ 5
[Qθ = 30°, given]
5g 25 −2 ms [∴g = 10 ms −2] = 14 7 If s be the maximum distance travelled by the sphere, then at maximum distance, v = 0. =
∴ From equation of motion, 0 = u2 − 2 as ⇒
u2 (2. 8)2 × 7 = 2a 2 × 25 ~ 138 . m = 109 . m−
s=
2 (d) Given, radius, R = 2 m Mass, m = 100 kg and vCM (velocity centre of mass). = v = 20 cms −1 = 20 × 10−2 ms −1 Then, according to work energy theorem, the work done in stopping the disc is equal to the change in its kinetic energy, i.e. W = (KE ) f − (KE )i ...(i) As, the disc stops at the end, so final velocity is zero. Thus, (KE ) f = 0 Since, the disc is rolling so, its initial kinetic energy would have both rotational and translational kinetic energy component.
(KE )i = (KE )r + (KE )t 1 2 1 2 = Iω + mv 2 2 11 1 = mR 2 ω 2 + mv 2 22 2 1 Q for disc, I = mR 2 2 1 1 = mR 2ω 2 + mv 2 4 2 2 1 1 v [Q v = rω ] = mR 2 2 + mv 2 4 2 R 3 = mv 2 4 3 [from Eq. (i)] ∴ W = |KE i | = mv 2 4 Substituting the given values, we get 3 W = × 100 × (20 × 10−2 )2 4 3 = × 400 × 100 × 10−4 = 3 J 4
3 (d) When a body rolls, i.e. have rotational motion, the total kinetic energy of the system will be
175
SYSTEM OF PARTICLES AND ROTATIONAL MOTION
KE =
k 2 1 2 mv 1 + 2 2 R
where, m = mass of body, v = velocity and k = radius of gyration.
x
h
–1
4
v=
ms
30°
Given, m = 2 kg, θ = 30° and v = 4 ms −1 Let h be the height of the inclined plane, then from law of conservation of energy, KE = PE 1 2 k 2 mv 1 + 2 = mgh 2 R Substituting the given values in the above equation, we get 1 1 × 2 × 161 + = 2 × 10 × h 2 2 k2 Q for cylinder 2 = R
4 (b) Translational kinetic energy of a rolling body is 1 2 …(i) K t = mvCM 2 Total kinetic energy of a rolling body = K r + K t = Rotational KE + Translational KE 1 1 2 …(ii) = Iω 2 + mvCM 2 2 For a solid sphere, moment of inertia 2 about its diametric axis, I = mR 2 5 Substituting the value of I in Eq. (ii), we get 12 1 2 K r + K t = mR 2 ω 2 + mvCM 25 2 2
=
vQ = rω = Rω Velocity of the particle at P, vP = r ω = (2R ) ω = 2 vQ
12 1 2 2 v mR CM + mvCM R 25 2 [Q vCM = Rω ]
α
f
⇒
θ
mg sin θ θ
P
2v
Q
mg
mg cos θ
9 (a) Acceleration of an object rolling down an inclined plane is given by g sin θ a= 1 + I / mr2
r
Q
vQ = Rω
3 = 10 h ⇒ h = 12 . m 2 h From the above diagram, sinθ = x 12 . h = ⇒x = sin θ sin 30° 1 = 12 . × 2 = 2 . 4 m Q sin 30° = 2
will be up the inclined plane in both the motions. The friction acts opposite to the relative motion of the point of contact on ground. In both cases, the force acting on the point of cylinder in contact with the plane is mg sin θ. As there is pure rolling, the velocity and acceleration of the point of contact must be zero, so friction acts upwards along the inclined plane in both the motions (ascending or descending).
5 (a) Velocity of the particle at Q,
v
1 2
8 (b) The direction of the frictional force
N
∴ K t : ( K t + K r ) = 5 :7
ω
8×
⇒
1 2 1 2 mvCM + mvCM 5 2 1 1 2 = + mvCM 5 2 7 2 …(iii) = mvCM 10 1 2 mvCM Kt ∴ Ratio, = 2 7 Kt + Kr 2 mvCM 10 1 10 5 = × = 2 7 7 =
ω
Hence, points near the top move faster than points near the bottom.
6 (c) The kinetic energy of a rolling solid sphere = K trans + K rot 1 2 1 2 mv + Iω 2 2 1 2 1 2 v = mv + × mR 2ω 2 Q ω = R 2 2 5 1 1 = mv 2 + mv 2 = 7 / 10 mv 2 2 5 Hence, total kinetic energy is sum of translation and rotational kinetic energies. For different solid bodies, total kinetic energy is not always twice of translation kinetic energy. Hence, Assertion is correct but Reason is incorrect. =
7 (c) Total kinetic energy (KE) of the system = KE (translational) + KE (rotational) 1 1 = (2m)v 2 + I ω 2 2 2 2 1 12 v 2 = (2m)v + mR 2 2 R 2 23 1 4 1 = (2m)v 2 + mv 2 = mv 2 2 3 3
where, θ = angle of inclination of the inclined plane, m = mass of the object and I = moment of inertia about the axis through centre of mass. 1 / 2 mr2 1 I = = 2 mr2 mr2 For solid sphere, For disc,
2 / 5mr2 2 I = = 5 mr2 mr2 For hollow sphere, 2 / 3mr2 2 I = = 3 mr2 mr2 g sin θ 2 a disc = = g sin θ ∴ 1 3 1+ 2 = 0.66 g sin θ g sin θ 5 a solid sphere = = g sin θ 2 7 1+ 5 = 0.71 g sin θ g sin θ 3 ahollow sphere = = g sin θ 2 5 1+ 3 = 0.6 g sin θ Clearly, asolid sphere > adisc > ahollow sphere Type of sphere is not mentioned in the question. Therefore, we will assume the given sphere as solid sphere. ∴ asolid sphere > adisc
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
10 (c) Total kinetic energy of a body
12 (b) This is a case of rolling on rough
which is rolling without slipping is given by K total = K rot + K trans 1 2 1 2 Iω + mv 2 2 For a solid spherical ball, I = (2/ 5)mR 2 =
a
and v = Rω (along to diameter) where, R is the radius of the spherical ball. 12 1 So, K total = mR 2 ω 2 + mR 2ω 2 2 5 2 7 2 2 = mR ω 10 7 K = mv 2 10 Potential energy = Kinetic energy 7 mgh = mv 2 10 10 gh 7 For vertical projection, v2 =
⇒
2
…(i)
2
v = u + 2gh′ 10 gh = 0 + 2gh′ 7 5 h′ = h 7
⇒ ⇒
11 (d) As, velocity of body, v= Given, h = ⇒
For pure rolling to take place, … (iii) a = Rα Solving Eqs. (i), (ii) and (iii), we get Mg sinθ …(iv) f = MR 2 1+ I Further, the force of friction calculated in Eq. (iv) for pure rolling to take place should be less than or equal to the maximum friction µ Mg cosθ . Mg sin θ or ≤ µ Mg cosθ MR 2 1+ I 2 Q I = MR 2 5 tan θ tan θ 2 = = tan θ ⇒ µ min ≤ 5 7 MR 2 1+ 1+ 2 I
t=
1 2h K 2 1 + 2 sinθ g R
1 + (K 2 / R 2 )S tS = tD 1 + (K 2 / R 2 )D K Q R = S
6gv 2 K 2 4 g 1 + 2 r 3
∴
=
)
2 1 + K 2 / r2
K2 3 1+ 2 = 2 r 1 K2 3 = −1 = 2 2 r2 K 2 = (1/ 2)r2 (Equation of disc)
Hence, the object is disc.
Hence, the velocity of a body at the bottom of an inclined plane is more when it slides as compared to rolls. So, option (b) is correct.
15 (c) For the rolling of a solid cylinder acceleration aCM = g / 3 sin θ ∴ The condition for the cylinder to remain in equilibrium ⇒ FCM ≤ Fs ⇒
θ
M
3v 2 4g
(
M, R, I
13 (c) Time taken is given by
2gh 2g 3v 2 = v = 2 K K 2 1+ 2 4 g 1 + 2 r r
1=
or
2gh 1 + K 2 / r2
in gs
2
=
⇒
inclined plane force of friction in this case will be backward. Mg sinθ − f Hence, a = …(i) M fR …(ii) and α = I
2 and 5
1 K = R D 2
1 + (2/ 5) 14 = 1 + (1/ 2) 15
= 14 : 15
14 (b) In sliding down, the entire potential energy of a body is converted only into translational energy. While in rolling motion, some part of potential energy is converted into kinetic energy of rotation and rest into kinetic energy of translation. Therefore, in sliding motion, the velocity acquired by the body is more.
MaCM ≤ µ s R 1 ⇒ Mg sin θ ≤ Mg cosθ ⋅ µ s 3 The cross-sectional view of a cylinder under influence of force is given below µ s ≥ (1/ 3)tan θ or tanθ ≤ 3 µ s
16 (d) The relation between the linear velocity (v) and the angular velocity (ω) is v = rω ⇒ r = v /ω From the equation of motion, v 2 = u2 + 2gh When u = 0, h = 3 m , g = 10 ms−2, ω = 2 2 rad s−1 v = 2 × 10 × 3 ⇒
v = 60 ms−1
∴
r=
⇒
r=
60 = 2 2
30 × 2 2 2
30 ≈ 5m 4
17 (a) When a body rolls down without slipping along an inclined plane of inclination θ, it suffers loss in gravitational potential energy, which provide translational energy due to frictional force into rotational energy.
18 (a) Since, in this case instantaneous axis of rotation is always below the centre of mass. This is possible only when point of contact moves with a velocity equal to the centre of mass.
19 (b) Angular velocity is given by ω = 600 rot min −1 =
600 × 2π rad s−1 60
= 20π rad s−1 Kinetic energy of coin which is due to rotation and translation is K = (KE) rotation +(KE) translation
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SYSTEM OF PARTICLES AND ROTATIONAL MOTION
1 2 1 2 Iω + mv 2 2 1 1 2 2 1 = × mr ω + m(rω )2 2 2 2 Given, m = 4.8 kg and r = 1m 1 = × 4.8 × (1)2 (20π )2 4 1 + × 4.8 × (20π × 1)2 2 = 480π 2 + 960π 2 = 1440 π 2J K =
20 (d) KE of rotation is 40% of KE in translatory (KE )rot = 40% × (KE )trans 1 2 40 1 2 Iω = × mv 2 100 2 2 Iω 2 = m(ωr)2 [Q v = ωr ] ⇒ 5 2 I = mr2 ⇒ 5 where, I is moment of inertia. Thus, the body is a solid sphere (solid ball).
21 (a) Kinetic energy of rotation, K rot =
2
1 2 1 v Iω = Mk 2 2 2 2 R v Q ω = R
22 (a) According to energy conservation, Potential energy = Translational kinetic energy + Rotational kinetic energy ⇒ mgh =
where, k is radius of gyration. Kinetic energy of translation, K trans = (1/ 2)Mv 2 Thus, total energy, E = K rot + K trans = =
or
1 v2 1 Mk 2 2 + Mv 2 2 2 R
k 1 1 Mv Mv 2 2 + 1 = (k 2 + R 2 ) 2 2 R2 R
Hence,
2
K rot K total
[Q I = (2/ 5)mR 2 for a solid sphere] 1 2 1 2 mgh = mv + mv 2 5 =
2
1 v2 Mk 2 2 2 R = 1 Mv 2 2 (k + R 2 ) 2 R2 k2 = 2 k + R2
1 2 1 2 mv + Iω 2 2 2 1 2 12 v = mv + mR 2 ⋅ 2 R 2 25
⇒
v=
7 mv 2 10 10 gh. 7
Hence, to climb the inclined surface v 10 should be ≥ gh. 7
07 Gravitation Quick Review Every body in this universe attracts other bodies towards itself with a force called force of gravitation, thus gravitation is the phenomena of mutual attraction between two bodies.
Newton’s Law of Gravitation • If F is the force of attraction between the two bodies of
masses m and M distance r apart, then by Newton’s GMm law of gravitation and it is given by F = r2 where, G = gravitational constant = 6.67 × 10−11 Nm 2 kg −2 .
Dimensional formula of G is [ M −1 L3 T −2 ]. • This force is conservative in nature. • According to principle of superposition of gravitational
forces, the resultant force F acting on a particle due to number of point masses is equal to the vector sum of forces exerted by the individual masses on given particle and given as m m m FR = − Gm1 22 r 21 + 3 r 31 + ... + n r n1 r1n r13 r12 where, r n1 = unit vector pointing from mn to m1 .
Acceleration Due to Gravity • The force of gravity acting on a body of unit mass placed
near the surface of earth is known as acceleration due to gravity, which is denoted by g and given as F GM 4 g = = 2 = πGρR m R 3 where, M = mass of the earth, R = radius of the earth and ρ = mean density of the earth. Its average value on the earth surface is 9.8 ms −2
• The weight of a body of mass m on earth’s surface is
given by w = mg.
Variations in the Value of g • If ω is the angular velocity of rotation of earth
about its own axis, then acceleration due to gravity at any place on earth is given as g ′ = g − Rω 2 cos 2 λ where, λ is the latitude of that place. (i) At equator λ = 0°, then ∴ g ′ = g − Rω 2
(ii) At poles λ = 90°, then ∴ g′=g ⇒ g ′ pole − g ′ equator = Rω 2 Thus, value of g ′ increases from equator to poles as latitude increases. • The value of g at height h from earth’s surface is given by g 2h or g ′ ≈ g 1− g′= 2 R h 1 + R Therefore, g decreases with height. • The value of g at depth d below earth’s surface is given by d g ′ = g 1 − R Therefore, g decreases with depth and becomes zero at earth’s centre. • The value of acceleration due to gravity at poles and equator is also given respectively as GM GM and g eq = 2 gp = 2 R eq Rp where, R p and R eq are radius of earth at poles and equator respectively. As, R p < R eq ∴ g p > g eq Thus, the value of g is minimum at the equator and maximum at the poles.
179
GRAVITATION
Gravitational Field
• The intensity of gravitational field at a point is given by
F GM = 2 m r experiences a force of attraction is called the gravitational where, r = distance of unit mass from centre of body. field of the first body. Gravitational Field Intensity due to Different Bodies I or E =
• The space around a body in which any other body
Shape of Body Solid sphere
Outside the Surface
On the Surface
Inside the Surface
(r > R )
(r = R)
(r < R)
I =
GM r2
I =
GM R2
I =
I versus r graph
GMr R3
I = GM R2
I I∝r rR r
R
I GM R2
I∝ 1 r2 I=0
O
Note
Due to a circular ring, the value of I at a point on its axis is
r
R
GMr . However, its value at the centre of ring is zero. (R + r2 )3/2 2
Gravitational Potential
• Relation between gravitational field and potential is given as
V = − ∫ I ⋅ dr
Gravitational potential at a point in the gravitational field is defined as the amount of work done in bringing a body of unit mass from infinity to that point without acceleration. W i.e. V =− m −1 0 2 −2 • Its SI unit is Jkg and dimensional formula is[ M L T ].
• Gravitational potential at a point due to system of point
masses
Gm Gm2 Gmn +...+ V = − 1 + r r rn 2 1
Gravitational Potential due to Different Bodies Shape of Body Solid sphere
Outside the Surface (r > R ) V =−
GM r
On the Surface r=R V =−
GM R
Inside the Surface (r < R) V =−
GM 2R
r2 3 − 2 R
I versus r graph –1.5 GM
Parabolic
R – GM R O
Hyperbolic r
R
V
Spherical shell
V =−
GM r
V =−
GM R
V =−
GM R
– GM R O
R
V
Note Due to a circular ring, the value of potential at a point on its axis is −
Gravitational Potential Energy
GM R2 + r2
and at the centre of ring is −
GM . R
r
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Gravitational potential energy of a body at a point is the amount of work done in bringing a given body from infinity to a point against the gravitational force. • If m1 and m2 are two masses separated by infinite distance, then gravitational potential energy of the system when they are brought to a separation of r is given by Gm1 m2 U=− r where, the negative sign indicates that the two bodies are attracting each other.
There are three scientific laws describing the motion of planets around the sun as given below (i) First law All planets move around the sun in elliptical orbits with the sun at one focus.
• If three particles of masses m1 , m2 and m3 are kept at
(iii) Third law The square of the time taken to complete the orbit (T) is proportional to the cube of the semi-major axis (a) of the elliptical orbit.
three corners of an equilateral triangle of the side d, then gravitational potential energy of the system U=−
G ( m1 m2 + m2 m3 + m3 m1 ) d
Variation of Gravitational Potential Energy on Earth • If a body of mass m is kept on surface of earth, then
its gravitational potential energy is given by GMm PE = − R • If a body is at a height h above surface of the earth, then its gravitational potential energy is given by GMm PE = − R+h
• Work done in lifting a body from surface of the earth
to height h, is given by
R W = change in PE = mgh R + h If h R , it will be equal to 2 , where r r = distance of mass from centre of body.
= 8.89 × 10−3
8 (d) Potential energy at the earth's
KE =
(b) is the correct one, because in case of spherical shell.
M e = 6 × 1024 kg and ve = 3 × 108 m/s2
Divide Eq. (i) by Eq. (ii), we get 8 R πGρ ve 3 = vp 8 2R πG 2ρ 3 v 1 ⇒ e = vp 2 2
V =
13 (b) Among the four plots, option
Given, G = 6.67 × 10−11 Nm 2 / kg,
ve = R
vp = 2R
2GM e Re
2GM e R= ve2
⇒
can be given as
⇒
ve =
⇒
∴
2G 4 × π R 3ρ 3 R 8 ve = R π Gρ 3 v∝R vA RA = =2 [Q RA = 2RB ] vB RB
2GM = R
18 (a) Using law of conservation of energy, 1 2 1 mv = m[ ( 20 )2 − ve2 ] 2 2 Here, escape velocity ve = 8 2 kmh −1 ∴ So,
v 2 = ( 20 )2 − ( 8 2 )2 = 400 − 128 = 272 v = 16.5 kmh −1
19 (b) Escape velocity of a body from the earth’s surface, ve =
2GM e Re
...(i)
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GRAVITATION
So, from the question, M p =
Me and 2
Re 4 Putting these values in Eq. (i), we get 2G × M e × 4 = 2ve v′e = 2Re Rp =
20 (a) Gravitational potential energy of mass m at earth’s surface, GMm Ue = − R Gravitational potential energy of same mass at a height nR from the earth’s surface, GMm GMm Uh = − =− (R + nR ) R (n + 1)
4 3 4 R 2ρ = πG 4 3 3 14 = π GRρ 6 3 1 = g 6 Work done in jumping will be same, g i.e. mg × 0.5 = m × h1 6
23 (b) On moon, gm = πGRmPm
⇒
h1 = 0.5 × 6 = 3.0 m
24 (d) Given, M = 100 kg, m = 10g = 10 × 10−3 kg
Thus, magnitude of the change in gravitational potential energy, ∆U = U h − U e =
GMm 1 1 − R (n + 1)
n GMm n = = mgR n + 1 R n + 1 (Q GM = gR 2 )
21 (a) Energy required = Total energy (final) − Total energy (initial) − GMm − GMm = − 2 (3R ) 2 (2R ) GMm GMm GMm = − = 4R 6R 12R
22 (b) If both the mass and radius of the earth decreases by 1%, the value of acceleration due to gravity, G (0.99M e ) g′ = (0.99Re )2 GM ≈ 1.01 2 e = 1.01 g Re So, g would increase by (1.01 − 1) × 100% = 1% New escape velocity would be v′e = =
2 × 0.99 M eG 0.99 Re 2GM e = ve Re
So, it will remain unchanged. Also, gravitational potential energy Gm(0.99 M e ) = 0.99 Re GM em =− Re Hence, it will also remain same.
2
= 10 kg and r = 10cm = 0.1m As gravitational potential energy, GMm Ui = − r 6.67 × 10−11 × 100 × 10−2 0.1 6.67 × 10−11 ⇒ Ui = − 0.1 = − 6.67 × 10−10 J Hence, W = − U i = + 6.67 × 10−10 J
So, U i = −
25 (b) Let velocities of these masses at r distance from each other be v1 and v2 respectively. By the law of conservation of momentum, m1v1 − m2v2 = 0 …(i) ⇒ m1v1 = m2v2 By the law of conservation of energy, Change in PE = Change in KE Gm1m2 1 1 = m1v12 + m2v22 r 2 2 m12v12 m22v22 2Gm1m2 …(ii) + = ⇒ m1 m2 r On solving Eqs. (i) and (ii)
and ∴
v1 =
2Gm22 r(m1 + m2 )
v2 =
2Gm12 r(m1 + m2 )
vapp = | v1 | + | v2 | =
2G (m1 + m2 ) r
26 (b) At a platform at a height h, energy = binding energy of sphere GMm 1 ⇒ mv ′ e2 = R+h 2 2 GM = R+h
v ′e =
⇒
2 GM 2R (Q h = R )
But at surface of earth, ve = v′e = f ve
As given, Hence,
2GM R
2GM 2GM = f 2R R 1 f2 1 = ⇒ f = 2R R 2
or
27 (a) Given,U = −7.79 × 1028 J
G = 6.67 N-m 2kg−2 m = 6 × 1024 kg
and
M = 7.40 × 1022 kg
Potential energy of the system, − GMm U = R ⇒ − 7.79 × 1028 − 6.67 ×10−11 × 7.4 × 1022 × 6 × 1024 = R − 6.67 × 10−11 × 7.4 × 1022 × 6 × 1024 R= − 7.79 × 1028 ⇒ R = 3.8 × 108 m
28 (c) Applying law of conservation of energy for asteroid at a distance 10 Re and at earth’s surface, …(i) Ki + U i = K f + U f vi 10 Re vf
Re Me Earth
1 2 mvi 2 GM em Ui = − 10Re 1 2 GM em K f = mv f and U f = − 2 Re
Now, K i = and
On substituting these values in Eq. (i), we get 1 2 GM em 1 2 GM em mvi − = mv f − 2 10Re 2 Re
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
⇒
1 2 1 2 GM em GM em mv f = mvi + − Re 2 2 10Re 2GM e 2GM e v 2f = vi2 + − Re 10Re v 2f = vi2 +
∴
2GM e 1 1 − Re 10
29 (a) Escape velocity, ve =
2 GM R
R If R′ = (given) 4 ⇒
v′e = 2
33 (a) Escape velocity, ve = 2geR 2GM R
Since, G and M are constant, hence v ′ e = 2ve
30 (c) We know that inside a spherical shell gravitational field intensity at any point is zero, hence IP + IQ = 0 ⇒ IP = IQ ≠ 0
31 (c) Escape velocity, ve = 2gR R = 8100 km = 8100 × 103 m ve = 2 × (3.1)2 × 8100 × 103 27.9 ve = 12.5 × 103 ms− 1 ≈ kms− 1 5 1 2
32 (d) Initial KE of the body = mv 2 −1
where, ge is acceleration due to gravity and R is radius. R g Given, 1 = K , 1 = g R2 g2 g1R1 v1 = = Kg ⇒ v2 g2R2 1
⇒
v1 = (Kg ) 2 v2
Here, v = 4 × 11.2 kms 1 1 So, KE = × m (4 × 11.2)2 = 16 × mv2e 2 2
2 × 9.8 × 6.4 × 106 × 0.34 × 10−26 3 (1.38 × 10−23 ) [given] = 104 K Therefore, 104K is the temperature at which hydrogen molecules will escape from earth’s surface.
⇒T =
35 (c) Escape velocity of a body on earth surface is given by 2GM R where, G is gravitational constant, M is mass of planet and R is radius. ve =
When
M ′ = 8M , R′ = 2R , then
⇒
2G (8M ) 2GM =2 (2R ) R v′e = 2ve
⇒
v′e =
36 (d) Let h be the maximum height
34 (d) The root mean square velocity of gas is 3kT …(i) m Escape velocity of the gas molecules is …(ii) ve = 2gRe As the root mean square velocity of gas molecules must be equal to the escape velocity. ∴ From Eqs. (i) and (ii), we get vrms =
Given, g = (3.1)2 ms− 2 ∴
1 As mve2 energy is used up in coming 2 out from the gravitational pull of the earth, so final KE should be 1 15 × mve2. 2 1 1 Hence, mv ′ 2 = 15 × mve2 2 2 ∴ v ′ 2 = 15ve2 ⇒ v = 15ve = 15 × 11.2 kms−1
3kT = 2gRe m 2gRem ⇒ T = 3k
attained, then from the law of equation of motion v 2 = u2 + 2gh When u = 0 ⇒
v = 2 gh
ve , where, ve = 2gR 3 1 ⇒ 2 gh = 2 gR 3 On squaring both sides of equation, we get R h= 9 Given,
v=
Topic 4 Motion of Satellite and Kepler’s Laws of Planetary Motion 2019 1 The time period of a geo-stationary satellite is 24 h, at a height 6R E (R E is the radius of earth) from surface of earth. The time period of another satellite whose height is [[NEET (Odisha)] 2.5 R E from surface will be 24 12 h (d) h (b) 12 2 h (c) (a) 6 2 h 2.5 2.5
2 A planet of radius R has a time period of revolution T. Find time period of a planet of radius 9R? [JIPMER] (a) 3 3 T (b) 9T (c) 27T
(d) 9 3 T
197
GRAVITATION
2018 3 The kinetic energies of a planet in an elliptical orbit about the sun, at positions A , B and C are K A , K B and K C , respectively. AC is the major axis and SB is perpendicular to AC at the position of the sun S as shown in the figure. Then [NEET] B A
(a) (b) (c) (d)
KB < K A K A > KB K A < KB KB > K A
C
S
< KC > KC < KC > KC
4 Two satellites A and B revolve round the same planet in coplanar circular orbits lying in the same plane. Their periods of revolutions are 1 h and 8 h, respectively. The radius of the orbit of A is 104 km. The speed of B is relative to A, when they are closed in km/h is [AIIMS] (a) 3π × 104 (b) zero (c) 2π × 104 (d) π × 104 5 A planet is revolving around the sun in a circular orbit with a radius r. The time period is T. If the force between the planet and star is proportional to r −3/ 2 , then the square of time period is proportional to [AIIMS] 5/ 2 2 3/ 2 (c) r (d) r (b) r (a) r
2016 6 A satellite of mass m is orbiting the earth (of radius R) at a height h from its surface. The total energy of the satellite in terms of g 0 , if the value of acceleration due to gravity at the earth’s surface is g 0 [NEET] mg 0 R 2 mg 0 R 2 (b) − (a) 2( R + h ) 2( R + h ) (c)
2mg 0 R 2 R+h
(d) −
2mg 0 R 2 R+h
7 Kepler’s third law states that square of period of revolution (T ) of a planet around the sun, is proportional to third power of average distance r between the sun and planet, i.e. T 2 = Kr 3 , here K is constant. If the masses of the sun and planet are M and m respectively, then as per Newton's law of gravitation force of attraction between them is GMm F = 2 , here G is gravitational constant. r [AIPMT] The relation between G and K is described as (a) GK = 4π 2 (b) GMK = 4π 2 I (c) K = G (d) K = G
2014 8 An artificial satellite moves in a circular orbit around the earth. Total energy of the satellite is given by E. The potential energy of the satellite is [WB JEE] (a) − 2E (b) 2E 2E 2E (d) − (c) 3 3
9 What is a period of revolution of the earth satellite? Ignore the height of satellite above the surface of the earth. Given, (i) The value of gravitational acceleration, g = 10 ms − 2 . (ii) Radius of the earth, R E = 6400 km. (take, π = 3.14) (a) 85 min (b) 156 min [KCET] (c) 83.73 min (d) 90 min 10 At a height H from the surface of earth, the total energy of a satellite is equal to the potential energy of a body of equal mass at a height 3R from the surface of the earth [EAMCET] (R = radius of the earth). The value of H is 4R R (c) 3R (d) (a) R (b) 3 3 11 Keeping the mass of the earth as constant, if its radius is 1 reduced to th of its initial value, then the period of 4 revolution of the earth about its own axis and passing through the centre, (in hours) is (assume the earth to be a solid sphere and its initial period of rotation as 24 h) (a) 12 (b) 3 [EAMCET] (c) 6 (d) 1.5 2013 12 The largest and the shortest distances of the earth from the sun are r1 and r2 . Its distance from the sun when it is at the perpendicular to the major axis of the orbit drawn from the sun is [UP CPMT] r1 + r2 r1 r2 (b) (a) 4 r1 + r2 2r1 r2 2r1 (d) (c) r1 + r2 r1 + r2 13 Two satellites A and B go around a planet P in circular orbits having radius 4R and R, respectively. If the speed of satellite A is 3v, then the speed of satellite B will be [Manipal] (a) 6v (b) 9v (c) 3v (d) None of these
2012 14 A geostationary satellite is orbiting the earth at a height of 5R above the surface of the earth, R being the radius of the earth. The time period of another satellite (in hours) at a height of 2R from the surface of the earth is [CBSE AIPMT] (a) 5 (b) 10 (c) 6 2 (d) 6 / 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
15 A satellite is launched into a circular orbit of radius R around the earth. A second satellite is launched into an orbit of radius 4R. The ratio of their respective periods is [Kerala CEE]
(a) 4 : 1 (c) 8 : 1 (e) 1 : 2
(b) 1 : 8 (d) 1 : 4
16 Consider a satellite orbiting the earth as shown in the figure below. Let La and L p represent the angular momentum of the satellite about the earth when at aphelion and perihelion, respectively. Consider the following relations, [AMU] a (aphelion) ra
earth
p (perihelion)
I. L a = L p III. ra × L a = r p × L p
17 Average distance of the earth from the sun is L1 . If one year of the earth = D days, one year of another planet whose average distance from the sun is L2 will be [WB JEE] L (a) D 2 L1 L (c) D 2 L1
3/ 2
days
L (b) D 2 L1
days
L (d) D 2 days L1
2/ 3
[UP CPMT]
21 The relation between escape velocity ( ve ) from the surface of the earth and the orbital velocity ( v o ) is [Kerala CEE] (a) 2v e = v (b) v e = 2v o (c) v e = 2v o (d) 4v e = 3v o (e) v e = 3v o
2009 23 The period of revolution of an earth’s satellite close to
II. L a = − L p
Which of the above relations is/are true? (a) Only I (b) Only II (c) Only III (d) I and III
1/ 2
3 to shift it from an orbit of radius r to r ? 2 (a) 15% (b) 20.3% (c) 66.7% (d) 33.33%
22 A research satellite of mass 200 kg circles the earth in an 3R orbit of average radius , where R is the radius of earth. 2 Assuming the gravitational pull on a mass of 1 kg on the earth’s surface to be 10 N, the pull on the satellite will be (a) 880 N (b) 889 N [VMMC] (c) 885 N (d) 892 N
satellite
rp
2010 20 By what percent, the energy of a satellite has to be increased
days
2011 18 The time period T of the moon of planet mars (mass M m )
is related to its orbital radius R (G = Gravitational constant) as [Kerala CEE] 4π 2 R 3 4π 2GR 3 2 2 (a) T = (b) T = GM m Mm 3 2πR G (d) T 2 = 4πM mGR 3 (c) T 2 = Mm (e) T 2 = GM m R 3
19 Two satellites of mass m and 9m are orbiting a planet in orbits of radius R. Their periods of revolution will be in the ratio of [KCET] (a) 9 : 1 (b) 3 : 1 (c) 1 : 1 (d) 1 : 3
surface of earth is 90 min. The time period of another satellite in an orbit at a distance of four times the radius of earth from its surface will be [AIIMS] (b) 270 min (a) 90 9 min (c) 720 min (d) 360 min
2008 24 A satellite in a circular orbit of radius R has a period of 4 h. Another satellite with orbital radius 3R around the same planet will have a period (in hour) [AFMC] (d) 4 8 (a) 16 (b) 4 (c) 4 27 25 A synchronous relay satellite reflects TV signals and transmits TV programme from one part of the world to the other, because its [Manipal] (a) period of revolution is greater than the period of rotation of the earth about its axis (b) period of revolution is less than the period of rotation of the earth about its axis (c) period of revolution is equal to the period of rotation of the earth about its axis (d) mass is less than the mass of earth 26 Two satellites of earth, S 1 and S 2 , are moving in the same orbit. The mass of S 1 is four times the mass of S 2 . Which one of the following statements is true? [MHT CET] (a) The time period of S 1 is four times that of S 2 (b) The potential energies of earth and satellite in the two cases are equal. (c) S 1 and S 2 are moving with the same speed (d) The kinetic energies of the two satellites are equal
199
GRAVITATION
27 The time period of a satellite of earth is 5 h. If the separation between the earth and the satellite is increased to 4 times the previous value, then the new time period will become [RPMT] (a) 10 h (b) 80 h (c) 40 h (d) 20 h
2007 28 The earth moves in an elliptical orbit with the sun S at one of foci as shown in the figure. Its rotational kinetic energy is maximum at the point [UP CPMT] D S A Earth
C Sun B
(a) A (c) C
(b) B (d) D
29 The satellite of mass m revolving in a circular orbit of radius r around the earth has kinetic energy E. Then, its angular momentum will be [Kerala CEE] E E (a) (b) mr 2 2mr 2 (d) 2Emr (c) 2Emr 2 E (e) 2mr 2 30 A body is orbiting around earth at a mean radius which is two times as greater as the parking orbit of a satellite, the period of body is [BCECE] (a) 4 days (b) 16 days (c) 2 2 days (d) 64 days
2006 31 For a satellite moving in an orbit around the earth, the ratio of kinetic energy to potential energy is [AFMC] 1 1 (c) (d) 2 (a) 2 (b) 2 2
32 The minimum energy required to launch a m kg satellite from earth’s surface in a circular orbit at an altitude of [AMU] 2R , R is the radius of earth, will be 5 1 (a) 3mgR (b) mgR (c) 2mgR (d) mgR 6 5 33 A satellite moving on a circular path of radius r around the earth has a time period T. If its radius slightly increases by ∆r, the change in its time period is [AMU] 3 T T (a) ∆r (b) ∆r r 2 r 2 3 T (d) None of these (c) 2 ∆r 2 r
34 Suppose the gravitational force varies inversely as the nth power of the distance. The time period of a planet in circular orbit of radius R around sun will be proportional to (b) R (n + 1)/ 2 (a) R (n − 1)/ 2 [DUMET] n+1 n−1 (d) R (c) R 35 The radius of the orbit of a planet is two times that of the earth. The time period of planet is [MP PMT] (a) 4.2 T (b) 2.8 T (c) 5.6 T (d) 8.4 T 36 Near earth’s surface, time period of a satellite is 4 h. Find its time period at height 4R from the centre of earth. 1 (a) 32 h (b) h [RPMT] 8 3 2 (c) 8 3 2 h (d) 16 h 37 Radius of orbit of satellite of earth is R. Its kinetic energy is proportional to [RPMT] 1 1 (b) (a) R R 1 (c) R (d) 3/ 2 R 38 The time period of an artificial satellite in a circular orbit is independent of [J&K CET] (a) the mass of the satellite (b) radius of the orbit (c) mass of the earth and radius of the earth (d) None of the above
2005 39 Two planets are revolving around the earth with
velocities v1 and v 2 and in radii r1 and r2 ( r1 > r2 ), respectively. Then, [BHU] (a) v1 = v 2 (b) v1 > v 2 v v (c) v1 < v 2 (d) 1 = 2 r1 r2
40 The orbital velocity of an artificial satellite in a circular orbit just above the earth’s surface is v o . The orbital velocity of a satellite orbiting at an altitude of half of the radius, is [AMU] 3 2 (a) v o (b) v o 2 3 2 3 (d) (c) vo vo 3 2 41 The earth revolves around the sun in one year. If the distance between them becomes double, then the new time period of revolution will be [AMU] (a) 4 2 yr (b) 2 2 yr (c) 4 yr (d) 8 yr
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
42 A planet revolves in elliptical orbit around the sun. The linear speed of the planet will be maximum at [Manipal]
44 A satellite moves in a circle around the earth. The radius of this circle is equal to one-half of the radius of the moon’s orbit. The satellite completes one revolution in
B
[J&K CET] S
A
C
D
(a) A
(b) B
(c) C
1 (a) lunar month 2
2 (b) lunar month 3
(c) 2−3/ 2 lunar month
(d) 23/ 2 lunar month
45 A geostationary satellite is revolving around the earth. To make it escape from gravitational field of earth, its velocity must be increased [J&K CET] (a) 100% (b) 41.4% (c) 50% (d) 59.6%
(d) D
43 When earth moves round the sun, the quantity which remains constant is [BCECE] (a) angular velocity (b) kinetic energy (c) potential energy (d) areal velocity
Answers 1 11 21 31 41
(a) (a) (b) (b) (b)
2 12 22 32 42
(c) (c) (b) (b) (a)
3 13 23 33 43
(b) (a) (c) (a) (d)
4 14 24 34 44
(d) (c) (c) (b) (c)
5 15 25 35 45
(d) (b) (c) (b) (b)
6 16 26 36
(b) (a) (c) (a)
7 17 27 37
(b) (b) (c) (a)
8 18 28 38
(a) (a) (a) (a)
9 19 29 39
(c) (c) (c) (c)
10 20 30 40
(a) (d) (c) (c)
Explanations 1 (a) From Kepler’s third law, the time period of revolution of satellite around earth is T 2 ∝ r3 or T ∝ r3/ 2
T R = T2 9R
∴
where, r is the radius of satellite’s orbit. r2 = 2.5RE + RE , T2 = ?
vB
So, from Eq. (i), we get
A
3/ 2
vC B S
C
3/ 2
vA
24 6RE + RE = T2 2.5RE + RE ⇒ T2 =
2 T 1 = T2 3
3 (b) According to the question,
where, Re = radius of earth. T1 r1 = T2 r2
,
T 1 = ⇒T2 = 27T T2 27
…(i)
Here, r1 = 6RE + RE , T1 = 24 h
3/ 2
3/ 2
7 = 3.5
3/ 2
24 24 12 = = =6 2h 3/ 2 2 2 2 (2 )
2 (c) By Kepler’s third law of planetory motion, T1 a1 = T2 a2
3/ 2
Given, T1 = T , a1 = R, T2 = ?, a2 = 9R
Kinetic energy of the planet at any 1 point is given as, K = mv 2 2 Thus, at A, 1 K A = mvA2 2 1 At B, K B = mvB2 2 1 At C, KC = mvC2 2 From Eq. (i), we can write K A > K B > KC
4 (d) Given, TA > 1h ,TB = 8h and
The figure above shows an ellipse traced by a planet around the sun S. The closed point A is known as perihelion and the farthest point C is known as aphelion . Since, as per the Kepler’s second law of area, that the planet will move slowly (vmin ) only, when it is farthest from the sun and more rapidly (vmax ), when it is nearest to the sun. Thus, vA = vmax , vC = vmin Therefore, we can write …(i) vA > vB > vC
rA = 104 km
From Kepler’s law, TA2 rA3 = TB2 rB3 ⇒
12 (104 )3 = rB3 82
⇒
rB3 = 64 × (104 )3
∴
rB = 4 × 104 km
Speed of satellite A, 2π rA vA = TA
[Q v = ωr]
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GRAVITATION
2π × 104 1 = 2π × 104 km/h Speed of satellite B, 2π rB 2π × 4 × 104 vB = = TB 8 =
= π × 104 km/h The speed of B relative to A when they are closed. vBA = vA − vB = 2π × 104 − π × 104
5
= π × 104 km/h GMm (d) As, force, F = 3/ 2 = mω 2r r 2π GMm 4 π 2mr ⇒ 3/ 2 = QT = 2 ω r T 2 4 π 5/ 2 ⇒ ⇒ T 2 ∝ r5/ 2 T2 = ⋅r GM
The kinetic energy of the satellite, 1 GM em 2 Re The total energy E = U + K GM em 1 GM em =− + Re 2 Re 1 GM em =− 2 Re GM em ⇒ 2E = − ⇒ − 2E = U Re K =
So, potential energy = − 2 (total energy) ⇒ PE = − 2E
9 (c) Given, Re = 6400 km = 6.4 ×106 m π = 3.14 and g = 10 m/s2. We know that, the period of revolution of the earth satellite T = 2π
6 (b)QTotal energy of a satellite at height h is GMm GMm − = KE + PE = 2(R + h) (R + h) −GMm −GMmR 2 = = 2 (R + h) 2R 2 (R + h) =
− mg0R 2 2(R + h)
6.4 × 106 R = 2π e = 2 × 3.14 10 g = 2 × 3.14 × 0.8 × 10 = 5.024 × 103 = 5024 s = 83.73 min
T 2 = kr3 From Eqs. (i) and (ii), we get
⇒
…(ii)
4 π 2r3 = kr3 GM GMK = 4 π 2
8 (a) We know that, the potential energy of the satellite U =−
GM em Re
So, if R′ = ⇒
the satellite is
1 G M em 2 R+H
and the potential energy, G M em GM em U =− =− 4R R + 3R
⇒ ⇒
1 1 = 2R + 2H 4 R 2H = 4 R − 2R H =R
T ′ = 2π
Re 4g
…(ii)
⇒ ⇒
T ′×2 = 24 24 T′ = = 12 h 2
12 (c) The equation of general conic is 1 1 = (1 + e cos θ ) r l where, e is eccentricity. For ellipse, turning points are at θ = 0° and θ = 180° giving rmin = r2 and rmax = r1 respectively. ∴
1 1 = (1 − e) r2 l
…(i)
and
1 1 = (1 + e) r1 l
…(ii)
⇒
1 1 2 + = r1 r2 l l=
2r1r2 r1 + r2
13 (a) Gravitational force of attraction provides the necessary centripetal force v0
…(i) Planet M Planet
…(iii)
According to the question, E = U 1 GM em GM em =− ⇒ E =U − ⋅ 2 R+H 4R ⇒
Re 4
From Eqs. (i) and (ii), we get R 2π e g T = ×2 T' Re 2π g
⇒
1 GM em 2 R
At a height H from the surface of the earth, the total energy of the satellite, E=−
…(i)
From Eqs. (i) and (ii), we get
10 (a) We know that, the total energy of E=−
Re g
Time period, (T ) = 2π
3
between the planet and sun provide the centripetal force GMm mv = r r2 GM v= r The time period of planet will be, 2πr T = v 4 π 2r2 4 π 2r3 2 …(i) = T = ⇒ GM GM r Also from Kepler's third law,
Re3 gRe2
So, T = 2π
7 (b) The gravitational force of attraction
i.e.
(Re + h) gRe2
3
[if h rp ra × La > rp × L p
17 (b) According to Kepler’s law, T 2 ∝ R 3 Given, R1 = L1 , R2 = L2 and period of earth around sun, T1 = D days. 2
T R = 2 T1 R1
3
L T = D 2 L1
So,
3/ 2
18 (a) Time period, T =
⇒
2πR GM Q v0 = R GM m R 4 π 2R 3 2 T = G Mm
2πr = v0
19 (c)Q As we know, From Kepler’s law, time period of 4 π 2R 3 satellite is T 2 = GM Tsat = 2π
GMm 2r where, r is the radius of orbit.
first case is =
14 (c) From Kepler’s third law, 2
As two satellites of masses m and 9m are orbiting a planet of radius R, their time periods will remain same i.e. in the ratios 1 : 1, because time period of satellite does not depend on its mass.
( R + h)2 GM e
per cent increase in energy of a satellite GMm / 6r = × 100 GMm / 2r 2 = × 100 = 33.33% 6
21 (b) We know that, relation between orbital velocity and escape velocity, vo = gRe ve = 2gRe
⇒
vo = ve
⇒
ve = 2vo
gRe 2gR
…(i) …(ii) ⇒
synchronous relay satellite is equal to the period of rotation of earth about its axis. This makes it possible to reflect TV signals and transmits TV programme from one part of the world to the other.
26 (c) The orbitial velocity of satellite is
In second case, GMm BE = 2 × (3r / 2) GMm 1 1 GMm ∴ ∆E = − = r 2 3 6r
⇒
25 (c) The period of revolution of a
vo 1 = ve 2
22 (b) Given, m′ = 200 kg, m = 1 kg and r = 3R / 2
v0 =
Thus, it is independent of mass of satellite, so the velocity of both will be same whereas potential energy and kinetic energy of a satellite depends on its mass.
27 (c) Given , T = 5 h and r1 = 4 r According to Kepler’s law, T 2 ∝ r 3 ⇒ 52 ∝ r 3 and
40 R2 R2 = 10 × = 2 9 (3R / 2)2 r Pull on satellite = m′ g′ 40 = 200 × = 889 N 9 g′ = g
23 (c) Given, R′ = 4 R and T = 90 min From Kepler’s law, T 2 ∝ R 3 ⇒ T ∝ R 3/ 2 3/ 2 3/ 2 T ′ R′ T ′ 4 R ⇒ = ⇒ = T R T R = (4 )3/ 2 = (22 )3/ 2 = 23 = 8 ∴
T ′ = 8T = 8 × 90 = 720 min
24 (c) According to Kepler’s third law, T 2 ∝ R3 ⇒
T2 R2 = T1 R1
3/ 2
3/ 2
∴
T2 3R = T1 R
∴
T2 = 27 T1 = 27 × 4 = 4 27 h
⇒
T2 = 27 T1
2
(T ′ ) ∝ (4 r)
3
…(i) …(ii)
From Eqs. (i) and (ii), we get 25 r3 = 2 ( T′ ) 64 r3 ∴
T ′ = 1600 = 40 h
28 (a) The earth revolves around the sun once in a year. In order to find the rotational kinetic energy about the sun, we may treat the earth as a point mass of moment of inertia I. If ω is angular velocity of earth, then
On earth, mg = 10 N ⇒ 1 × g = 10 ⇒ g = 10 ms− 2 Now,
GM r
K rot =
1 2 Iω 2
In planetary motion, angular momentum remains conserved. At A, the moment of inertia is least, so angular speed is maximum. So at A, rotational kinetic energy is maximum.
29 (c) If m is the mass and v is the orbital velocity of the satellite, then its kinetic energy, 1 E = mv 2 2 1 Em = m2v 2 ⇒ 2 ⇒ ⇒
m2v 2 = 2Em mv = 2Em
…(i)
If r is the radius of the orbit of the satellite, then its angular momentum L = mvr Using Eq. (i), L = ( 2Em )r = 2Emr2
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GRAVITATION
30 (c) By Kepler’s third law of planetary motion, We have, T 2 ∝ a3 Given,
GMm Rn 1 QF ∝ n R
34 (b) Given, gravitational force, F =
T1 = 1 day (geostationary) a1 = a, a2 = 2a
∴
T12 a13 = T22 a23
⇒
a3 T22 = 23 T12 a1
Gravitational force will provide the necessary centripetal force to the planet, i.e. centripetal force = gravitational force i.e.,
(2a)3 ×1= 8 a3 T2 = 2 2 days =
⇒
GM em Re where, Re is radius of earth, M e is the mass of earth, m is the mass of satellite and G is the gravitational constant. GM em |U | = Re U =−
2
⇒ ⇒ ⇒ ⇒ ∴
∆T 3 T = ∆r 2 r 3 T ∆T = ∆r 2 r
3/ 2
⇒
T 1 = T2 2
⇒
T2 = (2)3/ 2T or T2 = 2.8 T
2
∴
37
3/ 2
T = kr dT 3 1/ 2 = kr dr 2 dT 3 T = dr 2 r
3
3 T1 R R = 1 = 2R T2 R2
3
3/ 2 T2 R T 4 R = 2 ⇒ 2 = T1 R1 4 R
[Q R2 = 4 R ] ⇒ T2 = 4 × 8 = 32 h (a) Kinetic energy of the satellite, 1 …(i) KE = mv02 2 GM where, v0 = R Now, putting the value of v0 in Eq. (i), we get
T Q kr1/ 2 = r
v2
KE =
1 GM m 2 R
1 mGM 2 R 1 Hence, KE ∝ R =
2
r2
R
v1
Earth r1
F1 =
GMm gR 2m = 2 r12 r1
GM = gR 2
where,
F2 =
GMm gR 2m = 2 r22 r2
This gravitational force provides the necessary centripetal force, hence we have gR 2 gR 2m mv12 = ⇒ v12 = 2 r1 r1 r1 v1 =
gR 2 r1
…(i)
Similarly, v2 =
gR 2 r2
…(ii)
⇒
T 2 ∝ R3
T 2 ∝ r3
From the above formula, it is clear that time period of revolution does not depend upon the mass of the satellite.
Similarly
36 (a) We know that,
33 (a) According to Kepler’s law,
where, Re is radius of earth and h the height of satellite.
the planet is
T 2 ∝ R3 ∴
(Re + h)3 gRe2
T = 2π
39 (c) The gravitational force exerted on
35 (b) Applying Kepler’s third law,
32 (b) Minimum required energy = TE f − PE i − GMm − GMm = − 2(R + 2R ) R GMm 1 = − + 1 R 6 5 GMm = 6 R 5 gR 2 × m = 6 R 5 = mgR 6
satellite is given by
Time period of planet in circular orbit of radius R around sun will be 2πR T = v n − 1 1+ 2πR 2π ⇒ T = = R 2 GM GM Rn − 1 n+ 1 (n + 1) 2π T = R 2 ⇒T ∝ R 2 ⇒ GM
31 (b) Potential energy of satellite,
Kinetic energy of satellite 1 GM em (K ) = 2 Re 1 K 1 GM em Re So, = = × U 2 Re GM em 2
mv 2 GMm = R Rn GM v= Rn − 1
38 (a) The time period of an artificial
Taking ratio of (i) and (ii), ∴
v1 = v2
∴
r2 r1
v2 > v1
(given, r1 > r2)
40 (c) Given, R1 = Re and R2 = Re +
Re 3 = Re 2 2
The orbital velocity of satellite is GM e 1 vo = ⇒ vo ∝ R R Now
v1 = v2
R2 = R1
v2 =
2 v1 = 3
3Re = 2Re
3 2
2 vo (Q v1 = vo ) 3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
41 (b) Given, T1 = 1 yr, R1 = R , R2 = 2R According to Kepler’s third law of planetary motion, T 2 ∝ R 3 where, R is the distance between earth and sun. 3 1 R ∴ = = 2R 8 T1 1 ⇒ = T2 2 2 ⇒
T2 = 2 2 T1 = 2 2 yr
42 (a) Here, angular momentum is
conserved, i.e.L = Iω = constant. At point A, the moment of inertia I is l least, since I ∝ , so angular speed ω and the linear speed of the planet at A is maximum.
43 (d) When earth moves round the sun, then according to Kepler's second law, the radius vector drawn from the sun to earth, sweeps out equal areas in equal time, i.e. its areal velocity (or the area swept out by it per unit time) is constant. While in such motion, angular velocity, kinetic energy and potential energy change.
44 (c) Time period of revolution of a satellite is T = 2π
3
r gR 2
(a)3 gR 2
(a / 2)3 gr2
…(ii)
[Q rs = a/ 2 ] From Eqs. (i) and (ii), Tm = Ts ⇒
a3 = 23/ 2 (a/ 2)3
Ts = 2−3/ 2 lunar month
45 (b) Orbital velocity, vo = gRe Escape velocity, ve = 2gRe where, Re is radius of earth. v −v Increase Percentage = e o × 100 vo
Given, Tm = Time period of moon = 1lunar month, rm = a T = 2π
For satellite Ts = 2π
= …(i)
2gRe − gRe
× 100 gRe = ( 2 − 1) × 100 = (1. 414 − 1) × 100 = 41. 4%
08 Mechanical Properties of Solids Quick Review Elastic and Plastic behaviour of Materials • Whenever a force is applied on a body, then it tends to
change the size or shape of the body.
• The property of a body by virtue of which it tends to regain
its original size and shape when the applied force is removed, is known as elasticity and the deformation caused is known as elastic deformation. • Those substances which do not have a tendency to regain their shape and hence gets permanently deformed are called plastic and this property is called plasticity.
Stress • The restoring force per unit cross-sectional area set up
within the body is called stress. Restoring force F Stress = = Area of cross -section A
2 • In SI system, unit of stress is N/m or pascal (Pa). • In general, there are three types of stresses as given below (i) Longitudinal Stress When the stress is normal to the surface of object, then it is known as longitudinal stress. It is of two types (a) Tensile Stress If the stress produced in an object is due to increase in its length, then it is called tensile stress.
(b) Compressive Stress If the stress produced in an object is due to decrease in its length, then it is called compressive stress. (ii) Volumetric Stress The restoring force acting per unit area inside the object opposing change in volume is called volumetric stress.
(iii) Shearing Stress When a force is applied on an object along the tangential direction of the surface of the object, then stress produced in the object is called shearing stress.
Breaking Stress • The minimum stress after which the wire
breaks is called breaking stress.
• A wire of length l will break due to its own
Breaking stress dg where, d = density of material of wire and g = acceleration due to gravity.
weight, when l =
Strain • Strain is defined as the ratio of change in
shape of an object to the original shape. Strain Change in configuration of the object = Original configuration of the object • It is a pure number and has no unit. • The three types of stresses results in three types of strain as given below (i) Longitudinal Strain ( S L ) It is the change in length per unit length of the wire on application of force, i.e. Change in length ∆L = SL = Original length L (ii) Bulk or Volume Strain ( S V ) It is the change in volume per unit volume
206
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
of the object on application of force, i.e. Change in volume ∆V = SV = Original volume V (iii) Shearing Strain ( S S ) It is the ratio of displacement of the upper surface to the distance between two layers, i.e. Relative displacement of a layer SS = = tanθ Distance between two layers where, θ = shearing angle. • Also, shearing strain = 2 × longitudinal strain and volume strain = 3 × longitudinal strain.
Hooke’s Law • This law states that, for small deformations, the stress and
strain are proportional to each other. Thus, stress ∝ strain stress = k × strain where, k is a proportionality constant which is known as modulus of elasticity. −2 • The SI unit of modulus of elasticity is Nm . • Depending on the types of stresses and strains, there are three modulii of elasticity as given below (i) Young’s Modulus It is the ratio of longitudinal stress to the corresponding strain for small change in length FL MgL . and it is expressed as Y = = Al πr 2 l where, M = mass of the body, A = area of the body, l = change in the length due to the strain and L = length of the body. (ii) Bulk Modulus It is the ratio of volume stress to the corresponding volume strain in the material for small Vdp F/A . value of strain and it is given by K = =− − ∆V / V dV where, dp = change in pressure and dV = change in volume. 1 dV = • Compressibility = Bulk modulus (K ) Vdp • Gases have two types of bulk modulus as given below
(a) Isothermal Bulk Modulus under isothermal condition, bulk modulus is equal to pressure of gas, i.e. K i = p (pressure of the gas) (b) Adiabatic Bulk Modulus Under adiabatic condition, bulk modulus is equal to γ times pressure, i.e. Cp K a = γp γ = CV where, γ = heat capacity ratio. Also, K a = γ K i
(iii) Modulus of Rigidity It is the ratio of shearing stress to the shearing strain for small strain in a body, which is F , where, θ =shearing angle. given as η = Aθ • Young’s modulus and modulus of rigidity are defined for solids only while bulk modulus is defined for all solids, liquids and gases. • For perfectly rigid body, we have
Y = ∞, K = ∞ and η = ∞.
Poisson’s ratio It is the ratio of transverse or lateral contraction strain to longitudinal contraction strain in the direction of stretching force. It is expressed as d/D Lateral contraction strain σ= = Longitudinal contraction strain l/ L where, d = change in diameter and D = original diameter, l = change in length and L = original length. • Theoretical limits of Poisson’s ratio are −1and 0.5, while the practical limits are 0 and 0.5. • Relations between Y , K , η and σ as given below ( 3K − 2η) Y Y (i) K = (ii) η = (iii) σ = 2( 3K + η) 3(1 − 2σ ) 2(1 + σ )
(iv) Y =
9 3 1 9ηK (v) = + Y η K 3K + η
Applications of Modulus of Elasticity l If a beam is fixed at its ends and d δ loaded with weight at its middle, then depression at the centre is given as w Mg l 3 δ= 4bd 3 Y where, Y = Young’s modulus, l = length of beam, b = breadth of beam and d = thickness of beam. If a rubber ball of volumeV is taken to a depth h in water, • hdgV . then decrease in its volume is given as dV = K
Factors Affecting Elasticity Elasticity of any material is affected due to many factors as given below • Due to hammering and rolling, the elasticity of material increases. • Due to annealing (heating and slow cooling), the elasticity of material decreases. • With rise in temperature, the elasticity decreases. • Due to impurity, the elasticity can be increased or decreased.
207
MECHANICAL PROPERTIES OF SOLIDS
• If a metal cube is heated, then pressure applied on the
Stress-Strain Curve • A typical stress-strain curve for a metal is as shown in
figure
Stress
Elastic limit or Yield point A
B
C
Fracture point
D Plastic deformation Proportional limit Plastic behaviour
Elastic behaviour Load = mg Permanent set O (a) 30% 0 (50000)for length 200 cm > (3333)for length 300 cm .
Given, Ysteel = 2 × 10 Nm
l = 0.5 mm = 0 .5 × 10−3 m, M = 250 kg 250 × 9.8 × 2 ∴ Y= 50 × 10−6 × 0 .5 × 10−3
12 (b) Increase in length,
> (10000) forlength100 cm
11
known as compressibility and ratio of shearing stress to shearing strain is called shear modulus.
18 (c) Young’s modulus of material of the body is given by longitudinal stress MgL Y= = longitudinal strain Al Putting the numerical values, we have L = 2 m, A = 50 mm 2 = 50 × 10−6 m 2
…(i)
Here, negative sign shows that volume is decreased, when pressure is increased. Given, B = 2100 MPa = 2100 × 106 Pa and V = 200 L 0.004 ∆V = 200 × = 0.008 L 100 Substituting these values in Eq. (i), we get ∆p 2100 × 106 = 0.008 200 ⇒
∆p = 84 kPa
24 (d) As, bulk modulus, p normal stress = volume strain − ∆V / V ∆V 0.1 Given, = , B = 9 × 108 Nm −2 V 100 d = 100 kgm − 3 and g = 10ms− 2 B=
213
MECHANICAL PROPERTIES OF SOLIDS
p = hdg = h × 1000 × 10 − ∆V B∆V B = p = hdg ⇒ h = − V Vdg
∴
h=−
∆p − ∆V V Given, h = 1km = 103 m,
26 (a) Bulk modulus, B =
9 × 108 × 01 . = − 90 m 1000 × 100 × 10
25 (a) Young’s modulus, Longitudinal stress Longitudinal strain F/A where F is force, A is area, l Y= l/ L is change in length and L is original length. F/A In first case, …(i) Y= 2/ L F/A …(ii) In second case, Y = l/L /2 Y=
Equating Eqs. (i) and (ii), we get L L/ 2 = 2 l ⇒ l = 1 mm
−3
ρ = 1gcm − ∆V 0.01 and = = 10−4 V 100 where, ∆p = pressure of water. = 103 × 1 × 103 × 9.8 = 9.8 × 106 B=
9.8 × 106 = 9.8 × 1010 Nm −2 10−4
27 (d) Forces acting on the mass are (i) the tension (T ) and (ii) the weight (w). At the lowest point, mv 2 T −w= r or T = mg + mrω 2 (Q v = rω and w = mg )
Given, m = 6.5 kg, r = 60 cm = 0.60 m, Y = 2 × 1011 Pa, A = 0.05 cm 2 = 0.05 × 10−4 m 2 and ω = 2 rev/s T = 6.5 × 9.8 + 6.5 × 0.60 × (2)2 ⇒ = 63.7 + 15.6 = 79.3 N TL We have, Y = Al 79.3 × 0.60 TL = ⇒ l= AY 0.05 × 10−4 × 2 × 1011 = 4.8 × 10−5 m
28 (c) Given, L = 11 . m, A = 1mm 2 = 10−6 m, Y = 11 . × 1011 Nm − 2, m = 1kg and g = 10 ms −2 Increase in length, . 1 × 10 × 11 mgL m l= = AY 10−6 × 11 . × 1011 = 0.1 mm
Topic 3 Poisson’s Ratio, Stress-Strain Curve and Thermal Stress 2019 1 The stress-strain curves are drawn for two different materials X and Y. It is observed that the ultimate strength point and the fracture point are close to each other for material X but are far apart for material Y. We can say that materials X and Y are likely to be (respectively) [NEET (Odisha)]
(a) ductile and brittle (c) brittle and plastic
(b) brittle and ductile (d) plastic and ductile
2016 2 The stress-strain graph of a material is shown in the figure. The region in which the material is elastic is
Strain
[J & KCET]
O
(a) OA
(b) OB
A
B
C
Stress
(c) OC
(d) AC
2014 3 A metal rod is fixed rigidly at two ends so as to prevent
its thermal expansion. If L, α and Y respectively denote the length of the rod, coefficient of linear thermal expansion and Young’s modulus of its material, then for an increase in temperature of the rod by ∆T, the longitudinal stress developed in the rod is [AMU] (a) inversely proportional to α (b) inversely proportional to Y (c) directly proportional to ∆T / Y (d) independent of L
2012 4 Assertion Soft steel can be made red hot by continued hammering on it, but hard steel cannot. Reason Energy transfer in case of soft is large as in hard steel. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of the Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of the Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
214
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
5 A material has Poisson’s ratio 0.50. If a uniform rod of it suffers a longitudinal strain of 2 × 10−3 , then the percentage change in volume is [WB JEE] (a) 0.6 (b) 0.4 (c) 0.2 (d) zero
2010 6 For a given material, the Young’s modulus is 2.4 times that of rigidity modulus, then Poisson’s ratio is [Manipal] (a) 0.2 (b) 0.4 (c) 1.2 (d) 2.4
2008 7 When a rod is heated but prevented from expanding, the stress developed is independent of [Manipal] (a) material of the rod (b) rise in the temperature (c) length of the rod (d) None of these 8 When a wire is subjected to a force along its length, its length increases by 0.4% and its radius decreases by 0.2%. Then, the Poisson’s ratio of the material of the wire is [EAMCET] (a) 0.8 (b) 0.5 (c) 0.2 (d) 0.1 2007 9 Two rods of different materials with coefficients of linear thermal expansion α 1 , α 2 and Young’s modulii Y1 and Y 2 respectively are fixed between two rigid walls. They are heated to have same increase in temperature. If the rods do not bend and α 1 : α 2 = 2 : 3, then the thermal stresses developed in two rods will be equal whenY1 : Y 2 is equal to [EAMCET]
(a) 2 : 3
(b) 2 : 5
(c) 3 : 2
(d) 5 : 2
2006 10 There is no change in the volume of a wire due to change in its length on stretching. The Poisson’s ratio of the material of the wire is [MHT CET] (a) 0.50 (b) − 0. 50 (c) 0.25 (d) − 0. 25
11 If longitudinal strain for a wire is 0.03 and its Poisson’s ratio is 0.5, then its lateral strain is [J&K CET] (a) 0.003 (b) 0.0075 (c) 0.015 (d) 0.4 2005 12 If a wire having initial diameter of 2 mm produced the longitudinal strain of 0.1%, then the final diameter of wire is (σ = 0. 5) [MHT CET] (a) 2.002 mm (b) 1.999 mm (c) 1.998 mm (d) 2.001 mm 13 In case of steel wire or a metal wire, the elastic limit is reached when [Manipal] (a) the wire just break (b) the load is more than the weight of wire (c) elongation is inversely proportional to the tension (d) None of the above 14 Which of the following substances has the highest elasticity? [KCET] (a) Sponge (b) Steel (c) Rubber (d) Copper 15 For most of the material, Young’s modulus (Y ) and rigidity modulus (G ) are related as [UK PMT] Y (a) G = 3Y (b) G = 3 3 Y (c) G = Y (d) G = 2 8 16 A body subjected to strain several times will not obey Hooke’s law due to [Punjab PMET] (a) yield point (b) permanent state (c) elastic fatigue (d) breaking stress
Answers 1 (b) 11 (c)
2 (a) 12 (b)
3 (d) 13 (d)
4 (c) 14 (b)
5 (d) 15 (b)
6 (a) 16 (a)
7 (c)
8 (b)
9 (c)
10 (a)
215
MECHANICAL PROPERTIES OF SOLIDS
Explanations 1 (b) The stress-strain curve for a material is shown in figure Stress
O
Elastic Ultimate D strength point B limit C A E Fracture point Plastic behaviour Elastic behaviour Strain
This curve specifies the behaviour of material. For the material X, as the distance between strength point X and fracture point is small, so it is brittle and will break easily on the application of some extra stress after point D. For material Y, as the distance between strength point and fracture point is large, so it is a ductile material and can withstand for some extra stress beyond point D.
2 (a) According to Hooke’s law, stress is found proportional to strain in the given curve upto point A, which is known as point of proportional limit. Material in this region OA shows the elastic behaviour (material regains its original dimension only when load applied is less than or equal to certain elastic limit).
3 (d) Longitudinal stress = Y α∆T where, ∆T = change in temperature, α = coefficient of linear thermal expansion and Y = Young’s modulus of its material. So, the longitudinal stress developed in the rod is directly proportional to Y ⋅ ∆T and independent of length.
4 (c) Soft steels are highly ductile and malleable compared to hard steels which are brittle. Hence, hard steels have very small range of plastic extensions compared to ductile materials in stress-strain curve. The rise in temperature of the soft steel means transferring energy into a system by work which appears as an increase in the internal energy of the system. The softness results in a deformation of the steel under blow of the hammer. Thus, the point of application of the force is displaced by the hammer and positive work is done on the steel. With the hard steel, less
deformation occurs, (as it is less ductile) thus there is less displacement of point of application of the force. As soft steel is better in absorbing energy from hammer, hence its temperature rises rapidly.
5 (d) Given, Poisson’s ratio, σ = 0.50 Longitudinal strain, ∆L = 2 × 10−3 L As Poisson’s ratio, Lateral strain −∆D / D σ= = Longitudinal strain ∆L / L ∆L ⇒ ∆D / D = − σ × L = −0.5 × 2 × 10− 3 = −1 × 10−3 Change in volume, ∆V 2∆R ∆L [QV = πR 2L] = + V R L ∆V 2∆D ∆L ⇒ = + V D L = −2 × 1 × 10−3 + 2 × 10−3 =0 ∴% change in volume is zero.
6 (a) The fractional change in the transverse length is proportional to the fractional change in the longitudinal length. The constant of proportionality is called Poisson’s ratio. In terms of Young’s modulus and rigidity modulus, it is given by ∆d / d Y σ=− = −1 ∆L / L 2η Given , Y = 2.4 η 2.4 η ∴ σ= − 1 = 0.2 2η
7 (c) Initial length of the rod, Lt = L0 (1 − α∆θ ) ⇒ ∆L = Lt − L0 = L0α∆θ …(i) If the same rod of length L0 is subjected to stress along its length, then extension in length can be calculated by Hooke’s law. stress stress L × stress Y= = = 0 strain ∆L / L0 ∆L L0 × stress …(ii) ∆L = ∴ Y If the rod is prevented from expanding, we have L × stress L0α∆θ = 0 Y ∴ Stress = Yα∆θ (independent of L0 )
8 (b) Poisson’s ratio σ is the ratio of fractional change in diameter to fractional change in length. ∆r / r … (i) Thus, σ= ∆l / l where, r is the radius of the wire. ∆r ∆l Given, = 0.2 and = 0.4 r l Putting these values in Eq. (i), we get 0.2 ∴ σ= 0.4 = 0.5
9 (c) Thermal stress = Y × Strain or S = Yε = Yαt where, α = coefficient of linear thermal expansion and Y = Young’s modulus. Given, S1 = S2 ⇒ Y1α 1t = Y2α 2t Y1 α 2 3 [Q α 1 : α 2 = 2 : 3] = = ⇒ Y2 α 1 2 Thus, Y1 : Y2 = 3 : 2
10 (a) Poisson’s ratio, σ=
Lateral strain ∆R / R =− Longitudinal strain ∆l / l
dD / D [where, D = diameter] dl / l Let D be the diameter and V be the volume. Then, …(i) V = πD 2L / 4 =
There is no change in volume. Differentiating Eq. (i), π 2D πD 2 ∴ 0= dDL + dL 4 4 (dD / D ) = − 0.5 ⇒ (dL / L) ∴ Poisson’s ratio, σ = 0.5
11 (c) Poisson’s ratio, σ=
Lateral strain Longitudinal strain
Given, σ = 0.5 and longitudinal strain = 0.03 ∴ Lateral strain = 0.5 × 0.03 = 0.015
12 (b) Poisson’s ratio,
Lateral strain ∆R / R =− Longitudinal strain ∆l / l ∆R l σ=− × R ∆l σ=
216
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
∆R l × R ∆l ∆R ∆l ∴ = |σ| l R Given, d = 2 mm, 01 . ∆l = 01 . %= 100 l and σ = 0.5 2 × 10−3 01 . × ⇒ ∆R = 0.5 × 100 2 = 0.0005 mm ∴ Final radius = R − ∆R = 1 mm − 0.0005 mm = 0.9995 mm Final diameter = 2 × 0.9995 mm = 1.9990 mm or
|σ| =
13. (d) In case of steel wire or metal wire,
14 (b) Out of the given substances, steel
for elastic limit to reach none of the above three options are correct. Elastic limit means the maximum value of strain for which a body shows elastic property. In Hooke’s law, a proportionality exists between stress and only small strains. Iron is a ductile material, it has a widely separated fracture point (the point where the wire breaks) from the elastic limit. Moreover elongation is directly proportional to the tension, hence none of the options are correct. It can be explained with the help of stress-strain curve also.
has greater value of stress-strain ratio. Therefore, steel has highest elasticity.
15 (b) We know that, relation between Y and G, Y = 2G (1 + σ ) Y Y G= ⇒G= (Q σ max = 0.5) 2(1 + σ ) 3
16 (a) When a body is subjected to strain several times, then its length goes on increasing rapidly, i.e. the material of body flows like a viscous fluid and it acquires yield point after which it does not obey Hooke’s law.
Topic 4 Elastic Potential Energy Stored in a Stretched Wire 2010 1 Wires A and B are made from the same material. A has twice the diameter and three times the length of B. If the elastic limits are not reached, when each is stretched by the same tension, the ratio of energy stored in A to that in B is (a) 2 : 3 (b) 3 : 4 (c) 3 : 2 (d) 6 : 1 [BVP]
2008 2 When a metal wire elongates by hanging a load Mg on it, the gravitational potential energy of mass M decreases by [Manipal] Mgl. This energy appears (a) as elastic potential energy completely (b) as thermal energy completely (c) half as elastic potential energy and half as thermal energy (d) as kinetic energy of the load completely
2007 3 If the tension on a wire is removed at once, then
5 If in a wire of Young’s modulus Y , longitudinal strain X is produced, then the potential energy stored in its unit volume will be [MHT CET] 2 2 2 (d) YX 2 (a) 0. 5YX (b) 0.5 Y X (c) 2YX
2006 6 Young’s modulus of the material of a wire is Y . On pulling the wire by a force F, the increase in its length is x. The potential energy of the stretched wire is [BHU] 1 1 1 2 (b) Yx (c) Fx (d) None of these (a) Fx 2 2 2
2005 7 The energy stored per unit volume in copper wire, which produces longitudinal strain of 0.1% is (take, Y = 1. 1 × 1011 Nm −2 ) 3
[AFMC]
(a) it will break (b) its temperature will reduce (c) there will be no change in its temperature (d) its temperature increases
4 A wire is suspended by one end. At the other end, a weight equivalent to 20 N force is applied. If the increase in length is 1 mm, the increase in the energy of the wire will be [BHU] (a) 0.01 J (b) 0.02 J (c) 0.04 J (d) 1.00 J
−3
(a) 11 × 10 Jm (c) 5. 5 × 104 Jm −3
[MHT CET] 3
−3
(b) 5. 5 × 10 Jm (d) 11 × 104 Jm −3
8 Two wires of same material and same diameter have lengths in the ratio 2 : 5. They are stretched by same force. The ratio of work done in stretching them is [EAMCET] (a) 5 : 2 (b) 2 : 5 (c) 1 : 3 (d) 3 : 1 9 A 1 m long steel wire of cross-sectional area 1 mm 2 is extended by 1 mm. If Y = 2 × 1011 Nm −2 , then the work done is [DUMET] (a) 0.1 J (b) 0.2 J (c) 0.3 J (d) 0.4 J
MECHANICAL PROPERTIES OF SOLIDS
Answers 1 (b)
2 (c)
3 (d)
4 (a)
5 (a)
6 (a)
7 (c)
8 (b)
9 (a)
Explanations F 2L 1 FL Q l = 2 AY 2 AY L U ∝ 2 (F and Y are constant) ⇒ r Given, LA = 3LB and rA = 2rB
1 (b) As, U = Fl =
⇒
U A LA rB = × U B LB rA
2
∴
−3
l = 1mm = 1 × 10 m ⇒ ∆U =
1 × 20 × 1 × 10−3 = 0.01 J 2
5 (a) Elastic potential energy per unit
2 (c) When a metal wire elongates by hanging a load Mg on it. Decrease in potential energy of the load = Mgl, where l = elongation in metal wire. Elastic potential energy stored in 1 stretched wire = × Mgl 2 1 Difference of Mgl and Mgl appears 2 as thermal energy in the stretched wire. ∴ Energy appearing as thermal energy 1 = Mgl − Mgl 2 1 = Mgl 2
3 (d) Due to tension, intermolecular distance between atoms is increased and therefore potential energy of the wire is increased and with the removal of force, interatomic distance is reduced and so, it decreases the potential energy. This change in potential energy appears as heat in the wire thereby increasing its temperature.
4 (a) Increase in energy, ∆U 1 1 Fl = wl 2 2
(Q F = w)
1 l2 Work done, W = YA L 2 Ratio of work done,
Given, strain = X and Young’s modulus = Y ⇒ Stress = YX 1 U = YX 2 ∴ 2 U = 0.5 YX
2
W 1 l1 L2 = ⋅ W 2 l2 L1 2
2
6 (a) When a wire is stretched through a length, then work has to be done, this work is stored in the wire in the form of elastic potential energy. Potential energy of stretched wire is 1 U = Fx 2
7 (c) Elastic potential energy per unit volume of the wire, 1 U = × stress × strain 2 1 = × (Young’s modulus 2 × strain) × strain 1 = × (Y ) × (strain)2 2 Given, Y = 11 . × 1011 Nm −2 01 . and strain = 01 . %= 100
2
YA ⋅l L Here, both wires are of same material (i.e. same Y ), same diameter (i.e. same A) and are stretched by same force. l1 l So, = 2 L1 L2 2 l1 L1 = = ∴ 5 l2 L2
1 × stress × strain 2 From definition of Young’s modulus of wire, stress Y= strain ⇒ Stress = Y × Strain
⇒
1 0.1 × 11 . × 1011 × 100 2
8. (b) Stretching force, F =
U =
3 1 =3× = 2 4
U =
= 5. 5 × 104 Jm −3
volume,
2
=
Given, w = 20 N,
9
2 5 2 = ⋅ = 5 2 5 = 2: 5 F/A (a) Young’s modulus, Y = l/ L YA F= l ⇒ L Now, work done W = ∫ dW = ∫ F × dl 1 l2 … (i) l dl = YA L L 2 Given, A = 1 mm 2 = 10−6m, l = 1mm =∫
l YA
0
= 10−3 m, Y = 2 × 1011 Nm −2 and L = 1 m Putting these values in Eq. (i), we get 1 ∴ W = × 2 × 1011 × 10−6 × (10−3 )2 2 = 0.1 J
09 Mechanical Properties of Fluids Quick Review • The basic property of a fluid is that it can flow. • The fluid does not have any resistance to change of its
shape. Thus, the shape of a fluid is governed by the shape of its container.
Fluid Pressure • Pressure exerted by the fluid on the bottom and walls of
• •
• •
water bodies is called fluid pressure which is expressed as p total = p 0 (atmospheric pressure) + ρgh. where, atmospheric pressure ( p 0 ) = pressure exerted by the earth’s atmosphere. Gauge pressure is the excess pressure above the atmospheric pressure. Absolute pressure is the net pressure or sum of atmospheric pressure and gauge pressure. It is expressed as Absolute pressure = Gauge pressure + Atmospheric pressure. The pressure difference between the two points in a liquid column, ∆p = hdg. If a block of mass ( m ) and area ( A ) floats over fluid surface, fluid pressure at the base of the vessel is expressed as mg p = p 0 + ρgh + A where, h = height of the liquid and ρ = density of liquid.
Density and Relative Density • Density of a substance is defined as mass per
unit volume of the substance. It is expressed as Mass ( m ) Density, ρ = Volume (V )
• Relative density or specific gravity of a
substance is the ratio of density of liquid or substance to density of water at 4°C. • If two liquids of densities ρ1 and ρ 2 having masses m1 and m2 , respectively are mixed together, then the density of mixture is given by m1 + m2 ρ= m1 m2 + ρ1 ρ 2 If m1 = m2 , then ρ=
2ρ1ρ 2 = Harmonic mean of ρ1 and ρ 2 . ρ1 + ρ 2
• If two liquids of densities ρ1 and ρ 2 having
volumesV1 and V2 are mixed, then the density of the mixture is given by ρ V + ρ 2V2 ρ= 1 1 V1 + V2 If V1 = V2 , then ρ + ρ2 ρ= 1 = Arithmetic mean of ρ1 and ρ 2 . 2
219
MECHANICAL PROPERTIES OF FLUIDS
Pascal’s Law
Bernoulli’s Theorem
This law states that, pressure applied to an enclosed fluid is transmitted undiminished to every point of the fluid and the walls of the containing vessel.
Archimedes’ Principle According to this principle, the loss of weight of a body submerged in a fluid is equal to the weight of the fluid displaced, which can be expressed as ρ s gVs = ρ f gV p where ρ s , ρ f are densities of body and fluid respectively and Vs and V p are volume of body and part submerged respectively.
Flow of Fluids • If the velocity of fluid particles at any time does not vary
with time, the flow is said to be steady or streamline flow. The path followed by a fluid particle is known as streamlines. • Velocity of particles in streamline is along the tangent to the curve at that point. • The flow of fluid in which velocity of all particles crossing a given point is not same and the motion of the fluid is irregular is called turbulent flow. • If the liquid flows over a horizontal surface in the form of layers of different velocities, then the flow of liquid is called laminar flow.
Equation of Continuity • When an incompressible fluid flows in streamlined
• It is a general expression relating pressure difference
between two points in a pipe to both KE change (velocity changes) and PE change. • It states that the sum of pressure energy per unit volume, kinetic energy per unit volume and potential energy per unit volume of an incompressible, non-viscous fluid in a streamlined irrotational flow remains constant at every cross-section throughout the liquid flow. • Bernoulli’s equation is given by 1 p + ρv 2 + ρgh = constant 2 where, p = pressure, 1 2 ρv = kinetic energy per unit volume 2 and ρgh = potential energy per unit volume. • If the fluid is flowing through a horizontal tube, two ends
of the tube are at the same level. i.e., h = 0. 1 p + ρv 2 = constant 2 For fluid at rest, p1 − p 2 = ρg ( h2 − h1 )
Applications Based on Bernoulli’s Theorem • Venturimeter is a device (based on Bernoulli’s theorem)
used to measure flow speed in a pipe. The pressure difference in this device is measured as A2 1 p1 − p 2 = ρv12 12 − 1 2 A2
motion through a non-uniform cross-section, then mass flow rate is same at every section of the tube.
• It can be expressed as
Av = constant
where, A = area of cross-section and v = velocity of flow. 1 or v∝ A • Generalised continuity equation for liquids having densities ρ1 and ρ2 can be expressed as ρ1 A1 v1 = ρ2 A 2 v 2 where, A1 , A 2 = areas of non-uniform cross-sections of a tube and v1 , v 2 = velocities of flow across A1 and A 2 .
and velocity of flow, v1 =
2gh 2
A1 −1 A2
h
p1
p2 1
v1
v2
2 A2
A1
[Q p1 − p 2 = hρg ]
220
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
• Velocity of Efflux It is the velocity of the liquid coming
out from the side of a container through a small hole is given by v = 2gh
Terminal Velocity Terminal velocity is the maximum constant velocity with which a small sphere falls from rest through a large column of viscous liquid. It is expressed as vT =
h √2
(H–h)
v=
H
gh
where, h = depth of the hole below the free surface. • The time taken by the liquid to reach the base level in above case is given by 2 (H − h ) t= g where, H = height of free surface from bottom initially.
Viscous Force or Viscosity • The internal frictional force in a fluid which opposes the
relative motion between the two layers of the fluid is known as viscous force. The tendency of fluids to oppose the relative motion of its layers is called viscosity of fluid. dv Viscous force, F = − ηA dy where,
and
η = coefficient of viscosity, A = area of layer of fluid in contact dv = velocity gradient between the layers. dy
where, r = radius of the body, ρ = density of material of the body, σ = density of fluid and η = coefficient of viscosity.
Reynolds’ Number The onset of turbulence in a fluid is determined by a dimensionless parameter called the Reynolds’ number which is given by ρvd Re = η where, d is a typical geometrical length associated with the fluid flow and the other symbols have their usual meanings.
Poiseuille’s Formula It relates the volume of liquid coming out through capillary tube with other parameters of capillary, π pR 4 V= 8ηL where,
• The viscosity of fluids decrease with increase in
temperature and vice-versa.
• The viscosity of gases increase with increase in
temperature.
Critical Velocity The limiting value of velocity of flow of liquid upto which the flow is streamlined and above which the flow becomes turbulent is called critical velocity. kη Critical velocity, vC = ρr
Stokes’ Law It states that, the viscous drag force F on a sphere of radius r moving with velocity v through a fluid of viscosity is F = 6πη rv
2 r 2 (ρ − σ )g η 9
and
V = volume of liquid coming out from the tube per second, L = length of the capillary tube, R = radius of the capillary tube, p = pressure difference across the tube η = coefficient of viscosity.
Surface Tension • Surface tension is the property of liquid at rest by virtue
of which a liquid surface tends to occupy a minimum surface area and behaves like a stretched membrane. • Surface tension can be defined as the force acting per unit length of an imaginary line drawn on the liquid surface. Direction of this force is perpendicular to the line and tangential to the liquid surface. F T= L where, F = force acting on one side of imaginary line of length L.
221
MECHANICAL PROPERTIES OF FLUIDS
• Force due to Surface Tension On different bodies
having different shapes are shown in the table given below Body having Different Shapes
Force Required to Lift a Body from the Surface of Water
A thin wire
F = T × 2l where, l = length of a thin wire and T = surface tension. F = 2T (l + b) where, l , b = length and breadth of rectangular plate.
A rectangular plate
F = T × 2πr where, r = radius of the plate or disc.
A circular plate or disc
Ring
F = 2π (r1 + r2 )T where, r1 and r2 = inner and outer radii.
Two glass plates of area A, containing a liquid film of thickness d between them.
F=
2TA d
Surface Energy The surface energy may be defined as the amount of work done in increasing the area of the surface film through unity. It is expressed as Surface energy =
Work done in increasing surface area Increase in surface area
Different cases of work done by droplets or soap bubbles (i) Work done to increase the area of surface film by A is W =T × A (ii) Work done in blowing a soap bubble of radius r W = 8πr 2T (iii) Work done in splitting a big liquid drop of radius R into n small identical drops of radius r W = 4πTR 2 ( n1/ 3 − 1) (iv) Work done in combining n small identical drops of radius r to form a big drop of radius R W = 4πT ( nr 2 − R 2 )
Excess Pressure • It is the difference of pressure between two sides of the
liquid surface in a drop or bubble due to surface tension. • Different cases of excess pressure in liquid drop and soap bubbles are given in tabular form below Different Cases
Excess Pressure
In a liquid drop of radius r
2T r where, T = surface tension of liquid drop 4T p= r 2T p= r p=
A soap bubble of radius r Soap bubble of radius r, when it is inside a liquid
• Different cases where droplets or soap bubbles
coalesce given below (i) If two droplets of radii r1 and r2 in vacuum coalesce under isothermal conditions, then the radius of the big drop is given by r = 3 r13 + r23 (ii) If two soap bubbles of radii r1 and r2 ( r1 > r2 ) are in contact with each other, then the radius of curvature of their interface is given by rr r= 1 2 r1 − r2 (iii) If two soap bubbles of radii r1 and r2 combine in vacuum to form a single bubble of radius r under isothermal condition, then r = r12 + r22 (iv) The radii of the two limbs of a U-tube are r1 and r2 . A liquid of density ρ and surface tension T is poured in it. The difference between the levels of the liquid is given by 2T 1 1 h= − ρg r1 r2
Angle of Contact • It is the angle between the tangent to the liquid surface
at the point of contact and the solid surface inside the liquid. • If angle of contact is acute, then liquid’s surface is concave. • If angle of contact is obtuse, then liquid surface in capillary tube is convex.
222
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
• The liquids for which angle of contact is obtuse, falls in
Capillarity • The phenomena of rise or fall of a liquid in the capillary
is called capillarity.
• Capillary rise or fall of a liquid,
h=
2T cos θ rρg
where, h = height of liquid column in capillary, T = surface tension of the liquid, g = acceleration due to gravity, θ = angle of contact and
r = radius of the capillary tube & ρ is the density of the liquid.
• Weight of the water in capillary tube
= mg = 2πrT cos θ • Using capillary tube, surface tension of liquid which wets solid, can be determined by the formula hrρg T= 2cos θ
the capillary (do not rise). • A capillary tube is vertically dipped in a liquid. The height of the liquid in tube is h and the total set up is kept in a lift, then (i) If lift is moving up with acceleration a, then height of the liquid in the tube, h1 = h ( g / g + a ). (ii) If lift is moving down with acceleration a, then height of the liquid in the tube, h1 = h ( g / g − a ). • A capillary tube is vertically dipped in a liquid. The height of the liquid in tube is h, then (i) If total set up is taken to height H above the ground, then the height of the liquid in the tube, hR h1 = R − 2H (ii) If total set up is taken to depth d below the ground, then the height of the liquid in tube, hR h1 = R−d where, R = radius of the earth.
Topical Practice Questions All the exam questions of this chapter have been divided into 6 topics as listed below Topic 1
—
FLUID PRESSURE AND DENSITY
223–224
Topic 2
—
PASCAL’S LAW AND ARCHIMEDES’ PRINCIPLE
224–229
Topic 3
—
FLUID FLOW, BERNOULLI’S THEOREM AND STOKES’ LAW
230–237
Topic 4
—
SURFACE TENSION AND SURFACE ENERGY
238-241
Topic 5
—
EXCESS PRESSURE (PRESSURE DIFFERENCE)
241-243
Topic 6
—
ANGLE OF CONTACT AND CAPILLARITY
243-245
Topic 1 Fluid Pressure and Density 2015 1 The approximate depth of an ocean is 2700 m. The
compressibility of water is 45.4 × 10−11 Pa −1 and density of water is 103 kg / m 3 . What fractional compression of water will be obtained at the bottom of the ocean? [AIPMT] (a) 0.8 × 10−2 (b) 1.0 × 10−2 −2 (c) 1.2 × 10 (d) 1.4 × 10−2
2014 2 A bubble is at the bottom of the lake of depth h. As the bubble comes to sea level, its radius increases three times. If atmospheric pressure is equal to l metre of water column, then h is equal to [UK PMT] (a) 26 l (b) l (c) 25 l (d) 30 l
2012 3 4 m 3 of water is to be pumped to a height of 20 m and forced into a reservoir at a pressure of 2 × 105 N/m 2 . The work done by the motor is [UP CPMT] (external pressure = 105 N/ m 2 ) (a) 8 × 105 J (c) 12 × 105 J
(b) 16 × 105 J (d) 32 × 105 J
6 A closed compartment containing gas is moving with some acceleration in horizontal direction. Neglect effect of gravity. Then, the pressure in the compartment is [JCECE] (a) same everywhere (b) lower in front side (c) lower in rear side (d) lower in upper side
2008 7 A common hydrometer reads specific gravity of liquids. Compared to the 1.6 mark of the stem, the mark 1.5 will be (a) upwards [AMU] (b) downwards (c) in the same place (d) may be upward or downward depending upon the hydrometer
2006 8 By sucking through a straw, a student can reduce the pressure in his lungs to 750 mm of Hg. Using the straw, he can drink water from a glass upto a maximum depth of (density = 13.6 gcm −3 ) [AIIMS] (a) 10 cm (b) 75 cm (c) 13.6 cm (d) 1.36 cm
2005 9 From the figure given below, the correct observation is
2011 4 A cubical vessel of height 1 m is full of water. What is the amount of work done in pumping water out of the vessel? (Take, g = 10 ms −2 ) [WB JEE] (a) 1250 J (b) 5000 J (c) 1000 J (d) 2500 J
2010 5 Three liquids of equal masses are taken in three identical
cubical vessels A , B and C. Their densities are ρ A , ρ B and ρC , respectively but ρ A < ρ B < ρC . The force exerted by the liquid on the base of the cubical vessel is [KCET] (a) maximum in vessel C (b) minimum in vessel C (c) the same in all the vessels (d) maximum in vessel A
Water
Water
A
B
[KCET]
(a) the pressure on the bottom of tank A is greater than at the bottom of B (b) the pressure on the bottom of the tank A is smaller than at the bottom of B (c) the pressure depends on the shape of the container (d) the pressure on the bottom of A and B is the same 10 An adulterated sample of milk has a density of 1032 kgm −3 , while pure milk has a density of 1080 kgm −3 . The volume of pure milk in a sample of 10 L of adulterated milk is [JCECE] (a) 0.5 L (b) 1 L (c) 2 L (d) 4 L
Answers 1 (c)
2 (a)
3 (c)
4 (b)
5 (c)
6 (b)
7 (a)
8 (c)
9 (d)
10 (d)
224
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations = 8 × 105 + 4 × 105 = 12 × 105 J
m2 = mass on front size. Consequently, the pressure in the front side would be lowered.
4 (b) The volume of water contained in
7 (a) In hydrometer, lower density mark
= Vρgh + ∆pV = 4 × 103 × 10 × 20 + (2 × 105 − 1 × 105 ) × 4
1 (c) Given, d = 2700 m, ρ = 103 kg/m 3 Compressibility = 45.4 × 10−11 per pascal The pressure at the bottom of an ocean is given by p = ρgd = 103 × 10 × 2700 = 27 × 106 Pa So, fractional compression = compressibility × pressure = 45.4 × 10−11 × 27 × 106 = 1.2 × 10−2
the vessel would be equal to V = l 3 = (1m)3 = 1m 3. Assuming water to be pure, so the density of water would be equal to d = 1000 kg/m 3, hence the mass of water contained in the vessel would be equal to m = Vd = 1000 kg. Thus, the work done would be equal to 1 W = mgh = 1000 × 10 × = 5000 J 2 Here, h is the height of centre of mass from the bottom of vessel.
2 (a) Assuming temperature constant. As from the Boyle’s law, pV = constant So, from the two cases at h depth and at the surface, ...(i) p1V1 = p2V2 where, p1 = pressure at h depth, V1 = volume at h depth, p2 = pressure at surface and V2 = volume at surface. 4 ⇒ p1 = (h + l ) ρg, V1 = πr3 3 4 p2 = lρg, V2 = π(3r)3 3 Putting these values in Eq. (i), we get So, (h + l ) = 27l ⇒ h = 26 l
is upwards and higher density mark is downwards.
8 (c) Pressure difference between lungs of student and atmosphere = (760 − 750) mm of Hg. Water pressure = Atmospheric pressure i.e. hdg = 10 mm of Hg = 1cm of Hg or h × 1 = 1 × 13.6 = 13.6 cm
9 (d) Pressure applied by liquid column, p = hdg i.e. the pressure depends on the height of liquid column not on its size or shape, so pressure at the bottom of A and B is the same.
5 (c) Force exerted by the liquid on the base of the vessel is F = mg ⇒ F ∝m Here, mA = mB = mC ∴ FA = FB = FC
10 (d) Mass of adulterated milk,
M A = 1032 × 10 × 10−3 = 10.32 kg
⇒ Mass of water = ρ wVw = M A − M P where, M P = mass of pure milk. ⇒103 (10 × 10−3 − VP )
6 (b) The pressure on the rear side would be more due to fictitious force (acting in the opposite direction of acceleration) on the rear face. On application of force, Since m1 > m2, hence pressure ( p = F / A = mg / A ) is more on rear side. where, m1 = mass on rear side,
3 (c) Work done by motor = Change in gravitational potential energy + Work done against external pressure = mgh + ∆pV [Q W = F ⋅ d = ∆pAd = ∆pV ]
= 10.32 − 1080VP ⇒ 10 − 103VP = 10.32 − 1080VP ⇒ ⇒
80VP = 0.32 0.32 VP = × 1000 = 4 L 80
Topic 2 Pascal’s Law and Archimedes’ Principle 2019 1 In a U-tube as shown in the figure, water and oil are in the left side and right side of the tube, respectively. The heights from the bottom for water and oil columns are 15 cm and 20 cm, respectively. The density of the oil is (take, ρ water = 1000 kg/m 3 ) [NEET (Odisha)]
2018 2 Find density of ethyl alcohol.
10 cm Water
[JIPMER]
12 cm Ethyl alcohol
Hg
15 cm
Water
20 cm
Oil
(a) 1200 kg/m 3 (c) 1000 kg/m 3
(b) 750 kg/m 3 (d) 1333 kg/m 3
(a) 0.83 gcm −3 (b) 0.5 gcm −3 −3 (c) 1.83 gcm (d) 0.12 gcm −3 3 A solid floats with 1/4 th of its volume above the surface of water, the density of the solid is [JIPMER] (a) 750 kg m −3 (b) 650 kg m −3 (c) 560 kg m −3 (d) 450 kg m −3
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MECHANICAL PROPERTIES OF FLUIDS
2017 4 An ice-berg of density 900 kgm − 3 is floating in water
of density 1000 kgm − 3 . The percentage of volume of ice-berg outside the water is [JIPMER] (a) 20% (b) 35% (c) 10% (d) 11%
5 A U-tube with both ends open to the atmosphere, is partially filled with water. Oil, which is immiscible with water, is poured into one side until it stands at a distance of 10 mm above the water level on the other side. Meanwhile the water rises by 65 mm from its original level (see diagram). The density of the oil is [NEET] Pa
Pa F
A 65 mm Oil
E
10 mm Final water level
D
Initial water level
65 mm B
C Water
(a) 650 kg m −3 (c) 800 k g m −3
(b) 425 kg m −3 (d) 928 kg m −3
2016 6 Two non-mixing liquids of densities ρ and nρ (n > 1) are put in a container. The height of each liquid is h. A solid cylinder of length L and density d is put in this container. The cylinder floats with its axis vertical and length pL (p < 1) in the denser liquid. The density d is equal to (a) {2 + ( n + 1) p}ρ (b) {2 + ( n − 1) p}ρ [NEET] (c) {1 + ( n − 1) p}ρ (d) {1 + ( n + 1) p}ρ
2014 7 A wooden block is floating on water kept in a beaker. 40% of the block is above the water surface. Now, the beaker is kept inside a lift that starts going upward with acceleration equal to g / 2. The block will then [WB JEE] (a) sink (b) float with 10% above the water surface (c) float with 40% above the water surface (d) float with 70% above the water surface
2013 8 A body floats with one-third of its volume outside water and 3 / 4 of its volume outside another liquid. The density of other liquid is [WB JEE] 9 4 8 3 (b) g /cc (c) g /cc (d) g /cc (a) g /cc 4 9 3 8
9 A 10 cm 3 cube floats in water with a volume of 4 cm 3 remaining above the surface. The density of the material from which the cube is made, is [Manipal] (a) 0. 6 g cm −3 (b) 1g cm −3 (c) 0. 4 g cm −3 (d) 0. 24 g cm −3
2011 10 A stone of relative density K is released from rest on the surface of a lake. If viscous effects are ignored, the stone sinks in water with an acceleration of [WB JEE] (a) g (1 − K ) (b) g (1 + K ) 1 1 (c) g 1 − (d) g 1 + K K
11 A hydraulic system is used to lift a 2000 kg vehicle in an auto-garage. If the vehicle is kept on a piston of area 0.55m 2 and a force is applied to a piston of area 0.03m 2 . What is the minimum force that must be applied to lift the vehicle? (a) 1160N (b) 2000N (c) 2010N (d) 1069N 12 A body floats in water with 40% of its volume outside water. When the same body floats in an oil, 60% of its volume remains outside oil. The relative density of oil is (a) 0.9 (b) 1 [WB JEE] (c) 1.2 (d) 1.5 4 13 A block of wood floats in water with th of its volume 5 submerged. If the same block just floats in a liquid, the density of the liquid is (in kgm −3 ) [Kerala CEE] (a) 1250 (b) 600 (c) 400 (d) 800 (e) 750
2010 14 A liquid X of density 3.36 g/cm 3 is poured in a U-tube in right arm with height 10 cm, which contains Hg. Another liquid Y is poured in left arm with height 8 cm. Upper levels of X and Y are same. What is the density of Y ? Y 8 cm
(a) 0.8 g/cc (c) 1.4 g/cc
[Manipal]
X 10 cm
(b) 1.2 g/cc (d) 1.6 g/cc
2009 15 Assertion (A) A ship floats higher in the water on a high pressure day than on a low pressure day. Reason (R) Floating of ship in the water is not possible because of buoyancy force which is present due to pressure difference. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) A is correct but R is incorrect (d) Both A and R are incorrect
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2008 16 A body floats in water with one-third of its volume above the surface of water. If it is placed in oil, it floats with half of its volume above the surface of the oil. The specific gravity of the oil is [Kerala CEE] 5 4 3 (a) (b) (c) (d) 1 3 3 2 (e) 3/ 4
17 An ice block floats in a liquid whose density is less than water. A part of block is outside the liquid. When whole of ice has melted, the liquid level will [AMU] (a) rise (b) go down (c) remain same (d) first rise then go down 18 A body weighs 50 g in air and 40 g in water. How much would it weigh in a liquid of specific gravity 1.5? [KCET] (a) 30 g (b) 35 g (c) 65 g (d) 45 g 19 A cube made of material having a density of 0. 9 × 103 kgm −3 floats between water and a liquid of density 0.7 × 103 kgm −3 , which is immiscible with water. What part of the cube is immersed in water? [Manipal] 1 2 3 3 (a) (b) (c) (d) 3 3 4 7 2007 20 Assertion (A) Taking into account the fact that any object which floats must have an average density less than that of water, during world war I, a number of cargo vessels were made of concrete. [AIIMS] Reason (R) Concrete cargo vessels were filled with air. (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) A is correct but R is incorrect (d) Both A and R are incorrect
2006 21 A block of wood weight 4 N in air and 3 N, when immersed in a liquid. The buoyant force (in newton) is [Kerala CEE] 3 4 (d) (a) zero (b) 1 (c) 4 3 (e) 7
22 A large ship can float but a steel needle sinks because of
24 A ball whose density is 0.4 × 103 kgm −3 falls into water from a height of 9 cm. To what depth does the ball sink? [EAMCET] (a) 9 cm (b) 6 cm (c) 4.5 cm (d) 2.25 cm 25 A rectangular block is 5 cm × 5 cm × 10 cm in size. The block is floating in water with 5 cm side vertical. If it floats with 10 cm side vertical, what change will occur in the level of water? [MHT CET] (a) No change (b) It will rise (c) It will fall (d) It may rise or fall depending on the density of block 26 A block of wood is floating in water with fraction x of the total volume immersed inside. If water is now heated from 0°C to 10°C, the floating fraction x will [MP PMT] (a) increase (b) decrease (c) remain same (d) first decrease and then increase 27 An open U-tube contains mercury. When 11.2 cm of water is poured into one of the arms of the tube, how high does the mercury rise in the other arm from its initial level? (a) 0.56 cm (b) 1.35 cm [BCECE] (c) 0.41 cm (d) 2.32 cm
2005 28 A ball is floating on the surface of water with half the volume submerged. If the ball has a radius of 12 cm, what is the buoyancy force on the ball due to water? [AIIMS] (a) 33 N (b) 35 N (c) 25 N (d) 40 N
29 A candle of diameter d is floating on a liquid in a cylindrical container of diameter D ( D >> d ) as shown in figure. If it is burning at the rate of 2 cm h −1 , then the top of the candle will [AIIMS] L L d
[Punjab PMET]
(a) viscosity (c) density
(b) surface tension (d) None of these
23 If there were no gravity, which of the following will not be there for a fluid? [KCET] (a) Viscosity (b) Surface tension (c) Pressure (d) Archimedes’ upward thrust
D
(a) remain at the same height (b) fall at the rate of 1 cmh −1 (c) fall at the rate of 2 cmh −1 (d) go up at the rate of 1 cmh −1
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MECHANICAL PROPERTIES OF FLUIDS
Answers 1 (b) 11 (d) 21 (b)
2 (a) 12 (d) 22 (d)
3 (a) 13 (d) 23 (d)
4 (c) 14 (a) 24 (b)
5 (d) 15 (d) 25 (a)
6 (c) 16 (b) 26 (d)
7 (b) 17 (b) 27 (c)
8 (c) 18 (b) 28 (b)
9 (a) 19 (b) 29 (b)
10 (c) 20 (b)
Explanations 1 (b) According to Pascal’s law ‘‘Pressure applied to an enclosed fluid is transmitted undiminished to every point of the fluid and the walls of the containing vessel.’’ In the given situation as shown in the figure below
20 cm
15 cm
Water
Oil
Pressure due to water column of height 15 cm = Pressure due to oil column of height 20 cm ⇒ hwρw g = hoρo g 15 15ρw = 20ρo ⇒ ρo = ρw 20 15 ⇒ ρo = × 1000 20 (Q given, ρw = 1000 kg m −3) = 750 kgm −3
2 (a) Pressure at left hand of a U-tube,
p1 = p0 + ρ 1gh1 = p0 + ρ 110 (10 × 10−2 )
or p1 = p0 + ρ 1 Pressure at right hand of a U-tube, p2 = p0 + ρ 2gh2 = p0 + ρ 2 10 (12 × 10−2 ) or p2 = p0 + 12 . ρ2 The mercury column in both arms of U-tube are at same level, therefore pressure in both arms will be same. or p1 = p2 ⇒ p0 + ρ 1 = p0 + 12 . ρ2 ∴ Density of ethyl alcohol, 1000 ρ = 833.3 kgm −3 ρ2 = 1 = 12 . 12 . = 0.83 gcm −3
3 (a) Let V and ρ be volume and density of solid respectively and ρ′ be the density of water, i.e. ρ′ = 103 kgm−3 Weight of body = Vρg Volume of solid body outside water = V /4
∴Volume of solid body inside water = V − V / 4 = 3V / 4 Weight of water displaced by solid 3V = × 103 × g 4 As solid body is floating, then Weight of body = Weight of water displaced by it 3V Vρg = × 103 g 4 3 ⇒ ρ = × 1000 = 750 kg m −3 4
4 (c) Let the volume of ice-berg is V and its density is ρ. If this ice-berg floats in water with volume Vin inside it, then Vin σg = Vρg ρ ⇒ Vin = V σ σ − ρ ⇒Vout = V − Vin = V σ V 1000 − 900 = V = 1000 10 ⇒
Vout = 01 . = 10% V
5 (d) Pressure of two points lie in the same horizontal level should be same and p = hdg. Both ends of the U-tube are open, so the pressure on both the free surfaces must be equal, i.e. p1 = p2 hoil ⋅ S oil g = hwater ⋅ S water ⋅ g where, S oil = specific density of oil. h ⋅S ⋅g S oil = water water ⇒ hoil ⋅ g From figure, (65 + 65) × 1000 S oil = = 928 kgm −3 (65 + 65 + 10)
6 (c) According to question, the situation can be drawn as following. A (1 – p)L d pL
ρ
Applying Archimedes’ principle, Weight of cylinder = (Upthrust)1 + (Upthrust) 2 i.e. ALdg = (1 − p) LAρg + ( pLA ) nρg ⇒ d = (1 − p) ρ + pnρ = ρ − pρ + n pρ = ρ + (n − 1) pρ = ρ [1 + (n − 1) p ]
7 (b) According to Archimedes’ principle, weight of the wooden block = weight of the liquid displaced Vρg
g/2
mg
60 mg = V × ρl × g 100 3 …(i) = V × ρl × g 5 [Here, V = total volume of block, ρ l = density of liquid] When beaker is kept in a lift, then net weight of the block = mg + mg / 2 3mg mg = Q R − mg = 2 2
⇒
Again, for float condition, Net weight of the block = Buoyant force 3mg …(ii) ⇒ = Vi × ρ l × g 2 Here, Vi = volume of block inside liquid. From Eqs. (i) and (ii), we have 3 3 × (V × ρ l × g ) = Vi × ρ l × g 2 5 9 or Vi = V 10 So, volume of the block above liquid 1 = V = 10% of total volume. 10
228
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
8 (c) Let V be the volume of a body and
ρ its density, then by law of floatation in water 2 …(i) Vρg = V × ρ w g 3 2 [Q V is immersed in water 3 of density ρ w ] Similarly, in a liquid, 1 …(ii) Vρg = V × ρ l g 4 [Q mass is same in both the cases] From Eqs. (i) and (ii), we get 2 1 Vρ w g = Vρ l g 3 4 ρ l 2 4 = × ⇒ ρ w 3 1 ρl 8 ⇒ = ρw 3 8 ⇒ ρ l = g/cc (Q ρ w = 1 g/cc) 3
9 (a) According to Archimedes’ principle, ρC gVC = ρ w gVCS where, ρC and ρ w are densities of cube and water respectively; and VC and VCS are volumes of whole cube and submerged cube, respectively. Volume of cube submerged ⇒ Total volume of cube Density of cube material = Density of water 10 − 4 d = ⇒ 10 1 6 ⇒ d= = 0.6 g cm –3 10
10 (c) The net force acting on
A F1 F2 = ⇒ F1 = 1 F2 A2 A1 A2
⇒
where, σ = density of stone and ρ = density of liquid. ρ 1 = mg 1 − = mg 1 − K σ 1 Thus, a = g 1 − K [Q F = ma ]
16 (b) Initially in water, volume of body immersed in water volume of body
0.03 F1 = (2000 × 9.8) 0.55 ~ 1069 N F −
⇒ ⇒
=
1
12 (d) Using the law of buoyancy, we
∴
13 (d) Applying Archimedes’ principle,
or …(ii) doil = 2dbody From Eqs. (i) and (ii), we get 2 or doil = 2 × dwater 3 Therefore, specific gravity of oil 4 × dwater doil = 3 dwater dwater
submerged part = replaced water 4 hρ w g = h × ρ λ × g ⇒ 5 where, ρ w = density of water and ρ λ = density of liquid. 4 ∴ ρλ = × ρw 5 4 = × 1000 5 ⇒ ρ λ = 800 kgm −3
14 (a) As shown in figure, in the two arms of a tube atmospheric pressure remains same on surface pp′. Hence, 8 × ρY × g + 2 × ρ Hg × g = 10 × ρ X × g Y 8 cm 2 cm p′
10 cm p′ Hg
∴ or
=
8ρY + 2 × 13.6 = 10 × 3.36 33.6 − 27.2 ρY = = 0.8 g/cc 8
15 (d) The level of floating of a ship in the water is unaffected by the atmospheric pressure. It depends on buoyancy force which results from the pressure difference in the fluid. If the atmospheric pressure changes, the pressure at all points in the water
4 3
Q Specific gravity = Density of substance Density of water
17 (b) Ice is lighter than water. When ice
18
X
density of body density of water dbody
2/ 3V = V dwater 2 or dbody = dwater …(i) 3 volume of body immersed in oil In oil, volume of body density of body = density of oil 1 V d body ∴ 2 = V doil
have Vσg = 0.6 Vσ 1g , for the part of body inside water and Vσg = 0.4Vσ 2 g, for the part of body inside oil, hence we get 0.6 Vσ 1g = 0.4 Vσ 2g 0.6σ 1 1= 0.4 σ 2 σ 6 So, we have 2 = σ1 4 3 = = 15 . 2
Vρg
the stone of mass (m) in a a downward direction would be equal to F = Vσg − Vρg, where the force acting downwards would be equal mg = Vσg to Vσg due to its weight and the force acting upwards would be equal to Vρg due to the buoyant force. Hence, we get ρ F = Vσg − Vρg = Vσg 1 − σ
changes by same amount keeping pressure difference in the water same.
11 (d) We know, p1 = p2
melts, the volume occupied by water is less than that of ice, due to which the level of water goes down. σl upthrust on body in liquid (b) = σ w upthrust on body in water 1.5 x = 1 (50 − 40) g ⇒ x = 15 g ∴Upthrust on body in liquid = 15 g Weight of the body = 50 g Hence, body will weigh (50 − 15) = 35 g in the liquid.
19 (b) Let l = side of the cube, x = side of cube immersed in water and l − x = side of cube immersed in liquid. According to law of floatation, l 3 × 0.9 × 103 × g = (l 2 × x ) × 1000 g + l 2 (l − x ) × 0.7 × 103 g [Q V1 ρ 1 g = V2 ρ 2 g ]
229
MECHANICAL PROPERTIES OF FLUIDS
⇒ l × 0.9 = x + (l − x ) × 0.7 x 2 or = 0.3x = 0.2l or l 3
20 (b) The density of concrete ofcourse is more than that of water and a block of concrete will sink like a stone, if dropped into water. Concrete cargo were filled with air and as such, average density of cargo vessels Mass of concrete + Mass of air = Volume of concrete + Volume of air It follows that the average density of cargo vessels must be less than that of water. As a result, the concrete cargo vessels did not sink.
21 (b) From Archimedes’ principle, the buoyant force is F = 4 N − 3 N = 1N
22 (d) A large ship can float but a steel needle sinks, this concept is explained by Archimedes’ principle which states that when a body is fully or partially submerged in a fluid, a buoyant force from the surrounding fluid acts on the body. The force is directed upward and has a magnitude equal to the weight of the fluid that has been displaced by the body. Hence, a large ship can float but a needle sinks.
23 (d) Archimedes’ upward thrust (Vρg ) will be absent for a fluid, if there were no gravity.
24 (b) Given, density of ball, d = 0.4 × 103 kg m –3
Height above the surface of water, h = 9 cm Velocity acquired by ball at the moment, it reaches surface, v0 = 2gh [Q v 2 = u2 + 2gh and u = 0] From law of conservation of energy, Loss in KE = Work done by the net upward force in water 1 2 ⇒ mv0 = V (ρ w − d ) g × x 2 Here, ρ w = density of water, x = depth to which ball sink and V = volume of water. (V × d )v02 = V (ρ w − d )g × x ⇒ 2
⇒
2gh d = (ρ w − d )g x 2
pA = pB ∴ 11.2 × 10−2 × ρ water × g
0.4 × 103 × 9 dh = ρ w − d (1 × 103 − 0.4 × 103 ) 0.4 = × 9 = 6 cm 0.6
= 2x × ρ mercury × g ⇒ 11. 2 × 10−2 × 1000 kgm −3
⇒ x=
25 (a) By the law of floatation, we know that a body will float in a liquid, when its weight w is equal to the weight w′ of the liquid displaced by the immersed part of the body. But this does not necessarily indicate that the body will be in equilibrium. A body will be in equilibrium only, if the resultant of all the forces and couples acting on the body is zero. If w and w′ act along different lines, they will form a couple which will tend to rotate the body. Thus, a floating body can be in equilibrium, if no couple acts on it. It will be so, if the line of action of w and w′ is along the same vertical straight line. Here, in both the situations, as the mass of floating block remains same, hence according to principle of floatation mass of volume of water displaced also remains same. Hence, water level will remain same in both the cases.
26 (d) Floating fraction or immersed fraction =
density of wood density of water
When water is heated from 0°C to 10°C, density of water first increases upto 4°C and then decreases due to anomalous expansion of water. Therefore, floating fraction will first decrease because density of water increases and then increase because density of water decreases.
27 (c) On pouring water on left side, mercury rises x cm (say) from its previous level in the right limb of U-tube creating a difference of levels of mercury by 2x cm. Equating pressures at A and B, we get C Water A
Mercury
D
11.2 cm B
x x
= 2x × 13600 kgm −3 ⇒
x=
11. 2 × 10−2 × 1000 m 2 × 13600
= 0.41 cm
28 (b) Buoyant force, F = mg
where, m = mass of water. 1 Given, Vw = Vb 2 where, Vw = volume of water displaced and Vb = volume of ball. 14 Vw = πr3 ⇒ 2 3 2 = π (012 . )3 3 [Q r = 12 cm = 012 . m] ∴ F = ρVw g (where, ρ = density of water) 2 = 1000 × π (012 . )3 × 9.8 3 = 35 N
29 (b) Weight of candle
= Weight of liquid displaced i.e. Vρg = V ′ ρ′ g d2 d2 or π × 2L ρ = π L ρ′ 4 4
or
ρ 1 = ρ′ 2
Let, x = length of burnt part of candle, ρ = density of wax and ρ′ = density of liquid. Since, candle is burning at the rate of 2 cm per hour, then after an hour, it will remain (2L − 2) cm. ∴ (2L − 2)ρ = (L − x )ρ′ ρ L−x or = ρ′ 2(L − 1) So,
1 L−x = 2 2(L − 1)
or L −1= L − x ⇒ x = 1 cm Thus, it falls at the rate of 1 cm h −1.
Topic 3 Fluid Flow, Bernoulli’s Theorem and Stokes’ Law 2019 1 If a small orifice is made at a height of 0.25 m from the ground, the horizontal range of water stream will be
1m 0.25 m
[AIIMS]
(a) 46.5 cm (c) 76.6 cm
(b) 56.6 cm (d) 86.6 cm
2 Two small spherical metal balls, having equal masses, are made from materials of densities ρ1 and ρ 2 ( ρ1 = 8ρ 2 ) and have radii of 1 mm and 2 mm, respectively. They are made to fall vertically (from rest) in viscous medium whose coefficient of viscosity equals ηand whose density is 0.1 ρ 2 . The ratio of their terminal velocities would be [NEET (Odisha)]
79 (a) 72 39 (c) 72
19 (b) 36 79 (d) 36
3 Determine the pressure difference in tube of non-uniform cross-sectional area as shown in figure. [AIIMS] ∆p = ?, d1 = 5 cm, v1 = 4m/s, d 2 = 2 cm, v 2 = ?
d1
v1
d2
v2
∆p
(a) 304200 Pa (c) 302500 Pa
(b) 304500 Pa (d) 303500 Pa
2018 4 A rain drop of radius 0.3 mm has a terminal velocity in air 1 ms −1 . The viscosity of air is18 × 10 −5 poise. Find the viscous force on the rain drops. [JIPMER] (a) 2.05 × 10−7 N (b) 1.018 × 10−7 N (c) 1.05 × 10−7 N (d) 2.058 × 10−7 N
5 At what speed will the velocity of a stream of water be equal to 20 cm of mercury column? (Take, g = 10 ms −2 ) [JIPMER] −1 −1 (a) 6.4 ms (b) 7.3756 ms (c) 6.4756 ms −1 (d) None of these 6 Water flows through a horizontal pipe of variable cross-section at the rate of 20 L min –1 . What will be the velocity of water at a point where diameter is 4 cm? (a) 0.2639 ms −1 (b) 0.5639 ms −1 [JIPMER] −1 (c) 0.4639 ms (d) 0.3639 ms −1 7 A small sphere of radius r falls from rest in a viscous liquid. As a result, heat is produced due to viscous force. The rate of production of heat when the sphere attains its terminal velocity, is proportional to [NEET] (c) r 3 (d) r 4 (a) r 5 (b) r 2
2017 8 A liquid is allowed into a tube of truncated cone shape. Identify the correct statement from the following. [JIPMER] (a) The speed is high at the wider end and low at the narrow end. (b) The speed is low at the wider end and high at the narrow end. (c) The speed is same at both ends in a streamline flow. (d) The liquid flows with uniform velocity in the tube.
2014 9 A small metal sphere of radius a is falling with a velocity v through a vertical column of a viscous liquid. If the coefficient of viscosity of the liquid is η, then the sphere encounters an opposing force of [WB JEE] 6ηv πηv 2 (c) 6πηav (d) 3 (a) 6πηa v (b) πa 6a
2013 10 What is the velocity v of a metallic ball of radius r falling in a tank of liquid at the instant when its acceleration is one-half that of a freely falling body? (The densities of metal and of liquid are ρ and σ, respectively and the viscosity of liquid is η) [Manipal] 2 2 r g r g (b) (a) (ρ − 2σ ) ( 2ρ − σ ) 9η 9η (c)
r2 g (ρ − σ ) 9η
(d)
2r 2 g (ρ − σ ) 9η
231
MECHANICAL PROPERTIES OF FLUIDS
2011 11 In the case of a sphere falling through a viscous medium, it attains terminal velocity, when [J&K CET] (a) viscous force plus buoyant force becomes equal to force of gravity (b) viscous force is zero (c) viscous force plus force of gravity becomes equal to buoyant force (d) buoyant force becomes equal to force of gravity
12 A vertical tank with depth H is full with water. A hole is made on one side of the walls at a depth h below the water surface. At what distance from the foot of the wall does the emerging stream of water strike the foot? [DUMET] (a) h( H − h )
(b) 2 h ( H − h )
(c) 2( H − h ) h / ( H − h )
(d) 2h / ( H − h )
2010 13 Water is in streamline flows along a horizontal pipe with non-uniform cross-section. At a point in the pipe, where the area of cross-section is 10 cm 2 , the velocity of water is 1 ms −1 and the pressure is 2000 Pa. The pressure at another point, where the cross-sectional area is 5 cm 2 is (a) 4000 Pa (b) 2000 Pa [KCET] (c) 1000 Pa (d) 500 Pa
14 Two raindrops of same radius r falling with terminal velocity v merge and from a bigger drop of radius R. The terminal velocity of the bigger drop is [VMMC] 2 R R (a) v (b) v 2 r r (c) v (d) 2v 15 Two solid spheres of same metal but of mass M and 8M fall simultaneously on a viscous liquid and their terminal velocities are v and nv, then value of n is [WB JEE] (a) 16 (b) 8 (c) 4 (d) 2
2009 16 The working of venturimeter is based on
[Kerala CEE]
(a) Torricelli’s law (b) Pascal’s law (c) Bernoulli’s theorem (d) Archimedes’ principle (e) Stokes’ law
17 Water flows along a horizontal pipe whose cross-section is not constant. The pressure is 1 cm of Hg where the velocity is 35 cm s −1 . At a point, where the velocity is 65 cm s −1 , the pressure will be [UP CPMT] (a) 0.89 cm of Hg (b) 8.9 cm of Hg (c) 0.5 cm of Hg (d) 1 cm of Hg
18 In a streamline flow, [Manipal] (a) the speed of a particle always remains same (b) the velocity of a particle always remains same (c) the kinetic energies of all particles arriving at a given point are the same (d) the moments of all the particles arriving at a given point are the same 2008 19 If the terminal speed of a sphere of gold (density = 19. 5 kgm − 3 ) is 0.2 ms −1 in viscous liquid (density = 1. 5 kgm −3 ) , find the terminal speed of a sphere of silver (density = 10. 5 kgm −3 ) of the same size in the same liquid. [AIIMS] (a) 0.4 ms −1 (b) 0.133 ms −1 (c) 0.1 ms −1 (d) 0.2 ms −1 20 Water is filled in a tank to a height of 3 m. An orifice is made at a height 52.5 cm from bottom of tank. The ratio of the cross-sectional area of the orifice and the tank is 0.1. The square of the speed of the liquid coming out from the orifice is ( take, g = 10 ms −2 ) (a) 50 m 2s −2 (b) 50. 5 m 2s −2 [AIIMS] 2 −2 (c) 51 m s (d) 52 m 2s −2 21 A rectangular vessel when full of water, takes 10 min to be emptied through an orifice in its bottom. How much time will it take to be emptied when half filled with water? [AFMC] (a) 9 min (b) 7 min (c) 5 min (d) 3 min 22 An air bubble of radius 1 cm rises from the bottom portion through a liquid of density 1.5 g cc −1 at a constant speed of 0.25 cms −1 . If the density of air is neglected, the coefficient of viscosity of the liquid is approximately (in Pa). [AFMC] (a) 13000 (b) 1300 (c) 130 (d) 13 23 To get the maximum flight, a ball must be thrown as [BHU] (a)
(b)
(c)
(d) Any of (a), (b) and (c)
24 In the figure, the velocity v3 will be A2 = 0.2 m2 v1 = 4 ms
–1
v2 = 2 ms–1
A1 = 0.2 m2 A3 = 0.4 m2
(a) zero (e) 2 ms −1
(b) 4 ms −1
v3
(c) 1 ms −1
[Kerala CEE]
(d) 3 ms −1
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
25 A uniformly tapering vessel is filled with a liquid of density 900 kgm−3 . The force that acts on the base of the vessel due to the liquid is ( take, g = 10 ms −2 ) [AMU] Area = 10 –3 m2
0.4 m Area = 2 × 10–3 m2
(a) 3.6 N
(b) 7.2 N
(c) 9 N
(d) 14.4 N
26 A solid sphere falls with a terminal velocity v in CO2 gas. If it is allowed to fall in vacuum, then [EAMCET] (a) terminal velocity of sphere = v (b) terminal velocity of sphere < v (c) terminal velocity of sphere > v (d) sphere never attain terminal velocity 27 At what speed, the velocity head of water is equal to pressure head of 40 cm of Hg? [BCECE] (a) 10.3 ms −1 (b) 2.8 ms −1 (c) 5.6 ms −1 (d) 8.4 ms −1
2007 28 When a body falls in air, the resistance of air depends to a great extent on the shape of the body. Three different shapes are given. Identify the combination of air resistances which truely represents the physical situation. (The cross-sectional areas are the same) [AIIMS] R
R
R
32 The reading of a manometer fitted to a closed tap is 3. 5 × 105 Nm 2 . If the valve is opened, the reading of the manometer falls to 3 × 105 Nm −2 . The velocity of water is (b) 10 ms −1 (a) 1 ms −1 [AMU] −1 (d) 0.1 ms −1 (c) 100 ms 33 The cylindrical tube of a spray pump has a cross-section of 8cm 2 , one end of which has 40 fine holes each of area 10−8 m 2 . If the liquid flows inside the tube with a speed of 015 . m min −1 , the speed with which the liquid is ejected through the holes is [KCET] −1 −1 (a) 50 ms (b) 5 ms (c) 0.05 ms −1 (d) 0.5 ms −1 34 A cylindrical vessel of 90 cm height is kept filled upto the brim. It has four holes 1, 2, 3, 4 which are respectively at heights of 20 cm, 30 cm, 45 cm and 50 cm from the horizontal floor PQ. The water falling at the maximum horizontal distance from the vessel comes from (a) hole number 4 (b) hole number 3 [EAMCET] (c) hole number 2 (d) hole number 1 35 A hole is in the bottom of the tank having water. If total pressure at the bottom is 3 atm (1 atm = 105 Nm −2 ), then velocity of water flowing from hole is [Manipal] (a) 400 ms −1 (b) 600 ms −1 (d) None of these (c) 60 ms −1
2006 36 According to Bernoulli’s equation, p 1 v2 +h+ = constant ρg 2 g
w (1) disc
(a) 1< 2 < 3 (c) 3 < 2 < 1
w w (2) ball (3) cigar shaped
(b) 2 < 3 < 1 (d) 3 < 1< 2
29 Two equal drops of water are falling through air with a steady velocity v. If the drops coalesced what will be the new velocity? [AFMC] (a) ( 2)1/ 3 v (b) ( 2) 3/ 2 v (c) ( 2) 2/ 3 v (d) ( 2)1/ 4 v 30 Speed of a ball of 2 cm radius in a viscous liquid is 20cm s −1 . Then, the speed of 1 cm radius of ball in the same liquid is [BHU] (b) 40 cm s −1 (a) 80 cm s −1 (d) 5 cm s −1 (c) 10 cm s −1 31 The terminal velocity of small sized spherical body of radius r falling vertically in a viscous liquid is given by the following proportionality [AMU] (a) 1/r 2 (b) 1/r (c) r (d) r 2
v2 p The terms A = , B ( = h ) and C = are generally ρg 2g called respectively [AFMC] (a) gravitational head, pressure head and velocity head (b) gravity, gravitational head and velocity head (c) pressure head, gravitational head and velocity head (d) gravity, pressure and velocity head
37 Blood is flowing at the rate of 200 cm 3s −1 in a capillary of cross-sectional area 0.5 m 2 . The velocity of flow (in mms −1 ) is [Kerala CEE] (a) 0.1 (b) 0.2 (c) 0.3 (d) 0.4 (e) 0.5 38 An atomiser is based on the application of (a) Torricelli’s theorem (b) Bernoulli’s theorem (c) Archimedes’ principle (d) principle of continuity
[Punjab PMET]
233
MECHANICAL PROPERTIES OF FLUIDS
43 Assertion (A) For Reynolds’ number R e > 2000, the flow of fluid is turbulent. Reason (R) Inertial forces are dominant compared to the viscous forces at such high Reynolds’ numbers. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) A is correct but R is incorrect (d) Both A and R are incorrect
39 The speeds of air-flow on the upper and lower surfaces of a wing of an aeroplane are v1 and v 2 , respectively. If A is the cross-sectional area of the wing and ρ is the density of air, then the upward lift is [EAMCET] 1 (a) ρA ( v1 − v 2 ) 2 1 (b) ρA ( v1 + v 2 ) 2 1 (c) ρA ( v12 − v 22 ) 2 1 (d) ρA ( v12 + v 22 ) 2
44 An incompressible fluid flows steadily through a cylindrical pipe, which has radius 2r at point A and radius r at B further along the flow direction. If the velocity at point A is v, its velocity at point B is [Kerala CEE]
40 When the temperature increases, the viscosity of [J&K CET] (a) gas decreases and liquid increases (b) gas increases and liquid decreases (c) gas and liquid increases (d) gas and liquid decreases
2r
A2
41 Water flows steadily through a horizontal pipe of variable cross-section. If the pressure of water is p at a point, where flow speed is v, the pressure at another point, where the flow of speed is 2v, is (take, density of water as [J&K CET] ρ) 2 2 2 3 ρv ρv 3 ρv (b) p − (d) p − ρv 2 (c) p − (a) p − 2 4 2
A
(a) 2v (b) v (c) v / 2 (d) 4v (e) 8v 45 Water is flowing in a pipe of diameter 4 cm with a velocity 3 ms −1 . The water then enters into a pipe of diameter 2 cm. The velocity of water in the other pipe is [BCECE] (b) 6 ms −1 (c) 12 ms −1 (d) 8 ms −1 (a) 3 ms −1
46 A viscous fluid is flowing through a cylindrical tube. The velocity distribution of the fluid is best represented by the diagram. [BCECE]
filled with water and is mounted on a rotatable shaft as shown in figure. If the tube is rotated with a constant angular velocity ω, then [AIIMS] B
L
v2
B
2005 42 A given shaped glass tube having uniform cross-section is
A
r
A1
v1
(a)
(b)
(c)
(d) None of these
2L
47 A container with square base of side a is filled up to a height H with a liquid. A hole is made at a depth h from the free surface of water. With what acceleration the container must be accelerated, so that the water does not come out? [J&K CET] g 2gH 2gh (a) g (b) (c) (d) 2 2 a
(a) water levels in both sections A and B go up (b) water level in section A goes up and that in B comes down (c) water level in section A comes down and that in B it goes up (d) water levels remain same in both sections
Answers 1 11 21 31 41
(d) (a) (b) (d) (a)
2 12 22 32 42
(d) (b) (c) (b) (d)
3 13 23 33 43
(b) (d) (b) (b) (a)
4 14 24 34 44
(b) (b) (c) (b) (d)
5 15 25 35 45
(b) (c) (b) (a) (c)
6 16 26 36 46
(a) (c) (d) (c) (c)
7 17 27 37 47
(a) (a) (a) (d) (a)
8 18 28 38
(b) (c) (c) (b)
9 19 29 39
(c) (c) (c) (c)
10 20 30 40
(a) (a) (d) (b)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (d) Given, height of small orifice from ground (h) = 0.25 m
H 0.25 h
(2.5 × 10−2 )2 × 4 = (10−2 )2 ⋅ v2
Total height of water tank, H = 1m ∴Range of water stream, R = 2 h(H − h) = 2 (H − 0.25 ) (0.25 ) = 2 (1 − 0.25 )0.25 = 2 0.75 × 0.25 = 0.866 m = 86.6 cm
2 (d) The terminal velocity achieved by ball in a viscous fluid is 2(ρ − σ )r2g vt = 9η where, ρ = density of metal of ball, σ = density of viscous medium, r = radius of ball and η = coefficient of viscosity of medium. Terminal velocity of first ball, 2(ρ1 − σ )r12g vt1 = 9η 2 (8ρ2 − σ )r12g …(i) [Q ρ 1 = 8ρ2] = 9η Similarly, for second ball, 2 (ρ2 − σ )r22g vt 2 = 9η
…(ii)
From Eqs. (i) and (ii), we get vt1 2(8ρ2 − σ )r12g 9η × = vt 2 9η 2(ρ2 − σ )r22g 2
8ρ − 01 . ρ2 r1 …(iii) = 2 ρ2 − 01 . ρ2 r2 [Q σ = 0.1ρ2] Here, r1 = 1 mm and r2 = 2 mm Substituting these values in Eq. (iii), we get vt1 7.9ρ2 1 2 79 ⇒ = = vt2 0.9ρ2 2 36
3 (b) Given, diameter of tube at first end, d1 = 5 cm
d2 = 1 cm = 10−2 cm 2 Velocity of fluid at first end, v1 = 4 m/s By the principle of continuity, A1v1 = A2v2 πr12v1 = πr22v2
∴ Radius, r2 =
d1 = 2.5 cm 2 = 2.5 × 10−2 m
∴ Radius, r1 =
Diameter of tube at second end, d2 = 2 cm
⇒ v2 = 25 m/s From Bernoulli’s theorem, 1 1 p1 + ρv12 = p2 + ρv22 2 2 1 2 p1 − p2 = ρ(v2 − v12 ) 2 1 = × 103 (252 − 4 2 ) 2 [Q density of water, ρ = 103 kg/ m3 ] = 304500 Pa
4 (b) Here,
r = 0.3 mm = 0.3 × 10−3 m, v = 1 ms−1 η = 18 × 10−5 poise = 18 × 10−6 decapoise
Viscous force, F = 6π η rv 22 =6× × (18 × 10−6 ) × (0.3 × 10−3 ) × 1 7 = 1.018 × 10−7 N
5 (b) Here, velocity head = 20 cm of Hg = 20 × 13.6 cm of water As, velocity head = v 2 / 2g ∴
20 × 13.6 =
v2 2 × 1000
v = 20 × 13.6 × 2 × 1000 = 737.56 cms−1 = 7.3756 ms−1
6 (a) Volume of the water flowing per
7 (a) The rate of heat generation is equal to the rate of work done by the viscous force which in turn is equal to its power. Rate of heat produced, dQ = F × vT dt where, F is the viscous force and vT is the terminal velocity. As, F = 6πηr vT dQ ⇒ = 6πηrvT × vT = 6πηrvT2 ...(i) dt From the relation for terminal velocity, 2 r2 (ρ – σ ) g, we get vT = ⋅ 9 η vT ∝ r2
...(ii)
From Eq. (ii), we can rewrite Eq. (i) as dQ dQ ∝ r ⋅ (r2 )2 or ∝ r5 dt dt
8 (b) For an incompressible liquid equation of continuity, Av = constant 1 or A∝ v where, A = area of cross-section of tube and v = speed of liquid. So, the speed of liquid flow is not uniform, but changes with area of cross-section of tube. Therefore, at the wider end speed will be low and at the narrow end speed will be high.
9 (c) Stoke established that, if a sphere
second, V = 20 L min 20 × 1000 3 −1 1 m s = × 10−3 m 3s−1 = 3 60 × (100)3
of radius a moves with velocity v through a fluid of viscosity η, the viscous force opposing the motion of the sphere is F = 6πηav.
Radius of the pipe, 4 r = = 2 cm = 0.02 m 2 Area of cross-section, 22 A = πr 2 = × (0.02 )2 m 2 7 Let v be the velocity of the flow of water at the given point. Clearly, V = Av 1 22 or × 10−3 = × (0.02)2 × v 3 7 7 × 10−3 ~ 0.2639 ms−1 − v= 3 × 22 × (0.02)2
10 (a) Net force on the ball = downward
−1
force − upward force =
mg 2
– Vσg Vρg 6πηrv mg (net force) — 2
mg 4 3 πr (ρ − σ )g − 6πηrv = 3 2
235
MECHANICAL PROPERTIES OF FLUIDS
4 3 14 πr (ρ − σ )g − 6πηrv = πr3ρ g 3 2 3 9 1 2 2 r (ρ − σ )g − ηv = r ρg 2 2 9 1 2 vη = r (ρ − σ )g − r2ρg 2 2 1 2 2 = r ρg − r σg 2 9 1 2 vη = r g (ρ − 2σ ) 2 2 r2g (ρ − 2σ ) v= ⇒ 9η
11 (a) The sphere falling through a viscous medium accelerates initially due to gravity. As the velocity increases, the retarding viscous force also increases. Finally, when viscous force plus buoyant force becomes equal to force due to gravity, the net force and hence acceleration becomes zero. Then, it descends with constant terminal velocity.
12 (b) Time taken by water to reach the foot, t=
2(H − h) g h
H
x
Velocity of water coming out of hole, v = 2gh ∴ Emerging stream of water strike the foot, x = v × t 2(H − h) = 2gh × = 2 h(H − h) g
13 (d) According to equation of continuity, A1v1 = A2v2 ⇒10 × 1 = 5 × v2 ⇒ v2 = 2 ms−1
From Bernoulli’s theorem, p1 v12 p2 v22 + = + ρ 2 ρ 2 Q p + 1 ρv 2 = constant and h = h 1 2 2 2000 12 22 p + = 2 + 1000 2 1000 2 ⇒ p2 = 500 Pa
14 (b) Terminal velocity, v =
2 r2 (ρ − σ ) g 9 η
From given data ρ Ag − σ l vT (Ag) = vT (Gold ) ρ Gold − σ l
v ∝ r2 v r2 vR 2 = 2 ⇒ V = 2 V R r
∴ ⇒
15 (c) The terminal velocity is given by v ∝ r2, where(r = radius of the sphere). The mass of the sphere can be given by 4 m = πr3ρ 3 Thus, m ∝ r3. So, according to the question, 3
m1 1 r1 = = ⇒ m2 8 r2
A
2 v1 r1 1 1 = = = 2 v2 r2 4
v 1 = nv 4
52.5 cm=h2
⇒ n=4
measure the rate of flow of a liquid through a pipe. It is an application of Bernoulli’s principle. It is also called flow meter or venture tube.
17 (a) In horizontal pipe, 1 2 1 ρv1 = p2 + ρv22 2 2
Bv
h1=3 cm
16 (c) Venturimeter is a device used to
p1 +
20
r1 1 = r2 2
2
and since,
10.5 − 15 . vT (Ag) = × 0.2 19.5 − 15 . 9 = × 0.2 = 01 . ms−1 18 (a) Let A = cross-section of tank, a = cross-section of hole V = velocity with which level decreases and v = velocity of efflux. ⇒
… (i)
Here, p1 = ρ mgh1 = 13600 × 9.8 × 10−2, p2 = 13600 × 9.8 × h ρ = 1000 kgm −3, v1 = 35 × 10−2 ms −1, v2 = 65 × 10−2 ms −1 ∴ From Eq. (i), we get 13600 × 9.8 × 10−2 1 + × 1000 × (0.35)2 2 1 = 13600 × 9.8 × h + × 1000 × (0.65)2 2 After solving, we get h = 0.89 cm of Hg
18 (c) The path taken by a fluid particle under a steady flow is a streamline flow. The flow of the fluid is said to be steady, if at a given point, the velocity of each passing fluid particle remains constant in time, i.e. kinetic energy of all particles arriving at a given point is the same.
19 (c) Terminal speed of spherical body in a viscous liquid is given by 2 r2 (ρ − σ )g vT = 9η where, ρ = density of substance of body and σ = density of liquid.
From equation of continuity, av = AV av ...(i) V = A By using Bernoulli’s theorem for energy per unit volume. Energy per unit volume at point A = Energy per unit volume at point B 1 1 p0 + ρgh1 + ρV 2 = p0 + ρgh2 + ρv 2 2 2 1 ⇒ρg (h1 − h2 ) = ρ (v 2 − V 2 ) 2 Substituting the value of V from Eq. (i), we get 2g (h1 – h2 ) ⇒ v2 = 1 − (a / A )2 2 × 10 × (3 − 0.525) = . )2 1 − (01 ⇒
= 50 m 2s−2
21 (b) If A0 is the area of orifice at the bottom below the free surface and A that of vessel, time t taken to be emptied the tank, A 2H t= A0 g t1 = t2
∴
t2 =
∴
H1 H2
⇒
t = 2 t2
10 t = ≈ 7 min 2 2
22 (c) Terminal velocity, v= =
2 r2ρg 2 r2ρg ⇒ η= ⋅ 9 η 9 v 2 (1 × 10−2 )2 × (1. 5 × 103 ) × 9.8 9 0.25 × 10−2
= 130 Pa
236
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
23 (b) If a ball is moving from left to right and also spinning about a horizontal axis in anti-clockwise direction of motion, then relative to the ball air will be moving from right to left. The resultant velocity of air above and below the ball will be (v + rω ) and (v − rω ), respectively. So, according to Bernoulli’s principle, due to this difference of pressure an upward force will act on the ball and hence the ball will deviate from its usual path OA and will hit the ground at B following path OB, i.e. if a ball is thrown with back spin the pitch will curve less sharply prolonging the flight. [Q v = rω, where ω = angular speed] v + rω Air Vertical plane Cu rv e
O
d
th pa
v – rω
A
B
F = force which acts on ball due to difference of pressure.
24 (c) From principle of continuity, A1v1 = A2v2 + A3v3 ⇒ 0.2 × 4 = 0.2 × 2 + 0.4 v3 ⇒ 0.4 v3 = 0.8 − 0.4 = 0.4 or v3 = 1 ms−1
25 (b) Pressure of liquid column = hρg p = 0.4 × 900 × 10 Nm −2 Force on the base = p × area = p × 2 × 10−3 m 2 = 0.4 × 900 × 10 × 2 × 10−3 N = 7.2 N
26 (d) The terminal velocity of the sphere 2 r2 (ρ − σ )g v= 9 η ⇒ v=0 In vacuum, there is no upthrust. Hence, the sphere never attains terminal velocity in vacuum.
27 (a) Bernoulli’s equation for flowing liquid be written as 1 p + ρv 2 + ρgh = constant …(i) 2 Here, p = pressure energy per unit volume of liquid, ρ = density of liquid (water), h = height of liquid column, v = velocity of liquid,
and g = acceleration due to gravity. Dividing the Eq. (i) by ρg, we have p v2 + + h = constant ρg 2g 2
In this expression,
v is velocity head 2g
p is pressure head. and ρg It is given that Velocity head = Pressure head 2p v2 p i.e. or v 2 = = ρ 2g ρg 2 × 13.6 × 103 × 40 × 10−2 × 9.8 103 −1 ∴ v = 10.3 ms or v 2 =
28 (c) Fig. 3 is streamlined, so air resistance of it will be minimum. For Fig.1, surface area is maximum, so air resistance for it is maximum. Hence, correct sequence is 3 < 2 < 1.
29 (c) Let r be the radius of the each drop. The terminal velocity of drop will be given by 2 r2 (ρ − σ )g …(i) v= 9 η where, ρ is density of drop and σ is density of viscous medium of coefficient of viscosity η . When two drops each of radius r coalesce to form a new drop, then the radius of coalesced drop will be 4 3 4 π r × 2 = π R3 3 3 ⇒ R = (2)1/ 3 r Hence, new terminal velocity of coalesced drop will be 2 (21/ 3 r)2 (ρ − σ )g v′ = …(ii) 9 η From Eqs. (i) and (ii), we get v′ = (2)2/ 3 v v′ = (2)
or
2/ 3
v
30 (d) Terminal velocity, v=
2 r2 (ρ − σ )g ⇒ v ∝ r2 9 η
Here, v1 = 20 cm s−1 , r1 = 2 cm, r2 = 1 cm 2
∴
v1 r1 = and v2 r2
⇒
v2 = 20 / 4 = 5 cm s−1
20 (2)2 = v2 (1)2
31 (d) According to formula, v=
2r2 (ρ − σ )g 9η v ∝ r2
Hence,
32 (b) According to Bernoulli’s theorem, 1 2 1 ρv1 = p2 + ρv22 2 2 1 2 1 ρv2 = ( p1 − p2 ) + ρv12 2 2 = ( p1 − p2 ) (Q v1 = 0)
p1 + ⇒
⇒
v2 =
2( p1 − p2 ) ρ
⇒
v2 =
2 × (3.5 × 105 − 3 × 105 ) 103
v2 = 10 ms−1
⇒
33 (b) According to equation of continuity, av = constant
. 015 ∴ For tube, (8 × 10−4 ) × = a1v1 60
(40 × 10−8 ) × v = a2v2 a2v2 = a1v1 8 × 10−4 × 0.15 ∴ 40 × 10−8 × v = 60 . 8 × 10−4 × 015 = 5 ms−1 ⇒ v= 40 × 10−8 × 60 For holes, As,
34 (b) Horizontal range will be maximum when
H 90 = = 45 cm, 2 2 i.e. hole number 3 h=
4 3 90 45 cm
2 1
P
Q
35 (a) Let height of water column in the tank be h. Total pressure ( p) = atmospheric pressure ( p0 ) + pressure due to water column in tank ( p′ ) ∴ p′ = p − p0 = 3 − 1 = 2 atm or hρg = 2 × 105 3 or h × 10 × 10 = 2 × 105 or h = 20 m Hence, velocity of water coming from hole, i.e. velocity of efflux is v = 2gh = 2 × 10 × 20 = 400 ms−1
237
MECHANICAL PROPERTIES OF FLUIDS
speeds above and below the wings, in accordance with Bernoulli’s principle, creates a pressure difference, due to which an upward force called ‘dynamic lift’ acts on the plate. ∴Upward lift = pressure difference × area of wing [Q F = p × A ] From Bernoulli’s equation, 1 1 p1 + ρv12 = p2 + ρv22 2 2 1 Q p2 – p1 = ρ (v12 – v22 ) 2 1 Hence, upward lift = ρA (v12 − v22 ) 2
36 (c) According to Bernoulli’s theorem, in case of steady flow of incompressible and non-viscous liquid through a tube of non-uniform cross-section, the sum of the pressure, the potential energy per unit volume and the kinetic energy per unit volume is same at every point in the tube, i.e. 1 p + ρgh + ρv 2 = constant 2 Dividing this expression by ρg, we have p v2 + + h = constant ρg 2g In this expression
p is called the ρg
40 (b) Viscosity in gases arises principally from the molecular diffusion that transports momentum between layers of flow. For gases, viscosity increases as temperature increases, while in liquids, the additional force between molecules become important, hence viscosity tends to fall as temperature increases.
v2 ‘pressure head’, the ‘velocity head’ 2g and h the ‘gravitational head’.
37 (d) By the equation of continuity, we have Av = rate of flow (R) Given, R = 200 cm 3s−1 , A = 0.5 m 2 or
A = 0.5 × (103 )2 mm 2
and
R = 200 × (10)3 mm s−1.
∴
v=
of all forms of energy in a fluid flowing along an enclosed path (a streamline) is same at any two points in the path. Therefore, 1 1 p + ρv12 = p′ + ρv22 2 2 Given, v2 = 2v , v1 = v 1 1 p + ρv 2 = p′ + ρ(2v )2 ∴ 2 2 3 2 p′ = p − ρv ⇒ 2
= 400 × 10−6 × 103 = 0.4 mms−1
38 (b) Bernoulli’s theorem states that
42 (d) There is no effect of rotation on levels of water in two limbs. This is because each limb is under vertical pressure due to atmosphere only ( p0). Hence, water levels remain same in both sections.
Air Spray
43 (a) It is established from experiments
Rubber ball Liquid
When the rubber ball is squeezed, it sends a stream of air which passes over the tube. The velocity is very large in the constricted part, so that pressure in that part is lowered. Consequently, liquid rises in the tube and is mixed with air and comes out in the form of fine spray.
44
that flow is steady or laminar when Reynold’s number is less than about 2000, wherein the region between 2000 to 3000, the flow is unstable, i.e. may change from laminar to turbulent or vice-versa. This case arises only when inertial forces are dominant compared to viscous force. (d) From continuity equation, A1v1 = A2v2 or
39 (c) Due to the specific shape of wings when the aeroplane runs, air passes at higher speed over it as compared to its lower surface. This difference of air
v2 =
(2r)2 × v = 4v (r)2
45 (c) According to principle of continuity, Av = constant or A1v1 = A2v2 or πr12v1 = πr22v2 Given, r1 = 4 / 2 cm = 0.02 m r2 = 2 / 2 cm = 0.01 m ⇒ v1 = 3 ms−1 π (0.02)2 × 3 = π (0.01)2 v2 2
0.02 v2 = ×3 0.01
or
= 12 ms−1
46 (c) Figure shows the flow speed profile for laminar flow of a viscous fluid in a long cylindrical pipe. The speed is greatest along the axis and zero at the pipe walls.
41 (a) From Bernoulli’s equation, the sum
200 × (10)3 0.5 × 106
when an incompressible and non-viscous liquid flows in a streamlined motion from one place to another, then at every point its total energy per unit volume is conserved. Atomiser is based on this principle.
or
or
v1 A2 πr22 = = v2 A1 πr12 v2 =
r12 r22
47 (a) Bernoulli’s theorem is a form of conservation of energy, hence we have 1 p0 + Hρg + ρv12 2 1 = p0 + (H − h)ρg + ρv22 2 Solving above equation, we get 1 2 1 ρv1 = – hρg + ρv22 2 2 ⇒ v12 + 2gh = v22 ⇒ v12 – v22 = –2gh
...(i)
If u = 0 (free fall) v 2 − u2 = –2gh v 2 = –2gh
⇒
So, from Eq. (i), v22 = 0 ⇒ v2 = 0 Water will not come out. When vessel is accelerated down with an acceleration g (free fall), then pseudo acceleration g will be vertically upwards and effective value of g is zero. Hence, water will not flow.
h A
H
× v1 a
B
Topic 4 Surface Tension and Surface Energy 2019 1 Assertion (A) Sometimes insects can walk on water. Reason (R) The gravitational force on insect is balanced by force due to surface tension. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) Both A and R are incorrect (d) A is incorrect but R is correct
2 Assertion (A) Water drops take spherical shape when falling freely. Reason (R) Water has minimum surface tension among all liquids. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) Both A and R are incorrect (d) A is incorrect but R is correct 3 In an isothermal process, 2 water drops of radius 1 mm are combined to form a bigger drop. Find the energy change in this process, if T = 01 [AIIMS] . N/m. (a) 1 µJ (b) 0.5 µJ (c) 0.25 µJ (d) 0.75 µJ
2018 4 The work done in blowing a soap bubble of surface
tension 0.06 Nm −1 from 2 cm radius to 5 cm radius is [JIPMER]
(a) 0.004168 J (c) 0.003158 J
(b) 0.003168 J (d) 0.004568 J
2017 5 Two soap bubbles coalesce. It is noticed that, whilst joined together, the radii of the two bubbles are a and b where a > b. Then, the radius of curvature of interface between the two bubbles will be [JIPMER] (a) a − b (b) a + b ab ab (c) (d) (a − b ) (a + b )
2016 6 A rectangular film of liquid is extended from
(4 cm × 2 cm) to ( 5 cm × 4 cm ). If the work done is 3 × 10−4 J, the value of the surface tension of the liquid is (a) 0.250 Nm −1 (b) 0.125 Nm −1 [NEET] −1 (c) 0.2 Nm (d) 8.0 Nm −1
2014 7 A certain number of spherical drops of a liquid of radius r coalesce to form a single drop of radius R and volume V. If T is the surface tension of the liquid, then [CBSE AIPMT] (a) energy = 4V (1/ r − 1/ R ) is released (b) energy = 3VT (1/ r + 1/ R ) is absorbed (c) energy = 3VT (1/ r – 1/ R ) is released (d) energy is neither released nor absorbed 8 A drop of some liquid of volume 0.04 cm 3 is placed on the surface of a glass slide. Then, another glass slide is placed on it in such a way that the liquid forms a thin layer of area 20cm 2 between the surfaces of the two slides. To separate the slides a force of 16 × 105 dyne has to be applied normal to the surfaces. The surface tension of the liquid is (in dyne cm −1 ) [WB JEE] (a) 60 (b) 70 (c) 80 (d) 90
9 Under isothermal condition, energy E is supplied to a soap bubble of surface tension σ and radius r, to double the radius of the soap bubble. The value of E is [EAMCET] (a) 16πr 2σ (b) 24πr 2σ 2 (c) 8πr σ (d) 12πr 2σ
2013 10 Assertion (A) A small drop of mercury is spherical but bigger drops are oval in shape. Reason (R) Surface tension of liquid decreases with increase in temperature. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) Both A and R are incorrect (d) A is incorrect but R is correct
2012 11 A liquid drop of diameter D breaks into 27 small drops of
equal size. If the surface tension of the liquid is σ, then change in surface energy is [AFMC] (b) 2πD 2σ (a) πD 2σ (c) 3πD 2σ (d) 4πD 2σ
12 If T is the surface tension of a liquid, the energy needed to break a liquid drop of radius R into 64 drops is [Kerala CEE] (a) 6πR 2T (b) πR 2T (c) 12πR 2T (d) 8πR 2T 2 (e) 4πR T
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MECHANICAL PROPERTIES OF FLUIDS
2008 13 A frame made of metallic wire enclosing a surface area A is covered with a soap film. If the area of the frame of metallic wire is reduced by 50%, the energy of the soap film will be changed by [UP CPMT] (a) 100% (b) 75% (c) 50% (d) 25%
14 A liquid drop of radius R breaks into 64 tiny drops each of radius r. If the surface tension of the liquid is T, then the gain in energy is [Punjab PMET] (a) 48πR 2T (b) 12πr 2T (c) 96πR 2T (d) 192πr 2T 15 The potential energy of a molecule on the surface of a liquid compared to one inside the liquid is [MHT CET] (a) zero (b) lesser (c) equal (d) greater 2007 16 The radius R of the soap bubble is doubled under isothermal condition. If T be the surface tension of soap bubble, the required surface energy in doing so is given by (a) 32πR 2T (b) 24πR 2T [Punjab PMET] 2 (c) 8πR T (d) 4πR 2T 17 Two drops of equal radius coalesce to form a bigger drop. What is ratio of surface energy of bigger drop to smaller one? [MHT CET] (a) 21/ 2 : 1 (b) 1 : 1 (c) 22/ 3 : 1 (d) None of these
18 A wire of length l metre made of a material of specific gravity 8 is floating horizontally on the surface of water. If it is not wet by water, the maximum diameter of the wire (in millimetre) upto which it can continue to float is (surface tension of water is T = 70 × 10−3 Nm −1 ) [MP PMT] (a) 1.5 (b) 1.1 (c) 0.75 (d) 0.55 19 Two glass plates are separated by water. If surface tension of water is 75 dyne cm −1 and area of each plate wetted by water is 8 cm 2 and the distance between the plates is 0.12 mm, then the force applied to separate the two plates is (a) 102 dyne (b) 104 dyne [JCECE] 5 (c) 10 dyne (d) 106 dyne 2005 20 When a drop splits up into a number of drops, then [UP CPMT]
(a) area increases (b) volume increases (c) energy is absorbed (d) energy is liberated
21 Work done in forming a liquid drop of radius R is W1 and that of radius 3R is W2 . The ratio of work done is (a) 1 : 3 (b) 1 : 2 [MHT CET] (c) 1 : 4 (d) 1 : 9
Answers 1 (a) 11 (b) 21 (d)
2 (c) 12 (c)
3 (b) 13 (c)
4 (b) 14 (d)
5 (c) 15 (d)
6 (b) 16 (b)
7 (c) 17 (c)
8 (c) 18 (b)
9 (a) 19 (c)
10 (b) 20 (c)
Explanations 1 (a) Sometimes, insects can walk on the surface of water due to surface tension, when legs of insects are not being wet. In this situation, the gravitational force on insect is balanced by force due to surface tension. Hence, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
2 (c) Surface tension is responsible for the shape of tiny water drops when falling freely in the absence of other forces like gravity, shape of water drops is spherical because droplets of water tend to be pulled into a spherical shape by the cohesive forces of the surface layer. In the presence of gravity, the shape of heavy water drops is not spherical
when falling freely. It is oval shaped surface tension of methyl alcohol is lower than surface tension of water. Hence, water does not have minimum surface tension among all liquids. Therefore, both Assertion and Reason are incorrect.
3 (b) Given, surface tension of water, T = 01 . N/m Radius of small drops, r = 1mm = 10−3 m
If R be the radius of bigger drops, then volume remains conserved. i.e. V1 = V2 4 3 4 πR = 2 × πr 3 3 3 R 3 = 2r3 = 2 ⋅ (10−3 )3
∴
R = 21/ 3 × 10−3 m
∴Change in energy during isothermal combination, ∆E = T ⋅ ∆A = T [ A2 − A1 ] = 0.1 [ 2 × 4 πr2 − 4 πR 2 ] = 01 . × 4 π [ 2r2 − R 2 ] = 0.4 π [ 2 × 10−6 − 22/ 3 × 10−6 ] = 0.4 π × 10−6 × 0.41 = 0.52 × 10−6 J ~ 0.5 µJ = 0.52 µJ −
4 (b) Here, S = 0.06 Nm −1, r1 = 2 cm = 0.02 m , r2 = 5 cm = 0.05 m Since, bubble has two surfaces. Initial surface area of the bubble
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Volume is constant. 4 4 So, n πr3 = πR 3 = V 3 3 From Eqs. (ii) and (iii), we get
= 2 × 4 πr12 = 2 × 4π (0.02)2 −4
= 32 π × 10 m
2
Final surface area of the bubble = 2 × 4 πr22 = 2 × 4 π (0.05)2 = 200π × 10−4 m 2
= 168π × 10−4 m 2 ∴ Work done = Surface tension (S ) × Increase in surface area = 0.06 × 168π × 10−4 = 0.003168 J B
...(iii)
3 4π 3 4 × R 3 − n πr3 r 3 R 3 3 3 = ×V − V R r 1 1 ⇒ ∆A = 3V − = negative value R r ∆A =
Increase in surface area = 200 π × 10−4 − 32 π × 10−4
5 (c) According to
10 (b) In a small drop, the force due to
A
given figure, Let the radius of a curvature of the b common internal film r surface of the double bubble formed by two bubbles be r. Excess of pressure as compared to atmosphere inside A is (4T / a). In double bubble, the pressure difference between A and B on either side of the common surface 4T 4T = − b a This will be equal to (4T / r). 4T 4T 4T ∴ = − r b a 1 1 1 a − b or = − = r b a ba ab or r= a−b
6 (b) Increase in surface energy
= Work done = Increase in area × Surface tension ∴ Increase in surface area, ∆A = (5 × 4 − 4 × 2) × 2 (Q film has two surfaces) = (20 − 8) × 2 cm 2 = 24 cm 2 = 24 × 10−4 m 2 So, work done, W = T ⋅ ∆A 3 × 10−4 = T × 24 × 10−4 1 ∴ T = = 0.125 N/m 8
7 (c) Here, if the surface area changes, it will change the surface energy as well. If the surface area decreases, it means that energy is released and vice-versa. Change in surface energy …(i) = ∆A × T Let we have nnumber of drops initially. So, ∆A = 4 πR 2 − n(4 πr2 ) …(ii)
As R > r, so ∆A is negative. It means that surface area is decreased, so energy must be released. Energy released 1 1 = ∆A × T = − 3VT − r R Above expression shows the magnitude of energy released.
8 (c) Let thickness of layer be x. So, volume V = Area × x V = A×x ⇒ x =V /A V (Q x = 2r) ⇒ 2r = A V ...(i) ⇒ r= 2A T and ∆p = r We know that F = ∆p × A = (T / r) × A T F= × A [from Eq. (i)] (V / 2 A ) F ×V ⇒ T = 2 A2 where, F = 16 × 105 dyne, V = 0.04 cm 3 and A = 20 cm 2. 16 × 105 × 0.04 T= 2 × 202 8 × 105 × 4 8 × 105 × 4 = = 400 × 100 202 × 100 5 −4 = 8 × 10 × 10 = 80 dyne/cm = 80 dynecm −1
9 (a) The energy of soap bubbles (when
radius = r ) E = surface area of soap bubble × surface tension E = 4 πr2σ Now, radius becomes double. Then, the value of E = 4 π (2r)2 σ = 16πr2σ
surface tension is very large as compared to its weight and hence it is spherical in shape. A big drop becomes oval in shape due to its large weight. The surface tension of liquid decreases with increase of temperature because cohesive forces decrease with an increase of molecular thermal activity.
11 (b) Work done, W = T × ∆ A We know that, work done in splitting n liquid drops, W = 4 π σ R 2 [ n1/ 3 – 1] 2
= 4 πσ
D [(27)1/ 3 – 1] 2
= πD 2σ [(27)1/ 3 − 1] = 2πD 2σ
12 (c) Total volume of 64 drop
= Volume of big drop 4 3 4 3 64 × πr = πR 3 3 3 ⇒ R = 64 r3 R = 4r R r= ⇒ 4 Energy of big drop, E1 = T × 4 πR 2
Energy of 64 drops, E2 = 64 (T × 4 πr2 ) 2 R = 64 T × 4 π = 16πTR 2 4 ∴ Energy needed to break a drop into 64 drops, ∆W = E2 − E1 = 12πR 2T
13 (c) Surface energy
= Surface tension × Surface area E = T × 2A New surface energy, A E1 = T × 2 = T × A 2 % decrease in surface energy E − E1 = × 100 E 2TA − TA = × 100 = 50% 2TA
14 (d) Volume of big drop = 64 × volume of tiny drop 4 4 or πR 3 = 64 × πr3 or R = 4 r 3 3 So, the gain in surface energy = work done in splitting a liquid drop of radius R into n identical drops = 4 πTR 2 (n1/ 3 − 1) = 4 πT (4 r)2 (64 1/ 3 − 1) = 192πr2T
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MECHANICAL PROPERTIES OF FLUIDS
15 (d) When the surface area of a liquid is increased, molecules from the interior of the liquid rise to the surface. As these molecules reach the surface work is done against the cohesive force. This work is stored in the molecules in the form of potential energy. Thus, the potential energy of the molecules lying on the surface is greater than that of the molecules in the interior of the liquid.
Force F required to separate the two plates is given by F = pressure difference × area 2T …(i) = A d Putting the given values in Eq. (i), we get 2 × 75 × 8 F= = 105 dyne 0.012
or r2 =
70 × 10−3 = 0.28 . × 8 × 10−3 × 9.8 314
⇒ r = 0.28 = 0.53 ∴ Maximum diameter of the wire = 2r = 2 × 0.53 ≈ 1.1 m
U 2 = 2 × 4 π (2R )2T = 32πR 2T Hence, required energy
19 (c) The shape of water layer between
coalescing. 4 4 Thus, πR 3 = 2 × πr3 3 3 where, R is radius of bigger drop and r is radius of each smaller drop. ∴ R = 21/ 3 r Now, surface energy per unit surface area is the surface tension. So, Surface energy, W = T∆ A or
Surface energy of smaller drop W 2 = 4 πr2T Hence, required ratio, W 1 / W 2 = 22/ 3 : 1 or T = πr2ρg −3 70 × 10 = 314 . × r2 × 8 × 10−3 × 9.8
U 1 = 2 × 4 πR 2T = 8πR 2T [Q Soap bubble has 2 free surfaces] Final surface energy,
17 (c) Volume remains constant after
Area of each plate wetted by water = A = 8cm 2
18 (b) T ⋅ l = Vρg or T ⋅ l = πr2lρg
16 (b) Initial surface energy,
= 32πR 2T − 8πR 2T = 24 πR 2T
Therefore, surface energy of bigger drop W 1 = 4 π (21/ 3 r)2T = (22/ 3 ) 4 πr2T
W = 4 πR 2T
the two plates is shown in the figure. Thickness d of the film Plate 1
20 (c) When a drop of liquid is split into a large number of drops, the surface area of the liquid increases. In this process, the molecules from the interior of the liquid rise to the surface of the drops, doing work against the cohesive force. This results in a decrease in the internal energy because energy is absorbed. Consequently, the temperature of the drop falls.
21 (d) Work done, W = T × 4 πR 2
d
⇒
Plate 2
= 012 . mm = 0.012 cm d Radius R of the cylindrical face = 2 Pressure difference across the surface T 2T = = R d
W1 T × 4 πR 2 = W 2 T × 4 π (3R )2 =
T × 4 πR 2 1 = T × 36πR 2 9
∴ W1 : W2 = 1 : 9
Topic 5 Excess Pressure (Pressure Difference) 2013 1 A soap bubble in air (two surfaces) has surface tension
0.03 Nm –1 . Find the gauge pressure inside a bubble of diameter 30 mm. [KCET] (a) 2 Pa (b) 8 Pa (c) 16 Pa (d) 10 Pa
2012 2 A bubble of 8 mm diameter is formed in the air. The surface tension of soap solution is 30 dyne/cm. The excess pressure inside the bubble is [AFMC] 2 2 (b) 300 dyne/cm (a) 150 dyne/cm (d) 12 dyne/cm 2 (d) 3 × 103 dyne/cm 2
2011 3 If R is the radius of a soap bubble and S its surface tension, then the excess pressure inside it, is (a) 2S / R (b) 3S / R (c) 4S / R (d) S / R
[J&K CET]
2010 4 A uniform long tube is bent into a circle of radius R and it lies in vertical plane. Two liquids of same volume but densities ρ and δ fill half the tube. The angle θ is [WB JEE] ρ δ − ρ (a) tan −1 (b) tan −1 δ ρ + δ δ (c) tan −1 ρ
R δ
θ
R ρ
ρ + δ (d) tan −1 ρ − δ
2009 5 Excess of pressure in a gas bubble of radius r in a liquid is (liquid gas interface surface tension is S ) 4S S 3S (a) (b) (c) r r r S (e) 2r
[Kerala CEE]
2S (d) r
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2008 6 Two soap bubbles have radii in the ratio of 2 : 1. What is the ratio of excess pressures inside them? (a) 1 : 2 (b) 1 : 4 (c) 2 : 1 (d) 4 : 1
2007 11 The excess of pressure inside the first soap bubble is three times that inside the second bubble. The ratio of volume of the first to that of the second bubble is [Kerala CEE] (a) 1 : 3 (b) 1 : 9 (c) 1 : 27 (d) 9 : 1 (e) 27 : 1
[AMU]
7 A water drop is divided into 8 equal droplets. The pressure difference between the inner and outer side of the big drop will be [BHU] (a) same as for smaller droplet (b) 1/ 2 of that for smaller droplet (c) 1/ 4 of that for smaller droplet (d) twice that for smaller droplet 8 Find the difference of air pressure between the inside and outside of a soap bubble 5 mm in diameter, if the surface tension is 1. 6 Nm −1 . [Manipal] (a) 2560 Nm −2 (b) 3720 Nm −2 (c) 1208 Nm −2 (d) 10132 Nm −2 9 The radius of a spherical drop of water is 1 mm. If surface tension of water be 70 × 10−3 Nm −1 , the pressure difference inside and outside the drop will be [Haryana PMT] (a) 70 Nm −2 (b) 140 Nm −2 −2 (d) zero (c) 280 Nm 10 The excess pressure in a bubble of radius R of a gas in a liquid of surface tension S is [J&K CET] 2S 2R (a) (b) R S 2S 2R 2 (d) (c) 2 S R
12 A soap bubble A of radius 0.03 and another bubble B of radius 0.04 m are brought together, so that the combined bubble has a common interface of radius r, then the value of r is [BCECE] (a) 0.24 m (b) 0.48 m (c) 0.12 m (d) None of these 13 Two liquid drops have diameters of 1 cm and 1.5 cm. The ratio of excess of pressures inside them is [J&K CET] (a) 1 : 1 (b) 5 : 3 (c) 2 : 3 (d) 3 : 2
2006 14 What should be the pressure inside a small air bubble of 01 . mm radius situated just below the water surface? (Take, surface tension of water = 7. 2 × 10−2 Nm −1 and atmospheric pressure = 1. 013 × 105 Nm −2 ) [EAMCET] (a) 2.012 × 105 Nm −2 (c) 1.027 × 105 Nm −2
(b) 2. 012 × 104 Nm −2 (d) 1027 . × 104 Nm −2
2005 15 If two soap bubbles of equal radii r coalesce, then the radius of curvature of interface between two bubbles will be [J&K CET] 1 (a) r (b) zero (c) infinity (d) 2r
Answers 1 (b) 11 (c)
2 (b) 12 (c)
3 (c) 13 (d)
4 (a) 14 (c)
5 (d) 15 (c)
6 (a)
7 (b)
8 (a)
9 (b)
10 (a)
Explanations 1 (b) Gauge pressure = 4T / R
4 × 0.03 = 8 Pa = (30/ 2) × 10−3
2 (b) The excess pressure inside the bubble, 4T 4 × 30 ∆p = = = 300 dyne / cm 2 r 0.4
3 (c) If R is the radius of a soap bubble and S its surface tension, then the excess pressure inside it is 4S / R.
4 (a) From the figure, we have
δgR (cosθ + sin θ ) = ρgR (cosθ − sin θ ) [equating pressure at junction ] ⇒δ cosθ + δ sin θ = ρ cosθ − ρ sin θ ⇒ sin θ (δ + ρ ) = cosθ (ρ − δ )
⇒ ⇒
tanθ =
ρ −δ ρ+δ
ρ −δ θ = tan −1 ρ + δ
5 (d) An air bubble inside a liquid is similar to a liquid drop in air. It has only one free spherical surface. Hence, excess pressure is given by p = 2S / r
6 (a) Excess pressure inside the bubble is given by, p = 4T / r Then, p1 = 4T / r1 p2 = 4T / r2
…(i) …(ii)
From Eqs. (i) and (ii), we have p1 4T / r1 r2 1 = = = p2 4T / r2 r1 2
7 (b) Volume of big drop = Volume of 8 droplets R 4 4 i.e. πR 3 = 8 × πr3 ⇒ r = 2 3 3 For smaller drop, 2T 2T 4T ∆ps = = = r R/2 R For bigger drop, 2T 1 ∆pb = = ∆ps R 2
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MECHANICAL PROPERTIES OF FLUIDS
8 (a) The excess pressure p of bubble in
12 (c) Let the radius of curvature of the
air is given by, 4T 4 × 1. 6 p= = 2560 Nm −2 = R 2. 5 × 10−3
common internal film surface of the double bubble formed by two bubbles A and B be r.
9 (b) The excess pressure p is given by
p = 2T / R where, T is surface tension and R is radius of bubble. Given, T = 70 × 10−3 Nm −1 , R = 1 mm = 10−3 m
B
A r1=0.03
11 (c) Excess pressure inside a soap bubble,
Excess pressure inside B is given by, 4T 4T = p2 = 0.04 r2
p= Given, ∴
p R 4T or 1 = 2 p2 R1 R p1 = 3 p2 3 p2 R2 = R1 p2
or
R1 1 = R2 3
Therefore, ratio of volumes of bubbles V1 (4 / 3)πR13 R13 = = V2 (4 / 3)πR23 R23 3
1 1 = = 3 27 ∴
V1 : V2 = 1 : 27
13
bubble is given by p2 − p1 = 2T / R
p2
10 (a) Excess pressure inside a bubble of radius R inside a liquid = 2S / R, where S is the surface tension of the liquid.
∆p1 3 = ∆p2 2
14 (c) The excess pressure inside the air
r2=0.04
r
2 × 70 × 10−3 = 140 Nm −2 10−3
∆p1 R2 0.75 = ⇒ = ∆p2 R1 0.50
p1
Excess pressure as compared to atmosphere inside A is given by 4T 4T = p1 = 0.03 r1
∴ p=
∴
In the double bubble, the pressure difference between A and B on either side of the common surface is given by 4T 4T 4T − = 0.03 0.04 r 1 1 1 ⇒ − = 0.03 0.04 r 0.03 × 0.04 r= = 012 . m ⇒ 0.01 (d) Excess pressure inside a liquid drop, ∆p = 2T / R where, T is surface tension and R is radius of liquid drop.
2T — R
∴ Pressure inside the air bubble, p2 = p1 + (2T / R ) where, p1 = atmospheric pressure. Substituting the values, we have 2 × 7.2 × 10−2 . × 105 ) + p2 = (1013 10−4 5 −2 = 1027 . × 10 Nm
15 (c) Let radius of curvature of the common internal film surface of the double bubble formed be r′. Then, excess pressure as compared to 4T 4T atmosphere inside A is and B is . r1 r2 The pressure difference is given by 4T 4T 4T − = r1 r2 r′ rr r′ = 1 2 ⇒ r2 − r1 Given, r1 = r2 = r ⇒ r′ = r2 / 0 = ∞
Topic 6 Angle of Contact and Capillarity 2016 1 Three liquids of densities ρ1 , ρ 2 and ρ 3 (with
ρ1 > ρ 2 > ρ 3 ), having the same value of surface tension T, rise to the same height in three identical capillaries. The angles of contact θ1 , θ 2 and θ 3 obey [NEET] π (a) > θ1 > θ 2 > θ 3 ≥ 0 2 π (b) 0 ≤ θ1 < θ 2 < θ 3 < 2 π (c) < θ1 < θ 2 < θ 3 < π 2 π (d) π > θ1 > θ 2 > θ 3 > 2
2014 2 A 20 cm long capillary tube is dipped in water. The water rises upto 8 cm. If the entire arrangement is put in a freely falling elevator, the length of water column in the capillary tube will be [UK PMT] (a) 4 cm (b) 20 cm (c) 8 cm (d) 10 cm
2013 3 The wettability of a surface by a liquid depends primarily on the [NEET] (a) viscosity (b) surface tension (c) density (d) angle of contact between the surface of solid and the liquid
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2012 4 Assertion (A) The water rises higher in a capillary tube of small diameter than in the capillary tube of large diameter. Reason (R) Height through which liquid rise in capillary tube is inversely proportional to the diameter of capillary tube. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) A is correct but R is incorrect (d) A is incorrect but R is correct
2010 5 Two capillary of lengths L and 2L and of radii R and 2R are connected in series. The net rate of flow of fluid through them will be (given rate of the flow through π R4 single capillary, X = ) 8 ηL [JCECE] 8 9 (a) X (b) X 9 8 5 7 (d) X (c) X 7 5
2007 8 A capillary tube is attached horizontally to a constant head arrangement. If the radius of the capillary tube is increased by 10%, then the rate of flow of liquid will change nearly by [AFMC] (a) + 10% (b) + 46% (c) − 10% (d) − 40%
9 If the length of tube is less and cannot accommodate the maximum rise of liquid, then [AFMC] (a) liquid will form fountain (b) liquid will not rise (c) the meniscus will adjust itself, so that the water does not spill (d) None of the above 10 Water rises in plant fibres due to (a) capillarity (b) viscosity (c) fluid pressure (d) osmosis
11 The meniscus of mercury in a capillary glass tube, is (a) concave (b) plane [J&K CET] (c) cylindrical (d) convex
2005 12 Water rises in a capillary tube to a certain height such that the upward force due to surface tension is balanced by 75 × 10−4 N force due to the weight of the liquid. If the surface tension of the water is 6 × 10−2 Nm −1 , the inner circumference of the capillary must be [KCET] (a) 1. 25 × 10−2 m
2008 6 A liquid does not wet the solid surface, if the angle of contact is (a) zero (c) smaller than 90°
[Punjab PMET]
(b) equal to 45° (d) greater than 90°
7 A capillary tube is taken from the earth to the surface of the moon. The rise of the liquid column on the moon (acceleration due to gravity on the earth is 6 times that of the moon) is [EAMCET] (a) six times that on the earth’s surface 1 (b) that on the earth’s surface 6 (c) equal to that on the earth’s surface (d) zero
[KCET]
(b) 0. 50 × 10−2 m (c) 6. 5 × 10−2 m (d) 12. 5 × 10−2 m
13 Water rises upto height h in a capillary tube of certain diameter. This capillary tube is replaced by similar tube of half the diameter. Now, the water will rise to the height of [Kerala CEE] (a) 4 h (b) 3 h (c) 2 h (d) h 1 (e) h 2
Answers 1 (b) 11 (d)
2 (b) 12 (d)
3 (d) 13 (c)
4 (a)
5 (a)
6 (d)
7 (a)
8 (b)
9 (c)
10 (a)
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MECHANICAL PROPERTIES OF FLUIDS
Explanations 1 (b) According to ascent formula for 2T cosθ capillary tube, h = ρgr cosθ 1 cosθ 2 cosθ 3 = = ∴ ρ1 ρ2 ρ3
4 (a) The height of capillary rise is
Thus, cosθ ∝ ρ As, ρ1 > ρ2 > ρ3 ∴ cosθ 1 > cosθ 2 > cosθ 3 0 ≤ θ1 < θ2 < θ3 < π / 2
2 (b) Consider the situation where a capillary tube is dipped in water of density ρ.
5
u =0 a =g
inversely proportional to radius (or diameter) of capillary tube, 1 h∝ r So, for smaller value of r, the value of h is higher. i.e. the water rises higher in a capillary tube of small diameter than in a capillary tube of large diameter. 8 ηL (a) Fluid resistance is given by R = πr 4 When two capillary tubes of same size are joined in series, then equivalent fluid resistance is Req = R1 + R2 =
Net force on the liquid due to surface tension will be upward and is balanced by the downward force of the weight w = πr2hρg = weight of liquid
Equivalent resistance becomes 9/ 8 times, 8 so rate of flow will be X . 9
6 (d) A liquid does not wet the solid
As, 2πrS cosθ = Net force due to surface tension ⇒ πr2hρg = 2πrS cosθ where, S is surface tension and θ is the contact angle. 1 2S cosθ ⇒ h= ⇒ h∝ g r ρg where, g is acceleration due to gravity. When the entire arrangement is falling with an acceleration g. geff = g − g = 0 1 1 Hence, h′ ∝ = =∞ geff 0 Hence, there is an overflow in the capillary tube. As length of the capillary tube is l. ⇒ h′ = l = 20 cm
3 (d) The wettability of a surface by a liquid depends primarily on the angle of contact between the surface of solid and liquid surface. The liquid does not wet the solid surface, if the angle of contact is obtuse, i.e. greater than 90º and wets when angle of contact is acute, i.e. less than 90º.
8ηL 8η × 2L 8ηL 9 + = × π R4 π (2R )4 πR 4 8
7
surface, if the angle of contact is obtuse, i.e. greater than 90°. In this case, cohesive forces will be greater than adhesive forces and so the liquid does not wet the surface of solid. 2T cosθ (a) By the relation, h = rdg
where, r = radius of capillary tube, h = rise or fall of the liquid, g = acceleration due to gravity and d = density of the liquid. 1 h g h∝ ⇒ 2= 1 ∴ g h1 g2 According to the question, On earth, h1 = h, g1 = g On moon, h2 = ? g2 = g / 6 h2 g = ⇒ h2 = 6h h g/6 Hence, the rise of the liquid column on the moon becomes six times that on the earth’s surface.
8 (b) Volume of liquid flowing through capillary per second is given by πpr4 V = 8ηl ⇒
V ∝ r4
⇒
V2 r2 = V1 r1
4
4
110 4 ∴ V2 = V1 = V1 (1.1) = 1. 4641 V 100 ∆V V2 − V1 = V V 14641 . V −V = = 0.46 or 46% ⇒ V
∴
9 (c) If the length of the tube h′ is less than h, it is found that the liquid does not overflow. In a tube of insufficient length, the liquid rises upto the top of the tube and increases the radius of curvature of its meniscus to a value R′ , i.e. smaller the length h′ of the tube, greater will be the radius of curvature R′ of the meniscus, but the liquid will never overflow.
10 (a) The rise or fall of liquids in vertical capillary tubes is called capillarity. Water in plant fibres rises due to same phenomenon.
11 (d) The meniscus of mercury in a capillary glass tube is convex because in case of mercury, the adhesive force between solids and liquids molecules is less than the cohesive force between liquid-liquid molecules.
Mercury
The angle of contact between mercury and clean glass is 137°.
12 (d) 6 × 10−2 × Circumference = Force ∴Circumference =
75 × 10−4 6 × 10−2
= 12. 5 × 10−2 m
13 (c) According to Jurin’s law, the rise in capillary tube is inversely proportional to the radius of capillary tube. 1 h r d or h ∝ or 2 = 1 = 1 r h1 r2 d2
Given, d2 = d1 / 2 h d ∴ 2 = 1 = 2 or h2 = 2h1 = 2h h1 d1 / 2
10 Thermal Properties of Matter Quick Review Temperature and Heat
To convert the temperature of one scale to another, the following relation is used
Temperature Temperature is the property of a state of matter by virtue of which we predict the hotness or coldness of a body relative to some body. The devices which are used to measure the temperature are termed as thermometers, while the science related to measurement of temperature is termed as thermometry.
Heat is a form of energy called thermal energy which flows from a higher temperature body (hotter) to a lower temperature body (colder) when they are placed in contact.
Measurement of Temperature The measurement of temperature is done by some specified scales as given below Different Scales to Measure the Temperature Measuring Unit
Freezing or ice point (Lower fixed point)
Boiling or steam point (Upper fixed point)
Celsius scale
Degree centigrade (°C)
0°C
100°C
Fahrenheit scale
Degree Fahrenheit (°F)
32°F
212°F
Degree Reaumur (°R)
0° R
80°R
Kelvin (K)
273.15 K
373.15 K
Reaumur scale Kelvin scale
=
Temperature on other scale − LFP (ice point) UFP (steam point) − LFP (ice point)
• Relation between C , F and K temperature scales is
given below
Heat
Name of Scale
Temperature on one scale − LFP (ice point) UFP (steam point) − LFP (ice point)
C F − 32 K − 273 = = 5 9 5
Thermometers The thermometers work on the thermometric property, i.e. the property which changes with temperature like any physical quantity such as length, volume, pressure and resistance, etc., which varies linearly with a certain range of temperature. Let X denote the thermometric physical quantity and X 0 , X 100 and X t be its values at 0°C, 100°C and t°C, respectively. Then, X − X0 temperature, t = t × 100°C X 100 − X 0
Thermal Expansion When matter is heated without any change in its state, it usually expands. This phenomena of expansion of matter on heating is called thermal expansion. There are three types of thermal expansions
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THERMAL PROPERTIES OF MATTER
1. Expansion of Solids Three types of expansion takes place in solid as given below (i) Linear Expansion The expansion in length of a body due to increase in its temperature is called the linear expansion. Linear expansion
original surface area per degree rise in its temperature. Its unit is ° C −1 or K −1 . (iii) Cubical Expansion The expansion in the volume of an object due to increase in its temperature is known as cubical or volume expansion.
∆l
Volume expansion
∆V
Increase in length, l2 = l1 (1 + α ∆t ) where, l1 and l2 are initial and final lengths, ∆t = change in temperature and α = coefficient of linear expansion. Coefficient of linear expansion, ∆l α= l × ∆t where, l = real length and
∆l = change in length
and
∆t = change in temperature.
The coefficient of linear expansion of a material of a solid rod is defined as increase in length per unit original length per degree rise in temperature. Its unit is ° C −1 or K −1 . (ii) Superficial Expansion The expansion in the area of a surface due to increase in its temperature is called area expansion. Superficial expansion
Increase in volume, V2 = V1 (1 + γ ∆t ) where, V1 and V2 are initial and final volumes and γ is a coefficient of cubical expansion. ∆V The coefficient of cubical expansion, γ = V × ∆t where, V = real volume, ∆V = change in volume and ∆t = change in temperature. The coefficient of volume (cubical) expansion of a substance is defined as the increase in volume per unit original volume per degree rise in its temperature. Its unit is °C −1 or K −1 . • Relation between coefficients of linear, superficial and cubical expansions β = 2α and γ = 3α or α : β : γ = 1: 2 : 3
2. Expansion of Liquids Liquids do not have linear and superfical expansion but these only have volumetric expansion. ∆A
Increase in area, A 2 = A 1 (1 + β ∆t ) where, A1 and A 2 are initial and final areas and β is a coefficient of superficial expansion. Coefficient of superficial expansion, ∆A β= A × ∆t where,
A = area, ∆A = change in area
and
∆t = change in temperature.
The coefficient of area expansion of metal sheet is defined as the increase in its surface area per unit
Since, liquids are always heated in a vessel, so initially on heating the system (liquid + vessel), the level of liquid in vessel falls (as vessel expands more since it absorbs heat and liquid expands less) but later on, it starts rising due to faster expansion of the liquid. Thus, liquids have two coefficients of volume expansion (i) Apparent Expansion of Liquids When expansion of the container containing liquid, on heating is not taken into account, then observed expansion is called apparent expansion of liquids. Coefficient of apparent expansion of a liquid (γ a ) =
apparent (or observed) increase in volume original volume × change in temperature
(ii) Real Expansion of Liquids When expansion of the container, containing liquid, on heating is also taken into account, then observed expansion is called real expansion of liquids.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Coefficient of real expansion of a liquid (γ r ) =
real increase in volume original volume × change in temperature
Both γ r and γ a are measured in ° C–1 . We can show that γr = γa + γg where, γ g is the coefficient of cubical expansion of the container (vessel).
Anomalous Expansion of Water Generally, with increasing temperature, the volume expansion coefficient of liquids is about ten times greater than that of solids. Water is an exception to this rule. From 0°C to 4°C water contracts and beyond 4°C, it expands. Thus, density of water reaches a maximum value of 1000 kgm −3 at 4°C.
3. Thermal Expansion of Gases On heating, gases expand more than solids or liquids and equal volumes of different gases expands equally, when heated by the same amount. All gases have coefficient of volume expansion γ V with volume variation given by V = V0 (1 + γ V ∆θ ) and pressure variation is given by p = p 0 (1 + γ p ∆θ )
Variation of Density with Temperature Most substances expand when they are heated, i.e. volume of a given mass of a substance increases on heating, so density 1 decreases. Hence ρ ∝ , ρ′ = ρ(1+ γ∆T ) −1 , as γ is small V (1+ γ∆T ) −1 ≈ 1− γ∆T ρ′ ≈ ρ(1− γ∆T )
Thermal Strain and Thermal Stress When a metal rod whose ends are rigidly fixed so as to prevent the rod from expansion or contraction, undergoes a change in temperature, thermal strains and thermal stresses are developed in the rod. If a rod of length l is heated by a temperature ∆T, then increase in length of rod should have been ∆l = lα ∆T . But due to being fixed at ends rod does not expand and a compressive thermal strain is developed in it whose value is ∆l Thermal (compressive) strain = = α ∆T l Here, α = linear expansion coefficient of the material of rod. Due to this strain, a thermal stress is developed in the rod having a value.
Thermal stress = Y × Thermal strain = Y α ∆T Thermal stress = Yα∆T Here, Y = Young’s modulus of the material of given rod. If A be the cross-section area of the rod, then force exerted by the rod on the supports will be F = Yα∆T A.
Heat Capacity The heat capacity is defined as amount of heat needed to change the temperature by unity, i. e.1° C, it is denoted by S and having SI unit JK −1. ∆Q ∆T where, ∆Q = heat absorbed or rejected by body
Heat capacity, S =
and
∆T = change in temperature.
Specific Heat Capacity • The quantity of heat Q required to change the
temperature of a mass m of certain material by ∆T, is approximately proportional to the product of m and ∆T, i.e. Q ∝ m∆T or Q = ms ∆T where, s = specific heat capacity of the material. • Specific heat capacity can have any value from 0 to ∞. For some substances under particular situations, it can have negative values also. Specific heat of ice is 500 cal/kg °C and that of water is 1000 cal/kg°C.
Molar Heat Capacity The amount of heat required to change the temperature of unit mole of substance by 1°C is termed as its molar heat capacity. C = Q / µ∆T where, µ = number of moles = m / M Types of molar specific heat capacity are as follows (i) Molar specific heat capacity at constant pressure (C p ) is expressed as ∆Q Cp = ∆T p = constant (ii) Molar specific heat capacity at constant volume (CV ) ∆Q CV = ∆T V = constant • Relation between specific heat and molar heat capacity
can be expressed as C = Ms where, C = molar heat capacity, M = molecular mass of the substance and s = specific heat capacity.
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THERMAL PROPERTIES OF MATTER
Calorimetry It is the branch of science which deals with the measurement of heat. When a body at higher temperature is brought in contact with another body at lower temperature, then the heat flows from the body kept at higher temperature to the body kept at lower temperature till the both bodies acquire the same temperature. Principle of calorimetry is expressed as Heat lost by hotter body = Heat gained by colder body m1 s1 ∆T = m2 s2 ∆T where, m1 = mass of hot body, m2 = mass of cold body, and
s1 = specific heat of hot body s2 = specific heat of cold body.
Change of State The process of converting one state of a substance into another state is known as change of state of a substance or matter. Matter generally exists in three states (i) Solid (ii) Liquid (iii) Gas These states can be changed into one another by absorbing heat or rejecting heat. The process is so called the change of state. The temperature of a substance remains constant during change of state.
Triple Point of Water The values of pressure and temperature at which water coexists in equilibrium in all three states of matter, i.e. ice, water and vapour is called triple point of water. Triple point of water is 273 K temperature and 0.46 cm of mercury pressure.
Latent Heat The amount of heat transferred per unit mass during the change of state of a substance without any change in its temperature is called latent heat of the substance for particular change. Q ∝ m ⇒ Q = mL where, L = latent heat of the material. There are two types of latent heat of materials (i) Latent Heat of Fusion or Melting It is the quantity of heat required to change the state of a substance from solid to liquid state at its melting point. It is denoted by L f .
Latent heat of fusion, Q Lf = m Its SI unit is Jkg −1 . (ii) Latent Heat of Vaporisation It is the quantity of heat required to change the state of unit mass of a substance from liquid to vapour state at its boiling point. It is denoted by LV . Q Latent heat of vaporisation, LV = and its SI unit m is Jkg −1 .
Heat Transmission Heat can be transferred from one part of system to another. It is called heat transmission. There are three methods of heat transmission, Conduction, Convection and Radiation.
Conduction In solids, heat is transmitted from higher temperature to lower temperature without actual movements of the particles. This mode of transmission of heat is called conduction. • Thermal Conductivity The ability of material to conduct the heat through it, is known as thermal conductivity. The amount of heat flow in a conducting rod, KA ∆θt l where, K = coefficient of thermal conductivity, A = area of cross-section, l = length of rod, ∆θ = temperature difference between the ends of the rod and t = time. Q=
The SI unit of K is Wm −1 K −1 and its dimensional formula is [ MLT −3θ −1 ]. • The rate of flow of heat is known as thermal or heat
current. It is denoted by H. KA∆θ l • Thermal resistance is given by ∆θ l R= = H KA H=
Its SI unit is K/W and its dimensional formula is [ M −1L−2 T 3θ −1 ].
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
• Connection of rods with different thermal conductivities
are shown in following table
Mode of connection
Thermal conductivity
Figure
In series combination of two metal rods
T1
K1
T2
K2
A l1
In parallel combination of two metal rods
T1
l2
T2
High temperature reservoir
T3
l1 + l2 l1 l + 2 K1 K2 2K 1K 2 = K1+ K2 (if l1 = l2) K A + K 2 A2 Kp = 1 1 A1 + A2 Ks =
=
K1 + K2
2 Low temperature reservoir (if A1 = A2 )
Note If temperature of common interface of the series combination be T, K T + K2T2 then it can be expressed as T = 1 1 K1 + K2
Convection The process of heat transmission in which the particles of the fluid (liquid or gas) move is called convection. Land breeze, see-breeze and trade wind are formed due to convection.
Radiation The process of heat transmission in the form of electromagnetic waves, is called radiation. Radiation do not require any medium for propagation. It propagates without heating the intervening medium. The heat energy transferred by radiation is called radiant energy. Heat from the sun reaches the earth by radiation.
Reflectance or Reflecting Power The ratio of the amount of thermal radiations reflected by a body in a given time to the total amount of thermal radiations incident on the body in that time is called reflectance or reflecting power of the body. It is denoted by r.
Absorptance or Absorbing Power The ratio of the amount of thermal radiations absorbed by a body in a given time to the total amount of thermal radiations incident on the body in that time is called absorptance or absorbing power of the body. It is denoted by a.
Transmittance or Transmitting Power The ratio of the amount of thermal radiations transmitted by the body in a given time to the total amount of thermal radiations incident on the body in that time is called transmittance or transmitting power of the body. It is denoted by t. Relation among reflecting power, absorbing power and transmitting power r+ a+ t =1 If body does not transmit any heat radiations, then t = 0 ∴ • • • •
r+ a=1 r, a and t all are the pure ratio, so they have no unit and dimensions. For perfect reflector, r = 1, a = 0 and t = 0. For perfect absorber, a = 1, r = 0 and t = 0 (perfect black body). For perfect transmitter, t = 1, a = 0 and r = 0.
Emissive Power Emissive power of a body at a particular temperature is the total amount of thermal energy emitted per unit time per unit area of the body for all possible wavelengths. 1 dθ It is denoted by e λ , e λ = ⋅ A dt
Emissivity Emissivity of a body at a given temperature is equal to the ratio of the total emissive power of the body ( e λ ) to the total emissive power of a perfectly black body ( E λ ) at that temperature. e Emissivity, ε = λ Eλ
Perfectly Black Body A body which absorbs completely the radiations of all wavelengths incident on it, is called a perfectly black body. For a perfectly black body, emissive power ( E λ ) = 1. Lamp black is 96% black and platinum black is about 98% black.
Kirchhoff’s Law of Radiation This law states that, the ratio of emissive power to absorptive power is same for all surfaces at the same temperature and is equal to the emissive power of a perfectly black body at that temperature. e e Mathematically, 1 = 2 = L = E a1 a 2
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THERMAL PROPERTIES OF MATTER
Stefan’s Law
Newton’s Law of Cooling
According to this law, the emissive power of a perfectly black body (energy emitted by a black body per unit surface area per unit time) is directly proportional to the fourth power of its absolute temperature. Mathematically,
E ∝T 4
or
E = σT 4
where, σ is a constant known as the Stefan’s constant. Value of σ is 5.67 × 10−8 Wm −2 K −4 . • The total radiant energy Q emitted by a body of surface
area A in time t is given by Q = Ate = AtεσT 4 • The radiant power (P), i.e. energy radiated by a body per
unit time is given by Q = AεσT 4 t • If a body at temperature T is surrounded by another body at temperature T0 (where, T0 < T ), then Stefan’s law is modified as E = σ (T 4 − T04 ) P=
e = εσ (T 4 − T04 )
and
• According to this law of cooling, rate of cooling of a
body is directly proportional to the temperature difference between the body and the surroundings provided that the temperature difference is small. Mathematically, dT dT – ∝ (T − T0 ) or − = k (T − T0 ) dt dt where, k is a constant. • If a body cools by radiation through a small temperature difference from T1 to T2 in a short time t when the T + T2 surrounding temperature is T0 , then T = k 1 − T0 2
Wien’s Displacement Law This law states that as temperature of black body T increases, the wavelength λ m corresponding to the 1 maximum emission decreases such that λ m ∝ T or λm T =b where, b is known as Wien’s constant and its value is 2. 89 × 10−3 m-K.
Topical Practice Questions All the exam questions of this chapter have been divided into 6 topics as listed below Topic 1
—
THERMOMETRY
252–253
Topic 2
—
THERMAL EXPANSION
253–258
Topic 3
—
SPECIFIC HEAT CAPACITY, CALORIMETRY AND LATENT HEAT
258–262
Topic 4
—
THERMAL CONDUCTION AND CONVECTION
263-269
Topic 5
—
RADIATION I (KIRCHHOFF’S LAW AND BLACK BODY)
269-271
Topic 6
—
RADIATION II (WIEN’S LAW, STEFAN’S LAW AND NEWTON’S LAW OF COOLING)
271-281
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 1 Thermometry 2017 1 Mercury boils at 367°C. However, mercury thermometers are made such that they can measure temperature upto 500°C. This is done by [JIPMER] (a) maintaining vacuum aboves mercury column in the stem of the thermometer (b) filling nitrogen gas at high pressure above the mercury column (c) filling oxygen gas at high pressure above the mercury column (d) filling nitrogen gas at low pressure above the mercury column
2014 2 A scientist proposes a new temperature scale in which the ice point is 25 X (X is the new unit of temperature) and the steam point is 305 X. The specific heat capacity of water in this new scale is (in Jkg −1 X −1 ) [WB JEE] (a) 4.2 × 10
3
3
(b) 3.0 × 10 (c) 1.2 × 10
3
(d) 1.5 × 10
3
2013 3 Two thermometers are constructed in the same way except that one has a spherical bulb and the other a cylindrical bulb, which one will respond quickly to temperature changes? [WB JEE] (a) Spherical bulb thermometer (b) Cylindrical bulb thermometer (c) Both equally (d) None of the above
2012 4 If a thermometer reads freezing point of water as 20°C and boiling point as 150°C, how much thermometer read when the actual temperature is 60°C? [AFMC] (a) 98°C (b) 10°C (c) 40°C (d) 60°C
5 In a mercury thermometer, the ice point (lower fixed point) is marked as 10° and the steam point (upper fixed point) is marked as 130°. At 40°C temperature, what will this thermometer read? [WB JEE] (a) 78° (b) 66° (c) 62° (d) 58°
2011 6 Two temperature scales A and B are related by A − 42 B − 72 . At which temperature two scales have = 110 220 the same readings? [WB JEE] (a) – 42° (b) – 72° (c) + 12° (d) – 40°
2010 7 Oxygen boils at − 183° C. This temperature is approximately in Fahrenheit is (a) − 329° F (b) − 261° F (c) − 215° F (d) − 297° F
[CG PMT]
2009 8 If absolute zero is –273.15°C on Celsius temperature scale, then the absolute zero on the Fahrenheit scale is (a) − 227.15° F (b) − 453.15° F (c) − 459.67° F (d) − 491.67° F
[BVP]
2008 9 On a new scale of temperature (which is linear) and called the W scale, the freezing and boiling points of water are 39°W and 239°W, respectively. What will be the temperature on the new scale, corresponding to a temperature of 39°C on the Celsius scale? [CBSE AIPMT] (a) 78°W (b) 117°W (c) 200°W (d) 139°W
2006 10 The temperature of a body is 95°F, what will be reduction at Celsius scale? (a) 7°C (c) 63°C
[BHU]
(b) 65°C (d) 35°C
2005 11 A faulty thermometer has its fixed point marked as 5° and 95°C. The temperature of a body as measured by the faulty thermometer is 59°C. The correct temperature of the body on Celsius scale is [Haryana PMT] (a) 40°C (b) 60°C (c) 20°C (d) 30°
Answers 1 (b) 11 (b)
2 (d)
3 (b)
4 (a)
5 (d)
6 (c)
7 (d)
8 (c)
9 (b)
10 (d)
THERMAL PROPERTIES OF MATTER
Explanations ⇒ 100x − 1000 = 4800 ⇒ 100x = 5800 ⇒ x = 58°
1 (b) If we fill nitrogen gas at a high pressure above mercury level, the boiling point of mercury is increased which can extend to the range upto 500° C.
6 (c) We are given the relation between the temperature scale A and B as A – 42 B – 72 , so for the two scales = 110 220 to have the same reading, A – 42 A – 72 A = B and so, = 110 220 A − 42 A − 72 = ⇒ 1 2
2 (d) Given, 305 X − 25 X =100° C (Q X is the new unit of temperature) (305 − 25) X = 100° C ⇒ 1° C = 2.8 X The specific heat capacity of water J = 4200 kg° C J = 4200 × kg × 2.8 X =1500 J/kg-X = 1.5 × 103 J kg−1X−1
3 (b) Cylindrical bulb thermometer has more area as compared to spherical one, so the heat received by the cylindrical bulb is more, which will make it indicate change in temperature, more quickly.
4 (a) Temperature on any scale can be
5
converted into other scale by λ − LFP = constant for all scales UFP − LFP x − 20 60 = ⇒ x = 98° C 150 − 20 100 x − 10 40 (d) = 130 − 10 100
unknown scale, then we follow the equation (Temperature on known scale) − (LFP for known scale) (UFP − LFP) known (Temperature on unknown scale) − (LFP for unknown scale) = (UFP − LFP) unknown ⇒
39 − 0 t − 39 = 100 − 0 239 − 39
⇒
t = 117° W Note LFP→ Lower Fixed Point
⇒ 2 A − 84 = A − 72
UFP→ Upper Fixed Point
10 (d) The relation between Celsius scale
⇒ 2 A − A = 84 − 72 ⇒
7
A = 12° C F − 32 (d) = 5 9 183 F − 32 = ⇒ − 5 9 ⇒
F = − 297.4 ° F ≈ −297° F
8 (c) Celsius and Kelvin scales are C F − 32 = 5 9 − 273.15 F − 32 = 5 9 F = − 459.67 °F
related as ⇒ ⇒
and Fahrenheit scale is 9 TF = 32 + TC 5 5 TC = (TF − 32) ⇒ 9 Given, TF = 95° F ∴ TC = 5 / 9(95 − 32) = 35° C
11 (b) x be the temperature measured by faulty thermometer C −0 x − lower fixed point = ∴ 100 Number of divisions between the two fixed points ⇒
9 (b) In general, whenever we compare any known scale to any
C 59 − 5 = 100 − 0 95 − 5 C 54 = ⇒ C = 60° C 100 90
⇒
Topic 2 Thermal Expansion 2019 1 A copper rod of 88 cm and an aluminium rod of unknown length have their increase in length independent of increase in temperature. The length of aluminium rod is [NEET (National)] (a) 113.9 cm (b) 88 cm (c) 68 cm (d) 6.8 cm
2 The wooden wheel of radius R is made of two semicircular parts (see figure). The two parts are held together by a ring made of a metal strip of cross-sectional area S and length L. L is slightly less than 2πR. To fit the ring on the wheel, it is heated so that its temperature rises by ∆T and it just steps over the wheel. As it cools down
to surrounding temperature, it presses the semicircular parts together. If the coefficient of linear expansion of the metal is α and its Young’s modulus is Y , the force that one part of the wheel applies on the other part is [JIPMER]
R
(a) 2πSYα∆T (c) πSYα∆T
(b) SYα∆T (d) 2SYα∆T
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2018 3 The coefficient of volume expansion of glycerine is
49 × 10−5 ° C−1 . What is the fractional change in density for a 30° C rise in temperature? [JIPMER] (a) 0.0155 (b) 0.0145 (c) 0.0255 (d) 0.0355
4 How much should the temperature of a brass rod be increased so as to increase its length by 1%? (Take, α for brass is 0.00002°C −1 ) [JIPMER] (a) 300°C (b) 400°C (c) 500° C (d) 550° C 2017 5 The coefficient of cubical expansion of mercury is 0.00018/°C and that of brass 0.00006 /°C. If a barometer having a brass scale were to read 74.5 cm at 30°C, find the true barometric height at 0°C. The scale is supposed to be correct at 15°C. [AIIMS] (a) 74.122 cm (b) 79.152 cm (c) 42.161 cm (d) 142.39 cm
2016 6 Coefficient of linear expansion of brass and steel rods are
α 1 and α 2 . Lengths of brass and steel rods are l1 and l2 respectively. If ( l2 − l1 ) is maintained same at all temperatures, which one of the following relations holds good ? [NEET] 2 2 2 2 (b) α 1 l2 = α 2 l1 (a) α 1 l2 = α 2 l1 (c) α 1 l1 = α 2 l2 (d) α 1 l2 = α 2 l1
2014 7 The length of a steel rod is 5 cm longer than that of a brass rod. If this difference in their lengths is to remain the same at all temperatures, then the length of brass rod will be (coefficient of linear expansion for steel and brass are 12 × 10−6 / ° Cand 18 × 10−6 / ° C respectively) [EAMCET] (a) 20 cm (b) 15 cm (c) 5 cm (d) 10 cm
8 In anomalous expansion of water, at what temperature, the density of water is maximum? [KCET] (a) 4°C (b) < 4°C (c) > 4°C (d) 10° C
2012 9 A non-conducting body floats in a liquid at 20° Cwith 2/ 3 of its volume immersed in the liquid. When liquid temperature is increased to 100°C, 3/4 of body’s volume is immersed in the liquid. Then, the coefficient of real expansion of the liquid is (neglecting the expansion of container of the liquid) [AIIMS] −4 −1 −4 −1 (a) 15.6 × 10 ° C (b) 156 × 10 ° C −4 −1 (c) 1.56 × 10 ° C (d) 0.156 × 104 ° C−1
10 When the temperature of a rod increases from t to t + ∆t, its moment of inertia increases from I to I + ∆I . If α be the coefficient of linear expansion of the rod, then the value of ∆I / I is [Kerala CEE] α∆t ∆t (d) (a) 2α∆t (b) α∆t (c) 2 α ∆t (e) 2α
2010 11 A clock with a metal pendulum beating seconds keeps correct time at 0° C.. If it loses 12.5 s a day at 25°C, the coefficient of linear expansion of metal pendulum is 1 1 (a) /°C (b) /°C [AIIMS] 86400 43200 1 1 /°C (d) /°C (c) 14400 28800
12 There are two spheres of same radius and material at same temperature but one being solid while the other hollow. Which sphere will expand more if they are heated to same temperature? [OJEE] (a) Hollow sphere (b) Solid sphere (c) Both will expand equally (d) None of these 13 An ideal gas is initially at temperature T and volumeV. Its volume is increased by ∆V due to an increase in temperature ∆T, pressure remaining constant. The ∆V physical quantity δ = varies with temperature as V∆T [EAMCET] δ
δ
(a)
T
T+∆T
(b) T
T
T+∆T
T
δ
δ
(c)
T T
T+∆T
(d) T
T+∆T
T
14 The coefficient of real expansion of mercury is 0.18 × 10−3 C−1 . If the density of mercury at 0° C is [Manipal] 13.6 g / cc, its density at 473 K will be (a) 13.12 g/cc (b) 13.65 g/cc (c) 13.51 g/cc (d) 13.22 g/cc
2009 15 The volume of mercury in the bulb of a thermometer is
10−6 m 3 . The area of cross-section of the capillary tube is 2 × 10−7 m 2 . If the temperature is raised by 100° C, the increase in the length of the mercury column is [EAMCET] (Take, γ Hg = 18 × 10−5 /° C) (a) 18 cm (b) 0.9 cm (c) 9 cm (d) 1.8 cm
255
THERMAL PROPERTIES OF MATTER
16 There is some change in length when a 33000 N tensile force is applied on a steel rod of area of cross-section 10−3 m 2 . The change of temperature required to produce the same elongation, if the steel rod is heated, is (the modulus of elasticity is 3 × 1011 Nm −2 and the coefficient of linear expansion of steel is 1.1 × 10−5 °C−1 ) [BITSAT] (a) 20°C
(b) 15°C
(c) 10°C
2006 22 A bimetallic strip consists of metals X and Y . It is mounted rigidly at the base as shown. The metal X has a higher coefficient of expansion compared to that for metal Y. When bimetallic strip is placed in a cold bath, (a) it will bend towards the right (b) it will bend towards the left (c) it will not bend but shrink (d) it will neither bend nor shrink
(d) 0°C
17 A bimetallic strip consists of brass and iron when it is heated it bends into an arc with brass on the convex and iron on the concave side of the arc. This happens, because [BCECE]
(a) brass has a higher specific heat capacity than iron (b) density of brass is more than that of iron (c) it is easier to bend an iron strip than a brass strip of the same size (d) brass has a higher coefficient of linear expansion than iron
2008 18 What fraction of the volume of a glass flask must be filled with mercury, so that the volume of the empty space may be the same at all temperatures? (Take, α glass = 9 × 10−6 / ° C, γ Hg = 18.9 × 10−5 / ° C) [Punjab PMET]
1 2 1 (c) 4
1 7 1 (d) 5
(a)
(b)
19 A clock which keeps correct time at 20°C is subjected to 40°C. If coefficient of linear expansion of the pendulum is 12 × 10−6 / ° C.. How much will it gain or loss in time? (a) 10.3 s/day (b) 20.6 s/day [Punjab PMET] (c) 5 s/day (d) 20 min/day 20 A 2 L glass flask contains some mercury. It is found that at all temperatures the volume of the air inside the flask remains the same. The volume of the mercury inside the flask is (α for glass = 9 × 10−6 / ° C, γ for mercury = 1.8 × 10−4 / ° C) [EAMCET] (a) 1500 cc
(b) 150 cc
(c) 3000 cc
(d) 300 cc
2007 21 Coefficient of cubical expansion of water is zero at (a) 0°C
(b) 4°C
(c) 15.5 °C
[AMU]
(d) 100°C
X
Y
[AIIMS]
23 A vertical column 50 cm long at 50°C balances another column of same liquid 60 cm long at 100°C. The coefficient of absolute expansion of the liquid is [Manipal] (a) 0.005/°C (b) 0.0005/°C (c) 0.002/°C (d) 0.0002/°C 24 The coefficient of apparent expansion of a liquid when determined using two different vessels A and B are γ 1 and γ 2 , respectively. If the coefficient of linear expansion of vessel A is α. The coefficient of linear expansion of the vessel B is [Haryana PMT] αγ 1 γ 2 γ1 − γ 2 (a) (b) γ1 + γ 2 2α τ γ − γ2 γ − γ2 (d) 1 (c) 1 +α +α 3 3
2005 25 A beaker is completely filled with water at 4°C. It will overflow, if [Punjab PMET] (a) heated above 4°C (b) cooled below 4°C (c) Both heated and cooled above and below 4°C respectively (d) None of the above
26 Two uniform metal rods of lengths l1 and l2 and linear coefficients of expansions α 1 and α 2 , respectively are connected to form a single rod of length ( l1 + l2 ). When the temperature of the combined rod is raised by t ° C, the length of each rod increases by the same α2 [EAMCET] amount.Then, is α1 + α 2 l l + l2 l2 l + l2 (a) 1 (b) 1 (d) 1 (c) l1 + l2 l1 l1 + l2 l2
Answers 1 (c) 11 (a) 21 (b)
2 (d) 12 (a) 22 (b)
3 (b) 13 (c) 23 (a)
4 (c) 14 (a) 24 (d)
5 (a) 15 (c) 25 (c)
6 (c) 16 (c) 26 (c)
7 (d) 17 (d)
8 (a) 18 (b)
9 (a) 19 (a)
10 (a) 20 (d)
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (c) Due to change in temperature, the thermal strain produced in a rod of length L is given by ∆L = α ∆T ⇒ ∆L = L α ∆T L where, l = original length of rod and α = coefficient of linear expansion of solid rod. As the change in length (∆l ) of the given two rods of copper and aluminium are independent of temperature change, i.e. ∆T is same for both copper and aluminium. … (i) LCuα Cu = LAlα Al Here, α Cu = 17 . × 10−5 K −1 −5
α Al = 2.2 × 10
K
−1
and LCu = 88 cm Substituting the given values in Eq. (i), we get . × 10−5 × 88 ~ α L 17 LAl = Cu Cu = − 68 cm α Al 2.2 × 10−5 temperature. ...(i)
where, α = coefficient of linear expansion which is compensated by elastic strain, when temperature becomes normal, i.e. TL ...(ii) ∆l = YS From Eqs. (i) and (ii), we get TL = Lα∆T YS ⇒ T = YSα∆T At equilibrium, force exerted by one-half on other, F = 2T = 2YSα∆T
3 (b) Here, γ = 49 × 10−5 ° C−1,
∴
As, ∴ or
∆L = αL∆T ∆L α ∆T = L 1 ∆L ∆T = = Lα 100 × 0.00002 ∆T =
γ brass 0.00006 = 3 3 = 0.00002 = 2 × 10− 5 / °C
5 (a) As, α brass =
The brass scale is true at 15°C, therefore at 30°, its graduations will increase in length and so observed reading will be less than actual reading at 30°. ∴The change in reading, ∆l = lα brass (∆T ) = 74. 5 × 2 × 10− 5 (30 − 15)
∆T = 30° C V ′ = V + ∆V = V (1 + γ ∆T ) V ′ = V (1 + 49 × 10−5 × 30)
= 1.0147V m m m and ρ′ = Q ρ= = V V ′ 1.0147 V = 0.9855 ρ Hence, fractional change in density ρ − ρ′ ρ − 0.9855 ρ = = = 0.0145 ρ ρ
∴ Actual reading at 30°C, l30 = lobserved + ∆l = 74. 5 + 0. 02235 = 74. 522 cm Assuming area of cross-section to be constant, we have V0ρ 0 = V30ρ 30 or ah0ρ 0 = ah30ρ 30 Therefore, true height at 0°C, h30 ρ h0 = h30 30 = ρ 0 (1 + γ Hg ∆T ) =
7 (d) Given, LSt − L Br = 5 cm, LSt = L, LBr = (L − 5) cm α St = 12 × 10−6 / ° C, α Br = 18 × 10−6 / ° C We know that, α St = ∆LSt / LSt × t1 ∆L …(i) 12 × 10−6 = L×t
105 = 500°C 2 × 102
= 0. 02235 cm
2 (d) Elongation due to change in ∆l = Lα∆ T
∆L 1 , = L 100 α = 0.00002° C −1
4 (c) Here, ∆T = ?,
74.522 74.522 = 1 + 0.00018 × 30 1.0054
= 74 .122 cm
6 (c) According to question, Coefficient of linear expansion of brass = α1 Coefficient of linear expansion of steel = α2 Length of brass and steel rods are l1 and l2, respectively. As given difference increase in length (l2′ − l1′ ) is same for all temperature. So, l2′ − l′1 = l2 − l1 ⇒ l2 (1+ α 2∆t ) − l1 (1 + α 1 ∆t ) = l2 − l1 ⇒ l2α 2 = l1α 1
∆LBr LBr × t2 ∆L = (L − 5) × t
α Br = 18 × 10−6
…(ii)
Dividing Eq. (i) by Eq , (ii), we get ∆L / L × t 12 × 10−6 = 18 × 10−6 ∆L /(L − 5) × t ⇒ ⇒ So,
2 L−5 = 3 L 2L = 3L − 15 L =15 LBr = L − 5 = 15 − 5 = 10 cm
8 (a) When cooled from room temperature, liquid water becomes dense, like other substances, but at approximately 4°C (39° F), pure water reaches its maximum density. If it is cooled further, it expands to become less dense.
9 (a) Coefficient of real expansion, γR =
V2 − V1 V1 (t2 − t1 )
3 2 , V1 = 4 3 and (t2 − t1 ) = (100 − 20) = 80°C 3 2 − 4 3 1 = ∴ γR = 2 640 (80) 3 Here,
V2 =
= 15.6 × 10−4 ° C−1
10 (a) Moment of inertia of a rod, I = On differentiating w.r.t. l, we get M dI = 2l dl 12 M 2l dl dI = 12 2 ∴ I Ml 12 dI dl = 2 = 2α∆t ⇒ I l
Ml 2 12
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THERMAL PROPERTIES OF MATTER
11 (a) Number of second lost in a day,
15 (c) By cubical expansion relation, ∆V = V × γ∆T
1 ∆t = α ∆θ × 86400 2 The coefficient of linear expansion of metal pendulum, 2∆t α= ∆θ × 86400
where, γ = coefficient of cubical expansion, V = 10−6 m 3
2 × 12.5 25 × 86400 1 / °C = 86400
∆T = 100°C ∆V = 10−6 × 18 × 10−5 × 102 = 18 × 10−9 m 3
both the solid and hollow spheres having same radii and temperature, hollow sphere will expand more. As, hollow sphere has lesser mass, its rise in temperature will be more because Q , but apparently it seems for ∆T = MC both are having same expansion coefficient (γ) as both of them are of same material. Change in volume, ∆V = γV∆T As ∆T is more for hollow sphere, so it will expand more.
13 (c) From ideal gas equation,
… (i) pV = RT or … (ii) p∆ V = R ∆ T Dividing Eq. (ii) by Eq. (i), we get ∆V ∆T = V T ∆V ∆V 1 Qδ = = =δ ⇒ V∆T V∆T T
So, the graph between δ and T will be T + ∆T
T T
14 (a) Here, t1 = 0° C = 273K, t2 = 473K γ r = 0.18 × 10−3 C−1
d1 = 13.6 g/cc, d2 = ? d1 d2 = 1 + γ r (∆t ) = ⇒
13.6 1 + 0.18 × 10−3 × (473 − 273) 13.6 d2 = 1.036 = 13.12g/cc
= 12 × 10−5
Since, ∆V = A × ∆l ∴ 18 × 10−9 = 2 × 10−7 × ∆l
12 (a) If same amount of heat is given to
δ
19
= initial volume γ = 18 × 10−5/°C
=
3 × 9 × 10−6 (QγG = 3α G ) 18.9 × 10−5 1 = 7 l (a) Time period, T = 2π g Fractional change, ∆T 1 ∆l 1 = = α ∆θ T 2 l 2 1 = × 12 × 10−6 (40 − 20) 2 =
or or
16
∆T = T × 12 × 10−5 = 24 × 60 × 60 × 12 × 10−5
9 × 10–2 = ∆l ∆l = 9 cm
Force l (c) Modulus of elasticity = × Area ∆l l 33000 × ⇒ 3 × 1011 = −3 ∆l 10 ∆l 33000 1 = × ⇒ l 10−3 3 × 1011
= 10.3 s day −1
20 (d) It is given that the volume of air in the flask remains the same. This means that the expansion in volume of the vessel (∆Vv ) is exactly equal to the volume expansion of mercury (∆Vm ), i.e.
= 11 × 10−5
or Vvγv∆T = Vmγ m∆T Vγ V × 3α G Vm = v v = ν ∴ γm γm
∆l Change in length, = α ∆T l where, α = coefficient of linear expansion ∆l = charge in length and l = original length. −5
So, 11 × 10 ⇒
−5
= 1.1 × 10
⇒
× ∆T
∆T = 10 K or 10°C
17 (d) Two strips of equal lengths but of different materials (different coefficient of linear expansion α) when joined together, is called bimetallic strip. This strip has the characteristic property of bending on heating due to unequal linear expansion of the two metals. The brass side bends on outer side (convex side) due to greater α and iron bends on inner side (concave side) due to smaller α.
18 (b) If V is the volume of glass flask, VL of mercury and VA of air in it, V = VL + VA Now, as with change in temperature volume of air remains constant, the expansion of mercury will be equal to that of the glass flask, i.e. ∆V = ∆VL or VγG ∆θ = VHg γ Hg ∆θ (as ∆V = Vγ∆θ) VHg γ or = G V γ Hg
∆Vv = ∆Vm
(Q γv = 3α G ) 2000 × 3 × 9 × 10−6 Vm = 1.8 × 10−4 Vm = 300 cc
21 (b) Coefficient of cubical expansion of water at 4°C is zero, because the density of water at 4°C is maximum.
22 (b) The metal X has a higher
23
coefficient of expansion compared to that for metal Y so on placing bimetallic strip in a cold bath, X will shrink more than Y. Hence, the strip will bend towards the left. h ρ (1 + γθ 1 ) (a) 1 = 2 = h2 ρ 1 (1 + γθ 2 ) ρ0 Q ρ = (1 + γθ ) ⇒
50 1 + 50γ = ⇒ r = 0.005 /°C 60 1 + 100γ
24 (d) γreal = γ app + γ vessel , γ vessel = 3α For vessel A, γreal = γ 1 + 3α For vessel B , γreal = γ 2 + 3α B Hence, γ 1 + 3α = γ 2 + 3α B γ − γ2 ⇒ αB = 1 +α 3
258
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
25 (c) Certain substances do not expand but contract when heated within a certain range of temperature and water is such a substance. Density of water is maximum at 4°C, so its volume is minimum at this temperature. If water is heated above 4°C, its volume increases. Also, on cooling below 4°C its volume increases instead of decreasing, this is known as anomalous expansion of water. Since, volume increases in both cases, so water will overflow.
26 (c) Initial length of I rod = l1 Initial length of II rod = l2 Linear coefficient of I rod = α 1 Linear coefficient of II rod = α 2 If temperature of combined rod increases by t°C, then increase in length in I rod is given by ∆l1 = l1 / α 1t Increase in length of II rod is given by l ∆l2 = 2 and ∆l1 = ∆l2 α 2t
∴
l1 l = 2 α 1t α 2t
⇒
α 1 l1 = α 2 l2
⇒
α1 l + 1= 1 + 1 α2 l2
⇒
α 1 + α 2 l1 + l2 = α2 l2
⇒
⇒
l1 l = 2 α1 α2
α2 l2 = α 1 + α 2 l1 + l2
Topic 3 Specific Heat Capacity, Calorimetry and Latent Heat 2019 1 1g of water, of volume 1 cm 3 at 100°C is converted into steam at same temperature under normal atmospheric pressure ~ 1 × 105 Pa). The volume of steam formed equals 1671 = (− cm 3 . If the specific latent heat of vaporisation of water is 2256 J/g, the change in internal energy is [NEET (Odisha)] (a) 2423 J (b) 2089 J (c) 167 J (d) 2256 J
2014 2 Steam at 100° Cis passed into 20 g of water at 10° C. When water acquires a temperature of 80° C, the mass of water present will be [Take, specific heat of water = 1 calg −1 ° C−1 and latent heat of steam = 540 calg −1 ] [AIPMT] (b) 31.5 g
(c) 42.5 g
latent heat of fusion of ice is 80 cal g −1 and latent heat of vaporisation of water is 540 cal g −1 , the final amount of water, thus obtained and its temperature respectively are [WB JEE]
(a) 8 g and 100°C (c) 92 g and 1000°C
(b) 100 g and 100°C (d) 82 g and 100°C
2011 6 A solid material is supplied with heat at constant rate and the temperature of the material changes as shown. From the graph, the false conclusion drawn is [Kerala CEE]
(d) 22.5 g
3 A 10 W electric heater is used to heat a container filled with 0.5 kg of water. It is found that the temperature of water and container rises by 3K in 15 min. The container is then emptied, dried and filled with 2 kg of oil. The same heater now raises the temperature of container oil system by 2K in 20 min. Assume there is no heat loss in the process and the specific heat of water 4200 J kg –1 K –1 , the specific heat of oil in the same limit is equal to [WB JEE] (a) 1.50 × 103 (b) 2.55 × 103 (c) 3.00 × 103 (d) 2.10 × 103 4 A block of ice of mass 50 kg is sliding on a horizontal plane. It starts with speed 5 m/s and stop 3 after moving through some distance. The mass of ice that has melted due to friction between the block and the surface is (assuming that no energy is lost and latent heat of fusion of ice is 80 cal/g, J [WB JEE] = 4.2 J/cal) (a) 2.86 g (b) 3.86 g (c) 0.86 g (d) 1.86 g
E
Temperature
(a) 24 g
2012 5 4320 cal of heat is supplied to 100 g of ice at 0°C. If the
C D A B Heat
(a) AB and CD of the graph represent phase changes (b) AB represents the change of state from solid to liquid (c) latent heat of fusion is twice the latent heat of vaporisation (d) CD represents change of state from liquid to vapour (e) latent heat of vaporisation is twice the latent heat of fusion
259
THERMAL PROPERTIES OF MATTER
of mass 0.12 kg. Find the final equilibrium temperature. (Take, room temperature as 20° C, scoffee = 4080 J/kg-K and [UP CPMT] scup = 1020 J/kg-K). (a) 45.5°C (b) 55.5°C (c) 65.5°C (d) 40.5°C
8 Certain amount of heat is given to 100 g of copper to increase its temperature by 21° C . If the same amount of heat is given to 50 g of water, then the rise in its temperature is (Take, specific heat capacity of copper = 400 Jkg −1 K −1 and that for water = 4200 Jkg −1 K −1 ) (a) 4° C (b) 5.25° C [Kerala CEE] (c) 8° C (d) 6° C (e) 10.5°C 9 If 70 cal of heat is required to raise the temperature of 2 mol of an ideal gas at constant pressure from 30° C to 35° C , then the amount of heat required to raise the temperature of same gas through same range at constant volume is [Punjab PMT] (a) 50 cal (b) 70 cal (c) 60 cal (d) 65 cal 10 Two bodies at different temperatures are mixed in a calorimeter. Which of the following quantities remains conserved? [Punjab PMT] (a) Sum of the temperatures of the two bodies (b) Total heat of the two bodies (c) Total internal energy of the two bodies (d) Internal energy of each body 11 A lead bullet of unknown mass is fired with a speed of 180 ms −1 into a tree in which it stops. Assuming that in this process two-third of heat produced goes into the bullet and one-third into wood. The temperature of the bullet rises by (Take, specific heat of lead = 0.120 J/ g ° C) [EAMCET] (a) 140° C (b) 106° C (c) 90° C (d) 100° C 12 A block of ice at temperature − 20° Cis slowly heated and converted to steam at 100° C . Which of the following diagrams is most appropriate? [WB JEE] Temperature
(a)
(b)
0– 0, –20
Temperature
0– 0, –20
Heat supplied Temperature
(c)
0, –20
Temperature
(d)
0– Heat supplied
Heat supplied
0– 0, –20
Heat supplied
2009 13 Equal masses of two liquids A and B contained in vessels of negligible heat capacity are supplied heat at the same rate. The temperature-time graphs for the two liquids are shown below. y B A Temperature
2010 7 0.3 kg of hot coffee, which is at 70° C, is poured into a cup
Time
x
If s represents specific heat and L represents latent heat of liquid, then [AIIMS] (a) s A > sB , L A < LB (b) s A > sB , L A > LB (c) s A < sB , L A < LB (d) s A < sB , L A > LB
14 19 g of water at 30° C and 5 g of ice at −20° C are mixed together in a calorimeter. What is the final temperature of the mixture? (Take, specific heat of ice = 0.5 cal g −1 ( ° C) −1 and latent heat of fusion of ice = 80 cal g −1 ) [KCET] (b) − 5° C (d) 10° C
(a) 0° C (c) 5° C
15 0.1 m 3 of water at 80°C is mixed with 0.3 m 3 of water at 60° C . The final temperature of the mixture is [KCET] (a) 65° C (b) 70° C (c) 60° C (d) 75° C 16 The sprinkling of water reduces slightly the temperature of a closed room, because [JCECE] (a) temperature of water is less than that of the room (b) specific heat of water is high (c) water has large latent heat of vaporisation (d) water is a bad conductor of heat
2008 17 A lead bullet of initial temperature 27°C and speed v km h −1 penetrates into a solid object and melts. If 50% of the kinetic energy is used to heat it, the value of v (in km h −1 ) is (for lead melting point = 600 K, latent heat of fusion = 2.5 × 104 Jkg −1 , specific heat = 125 Jkg −1 K −1 ) [EAMCET] (a) 3600
(b) 1800
(c) 1200
(d) 1000
2007 18 Work done in converting one gram of ice at –10°C into steam at 100°C is [J&K CET] (a) 3045 J (b) 6056 J (c) 721 J (d) 616 J
260
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2006
Reason Ice contracts on melting to water. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) A is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
19 In an energy recycling process, X gram of steam at 100°C becomes water at 100°C which converts Y gram of ice at 0°C into water at 100°C. The ratio of X and Y will be 1 (a) 3
[AMU]
2 (b) 3
(c) 3
(d) 2
20 A bullet of mass 10 × 10−3 kg moving with a speed of 20 ms −1 hits an ice block (0°C) of 990 g kept at rest on a frictionless floor and gets embedded in it. If ice takes 50% of kinetic energy lost by the system, the amount of ice melted (in gram) approximately is (1 cal = 4.25) (Latent heat of ice = 80 cal/g) [EAMCET] −3 (a) 6 (b) 3 (c) 6 × 10 (d) 3 × 10−3 21 The following figure represents the temperature versus time plot for a given amount of a substance when heat energy is supplied to it at a fixed rate and at a constant pressure. Temperature °C
f d b
0
e
c
a Time
Which part of the above plot represent a phase change? [BCECE]
(a) a to b and e to f (c) d to e and e to f
(b) b to c and c to d (d) b to c and d to e
2005 22 Assertion In pressure-temperature (p-T) phase diagram
23 2 g of water condenses when passed through 40 g of water initially at 25°C. The condensation of steam raises the temperature of water to 54.3°C. What is the latent heat of steam? [J&K CET] −1 −1 (a) 540 cal g (b) 536 cal g −1 (c) 270 cal g (d) 480 cal g −1 24 Calculate the amount of heat (in calorie) required to convert 5 g of ice at 0°C to steam at 100°C. [DUMET] (a) 3100 (b) 3200 (c) 3600 (d) 4200 25 Hailstorm at 0°C falls from a height of 1 km on an insulating surface converting whole of its kinetic energy into heat. What part of it will melt? (take, latent heat of ice = 3.34 × 105 Jkg −1 , g = 10 ms −2 ) [DUMET] 1 1 (a) (b) 33 8 3 −4 (d) All of it will melt (c) × 10 3 26 A 42 kg block of ice moving on rough horizontal surface stops due to friction, after sometime. If the initial velocity of the decelerating block is 4 ms −1 , the mass of ice (in kg) that has melted due to the heat generated by the friction is (Take, latent heat of ice = 3.36 × 105 J kg −1 ) [EAMCET] (a) 1× 10−3 (c) 2 × 10−3
of water, the slope of the melting curve is found to be negative.
(b) 1.5 × 10−3 (d) 2.5 × 10−3
Answers 1 (b) 11 (c) 21 (d)
2 (d) 12 (a) 22 (a)
3 (b) 13 (d) 23 (a)
4 (d) 14 (c) 24 (c)
5 (a) 15 (a) 25 (a)
6 (c) 16 (c) 26 (a)
7 (c) 17 (b)
8 (a) 18 (a)
9 (a) 19 (a)
10 (c) 20 (d)
Explanations 1 (b) Given, mass of water, m = 1g Volume of 1 g of water −6
3
= 1cm = 10 m
3
Volume of 1 g of steam = 1671cm3 −6
3
= 1671 × 10 m Pressure, p = 1 × 105 Pa
Latent heat of vaporisation of water, L = 2256 J/g
= 1 × 105 × 1670 × 10−6
Change in volume, ∆V = (1671 − 1) × 10−6 m3 = 1670 × 10−6 m3
…(i)
Heat supplied,∆Q = mL …(ii) = 1 × 2256= 2256J As the steam expands, so the work done in expansion is ∆W = p∆V
[from Eq. (i)]
…(iii) = 167J According to first law of thermodynamics, ∆Q = ∆U + ∆W ⇒ ∆U = ∆Q − ∆W = 2256 − 167 [from Eq. (ii) and (iii)] = 2089 J
261
THERMAL PROPERTIES OF MATTER
water. Let m′ be amount of heat converted into water ⇒ m′ L + m′ s∆t1 = ms∆t2 ⇒ m′ (100 − 80) + m′ × 540 = 20 × 1 × (80 – 10) where, L = latent heat = 540 calg−1 and s = specific heat = 1 cal g−1 ° C−1 20 × 70 ⇒ m′ = = 2.5 g 560 Now, net water = 20 + 2.5 = 22.5 g
3 (b) As we know, work done by an electric heater, i.e. m1s1 ∆t + m2s2 ∆t = work done So, m1s1∆t + m2s2∆t = P1t1 where, m1 = 0.5 kg, Specific heat s1 = 4200 J/kg-K, ∆t = ∆t1 = ∆t2 = 3K, P1 = P2 = 10 W, t1 = 15 × 60 = 900 s, s2 = specific heat capacity of container. So, 0.5 × 4200 × (3 – 0) + m2s2 × (3 – 0) = 10 × 15 × 60 2100 × 3 + m2s2 × 3 = 9000 9000 – 6300 m2s2 = = 900 3 Similarly, in the case of oil, m1so ∆t + m2s2∆t = P2t2 where, so = specific heat capacity of oil P1 = P2 = 10 W 2 × so × 2 + 900 × 2 = 10 × 20 × 60 4 so + 1800 = 12000 so = 2550 = 2.55 × 103 J kg −1 K −1
4 (d) Given, m = 50 kg, v = 5 ms–1, L = 80 cal/g, J = 4.2 J/cal and m = ? Heat lost, i.e. Q1 = work done, K = kinetic energy 1 1 i.e. Q1 = mv 2 = × 50 × 52 = 625 J 2 2 and heat gained, i.e. Q2 = m′× L = 80 × m′×4.2 Q Q 1 = Q2 625 = m′ × 8 × 42 m′ = 1.86 g
5 (a) Heat required to convert ice into
water at 100° C . Q = m × L + ms∆T = 18000 cal Amount of heat left = 4320 cal m × L = 4320 ⇒ m × 540 = 4320 ⇒ m=8g Temperature obtained = 100° C or boiling point of water (steam) = 100° C
6 (c) First of all, AB and CD according to the graph represent change of state, from ice to water and water to steam respectively. Secondly, latent heat of fusion of ice is less than latent heat of vaporisation of steam. In horizontal portions of AB and CD, temperature remains same showing change of state. Latent heat of vaporisation is greater than latent heat of fusion. Hence, options (a), (b), (d), (e) are all correct. Only option (c) is incorrect.
7 (c) Let T be the final equal temperature. Heat lost by coffee = Heat gained by the cup mcoffee × scoffee × ∆T1 = mcup × scup × ∆T2 ⇒ 0.3 × scoffee × (70 − T ) = 0.12 × scup × (T − 20) ⇒ 0.3 × 4080 (70 − T ) = 0.12 × 1020 × (T − 20) ⇒ 10(70 − T ) = T − 20 ⇒ T = 65.5° C
8 (a) The amount of heat supplied is
given by the relation, Q = mc∆T Here, m = 100 g = 0.1kg , c = 400J/kg-K, ∆T = 21K for copper Thus, Q = 0.1 × 400 × 21 = 840 J Hence, 840 = 0.05 × 4200 × ∆T ⇒ ∆T = 4 ° C
9 (a) From ∆Q = 2 C p (∆T ), 70 = 2 × C p × (35 − 30) C p = 70 / 10 = 7 cal/mol ° C CV = C p − R = 7 − 2 = 5 cal/mol ° C ∆Q′ = nCV (∆T ) = 2 × 5 × 5 = 50 cal
10 (c) Due to the temperature difference heat transfer is taking place from one body to another and no external source is supplying energy to the bodies, thus total internal energy of the two bodies remains conserved although individually it changes.
11 (c) Since, specific heat of lead is given in joule. Specific heat of lead = 0.120 J/g° C = 120 J/kg °C The two-third of head produced goes into the bullet. 2 1 So, m × s × ∆θ = × mv 2 3 2 ⇒
∆θ =
180 × 180 v2 = = 90° C 3×s 3 × 120
12 (a) The ice at −20 °C converts to ice at 0°C, thus having an increase in temperature. On further heating, ice at 0°C is converted into water at 0°C, thus the temperature remaining constant, a change of phase occurs. Water at 0°C when heated changes to water at 100°C which results an increase of temperature. So, water at 100°C changes to steam, i.e. change of phase.
13 (d) It is clear from the graph, ab > cd. B
Temperature
2 (d) Heat lost by system = Heat gain by
A
a b d
c Time
⇒ Latent heat of liquid A (LA ) > Latent heat of liquid B (LB ) and
sA < sB
[Q Slope A > Slope B]
14 (c) Let the final temperature of mixture be t°C. sw = specific heat of water, si = specific heat of ice. Heat lost by water in calorie, H 1 = 19 × 1 × (30 − t ) = 570 − 19t Heat taken by ice, H 2 = msi ∆t + mL + msw t = 5 × (0.5)20 + 5 × 80 + 5 × 1 × t According to the principle of calorimetry, H 1 = H 2 5 × (0.5) × 20 + 5 × 80 + 5t = 570 − 19t ⇒ 24 t = 570 − 450 = 120 ⇒ t = 5° C
15 (a) Let the temperature of the mixture be t°C. ∴ Heat lost = Heat gain 0.1 × 10 3 × (80° − t ) = 0.3 × 103 × (t − 60° )
262
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
1 t − 60 = 3 80 − t ⇒ 80 − t = 3t − 180 4 t = 180 + 80 260 ⇒ t= = 65°C 4
16 (c) Evaporation causes cooling. As the latent heat of vaporisation of water is large, it will absorb lots of heat from the room and hence the temperature of the room will decrease.
17 (b) Heat energy required to just melt the bullet, … (i) Q = Q1 + Q2 Here, Q1 = ms∆θ (Q600 K = 327° C) = m × 125 × (327 − 27) = 3.75 × 104 m Q2 = mL = m × 2. 5 × 104 = 2.5 × 104 m Putting the value of Q1 and Q2 in Eq. (i), we get Q = 6.25 × 104 m If v be the speed of bullet, then 50% of 1 2 mv should be equal to Q. 2 1 ∴ 0.5 × mv 2 = 6.25 × 104 m 2 ⇒
6.25 × 104 × 2 = 500 ms−1 0.5 = 1800 km h −1
v=
18 (a) Given, m = 1g To convert −10° C ice to 0° C ice, Q1 = mS ice ∆t = 1 × (0.5) × [ 0 − (−10)] = 5 cal To convert 0°C ice to 0° C water, Q2 = mLice = 1 × 80 = 80 cal To convert 0°C water to 100° C water, Q3 = mS w ∆t = 1 × 1 × 100 = 100 cal To convert 100°C water to steam100° C, Q4 = mLw = 1 × 540 = 540 cal ∴Total work done, Q = Q1 + Q2 + Q3 + Q4 = 725 cal = 725 × 4.2 J ∴ Q = 3045 J
19 (a) Specific heat of water = 4200 J kg K−1 Specific latent heat of fusion = 3.36 × 105 J kg−1 Specific latent heat of vaporisation
= 22.68 × 105 J kg−1 ∴
−3
m1 = 40 g, ∆t1 = (54.3 − 25)° C = 29.3° C c = 1 cal g−1
5
Q1 = X × 10 × 22.68 × 10
Also Q2 = Y × 10−3 × 3.36 × 105 + Y × 10−3 × 4200 × 100 ∴ Q1 − Q2 ⇒
X 7.56 1 = = Y 22.68 3 1 2
20 (d) Kinetic energy of bullet = mv 2 1 = × 10 × 10−3 × 20 × 20 2 2 = 2 J= cal 4.2 Heat gained by ice to melt 2 50 = × 4.2 100 1 mL = ⇒ 4.2 1 m= g ⇒ 4.2 × 80 ≈ 3 × 10−3 g
21 (d) At 0°C from b to c, temperature of matter does not change but its state changes. Similarly, from d to e, state of matter changes without changing temperature. Hence, b to c and d to e show phase changes.
22 (a) In pressure-temperature (p-T) phase diagram of water, the negative slope is due to the change of phase. This corresponds to liquids which contract on melting (like ice). Therefore, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
23 (a) Heat required to raise the temperature of 40 g of water from 25°C to 54.3°C, is equivalent to the sum of heat required to condense the steam. ∴Heat required to raise the temperature of water by t°C …(i) = m1c∆t1 where, c is specific heat of water and m is the mass. Heat required to condense steam …(ii) = m2L + m2c∆t2 Equating Eqs. (i) and (ii), we get m2L + m2c∆t2 = m1c∆t1 Given, m2 = 2 g , ∆t2 = (100 − 54.3)° C = 45.7° C
⇒ 2 × L + 2 × 1 × 45.7 = 40 × 1 × 29.3 ⇒ 2L + 91.4 = 1172 ⇒ L = 540.3 cal g−1
24 (c) Total heat required = heat required
to convert ice into water at 0° C(Q1 ) + heat required to increase the temperature of water upto 100° C(Q2 ) + heat required to convert water into steam at 100° C(Q3 ). ∴ Q1 = mL = 5 × 80 = 400 cal Q2 = ms∆t = 5 × 1 × (100 − 0) = 500 cal Q3 = mL = 5 × 540 = 2700 cal ∴ Q = Q1 + Q2 + Q3 = 400 + 500 + 2700 = 3600 cal
25 (a) Let k be the fraction of ice that melts. Hence, potential energy = k × latent heat i.e., mgh = k mL gh 10 × 1000 1 ⇒ ≈ k= = L 3.34 × 105 33
26 (a) Initial mass of ice block, m = 42 kg
Initial velocity of ice block, u = 4 ms−1 Final velocity of ice block, v = 0 Let retardation be a. Using third equation of motion, we get v 2 = u2 − 2as ⇒ ⇒
2as = u2 − v 2 as =
u2 − v 2 (4 )2 − (0)2 = 2 2
= 8 m 2s−2 Heat generated = Work done against friction Q=F ×s Q =m×a×s Q = 42 × 8 Q = 336 J Due to this heat, let M kg of ice melts. So, Q = ML Q 336 ⇒ M = = kg L 3.36 × 105 M = 1 × 10−3 kg
THERMAL PROPERTIES OF MATTER
Topic 4
Thermal Conduction and Convection 2019 1 A deep rectangular pond of surface area A, containing
water (density = ρ, specific heat capacity = s), is located in a region where the outside air temperature is a steady value at the − 26°C. The thickness of the frozen ice layer in this pond, at a certain instant is x. Taking the thermal conductivity of ice as K, and its specific latent heat of fusion as L, the rate of increase of the thickness of ice layer, at this instant would be given by [NEET (Odisha)] (a) 26K/ρ r(L − 4s) (b) 26K/(ρx 2 − L ) (c) 26K/(ρxL ) (d) 26K/ρr( L + 4s)
2 The unit of thermal conductivity is [NEET (National)] −1 −1 −1 (a) J m K (b) W m K (c) W m −1 K −1 (d) J m K −1
2017 3 Two rods A and B of different materials are welded together as shown in figure. Their thermal conductivities are K 1 and K 2 . The thermal conductivity of the composite rod will be [NEET] A
K1
B
K2
T1
T2
d
K1 + K 2 2 (c) K 1 + K 2
(a)
3( K 1 + K 2 ) 2 (d) 2( K 1 + K 2 )
(b)
2016 4 Two identical bodies are made of a material for which the heat capacity increases with temperature. One of these is at 100°C, while the other one is at 0°C. If the two bodies are brought into contact, then assuming no heat loss, the final common temperature is [NEET] (a) 50°C (b) more than 50°C (c) less than 50°C but greater than 0°C (d) 0°C
2014 5 Same quantity of ice is filled in each of the two metal containers P and Q having the same size, shape and wall thickness but make of different materials. The containers are kept in identical surroundings. The ice in P melts completely in time t 1 , whereas in Q takes a time t 2 . The ratio of thermal conductivities of the materials of P andQ is (a) t 2 : t 1 (b) t 1 : t 2 [WB JEE] (c) t 12 : t 22
(d) t 22 : t 12
6 Two identical rods are connected between two containers. One of them is at 100°C. If rods are connected in parallel, then the rate of melting of ice is g 1 g /s. If they are connected in series, then the rate is g 2 g /s. The [UK PMT] ratio g 2 / g 1 is (a) 2 (b) 4 (c) 1/ 2 (d) 1/ 4 7 Two rods of lengths d1 and d 2 and coefficients of thermal conductivities K 1 and K 2 are kept in end to end contact with each other. The equivalent thermal conductivity is (a) K 1 d1 + K 2 d 2 (b) K 1 + K 2 [UK PMT] d K d + K 2d2 d (c) 1 1 (d) ( d1 + d 2 ) / 1 + 2 d1 + d 2 K1 K 2
2013 8 For a certain thermocouple, if the temperature of the cold junction is 0° C, the neutral temperature and inversion temperatures are 285° C and 570° C, respectively. If the cold junction is brought to 10° C, then the new neutral and inversion temperatures are respectively [Manipal] (a) 285° C and 560° C (b) 285° C and 570° C (c) 295° C and 560° C (d) 275° C and 560° C
2012 9 A slab of stone of area 0.36 m 2 and thickness 0.1 m is exposed on the lower surface of steam at 100° C . A block of ice at 0° Crests on the upper surface of the slab. In one hour, 4.8 kg of ice is melted. The thermal conductivity of slab is (Take, latent heat of fusion of ice = 3.36 × 105 J kg −1 ) [CBSE AIPMT] (a) 1.24 J/ m/s/ ° C (c) 2.05 J/ m/s/ ° C
(b) 1.29 J/ m/s/ ° C (d) 1.02 J/ m/s/ ° C
264
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
10 Two slabs A and B of different materials but of the same thickness are joined end to end to form a composite slab. The thermal conductivities of A and B are K 1 and K 2 , respectively. A steady temperature difference of 12° C K is maintained across the composite slab. If K 1 = 2 , the 2 temperature difference across slab A is [AIIMS] (a) 4° C (b) 6° C (c) 8° C (d) 10° C 11 The temperature of hot and cold end of 20 g long rod in thermal steady state are at 100° Cand 20° C respectively temperature of the centre of the rod is [AFMC] (a) 50° C (b) 60° C (c) 40° C (d) 30° C
2011 12 Three identical rods A , B and C are placed end to end. A temperature difference is maintained between the free ends of A and C. The thermal conductivity of B is thrice that of C and half of that of A. The effective thermal conductivity of the system will be (K A is the thermal conductivity of rod A) [KCET] 1 2 (a) K A (d) K A (c) 2K A (b) 3K A 3 3
2010 13 A cylindrical metallic rod in thermal contact with two reservoirs of heat as its two ends conducts an amount of heat Q in time t. The metallic rod is melted and the material is formed into a rod of half the radius of the original rod. What is the amount of heat conducted by the new rod when placed in thermal contact with the two reservoirs in time t? [CBSE AIPMT] Q Q Q (a) (b) (c) 2Q (d) 4 16 2
14 The thermal conductivity of a material in CGS system is 0.4. In steady state, the rate of flow of heat 10 cal/s-cm 2 , then the thermal gradient will be [CG PMT] (a) 10° C/ cm (b) 12° C/ cm (c) 25° C/ cm (d) 20° C/ cm 15 In the diagram, a system of two metals of equal lengths and of same cross-sectional area are joined together. K Furnace 300°C
2K
Metal I Metal II
Ice box 0°C
16 Two slabs are of the thicknesses d1 and d 2 . Their thermal conductivities are K 1 and K 2 , respectively. They are in series. The free ends of the combination of these two slabs are kept at temperatures θ1 and θ 2 . Assume θ1 > θ 2 . The temperature θ of their common junction is [KCET] K 1 θ1 + K 2 θ 2 K 1 θ1 d 1 + K 2 θ 2 d 2 (b) (a) K 1 d 2 + K 2 d1 θ1 + θ 2 K 1 θ1 d 2 + K 2 θ 2 d 1 K 1 θ1 + K 2 θ 2 (c) (d) K 1 d 2 + K 2 d1 K1 + K 2 17 A body of length 1 m having cross-sectional area 0.75 m 2 has heat flow through it at the rate of 6000 J/s. Then, find the temperature difference, if K = 200 Jm −2 K −1 . [Gujarat CET]
(a) 20° C (c) 80° C
(b) 40° C (d) 100° C
2009 18 The two ends of a rod of length L and a uniform cross-sectional area A are kept at two temperatures T1 dQ through the and T2 (T1 > T2 ). The rate of heat transfer dt rod in a steady state is given by [CBSE AIPMT] dQ KL(T1 − T2 ) = dt A dQ K (T1 − T2 ) (b) = dt LA (a)
dQ = KLA (T1 − T2 ) dt dQ KA (T1 − T2 ) (d) = dt L
(c)
19 A cylinder of radius r and of thermal conductivity K 1 is surrounded by a cylindrical shell of inner radius r and outer radius 2r made of a material of thermal conductivity K 2 . The effective thermal conductivity of the system is [AFMC] 1 1 (a) ( K 1 + 2K 2 ) (b) ( 2K 1 + 3K 2 ) 3 2 1 1 (d) ( K 1 + 3K 2 ) (c) ( 3K 2 + 2K 1 ) 3 4 20 Three rods of same dimensions have thermal conductivities 3 K, 2 K and K. They are arranged as shown below 50°C
Insulation
The coefficient of thermal conductivities of the metals are K and 2K, respectively. If the furnace temperature at one end is 300° C and ice box temperature at the other end is [Manipal] 0° C, then the junction temperature is (a) 100° C (b) 125° C (c) 150° C (d) 200° C
100°C
3K
T 2K K 0°C
What will be the temperature T of the junction? [EAMCET] 200 100 50 (a) (d) ° C (b) ° C (c) 75 ° C °C 3 3 3
265
THERMAL PROPERTIES OF MATTER
2008 21 Ice starts freezing in a lake with water at 0°C when the
atmospheric temperature is − 10° C. If the time taken for 1 cm of ice to be formed is 12 min, the time taken for the thickness of the ice to change from 1 cm to 2 cm will be (a) 12 min [BHU] (b) less than 12 min (c) more than 12 min but less than 24 min (d) more than 24 min
22 The coefficient of thermal conductivity of copper is 9 times that of steel. In the composite cylindrical bar shown in the figure, what will be the temperature at the junction of copper and steel? [KCET] 100°C
0°C Copper
Steel
18 cm
(a) 75°C
(b) 67°C
(c) 25°C
T2
K
2K
(a) 1 (c) 2/3
C
B
100°C
25°C
(a) 55°C (c) 75°C
(b) 60°C (d) 50°C
26 The ratio of the coefficient of thermal conductivity of two different materials is 5 : 3. If the thermal resistance of the rods of same thickness of these materials is same, then the ratio of the length of these rods will be [BCECE] (a) 3 : 5 (b) 5 : 3 (c) 3 : 4 (d) 3 : 2
(d) 33°C
23 The temperature of the two outer surfaces of a composite slab, consisting of two materials having coefficients of thermal conductivities K and 2K and thicknesses x and 4x respectively, are T2 and T1 (T2 > T1 ). The rate of heat transfer through the slab, in A (T2 − T1 )K a steady state is f , with f equals to x [JCECE] 4x
A
2006 27 Which of the following circular rods, (given radius r and
6 cm
x
25 Two identical rods AC and CB made of two different metals having thermal conductivities in the ratio 2 : 3 are kept in contact with each other at the end C as shown in the figure. A is at 100°C and B is at 25°C. Then, the junction C is at [KCET]
T1
(b) 1/2 (d) 1/3
2007 24 Consider a composite slab consisting of two different materials having equal thickness and thermal conductivities K and 2K, respectively. The equivalent thermal conductivity of the slab is [BHU] 4 2 (c) K (d) 2K (a) 3K (b) K 3 3
length l) each made of the same material and whose ends are maintained at the same temperature will conduct most heat? [AFMC] (a) r = 2r0 , l = 2l0 (b) r = 2r0 , l = l0 (c) r = r0 , l = l0 (d) r = r0 , l = 2l0
2005 28 Two rods of same material have same length and area. The
heat ∆Q flows through them for 12 min when they are joint side by side. If now both the rods are joined in parallel, then the same amount of heat ∆Q will flow in [BHU] (a) 24 min (b) 3 min (c) 12 min (d) 6 min
29 Three rods identical area of cross-section and made from the same metal from the sides of an isosceles triangle ABC, right angled at B. The points A and B are maintained at temperatures T and 2 T, respectively. In the steady state, the temperature of the point C is TC . Assuming that only heat conduction takes place, TC / T is equal to [UP CPMT] 1 3 (b) (a) ( 2 + 1) ( 2 + 1) 1 1 (c) (d) 2 ( 2 − 1) 3 ( 2 − 1)
Answers 1 (c) 11 (b) 21 (d)
2 (c) 12 (a) 22 (a)
3 (a) 13 (b) 23 (d)
4 (b) 14 (c) 24 (b)
5 (a) 15 (a) 25 (a)
6 (d) 16 (c) 26 (b)
7 (d) 17 (b) 27 (b)
8 (a) 18 (d) 28 (b)
9 (a) 19 (d) 29 (b)
10 (c) 20 (a)
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations dQ dθ = − KA = − KA × (TG) dt dx 1 dQ i.e. TG ∝ = constant dt K 1 1 or K ∝ ⇒ K 1 ∝ …(i) t t1
1 (c) Given, θ 0 = 0° C, θ 1 = − 26° C The rate of increase of thickness can be calculated from equation, dθ KA (θ 0 − θ 1 ) = dt x ρAdxL KA (θ 0 − θ 1 ) = ⇒ dt x dx KA (θ 0 − θ 1 ) = ⇒ dt ρAxL K [ 0 − (−26)] 26K = = ρxL ρxL
2 (c) The rate of heat flow through a conductor of length L and area of cross-section A is given by dQ ∆T J/s or watt = KA dt L where, K = coefficient of thermal conductivity and ∆T = change in temperature. L dQ ⇒ K = A ∆T dt metre × watt ∴Unit of K = (metre)2 × kelvin = Wm−1K −1
3 (a) In parallel arrangement of n rods, equivalent thermal conductivity is given by K eq =
K 1 A1 + K 2 A2 + K + K n An A1 + A2 + K + An
If rods are of same area, then K1 + K2 + K + Kn n Now, in the question, it is not given that rods are of same area. But we can judge that from given diagram. ∴ Equivalent thermal conductivity of the system of two rods, K eq =
⇒
K eq =
K1 + K2 2
4 (b) Heat lost by first body = Heat gained by second body. Body at 100°C temperature has greater heat capacity than body at 0°C, so final temperature will be closer to 100°C. So, Tc > 50° C.
5 (a) We know that, relation between the temperature gradient (TG) and thermal conductivity (K ),
K 2 ∝ 1/ t2
…(ii)
and it can be written as KA 50 …(ii) g2 (g/s) = lL Dividing Eq. (i) and Eq. (ii), we get g1 200 g 1 = =4 ⇒ 2 = g2 50 g1 4
7 (d) Consider the diagram, where two rods are connected end to end (series).
From Eqs. (i) and (ii), we get K 1 1/ t1 = K 2 1/ t2
K1
K2 A
⇒ K 1 : K 2 = t2 : t1 When two identical rods are connected in parallel, l = Length
d2 Fig. (a)
6 (d) According to the question,
100°C
A
d1
Thermal resistance (R ) of a rod of length l, thermal conductivity K and area of cross-section A is given by
0°C
R = l / KA K
A
A
A
l
So, rate of heat transfer is given by dQ 2KA (T1 − T2 ) = dT l 2KA (100 − 0) 200KA = = l l where, net area = 2A K = thermal conductivity constant, T1 = temperature at one end, T2 = temperature at other end and l = length of rod. mL dQ is rate of heat transfer = As, T dT dQ Q So, g1 = = dT T 200 KA m ⇒ L= T l So, for parallel connection, m 200KA = g1 g / s = T Ll Similarly, for series connection 100°C
T0
...(i)
0°C
Fig. (b)
When rods are connected in series, Req = equivalent thermal resistance …(i) = R1 + R2 where, R1 = thermal resistance of first rod and R2 = thermal resistance of second rod. For Fig. (a), Thermal resistance of first rod, d R1 = 1 K1A where, A is area of cross-section of each rod. Similarly, thermal resistance of d second rod, R2 = 2 K2A Now, from Fig. (a), d d Req = 1 + 2 K1A K2A ⇒
Leq K eq Aeq
=
d1 d + 2 K1A K2A
…(ii)
where, Leq = equivalent length of rod, 50°C
So, 100° − T0 = T0 − 0 ⇒ 2T0 = 100° ⇒ T0 = 50° C dQ m KA (50 − 0) So, = L= dT l l
K eq = equivalent thermal conductivity Aeq = equivalent area of cross-section. For series connection, Leq = equivalent length = d1 + d2 equivalent cross-sectional area = A
267
THERMAL PROPERTIES OF MATTER
Now, from Fig. (b), d1 + d 2 d d = 1 + 2 (K eq )( A ) K 1 A K 2 A
(100 – TQ ) 12 = 1 1 1 + K1 K 1 2K 1
d1 + d2 d1 d = + 2 K eq K1 K2
2.12 (100 – TQ ) = =8 3 TP − TQ = 8°C
⇒ ⇒
K 1K 2 K eq = (d1 + d2 ) K 2d1 + K 1d2 d + d2 = 1 d1 d 2 + K1 K2
Rate of heat flow through the rod is given as dQ KA (∆t ) ...(i) = dt L dQ dQ As, = dt AC dt CB KA (100 – T0 ) KA (T0 – 20) = L/ 2 L/2 ⇒ ⇒
8 (a) Neutral temperature remains same. Inversion temperature, Ti = 2Tn − Tc = 2 × 285 − 10 = 560°C δQ KA (a) = (T1 − T2 ) δt L KA (T1 − T2 )t ⇒ Q= L Q Q = mLf KA ∴ (T1 − T2 )t = mLf L mLf × L K = ⇒ A (T1 − T2 )t 4.8 × 3.36 × 105 × 0.1 4.8 × 3.36 K = = 0.36 × 100 × 3600 0.36 × 36 = 1.24 J/m/s/ ° C figure as Q
P
R
A (K1)
B (K2)
L
L
TR
Rate of heat flow through rod is given as dQ KA (∆T ) ∆T = = dt l / KA l As, rate of heat flow is same for all sections dQ dQ = dT PQ dT PR 100 – T T T − Q P R = L L L + K1A K1A K2A
15 (a) Temperature of interface,
K 1θ 1l2 + K 2θ 2l1 K 1l2 + K 2l1 2K × 0 × l + K × 300 × l = Kl + 2Kl
θ=
=
∴
K B = 3KC
B
K2
d1
d2
Heat current, H 2 =
(Q l = l1 = l2 = l3 ) 3l l l l = + + K KA KA / 2 KA / 6 3l 9l K or K = A = K KA 3
flowing from one face to the other face KA (θ 1 − θ 2 )t in time t is given by Q = l where, K is the coefficient of thermal conductivity of material of rod. Q A r2 …(i) ∝ ∝ ⇒ t l l As the metallic rod is melted and the material is formed into a rod of half the radius, V1 = V2 l …(ii) π r12l1 = π r22l2 ⇒ l1 = 2 4 Now, from Eqs. (i) and (ii), we get 4 l1 Q1 r12 l r2 = × 22 = 1 × Q2 l1 r2 l1 (r1 / 2)2 [Q Q1 = Q]
θ2
K1
For second slab, C
Rods are in series form, so L l l l = 1 + 2 + 3 K K A K B KC
or
θ
Heat current, H 1 =
KC = K A /6 A
⇒ θ = 100° C
θ1
12 (a) Given, K B = K A / 2 and
300Kl 3Kl
16 (c) For first slab,
2T0 = 120°, T0 = 60° C
13 (b) In steady state, the amount of heat
10 (c) Given situation can be shown in 100°C TP
20°C
L
[Dividing numerator and denominator by K 1K 2] Equivalent thermal conductivity, d1 + d2 K eq = d1 d + 2 K 1 K 2
9
∆Q KA∆θ = ∆t ∆x Thermal gradient, ∆θ (∆Q / ∆t ) 10 = = = 25° C/cm ∆x k 0.4
B T0
100°C
Q 16
14 (c) We know,
C
A
11 (b)
Q1 = 16 Q2 ⇒ Q2 =
⇒
K 1 (θ 1 − θ ) A d1 K 2 (θ − θ 2 ) A d2
As slabs are in series, H 1 = H 2 ∴
K 1 (θ 1 − θ ) A K 2 (θ − θ 2 ) A = d1 d2
⇒
θ=
K 1θ 1d2 + K 2θ 2d1 K 2d1 + K 1d2
Q KA∆θ = t l 200 × 0.75 × ∆θ 6000 = 1 6000 × 1 ∆θ = = 40° C 200 × 0.75
17 (b) The rate of heat flow, ⇒
dQ T1 − T2 = dt L / KA dQ KA (T1 − T2 ) = dt L
18 (d) Heat current, ⇒
19 (d) Both the cylinders are in parallel, for the heat flow from one end as shown K2 K1
Hence,K eq =
R
K 1 A1 + K 2 A2 A1 + A2
2R
268
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
where, A = area of cross-section of inner cylinder = πR 2 and A2 = area of cross-section of cylindrical shell = π {(2R )2 − (R )2} = 3πR 2 ⇒
K eq
K (πR 2 ) + K 2 (3πR 2 ) = 1 πR 2 + 3πR 2 1 = (K 1 + 3K 2 ) 4
20 (a)
50°C
H1 3K
100°C
2K
T
H
K
H2
0°C
Rate of flow of heat, H = H1 + H2 3K (T − 100) A 2K (50 − T ) A = l l K (0 − T ) A + l 3(T − 100) = 2(50 − T ) + (0 − T ) 3T − 300 = 100 − 2T − T 6T = 400 400 200 T = = °C ⇒ 6 3
21 (d) Time taken by ice to grow by thickness y,
ρL 2 t= y 2Kθ
Hence, time intervals to change thickness from 0 to y, from y to 2y and so on will be in the ratios ∆t1 : ∆t2 : ∆t3 : : (12 − 02 ) : (22 − 12 ) : (32 − 22 ) or ∆t1 : ∆t2 : ∆t3 : : 1 : 3 : 5 According to the question, ∆t1 = 12 min Hence, ∆t2 = 3∆t1 = 3 × 12 min = 36 min
22 (a) Temperature of interface, K θ l + K 2θ 2l1 θ = 1 12 K 1l2 + K 2l1 K Cu = 9K s So, if K s = K 1 = K , then Given,
K Cu = K 2 = 9K 9K × 100 × 6 + K × 0 × 18 ⇒ θ= 9K × 6 + K × 18 θ=
5400 K = 75° C 72 K
23 (d) Let the temperature of common interface be T °C. Rate of heat flow, Q K A ∆T H = = t l 2K A (T − T1 ) Q ∴ H1 = = t 1 4x KA (T2 − T ) Q ⇒ H2 = = t 2 x In steady state, the rate of heat flow should be same in whole system, i.e. H1 = H2 2KA (T − T1 ) KA (T2 − T ) = ⇒ 4x x T − T1 ⇒ = T2 − T 2 ⇒ T − T1 = 2T2 − 2T 2T + T1 …(i) T = 2 ⇒ 3 Hence, heat flow from composite slab is KA (T2 − T ) H = x 2T + T1 KA H = T2 − 2 3 x KA …(ii) = (T2 − T1 ) 3x According to question, A (T2 − T1 )K …(iii) H = f x By comparing Eqs. (ii) and (iii), we get 1 f = ⇒ 3
24 (b) The quantity of heat flowing through a slab in time t, KA∆θ Q= l For same heat flow through each slab and composite slab, we have K 1 A (∆θ 1 ) K 2 A (∆θ 2 ) = l l K ′ A (∆θ 1 + ∆θ 2 ) = 2l or K 1∆θ 1 = K 2∆θ 2 K′ = (∆θ 1 + ∆θ 2 ) = C (say) 2 C C So, ∆θ1 = , ∆θ 2 = K1 K2 and
(∆θ 1 + ∆θ 2 ) =
2C K′
or
C C 2C + = K1 K2 K′
or
K + K 2 2C C 1 = K 1K 2 K ′
∴
K′ =
2K 1K 2 K1 + K2
Given, K 1 = K and K 2 = 2K 2K × 2K 4 K 2 4 K So, K′ = = = K + 2K 3K 3
25 (a) Let the temperature of the junction be θ.
Heat flow through the rod is given by KA (θ 1 − θ 2 )t Q= d Here, K 1 (100 − θ ) = K 2 (θ − 25) K 1 θ − 25 ⇒ = K 2 100 − θ K1 2 = K2 3
But
2 θ − 25 = 3 100 − θ
∴
3θ − 75 = 200 − 2θ 5θ = 275 θ = 55° C
or ⇒ ∴
26 (b) The thermal resistance of a rod of length l, area of cross-section A and l thermal conductivity K, is R = KA Given, thermal resistance of rods is equal, therefore also A1 = A2 l1 l = 2 K 1 A1 K 2 A2 l1 l = 2 K1 K2
⇒
l1 K 1 5 = = l2 K 2 3
⇒
27 (b) Heat conduction through a rod is given by H =
∆Q T − T2 = KA 1 l ∆t
r2 l (a) When r = 2r0 , l = 2l0 (2r )2 H ∝ 0 2l0
⇒
⇒
H ∝
H ∝
2r02 l0
…(i)
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THERMAL PROPERTIES OF MATTER
(b) When r = 2r0 , l = l0 (2r )2 ⇒ H ∝ 0 l0
⇒
4 r02 H ∝ l0 r02 (c) When r = r0 , l = l0 ⇒ H ∝ l0 (d) When r = r0 , l = 2l0 ⇒ H ∝
28
r02 2l0
⇒
t∝R (Q Q and ∆θ are same) tp Rp R / 2 1 = = = ts Rs 2R 4
⇒ tp =
ts 12 = = 3 min 4 4
29 (b) Because TB > TA
It is obvious that heat conduction will be more in case (b). Q KA∆θ ∆θ ∆θ (b) = = = t l R (l / KA ) (R = thermal resistance)
(T ) A
K ( 2T − TC ) A K (TC − T ) A = a 2a TC 3 = ⇒ T 1+ 2 ⇒
a2
a ( 2 T)B
⇒ Heat will flow B to A via two paths (i) B to A (ii) and along BCA rate of flow of heat in path BCA will be same, Q Q i.e. = t t BC CA
a
(TC) C
Topic 5
Radiation I (Kirchhoff’s Law and Black Body) 2013 1 A piece of red glass when heated in dark to red hot state will appear to be (a) white (c) green
[KCET]
(b) red (d) invisible
2010 2 Assertion (A) Like light radiation, thermal radiations are also electromagnetic radiation. Reason (R) The thermal radiations require no medium for propagation. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) A is correct but R is incorrect (d) Both A and R are incorrect 3 For an opaque body coefficient of transmission is (a) zero (b) 1 [MHT CET] (c) 0.5 (d) ∞
4 The thermal radiation from a hot body travels with a velocity of [Kerala CEE] 8 −1 −1 (b) 2 × 10 ms (a) 330 ms (d) 230 ms −1 (c) 1200 ms −1 (e) 3 × 108 ms −1 5 In which process, the rate of transfer of heat is maximum? (a) Conduction [MGIMS] (b) Radiation (c) Convection (d) In all three heat is transferred with the same speed
6 Which of the following statements does not hold good for thermal radiation? [JCECE] (a) The wavelength changes when it travels from one medium to another (b) The frequency changes when it travels from one medium to another (c) The speed changes when it travels from one medium to another (d) They travel in straight line in a given medium
2009 7 “Good emitters are good absorbers” is a statement concluded from (a) Newton’s law of cooling (b) Stefan’s law of radiation (c) Prevost’s theory (d) Kirchhoff’s law
[Haryana PMT, CG PMT]
2008 8 Which of the following is more close to a black body? [Haryana PMT]
(a) Black board paint (c) Black holes
(b) Green leaves (d) Red roses
2007 9 We consider the radiation emitted by the human body. Which of the following statements is true? [BHU] (a) The radiation is emitted during the summers and absorbed during the winters. (b) The radiation emitted lies in the ultraviolet region and hence is not visible. (c) The radiation emitted in the infrared region. (d) The radiation is emitted only during the day.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
10 The temperature at which a black body ceases to radiate energy, is [J&K CET] (a) 0 K (b) 273 K (c) 30 K (d) 100 K
2006 11 Three objects coloured black, grey and white can withstand hostile conditions upto 2800°C. These objects are thrown into a furnace where each of them attains a temperature of 2000°C. Which object will glow brightest? [AIIMS] (a) The white object (b) The black object (c) All glow with equal brightness (d) Gray object
12 Assertion (A) Perspiration from human body helps in cooling the body. Reason (R) A thin layer of water on the skin enhances its emissivity. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) A is correct but R is incorrect (d) Both A and R are incorrect
13 A perfect black body is one whose emissive power is (a) maximum (b) zero [J&K CET] (c) unity (d) minimum 14 A hot and a cold body are kept in vacuum separated from each other. Which of the following causes decrease in temperature of the hot body? [Punjab PMET] (a) Radiation (b) Convection (c) Conduction (d) Temperature remains unchanged
2005 15 Assertion A body that is a good radiator is also a good absorber of radiation at a given wavelength. Reason According to Kirchhoff’s law, the absorptivity of a body is equal to its emissivity at a given wavelength. [AIIMS]
(a) Both Asssertion and Reason are correct and Reason is the correct explanation of Asssertion (b) Both Asssertion and R are correct but Reason is not the correct explanation of Asssertion (c) Asssertion is correct but Reason is incorrect (d) Both Asssertion and Reason are incorrect
16 The absorptivity of a black body is equal to (a) 2 (b) 1 (c) 3 (d) 4
Answers 1 (c) 11 (b)
2 (b) 12 (c)
3 (a) 13 (c)
4 (e) 14 (a)
5 (b) 15 (a)
6 (b) 16 (b)
7 (d)
8 (c)
9 (c)
10 (a)
Explanations 1 (c) From Kirchhoff’s law at a definite temperature and for a given wavelength, the ratio of the emissive power to the absorptive power for different surface is same. i.e. eλ / aλ = Eλ When red glass is heated in a dark room to a red hot state, it will appear green, because according to Kirchhoff’s law the emissive power of red glass will be maximum for green light.
2 (b) Light radiations and thermal radiations both belong to electromagnetic spectrum. Light radiation belongs to visible, while thermal radiation belongs to infrared region of EM spectrum. Also, EM radiations require no medium for propagation. Therefore, both Assertion and Reason are correct but Reason is not the correct explanation of Assertion.
3 (a) An opaque body does not transmit any radiation, hence transmission of coefficient of an opaque body is zero.
4 (e) Thermal radiation belongs to infrared region of electromagnetic wave, which travels at speed of 3 × 108 m/s.
5 (b) The rate of heat transfer is maximum in radiation in the form of electromagnetic radiations.
6 (b) Thermal radiations are electromagnetic radiation and its frequency does not change when it travels from one medium to another.
7 (d) Kirchhoff ’s law of radiation states that the ratio of emissive power to absorptive power is same for all surfaces at the same temperature and is equal to the emissive power of a perfectly black body at that temperature.
8 (c) Black holes are more closer to a black body as all the radiations come in contact to black hole is being absorbed by it.
9 (c) The heat radiation emitted by the human body is the infrared radiation. Their wavelength is of the order of 7.9 × 10−7 m to 10−3 m which is in the range of infrared region.
10 (a) The temperature at which a black body ceases to radiate energy is 0 K.
11 (b) An ideal black body absorbs all the radiations incident upon it and has an emissivity equal to 1. If a black body and an identical another body are kept at the same temperature, then the black body will radiate maximum power. Hence, the black object at a temperature of 2000°C, will glow brightest.
271
THERMAL PROPERTIES OF MATTER
12 (c) Perspiration involves exchange of heat from body to surrounding. Water takes heat from the body and cools it down. However a thin layer of water on the skin will decrease rather than increase it emissivity. So, Assertion is correct but Reason is incorrect.
13. (c) A black body is an object that absorbs all electromagnetic radiation that falls on to it. No radiation passes through it and none is reflected. Hence, its emissive power is unity.
15. (a) According to Kirchhoff’s law at a
14. (a) Convection and conduction mode of heat transfer require physical medium and contact between the bodies to transfer heat but radiation does not require any medium. As they transfer heat as electromagnetic waves/radiation. Thus, the cold body will get warmer and the hot body will get colder.
given wavelength, the absorptivity of a body is equal to its emissivity. Also a body which is a good radiator, is also a good absorber of radiation or a poor reflector. Therefore, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
16. (b) The absorptivity of a black body is equal to unity.
Topic 6
Radiation II (Wien’s Law, Stefan’s Law and Newton’s Law of Cooling) 2019 1 An object kept in a large room having air temperature of 25°C takes 12 min to cool from 80°C to 70°C. The time taken to cool for the same object from 70°C to 60°C would be nearly [NEET (Odisha)] (a) 10 min (b) 12 min (c) 20 min (d) 15 min
2 Calculate radiation power for sphere whose temperature is 227°C, radius 2 m and emissivity 0.8. [AIIMS] (a) 142.5 kW (b) 1500 W (c) 1255 W (d) 1575 W 3 If temperature of sun = 6000 K, radius of sun is 7. 2 × 105 km, radius of earth = 6000 km and distance between earth and sun = 15 × 107 km. Find intensity of light on earth. [AIIMS] 16 16 (a) 19. 2 × 10 (b) 12.2 × 10 16 (c) 18.3 × 10 (d) 9.2 × 1016
2018 4 The power radiated by a black body is P and it radiates
maximum energy at wavelength λ 0 . If the temperature of the black body is now changed, so that it radiates 3 maximum energy at wavelength λ 0 , the power 4 radiated by it becomes nP. The value of n is [NEET] 256 4 3 81 (a) (b) (c) (d) 81 3 4 256
2017 5 A spherical black body with a radius of 12 cm radiates 450 W power at 500 K. If the radius were halved and the temperature doubled, the power radiated (in watt) would be (a) 225 (b) 450 (c) 1000 (d) 1800 [NEET]
2016 6 A black body is at a temperature of 5760 K. The energy of radiation emitted by the body at wavelength 250 nm is U1 , at wavelength 500 nm isU 2 and that at 1000 nm is U 3 . Wien’s constant, b = 2.88 × 106 nmK. Which of the following is correct? [NEET] (a) U 3 = 0 (b) U1 > U 2 (c) U 2 > U1 (d) U1 = 0
7 A body cools from a temperature 3T to 2T in 10 min. The room temperature is T. Assume that Newton’s law of cooling is applicable. The temperature of the body at the end of next 10 min will be [NEET] 7 3 4 (b) T (c) T (d) T (a) T 4 2 3
2015 8 On observing light from three different stars P, Q and R, it was found that intensity of violet colour is maximum in the spectrum of P, the intensity of green colour is maximum in the spectrum of R and the intensity of red colour is maximum in the spectrum of Q. If TP , TQ and TR are the respective absolute temperatures of P , Q and R, then it can be concluded from the above observations that (a) TP > TQ > TR (b) TP > TR > TQ [AIPMT] (c) TP < TR < TQ (d) TP < TQ < TR
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2014 9 Certain quantity of water cools from 70°C to 60°C in the first 5 min and to 54°C in the next 5 min. The temperature of the surrounding is [CBSE AIPMT] (a) 45°C (b) 20°C (c) 42°C (d) 10°C
2013 10 Which of the following is the λ m - T graph for a perfectly black body?
[AIIMS] λm
λm
(a)
(b) λm
T
(c)
T
λm
(d) T
T
11 A cup of tea cools from 80°C to 60°C in 1 min. The ambient temperature is 30°C. In next 1 min, its temperature will be [AIIMS] (a) 40°C (b) 45°C (c) 48°C (d) 42°C 12 The total radiant energy per unit area, normal to the direction of incidence, received at a distance R from the centre of a star of radius r, whose outer surface radiates as a black body at a temperature T kelvin is given by [CBSE AIPMT] 2 4 2 4 σr T σr T (a) (b) 2 R 4 πr 2 σ r 4T 4 4π σ r 2T 4 (d) (c) R2 r4 13 A piece of iron is heated in a flame. It first becomes dull red, then becomes reddish yellow and finally turns to white out. The correct explanation for the above observations is possible by using [NEET] (a) Stefan’s law (b) Wien’s displacement law (c) Kirchhoff’s law (d) Newton’s law of cooling 14 A body cools from 50° Cto 49°C in 5 s. How long will it take cool from 40°C to 39°C ? (Assume temperature of surroundings to be 30°C and Newton’s law of cooling is valid) [WB JEE] (a) 2.5 s (b) 10 s (c) 20 s (d) 5 s
15 Let there be four particles having colours blue, red, black and white. When they are heated together and allowed to cool, which article will cool at the earliest? [KCET] (a) Blue (b) Red (c) Black (d) White
2012 16 If the radius of a star is R and it acts as a black body, what would be the temperature of the star, in which the rate of energy production is Q? [CBSE AIPMT] 2 2 −1 / 2 (a) Q / 4πR σ (b) (Q / 4πR σ ) (c) ( 4πR 2Q / σ )1/ 4 (d) (Q / 4πR 2σ )1/ 4
2010 17 A thin square steel plate with each side equal to 10 cm is heated by a blacksmith. The rate of radiated energy by the heated plate is 1134 W. The temperature of the hot steel plate is (Stefan’s constant, σ = 5.67 × 10−8 Wm −2 K −4 , emissivity of the plate = 1) [BHU] (a) 1000 K (b) 1189 K (c) 2000 K (d) 2378 K
18 A hot body at temperature T losses heat to the surrounding temperature TS by radiation. If the difference in temperature is small, then the rate of loss of heat by the hot body is proportional to [Manipal] 2 (a) (T − Ts ) (b) (T − Ts ) (d) (T − Ts ) 4 (c) (T − Ts )1/ 2 19 A body takes 5 min to cool from 80°C to 70°C . To cool from 80° C to 60° C, it will take (Room temperature = 40° C) [OJEE] (a) 5 min (b) 10 min (c) 12 min (d) 14 min 20 Experimental investigations show that the intensity of solar radiation is maximum for a wavelength 480 nm in the visible region. Estimate the surface temperature of the sun. (Take, Wien’s constant, b = 2.88 × 10−3 mK.) (a) 4000 K (b) 6000 K [WB JEE] (c) 8000 K (d) 106 K 21 Hot water cools from 60° C to 50° C in the first 10 min and to 42° C in the next 10 min. Then, the temperature of the surroundings is [KCET] (a) 20° C (b) 30° C (c) 15° C (d) 10° C 22 A black body has a wavelength of λ at temperature 2000 K. Its corresponding wavelength at temperature 3000 K will be [JIPMER] 2λ 3λ 4λ 9λ (b) (c) (d) (a) 3 2 9 4
273
THERMAL PROPERTIES OF MATTER
23 According to Newton’s law of cooling, the rate of cooling of a body is proportional to ( ∆θ ) n , where ∆θ is the difference of the temperature of the body and the surroundings and n is equal to [MGIMS] (a) 2 (b) 3 (c) 4 (d) 1 24 A chef, on finding his stove out of order, decides to boil the water for his wife’s coffee by shaking it in a thermos flask. Suppose that he uses tap water at 15° Cand that the water falls 30 m each shake, the chef making 30 shakes each minute. Neglecting any loss of thermal energy by the flask, how long must he shake the flask until the water reaches 100° C ? [VMMC] 3 3 (a) 2.25 × 10 min (b) 3.97 × 10 min (c) 4.03 × 103 min (d) 5.25 × 103 min 25 A body cools in 7 min from 60°C to 40°C. What time (in min) does it take to cool from 40°C to 28°C, if surrounding temperature is 10°C ? (Assume, Newton’s law of cooling is valid) [CG PMT] (a) 3.5 (b) 14 (c) 7 (d) 10 26 Two black metallic spheres of radius 4 m, at 2000 K and 1 m, at 4000 K will have ratio of energy radiation as [AFMC] (a) 1: 1 (b) 4 : 1 (c) 1: 4 (d) 2 : 1 27 The sphere of radii 8 cm and 2 cm are cooling. Their temperatures are 127 ° C and 527 ° C, respectively. Find the ratio of energy radiated by them in the same time. [MHT CET] (a) 0.06 (b) 0.5 (c) 1 (d) ∞ 28 At 273° C, the emissive power of a perfect black body is [Manipal] R. What is its value at 0° C ? R R (a) (b) 4 16 R (c) (d) None of these 2 29 Assertion As temperature of a black body is raised, wavelength corresponding to maximum energy reduces. Reason Higher temperature would mean higher energy and hence higher wavelength. [VMMC] (a) Both Assertion and Reason are correct and Reason is the correct explanation of A. (b) Both Assertion and Reason are correct but R is not the correct explanation of A. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 30 Using which of the following instruments, the temperature of the sun can be determined? (a) Platinum thermometer (b) Gas thermometer (c) Pyrometer (d) Vapour pressure thermometer
[CG PMT]
2009 31 The tungsten filament of an electric lamp has a surface area A and a power rating P. If the emissivity of the filament is ε and σ is Stefan’s constant, the steady temperature of the filament will be [AFMC] P (a) T = Aεσ
4
1
Aεσ 4 (c) T = P
P (b) T = Aεσ 1
P 4 (d) T = Aεσ
32 If temperature of a black body increases from – 73°C to 327°C, then ratio of emissive power at these two temperatures is [OJEE] (a) 27 : 1 (b) 81: 1 (c) 1: 27 (d) 1: 81 33 The temperature of a radiating body increases by 30%. Then, the increase in the amount of radiation emitted will be approximately [Kerala CEE] (a) 185% (b) 285% (c) 325% (d) 245% (e) 130% 34 The surface temperature of the stars is determined using (a) Planck’s law [KCET] (b) Wien’s displacement law (c) Rayleigh-Jeans law (d) Kirchhoff’s law 35 The amount of heat energy radiated by a metal at temperature T is E. When the temperature is increased to [KCET] 3T, energy radiated is (a) 81E (b) 9E (c) 3E (d) 27E 36 A black body at 227°C radiates heat at the rate of 7 cal cm −2s −1 . At a temperature of 727°C, the rate of heat radiated in the same units will be [CBSE AIPMT] (a) 60 (b) 50 (c) 112 (d) 80 37 For a black body at temperature 727° C , its radiating power is 60 W and temperature of surrounding is 227°C. If the temperature of the black body is changed to 1227°C, then its radiating power will be [UP CPMT] (a) 120 W (b) 240 W (c) 304 W (d) 320 W 38 The wavelength of the radiation emitted by a body depends upon [BCECE] (a) the nature of its surface (b) the area of its surface (c) the temperature of its surface (d) All the above factors
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
39 A black body of mass 34.38 g and surface area 19.2 cm 2 is at an initial temperature of 400 K. It is allowed to cool inside an evacuated enclosure kept at constant temperature 300 K. The rate of cooling is 0.04 ° C/s. The specific heat of body is (Stefan’s constant, σ = 5.73 × 10−8 Jm −2 K −4 ) (a) 2800 J/kg-K (c) 1400 J/kg-K
(b) 2100 J/kg-K (d) 1200 J/kg-K
[MGIMS]
2008 40 Two solid spheres A and B made of the same material have radii rA and rB , respectively. Both the spheres are cooled from the same temperature under the conditions valid for Newton’s law of cooling. The ratio of the rate of change of temperature A and B is [AFMC] rA rB rA2 rB2 (d) 2 (b) (c) 2 (a) rB rA rB rA
41 Which of the following statements is true/correct? [MHT CET]
(a) During clear nights, the temperature rises steadily upward near the ground level. (b) Newton’s law of cooling, an approximate form of Stefan’s law, is valid only for natural convection. (c) The total energy emitted by a black body per unit time per unit area is proportional to the square of its temperature in the Kelvin scale. (d) Two spheres of the same material have radii 1 m and 4 m and temperatures 4000 K and 2000 K, respectively. The energy radiated per second by the first sphere is greater than that radiated per second by the second sphere. 42 A hot liquid is filled in a container and kept in a room of temperature of 25°C. The liquid emits heat at the rate of 200 Js −1 when its temperature is 75°C. When the temperature of the liquid becomes 40°C, the rate of heat loss (in Js −1 ) is [Kerala CEE] (a) 160 (b) 140 (c) 80 (d) 60 (e) 40.5
43 A black body at 1227°C emits radiations with maximum intensity at a wavelength of 5000 Å. If the temperature of the body is increased by 1000°C, the maximum intensity will be observed at [Haryana PMT] (a) 4000 Å (b) 5000 Å (c) 6000 Å (d) 3000 Å 44 Wien’s displacement law for emission of radiation can be written as [J&K CET] (a) λ max is proportional to absolute temperature (T) (b) λ max is proportional to square of absolute temperature (T 2 ) (c) λ max is inversely proportional to absolute temperature (T ) (d) λ max is inversely proportional to square of absolute temperature (T 2 ) ( λ max = wavelength whose energy density is greatest)
45 The power of a black body at temperature 200 K is 544 W. Its surface area is [Punjab PMET] −8 −2 −4 (Take, σ = 5.67 × 10 Wm K ) (a) 6 × 10−2 m 2 (c) 6 × 10−6 m 2
(b) 6 m 2 (d) 6 × 102 m 2
46 A body cools from 80°C to 64°C in 5 min and same body cools from 80°C to 52°C in 10 min, what is the temperature of the surrounding? [DUMET] (a) 24°C (b) 28°C (c) 22°C (d) 25°C 47 If a black body emits 0.5 J of energy per second when it is at 27°C, then the amount of energy emitted by it when it is at 627°C will be [KCET] (a) 40.5 J (b) 162 J (c) 13.5 J (d) 135 J 48 Two circular discs A and B with equal radii are blackened. They are heated to same temperature and are cooled under identical conditions. What inference do you draw from their cooling curves? [BCECE] R
A B (θ – θ0)
(a) A and B have same specific heats (b) Specific heat of A is less (c) Specific heat of B is less (d) Nothing can be said
49 Assuming the sun to have a spherical outer surface of radius r, radiating like a black body at temperature t ° C, the power received by a unit surface, (normal to the incident rays) at a distance R from the centre of the sun is r 2σ ( t + 273) 4 4πr 2σt 4 [JCECE] (a) (b) 4 πR 2 R2 r 2σ( t + 273) 4 16π 2 r 2σt 4 (d) (c) R2 R2 where, σ is the Stefan’s constant.
2007 50 Two friends A and B are waiting for another friend for tea. A took the tea in a cup and mixed the cold milk and then waits. B took the tea in the cup and then mixed the cold milk when the friend comes. Then, the tea will be hotter in the cup of [AFMC] (a) A (b) B (c) tea will be equally hot in both cups (d) friend’s cup
THERMAL PROPERTIES OF MATTER
51 A sphere and a cube of same material and same volume are heated upto same temperature and allowed to cool in the same surroundings. The ratio of the amounts of radiation emitted will be [Manipal] 4 (a) 1 : 1 (b) π : 1 3 1/ 3 2/ 3 π 1 4π (c) : 1 (d) :1 6 2 3 52 A planet having average surface temperature T0 at an average distance d from the sun. Assuming that the planet receives radiant energy from the sun only and it loses radiant energy only from the surface and neglecting all other atmospheric effects we conclude (b) T0 ∝ d −2 (a) T0 ∝ d 2 [AMU] (c) T0 ∝ d 1/ 2
(d) T0 ∝ d −1/ 2
53 The surface temperature of the sun which has maximum energy emission at 500 nm is 6000 K. The temperature of a star which has maximum energy emission at 400 nm will be [KCET] (a) 8500 K (b) 4500 K (c) 7500 K (d) 6500 K 2006 54 Newton’s law of cooling holds good only, if the temperature difference between the body and the surroundings is [MHT CET] (a) less than 10°C (b) more than 10°C (c) less than 100°C (d) more than 100°C 55 A black body at a temperature T radiates energy at E. If the T temperature falls to , the radiated energy will be 2 [J&K CET] E E (b) (a) 4 2 E (c) 2E (d) 16 56 The surface temperature of the sun is T kelvin and the solar constant for a plate is S. The sun subtends an angle θ at the planet. Then, [AMU] 4 2 (a) S ∝ T (b) S ∝ T 2 (d) S ∝ θ (c) S ∝ θ 57 A body cools from 75°C to 70°C to time t1 , from 70°C to 65°C in time t 2 and from 65°C to 60°C in time t 3 , then (a) t 3 > t 2 > t 1 (b) t 1 > t 2 > t 3 [JCECE] (c) t 2 > t 1 = t 3 (d) t 1 > t 2 < t 3
275 2005 58 Assertion (A) For higher temperatures, the peak emission wavelength of a black body shifts to lower wavelengths. Reason (R) Peak emission wavelengths of a black body is proportional to the fourth-power of temperature. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A (b) Both A and R are correct but R is not the correct explanation of A (c) A is correct but R is incorrect (d) Both A and R are incorrect
59 A body at a temperature of 727°C and has surface area 5 cm 2 , radiates 300 J of energy each minute. The emissivity is (given, Boltzmann constant = 5.67 × 10−8 Wm −2 K −4 ) [Manipal] (a) e = 0.18 (b) e = 0.02 (c) e = 0.2 (d) e = 0.15 60 A hot liquid kept in a beaker cools from 80°C to 70°C in 2 min. If the surrounding temperature to 30°C, then the time of cooling of the same liquid from 60°C to 50°C is (a) 240 s (b) 360 s (c) 480 s [Kerala CEE] (d) 216 s (e) 264 s 61 A black body is heated from 27°C to 927°C. The ratio of radiations emitted will be [MP PMT] (a) 1 : 256 (b) 1 : 64 (c) 1 : 16 (d) 1 : 4 62 A black body at temperature 104 K radiates maximum energy at wavelength 500 Å. If the temperature is increased 10 times, the maximum energy would be radiated at wavelength equal to [Haryana PMT] (a) 50000 Å (b) 500 Å (c) 50 Å (d) 5 Å 63 The spectral energy distribution of a star is maximum at twice temperature as that of the sun. The total energy radiated by the star is [J&K CET] (a) twice as that of the sun (b) same as that of the sun (c) sixteen times as that of the sun (d) one-sixteenth of the sun 64 Two bodies of same shape, same size and same radiating power have emissivities 0.2 and 0.8. The ratio of their temperatures is [EAMCET] (a) 3 : 1 (b) 2 : 1 (c) 1: 5 (d) 1: 8 65 A piece of blue glass heated to a high temperature and a piece of red glass at room temperature, are taken inside a dimly lit room, then [KCET] (a) the blue piece will look blue and red will look as usual (b) red looks brighter red and blue looks ordinary blue (c) blue shines brighter or compared to the red piece (d) both the pieces will look equally red
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 11 21 31 41 51 61
(d) (c) (d) (d) (b) (c) (a)
2 12 22 32 42 52 62
(a) (a) (a) (d) (d) (d) (c)
(a) (b) (d) (a) (d) (c) (c)
3 13 23 33 43 53 63
4 14 24 34 44 54 64
(a) (b) (c) (b) (c) (a) (b)
5 15 25 35 45 55 65
(d) (b) (c) (a) (b) (d) (c)
6 16 26 36 46 56
(c) (d) (a) (c) (a) (a)
7 17 27 37 47 57
(b) (b) (c) (d) (a) (a)
8 18 28 38 48 58
(b) (a) (b) (c) (b) (c)
9 19 29 39 49 59
(a) (c) (c) (c) (d) (a)
10 20 30 40 50 60
(d) (b) (c) (b) (a) (d)
Explanations 1 (d) When the object cool from 80°C to 70°C in 12 min, then from Newton’s law of cooling, 80° − 70° 1 = 12 K
80° + 70° − 25° 2
[QT0 = 25° C] 5 1 …(i) = 50 6 K Similarly, when object cool from 70°C to 60°C, we get 70° − 60° 1 70° + 60° = − 25° t K 2 10 1 …(ii) = 40 t K Divide Eq. (i) by Eq. (ii), we get 5 50 t × = 6 10 40 5 t = × 12 = 15 min ⇒ 4
2 (a) Temperature of sphere, T = 227° C = 273 + 227 = 500 K Radius, r = 2m Emissivity, e = 0.8 ∴Radiation power of sphere = Radiated energy per second = σ AeT 4 = 5.67 × 10−8 × 4 π × 22 × 0.8 × (500)4 = 142502.6 W = 142.5 kW
3 (a) Given, temperature of sun, TS = 6000 K Radius of sun, 5
8
Rs = 7.2 × 10 km = 7.2 × 10 m Radius of earth, Re = 6000 km = 600 × 103 m
Distance between earth and sun, d = 15 × 107 km = 15 × 1010 m
⇒
Intensity of light on the earth, Total energy emitted by sun I = × (π Re 2 ) 4 πd 2 σ (Ts4 ⋅ 4 πRs2 × πRe 2 ) = 4 πd 2 4 σ Ts Rs 2 × πRe 2 = d2 −8
5.67 × 10 =
4
4
81 P1 3 = = 256 P2 4 Given, P1 = P and P2 = nP P1 P 256 81 or n = ⇒ = = P2 nP 256 81
5 (d) Radiated power of a black body, 8 2
= 19.2 × 1016
4 (a) According to Wien’s law, λ (max) ∝ 1 /T i.e. λ (max)T = constant
where, λ (max) is the maximum wavelength of the radiation emitted at temperature T . ∴ λ (max) 1T1 = λ (max) 2 T2 T1 λ (max) 2 …(i) or = T2 λ (max) 1 3 λ0 4
Substituting the above values in Eq. (i), we get 3 λ T1 4 0 3 T 3 …(ii) = = or 1 = T2 λ0 4 T2 4 As we know that, from Stefan’s law, the power radiated by a body at temperature T is given as P = σAeT 4 i.e.
4
From Eq. (i), we get
× (6000) × (7.2 × 10 ) × 314 . × (6000 × 103 )2 (15 × 1010 )2
Here λ (max) 1 = λ 0 and λ (max) 2 =
P1 T14 T1 = = P2 T24 T2
P ∝T4 (Q the quantity σAe is constant for a body)
P = σAT 4
where, A = surface area of the body, T = temperature of the body and σ = Stefan’s constant. When radius of the sphere is halved, new area, A′ = A /4 ∴ Power radiated, 16 A P′ = σ (2T )4 = ⋅ (σAT 4 ) 4 4 = 4P = 4 × 450 = 1800 W
6 (c) Given, temperature, T1 = 5760 K Since, it is given that energy of radiation emitted by the body at wavelength 250 nm in U 1, at wavelength 500 nm is U 2 and that at 1000 nm isU 3. Q According to Wien’s law, we get λ mT = b where, b = Wien’s constant = 2.88 × 106 nmK ⇒
λm = =
b T 2.88 × 106 nmK = 500 nm 5760 K
Q λ m = wavelength corresponding to maximum energy, so U 2 > U 1.
277
THERMAL PROPERTIES OF MATTER
7 (b) According to Newton’s law of cooling, ∆T = ∆T0 e−λt
− λ × 10
⇒ 3T − 2T = (3T − T ) e Again for next 10 min,
T ′ − T = (2T ) × e− λ (20)
…(i) …(ii)
From Eqs. (i) and (ii), we get T ′ − T = (2T ) (e−λ × 10 )2 2
T 1 = (2T ) = 2 2
∴
12 (a) If r is the radius of the star and T its
1 from Eq. (i ), e− λ × 10 = 2 T 3T T′ = T + = 2 2
8 (b) We know from Wien’s
displacement law, λ mT = constant 1 So, T ∝ λm λ r > λ g > λv Tr < Tg < Tv P → vmax , Q → rmax , R → gmax Hence, TQ < TR < TP i.e. TP > TR > TQ
As, So, Given,
Q2 − Q1 Q + Q1 =K 2 − Q0 t 2 70 − 60 ...(i) = (65 − Q0 ) K 5 60 − 54 = (57 − Q0. ) K 5
...(ii)
From Eqs. (i) and (ii), we get 10 65 − Q0 = 6 57 − Q0 ⇒
displacement law, i.e. λ mT = constant 1 T So, graph is rectangular hyperbola. θ − θ2 θ + θ2 (c) 1 =K 1 − θ 0 2 t 80° − 60° 80°¦ + 60°¦ ∴ =K − 30°¦ 1 2 For perfectly black body, λ m ∝
⇒
20° = K × 40° 1 K = 2
2
4
2 4
σr T 4 πr σT = R2 4 πR 2
displacement law, i.e. λ mT = constant constant or λ m = T When the piece of iron is heated, i.e. temperature increases, λ m decreases. Thus, maximum intensity of emitted radiation moves towards the shorter wavelength. So, the colour of iron piece will change from longer wavelength (dull red) to shorter wavelength (reddish yellow) and when temperature is further increased the iron piece emitted all wavelength, so colour will become white.
14 (b) From Newton’s law of cooling, θ1 − θ2 θ1 + θ2 ∝ − θ 0 2 t
Q0 = 45° C
10 (d) The equation of Wien’s
11
In reaching a distance R, this energy will spread over a sphere of radius R, so the intensity of radiation will be given by P S = 4 πR 2
13 (b) This can be explain by Wien’s
from Newton’s law of cooling
Case II
temperature, then the energy emitted by the star per second through the radiation in accordance with Stefan’s law will be given by P = AσT 4 = 4 πr2σT 4
=
9 (a) Let temperature of surrounding Q0 Case I
For next 1 min, 60° − θ 1 60° + θ = − 30° 1 2 2 60° + θ − 60° 120° − 2θ = 2 ⇒ 240° − 4θ = θ 240° ⇒ θ= = 48° C 5
where, θ 0 = temperature of surroundings. ∴
50° − 49° 50°+ 49° ∝ − 30° …(i) t1 2
40° − 39° 40° + 39° and ∝ − 30° …(ii) t2 2 Dividing Eq . (i) by Eq. (ii), we get t2 39 = t1 19 ⇒
t2 =
39 × 5 = 10 s 19
15 (b) Red colour has maximum wavelength. From Wien’s displacement law, the relation between maximum wavelength λ m and temperature T is λ mT = constant which implies longer the wavelength, smaller the temperature. Since, red colour has maximum wavelength, so its temperature will be minimum and hence it will cool at the earliest.
16 (d) From Stefan’s law, E = σT 4 So, the rate energy production, Q=E×A ⇒ Q = σT 4 × 4 πR 2 Q Temperature of star, T = 4 πR 2σ
1/ 4
17 (b) The rate of radiated energy, E = εσAT 4 or
1134 = 1 × 5.67 × 10−8 × (0.1)2 T 4
Temperature, T = 1189 K
18 (a) By Stefan’s law, dT Aεσ 4 = [T − T04 ] dt mc When the temperature difference between the body and its surrounding is not very large, i.e. T − T0 = ∆T , then T 4 − T04 may be approximated as 4T03∆T . dT Aεσ 3 Hence, = 4T0 ∆T dt mc dT ∝ ∆T (Q ∆T = T − TS ) ⇒ dt i.e., if the temperature of the body is not very different from surrounding, rate of cooling is proportional to temperature difference between the body and its surrounding. This law is called Newton’s law of cooling.
19 (c) According to Newton’s law of cooling, θ1 − θ2 θ + θ 2 =K 1 − θ0 2 t 80° − 70° 80° + 70° =K − 40° 5 2 2 K = ⇒ 35 80°− 60° 2 80° + 60° Again, = − 40° t 35 2
∴
≈ 11.55 ≈ 12 min
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
20 (b) The Wien’s radiation law is given
=
by λ mT = b For the given problem,
25 (c) From Newton’s law of cooling, θ1 − θ2 θ1 + θ2 = − θ 0 2 t
Hence, λ mT = 2.88 × 10 T =
2.88 × 10−3 λm
=
2.88 × 10−3 480 × 10−9
Therefore, 60° − 40° 60° + 40° ∝ − 10° …(i) 7 2 40° − 28° 40° + 28° ∝ − 10° …(ii) t 2
= 6000 K
21 (d) According to Newton’s law of cooling, θ2 − θ1 θ + θ 2 =K 1 − θs 2 t
Dividing Eq. (i) by Eq. (ii), we get 10 K (55° − θ s ) = 8 K (46° − θ s )
On solving the Eqs. (i) and (ii), we get t = 7 min
Q
2
A, emissivity ε and surface temperature (T ) is, P = σεAT 4 1/ 4
P = AεσT 4
4
P1 A1 = P2 A2
T1 (R )2 = 12 T2 (R2 )
2
4
8 273 + 127 = 2 273 + 527 4
T1 T2
4
400 2 1 = (4 )2 = (4 ) = 1 800 2 energy emitted per second per unit surface area of a black body is proportional to the fourth power of the absolute temperature (T ) of the body. ∴ E = σT 4
λ 2 2000 2 = = λ 3000 3 2 λ2 = λ 3
23 (d) According to Newton’s law of cooling,
(given)
where, σ is Stefan’s constant. Given, E1 = R ⇒T1 = 273° C = 273 + 273 = 546 K T2 = 0° C = 273 K E1 T14 = ∴ E2 T24 ⇒ ⇒
=
c (T f − Ti ) Rgh
⇒
E2 =
T24 E1 T14
(273)4 R (546)4 R E2 = 16 E2 =
P T = σε A (d) Emissive power of a body with surface temperature (T kelvin) is given as E = σT 4
⇒
4
28 (b) From Stefan’s law, the total radiant
λ mT = constant λ 2 T1 = λ 1 T2
Rmgh
31 (d) Radiating power of a body of area
4
27 (c) According to Stefan’s law,
law,
cm (T f − Ti )
4
1 2000 4 = × = 4000 1 1
θ s = 10° C
=
2
R T = 1 ⋅ 1 R2 T2
P1 A1 T14 = ⋅ P2 A2 T24
(Q A = πR 2 )
22 (a) According to Wien’s displacement
24
to measure the temperature by measuring the intensity of radiations received from the body. They are based on the fact that the amount of radiation emitted from a body per unit area per second is directly proportional to the fourth power of temperature, i.e. Stefan’s law. These can be used to measure temperature ranging from 800° C to 6000° C.
P = A εσT 4
…(i) 1 = K [ 55 − θ s ] 50° − 42° Similarly, = K (46° − θ s ) 10 8 ...(ii) = K (46° − θ s ) 10
dQ ∝ ∆θ dt dQ But ∝ (∆θ )n dt ∴ n=1 Q (c) Hence, t = Rmgh
30 (c) Pyrometers are the devices used
26 (a) According to Stefan’s law,
where, θ s is the temperature of the surroundings. 60° − 50° 60° + 50° =K − θs 10 2
or
law, the wavelength corresponding to maximum emission of radiation decreases with increasing temperature, 1 i.e. λ m ∝ , when temperature of a T black body is raised, wavelength decreases means its corresponding energy reduces. Hence, the statement given in Reason is contradictory. Hence, option (c) is correct.
= 4.03 × 10 min
−3
⇒
29 (c) According to Wien’s displacement
3
b = 2.88 × 10−3 mK
⇒
(4190)(100 − 15) (30)(9.8)(0.30)
32
Hence,
E2 T2 = E1 T1
4
4
273 − 73 200 = = 273 + 327 600
4
∴ E2 : E1 = 1 : 81
33 (a) Let initial surface temperature be T0. From Stefan’s law, E1 = σT04 , i.e. E ∝ T 4 As, surface temperature is increased by 30%, 30 E2 = σ T0 + T0 100 130 = σT0 100
4
4
4
E − E1 13 E2 130 = −1 = = 2 10 E1 E1 100 13 4 ∆E × 100 = − 1 × 100 E1 10 ~ 185% Increase in E = 185.61% −
279
THERMAL PROPERTIES OF MATTER
34 (b) Surface temperature of stars is determined by Wien’s displacement law. b As, where T = λm
and
b = Wien’s constant = 2.898 × 10−3 m-K λ m = 4753 × 10−10 m
35 (a) From Stefan’s law, E = σ T 4 ⇒ Initial surface temperature is T. As, temperature is increased to 3T.
mc ⇒
dT = σ(T 4 − T04 ) A dt c=
σ(T 4 − T04 ) A dT m dt
E2 = σ T 4 (81) E2 = 81 E
⇒ c = 1400 J/kg - K
36 (c) Apply Stefan’s law of radiations, E = σT 4 E1 T1 = E2 T2 ⇒
39 (c) From Stefan’s law,
(5.73 × 10−8 ) [(400)4 − (300)4 ] ×19.2 × 10−4 ⇒c= −3 (34.38 × 10 ) × 0.04
E2 = σ (3T )4 ⇒
Hence, the colour of radiation emitted by the hot wire shifts from red to yellow, then the blue and finally to white.
4
273 + 727 E2 = 7 273 + 227
4
4
1000 = ×7 500 = 112 cal cm −2s−2
37 (d) As per modified Stefan’s law, if a body at temperature T is surrounded by another body at temperature T0 (where, T0 < T ), then Stefan’s law is given as E = σ (T 4 − T04 ) E2 (T24 − T04 ) = E1 (T14 − T04 ) E2 (1500)4 – (500)4 = E1 (1000)4 – (500)4 (15)4 − (5)4 ⇒ E2 = 60 4 4 (10) − (5) = 320 W
38 (c) The wavelength of radiation emitted by a body depends upon the temperature of its surface. According to Wien’s lawλ mT = constant, on heating upto ordinary temperatures, only long wavelength (red) radiation is emitted. As the temperature rises, shorter wavelengths are also emitted in more and more quantity.
4 π 3 dT 2 4 4 r ρc − = σ 4 πr (T − T0 ) dt 3 dT 3σ 4 (T − T04 ) = H (say) ∴ − = dt ρrc
40 (b)
Ratio of rates of fall of temperature , H A rB = H B rA
42 (d) Rate of heat loss ∝ ∆t dQ dt 1 (75°−25° ) = ∴ (40°−25° ) dQ dt 2 200 50 ⇒ = dQ 15 dt 2 ∴
43 (d) According to Wien’s law, λ mT = constant (say b) where, λ m is wavelength corresponding to maximum intensity of radiation and T is temperature of the body in kelvin. λ ′m T ∴ = λm T′ Given, T = 1227 + 273 = 1500 K T ′ = 1227 + 1000 + 273 = 2500 K λ m = 5000 Å
41 (b) Stefan’s law, E = Aeσ(T 4 − T04 ) We assume that difference between T , T0 is very small. Now, E = Aeσ(T 2 + T02 )(T 2 − T02 )
dQ −1 = 60 Js dt 2
Hence, λ ′m =
1500 × 5000 = 3000 Å 2500
44 (c) Wien’s displacement law,
= Aeσ (T 3 + T 2T0 + TT02 + T03 ) (T − T0 )
λ max ⋅ T = b where, b = Wien’s constant. 1 λ max ∝ ∴ T
Since, we assumed T ≈ T0 E = Aeσ4T03 (T − T0 )
Thus, λ max is inversely proportional to absolute temperature (T).
= Aeσ (T 2 + T02 ) (T + T0 ) (T − T0 )
= k (T − T0 ) where, k = Aeσ4T03 dQ − dQ = 4 k (T − T0 )k Q E = − dt dt dQ dθ Since, = ms dt dt dθ So, ms = k (T − T0 ) dt dθ − k = (T − T0 ) dt ms dθ = K ′ (T − T0 ) dt Which is Newton’s law of cooling, hence Newton’s law is a approximate form of Stefan’s law of radiation and works well for natural convection.
45 (b) According to Stefan’s law, Q = σT 4 At Q Here, = 544, t T = 200 K σ = 5.67 × 10−8 Wm −2K−4 544 Q = A= ∴ 4 5.67 × 10−8 × (200)4 σtT = 6 m2
46 (a) According to Newton’s law of cooling, 80 − 64 80 + 64 …(i) =α −T 2 5 and
80 − 52 80 + 52 =α − T …(ii) 2 10
280
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
where, T is the temperature of the surroundings. Solving Eqs. (i) and (ii), we get T = 24 ° C
47
T (a) Q2 = Q1 2 T1
4
51 (c) Energy radiated per second is given as, P = Aσ εT
900 = 0.5 = 40.5 J 300 [Q T2 = 627 + 273 = 900 K, T1 = 27 + 273 = 300 K]
48 (b) According to Newton’s law of cooling, rate of cooling is given by − dT eAσ 4 (T − T04 ) = dt mc
49 (d) From Stefan’s law, the rate at which energy is radiated by sun at its surface is P = σ × 4 πr2T 4
R
r0 Earth
r Sun
[Sun is a perfectly black body as it emits radiations of all wavelengths and so for it, e = 1] The intensity of this power at earth’s surface (under the assumption R >> r0 ) is P σ × 4 πr2T 4 I = = 2 4 πR 4 πR 2 ⇒
σr2T 4 σr2 (t + 273)4 = = R2 R2
50 (a) The rate of heat loss is proportional to the difference in temperature. The difference of temperature between the tea in cup A and the surrounding is reduced, so it losses less heat, the tea in cup B losses more heat because of large temperature difference. Hence, the tea in cup A will be hotter.
P1 4 πR 2 = P2 6a2
(σ = Stefan’s constant)
...(i)
Also, volume of sphere = volume of cube 4 3 3 πR = a 3 ⇒
R 3 = a 4π P1 π = P2 6
T0 ∝ d −1/ 2
⇒
S ∝T4 dH θ + θ2 = K 1 − θ 0 2 dt
where, θ 0 is temperature of surroundings θ + θ2 and 1 is the temperature of body. 2 Hence, t3 > t2 > t1.
58 (c) Figure shows that how the energy of a black body radiation varies with temperature and wavelength. As the temperature of the black body increases, two distinct behaviours are observed.
(λ m )1T1 = (λ m )2T2 ∴ 500 × 6000 = 400 × T2 500 × 6000 ⇒ T2 = 400 = 7500 K
The first effect is that the peak of the distribution shifts to shorter wavelengths. This shift is found to obey the following relationship called Wien’s displacement law.
54 (a) Newton’s law of cooling states that
When temperature difference between the body and surroundings is small, then loss of heat energy from the body is mainly due to the process of convection. In such a case, the rate of cooling of the body is governed by Newton’s law of cooling from the given options (a) would be correct.
E (T / 2)4 ⋅E = 16 T4
57 (a) By Newton’s law of cooling,
53 (c) By using Wien’s displacement law,
the rate of cooling (R ) is directly proportional to temperature difference between body and its surroundings. − dT = k (T − T0 ) dt
E2 =
T24 ⋅ E1 T14
θ = 2R / d S = constant × T 4 × θ 2
For thermal equilibrium to exist, we get P (πR 2 ) = σ (4 πR 2 )T04 4 πd 2 ⇒
⇒
⇒ E2 =
Angle subtended by sun at the earth,
52 (d) Energy received per second by the
T04 ∝ d −2
E1 T14 = E2 T24
Energy received/area/s = S = P / 4 πd 2 R2 T4 = σT 4 2 S = 4 πR 2σ 2 4 πd d 2 1 2 R = σT 4 d 4
1/ 3
⇒
∴
Power radiated from the sun = (4 πR 2 ) σT 4 = P
...(ii)
Further, energy radiated per second by the planet according to Stefan’s law is σ (4 πR 2 )T04.
E1 = E , T1 = T , T2 = T / 2
of the earth from the sun = d
1/ 3
P planet = (πR 2 ) 4 πd 2 where, P is power radiated by the sun and R is the radius of the planet.
Given,
56 (a) Let radius of sun = R and distance
From Eqs. (i) and (ii), we get
where, c is specific heat of material, − dT 1 ∝ dt c i.e., rate of cooling varies inversely as specific heat. From the graph, for A, rate of cooling is larger. Therefore, specific heat of A is smaller.
55 (d) By Stefan’s law, E = σT 4
P∝A [As temperature of surface is constant] P1 A1 As = = P2 A2 Ac ⇒
4
4
λmT = constant
eλ
4000 K 3000 K 2000 K
O
1 2 3 Wavelength (µm)
4
281
THERMAL PROPERTIES OF MATTER
The second effect is that the total amount of energy that the black body emits per unit area per unit time increases with fourth power of absolute temperature T.
61 (a) Here, initial temperature, T1 = 27° C = 300 K Final temperature, T2 = 927° C = 1200 K According to Stefan’s law, the radiant energy is E ∝ T 4 E1 T14 Here, = E2 T24
Hence, Assertion is correct but Reason is incorrect.
59 (a) Q = EAt = eσ (T 4 − T04 ) At where, t = time and T0 = temperature of surroundings
4
When T > T0,
P2 = σe2T24 A2
−8
4
300 = e × (5.67 × 10 )(1000) (5.00 × 10−4 )(60)
σe1T14 A1 = σe2T24 A2 4
T e A ⇒ 1 = 2 2 T2 e1 A1
e = 0.18 (∴T = 273 + 727 = 1000K)
60 (d) By Newton’s law of cooling,
63 (c) From Stefan’s law of radiation, the total radiant energy emitted per second per unit surface area of a black body is proportional to the fourth power of the absolute temperature (T) of the body.
θ1 − θ2 θ1 + θ2 ∝ − θ 0 2 t 80 − 70 80 + 70 ∝ − 30 ∴ 2 2
Therefore, E = σT 4
…(i)
where, σ is Stefan’s constant. Given, T = 2Ts
60 − 50 60 + 50 and ∝ − 30 …(ii) t 2 Dividing Eq. (i) by Eq. (ii), we get 10 45 t × = 2 10 25 45 × 2 × 10 t= 10 × 25 = 3.6 min = 216 s
T1 e2 = T2 e1
62 (c) By Wien’s displacement law, λ 1T1 = λ 2T2 or λ 2 = λ 1T1 / T2 500 Å × 104 ∴ λ2 = = 50 Å 105
∴
64
E′ = σ(2Ts )4 = 16 σTs4 = 16Es
Hence, total energy radiated by star is sixteen times as that of the sun. (b) Radiating power of a body of area A1, emissivity e1 and surface temperature T1 is …(i) P1 = σe1T14 A1
…(ii)
Given, P1 = P2 and A1 = A2
Hence, E1 : E2 = 1 : 256
Q = eσT 4 At
⇒
4
1 1 300 = = = 4 1200 256
Similarly, radiating power of a body of area A2 , emissitivity e2 and surface temperature T2 is
1/ 4
⋅1
(Q A1 = A2 )
Here,
e1 = 0.2, e2 = 0.8
∴
T1 0.8 4 = T2 0.2
1
1
1
2 4 4 2 4 = = 2 1 1
T1 2 = T2 1
1/ 2
=
2 1
T1 : T2 = 2 : 1
65 (c) According to Stefan’s law, the energy emitted by a body per second is directly proportional to the fourth power of the temperature of the body. Here, the temperature of blue glass is more than that of red glass, so it will look brighter.
11 Thermodynamics Quick Review The branch of physics which deals with the study of transformation of heat energy into other forms of energy and vice-versa is called thermodynamics.
• Ideal gas has only internal kinetic energy and no
•
Thermal Equilibrium A thermodynamical system is said to be in thermal equilibrium when macroscopic variables (like pressure, volume, temperature, mass, composition, etc.) that characterise the system do not change with time.
•
Zeroth Law of Thermodynamics According to this law, ‘‘Two systems in thermal equilibrium with a third system separately, are also in thermal equilibrium with each other.’’ Thus, if A and B are separately in equilibrium with C, i.e. if T A = TC and TB = TC , then this implies that T A = TB , i.e. the systems A and B are also in thermal equilibrium. By zeroth law, temperature can be defined as the thermodynamic variable that determines whether the two systems in contact will be in thermal equilibrium or not.
Internal Energy, Heat and Work • Internal energy of a system is defined as the total
energy of the system due to molecular motion and molecular configuration. Internal energy, U = U K + U P where, U K is internal kinetic energy due to molecular motion and U P is internal potential energy due to molecular configuration.
• •
internal potential energy while real gases have both types of internal energy. The energy that is exchanged between a system and its surroundings due to temperature difference is called heat. By work, we mean work done by the system or on the system. Work done by a thermodynamic system, W = p × ∆V where, p = pressure and ∆V = change in volume. If system expands, then ∆V is positive, so W is positive, hence work is done by the system. If system contracts, then ∆V is negative, so W is negative, hence work is done on the system. A B
Pressure (p ) D Vi Volume (V )
C Vf
• Work done by a thermodynamic system is equal
to the area enclosed between the P-V curve and the volume axis. • Work done by a thermodynamic system depends not only upon the initial and final states of the system but also depend upon the path followed in the process.
283
THERMODYNAMICS
First Law of Thermodynamics Heat given to a thermodynamic system ( ∆Q ) is partially utilised in doing work ( ∆W ) against the surrounding and the remaining part increases the internal energy ( ∆U ) of the system. Therefore,
∆Q = ∆U + ∆W
In differential form, dQ = dU + dW First law of thermodynamics is a restatement of the principle of conservation of energy.
Thermodynamic Processes A thermodynamical process is said to take place when some changes occur in the state of a thermodynamic system, i.e. the thermodynamic parameters of the system change with time. Different Thermodynamical Processes Name of Process Isochoric process
Description Volume remains constant , i.e. ∆V = 0.
Form of Ist law of thermodynamics
Equation of State
∆Q = ∆U
p = constant T
Work Done W =0
Indicator Diagram p
O
Isothermal process
Temperature remains constant, i.e. ∆T = 0.
∆Q = ∆W
pV = constant
W = nRT ln
p1 p2
slope = ∞
V
−p V
V
p
O slope =
Isobaric process
Pressure remains constant, i.e. ∆p = 0.
∆Q = ∆U + ∆W
V = constant T
W = p(V2 − V1 )
p
O
Adiabatic process
No exchange of heat, i.e. ∆Q = 0.
∆W = − ∆U
pV γ = TV γ −1 =p
1− γ
γ
T = constant, Cp . where γ = CV
p1V1 − p2V2 γ −1 nR = (T1 − T2 ) γ −1
W =
slope =0
V
p
O
V
p slope =– γ V
Cyclic process
Change in internal energy is zero, i.e. ∆U = 0.
∆Q = ∆W
——
∆W = ∆Q
p
A (V1 , p1 ) M N
O
D
V
B ( V2 , p2 ) V C
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
• Clausius’ Statement It is impossible to transfer heat from a
A heat engine is a device which converts heat energy into mechanical energy. A heat engine consists of three parts (i) Source of heat at higher temperature Working substance Sink of heat at lower temperature. Thermal efficiency of a heat engine is given by Work done / cycle η= Total amount of heat absorbed / cycle
(ii) (iii)
Q T η = 1− 2 = 1− 2 Q1 T1 where, Q1 is heat absorbed from the source, Q2 is heat rejected to the sink and T1 and T2 are temperatures of source and sink.
Refrigerator or Heat Pump A refrigerator or heat pump is basically a heat engine which runs in reverse direction. The performance of a refrigerator is expressed by means of coefficient of performance β which is defined as the ratio of the heat extracted from the cold body to the work needed to transfer it to the hot body. i.e.
β=
Q2 Heat extracted Q2 = = Work done W Q1 − Q2
Reversible and Irreversible Processes • Reversible Process A process which can be reserved in
such a way that the system and its surrounding return exactly to their initial states with no other changes in the universe is known as reversible process. • Irreversible Process Any process which is not reversible exactly is an irreversible process.
Carnot’s Engine The reversible engine which operaters between two temperatures of source (T1 ) and sink (T2 ) is called Carnot heat engine. It is a theoretical engine free from all defects of a practical engine. As the engine works, the working substance of the engine undergoes a cycle known as Carnot cycle.. Carnot cycle consists of following four strokes p
Q2 Q1 − Q2
• A perfect refrigerator is one which transfers heat from
cold to hot body without doing work. i.e. W = 0, so that Q1 = Q2 and hence β = ∞. Air conditioners are basically refrigerators whose • refrigerated space is a room or a building. • In domestic refrigerator, inside portion acts as a cold reservoir and the surrounding act as hot reservoir. • Relation between coefficient of performance and 1− η efficiency of heat engine, β = . η
Second Law of Thermodynamics The second law of thermodynamics gives a fundamental limitation to the efficiency of a heat engine and the coefficient of performance of a refrigerator. It says that efficiency of a heat engine can never be unity (or 100%). This implies that heat released to the cold reservoir can never be made zero. • Kelvin’s Statement It is impossible to obtain a continuous supply of work from a body by cooling it to a temperature below the coldest of its surroundings.
( p1, V1, T1) A
Q1 ( p2, V2, T1) B T1
Isotherma l expansion
atic n iab Ad ansio exp
Coefficient of performance, β =
lower temperature body to a higher temperature body without use of an external agency. • Planck’s Statement It is impossible to construct a heat engine that will convert heat completely into work. All these statements are equivalent as one can be obtained from the other.
Adiabatic compression
Heat Engine
W = Q1 – Q2
D ( p4, V4, T2) Isothermal compress Q2 ion O
E
F
G
C ( p3, V3, T2) T2 H
V
• Work done in first stroke (Isothermal expansion) along
curve AB,
W1 =
V2
∫ pdV = RT1
V1
V log e 2 = area of ABGEA. V1
• Work done in second stroke (Adiabatic expansion) along
curve BC, W2 =
V3
R
∫ pdV = ( γ − 1) (T1 − T2 )
V2
= Area BCHGB • Work done in third stroke (Isothermal compression) along curve CD, V4 V W3 = − ∫ pdV = − RT2 log e 4 V3 V 3
= RT2 log e
V3 = area CDFHC V4
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THERMODYNAMICS
• Work done in fourth stroke (Adiabatic compression)along DA, V1
−R W4 = − ∫ pdV = (T2 − T1 ) − γ 1 V 4
R = (T1 − T2 ) = area ADFEA γ −1 T • Efficiency of Carnot engine, η = 1− 2 T1 • Coefficient of performance of Carnot engine, β = T2 / T1 − T2
Carnot Theorem According to Carnot theorem (i) A heat engine working between the two given temperatures T1 of hot reservoir, i.e. source and T2 of cold reservoir, i.e. sink cannot have an efficiency more than that of the Carnot engine. (ii) The efficiency of the Carnot engine is independent of the nature of working substance.
Topical Practice Questions All the exam questions of this chapter have been divided into 3 topics as listed below Topic 1
—
FIRST LAW OF THERMODYNAMICS
285–291
Topic 2
—
THERMODYNAMIC PROCESSES
291–297
Topic 3
—
HEAT ENGINE, SECOND LAW OF THERMODYNAMICS AND CARNOT ENGINE
298–303
Topic 1 First Law of Thermodynamics 2018 1 A sample of 0.1 g of water at 100° Cand normal pressure
(1.013 × 105 Nm −2 ) requires 54 cal of heat energy to convert to steam at 100° C. If the volume of the steam produced is 167.1 cc, the change in internal energy of the sample is [NEET] (a) 42.2 J (b) 208.7 J (c) 104.3 J (d) 84.5 J
2 Assertion In isothermal process, whole of the heat energy supplied to the body is converted into internal energy. Reason According to the first law of thermodynamics, [AIIMS] ∆Q = ∆U + ∆W (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
3 An ideal gas of mass m in a state A goes to another state B via three different processes as shown in figure. If Q1 , Q2 and Q3 denote the heat absorbed by the gas along the three paths, then [AIIMS] p A 3 1
2 B
(a) Q1 < Q2 < Q3 (b) Q1 < Q2 = Q3 (c) Q1 = Q2 > Q3 (d) Q1 > Q2 > Q3
V
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2017 4 One mole of an ideal diatomic gas undergoes transition
p (kPa)
from A to B along a path AB as shown below
[AIIMS]
A
5
2012 8 An ideal gas goes from state A to state B via three different processes as indicated in the p-V diagram. If Q1 , Q2 and Q3 indicate the heat absorbed by the three processes and ∆U1 , ∆U 2 and ∆U 3 indicate the change in internal energy along the three processes respectively, then [CBSE AIPMT]
B
2
4 6 V (in m3)
2 3
The change in internal energy of the gas during the transition is (a) 20 kJ (b) − 12 kJ (c) − 20 kJ (d) 20 J
p
system which has absorbed 2 kcal of heat and done 400 J of work is (take, 1 cal = 4.2 J) [Kerala CEE] (a) 2 kJ (b) 8 kJ (c) 3.5 kJ (d) 5.5 kJ (e) 4.2 kJ
(a) Q1 > Q2 > Q3 and ∆U1 = ∆U 2 = ∆U 3 (b) Q3 > Q2 > Q1 and ∆U1 = ∆U 2 = ∆U 3 (c) Q1 = Q2 = Q3 and ∆U1 > ∆U 2 > ∆U 3 (d) Q3 > Q2 > Q1 and ∆U1 > ∆U 2 > ∆U 3
9 A thermodynamic system is taken through the cycle ABCD as shown in figure. Heat rejected by the gas during the cycle is [CBSE AIPMT] p
2013 6 A gas is taken through the cycle A → B → C → A, as
Pressure
2p
shown in figure. What is the net work done by the gas? p (105 Pa)
(a) 2 pV 1 (c) pV 2
C V (10–3 m3)
2
(a) 2000 J
4
7
(b) 1000 J
[NEET]
8
(c) Zero
(d) − 2000 J
7 An ideal gas is taken through the cycle A → B → C → A, as shown in figure. If the net heat supplied to the gas in the cycle is 5 J, then the work done by the gas in the process C → A is [KCET] 2
C
B
(b) − 10 J
A
B
A
(c) − 15 J
3V
V
Volume
(b) 4 pV (d) pV
2011 10 A perfect gas goes from state A to state B by absorbing
8 × 105 J of heat and doing 6.5 × 105 J of external work. It is now transferred between the same two states in another process in which it absorbs 105 J of heat. In the second process, [AIIMS] 5 (a) work done on the gas is 10 J (b) work done on the gas is 0.5 × 105 J
11 A cylinder of fixed capacity (of 44.8 L) contains 2 moles of helium gas at STP. What is the amount of heat needed to raise the temperature of the gas in the cylinder by 20° C? (Take, R = 8.31Jmol −1 K −1 ) [AMU]
p (in Nm–2) 10
(a) − 5 J
C
(c) work done by the gas is 105 J (d) work done by the gas is 0.5 × 105 J
3
V (in m ) 1
p
D
V
B
A
B V
2014 5 The change in internal energy of a thermodynamical
7 6 5 4 3 2 1 0
1
A
0
(d) − 20 J
(a) 996 J (c) 499 J
(b) 831 J (d) 374 J
287
THERMODYNAMICS
2010 12 Two rigid boxes containing different ideal gases are placed on table. Box A contains one mole of nitrogen at temperature T0 , while box B contains one mole of helium at temperature (7/3) T0 . The boxes are then put into thermal contact with each other, and heat flows between them until the gases reach a common final temperature (ignore the heat capacity of boxes). Then, the final temperature of the gases T f in terms of T0 is [AIIMS]
3 7 3 5 (a) T f = T0 (b) T f = T0 (c) T f = T0 (d) T f = T0 7 3 2 2
13 The state of a thermodynamic system is represented by (a) pressure only [VMMC] (b) volume only (c) pressure, volume and temperature (d) number of moles
2008 14 If Q, E and W denote respectively the heat added, change in internal energy and the work done in a closed cycle process, then [CBSE AIPMT] (a) W = 0 (b) Q = W = 0 (c) E = 0 (d) Q = 0
15 An ideal gas is taken through a cyclic thermodynamical process through four steps. The amounts of heat involved in these steps are Q1 = 5960 J,Q2 = − 5585 J, Q3 = − 2980 J and Q4 = 3645 J, respectively. The corresponding works involved are W1 = 2200 J, W2 = − 825 J,W3 = − 1100 J and W4 respectively. The value of W4 is [BHU] (a) 1315 J (b) 275 J (c) 765 J (d) 675 J 16 An ideal gas is taken around the cycle ABCA as shown in the p-V diagram The total work done by the gas during the cycle is [Kerala CEE] 4p
B
p p
C
A V
(a) pV (e) 6 pV
(b) 2 pV
3V V
(c) 4 pV
(d) 3 pV
17 Which of the following parameters does not characterise the thermodynamic state of matter? [RPMT] (a) Temperature (b) Pressure (c) Work (d) Volume
2007 18 1 cm 3 of water at its boiling point absorbs 540 cal of heat
to become steam with a volume of 1671 cm 3 . If the atmospheric pressure = 1. 013 × 105 Nm −2 and the mechanical equivalent of heat = 4 . 19 J cal, the energy spent in this process in overcoming intermolecular forces is [Manipal] (a) 540 cal (b) 40 cal (c) 500 cal (d) zero
19 During the melting of a slab of ice at 273 K at atmospheric pressure, [RPMT] (a) positive work is done by the ice-water system on the atmosphere (b) positive work is done on the ice-water system by the atmosphere (c) internal energy of ice-water system decreases (d) None of the above 20 Which of the following is not a state function? (a) Work done at constant pressure [Haryana PMT] (b) Enthalpy (c) Work done by conservative force (d) Work done by non-conservative force 21 Which of the following statements is true? [J&K CET] (a) Internal energy of a gas depends only on the state of the gas. (b) In an isothermal process, change in internal energy is maximum. (c) Area under pressure, volume graph equals to heat supplied in any process. (d) Work done is state dependent but not path dependent. 22 A gas is compressed at a constant pressure of 50 Nm −2 from a volume of 10 m 3 to a volume of 4 m 3 . Energy of 100 J is thus added to the gas by heating, its internal energy is [Punjab PMET] (a) decreased by 200 J (b) increased by 100 J (c) increased by 300 J (d) increased by 400 J 23 Consider the following two statements and choose the correct answer. [EAMCET] I. If heat is added to a system, its temperature must always increase. II. If positive work is done by a system in thermodynamic process, its volume must increase. (a) Both I and II are correct (b) I is correct, but II is incorrect (c) II is correct, but I is incorrect (d) Both I and II are incorrect
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
24 If 150 J of heat is added to a system and the work done by the system is 110 J, then change in internal energy will be [BCECE] (a) 40 J (b) 110 J (c) 150 J (d) 260 J
2006 25 An ideal gas is taken through a cycle ABCA as shown in the p-V diagram. The work done during the cycle is B (2p,V)
C (2p,3V)
28 If temperature is increased by 1 K at constant volume, then work done on the gas is [JCECE] 5 3 1 (b) R (c) zero (d) R (a) R 2 2 2
2005 29 First law of thermodynamics is a consequence of the conservation of (a) energy (c) heat
[Punjab PMET]
(b) charge (d) All of these
30 An ideal monoatomic gas is taken around the cycle ABCDA as shown in the p-V diagram. The work done during the cycle is given by [KCET]
p
p
O
A (p,V)
1 pV 2 (c) 4 pV (e) zero (a)
2p,V
[Kerala CEE]
V
B
C
A
D
2p,2V
(b) 2 pV p,V
(d) pV
p,2V V
26 In a thermodynamic process, pressure of a fixed mass of a gas is changed in such a manner that the gas molecule gives out 30 J of heat and 10 J of work is done on the gas. If the initial internal energy of the gas is 40 J, then the final internal energy will be [RPMT] (a) − 20 J (b) 20 J (c) 80J (d) 3 J 27 An ideal gas after going through a series of four thermodynamic states in order, reaches the initial state again (cyclic process). The amounts of heat and work involved in these states are Q1 = 6000 J, Q2 = − 5500 J, Q3 = − 3000 J and Q4 = 3500 J; W1 = 2500 J,W2 = − 1000 J, W3 = − 1200 J and W4 = x J. The ratio of net work done by the gas to the total heat absorbed by the gas is η. The value of x and ηare nearly (a) 500, 7.5% (b) 700, 10.5% [EAMCET] (c) 1000, 21% (d) 1500, 15%
(a)
1 pV 2
(b) pV
(c) 2 pV
31 Which is not a path function? (a) ∆Q (b) ∆Q + ∆W (c) ∆W
(d) 4 pV [BCECE]
(d) ∆Q − ∆W
32 The p-V diagram of a system undergoing thermodynamic transformation is shown in figure. The work done by the system in going from A → B → C is 30 J and 40 J heat is given to the system. The change in internal energy between A and C is [BCECE] p C
B
A
V
(a) 10 J
(b) 70 J
(c) 84 J
(d) 134 J
Answers 1 11 21 31
(b) (c) (a) (d)
2 12 22 32
(d) (c) (d) (a)
3 (a) 13 (c) 23 (c)
4 (c) 14 (c) 24 (a)
5 (b) 15 (c) 25 (d)
6 (b) 16 (d) 26 (b)
7 (a) 17 (c) 27 (b)
8 (a) 18 (c) 28 (c)
9 (a) 19 (b) 29 (a)
10 (b) 20 (d) 30 (b)
THERMODYNAMICS
Explanations 1 (b) According to the question, heat spent during the conversion of sample of water at 100°C to steam is ∆Q = 54 cal = 54 × 4.18 J = 225.72 J Normal pressure, p = 1.013 × 105 Nm −2 Net work done during the conversion would be given as ∆W = p∆V = p (Vsteam − Vwater ) Here, Vsteam = 1671 . cc = 167.1 × 10−6 m 3 Vwater = 0.1 g = 0.1cc = 0.1 × 10−6 m 3 ∴
∆W = 1.013 × 105 [(167.1 − 0.1) × 10−6 ] = 1.013 × 167 × 10−1
= 16.917 J Now, by the first law of thermodynamics, ∆Q = ∆U + ∆W where, ∆U is the change in internal energy of the sample. … (i) ⇒ ∆U = ∆Q − ∆W Substituting the values in Eq. (i), we get ∆U = 225.72 − 16.917 = 208.7 J
2 (d) As in isothermal process temperature remains constant internal energy (∆U = 0), hence there is no change in internal energy of the system. Hence, the energy taken by the gas is utilized by doing work against external pressure. Hence, whole heat energy given to the body at isothermal process gets converted into work done. But ∆Q = ∆U + ∆W is first law of thermodynamics, hence Assertion is incorrect but Reason is correct.
3 (a) Initial and final states are same in all the process. Hence, ∆U = 0 is same for each case. ∴ ∆Q = ∆W Area enclosed by curve with volume, Q (Area) 1 < (Area) 2 < (Area) 3 ∴ Q1 < Q2 < Q3
Total work done by gas is
4 (c) For a diatomic gas,
5
2
A
C
B
3
p (in kPa) 2
B 4 V(in m3)
V (in m ) 1
A
6
5 R 2 The change in internal energy of gas from A to B is CV =
∆U = nCV dT 5R = n (TB − TA ) 2 5 p V pV = nR B B − A A nR 2 nR 5 = (2 × 103 × 6 − 5 × 103 × 4 ) 2 5 = × (− 8 × 103 ) 2 4 × 104 =− 2 = −20 kJ
5 (b) According to first law of thermodynamics, i.e. Q = ∆U + W Q = 2 kcal = 2000 × 4.2 = 8400 J W = 400 J 8400 = ∆U + 400 ∆U = 8400 − 400 ∆U = 8000 J So, change in internal energy, ∆U = 8 kJ
6 (b) Net work done by the gas = Area enclosed in p-V curve, i.e. area of ∆ABC. 1 W net = × 5 × 10− 3 × 4 × 105J 2 = 103 J = 1000 J
7 (a) Here, process is cyclic, so change in internal energy is zero. We know that, work done by gas is given by W = p∆V , where p is pressure and ∆V is the change in volume.
p (in Nm–2) 10
W = W AB + W BC + WCA …(i) First law of thermodynamics, …(ii) ∆Q = ∆U + W where, ∆Q is heat supplied, ∆U is the change in internal energy which is zero and W is the work done. ∴ W AB = p∆V = 10(2 − 1) = 10 J W BC = p∆V = 2 × 0 = 0 Hence, Eqs. (i) and (ii) will be written as 5 = 0 + (10 + 0 + WCA ) ⇒ WCA = −5J Work done by the gas in the process C → A, WCA = − 5 J
8 (a) For all processes 1, 2 and 3 Change in internal energy, i.e. ∆U = U B − U A ∴ ∆U 1 = ∆U 2 = ∆U 3 Now, Q = ∆U + ∆W Now, ∆W = work done by the gas, i.e. area under p-V curve. As, area (1) > area (2) > area (3) ∴ ∆W 1 > ∆W 2 > ∆W 3 ∴ Q1 > Q2 > Q3
9. (a) For given cyclic process, ∆U = 0 ∴ Q =W Also, W = Area enclosed by the curve = AB × AD = (2 p − p) (3V − V ) = p × 2V ∴ Heat rejected by the gas during the cycle = 2pV .
10 (b) According to first law of thermodynamics, dU = dQ − dW dU = 8 × 105 − 6.5 × 105 = 1.5 × 105 J
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
In the second process, dU remains the same. ∴ dW = dQ − dU = 1 × 105 − 1.5 × 105 ~ 0.5 × 105 J dW = − 0.5 × 105 J − ∴ Work done on the gas is 0.5 × 105 J
11 (c) Since, the volume of cylinder is fixed and helium is a monoatomic gas. The internal energy = µCV ∆T 1 1 ⇒ U = fµR∆T ∴CV = f R 2 2 1 U = × 3 × 2 × 8.31 × 20 2 (Q f = 3) = 498.6 ≈ 499 J
12 (c) The system of two rigid boxes is shown in figure Box A a mole N2
Thermal contact
15 (c) Total amount of heat, ∆Q = Q1 + Q2 + Q3 + Q4 = 5960 − 5585 − 2980 + 3645 = 1040 J Total work done, ∆W = W 1 + W 2 + W 3 + W 4 = 2200 − 825 − 1100 + W 4 = 275 + W 4 For a cyclic process, ∆U = 0, i.e. U f − U i = 0 From first law of thermodynamics, ∆Q = ∆U + ∆W 1040 = 0 + 275 + W 4 or W 4 = 765 J
16 (d) Work done = Area enclosed by triangle 1 AB × AC 2 1 = (4 p − p) × (3 V − V ) 2 1 = 3 p × 2V = 3pV 2 =
Box B a mole He
1 f µR∆Τ 2 f = 5 for nitrogen and f = 3 for helium. Change in internal energy at box A, 5R i.e. ∆U A = 1 × (T f − T0 ) 2 Change in internal energy at box B, 3R 7 i.e. ∆U B = 1 × T f − T0 2 3 We know that, ∆U =
Now, ∆U A + ∆U B = 0 5R 3R 7T (T f − T0 ) + T f − 0 = 0 2 2 3 5T f − 5T0 + 3T f − 7T0 = 0 ⇒ 8T f = 12T0 12 3 T f = T0 = T0 ⇒ 8 2
13 (c) In thermodynamics, the value of a state variable depends only on the particular state not on the path used to attain that state. Pressure ( p) , volume (V ), temperature (T ) and mass (m) are state variables.
14 (c) In a cyclic process, a system starts from one point and ends at the same point. In this case, the change in the internal energy must again be zero and therefore the thermal energy added to the system must be equal the work done during the cycle, i.e., in a cyclic process, ∆U = 0 or E = 0.
17 (c) Work does not characterise the thermodynamic state of matter, it is a path function giving only relationship between two quantities.
18 (c) Change in volume, i.e. ∆V = V2 − V1 = 1671 − 1 = 1670 cm 3 = 1670 × 10− 6 m 3 Work done by the system, W = p∆ V = 1.013 × 105 × 1670 × 10− 6 = 1691.71 × 10− 1 J = 169.171 J (as, we know 1 cal = 4.2 J) 169.171 = = 40.06 cal 4.2 Total energy spent in boiling to overcome intermolecular force = 540 − 40.06 = 499.93 cal ≈ 500 cal
19 (b) When a slab of ice at 273 K melts, volume of water formed is less than the volume of ice melted, i.e. volume decreases. Therefore, work done by ice-water system is negative or in other words positive work is done by the atmosphere on the ice-water system.
This increases the internal energy of ice-water system becasue ∆Q = ∆U + ∆W so
∆Q + ∆W = ∆U
20 (d) The value of a state function depends only on the particular state, not on the path used to attain that state, while pressure, volume, temperature and mass are state variable but work done by non-conservative force is not a state function.
21 (a) In taking a system from one state to another state by different processes, the heat transferred Q and work done W are different, but their difference Q − W is same for all processes. It gives the internal energy of the system ∆U = Q − W Thus, internal energy U of a thermodynamic system is a characteristic property of the state of the system, it does not matter how that state has been obtained.
22 (d) Change in volume of a gas, ∆V = V2 − V1 = 4 − 10 = − 6 m 3 As volume decreases, work is done on the gas and so it is negative W = p∆V = 50 × (−6) = − 300 J Heat supplied, Q = 100 J According to first law of thermodynamics, change in internal energy is ∆U = Q − W = 100 − (−300) = 400 J It means that internal energy increase by 400 J.
23 (c) In cyclic and isothermal processes, energy supplied to a system does not change temperature of the system. If gas expands (∆W = + ve), then volume of gas system increases.
24 (a) From the first law of thermodynamics, if an amount of heat Q is given to a system, a part of it is used in increasing the internal energy ∆U of the system and the rest in doing work W by the system. ∴ Q = ∆U + W ⇒ ∆U = Q − W ⇒ ∆U = 150 − 110 = 40 J
291
THERMODYNAMICS
For cyclic process, U F = U I , ∆U = U F − U I = 0 So, from first law of thermodynamics, i.e., ∆Q = ∆U + ∆W We have 1000 = (300 + x ) + 0 i.e., x = 1000 − 300 = 700 J Efficiency of a cycle is defined as Work done η= Input heat ∆W ∆Q = = Q1 + Q4 (Q1 + Q4 )
25 (d) Work done = Area of ∆ ABC
26
AB × BC = 2 (2 p − p) × (3V − V ) = 2 p × 2V = = pV 2 (b) Given, dQ = − 30 J (negative sign appears as the heat is going out from the system) dW = − 10 J, U i = 40 J Using the relation, dQ = dU + dW – 30 = (U f − 40) + (−10) U f = 20 J
27 (b) According to the given problem, Total heat produced, ∆Q = Q1 + Q2 + Q3 + Q4 = 6000 − 5500 − 3000 + 3500 ∆Q = 9500 − 8500 = 1000 J Total work done by ideal gas, ∆W = W 1 + W 2 + W 3 + W 4 = 2500 − 1000 − 1200 + x = 300 + x
=
where, dQ is heat given to the system, dU is internal energy and dW is work done by the system.
30 (b) Work done during the cycle
= Area enclosed by p-V graph = Area of region ABCD = AD × CD = (2V − V ) × (2 p − p) = pV
31 (d) According to first law of thermodynamics, i.e., dQ = dU + dW So, heat energy, i.e. dQ is a state function. Hence, ∆Q − ∆W (= dU ) is not a path function.
1000 1000 = × 100 (6000 + 3500) 9500
= 0105 . × 100 = 10.5%
32 (a) Since, work is done by the system,
28 (c) Work done on a gas is given by
so it is positive, therefore ∆W = 30 J Heat given to the system, ∆Q = 40 J According to first law of thermodynamics, change in internal energy is given by ∆U = ∆Q − ∆W = 40 − 30 = 10 J
W = p∆ V where, p is the pressure and ∆V is the change in volume. Given, ∆V = 0, therefore W = p × 0 = 0.
29 (a) As we know that, first law of thermodynamics is a consequences of the conservation of energy. i.e. dQ = dU + dW
Topic 2 Thermodynamic Processes 2019 1 In which of the following processes, heat is neither absorbed nor released by a system? (a) Adiabatic (b) Isobaric (c) Isochoric (d) Isothermal
2018 3 The efficiency of an ideal gas with adiabatic exponent γ [NEET]
2 Assertion In adiabatic process, work is independent of path. Reason In adiabatic process, work done is equal to negative of change in internal energy. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) If Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
for the shown cyclic process would be V 2V0
V0
C
B T0
( 2 ln 2 − 1 ) γ / (γ − 1 ) ( 2 ln 2 + 1 ) (c) γ /( γ − 1 ) (a)
A 2T0
T
(1 − 1 ln 2) γ / (γ − 1 ) ( 2 ln 2 − 1 ) (d) γ /( γ + 1 )
(b)
[JIPMER]
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2017 4 Assertion Molar heat capacity cannot be defined for
2016 8 A gas is compressed isothermally to half its initial volume.
isothermal process. Reason In isothermal process, p-V versusT graph is a dot. [AIIMS]
(a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Reason is correct but Assertion is incorrect. 5 Assertion In adiabatic expansion process, the product of p andV always decreases. Reason In adiabatic expansion process, work is done by the gas at the cost of internal energy of gas. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Reason is correct but Assertion is incorrect.
6 p-V plots for two gases during adiabatic process as shown in figure. Plots 1 and 2 should correspond respectively to [JIPMER] (a) He and O2 (b) O2 and He (c) He and Ar (d) O2 and N2
1
p
2 V
7 Thermodynamic processes are indicated in the following diagram p
IV III II f
I
The same gas is compressed separately through an adiabatic process until its volume is again reduced to half. Then [NEET] (a) compressing the gas through adiabatic process will require more work to be done (b) compressing the gas isothermally or adiabatically will require the same amount of work (c) which of the case (whether compression through isothermal or through adiabatic process) requires more work will depend upon the atomicity of the gas (d) compressing the gas isothermally will require more work to be done
2014 9 A monoatomic gas at a pressure p, having a volumeV expands isothermally to a volume 2V and then adiabatically to a volume 16V. The final pressure of the 5 gas is (take, γ = ) [CBSE AIPMT] 3 p (a) 64 p (b) 32 p (c) (d) 16 p 64 10 If for hydrogen C p − CV = m and for nitrogen C p − CV = n , where C p and CV refers to specific heat per unit mass respectively at constant pressure and constant volume. The relation between m and n is (molecular weight of hydrogen = 2 and molecular weight of nitrogen = 28) [AIIMS, UP CPMT] (a) n = 14m (b) n = 7m (c) m = 7n (d) m = 14n
11 The p- T relation for an adiabatic expansion is (a) p γ T γ − 1 = constant (c) p γ T 1 − γ = constant
12 In isochoric process, (a) ∆W = 0 (b) ∆U = 0
f
f
Match the following columns. Column II
P.
Process I
A.
Adiabatic
Q.
Process II
B.
Isobaric
R.
Process III
C.
Isochoric
S.
Process IV
D.
Isothermal
(a) P → A, Q → C, R → D, S → B (b) P → C, Q → A, R → D, S → B (c) P → C, Q → D, R → B, S → A (d) P → D, Q → B, R → A, S → C
(c) ∆Q = 0
(d) ∆T = 0
13 During an adiabatic process, the pressure of a gas is found to be proportional to the cube of its temperature. The ratio Cp for the gas is [NEET] of CV 4 5 3 (a) (b) 2 (c) (d) 3 3 2
V
Column I
[UP CPMT]
2013
700 K 500 K 300 K
f
[UK PMT]
(b) p γ − 1T γ = constant (d) p1 − γ T γ = constant
[NEET]
14 The molar specific heats of an ideal gas at constant pressure and volume are denoted by C p and CV Cp respectively. If γ = and R is the universal gas CV constant, then CV is equal to [NEET] 1+ γ ( γ − 1) R (b) (c) (d) γR (a) 1− γ ( γ − 1) R
293
THERMODYNAMICS
2012 15 One mole of an ideal gas goes from an initial state A to final state B via two processes. It first undergoes isothermal expansion from volumeV to 3V and then its volume is reduced from 3V to V at constant pressure. The correct p-V diagram representing the two processes is [CBSE AIPMT] A p
(a)
p D
B
A
20 No heat flows between the system and surroundings, then the thermodynamic process is [Kerala CEE] (a) isothermal (b) isochoric (c) adiabatic (d) isobaric (e) cyclic 21 For a certain mass of gas, the isothermal curves between p andV at T1 and T2 temperatures are 1 and 2 as shown in figure. Then, [CMC] 1
(b)
2
D B
V
3V
V
V p
(c)
T1
V
A
A
V
p D
B V
(d)
3V
(a) T1 = T2 (b) T1 < T2 (c) T1 > T2 (d) Nothing can be predicted
D
B V
V
2010 22 Assertion The isothermal curves intersect each other at a
3V V
16 310 J of heat is required to raise the temperature of 2 mol of an ideal gas at constant pressure from 25°C to 35°C. The amount of heat required to raise the temperature of the gas through the same range at constant volume is [AFMC]
(a) 384 J (c) 276 J
(b) 144 J (d) 452 J
17 When an ideal gas in a cylinder was compressed isothermally by a piston, the work done on the gas was found to be 1.5 × 104 J. During the process about (a) 3.6 × 103 cal of heat flowed out from the gas [AFMC] (b) 3.6 × 103 cal of heat flowed into the gas (c) 1.5 × 104 cal of heat flowed into the gas (d) 1.5 × 104 cal of heat flowed out from the gas
2011
certain point. Reason The isothermal changes take place rapidly, so the isothermal curves have very little slope. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. (e) Assertion is incorrect but Reason is correct.
23 During an adiabatic expansion, the increase in volume is associated with which of the following possibilities w.r.t. pressure and temperature? [AMU] Pressure Temperature Pressure Temperature (a) increase increase (b) decrease decrease (c) increase decrease (d) decrease increase
2008
18 Ten moles of an ideal gas at constant temperature 600 K is compressed from 100 L to 10 L. The work done in the process is [AFMC] (b) − 4.11 × 104 J (a) 4.11× 104 J (c) 11.4 × 104 J
T2
p
3V
(d) − 11.4 × 104 J
19 Work done per mole in an isothermal change is V V (a) RT log 10 2 (b) RT log 10 1 V1 V2 V2 V1 (c) RT log e (d) RT log e V1 V2
[UP CPMT]
24 A monoatomic gas is suddenly compressed to (1/ 8) th of its initial volume adiabatically. The ratio of its final pressure to the initial pressure is (given, the ratio of the specific heats of the given gas is 5/3) [AFMC] (a) 32 (b) 40/3 (c) 24/5 (d) 8 25 For an adiabatic process, the relation between V and T is given by [Punjab PMET] γ γ (a) TV = constant (b) T V = constant (c) TV 1 − γ = constant (d) TV γ − 1 = constant
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
26 The temperature of the system decreases in the process of [Punjab PMET] (a) free expansion (b) adiabatic expansion (c) isothermal expansion (d) isothermal compression
35 If there is a straight line parallel to volume axis in a p-V diagram, then it is a …… graph. [RPMT] (a) isochoric (b) isobaric (c) isothermal (d) None of these
27 In which of the processes, does the internal energy of the system remains constant? [KCET] (a) Adiabatic (b) Isochoric (c) Isobaric (d) Isothermal
36 If the volume of gas is changed fromV1 toV2 isothermally, then work done is [JCECE] V V (b) RT ln 2 (a) RT ln 1 V2 V1 V T (c) R (T2 − T1 ) ln 2 (d) R (V2 − V1 ) ln 2 V1 T1
28 Isobaric modulus of elasticity is equal to (a) isochoric modulus of elasticity (b) isothermal modulus of elasticity (c) zero (d) infinite
[KCET]
2007 29 A sample of gas expands from volumeV1 toV2 . The amount of work done by the gas is greatest when the expansion is [AFMC] (a) adiabatic (b) isobaric (c) isothermal (d) equal in all above cases
30 The internal energy of an ideal gas increases during an isothermal process when the gas is [AFMC] (a) expanded by adding more molecules to it (b) expanded by adding more heat to it (c) expanded against zero pressure (d) compressed by doing work on it 31 In an adiabatic change, the pressure and temperature of a monoatomic gas are related with relation p ∝ T C , where, C is equal to [MHT CET] 5 5 5 3 (b) (c) (d) (a) 4 3 2 5 32 We consider a thermodynamic system. If ∆U represents the increase in its internal energy and W the work done by the system, which of the following statements is true? (a) ∆U = − W an adiabatic process [MHT CET] (b) ∆U = W an isothermal process (c) ∆U = − W an isothermal process (d) ∆U = W an adiabatic process 33 At 27°C a gas suddenly compressed such that its pressure 1 becomes th of original pressure. The temperature of the 8 gas will be ( γ = 5 / 3) [BCECE] (a) –142°C
(b) 300 K
(c) 327°C
(d) 420 K
2006 34 A thermo flask made of stainless steel contains several tiny lead shots. If the flask is quickly shaken up and down several times, the temperature of lead shots [Kerala CEE] (a) increases by adiabatic process (b) increases by isothermal process (c) decreases by adiabatic process (d) remains same (e) first decreases and then increases
37 If energy is supplied to a gas isochorically, increase in internal energy is dU, then [JCECE] (a) dQ = dU + dW (b) dQ = dU − dW (c) dQ = dU (d) dQ = − dU
2005 38 Assertion Air quickly leaking out of a balloon becomes cooler. [AIIMS] Reason The leaking air undergoes adiabatic expansion. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 39 A perfect gas is found to obey the relation pV 3/ 2 = constant, during an adiabatic process, if such a gas initially at a temperature T is compressed to half of its initial volume, then its final temperature will be [BHU] (a) 2T (b) 4T (c) ( 2)1/ 2 T (d) 2( 2)1/ 2 T
40 One mole of an ideal gas at an initial temperature of T K does 6R J of work adiabatically. If the ratio of specific heats of this gas at constant pressure and at constant volume is 5/3, the final temperature of gas will be [EAMCET] (a) (T + 2.4 ) K (b) (T − 2.4 ) K (c) (T + 4 ) K (d) (T − 4 ) K 41 At 27°C, a motor car tyre has pressure of 2 atm. The temperature at which the tyre suddenly burst will be (take, γ air = 1.4 ) [DUMET] (a) 246.1 K (c) 290 K
(b) 250 K (d) 248 K
42 If a cylinder containing a gas at high pressure explodes, the gas undergoes [BCECE] (a) reversible adiabatic change and fall of temperature (b) reversible adiabatic change and rise of temperature (c) irreversible adiabatic change and fall of temperature (d) irreversible adiabatic change and rise of temperature
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THERMODYNAMICS
Answers 1 11 21 31 41
(a) (d) (b) (c) (a)
2 12 22 32 42
(a) (a) (e) (a) (c)
3 13 23 33
(a) (d) (b) (a)
4 14 24 34
(c) (b) (a) (a)
5 15 25 35
(a) (d) (d) (b)
6 16 26 36
(b) (b) (b) (b)
7 17 27 37
(b) (a) (d) (c)
8 18 28 38
(a) (d) (c) (a)
9 19 29 39
(c) (c) (b) (c)
10 20 30 40
(d) (c) (a) (d)
Explanations 1 (a) In an adiabatic process, the system is completely insulated from the surroundings. Thus, heat is neither absorbed nor released by the system to the surroundings, so ∆Q = 0. Sudden processes are adiabatic like bursting of cycle tyre etc. If the pressure of gas is kept constant, then the process is called isobaric, i.e. ∆p = 0. If the temperature of the system remains constant, then it is called isothermal process, i.e. ∆T = 0. If the volume of gas is constant in a system, then it is called isochoric process, i.e. ∆V = 0.
2 (a) In adiabatic process, heat transfer to the thermodynamic system is zero, i.e., Q = 0. Hence, by first law of thermodynamics, Q = 0 = ∆U + W ∴ W = − ∆U So, work done is equal to negative of change in internal energy. Since, the internal energy is a function of thermodynamic state of the system. It does not depend on the path, therefore work done is independent of path in adiabatic process. Hence, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
4 (c) As, molar heat capacity, Q Q C = = =∞ 0 m∆T In isothermal process, ∆T = 0, therefore C is not defined further in isothermal process. pV and T both are constants.
5 (a) In adiabatic expansion, ∆Q = 0
6
⇒ W + ∆U = 0 , so W = positive and ∆U = negative. ∴U , T or product of pV will decrease becauseU ∝ T ∝ pV . (a) Slope of adiabatic process of p-V p dp diagram = γ , i.e. slope ∝γ dV V From graph (slope)2 > (slope)1 ⇒ γ2 > γ1 γ for monoatomic gas (Ar, He) is greater than γ for diatomic gas (O2 , N2 ).
7 (b) In isochoric process, the curve is parallel to Y-axis because volume is constant. Isobaric is parallel to X-axis because pressure is constant. Along the curve, it will be isothermal because temperature is constant. Process II is adiabatic. So, P → C, Q → A, R → D, S → B
8 (a) The solution of this question can be understood by plotting a p-V graph for the compression of a gas isothermally and adiabatically simultaneously to half of its initial volume, i.e.
3 (a) As, we know W = p∆V = nR∆T W BC = − nR (2T0 − T0 ) = − nRT0 and WCA = + 2 nRT0 ln 2 Work done = WCA + W BC = 2 nRT0 ln 2 − nRT0 = nRT0 (2 ln 2 − 1) Also, input heat nRγT0 ∆QBC = nC p ∆T = γ −1 Work (2 ln 2 − 1) Efficiency = = Input heat γ / (γ − 1)
Adiabatic curve p
Isothermal curve
V/2 Volume V
V
Since, the isothermal curve is less steeper than the adiabatic curve, so area under the p-V curve for adiabatic process has more magnitude than isothermal curve.
Hence, work done in adiabatic process will be more than in isothermal process.
9 (c) For isothermal expansion, pV = p′ V ′ pV = p′ × 2V p p′ = 2 For adiabatic expansion, pV γ = constant
[Q V ′ = 2V ]
i.e.,
p′ V ′ γ = p′′ V ′′ γ 5 Qγ = 3
p [ 2V ]5/ 3 = p′′[16V ]5/ 3 2 ⇒
p′′ =
p 2V 2 16V
5/ 3
=
p 1 2 8
5/ 3
Final pressure of the gas p = [0.03125] 2 = 0.0156 p = p/64
10 (d) For hydrogen, R R = , 2 MH2 But given that C p − CV = m m = R /2
C p − CV =
For nitrogen, C p − CV = n n = R /28 m R/2 ∴ = = 14 n R / 28 ∴
m = 14 n
Hence,
11 (d) For an adiabatic process, pressure ( p) and volume (V ) of the system are related as …(i) pV γ = constant where, γ is the ratio of specific heat capacities at constant pressure and constant volume. For an ideal gas, pV = nRT (ideal gas equation) nRT …(ii) ⇒ V = p From Eqs. (i) and (ii), we get γ
nRT p = constant p
296 ⇒
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
p1 − γT γ = constant
17 (a) In isothermal compression, there is
[Q number of moles (n) and gas constant (R ) are constants]
12 (a) Isochoric process takes place at constant volume. We know that, work done by a system, W = p × ∆V where, p is pressure and ∆V is the change in volume. In an isochoric process, change in volume ∆V = 0, therefore work done ∆W = 0 while ∆Q = 0 in an adiabatic process, ∆U or ∆T = 0 in an isothermal process.
13 (d) According to question, p ∝ T 3 pV = nRT
and
p∝T3
3
⇒ p V = constant ⇒ pV 3/ 2 = constant, pV γ = constant Cp 3 i.e., γ= Qγ = CV 2
14 (b) As, we know γ =
18 (d) Work done in an isothermal process,
V W = 2.3026nRT log10 2 V1
10 = 2.3026 × 10 × 8.3 × 600 log10 100
W = − 11.4 × 104 J
19 (c) For isothermal process, work done
p ∝ ( pV )3 2
always an increase of heat which must flow out the gas. ∆Q = ∆U + ∆W (Q ∆U = 0) ⇒ ∆Q = ∆W 1.5 × 104 4 ∆Q = 1.5 × 10 J = cal 4.18 = − 3.6 × 103 cal
Cp
and
CV C p − CV = R, then value of molar specific heat of an ideal gas at constant R volume, i.e. CV = γ −1
15 (d) According to the question, the gas first undergoes isothermal expansion from V to 3V . A We known that p in isothermal B D expansion, p-V curve is rectangular hyperbola In V 3V V isobaric compression, which is at constant pressure, hence its p-V curve is parallel to X -axis. From A to D according to the graph its isothermal and from D to B its isobaric.
16 (b) At constant pressure, Heat required = nC p ∆T ⇒ 310 = 2 × C p × (35 − 25) 310 Cp = = 15.5 J/mol/K ⇒ 20 Similarly, at constant volume Heat required = nCV ∆T = 2(C p − R ) × (35 − 25) [QC p − CV = R] = 2 × (15.5 − 8.3) × 10 = 2 × 7.2 × 10 = 144 J
per mole, i.e. pV = RT RT p= ⇒ V ∴ W = pdV V2 RT V =∫ dV = RT loge 2 V1 V V1
20 (c) Adiabatic process is a thermodynamic process in which there is no exchange of heat energy between system and surroundings, i.e. ∆Q = 0.
Using ideal gas equation, pV = RT RT γ ∴ V = constant V or
26 (b) In adiabatic expansion of a gas system, the gas expands so temperature of the system decreases but no flow of heat is there between the system and the surroundings.
27 (d) In isothermal process, the internal energy of the system remains constant. Heat supplied in an isothermal change is used to do work against external surroundings or if the work is done on the system, then equal amount of heat energy will be liberated by the system.
28 (c) As we know, bulk modulus, B=−
29 (b) The p-V diagram for isobaric, isothermal and adiabatic process of an ideal gas is shown in graph below p
3
22 (e) To carry out isothermal process, a
thermodynamics, ∆Q = ∆U + ∆W For an adiabatic process, ∆Q = 0 ∴ ∆U = − W In adiabatic process, 1 1 p ∝ γ and T ∝ γ − 1 V V γ > 1, because volume increases, then p and T will decrease.
24 (a) In an adiabatic process, ⇒ ⇒
pV γ = constant γ 5/ 3 p1 V2 p 1 = ⇒ 1 = p2 V1 p2 8
p1 1 = p2 23
5/ 3
=
1 p ⇒ 2 = 32 32 p1
25 (d) In an adiabatic process, pV γ = constant
1 2
between p and V is such that T2 is farther from the origin than T1. Therefore, T2 > T1.
23 (b) According to first law of
∆p ∆V / V
For isobaric process, ∆p = 0, so B = 0.
21 (b) In isothermal process, curves
perfect gas is compressed or allowed to expand very slowly. Isothermal curves never intersect each other as they have very little slope.
TV γ − 1 = constant (as R is a gas constant)
V1
1 → isobaric 2 → isothermal 3 → adiabatic V2
V
In thermodynamics, for same change in volume, the work done is maximum for the curve having maximum area enclosed with the volume axis. Area enclosed by the curve ∝ (Slope of curve) −1 As shown (slope)isobaric < (slope)isothermal < (slope)adiabatic ⇒ (Area)isobaric > (Area)isothermal > (Area)adiabatic Hence, work done is maximum in isobaric process.
30 (a) Internal energy of an ideal gas is given by
f µRT 2 where, f is degree of freedom. f N = RT 2 N A U =
⇒
U ∝ NT
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THERMODYNAMICS
In isothermal process, T = constant ⇒ U ∝N i.e., internal energy increases by increasing number of molecules N .
31 (c) For an adiabatic process, γ
pV = constant Ideal gas relation is pV = RT RT ⇒ V = p
…(ii)
From Eqs. (i) and (ii), we get γ
RT Tγ p = constant ⇒ γ − 1 = constant p p p∝T
γ γ −1
T2 = 131 − 273 = − 142° C
34 (a) The thermo flask system undergoes …(i)
…(iii)
where, γ is ratio of specific heats of the gas. Given, p ∝ T C …(iv) On comparing with Eq. (iii), we have, γ C = γ −1 5 For a monoatomic gas, γ = we have, 3 5 5 C = 3 = 5 −1 2 3
a change under the condition that no exchange of heat takes place between the system and the surroundings, then such a process is called adiabatic process. Under this condition, if any heat is produced, it does not go out from the system so the temperature of the system is increased, i.e., ∆ Q = O.
35 (b) An isobaric process is one in which volume and temperature of system may change but pressure remains constant, i.e. ∆p = 0. So, it shows a straight line parallel to volume axis in a p-V diagram is isobaric graph.
36 (b) Work done in isothermal process, i.e.
33 (a) The relation between temperature Tγ = constant, pγ − 1
T and pressure p is
where γ is ratio of specific heats. Given, T1 = 27° C = 27 + 273 = 300 K, p1 = p 5 p p2 = , γ = 8 3 ∴Ratio of temperature, i.e. γ −1
T1 p1 = T2 p2 ⇒
T1 8 = T2 1
⇒
T2 =
2 5
γ
= (8)0. 4 = 2. 297
T1 300 = = 130.6 K 2. 297 2. 297
W =∫
V2 V1
pdV
From ideal gas law, pV = RT ∴
32 (a) An isothermal process is a constant temperature process. In this process, T = constant or ∆T = 0. ∴ ∆U = nCV ∆T = 0 An adiabatic process is defined as one with no heat transfer into or out of a system. Therefore, Q = 0. From first law of thermodynamics, W = − ∆U or ∆U = − W
TV 1/ 2 = constant
≈ 131 K Final temperature of a gas, i.e.
W =∫
V2 V1
dV 1 V V W = RT ln 2 V1 = RT
⇒
RT dV V V2
∫V
37 (c) Work done by a gas = p∆V where, p is pressure and ∆V is the change in volume. For an isochoric process, ∆V = 0, ∴ dW = pdV = 0 From first law of thermodynamics, dQ = dU + dW where, dW = 0 ∴ dQ = dU
38 (a) The leaking air of a balloon undergoes adiabatic expansion. In this expansion, due to work done against external pressure, the internal energy of air reduces. Thus, it becomes cooler.
39 (c) From ideal gas equation, we have, pV = RT , where R is gas constant. Also, given pV 3/ 2 = constant RT ∴ Putting the value of p = , we V RT 3/ 2 have, V = constant V
T1V11/ 2 = T2V21/ 2 Given,T1 = T , V1 = V , V2 = V ⇒ TV 1/ 2 = T2 2
V 2
1/ 2
⇒ Final temperature of an adiabatic process, i.e. T2 = (2)1/ 2T .
40 (d) Given, initial temperature i.e., T1 = TK , n = 1 Work done, W = 6 R J Cp 5 γ= = CV 3 In adiabatic process, p V − p2V2 W = 1 1 γ −1 nR (T1 − T2 ) γ −1
=
1 × R × (T − T2 ) 5 −1 3 R × (T − T2 ) 6R = 2 3 2 ⇒ 6R × = R (T − T2 ) 3 4 = T − T2 ⇒ T2 = (T − 4 ) K ∴ Final temperature of gas, T2 = (T − 4 )K ⇒ 6R =
41 (a) When a system undergoes a sudden change under condition that no exchange of heat takes place between the system and surroundings, then such a process is called adiabatic. So, a tyre bursting suddenly an adiabatic process. p1 − γT γ = constant where, γ is ratio of specific heats, p is pressure and T is temperature. p ∴ 2 p1 ⇒
γ−1
1 2
0. 4
T = 2 T1
γ
T = 2 300
1. 4
∴ 0.4[log1 − log 2 ] = 14 . [logT2 − log 300 ] ⇒ T2 = 2461 . K
42 (c) If gas cylinder suddenly explodes in an irreversible adiabatic change, then work done against expansion reduces the temperature of a gas cylinder.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 3 Heat Engine, Second Law of Thermodynamics and Carnot Engine 2019 1 The temperature of food material in refrigerator is 4°C and temperature of environment is 15°C. If Carnot cycle is used in its working gas, then find its Carnot efficiency. (a) 0.038 (b) 0.028 [AIIMS] (c) 0.053 (d) 0.072
2018 2 A Carnot engine absorbs 6 × 105 cal at 227°C. The work done per cycle by the engine, if its sink is maintained at 127°C is [JIPMER] 8 4 (a) 15 × 10 J (b) 15 × 10 J (c) 5 × 105 J (d) 2 × 104 J
3 If the efficiency of an engine is 50% and its work output is 500 J, then find the value of input work. [JIPMER] (a) 1000 J (b) 500 J (c) 100 J (d) 250 J 4 The efficiency of a heat engine is 1/6. Its efficiency double when the temperature of sink decrease by 62°C, then what is the temperature of source? [JIPMER] (a) 470 K (b) 372 K (c) 542 K (d) 1042 K 5 The efficiency of an ideal heat engine working between the freezing point and boiling point of water is [NEET] (a) 6.25% (b) 20% (c) 26.8% (d) 12.5% 2017 1 6 A Carnot engine having an efficiency of as heat 10 engine, is used as a refrigerator. If the work done on the system is 10 J, then the amount of energy absorbed from the reservoir at lower temperature is [NEET AIPMT] (a) 1 J (b) 90 J (c) 99 J (d) 100 J 7 The temperature of source and sink of a heat engine are 127°C and 27°C, respectively. An inventor claims its efficiency to be 26%, then [JIPMER] (a) it is impossible (b) it is possible with high probability (c) it is possible with low probability (d) Data are insufficient
2016 8 The temperature inside a refrigerator is t 2 ° C and the
room temperature is t 1 ° C. The amount of heat delivered to the room for each joule of electrical energy consumed ideally will be [NEET] t1 t 1 + 273 (a) (b) t1 − t 2 t1 − t 2
(c)
t 2 + 273 t1 − t 2
(d)
t1 + t 2 t 1 + 273
9 A refrigerator works between 4°C and 30°C. It is required to remove 600 cal of heat every second in order to keep the temperature of the refrigerated space constant. The power required is (take, 1 cal = 4 . 2 J) [NEET] (a) 23.65 W (b) 236.5 W (c) 2365 W (d) 2.365 W
2014 10 A refrigerator extracts heat from water at 0°C and rejects it to room at 24.4°C. The work required by the refrigerator for every 1 kg of water converted into ice is (take, latent heat of ice = 336 kJ/ kg) [EAMCET] (a) 30 kJ (b) 336 kJ (c) 11.2 kJ (d) 24.4 kJ
11 A Carnot engine working between 300 K and 600 K has work output of 800 J/cycle. The amount of heat energy supplied from the source of engine in each cycle is (a) 800 J (b) 1600 J [WB JEE] (c) 3200 J (d) 6400 J
2013 12 A Carnot engine operates with source at 127°C and sink at 27°C. If the source supplies 40 kJ of heat energy, then the work done by the engine is [AFMC] (a) 30 kJ (b) 10 kJ (c) 4 kJ (d) 1 kJ
13 An ideal gas heat engine operates in Carnot cycle between 227°C and 127°C. It absorbs 6 × 104 J at high temperature. The amount of heat converted into work is (a) 1.6 × 104 J (b) 1.2 × 104 J [Manipal] 4 (c) 4.8 × 10 J (d) 3.5 × 104 J
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THERMODYNAMICS
14 Carnot cycle of an ideal gas shown in the figure. Let Wa → b , Wb → c , Wc → d and Wd → a represents the work done by the system during the processes a → b, b → c, c → d and d → a respectively. Consider the following relations [AMU]
2009 19 The temperature-entropy diagram of a reversible engine cycle is given in the figure. Its efficiency is [AIIMS] T 2T0
a
A
p d
T0
b
S0
c V
I. Wa → b II. Wa → b III. Wa → b IV. Wb → c
+ Wb → c + Wb → c + Wc → d + Wd → a
(a) 1/ 2 (c) 1/3
+ Wc → d + Wd → a > 0 + Wc → a + Wd → a < 0 >0 =0
2S0
S
(b) 1/4 (d) 2/3
2008
2011 15 The temperature of the sink of a Carnot engine is 27°C and its efficiency is 25%. The temperature of the source is (b) 27°C (d) 127°C
B
20 A Carnot engine takes heat from a reservoir at 627°C and rejects heat to a sink at 27°C. Its efficiency will be [AFMC] (a) 3/5 (b) 1/3 (c) 2/3 (d) 200/209
Which of the above relations is/are true? (a) I and III (b) III and IV (c) I, III and IV (d) II, III and IV
(a) 227°C (c) 327°C
C
[J&K CET]
16 A Carnot engine has efficiency 25%. It operates between reservoirs of constant temperatures with temperature difference of 80 K. What is the temperature of the low temperature reservoir? [DUMET] (a) –25°C (b) 25°C (c) –33°C (d) 33°C
2010 17 Which of the following statements is correct for any thermodynamic system? [AFMC] (a) The internal energy changes in all processes. (b) Internal energy and entropy are state functions. (c) The change in entropy can never be zero. (d) The work done in an adiabatic process is always zero. 18 Choose the incorrect statement from the following. S1 : The efficiency of a heat engine can be 1, but the coefficient of performance of a refrigerator can never be infinity. S2 : The first law of thermodynamics is basically the principle of conservation of energy. S3 : The second law of thermodynamics does not allow several phenomena consistent with the first law. S4 : A process, whose sole result is the transfer of heat from a colder object to a hotter object is impossible. (a) S1 (b) S3 [AMU] (c) S2 (d) S4
21 The freezer in a refrigerator is located at the top section, so that [AFMC] (a) the entire chamber of the refrigerator is cooled quickly due to convection (b) the motor is not heated (c) the heat gained from the environment is high (d) the heat gained from the environment is low 22 “Heat cannot by itself flow from a body at lower temperature to a body at higher temperature” is a statement or consequence of (a) second law of thermodynamics (b) conservation of momentum (c) conservation of mass (d) first law of thermodynamics
[RPMT]
23 A Carnot engine whose sink is at 300 K has an efficiency of 40%. By how much should the temperature of source be increased so as to increase its efficiency by 50% of original efficiency? [Haryana PMT] (a) 275 K (b) 325 K (c) 250 K (d) 380 K 24 A Carnot engine has an efficiency of 50% at sink temperature 50°C. Calculate the temperature of source. (a) 133°C (b) 143°C [BCECE] (c) 100°C (d) 373°C 2007 25 A Carnot reversible engine converts 1/6 of heat input into work. When the temperature of the sink is reduced by 62 K, the efficiency of Carnot cycle becomes 1/3. The temperature of the source and sink will be [BCECE] (a) 372 K, 310 K (b) 181 K, 150 K (c) 472 K, 410 K (d) None of these
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2006 26 Assertion The Carnot cycle is useful in understanding the performance of heat engines. [AIIMS] Reason The Carnot cycle provides a way of determining the maximum possible efficiency achievable with reservoirs of given temperatures. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
27 A refrigerator works between 4°C and 30°C. It is required to remove 600 cal of heat every second in order to keep the temperature of the refrigerated space constant. W Q1 Hot reservoir T1
Q2
Cold reservoir T2
[NEET 2016]
Choose the correct option regarding above refrigerator. (a) The heat extracted by working substance is Q2 . (b) The heat released by working substance to hot reservoir is greater than Q2 . (c) Work done on the system is Q1 − Q2 . (d) All of the above
28 Efficiency of engine working at 40°C and 20°C is [MP PMT] (a) 0.064% (b) 0.64% (c) 64% (d) 6.4% 29 The inside and outside temperatures of a refrigerator are 273 K and 303K respectively. Assuming that refrigerator cycle is reversible, for every joule of work done the heat delivered to the surroundings will be [AMU] (a) 10 J (b) 20 J (c) 30 J (d) 50 J 2005 30 Carnot engine cannot give 100% efficiency, because we cannot [AMU] (a) eliminate friction (b) find ideal sources (c) prevent radiation (d) reach absolute zero temperature
Answers 1 (a) 11 (b) 21 (a)
2 (c) 12 (b) 22 (a)
3 (a) 13 (b) 23 (c)
4 (b) 14 (c) 24 (d)
5 (c) 15 (d) 25 (a)
6 (b) 16 (c) 26 (a)
7 (a) 17 (b) 27 (d)
8 (b) 18 (a) 28 (d)
9 (b) 19 (c) 29 (a)
10 (a) 20 (c) 30 (d)
Explanations (Q 1 cal = 4.2 J) = 1.2 × 105 × 4.2 J
1 (a) Given, temperature of food material in refrigerator, T2 = 4 ° C = 273 + 4 = 277 K Temperature of environment, T1 = 15° C = 273 + 15 = 288 K T ∴Carnot efficiency, η = 1 − 2 T1 =1−
T1 = 227° C = 227 + 273 = 500 K T2 = 127° C = 127 + 273 = 400 K Work done/cycle, W = ? T Q2 T2 As, or Q2 = 2 × Q1 = T1 Q1 T1 400 = × 6 × 105 500 = 4.8 × 105 cal W = Q1 − Q2 = 6 × 105 − 4 .8 × 105 = 1.2 × 105 cal
W = 5.04 × 105 J ≈ 5 × 105 J
3 (a)Q Efficiency of heat engine is Work done × 100 Heat input η Work done 500 = = 100 Heat input Heat input η=
or
277 = 0.038 288
2 (c) Here, Q1 = 6 × 105 cal
As,
⇒
500 × 100 = 1000 J 50 (b)Q Efficiency of a heat engine, 1 T T η = 1 − 2 or = 1 − 2 6 T1 T1 T2 1 5 = 1− = T1 6 6 Heat input =
4
5T1 ...(i) 6 According to question, its efficiency is doubled when temperature of sink decreased by 62°C. T − 62 ∴ 2η = 1− 2 T1 ⇒
T2 =
⇒
5T1 − 62 6 1 2 = 1− 6 T1
[from Eq. (i)] 5T1 2 2T1 ⇒ − 62 = T1 1 − = 6 6 3 5T1 2T1 or − = 62 6 3 T1 ⇒ = 62 or T1 = 372 K 6
5 (c) Efficiency of an ideal heat engine is given as η =1−
T2 T1
where, T1 is the temperature of the source and T2 is the temperature of the sink. Here, T1 = 100 + 273 = 373 K T2 = 0 + 273 = 273 K 273 373 − 273 100 ⇒ η =1− = = 373 373 373 = 0.268 ∴ η % = 0.268 × 100 = 26.8 %
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THERMODYNAMICS
6 (b) Consider schematic diagram for a Carnot engine as shown below T2
Low temperature reservoir
q2 W
E
High temperature reservoir
T1
In case of engine, engine efficiency work W = = heat absorbed q1 W 1 ⇒ = q1 10
10 1 = q1 10
or q1 = 100 J When this engine is reversed, it takes in work W and heat q2 from cold reservoir and ejects 100 J of heat to hot reservoir. ∴ W + q2 = q1 ⇒ 10 + q2 = 100 or
T1 = 30°C = 30 + 273 = 303 K Temperature of sink, T2 = 4 ° C = 4 + 273 = 277 K Q T As, we know that, 1 = 1 Q2 T2 ⇒
q1
∴
9 (b) Given, temperature of source,
{Q W = Q1 − Q2} where, Q2 is the amount of heat drawn from the sink (at T2 ), W is work done on working substance and Q1 is amount of heat rejected to source (at room temperature T1). ⇒ ⇒ ⇒ ⇒ ⇒
q2 = 90 J
7 (a) Efficiency of heat engine is η =1− or
T − T2 η= 1 T1
8 (b) For a refrigerator, we know that Q1 Q1 T1 = = W Q1 − Q2 T1 − T2 where, Q1 = amount of heat delivered to the room, W = electrical energy consumed, T1 = room temperature = t1 + 273 and T2 = temperature of sink = t2 + 273. Q1 t1 + 273 = ∴ W t1 + 273 − (t2 + 273) t + 273 ⇒ Q1 = 1 t1 − t2
WT2 + T2Q2 = T1Q2 WT2 = T1Q2 − T2Q2 WT2 = Q2 (T1 − T2 ) T W = Q2 1 − 1 T 2
given by η =1−
=
W 236.5 = = 236.5W t 1
T2 T1
Given, T1 = 600 K and T2 = 300 K 300 ∴ η =1− 600 1 η =1− ⇒ 2 1 η = = 50% ⇒ 2 W 800 1 Also, η = = = Q Q 2 Thus, amount of heat supplied from source to engine is Q = 800 × 2 = 1600 J
12 (b) Efficiency of a Carnot engine, η =1− =1−
303 W = 600 × 4.2 × − 1 277 26 W = 600 × 4.2 × 277 W = 236.5 J Work done Power = Time
T2 T1
Here, T1 = 273 + 127 = 400K T2 = 273 + 27 = 300 K 400 − 300 ∴ η= 400 100 = = 0.25 = 25% 400 Hence, 26% efficiency is impossible for a given heat engine.
Q2 + W T1 = Q2 T2
11 (b) The efficiency of Carnot engine is
T2 T1 (273 + 27) (273 + 127)
300 1 = 400 4 Work done η= Heat supplied 1 W = 4 40 W = 10 kJ =1−
⇒ ⇒
13 (b) In Carnot cycle of an ideal gas, W Q − Q2 = 1 Q1 Q1
10 (a) Given, m = 1 kg T1 = 24.4 + 273 = 297.4 K T2 = 0 + 273 = 273 K
or
W Q =1− 2 Q1 Q1
L = 336 kJ/kg Total heat produced per kg of mass
or
W T =1− 2 Q1 T1
or
T W = Q1 1 − 2 T1
i.e.,
Q2 = mL = 1 × 336 kJ
We know that Q1 T1 = Q2 T2 ⇒
T Q1 = 1 Q2 T2
297.4 × 336 273 99926.4 = kJ = 366.0 kJ 273 Work required by refrigerator, W = Q1 − Q2 = 366 − 336 = 30 kJ =
∴ or
Q1 T1 = Q Q2 T2
(127 + 273) W = 6 × 104 1 − 227 + 273) ( 400 W = 6 × 104 1 − 500 = 6 × 104 ×
100 500
W = 1.2 × 104 J
14 (c) In Carnot cycle, in order to obtain continuous supply of work, net work done As, W a → b is isothermal
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
W b → c is adiabatic W c → d is isothermal (negative) W d → a is adiabatic (negative) Net work done during the complete cycle, W = Wa → b + Wb → c + (− W c → d ) + (− W d → a ) W = Wa → b − Wc → d [as W b → c = W d → a ] i.e.
Wa → b + Wc → d > 0 Wa → b + Wb → c
+ Wc → d + Wd → a > 0 Q Wb → c = Wd → a ∴ Wb → c + Wd → a = 0
15 (d) Efficiency of a Carnot engine, i.e. T η =1− 2 T1 25 (273 + 27) =1− 100 T1 ∴
25 300 = 1− 100 T1
⇒
300 25 = 1− T1 100 300 100 − 25 = T1 100
⇒
300 75 = T1 100
300 × 100 T1 = 75 ⇒ T1 = 400K ∴ Temperature of a source, i.e. T1 = 400 − 273
17 (b) Internal energy does not change in isothermal process. As entropy is a measure of disorder of molecular motlion of system, ∆S can be zero for adiabatic process. Work done in adiabatic process may be non-zero. However, internal energy and entropy are state functions.
18 (a) Efficency of heat engine, T2 T1 (θ 1 = ∞ )
η =1−
For η = 1 T2 should zero that is either, T2 = 0 K T1 or T1 = ∞ K As source at infinite temperature or sink at 0 K is not attainable. Therefore, efficiency of heat engine is always less than 1.
19 (c) According to the figure, Heat energy from A to B, 1 3 T0S 0 = T0S 0 2 2 Heat, energy from B to C, Q1 = T0S 0 +
Q2 = T0 (2S 0 − S 0 ) = T0S 0 Heat energy from C to A Q3 = 0 ⇒
T − T2 T η =1− 2 = 1 T1 T1 ⇒
25 T1 − (T1 − 80) = 100 T1
⇒
1 80 = 4 T1
⇒
T1 = 320 K T1 = 320 − 273
= 47° C Temperature of the low temperature reservoir = 47 − 80 = − 33° C.
W Q − Q2 = 1 Q1 Q1
2 1 Q =1− 2 =1− = 3 3 Q1
20 (c) Efficiency of a Carnot engine,
= 127° C
16 (c) Efficiency of a Carnot engine, i.e.
η=
∴
η =1−
T2 T1
η =1−
(27 + 273) (273 + 627)
=1−
300 600 2 = = 900 900 3
23 (c) The efficiency of Carnot engine is defined as the ratio of work done to the heat supplied, i.e. Work done η= Heat supplied =
=1−
In convection, transfer of heat takes place by transport of matter in the form of motion of particles.
22 (a) Heat cannot flow itself from a body at lower temperature to a body at higher temperature. This corresponds to second law of thermodynamics.
T Q2 =1− 2 T1 Q1
… (i)
where, T1 is the temperature of source and T2 is the temperature of sink. Given, T2 = 300 K, η = 40% = 0.4 Putting these values in Eq. (i), we get 300 0.4 = 1 − T1 ⇒
T1 =
300 300 = = 500 K 1 − 0.4 0.6
Let temperature of the source be increased by x K, then efficiency becomes η′ = 40% + 50% of η 40 50 = + × 0.4 100 100 = 0.4 + 0.5 × 0.4 = 0.6 300 Hence, 0.6 = 1 − 500 + x ⇒
300 = 0.4 ⇒ x = 250 K 500 + x
24 (d) Thermal efficiency of a Carnot engine is given by T η =1− 2 T1
…(i)
where, T2 is temperature of sink and T1 is the temperature of the source. Here, η = 50%, T2 = 50° C = 273 + 50 = 323K Putting these values in Eq. (i), we get 50 323 =1− 100 T1 or
21 (a) The freezer in a refrigerator is located at the top section, so that the entire chamber of the refrigerator is cooled quickly due to convection.
W Q − Q2 = 1 Q1 Q1
∴
323 1 1 =1− = T1 2 2 T1 = 646 K = 373° C
25 (a) A heat engine is a device which converts heat energy into mechanical energy. The efficiency of heat engine is the fraction of total heat supplied to the engine which is converted into work. W Q T η= =1− 2 =1− 2 Q Q1 T1 where, T1 is temperature of source and T2 is temperature of sink.
303
THERMODYNAMICS
Given, ∴ and
1 1 , η2 = 6 3 1 T1 − T2 = 6 T1
27 (d) An external work W has to be done
η1 =
1 T1 − (T2 − 62) = 3 T1
…(i)
to suck heat Q2 from the cold reservoir and Q1 = (Q2 + W ) is given to the hot reservoir. Refrigerator Electrical energy/work (W)
…(ii)
Solving Eqs. (i) and (ii), we get T1 = 372 K and T2 = 310 K
26 (a) Carnot engine turns out to be the best at using energy as heat to do useful work. Carnot engine comprises four cycles. During each cycle of engine, the working substance absorbs energy | QH | as heat from a thermal reservoir at constant temperature TH and discharges energy | QL | as heat to a second thermal reservoir at a constant lower temperature TL, these terms can be used for calculating efficiency of heat engine. Thus, Carnot cycle provides a way of determining the maximum possible efficiency achievable with reservoirs of given temperature.
29 (a) Coefficient of performance, β= Q2 =
Q2 TL = W TH − TL 273 × 1 273 = =9J 303 − 273 30
Heat delivered to the surroundings,
Q2 W+Q2= Q1
On removal of Q2 from refrigerator box, temperature of refrigerator interior become lower as compared to outside.
28 (d) Efficiency of the engine is given by T η = 1 − 2 × 100 T1 273 + 20 = 1 − × 100 273 + 40 293 = 1 − × 100 313 = 0.064 × 100 = 6.4%
Q1 = Q2 + W = 9 + 1 = 10 J
30 (d) The efficiency of Carnot engine is η=
T1 − T2 T = 1 − 2 (T1 > T2) T1 T1
where, T1 = source temperature and T2 = sink temperature. The value of efficiency of Carnot engine can be 1 or 100%, if the sink temperature (T2 ) is at 0 K. In order to achieve 100%, efficiency (η = 1), Q2 must be equal to 0 which means all the heat from the source is converted to work. As practically, absolute zero temperature cannot be achieved. Hence, Carnot engine cannot give 100% efficiency.
12 Kinetic Theory of Gases Quick Review Kinetic theory of gases explains the behaviour of gases based on the idea that gas consists of rapidly moving atoms or molecules.
Assumptions of Kinetic Theory of Gases • A given amount of gas consists of a very large
•
•
•
•
number of molecules (the order of Avogadro’s number 1023 ) and all molecules are identical in all respect. The molecules of a gas are in a state of incessant random motion in all directions with different speeds and they move freely in straight lines following Newton’s first law. The size of a molecule is much smaller than the average separation between the molecules. At ordinary pressure and temperature, the average distance between molecules is about 20 Å, whereas size of a molecule is 2 Å. The collision between molecules among themselves or between molecules and walls are perfectly elastic, i.e. total momentum and total kinetic energy of molecules are conserved, however only their velocities will change. The molecules exert no force on each other or on the walls of the container except during collision.
Ideal Gas and Real Gas The gas which follows all the assumptions of kinetic theory of gases is called ideal gas but practically no real gas is ideal. However a real gas behaves as an ideal gas most closely at low temperature and high pressure.
Pressure Exerted by an Ideal Gas The pressure exerted by a gas is the result of collisions of gas molecules with the walls of the container. The pressure of the gas is equal to the force exerted per unit area of the walls by the gas. Pressure of an ideal gas, 1 mn 2 1 v rms = ρv 2rms p= 3 V 3
m Qρ = V
where, m = mass of molecule of gas, n = number of molecules, V = volume of the gas, ρ = density of the gas and v rms = root mean square speed of the molecules. 21 Also, p = ρv 2 32
305
KINETIC THEORY OF GASES
1 where, ρv 2 is average kinetic energy of gas molecules per 2 unit volume. 2 E mol ∴ p= 3 V where, V is volume of one mole gas which is equal to 22.4 L. 3 E mol = RT ⇒ E mol ∝ T 2 Note Critical temperature is the temperature at which gases can be liquified.
Ideal Gas Equation An ideal gas follows ideal gas equation in all the conditions of temperature and pressure. Ideal gas equation, pV = nRT = nkT where, k = Boltzmann’s constant = R / N = 1.38 × 10−23 JK −1 .
Ideal Gas Laws Some important gaseous laws are given below Boyle’s Law It states that, for a given mass of a gas at constant temperature, the volume of that mass of gas is inversely proportional to its pressure. i.e. V ∝ 1/ p pV = constant ⇒ p1V1 = p 2V2 = p 3V3 L = constant Charles’ Law It states that, for a given mass of an ideal gas at constant pressure, volume (V ) of a gas is directly proportional to its absolute temperature T. i.e. V ∝T V = constant ⇒ T V1 V2 V3 = = L = constant ⇒ T1 T2 T3 Gay Lussac’s or Pressure Law It states that, for a given mass of an ideal gas at constant volume, pressure ( p ) of a gas is directly proportional to T. p i.e. p ∝T ⇒ = constant T p1 p p ⇒ = 2 = 3 =…= constant T1 T2 T3 Pressure of the gas at t°C, t p t = p 0 1 + 273.15 where, p 0 is the pressure of gas at 0°C.
Dalton’s Law of Partial Pressure It states that, the total pressure of a mixture of non-interacting ideal gases is the sum of partial pressures exerted by individual gases in the mixture. i.e.
p = p1 + p 2 + p 3 + L
where, p1 = n1 RT / V is the pressure of gas 1 would exert at the same condition of volume and temperature, if no other gases are present and p 2 , p 3 , ...... are pressure exert by gas 2, gas 3.... respectively, at the same condition of temperature and pressure. Graham’s Law of Diffusion It states that, the rate of diffusion of a gas is inversely proportional to the square root of its density. 1 r∝ ρ Avogadro’s Law It states that, at the same temperature and pressure, equal volume of all gases contain equal number of molecules. i.e. At the constant temperature and pressure, N 1 = N 2 where, N 1 and N 2 are number of molecules present in the same volume of two gases. The number of molecules in mole of a gas is N = 6.023×1023 , where N is called Avogadro’s number.
Molecular Velocities Based upon the calculations, there are three main kinds of molecular velocities as given below (i) Average Velocity (v or v av ) It is the arithmetic mean of the velocities of the different molecules of a gas. v + v2 + v3 + … + vn Mathematically, v = 1 n where, v1 v 2 v 3 … v n are the velocities of the individual molecules and n = n1 + n 2 + n 3K, are the total number of molecules. This is related to temperature T of the gas as v=
8RT = πM
8p = πρ
8kT πm
(ii) Root Mean Square Velocity (v or v rms ) It is the square root of the mean of the squares of the velocities of the molecules of gas. Mathematically, v rms =
v12 + v 22 + v 32 + … + v n2 n
From kinetic gas equation, 3p 3RT 3kT v rms = = = d M m where, p = pressure ( RT / V ) and d = density ( M / V ).
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
(iii) Most Probable Velocity (v mp or u mp ) It is the velocity, possessed by the largest number of molecules of gas (Maxwell speed distribution law). From kinetic gas equation, v mp =
2RT M
2p 2kT = = d m • The ratio of different molecular velocities is 8 v rms : v av : v mp = 3 : : 2 π = 3 : 2.5 : 2
Mean Free Path The average distance travelled by a molecule between two successive collisions is known as the mean free path of the molecule. 1 Mean free path, λ = 2 nπd 2 where, d = diameter of each molecule and n = number of molecules per unit volume.
Relation Between Mean Free Path ( λ ), Temperature (T) and Pressure (p) λ=
kT 2πd 2 p
Equation of State for a Real Gas For ideal gases, equation of state is pV = µRT and for real gases, equation of state is different as of the ideal one. van der Waals’ derived following equation of state for real gases, n 2 a p + 2 (V − nb ) = nRT V (for n moles of a gas) where, a and b are constants called van der Waal’s constants.
Degrees of Freedom
Degrees of Freedom for Different Gases According to Atomicity of Gas at Low Temperature Atomicity of Gas
Translational Rotational
Total
Monoatomic, e.g. Ar, Ne, Ideal gas etc.
3
0
3
Diatomic, e.g. O2, Cl 2, N2 etc.
3
2
5
Triatomic (linear), e.g. CO2, C2H2.
3
2
5
Triatomic (Non-linear) or Polyatomic, e.g. H2O, NH3, CH4.
3
3
6
Law of Equipartition of Energy For a dynamic system in thermal equilibrium, the total energy is distributed equally amongst all the degrees of freedom and the energy associated with each molecule per degree of freedom is (1/ 2) kT, where k is Boltzmann’s constant. If f be the number of degrees of freedom, the internal energy of f 1 mole of the gas will be RT or internal energy of n moles of 2 n the gas will be fRT . 2 n Thus, internal energy, U = fRT . 2
Specific Heat Capacity The amount of heat required to change the temperature of unit mass of substance by unity is called specific heat capacity. 1 ∆Q Specific heat capacity, C = m ∆T where, m = mass of substance. • Heat capacity per mole is called molar specific heat capacity. 1 ∆Q Molar specific heat capacity, C = n ∆T 1 ∆Q • Molar heat capacity at constant pressure, C p = n ∆T p • Molar heat capacity at constant volume, CV =
1 ∆Q n ∆T V
• For an ideal gas, C p − CV = R, where R is universal gas
constant and this relation is called Mayer’s formula.
• Ratio of C p and CV is represented by γ,
i.e.
γ=
Cp
The total number of co-ordinates axes of independent quantities required to describe completely the position and configuration of dynamical system (gaseous) is known as number of degrees of freedom of the system. It is represented by f and expressed as f = 3N − K
• In terms of degrees of freedom,
where, N is the number of particles and K is number of co-ordinates of the particles.
Note Work done in increasing the volume or temperature of a gas is given by ∆W = p∆V = nR∆T.
CV
γ = 1+
2 f
307
KINETIC THEORY OF GASES
Degree of Freedom, Specific Heat and Kinetic Energy for Different Gases Monotomic
Diatomic
Triatomic (non-linear)
Triatomic (linear)
Atomicity
A
1
2
3
3
Restriction
B
0
1
3
2
Degree of freedom
f = 3A − B
3
5
6
7
Degree of freedom at high temperature
f′
3 (no change)
7
8
9
Molar specific heat at constant volume
CV = ( f / 2)R = R/(γ − 1)
3/2R
5/2R
3R
7/2 R
Molar specific heat at constant pressure
C p = [( f / 2) + 1]R = γ R / (γ − 1)
5/2R
7/2R
4R
9/2 R
Ratio of C p to CV
γ = C p / CV = 1 + (2/ f )
5/3 −~ 1.66
7/5 −~ 1.4
4/3 −~ 1.33
9/7 −~ 1.28
Kinetic energy of 1 mol
Emole = ( f / 2) RT
(3/2)RT
(5/2)RT
3RT
(7/2)RT
Kinetic energy of 1 molecule
Emolecule = ( f / 2) kT
(3/2)kT
(5/2)kT
3kT
(7/2)kT
Kinetic energy of 1g
Egram = ( f / 2) rT
(3/2)rT
(5/2)rT
3rT
(7/2)rT
Topical Practice Questions All the exam questions of this chapter have been divided into 3 topics as listed below Topic 1
—
KINETIC THEORY OF GASES, GAS LAWS AND IDEAL GAS EQUATION
308–313
Topic 2
—
VARIOUS VELOCITIES & KINETIC ENERGY OF GAS AND MEAN FREE PATH
314–318
Topic 3
—
DEGREES OF FREEDOM, LAW OF EQUIPARTITION OF ENERGY AND SPECIFIC HEAT CAPACITY
318–323
Topic 1 Kinetic Theory of Gases, Gas Laws and Ideal Gas Equation 2019 1 An ideal gas intially at pressure 1 bar is being compressed
from 30 m 3 to 10 m 3 volume and its temperature decreases from 320 K to 280 K, then find the value of final pressure of the gas. [AIIMS] (a) 2.625 bar (b) 3.4 bar (c) 1.325 bar (d) 4.5 bar
2 Assertion NH 3 is liquified more easily than CO2 . Reason Critical temperature of NH 3 is more than CO2 .
[AIIMS]
(a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct, but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2014 5 Which one of the following is a wrong statement in kinetic theory of gases? [Kerala CEE] (a) The gas molecules are in random motion. (b) The gas molecules are perfect elastic spheres. (c) The volume occupied by the molecules of a gas is negligible. (d) The force of attraction between the molecules is negligible. (e) The collision between molecules is inelastic.
2013 6 In the given (V-T) diagram, what is the relation between pressures p1 and p 2 ? V
2017 3 A graph between pressure p (along Y -axis) and absolute temperature T(along X -axis) for equal moles of two gases has been drawn. Given that volume of second gas is more than volume of first gas. Which of the following statements is correct? [JIPMER] p
[NEET] p2 p1 θ2 θ1
(a) p 2 = p1 (c) p 2 < p1
T
(b) p 2 > p1 (d) Cannot be predicted
2012 7 A balloon is filled at 27 °C and 1 atm pressure by 500 m 3
1
He gas. At −3°C and 0.5 atm pressures, the volume of He-gas contained in balloon will be [AIIMS] (a) 700 m 3 (b) 900 m 3 (c) 1000 m 3 (d) 500 m 3
2
T
(a) Slope of gas 1 is less than gas 2 (b) Slope of gas 1 is more than gas 2 (c) Both have some slopes (d) None of the above
4 A given sample of an ideal gas occupies a volume V at a pressure p and absolute temperature T. The mass of each molecule of the gas is m. Which of the following gives the density of the gas? [NEET] p pm (b) (a) kT kT p (c) (d) mkT kTV
2011 8 Air inside a closed container is saturated with water vapour. The air pressure is p and the saturated vapour pressure of water is p. If the mixture is compressed to one-half of its volume by maintaining temperature constant, the pressure becomes [WB JEE] (a) 2 ( p + p ) (b) 2 p + p (c) ( p + p ) / 2 (d) p + 2 p
9 A perfect gas at 27°C is heated at constant pressure so as to double its volume. The increase in temperature of the gas will be [KCET] (a) 600°C (b) 327°C (c) 54°C (d) 300°C
309
KINETIC THEORY OF GASES
2010 10 If pressure of CO2 (real gas) in a container is given by RT 9 − 2 , then mass of the gas in container is 2V − b 4b [AIIMS] (a) 11 g (b) 22 g (c) 33 g (d) 44 g 11 A closed vessel contains 8 g of oxygen and 7g of nitrogen. The total pressure is 10 atm at a given temperature. If now oxygen is absorbed by introducing a suitable absorbent, the pressure of the remaining gas (in atm) will be [BHU] (a) 2 (b) 10 (c) 4 (d) 5 p=
12 The figure shows graphs of pressure versus density for an ideal gas at two temperatures T1 and T2 , then [OJEE] p
T1 T2
ρ
(a) T1 > T2 (c) T1 < T2
(b) T1 = T2 (d) None of these
13 Average momentum of an ideal gas depends upon (a) temperature (b) mass (c) volume (d) None of these
[OJEE]
14 Simple behaviour under all conditions of real gas is governed by the equation [MP PMT] a (a) pV = µRT (b) p + 2 (V − b ) = RT V γ (c) pV = constant (d) pV = constant 15 Ideal gas and real gas have major difference of [MP PMT] (a) phase transition (b) temperature (c) pressure (d) None of these 16 Air is filled at 60° C in a vessel of open mouth. The vessel is heated to a temperatureT so that (1/ 4 )th part of air escapes. Assuming the volume of the vessel remaining constant, the value of T is [Haryana PMT] (a) 80° C (b) 444° C (c) 333° C (d) 171° C 17 The pressure p for a gas is plotted against its absolute temperature T for two different volumes V1 and V2 , where V1 > V2 . If p is plotted on Y-axis and T on X-axis, then [EAMCET]
(a) the curve for V1 has greater slope than that for V2 (b) the curve for V2 has greater slope than that for V1 (c) Both curves have same slope (d) the curves intersect at some point other than T = 0 18 The temperature of a gas contained in a closed vessel of constant volume increases by 1° C when the pressure of the gas is increased by 1%. The initial temperature of the gas is (a) 100 K (b) 273° C [KCET] (c) 100° C (d) 200 K
19 Air is pumped into an automobile tube upto a pressure of 200 kPa in the morning when the air temperature is 22° C. During the day, temperature rises to 42° C and the tube expands by 2 %. The pressure of the air in the tube at this temperature will be approximately [JCECE] (a) 212 kPa (b) 209 kPa (c) 206 kPa (d) 200 kPa 20 The gas in a vessel is subjected to a pressure of 20 atm at a temperature 27° C. The pressure of the gas in a vessel after one-half of the gas is released from the vessel and the temperature of the remainder is raised by 50° C is [MGIMS] (a) 8.5 atm (b) 10.8 atm (c) 11.7 atm (d) 17 atm 21 Which one of the following is not an assumption in the kinetic theory of gases? [Manipal] (a) The volume occupied by the molecules of the gas is negligible. (b) The force of attraction between the molecules is negligible. (c) The collision between molecules are elastic. (d) All molecules have same speed. 22 A closed compartment containing gas is moving with some acceleration in horizontal direction, then the pressure in the compartment is (neglect effect of gravity) [JCECE] (a) same everywhere (b) lower in front side (c) lower in rear side (d) lower in upper side
2009 23 By what percentage should the pressure of a given mass of a gas be increased, so as to decrease its volume by 10% at a constant temperature? [AFMC] (a) 5% (b) 7.2% (c) 12.5% (d) 11.1%
24 When a van der Waals’ gas undergoes free expansion, then its temperature [AFMC] (a) decreases (b) increases (c) does not change (d) depends upon the nature of the gas 25 An electron tube was sealed OFF during manufacture at a pressure of 1.2 × 10−7 mm of mercury at 27°C. Its volume is 100 cm 3 . The number of molecules that remains in the tube is [Manipal] (a) 2 × 1016 (b) 3 × 1015 (c) 3.86 × 1011 (d) 5 × 1011 26 Two monatomic ideal gases A and B occupying the same volumeV are at the same temperature T and pressure p . If they are mixed, the resultant mixture has volume V and temperature T. The pressure of the mixture is [J&K CET] p (a) p (b) 2 (c) 4 p (d) 2 p
310
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2008 27 Two vessels A and B having equal volume contain equal masses of hydrogen in A and helium in B at 300 K. Then, mark the correct statement? [BHU] (a) The pressure exerted by hydrogen is half that exerted by helium (b) The pressure exerted by hydrogen is equal to that exerted by helium (c) Average KE of the molecule of hydrogen is half the average KE of the molecules of helium (d) The pressure exerted by hydrogen is twice that exerted by helium 28 At 10°C, the value of the density of a fixed mass of an ideal gas divided by its pressure is x. At 110°C, this ratio is
31 One litre of an ideal gas at 27°C is heated at a constant pressure to the 297°C. Then, the final volume is the approximately [AMU] (a) 1.2 L (b) 1.9 L (c) 19 L (d) 2.4 L
2006 32 Two balloons are filled, one with pure He gas and the other by air, respectively. If the pressure and temperature of these balloons are same, then the number of molecules per unit volume is [AFMC] (a) more in the He filled balloon (b) same in both balloons (c) more in air filled balloon (d) in the ratio of 1 : 4
[CBSE AIPMT]
383 (b) x 283
(a) x
10 (c) x 110
(d)
283 x 383
2007 29 The figure below shows the plot of gas at two different temperatures.
pV (J.mol –1 K –1) nT
T2
pV versus p for oxygen nT
[AIIMS]
T1
33 To decrease the volume of a gas by 5% at constant temperature, the pressure should be [Kerala CEE] (a) decreased by 5.26% (b) increased by 5.26% (c) decreased by 11% (d) increased by 11% (e) increased by 15% 34 A closed vessel is maintained at a constant temperature. It is first evacuated and then vapour is injected into it continuously. The pressure of the vapour in the vessel (a) increases continuously [MHT CET] (b) first increases and then remains constant (c) first increases and then decreases (d) None of the above
2005 35 If p is the pressure, V the volume, R the gas constant, k the
p
Boltzmann constant and T the absolute temperature, then the number of molecules in the given mass of the gas is given [MP PMT] pV pV pR (a) (b) (c) (d) pV RT kT T
Read the following statements concerning the above curves. I. The dotted line corresponds to the ideal gas behaviour. II. The temperatures are related as T1 > T2 . pV III. The value of at the point, where the curves meet nT on the Y-axis is the same for all gases. Which of the above statements is true? (a) I Only (b) I and III (c) Both (a) and (b) (d) None of these 30 Temperature remaining constant, the pressure of gas is decreased by 20%. The percentage change in volume [J&K CET]
(a) increases by 20% (c) increases by 25%
(b) decreases by 20% (d) decreases by 25%
36 What is the mass of 2 L of nitrogen at 22.4 atm pressure and 273 K? [J&K CET] (a) 28 g (b) 14 × 22.4 g (c) 56 g (d) None of these 37 Equation of a gas in the terms of pressure ( p ), absolute temperature (T ) and density ( d ) is [EAMCET] p1 p2 p1T1 p 2T2 (a) (b) = = T1 d1 T2 d 2 d1 d2 p d p d p d p d (c) 1 2 = 2 1 (d) 1 1 = 1 2 T2 T1 T1 T2
Answers 1 11 21 31
(a) (d) (d) (b)
2 12 22 32
(a) (a) (b) (b)
3 13 23 33
(b) (d) (d) (b)
4 14 24 34
(b) (b) (a) (b)
5 15 25 35
(e) (c) (c) (b)
6 16 26 36
(c) (d) (d) (c)
7 17 27 37
(b) (b) (d) (a)
8 (a) 18 (a) 28 (d)
9 (d) 19 (b) 29 (c)
10 (b) 20 (b) 30 (c)
311
KINETIC THEORY OF GASES
Explanations 1 (a) Given, initial pressure of ideal gas, p1 = 1 bar = 1Nm
−2
Final volume, V2 = 10 m 3 Initial temperature, T1 = 320 K Final temperature, T2 = 280 K Final pressure of gas, p2 = ? By ideal gas equation, p1V1 p2V2 = T1 T2 1 × 30 p2 × 10 = ⇒ 320 280 ⇒ p2 = 2.625 bar
2 (a) A gas can be liquified by applying pressure only when it is cooled below critical temperature. Critical temperature of NH3 is more than CO 2, i.e. TNH 3 = 405 K and TCO2 = 304.1 K. Therefore, NH3 is liquified more easily than CO 2. Hence, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
3 (b) According to ideal gas equation,
pV = nRT p nR or = T V p where represents slope of the graph T As, the number of moles are the same for the two gases, p 1 ∴ ∝ T V Q V2 > V1 (Given) ∴ (Slope)2 < (Slope)1 or (Slope)1 > (Slope)2
4 (b) We know that,
pV = RT RT …(i) V = ⇒ p M mN A ∴ Density (ρ ) = = RT V p [from Eq. (i)] [R = kN A]
5 (e) The kinetic theory of gases assume the collision between molecules as perfectly elastic. So, incorrect statement is that the collision between molecules is inelastic.
Q Hence,
7 (b) As, or
1 tanθ θ1 < θ2 p2 < p1
1 p
On comparing the given equation with this standard equation, we get 1 µ= 2 m As, µ= M where, m = mass of gas and M = molecular weight of the gas. 1 m = µ M = × 44 = 22 g 2
p∝
or
Initital volume, V1 = 30 m 3
mpN A = kN AT pm ρ= kT
6 (c) The slope of the graph ∝
p1V1 p2V2 = T1 T2 p1V1T2 V2 = p2T1
Given, p1 = 1 atm, V1 = 500 m 3,
11 (d) From Dalton’s law, final pressure of the mixture of nitrogen and oxygen, pmix = p1 + p2 n RT n RT m = 1 + 2 Qn= V V M
T2 = −3° C = [ 273 + (−3)]K = (273 − 3)K, p2 = 0.5 atm and T1 = 27° C = (27 + 273)K ∴Volume of He, 1 × 500 × (273 − 3) V2 = 0. 5 × (273 + 27) 1 × 500 × 270 = = 900 m 3 0. 5 × 300
m1 RT m2 RT ⋅ + ⋅ M1 V M2 V 8 RT 7 RT RT = ⋅ + ⋅ = 32 V 28 V 2V =
8 (a) Given that, the air inside a closed container is saturated with water vapour, so if the temperature remains constant, the saturated vapour pressure does not change. Also, pressure will be twice, when volume will be halved. Hence, pressure of mixture, p′ = 2( p + p ).
9 (d) We know that, for perfect gas,
V ∝T V1 T1 i.e. …(i) = V2 T2 According to the question, V1 = V , then V2 = 2V and T1 = 300 K 1 300 = ∴ 2 T2 ⇒ ⇒ So,
T2 = 600 K T2 = 327° C ∆t = 327 − 27 = 300° C
10 (b) van der Waals’ gas equation for µ mole of real gas is µ 2a p + 2 (V − µb) = µ RT V µRT µ 2 a ⇒ p= − V − µb V 2 Given equation, RT 9 p= − 2V − b 4 b2
12
...(i) 10 = RT / 2V When oxygen is absorbed, then pressure by nitrogen, 7 RT p= ⋅ 28 V RT ...(ii) p= ⇒ 4V From Eqs. (i) and (ii), we get Pressure exerted by nitrogen gas, p = 5 atm m (a) As, pV = nRT = RT M where, M = molecular weight. p RT = ⇒ m /V M p RT = ⇒ ρ M p ∝T ⇒ ρ (Q for a given gas M is constant) Temperature is directly proportional to the slope of p -ρ graph, so T1 > T2 .
13 (d) The average momentum of an ideal gas molecules before and after striking the wall of container is p and − p, respectively considering elastic collisions, according to kinetic theory of gases assumptions. Hence, average momentum, p + (− p) =0 pav = 2 [Q average velocity of an ideal gas is zero]
312
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Thus, for any temperature, mass and volume the average momentum of the gas will be zero. So, it does not depend upon any of these parameters.
14 (b) Real gas behaviour is governed by van der Waals’ equation given as a ⇒ p + 2 (V − b) = RT V [for one mole of gas]
15 (c) No attractive or repulsive force acts between gas molecules in an ideal gas whereas for a real gas intermolecular force exists. Molecules do not exert that force on the wall which they would have exerted in the absence of intermolecular force. Therefore, the observed pressure p of the gas will be less than that present in the absence of intermolecular force. Thus, the observed pressure for an ideal gas is more as compared for real gas. So, ideal and real gas have major difference of pressure.
16 (d) For open mouth vessel, pressure is constant. Volume is also given constant. m Hence, from pV = µRT = RT M 1 T ∝ ⇒ m T1 m2 ⇒ = T2 m1 1 ∴ th part escapes, so remaining 4 mass in the vessel, 3 m2 = m1 4 (273 + 60) 3 / 4 m1 ⇒ = T m1 [QT1 = 60° C = (60 + 273)K] T = 444 K = (444 − 273)° C = 171° C
⇒
17 (b) Pressure versus temperature diagram is given below Y-axis
V2
p V1
θ2 θ1 T
X-axis
Given, V1 > V2 From ideal gas equation, pV = nRT p nR p 1 or ⇒ = ∝ T V T V
Slope of curve = tanθ = ⇒
p1 p2 V2 ]
⇒ tan θ 1 < tan θ 2 or slope of curve for V1 is less than that for V2. 18 (a) According to Gay Lussac’s law, p∝T dp dT × 100 = × 100 ∴ p T dp Q p × 100 = 1 1 1 = × 100 ⇒ T = 100 K ⇒ T 19 (b) The ideal gas law is the equation of state of an ideal gas. The state of an amount of gas is determined by its pressure, volume and temperature. The equation has the form pV = µRT , where p is the pressure, V is the volume, µ is the number of moles, R is the universal gas constant and T is the temperature. …(i) ∴ p1V1 / T1 = p2V2 /T2 Given, p1 = 200 kPa, V1 = V , T1 = 273 + 22 = 295 K, 2V V2 = V + 2%V = V + 100 = V + 0.02V = 102 . V T2 = 273 + 42 = 315 K Putting these values in Eq. (i), we get 200 × V p × 1.02V ⇒ = 2 295 315 200 × 315 ⇒ p2 = ≈ 209 kPa 295 × 1.02
20 (b) Given, p = 20 atm, T1 = 27° C = (27 + 273° ) K = 300 K and T2 = 50° C = (50 + 273)K = 323K m As, pV = µRT = RT M m pV = RT1 M m ...(i) ⇒ 20 × V = × R × 300 M When m = m/2 and p = p′, then m pV = RT2 M m /2 As, p′ × V = R × 323 ...(ii) M From Eqs. (i) and (ii), we get 323 p′ ≈ = ≈ 10.8 atm 30
22 (b) The pressure on the rear side would be more due to fictitious force (acting in the opposite direction of real acceleration) on the rear face. Consequently, the pressure in the front side would be lowered.
23 (d) From ideal gas equation,
pV = µRT At constant temperature, pV = constant i.e. pV = c Hence, …(i) p1V1 = p2V2 10 Given, V2 = V1 − V1 = (0.90) V1 100 Form Eq. (i), pV pV p p2 = 1 1 = 1 1 = 1 0.90 V1 0.90 V2 10 p2 1 = ⇒ = p1 0.90 9 p2 − p1 10 − 9 1 = = 9 p1 9
24 25
Therefore, % increase in pressure 100% = =11.1% 9 (a) When a van der Waals’ gas (real gas) undergoes free expansion, then its temperature decreases. (c) From ideal gal equation, pV = µRT Given, p = 12 . × 10−7 mm = 12 . × 10−7 × 10−3m = 12 . × 10−10m, T = 27° C = (27 + 273)K and V = 100 cm 3 = 10−4 m 3 ⇒ 1.2 × 10−7 × 133.322 × 10−4 = µ × 8.31 × (273 + 27) ∴ Number of moles, µ = 6.42 × 10−13 Hence, number of molecules = 6.42 × 10−13 × 6.02 × 1023
26 (d) As,
= 3.86 × 1011 p1V1 pmix ×Vmix = T1 Tmix
Given, T1 = Tmix = T and V1 = V + V , Vmix = V p × 2V p ×V = mix ∴ T T ⇒ pmix = 2 p
313
KINETIC THEORY OF GASES
27 (d) As, pV = nRT ⇒
p H2
and p He = ∴
p H2 pHe
=
m RT ⋅ M He V M He MH2
=
28 (d) In terms of density, ideal gas can be written as, pM 0 = dRT [where, d = density of gas] d M0 d 1 = ⇒ ∝ ⇒ p RT p T d1 / p1 T2 383 or = = d2 / p2 T1 283 Q T2 = 110° C = 383 K and T1 = 10° C = 283 K x 383 d1 = Q = x (given) ⇒ (d2 / p2 ) 283 p1 or
100 − 80 × 100 80 = 25%
31 (b) By Charles’ law,
p H 2 = 2 p He
The pressure exerted by hydrogen is twice that exerted by helium.
283 (d2 / P2 ) = x × 383
29 (c) I. The dotted line in the diagram shows that there is no deviation in the value pV for different temperatures T1 of nT and T2 for increasing pressure, so this gas behaves ideally. Hence, dotted line corresponds to ideal gas behaviour. II. At high temperature, the deviation of the gas is less and at low temperature the deviation of gas is more. In the graph, deviation for T2 is greater than for T1. Thus, T1 > T2. III. Since, the two curves intersect at dotted line at same point, so the pV value of at that point on the nT Y-axis is same for all gases.
30 (c) According to Boyle’s law, p1V1 = p2V2 As, the pressure is decreased by 20%, 80 therefore p2 = p1 100 80 ⇒ p1V1 = p1V2 100
V1 =
=
4 =2 2
[Q M H 2 = 2 and M He = 4 ] ⇒
80 V2 100 ∴ Percentage increase in volume V − V1 = 2 × 100 V1 ⇒
m RT = ⋅ M H2 V
So,
V1 T1 = V2 T2 VT V2 = 1 2 T1
Given, V1 = 1 L, T1 = 27° C = (27 + 273) K and T2 = 297° C = (297 + 273) K Putting these values, we get (297 + 273) V2 = 1 × ∴ (27 + 273) 570 = = 1.9 L 300
32 (b) Ideal gas equation can be written as
…(i) pV = µRT In this equation, µ = number of moles of the gas, p = pressure of the gas, V = volume of the gas, R = universal gas constant and T = temperature of the gas. From Eq. (i), we have µ /V = p/ RT = constant So, at constant pressure and temperature, both balloons will contain equal number of molecules (i.e. mole) per unit volume.
33 (b) By Boyle’s law, ∴
pV = RT p1V1 = p2V2
(Q temperature = constant) Given,V1 = V , 5 V2 = V − 5%V = V − V 100 5 ⇒ pV = p2 V − V 100 20 95 pV = p2 V ⇒ p2 = p ⇒ 100 19 Increase in pressure 20 = − 1 × 100 19 1 = × 100 = 5. 26% 19
34 (b) Total pressure inside the container is given as 1 mN 2 v rms 3 V …(i) p∝m (when volume and temperature are constant) From Eq. (i), pressure first increases and then becomes constant. p=
35 (b) From ideal gas equation,
pV = NkT where, k is the Boltzmann’s constant, p is the pressure, V is the volume, T is the absolute temperature and N is the number of molecules. Hence, number of molecules in given mass of gas, N = pV / kT .
36 (c) From ideal gas equation,
pV = µRT where, p is the pressure, V is the volume, R is the universal gas constant, T is the temperature and µ is the number of moles. pV ...(i) µ= ∴ RT Given, pressure p = 22.4 atm = 22.4 × 1.01 × 105 Nm −2 V = 2L = 2 × 10−3 m 3 R = 8.31 J mol −1 − K−1 T = 273 K Putting these values in Eq. (i), we get 22. 4 × 1. 01 × 105 × 2 × 10−3 ∴ µ= 8. 31 × 273 = 1. 99 ≈ 2 Mass Since, µ = Molecular weight ⇒ Mass = µ × Molecular weight = 2 × 28 = 56 g
37 (a) Gas equation, pV /T = constant ⇒
= R (for 1 mol of gas) p1V1 p2V2 = T1 T2
If m is the mass of a gas and d1 & d2 are its density at absolute temperatures T1K and T2K respectively, then V1 = m / d1 and V2 = m / d2 p1 m p2 m ∴ = T1 d1 T2 d2 ⇒
p1 p = 2 T1 d1 T2 d2
Topic 2 Various Velocities & Kinetic Energy of Gas and Mean Free Path 2019 1 Increase in temperature of a gas filled in a container would lead to (a) increase in its kinetic energy (b) decrease in its pressure (c) decrease in intermolecular distance (d) increase in its mass
[NEET]
7 The mean free path of collision of gas molecules varies with its diameter ( d ) of the molecules as [DUMET] (a) d −1 (b) d −2 (c) d −3 (d) d −4
2010 8 The velocity of 4 gas molecules are given by 1 kms −1 ,
2018 2 At what temperature will the rms speed of oxygen molecules become just sufficient for escaping from the earth’s atmosphere? [NEET] (Take, mass of oxygen molecule, m = 2.76 × 10−26 kg and Boltzmann’s constant, k B = 1.38 × 10−23 J K −1 ) (a) 5.016 × 104 K (b) 8.326 × 104 K 4 (c) 2.508 × 10 K (d) 1.254 × 104 K
2016 3 The molecules of a given mass of a gas have rms velocity of 200 ms −1 at 27°C and 10 . × 105 Nm −2 pressure. When the temperature and pressure of the gas are respectively, 127°C and 0.05 × 105 Nm −2 , the rms velocity of its molecules in ms −1 is [NEET] 400 100 2 100 (a) (c) (d) 100 2 (b) 3 3 3
2014 4 A gas is compressed isothermally. The rms velocity of its molecules (a) increases (b) decreases (c) first increases and then decreases (d) remains the same
2011
[MHT CET]
5 The mean free path of molecules of a gas (radius) is inversely proportional to [CBSE AIPMT] (c) r (d) r (b) r 2 (a) r 3
2013 6 Critical temperature of CO2 is 31.2ºC. In summer, the room temperature is 40° C, then [AIIMS] (a) CO2 cannot be liquified (b) CO2 can be liquified with increase of pressure (c) CO2 can be liquified with decrease of pressure (d) CO2 can be liquified, if temperature of CO2 is decreased below 31.2° C
3 kms −1 , 5 kms −1 and 7 kms −1 . Calculate the difference between average and rms velocity. [MHT CET] (a) 0.338 (b) 0.438 (c) 0.583 (d) 0.683
9 At what temperature will the oxygen molecules have the same root mean square speed as hydrogen molecules at 300 K? [OJEE] (a) 1600 K (b) 2400 K (c) 3200 K (d) 4800 K 10 Average velocity of an ideal gas molecule is [OJEE] (b) proportional to T 2 (a) proportional to T (d) zero (c) proportional to T 3 11 At what temperature is the rms velocity of a hydrogen molecule equal to that of an oxygen molecule at 47° C ? (a) 80 K (b) −73 K [Manipal] (c) 3 K (d) 20 K 12 The temperature of an ideal gas is increased from 120 K to 480 K. If at 120 K, the root mean square speed of gas molecules is v, then at 480 K, it will be [WB JEE] (a) 4 v (b) 2 v (c) v/ 2 (d) v/ 4 13 The temperature at which the velocity of oxygen will be half that of hydrogen at NTP is [BCECE] (a) 1092° C (b) 1492° C (c) 273 K (d) 819° C 14 Nitrogen (N2 ) is in equilibrium state at T = 421 K. The [BCECE] value of most probable velocity v mp is −1 −1 −1 (a) 400 ms (b) 421 ms (c) 500 ms (d) 600 ms −1 15 Assertion If a gas container in motion is suddenly stopped, the temperature of the gas rises. Reason The kinetic energy of ordered mechanical motion is converted into the kinetic energy of random motion of gas molecules. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
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KINETIC THEORY OF GASES
16 The kinetic energy of 1 g molecule of a gas at normal temperature and pressure is (R = 8.31Jmol K −1 ) [BHU] (a) 1.3 × 102 J (c) 0.56 × 104 J
(b) 2.7 × 102 J (d) 3.4 × 103 J
17 The temperature at which the mean kinetic energy of the molecules of gas is one-third of the mean kinetic energy of its molecules at 180° C is (a) − 122° C (b) − 90° C [MGIMS] (c) 60° C (d) 151° C
2009 18 To what temperature should the hydrogen at 327° C be cooled at constant pressure, so that the root mean square velocity of its molecules becomes half of its previous value? (a) − 123° C (b) 123° C [MHT CET] (c) − 100° C (d) 0° C 19 The average velocity of the molecules in a gas in equilibrium is [MGIMS] (b) proportional to T (a) proportional to T (c) proportional to T 2 (d) equal to zero
20 A sealed container with negligible coefficient of volumetric expansion contains helium (a monatomic gas). When it is heated from 300 K to 600 K, the average kinetic energy of helium atoms is [UP CPMT] (a) halved (b) unchanged (c) doubled (d) increased by factor 2 21 If at the same temperature and pressure, the densities of two diatomic gases are d1 and d 2 , respectively. The ratio of mean kinetic energy per molecule of gases will be [MGIMS] (a) 1 : 1 (b) d1 : d 2 (c) d1 : d 2
(d) d 2 : d1
2008 22 If average velocity becomes 4 times, then what will be the effect on rms velocity at that temperature? (a) 1.4 times (b) 4 times (c) 2 times (d) 1/4 times
[BCECE]
23 Assertion Mean free path of a gas molecules varies inversely as density of the gas. Reason Mean free path varies inversely as pressure of the gas. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2007 24 At what temperature, the kinetic energy of a gas molecule is half of the value at 27°C ? (a) 13.5°C (b) 150°C (c) 75 K (e) − 123° C
[Kerala CEE]
(d) 13.5 K
2006 25 Assertion The root mean square and most probable speeds of the molecules in a gas are the same. Reason The Maxwell distribution for the speed of molecules in a gas is symmetrical. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
26 When temperature of an ideal gas is increased from 27°C to 227°C, its rms speed is changed from 400 ms −1 to v s . [Manipal] Then v s is −1 −1 −1 (a) 516 ms (b) 450 ms (c) 310 ms (d) 746 ms −1 27 If at NTP velocity of sound in a gas is 1150 ms −1 , then the rms velocity of gas molecules at NTP is (take, R = 8. 3 J mol −1 K −1 , C p = 4 . 8 cal mol −1 K −1 ) [AMU] (b) 1532.19 ms −1 (a) 1600 ms −1 −1 (d) zero (c) 160 ms 28 The temperature of H2 at which the rms velocity of its molecules is seven times, the rms velocity of the molecules of nitrogen gas at 300 K is [AMU] (a) 2100 K (b) 1700 K (c) 1350 K (d) 1050 K 29 Some gas at 300 K is enclosed in a container. Now, the container is placed on a fast moving train while the train is in motion, the temperature of the gas [MHT CET] (a) rises above 300 K (b) falls below 300 K (c) remains unchanged (d) becomes unsteady
2005 30 The ratio of root mean square velocities of O3 and O2 is (a) 1 : 1 (c) 3 : 2
(b) 2 : 3 (d) 2 : 3
[BVP]
31 The temperature, at which the rms velocity of hydrogen is four times of its value at NTP is [MHT CET] (a) 819°C (b) 1092°C (c) 4368°C (d) 4095°C 32 If mass of He is 4 times that of hydrogen, then mean velocity of He is [Punjab PMET] (a) 2 times of H-mean value (b) (1/2) times of H-mean value (c) 4 times of H-mean value (d) same as H-mean value
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 11 21 31
(a) (d) (a) (d)
2 12 22 32
(b) (b) (b) (b)
3 (a) 13 (d) 23 (b)
4 (d) 14 (c) 24 (e)
5 (b) 15 (a) 25 (d)
6 (a) 16 (d) 26 (a)
7 (b) 17 (a) 27 (b)
8 (c) 18 (a) 28 (d)
9 (d) 19 (a) 29 (c)
10 (d) 20 (c) 30 (d)
Explanations 1 (a) The kinetic energy of gas molecules is given by 3 KE = RT 2 3 ⇒ KE = RT 2 ⇒ KE ∝ T Thus, increase in temperature, would increase the kinetic energy of molecules. Option (b) is incorrect as increase in temperature will lead to increase in pressure as p ∝ T . Other options (c) and (d ) are also incorrect as molecular distance increases while mass remains the same for increase in the temperature.
3 (a) Given, vrms = 200 ms−1 , T1 = 27° C = (27 + 273) K = 300 K, p1 = 105 Nm −2
v2 = 3 kms −1, v3 = 5 kms −1
T2 = 400 K, p2 = 0.05 × 105 Nm −2
The average velocity, v + v2 + v3 + L + vn vav = 1 N 1+ 3 + 5 + 7 = = 4 kms −1 4 Root mean square velocity,
As, rms velocity of gas molecules, Q
≅ 11.2 km s−1 = 11200 m s−1
⇒
( vrms )1 T = 1 (vrms )2 T2
⇒
200 = (vrms )2
⇒
critical temperature, however large the pressure may be hence CO2 cannot be liquified.
Substituting the given values, i.e. k B = 1.38 × 10−23 JK−1
7 (b) Mean free path of gas molecules,
mO 2 = m = 2.76 × 10−26 kg
= 8.326 × 104 K
5 (b) Mean free path,
6 (a) Gases cannot be liquified above
(3k B )
(112 . × 10 ) (2.76 × 10 We get T = (3 × 138 . × 10−23 )
3RT M Gas is compressed isothermally, so T remains constant and hence root mean square velocity will remain same. vrms =
λ=
(11.2 × 103 )2 (mO 2 )
3 2
300 3 = 400 4 2 (vrms )2 = × 200 3 400 −1 ms = 3
1 2πnd 2 1 ⇒ λ∝ 2 r where, d = diameter of the molecule and n = number of molecules per unit volume.
Let the temperature of molecule be T when it attains ve. According to the question, vrms = ve where, vrms is the rms speed of the oxygen molecule. 3k BT ⇒ = 11.2 × 103 mO 2
and
3RT m
gas molecule is given by
we get ve = 2 × 9.8 × 6.4 × 106
T =
Qvrms =
4 (d) The root mean square velocity of a
Substituting the value of g (9.8 ms−2 ) and radius of earth (R = 6.4 × 106 m),
or
vrms ∝ T
For two different cases,
2 (b) The minimum velocity with which the body must be projected vertically upwards, so that it could escape from the earth’s atmosphere, is its escape velocity (ve ). As, ve = 2gR
8 (c) Given, N = 4, v1 = 1 kms −1,
−26
λ1 + λ2 + L + λn n 1 λ= 2πnd 2
and v4 = 7 kms −1
vrms =
1 + (3)2 + (5)2 + (7)2 4 = 21 = 4.583 kms −1 =
Difference between average velocity and root mean square velocity = 4.583 − 4 = 0.583 km s−1
9 (d) As, vrms = ⇒ ⇒ ⇒ ∴
⇒ ∴
λ∝d
−2
3 RT M
T ∝M (Q vrms and R are constants) TO 2 M O 2 = TH 2 M H 2 TO 2
32 = 300 2 TO 2 = 4800 K
(given)
10 (d) Average velocity of an ideal gas molecule is collectively assumed to be zero. 3 RT M In the given problem, vrms and R are constants. T = constant M TH T = O MH MO
11 (d) We know that, vrms =
λ=
)
v12 + v22 + v32 + v42 + L + vn2 N
⇒
Q M H = 2, M O = 32 TO = 47° C = 320 K TH 273 + 47 = 2 32
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KINETIC THEORY OF GASES
T 320 = = 10 2 32 T = 20 K
⇒ ∴
∴ ⇒
12 (b) The root mean square velocity is given by vrms = So,
3RT M
18 (a) rms speed, vrms =
v1 T = 1 v2 T2
⇒
(where, M is a constant) Given, T1 = 120 K, T2 = 480 K, v1 = v So,
v 120 = = v2 480
⇒
v2 = 2v
1 1 = 4 2
1 2 3RT 1 3R × 273 = 32 2 2 3RT Q vrms = molecular weight
13 (d) Given, vO 2 = vH 2 ∴
⇒ or
T 273 or T = 4 × 273 = 32 8 T = 1092 K = 1092 − 273 = 819 ° C 2RT = m −1
−1
known as the ordered motion of the gas and zig-zag motion of gas molecules within the container is called disordered/Random motion, like brownian motion. When the container suddenly stops, ordered kinetic energy gets converted into disordered kinetic energy which increases the temperature of the gas.
16 (d) If nothing is said about gas, then we should calculate the translational kinetic energy. 3 Etrans = RT 2 3 = × 8.31 × (273 + 0) 2 = 3.4 × 103 J
⇒ ⇒ ⇒
1 2 3 mvrms = RT 2 2 K 2 T2 K ∝T ⇒ = K 1 T1 T K 2 = K 1 2 T1
⇒
600 K2 = K1 300
8 vav = vrms = 0.92 vrms …(iii) 3π Therefore,
vav = constant vrms
23 (b) The mean free path of a gas molecule is the average distance between two successive collisions. It is represented by λ. k BT λ= 2πσ 2 p Here, σ = density of molecule and k B = Boltzmann’s as constant. Hence, mean free path varies inversely with the density of the gas. It can be easily proved that the mean free path varies directly with the temperature and inversely with the pressure of the gas.
24 (e) Kinetic energy of a gas molecule
K =
15 (a) The motion of the container is
T1 = 180°C = (180 + 273) K Kinetic energy of a gas is directly proportional to its temperature.
8 RT ⋅ π M
20 (c) As, kinetic energy of gas is given as
[ mN 2 = 28 gmol = 28 × 10 kgmol ] = 499.89 = 500 ms −1
17 (a) Given, K 1 = K , K 2 = K / 3,
3RT1 M
19 (a) Average speed of gas is given as vav =
From Eqs. (i) and (ii), we get
Hence, root mean square velocity will also become 4 times, while the average velocity becomes 4 time of initial one.
Hence, vav ∝ T
2 × 8.31 × 421 28 × 10−3 −3
vrms1 =
3RT M
3RT2 and vrms 2 = M Given, T1 = 327° C = (327 + 273) K vrms1 T v 600 Now, = 1⇒ = v vrms 2 T2 T2 2 600 T2 = = 150 K ⇒ 4 = 150 − 273 = −123°C
14 (c) Most probable velocity, vmp =
K 1 T1 K 273 + 180 = = ⇒ K 2 T2 K /3 T2 453 3= ⇒ T2 = 151K T2 T2 = 151 − 273 = −122° C
(given)
K 2 = 2K 1
21 (a) At a given temperature (T ), all the ideal gas molecules no matter what their masses have the same average translational kinetic energy. 3 i.e. E = kT 2 So, E does not depend upon density (as mass = ρV ) E1 = 1: 1 E2
22 (b) According to kinetic theory of gases, average velocity, 8RT …(i) vav = Mπ According to kinetic theory of gases, root mean square velocity, 3RT …(ii) vrms = M
3 RT 2 where, R is universal gas constant. E T ∴ E ∝T ⇒ 1 = 1 E2 T2 E=
Given, E1 = E , E2 = E / 2, T1 = 27°C = (27 + 273) K and T2 = ? E 300 = ⇒ (E / 2) T2 or
T2 = 150 K T2 = 150 − 273 = − 123° C
25 (d) Root mean square speed of molecules in a gas is defined as the square root of mean of the squares of the speed of different molecules, i.e.
vrms =
(v12 + v22 + L ) N
3RT M (according to kinetic theory of gases) while most probable speed is the speed which maximum number of molecules in a gas have at constant temperature and is given by vmp = 2RT / M or
vrms =
It is obvious that, vrms > vmp . Also, Maxwell distribution for the speed of molecules in a gas is asymmetrical.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
26 (a) We know that, rms speed is directly proportional to square root of temperature. vrms ∝ T Hence,
vrms (1) vrms (2)
⇒ ⇒
vrms (2)
27 + 273
=
227 + 273
=
500 × 400 300 = 1. 29 × 400 −1 = 516. 39 ms−1 ~ − 516 ms
vrms (2) = vs =
8.3 cal g mol −1K−1 4.2 CV = C p − R R=
8. 3 = 4.8 − = 2.824 4. 2 Also,
γ=
Cp CV
⇒ ⇒
vH = vN
⇒
7=
or ∴
27 (b) As we know, and
300 500
=
4.8 = 1.69 2.824
v1 = v2
MO3
32 = = 2: 3 48
3kT vrms = m
(given)
TH × 28 600 49 × 600 TH = = 1050 K 28
29 (c) When container is placed on fast moving train, then there is no effect on the random speed of molecules in the container, therefore temperature of the gas remains unchanged. 3RT M
MO2
defined as the square root of the mean of the squares of the random velocities of the individual molecules of a gas. Maxwell’s speed distribution law states that,
TH M × N MH TN
vrms =
=
31 (d) Root mean square velocity is
49 =
30 (d) As,
1 M
vrms ∝
(vrms )O 2
3RT M T1 M × 2 M 1 T2
TH × 28 2 × 300
⇒ (vrms )O 3
vrms =
28 (d) As,
Given, T1 = 27° C = (27 + 273) K, T2 = 227°C = (227 + 273) K, vrms(1) = 400 ms −1 and vs = vrms(2) = ? 400
3 3 v = vs = × 1150 γ 1.69 = 1532.19 ms−1
T1 T2
=
Since,
vrms ∝ T
⇒
vrms1
∴
vrms 2
=
4 = 1
⇒
T1 T2 T′ 273
(given)
T ′ = 4368 K = 4095° C
32 (b) We have, vH = vHe Thus,
M He 4 2 = = 1 1 MH vHe =
1 vH 2
Topic 3 Degrees of Freedom, Law of Equipartition of Energy and Specific Heat Capacity 2019 Cp 1 The value of γ = , for hydrogen, helium and another CV ideal diatomic gas X (whose molecules are not rigid but have an additional vibrational mode), are respectively equal to [NEET (Odisha)] 7 5 9 5 7 9 5 77 7 5 7 (b) , , (c) , (d) , , (a) , , 5 3 7 3 5 7 3 55 5 3 5 Cp 2 If 7 g N 2 is mixed with 20 g Ar, the of mixture will be CV [AIIMS] 17 11 17 17 (b) (c) (d) (a) 6 7 11 13
3 In an isobaric process, the work done by a di-atomic gas is 10 J, the heat given to the gas will be [AIIMS] (a) 35 J (b) 30 J (c) 45 J (d) 60 J 4 Assertion Vibrational degree of freedom of a di-atomic gas molecule appears at every high temperature. Reason Di-atomic gas has two vibrational degree of freedom in one direction. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct, but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
319
KINETIC THEORY OF GASES
2018 5 The volume (V ) of a monoatomic gas varies with its
2013 11 The amount of heat energy required to raise the
temperature (T ), as shown in the graph. The ratio of work done by the gas, to the heat absorbed by it, when it undergoes a change from state A to state B, is [NEET]
temperature of 1 g of helium at NTP, from T1 K to T2 K is 3 3 (a) N a k B (T2 − T1 ) (b) N a k B (T2 − T1 ) [NEET] 8 2 T2 3 3 (c) N a k B (T2 − T1 ) (d) N a k B ( ) 4 4 T1
V
A
12 The value of CV for O2 is T
O
(a) 1/3 (c) 2/5
2010
B
(b) 2/3 (d) 2/7
6 A gas consisting of a rigid di-atomic molecules was initially under standard condition. Then, gas was compressed adiabatically to one-fifth of its initial volume. What will be the mean kinetic energy of a rotating molecule in the final state? [AIIMS] (a) 1.44 J (b) 4.55 J (c) 787.98 × 10−23 J (d) 757.3 × 10−23 J
2017 7 Assertion The molecules of a monoatomic gas has three degrees of freedom. Reason The molecules of di-atomic gas has five degrees of freedom. [NEET] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
8 A gas mixture consists of 2 moles of O2 and 4 moles of Ar at temperature T. Neglecting all vibrational modes, the total internal energy of the system is [NEET] (a) 4 RT (b) 15 RT (c) 9 RT (d) 11 RT
2016 9 One mole of an ideal monoatomic gas undergoes a process
described by the equation pV 3 = constant. The heat capacity of the gas during this process is [NEET] 3 5 (b) R (c) 2R (d) R (a) R 2 2
2015 10 The ratio of the specific heats
Cp CV
= γ in terms of degrees
of freedom ( n ) is given by 1 n (b) 1 + (c) 1 + (a) 1 + n 3
[AIPMT]
2 n
(d) 1 +
n 2
5 R, with increase in 2
7 temperature, It becomes R due to [OJEE] 2 (a) translational motion (b) rotational motion (c) vibrational motion (d) None of these
13 10 mol of an ideal monatomic gas at 10° C is mixed with 20 mol of another monatomic gas at 20° C. Then, the temperature of the mixture is [DUMET] (a) 15.5° C (b) 15° C (c) 16° C (d) 16.6° C
2009 14 At ordinary temperature, the molecules of an ideal gas have only translational and rotational kinetic energies. At high temperatures they may also have vibrational energy. As a result of this at higher temperature, [UP CPMT] 3 (a) CV = R for a monoatomic gas 2 3 (b) CV > R for a monoatomic gas 2 5 (c) CV < R for a diatomic gas 2 5 (d) CV = R for a diatomic gas 2
2008 15 A given mass of a gas is compressed isothermally until its pressure is doubled. It is then allowed to expand adiabatically until its original volume is restored and its pressure is then found to be 0.75 of its initial pressure. The ratio of the specific heat of the gas is approximately [AFMC] (a) 1.20 (b) 1.41 (c) 1.67 (d) 1.83
16 If quantity of heat 1163.4 J supplied to one mole of nitrogen gas, at room temperature and at constant pressure, then the rise in temperature is [Kerala CEE] (a) 54 K (b) 28 K (c) 65 K (d) 8 K (e) 40 K 17 The molar specific heat at constant pressure of an ideal gas is (7/2)R. The ratio of specific heat at constant pressure to that at constant volume is [Haryana PMT] (a) 7/5 (b) 8/7 (c) 5/7 (d) 9/7
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
18 For a gas molecule with 6 degrees of freedom, the law of equipartition of energy gives the following relation between the molecular specific heat (CV ) and gas constant ( R ) [J&K CET] (a) CV = R / 2 (b) CV = R (c) CV = 2R (d) CV = 3 R 19 For an ideal gas [J&K CET] (b) C p is equal to CV (a) C p is less than CV (c) C p is greater than CV (d) C p = CV = 0 20 If γ is the ratio of specific heats and R is the universal gas constant, then the molar specific heat at constant volume [KCET] CV is given by ( γ − 1) R (a) γ R (b) γ γR R (d) (c) γ −1 γ −1
23 The gases carbon monoxide (CO) and nitrogen at the same temperature have kinetic energies E1 and E 2 , respectively. Then, [MHT CET] (a) E1 = E 2 (b) E1 > E 2 (c) E1 < E 2 (d) None of these
2006 24 For monoatomic gas which is correct ? 3 (a) CV = R 5 (c) C p − CV = 2R
2005 25 Two cylinders fitted with pistons contain equal amounts of an ideal diatomic gas at 300 K. The piston of A is free to move, while that of B is held fixed. The same amount of heat is given to the gas in each cylinder. If the rise in temperature of gas in A is 30 K, then rise in temperature of gas in B is [AMU] (a) 30 K (b) 18 K (c) 50 K (d) 42 K
21 How much heat energy in joules must be supplied to 14 g of nitrogen at room temperature to raise its temperature by 40° C at constant pressure? (Molecular weight of [EAMCET] N2 = 28 g and R = constant) (a) 50 R (b) 60 R (c) 70 R (d) 80 R
26 Two perfect gases at absolute temperatures T1 and T2 are mixed. There is no loss of energy. The temperature of mixture of masses of molecules are m1 and m2 and the number of molecules in the gases are n1 and n 2 respectively, is [Haryana PMT] T1 + T2 n1T1 + n 2T2 (a) (b) n1 + n 2 2 n1T2 + n 2T1 (d) T1T2 / n1 n 2 (c) n1 + n 2
2007 22 If 310 J of heat is required to raise the temperature of 2 moles of an ideal gas at constant pressure from 25°C to 35°C. The amount of heat required to raise the temperature of the gas through the same range at constant volume is [KCET] (a) 384 J (b) 144 J (c) 276 J (d) 452 J
1 (a) 11 (a) 21 (c)
2 (c) 12 (c) 22 (b)
3 (a) 13 (d) 23 (a)
4 (b) 14 (a) 24 (b)
5 (c) 15 (b) 25 (d)
[JCECE]
5 (b) C p = R 2 Cp 3 (d) = CV 5
6 (c) 16 (e) 26 (b)
7 (b) 17 (a)
8 (d) 18 (d)
9 (d) 19 (c)
10 (c) 20 (c)
Explanations 1 (a) The Poisson’s ratio, γ=
Cp CV
…(i)
where, C p = molar heat capacity constant pressure and CV = molar heat capacity at constant volume Also, C p = CV + R (from Mayer’s relation) f CV = R 2
where, f = degree of freedom. f C p = + 1 R ⇒ 2 So, Eq. (i) becomes, 2 ⇒ γ =1+ f For hydrogen gas, which is diatomic, the degree of freedom is 5 (3 translational, 2 rotational). 2 7 ∴ γ =1+ = 5 5
For helium gas, which is monoatomic, the degree of freedom is 3 (3 translational only). 2 5 ∴ γ =1+ = 3 3 The diatomic gas X also have vibrational motion, so degree of freedom is 7 (3 translational, 2 rotational and 2 vibrational). 2 9 γ =1+ = ∴ 7 7
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KINETIC THEORY OF GASES
2 (c) For N 2 gas, degree of freedom [for di-atomic gas] 5 f ∴ CV1 = ⋅ R = R 2 2 7 and C p1 = CV1 + R = R 2 Amount of N 2 gas, m1 = 7 g ∴ Number of moles of N 2 , 7 m n1 = 1 = 28 28 1 n1 = 4 For Ar gas, degree of freedom, f = 3 3 ∴ CV2 = R 2 ∴ C p 2 = CV2 + R 3 5 = R + R= R 2 2 Amount of Ar gas, m2 = 20 g ∴ Number of moles of Ar gas, m 20 1 n2 = 2 = = 40 40 2 n1C p1 + n2Cp2 ∴ (C p )mix = n1 + n2 1 7 1 5 × R+ × R 4 2 2 2 = 1 1 + 4 2 17R = 6 n1CV1 + n2CV2 (CV )mix = n1 + n2 1 5 1 3 × R+ × R 4 2 2 2 = 1 1 + 4 2 11R = 6 17R Cp 17 = γmix = 6 = ∴ 11R 11 CV mix 6
3 (a) Given, for isobaric process, Work done by a di-atomic gas By ideal gas equation, at constant pressure, …(i) p ∆V = nR∆T ∴Work done, W = p ∆V …(ii) W = nR ∆T
At constant pressure, heat given to gas is given by …(iii) Q = nC p ∆T where, C p = specific heat at constant pressure. From Eqs. (ii) and (iii), we get R W nR ∆T = = Q nC p ∆T C p R ( f + 2 )R 2 ( f + 2) R Q Cp = 2 W 2 = Q f +2 [Q W = 10 J (given)] =
Substituting the value of C p in Eq. (ii), we get 5 ∆Q = n R (TB − TA ) 2 Hence,
[For di-atomic gas, f = 5] Q = 35 J
freedom of di-atomic gas molecules at high temperature. Hence, vibrational degree of freedom of a di-atomic gas molecule appears at every high temperature because vibration in gas molecules is directly proportional to the square root of its temperature. Hence, both Assertion and Reason are correct but Reason is not the correct explanation of Assertion.
5 (c) According to the given graph, volume (V ) ∝ temperature (T ) V or = constant T
7 5 At standard condition, T = 27° C = 300 K For adiabatic process, T1V1γ − 1 = T2V2γ − 1 7 −1 (300)V15
A
VA TB
T
Thus, the process is isobaric. ∴ Work done, ∆W = p∆V
= nR∆T = nR (TB − T A ) …(i)
Heat absorbed,
∆Q = nC p ∆T = nC p (TB − T A ) As, C p =
=
−1
(given)
300 × V12/ 5 2
1 V15 × 5 300 −2 55
2/ 5
= 300 × 52/ 5
= 300 × 1.903 = 571 Mean kinetic energy of rotating molecules = kT = 138 . × 10−23 × 571
7 (b) A monoatomic gas molecules like
B
TA
⇒ T2 =
7
V 5 = T2 1 5
= 787.98 × 10−23 J
V
O
nR (TB − TA ) 2 = 5 5 n R (TB − TA ) 2
6 (c) For di-atomic gas, γ = 14 . =
4 (b) There are two vibrational degree of
VB
∆W = ∆Q
TV γ − 1 = constant
10 2 = Q 5+ 2 ⇒
For a monoatomic gas, f = 3 3 5 ⇒ C p = R + R = R 2 2
…(ii)
2 γR , where, γ = 1 + f γ −1
He consists of single atom. It can have translational motion in any direction in space. Thus, it has three translational degree of freedom f = 3 (all translational). It can also rotate but due to its small moment of inertia rotational kinetic energy is neglected. The molecules of a diatomic gas (like O2 , CO2 , H2 ) cannot only move body, but also rotate about any one of the three coordinates. Hence, it can have two rotational degree of freedom. Thus, a diatomic molecule has 5 degree of freedom i.e. 3 translational and 2 rotational.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Hence, internal energy (∆U = nCV ∆T ) increases. With the increase in internal energy, the atoms within the molecule may also vibrate with respect to each other. In such cases, the molecule will have an additional degree of freedom due to their vibrational motion.
8 (d) Total internal energy of system
= Internal energy of oxygen molecules + Internal energy of argon molecules f f = 1 n1RT + 2 n2RT 2 2 5 3 = × 2RT + × 4 RT 2 2 = 11RT
13 (d) Temperature of the mixture is given by
9 (d) As we know that, for polytropic
T =
process of index α,
Specific heat capacity, CV +
R 1−α
α=3
∴
C = CV +
fR R R + = 2 1− 3 1−α
For monoatomic gas, f = 3 3R R − =R ⇒ C = 2 2 volume in terms of degree of freedom n is n CV = R 2 Also, C p − CV = R n n So, C p = R + R = R 1 + 2 2 n R 1 + Cp 2 Now, γ = = 1 + = n CV R 2
∴ Rise in temperature, ∆T = 40 K 17 (a) Molar specific heat at constant 7 pressure, C p = R 2
14 (a) The degree of freedom for
10 (c) The specific heat of gas at constant
2 n
11 (a) We know that, f f m nR∆T = k B N a ∆T 2 2M R where, k B = N a where, f = degree of freedom. Amount of heat required, 3 1 Q = × × k B N a ∆T 2 4 Q f = 3, m = given mass = 1g and M = molecular mass = 4 (for He) 3 = k B N a (T2 − T1 ) 8 where, k B is Boltzmann constant and N a is Avogadro’s number. Q=
12 (c) Oxygen is a di-atomic gas and hence has 5 degrees of freedom 3 translational and 2 rotational. As the heat is given to oxygen CV 5R 7R increases from to . 2 2
15
diatomic gas and polyatomic at room temperature is f but at higher temperature their degree of freedom are increased by one due to vibrational motion of molecule. But for monoatomic gas it is constant. Hence, for monoatomic gas 3 CV = R 2 where, CV = molar heat capacity at constant volume. (b) In isothermal process, temperature of the gas remains constant, so the gas obeys Boyle’s law. 1 i.e. p∝ V p2 V1 ⇒ = p1 V2 ⇒
2 p V1 = p V2
∴
V1 =2 V2
…(i)
Now, the gas is expanded adiabatically, so pV γ = constant p1 V2 = p2 V1 ⇒
2p 1 = 0.75 p 2
temperature and at constant pressure. Q = nC p ∆T Given, Q = 1163.4 J 7 ⇒ 1163.4 = 1 × R × ∆T 2 7 (Q C p = R for diatomic gas) 2 2 × 1163.4 ⇒ ∆T = 7 × 8. 31 (Q R = 8.31 J mol −1K−1 )
Given, n1 = 10 mol, n2 = 20 mol, T1 = 10° C and T2 = 20° C 10 × 10 + 20 × 20 = 10 + 20 500 = ≈ 16.6° C 30
Q Process, pV 3 = constant ⇒
n1T1 + n2T2 n1 + n2
16 (e) Heat given to the gas at room
γ
γ
Taking log on both sides, we get 8 log = − γ log 2 3 ⇒ log 8 − log 3 = − γ log 2 ∴ γ = − 1.41 Hence, the ratio of specific heat of gas is 1.41 involve.
Mayer’s relation can be written as C p − CV = R ⇒ CV = C p − R 7 5 = R−R= R 2 2 Hence, required ratio is 7 R C p 2 7 γ= = = CV 5 5 R 2
18 (d) Specific heat at constant volume (CV ) and degree of freedom ( f ) are related as f CV = R Q 2 6 (given) CV = R 2 ⇒ CV = 3R 1 1 19 (c) From CV = f R = × 6R = 3R 2 2 (for polyatomic gas) and C p − CV = R C p = R + 3R = 4 R Hence, C p is always greater than CV i.e. C p > CV
20 (c) From the Mayer’s formula, C p − CV = R Cp Also, γ= CV
…(i)
⇒
…(ii)
γCV = C p
On substituting Eq. (ii) in Eq. (i), we get γCV − CV = R CV (γ − 1) = R R ⇒ CV = γ −1
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KINETIC THEORY OF GASES
21 (c) Heat supplied at constant pressure, Q = nC p ∆T
22
Given, ∆T = 40° C 7 C p = R (for diatomic gases) 2 14 1 Number of moles, n = = 28 2 1 7 Q = × R × 40 = 70R ⇒ 2 2 (b) At constant pressure, heat required = nC p ∆T Given, n = 2, heat required = 310 J, ∆T = T2 − T1 = (35 − 25) °C ⇒ 310 = 2 × C p × (35 − 25) 310 Cp = = 15.5 J mol −1 K−1 ⇒ 20 Similarly, at constant volume, heat required = nCV ∆T = 2(C p − R ) × (35 − 25) (Q C p − CV = R ) = 2 × (15. 5 − 8.3) × 10 = 2 × 7. 2 × 10 = 144 J
23 (a) The gases carbon monoxide (CO) and nitrogen (N 2) are diatomic, so both 5 have equal kinetic energy kT , i.e. 2 E1 = E2
24 (b) Specific heat at constant volume, f R 2 and specific heat at constant pressure, f C p = + 1 R 2 CV =
For monatomic gas, f = 3 3 CV = R ∴ 2 5 3 and C p = + 1 R = R 2 2 From Mayer’s formula, C p − CV = R 5 3 R− R=R ∴ 2 2 Cp 5/ 2 5 and γ= = = CV 3 / 2 3
25 (d) In cylinder A, heat is supplied at constant pressure while in cylinder B heat is supplied at constant volume. …(i) ∴ (∆Q )A = nC p (∆T )A and
(∆Q )B = nCV (∆T )B
…(ii)
Given, (∆Q )A = (∆Q )B Cp ∴ (∆T )B = (∆T )A CV = 1.4 × 30 Cp = 1.4 for di-atomic gas Q CV = 42.0 K 3 26 (b) We know that, E = nkT 2 where, k = Boltzmann’s constant. 3 3 3 ∴ n1kT1 + n2kT2 = (n1 + n2 ) kT 2 2 2 n1T1 + n2T2 ⇒ T = (n1 + n2 )
13 Oscillations Quick Review Periodic Motion A motion which repeats itself over and over again after a regular interval of time is called a periodic motion. e.g., revolution of planets around the sun, rotation of the earth about its polar axis etc. The function which are used to represent periodic motion are called periodic functions. One of the simplest periodic function is given by f ( t ) = A cos ωt
Oscillatory Motion A motion in which a body moves back and forth repeatedly about a fixed point (called mean position) is called oscillatory or vibratory motion.
Simple Harmonic Motion Simple Harmonic Motion (SHM) is that type of oscillatory motion in which the particle moves to and fro about a fixed point under a restoring force whose magnitude is directly proportional to its displacement and directed towards mean position, i.e. F ∝ − y or F = − ky where, k is a positive constant called force constant or spring factor. • Mathematically a SHM can be expressed as 2π y = A sin ωt = A sin t T 2π or y = A cos ωt = A cos t T where, y = displacement from mean position at time t, A = amplitude or maximum displacement, ω = angular frequency and T = time period.
• If initial phase is φ, then displacement in SHM is
y = A sin(ωt + φ ) and
y = A cos(ωt + φ ).
Velocity in SHM The velocity of particle executing SHM is defined as the time rate of change of its displacement at particular instant. v = ω A 2 − y2 • When the particle is at the mean position i.e., x = 0,
then its velocity is maximum. (maximum velocity) ∴ v max = ωA
• When the particle is at the extreme position,
i.e., x = ± A, then its velocity is zero. A2 − A2 = 0
v=ω
Therefore, the velocity of a particle executing SHM is zero at the either of its extreme positions.
Acceleration in SHM The acceleration of SHM at an instant is defined as the time rate of change of velocity at that instant. a = −ω2 y • When the particle is at the mean position i.e., x = 0,
then acceleration is zero. (minimum acceleration) ∴ a mean position = 0
• When the particle is at the extreme position i.e.,
x = A , then acceleration is maximum.
∴ a (extreme position) = − ω 2 A (maximum acceleration)
325
OSCILLATIONS
Displacement, Velocity and Acceleration of a Body Executing SHM Velocity v (t ) = − ω A sin ωt
y
t
0 T
Sinusoidal in nature, y varies from − A to A. It has zero phase difference.
y
+ω A t
0 –ωA
Sinusoidal in nature, v (t ) varies from − ωA to ωA. π It has a phase difference of w.r.t. y (t ) 2
Force Law in SHM
2
Restoring force, F = − mω y = − ky here,
ω=
k m
Q
ω=
2π = T
∴ Time period, T = 2π
T = 2π
k m
m inertia factor = 2π k spring factor displacement acceleration
• If a particle of mass m executes SHM, then at a
•
–ω A
Sinusoidal in nature, a (t ) varies from − ω 2 A to ω 2 A. It has a phase difference of π w.r.t. y (t ).
System Executing SHM A spring block system and simple pendulum come under SHM.
Simple Pendulum
Energy in SHM
•
t
0 2
kinetic energy is twice as that of displacement or velocity or acceleration.
A simple pendulum, in practice, consists of a heavy but small sized metallic bob suspended by a light, inextensible and flexible string. The motion of a simple pendulum is simple harmonic whose time period and frequency are given by
For linear SHM,
•
+ ω2A
• The frequency of oscillation of potential energy and
It states that simple harmonic motion is the motion executed by a particle subjected to a force, which is proportional to the displacement of the particle and is always directed towards the mean position.
•
Acceleration
+A
–A
Acceleration a (t ) = − ω 2 A cos ωt
v
Velocity
Displacement
Displacement y (t ) = A cos ωt
displacement y from mean position, the particle possesses potential and kinetic energy. At any displacement y, 1 1 2 (i) Potential energy, U = mω 2 y 2 = ky 2 2 (ii) Kinetic energy, 1 1 K = mω 2 ( A 2 − y 2 ) = k ( A 2 − y 2 ) 2 2 (iii) Total energy, 1 E = U+ K= mω 2 A 2 = 2π 2 mν 2 A 2 2 At mean position, kinetic energy is maximum and potential energy is zero. At extreme position, potential energy is maximum and kinetic energy is zero. The time period of potential and kinetic energies is T / 2.
T = 2π
l 1 and ν = g 2π
g l
• If a pendulum of length l at temperature θ° C has a time
period T, then on increasing the temperature by ∆θ°C its time period changes to T × ∆T . ∆T 1 where, = α ⋅ ∆θ T 2
• If the length of a simple pendulum is increased to such an
extent that l → ∞, i.e., l >> R , then its time period is T = 2π R / g = 84.6 min where,
R = radius of the earth.
Spring Mass System If the mass is once pulled so as to stretch the spring and released, the spring pendulum oscillates simple harmonically having time period and frequency. T = 2π Angular frequency, ω =
m 1 and ν = k 2π k m
k m
326
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
The mechanical energy E of the oscillator is given by 1 E (t ) = kA 2 e − bt/m 2 Time period of the oscillations of spring-mass system are shown in following table Various Cases (i)
Spring is light
Important Points Regarding Spring Block System (i) If the length of the spring is made n times, then the effective force constant becomes 1/ n times and the time period becomes n times. (ii) If a spring of spring constant k is divided into n equal parts, then the spring constant of each part 1 times. becomes nk and time period becomes n (iii) The force constant of a stiffer spring is higher than that of a soft spring.
Figures T = 2π
m k
m m m x = 0 (mean) position
(ii) Spring is not light but has mass ms
1 m + ms 3 T = 2π k
M
Simple Harmonic Motion in Special Cases
M
The time period of SHM due to the motion of incompressible and non-viscous liquid in U-tube is given as h T = 2π g
m
m
(iii) Spring connected µ with two masses T = 2π k (m1 and m2 ) (iv) Springs with spring constants (k 1 and k 2 ) connected in series
where, h = height of undisturbed liquid in each limb and L = 2h = total length of liquid column. • The time period of a ball performing SHM in hemispherical bowl is expressed as
m2
m1 k
T = 2π
m T = 2π ks m(k 1 + k 2 ) = 2π k 1k 2
k1 k2
k1
R−r g
where, R and r are radii of bowl and ball. • The time period of a ball executing SHM in a
m k2
tunnel through the earth is expressed as T = 2π
m
R g
where, R = radius of earth. (v) Spring connected in parallel
m T = 2π kp = 2π
• The time period of an elastic wire executing k1
m k1 + k2
k1
k2
∆l SHM, due to the restoring force F = − AY is l expressed as
m m
T = 2π
k2
and where, µ =
m1 m2 k k = reduced mass of the system, k s = 1 2 m1 + m2 k1 + k 2
and k p = k1 + k 2 .
k=
ml AY
YA l
where, Y = Young’s modulus, l = length of wire, ∆l = elongation and A = area of cross-section.
327
OSCILLATIONS
Undamped and Damped Oscillations When a simple harmonic system oscillates with a constant amplitude which does not change with time, its oscillations are called undamped oscillations. When a simple harmonic system oscillates with a decreasing amplitude with time, its oscillations are called damped oscillations.
Undamped oscillation
Damped oscillation
Amplitude of damped oscillations A = A 0 e − γ t Energy of damped oscillations E = E 0 e −2γt where, γ = damping coefficient =
b , where m is the mass of body 2m
undergoing damped oscillations. Damping force Fd = − bv where, b = damped constant and v = velocity of oscillation. Equation of damped oscillation m
d2 y 2
+b
dy + ky = 0 dt
dt Displacement of damped oscillations y = y m e − bt / 2m sin (ω ′ t + φ ) where, ω′ = angular frequency of damped oscillations
Free and Forced Oscillations A body capable of oscillating is said to be executing free oscillations, if it vibrates with its own natural frequency without the help of any external periodic force. When a body oscillates with the help of an external periodic force with a frequency different from the natural frequency of the body, these oscillations are called forced oscillations.
Resonance When a body oscillates with its own natural frequency ν 0 , with the help of an external periodic force whose frequency ν d is equal to the natural frequency of the body, the oscillations of the body are called resonance. Condition for resonance, ν 0 = ν d .
Superposition of SHM A simple harmonic motion is produced when a force (called restoring force) proportional to the displacement acts on a particle. If a particle is acted upon by two such forces, the resultant motion of the particle is a combination of two simple harmonic motions. Suppose the two individual motions are represented by y1 = A1 sin ωt y 2 = A 2 sin (ωt + φ ) Both the simple harmonic motions have same angular frequency ω. and
Resultant amplitude is expressed as
= ω 20 − ( b / 2m ) 2
A = a12 + a 22 + 2a1 a 2 cos φ
Topical Practice Questions All the exam questions of this chapter have been divided into 5 topics as listed below Topic 1
—
DISPLACEMENT AND PHASE IN SHM
328–331
Topic 2
—
VELOCITY, ACCELERATION AND ENERGY OF SHM
332–339
Topic 3
—
TIME PERIOD AND FREQUENCY
339–344
Topic 4
—
SYSTEM EXECUTING SHM (SIMPLE PENDULUM AND SPRING MASS SYSTEM)
345–355
Topic 5
—
FREE, DAMPED, FORCED OSCILLATIONS & RESONANCE AND SUPERPOSITION OF SHM
356–357
Topic 1 Displacement and Phase in SHM 2019 1 The distance covered by a particle undergoing SHM in one time period is (amplitude = A) (a) zero (b) A (c) 2A
[NEET (Odisha)]
(d) 4A
2 The displacement of a particle executing simple harmonic motion is given by y = A 0 + A sin ωt + B cos ωt [NEET] Then, the amplitude of its oscillation is given by (a)
2
A +B
(c) A + B
2
(b)
A 02
+ (A + B)
2
(d) A 0 + A 2 + B 2
2017 3 The displacement of a particle along the X-axis is given
by x = a sin 2 ωt. The motion of the particle corresponds to (a) simple harmonic motion of frequency ω / π [JIPMER] (b) simple harmonic motion of frequency 3ω/ 2π (c) non-simple harmonic motion (d) simple harmonic motion of frequency ω / 2π
2014 4 A body oscillates with SHM according to the equation
π (in SI unit), x = 5 cos 2πt + . Its instantaneous 4 displacement at t = 1s is [Kerala CEE] 2 1 1 1 (b) (c) (d) m (a) m m m 5 2 3 2 5 (e) m 2
5 Estimate the time taken by the oscillating pendulum to shift from x = 0 to A/ 2, where A is the amplitude. [WB JEE] T T T T (a) (b) (c) (d) 4 12 2 16 6 Two pendulums have time period T and 5T / 4. They start SHM at the same time from the mean position. What will be the phase difference between them after the bigger pendulum completed one oscillation? [UP CPMT] (a) 45° (b) 90° (c) 60° (d) 30° 7 The amplitude of a particle executing SHM is 4 cm. At the mean position, the speed of the particle is 16 cm/s. The distance of the particle from the mean position at which the speed of the particle becomes 8 3 cm /s will be (a) 2 3 cm (c) 1cm
(b) 3 cm (d) 2 cm
[AFMC]
8 What is the phase difference between two simple π harmonic motions represented by x1 = A sin ωt + 6 and x 2 = A cos ωt ? [WB JEE] π π π 2π (b) (c) (d) (a) 6 3 2 3
2011 9 Out of the following functions representing motion of a particle which represents SHM I. y = sin ωt − cos ωt II. y = sin 3 ωt
[CBSE AIPMT]
3π III. y = 5 cos − 3 ωt 4 IV. y = 1 + ωt + ω 2 t 2 (a) Only IV does not represent SHM (b) I and III (c) I and II (d) Only I
10 The motion which is not simple harmonic is [Kerala CEE] (a) vertical oscillations of a spring (b) motion of simple pendulum (c) motion of a planet around the sun (d) oscillation of liquid column in a U-tube (e) vertical oscillation of a wooden plank floating in a liquid 11 The amplitude and the time period in a SHM is 0.5 cm and 0.4 s respectively. If the initial phase is π/2 rad, then the equation of SHM will be [MHT CET] (a) y = 0.5sin 5πt (b) y = 0.5sin 4πt (c) y = 0.5sin 2.5πt (d) y = 0.5cos 5πt 12 x ( t ) = A cos (ωt + φ ) is the equation of simple harmonic motion. In this equation, φ is called [J&K CET] (a) phase constant (b) frequency (c) amplitude (d) displacement 13 A particle executing a simple harmonic motion has a period of 6 s. The time taken by the particle to move from the mean position to half the amplitude, starting from the mean position is [KCET] 3 1 (a) s (b) s 2 2 3 1 (c) s (d) s 4 4
329
OSCILLATIONS
2010 14 Two simple harmonic motions are represented by y1 = 5[sin 2πt + 3 cos 2πt ] π and y 2 = 5sin 2πt + 4 The ratio of their amplitudes is (a) 1: 1 (b) 2 : 1 (c) 1: 3
[KCET]
(d) 3 : 1
15 Two simple harmonic motions A and B are given respectively by the following equations [CG PMT] π y1 = a sin ωt + , 6 3 π y 2 = a sin ωt + 6 The phase difference between the waves is π π π (b) (c) (d) zero (a) 2 6 3
2009 16 A block is resting on a piston which is moving vertically with SHM of period 1 s. At what amplitude of motion, will the block and piston separate? [UP CPMT] (a) 0.2 m (b) 0.25 m (c) 0.3 m (d) 0.35 m
17 The phase difference between the instantaneous velocity and acceleration of a particle executing simple harmonic motion is [AIIMS] (a) 0. 5 π (b) π (c) 0.707 π (d) zero 18 The displacement equation of a simple harmonic oscillator is given by [MHT CET] y = A sin ωt − B cos ωt The amplitude of the oscillator will be (a) A − B (b) A + B (c)
A2 + B2
(d) ( A 2 + B 2 )
2006 19 The motion of a particle varies with time according to the relation
y = a(sin ωt + cos ωt ) (a) the motion is oscillatory but not SHM (b) the motion is SHM with amplitude a (c) the motion is SHM with amplitude a 2 (d) the motion is SHM with amplitude 2a
[BHU]
20 Two particles execute SHM of the same amplitude and frequency along the same straight line. If they pass one another when going in opposite directions, each time their displacement is half their amplitude, the phase difference between them is [MHT CET] π π (a) (b) 3 4 π 2π (c) (d) 6 3 21 A particle executes SHM, its time period is 16 s. If it passes through the centre of oscillation, then its velocity is [AMU] 2 ms −1 at time 2 s. The amplitude will be (a) 7.2 m (b) 4 cm (c) 6 cm (d) 0.72 cm
2005 22 Which of the following functions represent a simple harmonic oscillation? (a) sin ωt − cos ωt (c) sin ωt + sin 2ωt
[AIIMS] 2
(b) sin ωt (d) sin ωt − sin 2ωt
23 The displacement of a particle performing simple harmonic motion is given by x = 8sin ωt + 6cos ωt , where distance is in cm and time is in second. The amplitude of motion is (a) 10 cm (b) 2 cm [MHT CET] (c) 14 cm (d) 3.5 cm 24 The minimum phase difference between two simple harmonic oscillations, [MHT CET] y1 = (1/ 2)sin ωt + ( 3 / 2)cos ωt, y 2 = sin ωt + cos ωt is π 7π π π (d) (a) (b) (c) − 6 12 12 6 25 Which of the following is not characteristic of simple harmonic oscillation? [Kerala CEE] (a) The motion is periodic (b) The motion is along straight line about the mean position (c) The acceleration of the particle is directed towards the extreme positions (d) The oscillations are responsible for the energy transportation m (e) The period is given by T = 2π , where the symbols k have usual meaning
Answers 1 (d)
2 (a)
3 (c)
4 (e)
5 (b)
6 (b)
7 (d)
8 (b)
9 (b)
10 (c)
11 (d)
12 (a)
13 (b)
14 (b)
15 (c)
16 (b)
17 (a)
18 (c)
19 (c)
20 (d)
21 (a)
22 (a)
23 (a)
24 (b)
25 (c)
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (d) In a simple harmonic motion (SHM) the particle oscillates about its mean position on a straight line. The particle moves from its mean position (O) to an extreme position (P ) and then return to its mean position covering same distance of A. Then by the conservative force, it is moved in opposite direction to a point Q by distance A and then back to mean position covering a distance of A. This comprises of one time period as shown below O
P
Q A extreme position
A
mean extreme position position In one time period
Hence, in one time period it covers a distance of x = OP + PO + OQ + QO = A + A + A + A = 4A
2 (a) The displacement of given particle is y = A0 + A sin ωt + B cosωt … (i) The general equation of SHM can be given as … (ii) x = a sin ωt + b cosωt So, from Eqs. (i) and (ii), we can say that A0 be the value of mean position, at which y = 0. ∴Amplitude, R=
A 2 + B 2 + 2 AB cosθ
As two function sine and cosine have phase shift to 90°. ∴
R=
A2 + B2
[Q cos 90° = 0 ]
d 2x = −ω 2x dt 2 According question, x = a sin 2 ωt Differentiating w.r.t t, dx = 2aω sin ωt cosωt dt = aω 2sin ωt cosωt = aω sin 2ωt Again differentiating w.r.t t,
3 (c) For a SHM,
...(i)
d 2x = 2aω 2 cos 2ωt dt 2 d 2x or = 2aω 2(1 − 2 sin 2 ωt) dt 2 d 2x ⇒ = 2aω 2 − 4 aω 2 sin 2 ωt dt 2 ...(ii) = 2aω 2 − 4ω 2x From Eqs. (i) and (ii), the motion of particle is non-simple harmonic motion. π 4 (e) Given, x = 5 cos 2πt + 4 (where, x is a displacement) π x = 5 cos 2π + (at t = 1 s) ⇒ 4 [Q cos (360° + θ ) = cos θ ] π 1 ⇒ x = 5 cos ⇒ x=5× 4 2 5 ∴ m x= 2
5 (b) Initial position at t = 0 is x = 0 The equation of SHM, x = A sinωt A When, x= 2 A = A sinωt 2 1 π ⇒ sin ωt = = sin 2 6 π ωt = 6 π π ×T t= = 6ω 6 × 2π T ⇒ t= 12
π 8 (b) Given, x1 = A sin ωt +
and ∴
7 (d) At mean position, velocity is maximum vmax = ωa v 16 ⇒ ω = max = =4 a 4 2
2
∴
v =ω a − y
⇒
8 3 = 4 4 2 − y2 192 = 16(16 − y2 )
⇒
12 = 16 − y2
⇒
y = 2 cm
x2 = A cos ωt π x2 = A sin ωt + 2
Phase difference, ∆φ = φ 2 − φ 1 π π ∆φ = − ⇒ 2 6 3π − π π ⇒ ∆φ = = 6 3
9 (b) For a simple harmonic motion, d2 y ∝− y dt 2 Hence, equation y = sin ωt − cosωt 3π and y = 5 cos − 3ωt 4 are satisfying this condition but equation y = 1 + ωt + ω 2t 2 is not periodic and y = sin 3 ωt is periodic but not SHM.
10 (c) The motion of planets around the sun is periodic but not simple harmonic motion. Simple harmonic motion is a special simplified case that assumes some effect that restores thing to middle position.
11 (d) y = a sin (ωt + φ )
⇒
6 (b) When bigger pendulum of time period (5T /4 ) completes one vibration, the smaller pendulum will complete (5/ 4 ) vibrations. It means the smaller pendulum will be leading, the bigger pendulum by phase corresponding to T /4 sec = π /2 rad = 90°.
6
2π = a sin t + φ T π 2π y = 0.5 sin t+ 0.4 2 π y = 0.5 sin 5πt + s 2 = 0.5 cos 5πt
12 (a) Given, x (t ) = A cos (ωt + φ ) where, φ is the phase constant. whereas x (t ), A and ω represent instantaneous displacement, amplitude and angular velocity respectively.
13 (b) Equation for simple harmonic motion, 2π y = a sin t T ⇒ ⇒
a 2π = a sin t T 2 2π π t= T 6
⇒ t=
Q y =
a 2
6 1 T = = s 12 12 2
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OSCILLATIONS
14 (b) Given, y1 = 5[sin 2πt + 3 cos 2πt ] 1 3 = 10 sin 2πt + cos 2πt 2 2 π π = 10 cos sin 2πt + sin cos 2πt 3 3 π = 10 sin 2πt + 3 ⇒ A 1 = 10 unit π Similarly, y2 = 5 sin 2πt + 4 ⇒ Hence,
A2 = 5 unit A 1 10 2 = = A2 5 1
15 (c) Phase difference, ∆φ = φ 1 − φ 2 3π π 2π π = − ⇒ = = 6 6 6 3
16 (b) When maximum force just exceeds the weight of the body, then weight kept on the system will separate from the piston ∴ mg = mω 2 y g y= 2 [Qamax =ω 2 y ] ⇒ ω Given, g = 9.8 ms−2 , ω = 2π 9.8 ⇒ y= = 0.25 m (2π )2
a0
y = A sin ωt − B cosωt Let, A = a cosθ and B = a sinθ So, A 2 + B 2 = a2 ⇒
a=
Then, y = a cosθ sin ωt − a sin θ cosωt y = a sin(ωt − θ ) which is the equation of simple harmonic oscillator. The amplitude of the oscillator, a=
A2 + B2.
19 (c) The equation of particle varying
t
This is the equation of simple harmonic motion with amplitude a 2.
(i) t (ii)
(iii)
20 (d) Equation of simple harmonic wave x = a cos (ωt + φ )
…(i)
Velocity, dx …(ii) v= = − aω sin (ωt + φ ) dt Acceleration, dv A= = − aω 2 cos (ωt + φ ) …(iii) dt
is y = A sin (ωt + φ ) A Here, y= 2
21 (a) Given, v = 2 m /s, T = 16 s and t = 2 s As the velocity, v = A ω cos ωt 2π 2π 2π ⇒ 2 = A⋅ ⋅ cos ⋅ 2 Qω = 16 16 T ⇒ A=
δ = ωt + φ =
16 2 = 7.2 m π
22 (a) Let y = sin ωt − cosωt
⇒
dy = ω cosωt + ω sin ωt dt d2 y = − ω 2 sin ωt + ω 2 cosωt dt 2 a = − ω 2 (sin ωt − cosωt )
⇒
a = − ω2 y ⇒ a ∝ − y
Thus, it is a simple harmonic motion. This condition does not satisfied with other functions.
23 (a) Here, x = 8 sin ωt + 6 cosωt So, a1 = 8 cm and a2 = 6 cm ∴ Amplitude of motion, A= ⇒
A12 + A22 = 82 + 62
A = 64 + 36 = 100 = 10 cm 1 3 cosωt 2 2 π π = cos sin ωt + sin cosωt 3 3 π y1 = sin ωt + 3
24 (b) Here, y1 = sin ωt +
∴
Similarly,
π y2 = 2 sin ωt + 4
∴ Phase difference, ∆φ = φ 1 − φ 2 =
A ∴ A sin (ωt + φ ) = 2 So,
So, the phase difference of the two particles when they are crossing each A other at y = in opposite directions 2 are δ = δ1 − δ2 5π π 2π = − = 6 6 3
A2 + B2
t
particle executing SHM is
v0
18 (c) Displacement equation,
with time is y = a (sin ωt + cosωt ) 1 1 sin ωt + cosωt ⇒ y = a 2 2 2 π π ⇒ y = a 2 cos sin ωt + sin cosωt 4 4 π …(i) ⇒ y = a 2 sin ωt + 4
17 (a) The displacement equation of
x
Fig. (i) is a plot of Eq. (i) with φ = 0. Fig. (ii) shows Eq. (ii) also with φ = 0. Fig. (iii) is a plot of Eq. (iii). It should be noted that in the figures the curve of v is shifted (to the left) from the curve 1 of x by one-quarter period T . 4 Similarly, the acceleration curve of A 1 is shifted (to the left) by T relative to 4 the velocity curve of v. This implies that velocity is 90°, i.e. 0.5 π out of phase with the displacement and the acceleration is 90° (0.5π ) out of phase with the velocity but 180°(π ) out of phase with displacement.
5π π or 6 6
π π π − = 3 4 12
25 (c) The acceleration of a particle executing SHM is always directed towards the mean position.
Topic 2 Velocity, Acceleration and Energy of SHM 2019 1 Average velocity of a particle executing SHM in one complete vibration is Aω 2 (a)Aω (b) 2
[NEET]
(c) zero
(d)
Aω 2
2018 2 A particle doing SHM having amplitude 5cm, mass 0.5 kg and angular frequency 5 rad/s is at 1cm from mean position. Find potential energy and kinetic energy. [JIPMER] (a) KE = 6.25 × 10−4 J, PE = 150 × 10−3 J (b) KE = 150 × 10−4 J, PE = 6.25 × 10−4 J (c) KE = 6.25 × 10−4 J, PE = 6.25 × 10−4 J (d) KE = 150 × 10−3 J, PE = 150 × 10−4 J
2014 3 The oscillation of a body on a smooth horizontal surface is represented by the equation, x = A cos ωt where, x = displacement at time t ω = frequency of oscillation
Which one of the following graphs shows correctly the variation of a with t? [CBSE AIPMT] a
a
(a) O
T
t
(b) O
t
(d) O
a
(c) O
T
t
a
T
T
t
Here, a = acceleration at time t T = time period
4 When the displacement of a particle executing simple harmonic motion is half its amplitude, the ratio of its kinetic energy to potential energy is [Kerala CEE] (a) 1: 3 (b) 2 : 1 (c) 3 : 1 (d) 1: 2 (e) 2 : 3 5 The displacement of a particle having SHM is x x = 10sin 10 xt + m and its angular frequency. 4 (a) 6 x (b) 8 x (c) 2 x (d) 10 x
6 When a particle executing SHM oscillates with a frequency ν, then the kinetic energy of the particle [WB JEE] (a) changes periodically with a frequency of ν (b) changes periodically with a frequency of 2ν (c) changes periodically with a frequency of ν/ 2 (d) remains constant 7 If a body is executing simple harmonic motion and its current displacement is 3 / 2 times the amplitude from its mean position, then the ratio between potential energy and kinetic energy is [EAMCET] (a) 3 : 2 (b) 2 : 3 (c) 3 : 1 (d) 3 : 1 8 A 10 kg metal block is attached to a spring of spring constant 1000 Nm −1 . A block is displaced from equilibrium position by 10 cm and released. The maximum acceleration of the block is [KCET] −2 −2 −2 (b) 100 ms (c) 200 ms (d) 0.1 ms −2 (a) 10 ms 9 A body of mass 1 kg is executing simple harmonic motion. Its displacement y (cm) at t seconds is given by π y = 6 sin 100 t + . Its maximum kinetic energy is 4 [MPPMT] (a) 6 J
(b) 18 J
(c) 24 J
(d) 36 J
2013 10 The KE and PE of a particle executing SHM of amplitude a will be equal, when displacement is a (a) (b) a 2 2 a (c) 2a (d) 2
[Manipal]
11 A long spring, when stretched by a distance x, has potential energyU. On increasing the stretching to nx, the potential energy of the spring will be [WB JEE] U (b) nU (a) n U (d) 2 (c) n 2U n
2012 12 A body is executing simple harmonic motion with an
angular frequency of 2 rad s −1 . The velocity of the body at 20 mm displacement, when the amplitude of the motion is 60 mm is [Manipal] −1 −1 (a) 131 mms (b) 118 mms (c) 113 mms −1 (d) 90 mms −1
333
OSCILLATIONS
13 The displacement of a particle executing SHM is given by y = 0.25 sin 200 t cm. The maximum speed of the particle is [MHT CET] −1 −1 (b) 100 cms (a) 200 cms (d) 5.25 cms −1 (c) 50 cms −1
22 The maximum velocity of a particle in SHM is v. If the amplitude is doubled and the time period of oscillation 1 decreased to of its original value, the maximum velocity 3 becomes [WB JEE] (a) 18v (b) 12v (c) 6v (d) 3v
14 The length of the second pendulum is decreased by 0.3 cm when it is shifted to Chennai from London. If the acceleration due to gravity at London is 981 cm/s 2 , the acceleration due to gravity at Chennai is (assume π 2 = 10)
23 The total energy of the body executing simple harmonic motion (SHM) is E. Then, the kinetic energy when the displacement is half of the amplitude is [CG PMT] E E 3E 3E (a) (b) (c) (d) 2 4 4 4
(a) 981 cm/s 2
(b) 978cm/s 2
2
2
(c) 984 cm/s
(d) 975cm/s
[Manipal]
15 For a body performing SHM, at a distance A/ 2, the correct relation between KE and PE will be [OJEE] (a) KE is equal to PE (b) KE is 2 times of PE (c) KE is 3 times of PE (d) KE is half of PE 16 When a spring is stretched by 10 cm, the potential energy stored is E. When the spring is stretched by 10 cm more, the potential energy stored in the spring becomes [WB JEE] (a) 2 E (b) 4 E (c) 6 E (d) 10 E 17 U is the PE of an oscillating particle and F is the force acting on it at a given instant. Which of the following is true? [MHT CET] U 2U (b) (a) + x = 0 +x=0 F F F F (c) + x = 0 (d) +x=0 U 2U 18 For a particle in SHM, if the amplitude of the displacement is a and the amplitude of velocity is v, the amplitude of acceleration is [MHT CET] 2 2 v v v (a) va (b) (d) (c) a a 2a 19 The average acceleration of a particle performing SHM over one complete oscillation is [MHT CET] 2 2 ω A ω A (a) (b) 2 2 (c) zero (d) Aω 2
24 A particle is vibrating in a simple harmonic motion with an amplitude of 4 cm. At what displacement from the equilibrium position, is its energy half potential and half kinetic? [VMMC] (a) 1 cm (b) 2 cm (c) 3 cm (d) 2 2 cm
2009 25 Which one of the following equations of motion represents simple harmonic motion? (a) Acceleration = − k 0 x + k1 x 2
[CBSE AIPMT]
(b) Acceleration = − k ( x + a ) (c) Acceleration = k ( x + a ) (d) Acceleration = kx where, k , k 0 , k1 and a are all positive.
26 A particle is executing linear simple harmonic motion. The fraction of the total energy that is potential, when its displacement is 1/ 4 of the amplitude is [J&K CET] 1 1 1 1 (b) (c) (d) (a) 16 8 2 4 27 A particle performing SHM has time period 2π / 3 and path length 4 cm. The displacement from mean position at which acceleration is equal to velocity is [MHT CET] (a) zero (b) 0.5 cm (c) 1 cm (d) 1.5 cm
20 In SHM, the acceleration is ahead of velocity by a phase angle [OJEE] (a) 0° (b) π / 2 (c) π (d) 2π
28 A body executing linear simple harmonic motion has a velocity of 3 ms −1 when its displacement is 4 cm and a velocity of 4 ms −1 when its displacement is 3 cm. What is the amplitude of oscillation? [BCECE] (a) 5 cm (b) 7.5 cm (c) 10 cm (d) 12.5 cm
21 A particle is executing linear simple harmonic motion of amplitude A. At what displacement, is the energy of the particle half potential and half kinetic? [WB JEE] A A (a) (b) 4 2 A A (d) (c) 2 3
29 A simple performs SHM about n = 0 with an amplitude a and time period T. What is the speed of the pendulum at [Manipal] x = A / 2? 3AT 3Aπ (a) (b) n T 2Aπ 5Aπ (d) (c) T T
334
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
30 A particle is executing SHM. Then, the graph of velocity as a function of displacement is a/an [Manipal] (a) straight line (b) circle (c) ellipse (d) hyperbola
2008 31 Two simple harmonic motions of angular frequency 100 −1
and 1000 rad s have the same displacement amplitude. The ratio of their maximum accelerations is [CBSE AIPMT] (a) 1 : 10 (b) 1: 102 (c) 1: 103 (d) 1: 104
32 A point performs simple harmonic oscillation of period T and the equation of motion is given by x = a sin (ωt + π / 6). After the elapse of what fraction of the time period the velocity of the point will be equal to half of its maximum velocity? [CBSE AIPMT] T T (b) (a) 8 6 T T (c) (d) 3 12 33 A body executes simple harmonic motion. The potential energy (PE), the kinetic energy (KE) and total energy (TE) are measured as function of displacement X. Which of the following statements is true? [RPMT] (a) KE is maximum, when x = 0 (b) TE is zero, when x = 0 (c) KE is maximum, when x is maximum (d) PE is maximum, when x = 0 34 If a body is executing simple harmonic motion, then [J&K CET]
(a) at extreme positions, the total energy is zero (b) at equilibrium position, the total energy is in the form of potential energy (c) at equilibrium positions, the total energy is in the form of kinetic energy (d) at extreme positions, the total energy is infinite
35 The displacement of a particle of mass 3 g executing simple harmonic motion is given by Y = 3sin ( 0. 2t ) in SI units. The kinetic energy of the particle at a point which is at a distance equal to 1/ 3 of its amplitude from its mean position is [Punjab PMET] 3 −3 (a) 12 × 10 J (b) 25 × 10 J −3 (d) 0.24 × 10−3 J (c) 0.48 × 10 J
2007 36 The particle executing simple harmonic motion has a
kinetic energy K 0 cos 2 ωt. The maximum values of the potential energy and the total energy are respectively. [CBSE AIPMT]
(a) 0 and 2K 0 (c) K 0 and 2K 0
K (b) 0 and K 0 2 (d) K 0 and K 0
37 The potential energy of a simple harmonic oscillator when the particle is half way to its end point is [BHU] 1 1 2 1 (b) E (c) E (d) E (a) E 4 2 3 8 (where, E is the total energy) 38 Which one of the following statements is true for the speed v and the acceleration a of a particle executing simple harmonic motion? [Manipal] (a) Where v is maximum, a is maximum (b) Value of a is zero, whatever may be the value of v (c) When v is zero, a is zero (d) When v is maximum, a is zero 39 In SHM restoring force is F = − kx, where k is force constant, x is displacement and A is amplitude of motion, then total energy depends upon [MHT CET] (a) k , A and M (b) k , x, M (c) k , A (d) k , x 40 A particle executes SHM with a period of 8 s and amplitude 4 cm. Its maximum speed in cm s −1 , is [J&K CET] π π π (c) (d) (a) π (b) 2 3 4
2006 41 Amplitude of a pendulum is 60 mm and angular velocity
is 2 rad s −1 . Find its velocity, if its displacement is 20 mm
(a) 120 mm s −1
(b) 113 mm s −1
(c) 115 mm s −1
(d) 125 mm s −1
[RPMT]
42 A particle executing SHM has amplitude 0.01 m and frequency 60 Hz. The maximum acceleration of particle is (a) 60π 2 ms −2 (b) 80π 2 ms −2 [MP PMT] 2 −2 (c) 120π ms (d) 144π 2 ms −2 43 A simple harmonic oscillator has amplitude A, angular velocity ω and mass m. Then, average energy in one time period will be [Haryana PMT] 1 1 2 2 2 2 2 (a) mω A (b) m ω A 4 2 (c) mω 2 A 2 (d) zero 44 If a particle executes SHM with angular velocity 3.5 rad s −1 and maximum acceleration 7.5 ms −2 , then the amplitude of oscillation will be [DUMET] (a) 0.80 m (b) 0.69 m (c) 0.41 m (d) 0.61 m 45 A body executing SHM has velocity 10 cm s −1 and 7 cm s −1 , when its displacements from the mean position are 3 cm and 4 cm respectively. The length of path is [DUMET] (a) 10 cm (b) 9.5 cm (c) 4 cm (d) 11.36 cm
335
OSCILLATIONS
49 The maximum velocity of a simple harmonic motion π represented by y = 3sin 100 t + m 6 is given by [BCECE] 3 π π (a) 300 ms −1 (b) ms −1 (c) 100 ms −1 (d) ms −1 6 6
46 When the kinetic energy of a body executing SHM is 1/3 of the potential energy. The displacement of the body is x per cent of the amplitude, where x is [RPMT] (a) 33 (b) 87 (c) 67 (d) 50
2005 47 In simple harmonic motion, maximum velocity is at (a) extreme positions [Punjab PMET] (b) half of extreme positions (c) equilibrium positions (d) between extreme and equilibrium positions
50 A simple pendulum performs simple harmonic motion about x = 0 with an amplitude a and time period T. The speed of the pendulum at x = a / 2 will be [CBSE AIPMT] 2 πa 3 πa 3π a πa 3 (a) (b) (c) (d) 2T T T T
48 Consider the following statements. The total energy of a particle executing simple harmonic motion depends on its [BCECE] (I) amplitude (II) period (III) displacement, of these statements (a) I and II are correct (b) II and III are correct (c) I and III are correct (d) I, II and III are correct
51 A coin is placed on a horizontal platform which undergoes vertical simple harmonic motion of angular frequency (ω). The amplitude of oscillation is gradually increased. The coin will leave contact with the platform for the first time (a) at the mean position of the platform [AIIMS] g (b) for an amplitude of 2 ω g2 (c) for an amplitude of 2 ω (d) at the highest position of the platform
Answers 1 11 21 31 41 51
(c) (c) (c) (b) (b) (b)
2 12 22 32 42
(b) (b) (c) (d) (d)
3 13 23 33 43
(a) (b) (c) (a) (a)
4 14 24 34 44
(a) (b) (d) (c) (d)
5 15 25 35 45
(d) (a) (b) (c) (b)
6 16 26 36 46
(b) (b) (a) (d) (b)
7 17 27 37 47
(d) (b) (c) (a) (c)
8 18 28 38 48
(a) (b) (a) (d) (a)
9 19 29 39 49
(b) (c) (b) (c) (a)
(d) (b) (c) (a) (d)
10 20 30 40 50
Explanations 1 (c) The average velocity of a particle executing simple harmonic motion (SHM) is Total displacement x f − xi vav = = T Time interval where, x f and xi are the initial and final position of the particle executing SHM. As, in vibrational motion, the particle executes SHM about its mean position. So, after one complete vibration of the particle, it will reaches its initial position, i.e. Displacement, x f − xi = 0 0 ∴ vav = T Hence, the average velocity is zero.
2 (b) Given, m = 0.5 kg, ω = 5 rad/s, −2
x = 10 m A = 5 × 10−2m
1 mω 2x 2 2 1 or PE = × 0.5 × (5 )2 × (10−2 )2 2 25 = × 10−4 J = 6.25 × 10−4 J 4 1 Q Kinetic energy, KE = mω 2 ( A 2 − x 2 ) 2 1 or K = × 0.5 × (5 )2 (25 − 1) × 10−4 2 = 150 × 10−4 J
Q Potential energy, PE =
3 (a) We can find the correct graph by putting different values of t in the given expression x = A cos ωt If t = 0, then x = + A
T , then x = 0 4 T If t = , then x = − A 2 We can see that only graph (a) will satisfy the above results. If t =
a +A O –A
T
t
4 (a) For simple harmonic motion, the displacement, x = A cos ωt A A ⇒ = A cos ωt Q x = 2 2 1 cos ωt = ⇒ ωt = 30° 2
336
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
We know that kinetic energy, 1 KE = mv 2 2 1 = mω 2 A 2 sin 2 ωt 2 (Q v = − Aω sin ωt ) …(i) 1 Potential energy, PE = mω 2x 2 2 1 2 2 …(ii) = mω A cos2 ωt 2 1 mω 2 A 2 sin 2 ωt KE 2 ⇒ = = tan 2 ωt PE 1 mω 2 A 2 cos2 ωt 2 2 1 1 = tan 2 (30° ) = = 3 3 So, KE : PE =1: 3 x 5 (d) Given, x = 10 sin 10 xt + 4 By comparing ω = 10 x because equation of SHM ⇒ x (t ) = A cos (ωt + φ )
6 (b) We know that, kinetic energy, 1 2 mv 2 dy where, v= = ωA cos ωt dt 1 So, K = mω 2 A 2 cos2 ωt 2 K=
Kinetic energy versus time graph is given below Kinetic Energy
KEmax
7
0
KEmax = 1 mω2A2 2
12 (c) v = ω A 2 − x 2
We know that potential energy of a body in SHM is given by 1 U = mω 2 y2 2 where, m and ω are constant.
= 2 (60)2 − (20)2 = 113 mms−1
2
3 1 1 3 A2 U = mω 2 A = mω 2 × 2 2 4 2 …(i) Similarly, kinetic energy of a body in SHM is given by 1 K = mω 2 ( A 2 − y2 ) 2 1 3 A2 1 A2 ⇒ K = mω 2 A 2 − = mω 2 2 4 2 4
T 2
3T 4
T time (t)
8 (a) We know that in spring SHM, the restoring force is proportional to displacement,
K max =
2
A 1 A = mω 2 2 2 2 1 ⇒ = mω 2 A 2 4 Kinetic energy of body 1 = mω 2 ( A 2 − y2 ) 2 2 1 A A KE at y = = mω 2 A 2 − 2 2 2 1 2 2 = mω A 4
⇒ ⇒
y=
Hence, KE is equal to PE. 1 …(i) k (10 × 10−2 )2 2 For 2nd situation, 1 …(ii) E′ = k (20 × 10−2 )2 2 On comparing Eqs. (i) and (ii), we get E′ = 4 E 1 (b) The potential energy, U = kx 2 2 2U = kx 2 ⇒ 2U = − Fx (Q F = − kx ) 2U 2U or = − x or +x=0 F F E=
11 (c) Potential energy of the spring,
and
1 mω 2 y2 2
PE at
=
1 2 kx 2 1 U ′ = k (nx )2 2 1 U ′ = n2 kx 2 2 U ′ = n2U
0.3 × 10 = g1 − g2 g2 = 981 − 3 = 978 cm/s2
15 (a) Potential energy of body
1 mω 2a2 2
U =
g1T 2 g1 = 4π 2 π 2
16 (b) For 1st situation,
i.e. Frequency of kinetic energy, 1 1 2 ∴ν = ν′ = = = 2ν T T /2 T 3 (d) The current displacement is 2 times the amplitude. 3 A 2
⇒ ⇒
…(i) F = − mω 2 y …(ii) F = − ky where, k = force constant of the spring m = 10 kg, A =10 cm = 0.1 m, k = 1000 N/m Comparing the both equations, we get k 1000 k ω2 = = ⇒ ω= m 10 m ⇒ = 10 rad /s and acceleration in SHM, amax = − ω 2⋅ y = − 102 × (0.1) ~ 10 ms–2 = − 10 m/s2 −
1 × 1 × (100)2 × (6 × 10−2 )2 = 18 J 2 10 (d) As per question, KE = PE 1 1 mω 2 (a2 − y2 ) = mω 2 y2 2 2 a y= ∴ 2
y=
l Q T = 2π g 2 gT g and L2 = 2 2 = 22 4π π Since, length is decreased, g2 is less than g1. g −g L1 − L2 = 1 2 2 ∴ π ⇒ (L1 − L2 ) π 2 = g1 − g2
14 (b) As, L1 =
=
From the graph, it is clear that at t = 0, T /2, T, etc. KE has its maximum value. T 3T , the KE has For x = ± A or t = , 4 4 its minimum value. Clearly, twice in each cycle KE assume its peak values. It is a periodic function of time, the time period equals to T /2.
i.e.,
= (200)(0.25) = 50 cm s−1
…(ii) So, the ratio of PE and KE 1 3 A2 1 A2 PE:KE = mω 2 × : mω 2 = 3:1 2 4 2 4
9 (b) a = 6 cm , ω = 100 rad s−1 T 4
13 (c) vmax = ωA
...(i)
17
18 (b) We know that, vmax = aω and Maximum acceleration = ω 2a [Qx = a ] 2
[From Eq. (i)]
v2 v = a= a a
337
OSCILLATIONS
19 (c) The average acceleration of a particle performing SHM over one complete oscillation is zero. Because acceleration is a function of sine and average value of sin for 1 complete oscillation = 0.
⇒
24
20 (b) In SHM, the acceleration is ahead of π velocity by a phase angle . 2 v0
t t
a0
x = A sinωt
(i)
(ii)
π 2
26
π)
21 (c) The total energy of a particle executing SHM 1 = mω 2 A 2 2 The PE of the particle at a distance x from the equilibrium position 1 = mω 2x 2 2 From the question, 1 11 mω 2x 2 = mω 2 A 2 2 22 A A2 ⇒ x= 2 2 (c) Maximum velocity, …(i) vmax = Aω 2π …(ii) ω= T From Eqs. (i) and (ii), we get 2πA vmax = T A v A T Thus, v ∝ ⇒ 1= 1× 2 T v2 A2 T1 1 1 1 = × = 2 3 6 ⇒ v2 = 6v1 = 6v (Q v1 = v ) ⇒
22
x2 =
23 (c) Total energy in SHM,
1 mω 2a2, (where, a = amplitude) 2 1 Kinetic energy, K = mω 2 (a2 − y2 ) 2 1 ⇒ K = E − mω 2 y2 2 a When y = (given) 2 E=
a2 1 E mω 2 = E − 2 4 4
K = 3E / 4 (d) Let x be the point, where KE = PE 1 1 Hence, mω 2 (a2 − x 2 ) = mω 2x 2 2 2 a 2x 2 = a2, x = 2 4 x= = 2 2 cm ⇒ 2
28 (a) Velocity of SHM, v = ω a2 − y2 9 = ω 2 [ a2 − 16 ]
⇒ Similarly,
27
particle executing SHM at a displacement x from the mean position is given by, a = − k (x + a). (a) For SHM, potential energy 1 = mω 2 y2, where y = displacement 2 from mean position. 1 and total energy = mω 2 A 2 2 where, A = amplitude of SHM Therefore, fraction of potential energy with respect to total energy 1 mω 2 y2 2 = 1 mω 2 A 2 2 2 1 A y2 4 ⇒ = 2= A2 A 1 = 16 2π (c) Given, T = 3 Path length, l = 4 cm 4 ⇒ A = = 2 cm 2 Now,
⇒
a2 = 25
∴
a = 5 cm
29 (b) Velocity of oscillating body, v = ω A2 − x2 At x =
=
1 As, y = A 4
v2 x2 + 2 =1 2 2 aω a which is the equation of an ellipse.
⇒
amax = − ω 2 A
(amax )1 ω 21 = (amax )2 ω 22 (as A remains same) 2
⇒
(amax )1 (100)2 1 = = = 1 : 102 (amax )2 (1000)2 10
32 (d) Writing the given equation of a point performing SHM, π …(i) x = a sin ωt + 6 A l
2π 2π Q T = and ω = = 3 π 2 3 3 ⇒
3Aπ T
v 2 + ω 2x 2 = ω 2a2
⇒
⇒
ω A 2 − x 2 = ω 2x 22 − x 2 = 3x 2
3 Aω = 2
30 (c) From the relation, v 2 = ω 2 (a2 − x 2 )
Differentiating Eq. (i), w.r.t. time, we obtain π dx v= = aω cos ωt + 6 dt
4 x 2 = 4 ⇒ | x | =1 cm
aω , so that 2 aω π = aω cos ωt + 2 6 1 π = cos ωt + 2 6 π π cos = cos ωt + 3 6
It is given that, v =
According to the question,
⇒
A2 A , v = ω A2 − 2 4
motion is
where, x = displacement of particle executing SHM, at any time.
A 2 − x 2 = ω 2x 2
…(ii)
31 (b) Acceleration of simple harmonic
v = ω A 2 − x 2 and a = ω 2x
⇒
…(i)
16 = ω 2[ a2 − 9 ]
On dividing Eq. (ii) by Eq. (i), we get 16 [ a2 − 9 ] = 9 [ a2 − 16 ]
25 (b) We know that, the acceleration of
v = Aω sin ωt + and the acceleration, a = Aω 2 sin (ωt + where, A = amplitude. Velocity,
K =E−
⇒ ⇒ ⇒ ⇒
π π π = ωt + ⇒ ωt = 6 3 6 T π π ×T t= = = 6ω 6 × 2π 12
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T velocity of the point will be 12 equal to half of its maximum velocity. Thus, at
33 (a) At x = 0, kinetic energy is maximum and potential energy is minimum (from principle of conservation of total mechanical energy).
34 (c) At equilibrium position, potential energy of the body is zero. So, the total energy at equilibrium position is completely kinetic energy.
35 (c) Equation of SHM, Y = 3 sin (0.2t ) Comparing with Y = A sin ωt , we have A = 3 m , ω = 0.2 s−1 −3
Mass of the particle = 3 g = 3 × 10 kg Therefore, kinetic energy of the particle is 1 K = mω 2 ( A 2 − x 2 ) 2 1 A = × 3 × 10−3 × (0.2)2 (32 − 12 ) Q x = 3 2 K = 0.48 × 10−3 J
36 (d) In simple harmonic motion, the total energy of the particle is constant at all instants which is totally kinetic when particle is passing through the mean position and is totally potential when particle is passing through the extreme positions. The variation of PE and KE with time is shown in figure by dotted parabolic curve and solid parabolic curve, respectively. Figure indicates that maximum values of total energy, KE and PE of SHM are equal. TE
ωt
PE
O
Now, EK = K 0 cos2 ωt ⇒ (EK )max = K 0 So, (EP )max = K 0 and (E )Total = K 0
37 (a) In SHM, total energy = potential
Acceleration,
⇒ When ⇒ When ⇒
energy + kinetic energy ⇒ E = U + K 1 1 = mω 2x 2 + mω 2 ( A 2 − x 2 ) ⇒ 2 2 1 = mω 2 A 2 2 where, k = force constant = mω 2.
Thus, total energy depends on k and A.
40 (a) For a particle executing SHM vmax = Aω
1 1 1 A mω 2 = mω 2 A 2 2 2 4 2 E U = 4
2π T 2π =4× = π cm s−1 8
⇒
vmax = 4 ×
⇒
vmax
41 (b) In SHM, velocity, v = ω a2 − y2 = 2 (60)2 − (20)2
⇒
= 113.14 mm s ~ 113 mm s−1 −
−1
42 (d) Maximum acceleration of particle = Aω 2 = A (2πf )2
⇒
⇒
dv d = ( Aω cosωt ) dt dt a = − Aω 2 sin ωt …(ii) a = − ω2 y y = 0, v = Aω = vmax a = 0 = amin y = A , v = 0 = vmin a = − ω 2 A = amax
39 (c) In SHM, the total energy = potential
When the particle is half-way to its end point i.e. at half of its amplitude, then y= A/2
U =
…(i)
Hence, it is clear that when v is maximum, then a is minimum, i.e. zero or vice-versa.
⇒
2
v = ω A 2 − y2
a=
energy + kinetic energy
Hence, potential energy
=
displacement equation is, y = A sinωt where, A is amplitude of the motion. dy Velocity, v = = Aω cosωt dt ⇒ v = Aω 1 − sin 2 ωt
⇒ KE x
1 T mω 2 A 2 cos2 (ωt + φ )dt 2T ∫ 0 T 1 + cos 2(ωt + φ ) 1 = ⋅ mω 2 A 2 ∫ dt 0 2T 2 1 T = ⋅ mω 2 A 2 ⋅ +0 2 2T 1 = mω 2 A 2 4
38 (d) In simple harmonic motion, the
= 4 Aπ 2 f 2 = 4 × 0.01 × π 2 × (60)2 (Q A = 0.01 m) = 144 π 2 m s−2
43 (a) Average energy in a time period, T
U av =
∫ 0 U dt T
∫ 0 dt
=
1 T U dt T ∫0
44 (d) The maximum acceleration for a particle executing SHM is amax = ω 2x, where x = maximum displacement from mean path 7.5 a = = 0.61 m ∴ x = max (3.5)2 ω2
45 (b) The velocity (v ) of a body in SHM changes with displacement ( y) as follows where, A is amplitude A and ω is angular speed. −1 Given, v1 = 10 cm s , v2 = 7 cm s−1 y1 = 3 cm and y2 = 4 cm. ∴
v2 = v1
A 2 − y22 Qv = ω A 2 – y2 A 2 − y12
A 2 − 16 A2 − 9 ⇒ A = 4.77 cm Length of path, 2 A = 2 × 4.77 ≈ 9.5 cm ⇒
7 = 10
46 (b) The relation for kinetic energy of SHM 1 …(i) mω 2 ( A 2 − y2 ) 2 1 Potential energy, U = mω 2 y2 …(ii) 2 KE =
Now, for the condition of question and from Eqs. (i) and (ii), we get 1 1 1 mω 2 ( A 2 − y2 ) = × mω 2 y2 2 3 2 4 1 mω 2 y2 = mω 2 A 2 ⇒ 6 2 3 ⇒ y2 = A 2 4 A y= 3 = 0.866 A ⇒ 2 ≈ 87% of amplitude
47 (c) In SHM, velocity, v = ω A 2 − y2 Therefore, velocity is maximum when y = 0, i.e. at equilibrium position, velocity will be maximum.
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OSCILLATIONS
48 (a) Potential energy of particle in SHM,
⇒ ⇒
U = 2π 2mf 2x 2
…(i)
Kinetic energy of particle in SHM, 1 K = mω 2 ( A 2 − x 2 ) 2 …(ii) ⇒ K = 2π 2mf 2 ( A 2 − x 2 ) Hence, total energy E = K +U = 2π 2mf 2x 2 + 2π 2mf 2 ( A 2 − x 2 ) = 2π 2mf 2 A 2 2π 2mA 2 = T2
49 (a) The given equation is written as π y = 3 sin 100t + m 6
1 U = mω 2x 2 2 1 U = m(2πf )2 x 2 2
1 Q T = f
Thus, it is obvious that total energy of particle executing simple harmonic motion depends on amplitude ( A ) and period (T ).
51 (b) As the amplitude is increased, the
…(i)
The general equation of simple harmonic motion is written as …(ii) y = A sin (ωt + φ ) Equating Eqs. (i) and (ii), we get A = 3, ω = 100 Maximum velocity, v = Aω = 3 × 100 = 300 ms−1
50 (d) As we know that the speed of particle executing SHM is given by 2π v = ω a2 − x 2 and ω = T where, x = displacement ⇒
2π v= T
⇒
v=
Coin Platform Equilibrium position Performing SHM
If we draw the free body diagram for coin at one of the extreme positions as shown, below ω2A mg
N
2
Then, from Newton’s law mg − N = mω 2 A
3πa T
For loosing contact with the platform, N =0 g So, A= 2 ω
a a − (at x = a/2) 2 2
2π 3a = T 2
maximum acceleration of the platform (along with coin as long as they doesn’t get separated) increases.
Topic 3 Time Period and Frequency 2018 1 A block of rectangular size of mass m and area of cross-section A, floats in a liquid of density ρ. If we give a small vertical displacement from equilibrium, it undergoes SHM with time period T, then [AIIMS] 1 1 2 2 −1 2 2 (a) T ∝ (b) T ∝ ρ (c) T ∝ m (d) T ∝ −2 ρ A π 2 Y = 5 sin (100 t − 2x ), what is time period? 2 [JIPMER] (a) 0.04 s (b) 1 s (c) 0.06 s (d) 0.02 s
2017 3 A particle executes linear simple harmonic motion with an amplitude of 3 cm. When the particle is at 2 cm from the mean position, the magnitude of its velocity is equal to that of its acceleration. Then, its time period in seconds is [NEET] 5 5 4π 2π (b) (c) (a) (d) π 2π 5 3
2015 4 A particle is executing SHM along a straight line. Its velocities at distances x1 and x 2 from the mean positions [CBSE] are v1 and v 2 , respectively. Its time period is (a) 2π (c) 2π
x 21 + x 22 v12 + v 22 v12 + v 22 x12 + x 22
(b) 2π (d) 2π
x 22 − x12 v12 − v 22 v12 − v 22 x12 − x 22
2014 5 A block resting on the horizontal surface executes SHM in horizontal plane with amplitude A. The frequency of oscillation for which the block just starts to slip is (µ = coefficient of friction and g = gravitational acceleration) [MHT CET] 1 µg 1 µg A A (a) (b) (c) 2π (d) 4π 2π A 4π A µg µg
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2013 6 Frequency of oscillation of a body is 7 Hz when force F1 is applied and 24 Hz when F2 is applied. If both forces F1 and F2 are applied together, then frequency of oscillation will be (a) 25 Hz (b) 31 Hz (c) 17 Hz (d) 24 Hz
7 If the maximum velocity and acceleration of a particle executing SHM are equal in magnitude, the time period will be [UP CPMT] (a) 1.57 s (b) 3.17 s (c) 6.28 s (d) 12.56 s 8 A simple pendulum of frequency n falls freely under gravity from certain height from the ground level. Its frequency of oscillation will [Kerala CEE] (a) remain unchanged (b) be greater than n (c) be less than n (d) become zero (e) become infinity 9 A particle executing simple harmonic motion has a time period of 4 s. After how much interval of time from t = 0 will its displacement be half of its amplitude? [KCET] 1 1 2 1 (a) s (b) s (c) s (d) s 3 2 3 6 2012 10 The displacement equation of a body performing SHM is π given as y = 200sin 180πt + . The time period of 4 body is [MPPMT] 1 1 1 1 (b) s (c) s (d) s (a) s 65 50 90 80 2011 11 A particle of mass m is located in a one-dimensional potential field, where potential energy is given by V ( x ) = A (1 − cos px ), where A and p are constants. The period of small oscillations of the particle is [WB JEE] 1 Ap m m m (a) 2π (b) 2π (d) (c) 2π 2 2π m Ap A Ap 12 A harmonic oscillation is represented by y = 0.34 cos ( 3000 t + 0.74 ) . Find its frequency. 1000 1500 750 3000 (b) (c) (d) (a) π π π π 13 Asertion (A) Water in a U-tube executes SHM, the time period for mercury filled upto the same height in te U-tube be greater than that in case of water. Reason (R) The amplitude of an oscillating pendulum goes on increasing. [AIIMS] (a) Both A and R are correct and R is the corret explanation of A (b) Bot A and R are correct but R is not the correct explanation of A (c) A is correct but R is incorrect (d) Both A and R are incorrect
2010 14 A body is executing SHM when its displacement from the
mean position are 4 cm and 5 cm, it has velocity 10 cms −1 and 8 cms −1 , respectively. Its periodic time t is [AFMC] 2π (a) s (b) π s 3 3π (c) s (d) 2π s 2
15 A body is executing SM of amplitude 1 m. Its velocity wile passing through the mean position, is 10 m/s. Find its frequency. (a) 1.442 Hz (b) 1.592 Hz (c) 1.322 Hz (d) 1.132 Hz 16 A verticle U-tube of iniform cross section contains water upto a heignt of 20 cm. Calculate the time period of the oscillation of water when it is disturbed [AFMC] (a) 0.11 s (b) 0.25 s (c) 0.40 s (d) 0.9 s 17 The equation of a particle executing SHM is 2d 2 x + 32x = 0. Then, the time period of the body is [OJEE] dt 2 (a) zero (b) π / 2 (c) π (d) 2π 18 A 8 kg body performs SHM of amplitude 30 cm. The restoring force is 60 N when the displacement is 30 cm. Find its time period. (a) 1.432 s (b) 1.256 s (c) 2.424 s (d) 2.412 s 19 The time period of the variation of potential energy of a particle executing SHM with period T is [Kerala CEE] T T (a) (b) T (c) 2T (d) 4 2 T (e) 3 20 The motion of a particle executing SHM in one π dimension is described by x = − 0.3sin t + , where x 4 is in metre and t in second. The frequency of oscillation in Hz is [DUMET] 1 (a) 3 (b) 2π π 1 (c) (d) 2 π 2009 21 Two bodies performing SHM are expressed as π π y1 = 50sin 100πt + and y 2 = 10sin 50πt + . The 3 6 difference of their oscillating frequency is [MHT CET] (a) 5 Hz (b) 50 Hz (c) 20 Hz (d) 25 Hz
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OSCILLATIONS
22 A body executes simple harmonic motion under the action 4 of force F1 with a time period s. If the force is changed to 5 F2 it executes simple harmonic motion with time period 3 s.If both forces F1 and F2 act simultaneously in the same 5 direction on the body then, its time period will be [AFMC] 12 24 s (b) s (a) 25 25 35 15 s (d) s (c) 24 12 23 The periodic time of a particle doing simple harmonic motion is 4 s. The time taken by it to go from its mean position to the maximum displacement (amplitude) is (a) 2 s (b) 1 s [MHT CET] 2 1 (c) s (d) s 3 3 24 The motion of a particle executing SHM is given by x = 0.01 sin 100π ( t + 0.05) , where x is in metre and t in second. The time period of motion (in second) is (a) 0.01 (b) 0.02 [MGIMS] (c) 0.1 (d) 0.2
2008 25 The function sin 2 ωt represents
27 The magnitude of maximum acceleration is π times that of maximum velocity of a simple harmonic oscillator. The time period of the oscillator in second is [Punjab PMET] (a) 4 (b) 2 (c) 1 (d) 0.5
2007 28 A particle executes simple harmonic oscillation with an amplitude a. The period of oscillation is T. The minimum time taken by the particle to travel half of the amplitude from the equilibrium position is [CBSE AIPMT, JIPMER] T T T T (a) (b) (c) (d) 4 8 12 2
29 The maximum displacement of the particle executing SHM is 1 cm and the maximum acceleration is (1.57) 2 cm s −2 . Its time period is [AMU] (a) 0.25 s (c) 1.57 s
2006 30 A rectangular block of mass m and area of cross-section
A floats in a liquid of density ρ. If it is given a small vertical displacement from equilibrium it undergoes oscillation with a time period T. Then, [CBSE AIPMT] 1 (b) T ∝ (a) T ∝ ρ A 1 1 (c) T ∝ (d) T ∝ ρ m
[AIIMS]
(a) a periodic but not simple harmonic motion with a period 2π / ω (b) a periodic but not simple harmonic motion with a period π / ω (c) a simple harmonic motion with a period 2π / ω (d) a simple harmonic motion with a period π / ω
26 A particle of mass m is executing oscillations about the origin on the X-axis. Its potential energy isU ( x ) = k[ x] 3 , where k is a positive constant. If the amplitude of oscillation is a, then its time period T is [AIIMS] 1 (b) independent of a (a) proportional to a (d) proportional to a 3/ 2 (c) proportional to a
(b) 4.0 s (d) 3.14 s
31 A particle executes simple harmonic motion with a frequency f. The frequency with which the potential energy oscillates is [AMU] (a) f (b) f/2 (c) 2 f (d) None of these 32 A particle executes SHM of amplitude 25 cm and time period 3 s. What is the minimum time required for the particle to move between two points 12.5 cm on either side of the mean position? [BCECE] (a) 0.5 s (b) 1.0 s (c) 1.5 s (d) 2.0 s
Answers 1 11 21 31
(a) (d) (d) (d)
2 12 22 32
(a) (b) (a) (a)
3 (c) 13 (d) 23 (b)
4 (b) 14 (b) 24 (b)
5 (a) 15 (b) 25 (b)
6 (a) 16 (d) 26 (a)
7 (c) 17 (b) 27 (b)
8 (d) 18 (b) 28 (c)
9 (a) 19 (d) 29 (b)
10 (c) 20 (b) 30 (b)
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Explanations 1 (a) According to the law of floatation, weight of the retangular block ↓
= buoyant force ↑ ⇒ mg = v × ρ × g Now, volume of rectangular block = length × breadth × height = l ×b×h = l × A (because A = b × h) At equilibrium, mg = Alρg ⇒ m = Aρl m
Area (A) l
Given, when x = 2 cm | v|= |a | ⇒ ω
A 2 − x 2 = ω 2x 2
When it is given in downward displacement y, restoring force (upward direction) on block is F = − [ A (l + y)ρg − mg ] = − [ A (l + y)ρg − Alρg ] = − Aρgy i.e. F ∝ − y or a ∝ − y, so it executes SHM (inertia factor). Mass of block = m Spring factor = Aρg Time period = 2π T = 2π ⇒
Inertia factor Spring factor m Aρg
m T ∝ Aρ 2
2 (a) Given that, …(i) Y = 5 sin (50π t − πx ) Equation of displacement, …(ii) Y = A sin (ω t − kx ) After comparing with Eqs. (i) and (ii), ω = 50π 2π 2π Q Time period, T = = = 0.04 s ω 50π
3 (c) Magnitude of velocity of particle when it is at displacement x from mean position
A 2 − x2
=ω
Also, magnitude of acceleration of particle in SHM 2
=ω x
2
9−4 2 5 ⇒ Angular velocity, ω = 2 ∴ Time period of motion, 2π 4 π T = = s ω 5 ⇒
A −x = x
ω=
oscillation, then v12 = ω 2 ( A 2 − x12 ) 2
2
= ω (A −
⇒ ⇒ ⇒ … (i)
x22 )
… (ii)
v12 − v22 = ω 2 (x 22 − x12 ) ω=
v12 − v22 x22 − x12
⇒
2π = T
v12 − v22 x22 − x12
⇒
T = 2π
k m
From Eq. (i), we get 1 µg 2π A
6 (a) According to question, F1 = −k 1x and F2 = − k 2x 1 ∴ n1 = 2π 1 n2 = 2π
k2 = 24 Hz m
Now, F = F1 + F2 = − (k 1 + k 2 )x 1 2π
2π where, ω is angular velocity ω = T and A the amplitude. A t Given, y = , t′ = 2 4 A 2πt = A sin 2 4 1 πt = sin ⇒ 2 2 π πt ∴ sin = sin 6 2 π πt ⇒ = 6 2 1 t= s ⇒ 3 π 10 (c) Given, y = 200 sin 100πt + 4 Comparing with equation of SHM
k1 = 7 Hz m
∴Frequency of oscillation, n=
0 λ
SHM is y = A sin ωt′
kA = µmg [QFrest = − kx ] …(i)
f =
1 2π f =0 f =
9 (a) The displacement equation for
equal to the frictional force, block will start to slip. ∴ Restoring force = Frictional force 1 2π
value of g is zero, so that frequency of oscillation will be zero. 1 geff As, f = 2π λ
∴
x22 − x12 v12 − v22
Now, frequency, f =
| vmax | = | amax |, i.e. ωA = ω 2 A 2π ω =1= ∴ T = 2π T T = 2 × 3.14 T = 6.28 s
8 (d) For freely falling case, the effective
⇒
5 (a) When restoring force will become
⇒
n12 + n22 = 72 + 24 2
7 (c) According to the question,
Subtracting Eq. (ii) from Eq. (i), we get
⇒
4 π 2n12m + 4 π 2n22m m
= 25 Hz
4 (b) Let A be the amplitude of v22
where, l = length of part immersed in liquid.
1 2π 2π = 2π =
k1 + k2 m
…(i) …(ii)
y = a sin(ωt + φ ), we get ω = 180π 2π = 180π T 2π 1 T = = s 180π 90
11 (b) We are given that a particle of mass m is located in a one-dimensional
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OSCILLATIONS
potential field and the potential energy is given by V (x ) = A (1 − cos px ). So, we can find the force experienced by the particle as dV F =− = − Ap sin px dx For small oscillations, we have ~ px] [∴ sin px − F ≈ − Ap2x Hence, the acceleration would be given by F Ap2 a= =− x m m Also, we know that F a = = − ω 2x m So,
ω=
⇒
T =
Ap2 m
15 (b) Here, a = 1 m, vmax = 10 m/s vmax = aω = 2πva v So frequency, v = max 2πa 10 × 7 Hz v= = 1592 . 2 × 22 × 1
16 (d) The length of the liquid column L = 2 × 20 = 40 cm 1 Time period, T = 2π 2g T = 2π T =
d 2x + 16x = 0 dt 2 On comparing with standard equation d 2x + ω 2x = 0, we get dt 2 ∴ ω 2 = 16 ⇒ ω = 4 2π 2π π T = = = ⇒ ω 4 2
2π m = 2π ω Ap2
On compare, y = a cos (ωt + φ ) angular frequency, ω = 3000 rad/s ω 3000 and frequency, v = = 2π 2π 1500 v= π
18 (b) As the body performs SHM, hence k m But for SHM F = − kx, hence F 60 k= = = 200 x 30 × 10−2 Substituting k = 200, we get 200 10 ω= = = 5 rad/s 8 2 2π 2 × 22 Time period, T = = ω 7×5 44 s = = 1256 . 35 angular frequency, ω =
13 (d) The period of the liquid executing SHM in a U-tube does not depend upon the density of the liquid. Therefore, time period will be the same, when mercury is filled upto the same height as the water in the U-tube. Now, as the pendulum oscillates, it drags air along with it. Therefore, its kinetic energy is dissipated in overcoming viscous drag due to air and hence, its amplitude goes on decreasing.
14 (b) For a body executing SHM,
19 (d) In a complete cycle of SHM, potential energy varies for half the cycle and kinetic energy varies for the other half of the cycle.
velocity, v = ω 2 ( A 2 − y2 ) We have, 102 = ω 2 ( A 2 − 4 2 ) So, ⇒ ⇒
8 2 = ω 2 ( A 2 − 52 ) 102 − 82 = ω 2 (52 − 4 2 ) = (3ω )2 6 = 3ω ω=2
Since, time period, t = ∴
2π ~ 0.9 s = 0.898 − 7
17 (b) The equation of SHM is given by
12 (b) Given y = 0.34 cos (3000 t + 0.74 )
and
40 2 × 980
2π ω
2π t= =πs 2
20
Thus, for a time period T , the potential T energy varies for time of . 2 π (b) We have, x = − 0.3 sin t + 4 Comparing with the general equation x = x0 sin (ωt + φ ) where, x0 = maximum displacement π So, x0 = 0.3, ω = 1, φ = 4 Hence, 2πf = 1 ⇒ f = 1 / 2π
π 21 (d) y1 = 50 sin 100πt +
3 π y2 = 10 sin 50πt + 6
Comparing with general equation of SHM y = a sin(ωt + φ ), we have ω 1 = 100π and ω 2 = 50π 2πf1 = 100π ⇒ f1 = 50 Hz ω 2 = 50π ⇒ 2πf2 = 50π ⇒ f2 = 25 Hz ∴ f1 − f2 = 50 − 25 = 25 Hz 22 (a) The required time period would be given by T = T1 × T2 [Q Time period is multiplicative] 4 3 12 s = × = 5 5 25
23 (b) The time taken by particle to go from mean position to extreme positions would be T 4s = =1s 4 4
24 (b) Given, SHM is x = 0.01 sin 100π (t + 0.05). On comparing with x = A sin (ωt + φ ) We get ω = 100 π Now, time period 2π 2π 1 T = = = = 0.02 s ω 100 π 50
25 (b) Here, y = sin 2 ωt
⇒
dy = 2ω sin ωt cos ωt dt = ω sin 2ωt d2 y = 2 ω 2 cos 2 ωt dt 2
v0 t
d2 y For SHM, 2 ∝ − y dt Hence, function is not SHM, but periodic. From the v-t graph, time period is π t= ω
26 (a) Given, U (x ) = k [ x ]3 ⇒
dU dx F = − 3 k [ x ]2 F =−
…(i)
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Also, for SHM x = a sinωt and
Acceleration, a =
d 2x = − ω 2x dt 2
d 2x ⇒ F = ma = m 2 = − mω 2x dt From Eqs. (i) and (ii), we get
⇒
T =
T ∝
2
⇒ ⇒
m 3k (a sin ωt )
⇒
1 a
27 (b) As, maximum acceleration = maximum velocity × π i.e. ω 2 A = πωA
where, A is amplitude and ω is angular velocity, ⇒ ω=π 2π =π ⇒ T ⇒ T =2s
28 (c) Let displacement equation of
particle executing SHM is y = a sinωt. As particle travels half of the amplitude from the equilibrium position, so a y= 2 a Therefore, = a sinωt 2 1 π ⇒ sin ωt = = sin 2 6 π ωt = ⇒ 6 π ⇒ t= 6ω
t=
29 (b) Maximum acceleration = Aω 2
m 2π = 2π ω 3k x
= 2π ⇒
…(ii)
3k x m
ω=
2π π as ω = T 2π 6 T T ⇒ t= ( A = 1cm ) 12 Hence, the particle travels half of the T s. amplitude from equilibrium in 12 ⇒
d 2x + ω 2x = 0 dt 2
⇒ ∴
π 2π =1 2 T
2
π Q 1. 57 = 2
π 2 4π 2 = 2 4 T 4 × 4π 2 2 T = π2 T 2 = 16 T = 4s
30 (b) Let block is displaced through x metre, then weight of displaced water or upthrust (upwards) = − Axρg [Q f = mg = ( Axρ )g ] where, A is area of cross-section of the block and ρ is its density. This must be equal to force (= ma) applied, where m is mass of the block and a is acceleration. ∴ ma = − Axρg Aρg ⇒ a=− x = − ω 2x m A
m x mg
This is the equation of simple harmonic motion. Time period of oscillation, m 2π T = = 2π Aρg ω ⇒T ∝
1 displacement Q T = 2π acceleration A
31 (d) In one time period, the potential energy changes its value from maximum to minimum and minimum to maximum four times. So, frequency should be four times.
32 (a) In order to find the time taken by
the particle from − 12.5 cm to + 12.5 cm on either side of mean position, we will find the time taken by particle to go from x = − 12.5 cm to x = 0 and to go from x = 0 to x = + 12.5 cm. 12.5 cm 12.5 cm m 25 cm
x=0
25 cm
Let the equation of motion be x = A sin ωt First, the particle moves from x = − 12.5 cm to x = 0 ∴ 12.5 = 25 sin ωt (Q A = 25 cm) 1 ⇒ = sin ωt 2 π ωt = ⇒ 6 t = π / 6ω Similarly, to go from position x = 0 to x = 12.5 cm π ωt = 6 π ⇒ t= 6ω ∴ Total time taken from x = − 12.5 cm to x = 12.5 cm π π π t= + = 6ω 6 ω 3 ω T π = = 2 π 6 3 T 3 = = 0.5 s 6
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OSCILLATIONS
Topic 4 System Executing SHM (Simple Pendulum and Spring Mass System) 2018 1 A pendulum is hung from the roof of a sufficiently high building and is moving freely to and fro like a simple harmonic oscillator. The acceleration of the bob of the pendulum is 20 m/ s 2 at a distance of 5 m from the mean position. The time period of oscillation is [NEET] (a) 2 s (b) π s (c) 2π s (d) 1 s
2011 2 Two simple pendulums first of bob mass M 1 (bob A) and length L1 , second of bob mass M 2 (bob B) and length L2 . M 2 = M 1 and L1 = 2L2 . If the vibrational energies of both are same. Then, which is correct? [AIIMS] (a) Amplitude of B is greater than A (b) Amplitude of B is smaller than A (c) Amplitude will be same (d) None of the above
3 The mass and diameter of a planet are twice those of the earth. The period of oscillation of pendulum on this planet will be (if it is a second’s pendulum on earth) [AIIMS] (b) 2 2 s (a) 1/ 2 s (c) 2 s (d) 1/2 s 4 Assertion (A) The percentage change in time period is 1.5%. If the length of simple pendulum increases by 3%. Reason (R) Time period is directly proportional to length of pendulum. [AIIMS] (a) Both A and R are correct and R is the correct explanation of A. (b) Both A and R are correct but R is not the correct explanation of A. (c) A is correct but R is incorrect. (d) Both A and R are incorrect. 5 A clock S is based on oscillation of a spring and a clock P is based on pendulum motion . Both clocks run at the same rate on the earth. On a planet having the same density as earth but twice the radius [AFMC] (a) S will run faster than P (b) P will run faster than S (c) both will run at the same rate as on the earth (d) both will run at the same rate which will be different from that on the earth
6 The time period of a simple pendulum of length L as measured in an elevator descending with acceleration g / 3 is [BHU] 3L 3L 3L 2L (a) 2π (b) π (c) 2π (d) 2π 2g g g 3g 7 A pendulum has time period T in air when it is made to oscillate in water, it acquired a time period T ′ = 2 T . The density of the pendulum bob is equal to (Take density of water = 1) [Haryana PMT] (b) 2 (a) 2 (c) 2 2 (d) None of these 8 A pendulum is made to hang from the ceiling of an elevator. It has period of T s (for small angles). The elevator is made to accelerate upwards with 10 m/s 2 . The period of the pendulum now will be (Take, g = 10 m/s 2 ) (a) T 2 (b) infinite [DUMET] (c) T / 2 (d) zero 9 If pendulum bob on a 2 m string is displaced 60° from the vertical and then released. What is the speed of the bob as it passes through the lowest point in its path? [VMMC] −1
(b) 2 × 9.8 ms (d) 1/ 2 ms −1
(a) 2 ms (c) 4.43 ms −1
−1
10 Two pendulums of lengths 100 cm and 121 cm start vibrating. At some instant the two are at the mean position in the same phase. After how many vibrations of the longer pendulum will the two be in the same phase at the mean position again? [MGIMS] (a) 10 (b) 11 (c) 20 (d) 21
2010 11 In the figure, S 1 and S 2 are identical springs. The oscillation frequency of the mass m is f. If one spring is removed, the frequency will become [VMMC] A
B m
S1
(a) f
(b) 2 f
S2
(c) 2 f
(d)
1 2
f
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12 An iron ball of mass M is hanged from the ceiling by a spring with a spring constant k. It executes a SHM with a period P. If the mass of the ball is increased by four times, the new period will be [DUMET] P (c) 2P (d) P (a) 4P (b) 4
2009 13 As shown in figure, a simple harmonic motion oscillator having identical four springs has time period
[BVP]
k
k k m
(c) T = 2π
21 The length of a second's pendulum is (a) 99.8 cm (b) 99 cm (c) 100 cm (d) None of these
m (b) T = 2π 2k
m k
(d) T = 2π
2m k
14 Two masses m1 and m2 are suspended together by a massless spring of force constant k, as shown in figure. When the masses are in equilibrium, mass m1 is removed without disturbing the system. The angular frequency of [BCECE] oscillation of mass m2 is (a)
k m2
(b)
k m1
(c)
20 A simple pendulum is made by attaching a 1 kg bob to a 5 m long copper wire. Its period is T. Now, if 1 kg bob is replaced by 10 kg bob, the period of oscillations (a) remains T (b) becomes greater than T (c) becomes less than T (d) Any of above depends on locality
k
m (a) T = 2π 4k
19 A clock pendulum made of invar has a period of 0.5 s at 20°. If the clock is used in a climate where the temperature averages 30°C, how much time does the clock lose in each oscillation? (for invar α = 9 × 10−7 / ° C and g = constant) [EAMCET] (b) 2.5 × 10−7 s (a) 2.25 × 10−6 s −6 −7 (d) 1.125 × 10 s (c) 5 × 10 s
k m1 m22
(d)
m1 m2
k m2 m12
15 If a simple pendulum oscillates with an amplitude of 50 mm and time period of 2 s, then its maximum velocity is [MHT CET] −1 −1 −1 (a) 0.10 ms (b) 0.15 ms (c) 0.8 ms (d) 0.26 ms −1 16 If the length of second’s pendulum is increased by 2%, then in a day the pendulum [Kerala CEE] (a) loses 764 s (b) loses 924 s (c) gains 236 s (d) loses 864 s (e) gains 346 s 17 Maximum time period of any simple pendulum on the earth is [BVP] (a) 180.5 min (b) 100 min (c) 90.5 min (d) 1.5 min 18 A simple pendulum is executing SHM with a period of 6s between two extreme positions B and C about a point O. If the length of the arc BC is 10 cm, how long will the pendulum take the move from position C to a position D towards O exactly midway between C and O? [EAMCET] (a) 0.5 s (b) 1 s (c) 1.5 s (d) 3 s
[MGIMS]
[MGIMS]
22 A pendulum suspended from the ceiling of a train has a period T when the train is at rest. When the train accelerates with a uniform acceleration a, the period of oscillation will [MGIMS] (a) increase (b) decrease (c) remain unaffected (d) become infinite
2008 23 The time period of a simple pendulum of infinite length is [take, g = 9.8 m/s 2 and radius of earth ( R e ) = 6400 km]
[MHT CET]
(a) 86.4 min (c) infinite
(b) 84.6 min (d) zero
24 A hollow sphere is filled with water through the small hole in it. It is then hung by a long thread and made to oscillate. As the water slowly flow out of the hole at the bottom, the period of oscillation will [MHT CET] (a) continuously decrease (b) continuously increase (c) first decrease, then increase (d) first increase, then decrease 25 A heavy small-sized sphere is suspended by a string of length l. The sphere rotates uniformly in a horizontal circle with the string making an angle θ with the vertical. Then, the time period of this conical pendulum is [Manipal] l l sin θ (b) t = 2π (a) t = 2π g g l cos θ l (d) t = 2π (c) t = 2π g g cos θ
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OSCILLATIONS
26 A spring of force constant k is cut into two pieces such that one piece is double the length of the other. The force constant of the longer piece will be [Kerala CEE] 2 (a) 1.5 k (b) 3 k (c) 2 k (d) k 3 1 (e) k 3 27 A simple pendulum has a time period T1 on the surface of earth of radius R. When taken to a height of R above the earth’s surface, its time period is T2 . Then, the ratio [Kerala CEE] T2 / T1 is 1 (a) (c) 2 (d) 4 (b) 2 2 1 (e) 2 28 The length of a simple pendulum executing simple harmonic motion is increased by 21%. The percentage increase in the time period of the pendulum of increased length is [RPMT] (a) 11% (b) 21% (c) 42% (d) 10.5% 29 A mass M is suspended from a spring of negligible mass. The spring is pulled a little and then released so that the mass executes SHM of time period T. If the mass is increased by m, the time period becomes 5T / 3, then the ratio of m/ M is [RPMT] 3 25 16 5 (b) (c) (d) (a) 5 9 9 3 30 The angular amplitude of a simple pendulum is θ 0 . The maximum tension in its string will be [BCECE] (a) mg (1 − θ 0 ) (b) mg (1 + θ 0 ) (d) mg (1 + θ 20 ) (c) mg (1 − θ 20 ) 31 Time period of a simple pendulum of length l is T1 and time period of a uniform rod of the same length l pivoted about one end and oscillating in a vertical plane is T2 . Amplitude of oscillations in both the cases is small. Then, T1 / T2 is [BCECE] 1 4 3 (a) (d) (b) 1 (c) 3 2 3 32 A girl swings on a cradle in sitting position. If she stands, the time period of cradle [EAMCET] (a) decreases (b) increases (c) remains constant (d) first increases, then it remains constant 33 A simple pendulum is suspended from the ceiling of a lift. When the lift is at rest its time period is T. With what acceleration should the lift be accelerated upwards in order to reduce its period to T/2? (g is acceleration due to gravity). [KCET] (a) 2 g (b) 3 g (c) 4 g (d) g
2007 34 A bob of simple pendulum executes SHM in water with a period T. The period of oscillation of the bob in air is T0 . The relation between T and T0 is [take, density of bob 400 kg/m 3 ] (ρ ) = [KCET] 3 2 (d) T = 2T0 (b) T0 = 2T (c) T = T0 (a) T0 = T
35 The time period of a simple pendulum in a stationary van is T. The time period of a mass attached to a spring is also T. The van accelerates at the rate 5 ms −2 . If the new time periods of the pendulum and spring be T p and Ts respectively, then [AFMC] (a) T p = Ts (b) T p > Ts (c) T p < Ts (d) Cannot be predicted 36 One body is suspended from a spring of length l, spring constant k and has time period T. Now if spring is divided in two equal parts which are joined in parallel and the same body is suspended from this arrangement, then new time period of body is [UP CPMT] 3T T (a) (b) T (c) 2T (d) 4 2 37 A pendulum of length 1 m is released from θ = 60°. The rate of change of speed of the bob at θ = 30° is ( Take , g = 10 ms −2 ) [AFMC] (a) 10 ms −2
(b) 7.5 ms −1 (c) 5 ms −2
(d) 5 3 ms −2
(e) 2.5 ms −2
38 A simple pendulum has a time period T in vacuum. Its time period when it is completely immersed in a liquid of density one-eighth of the density of material of the bob is [Kerala CEE]
7 5 3 8 (a) (b) (c) (d) T T T T 8 8 8 7 8 (e) T 5 39 A body of mass 20 g connected to spring of constant k executes simple harmonic motion with a frequency of 5 Hz . The value of spring constant is [Kerala CEE] π −1 −1 −1 (a) 4 Nm (b) 3 Nm (c) 2 Nm (d) 5 Nm −1 −1 (e) 2.5 Nm
40 If k s and k p respectively are effective spring constants in series and parallel combination of springs as shown in k [Haryana PMT] figure, find s . kp k
2k
k (ii) 2k
9 (a) 2
3 (b) 7
2 (c) 9
(d)
7 3
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41 A uniform spring of force constant k is cut into two pieces whose lengths are in the ratio of 1 : 2. What is the force constant of second piece in terms of k? [J&K CET] k 2k 3k 4k (a) (b) (c) (d) 2 2 2 2 42 To make the frequency double of a spring oscillator, we have to [Punjab PMET] (a) reduce the mass to one-fourth (b) quadruple the mass (c) double the mass (d) half the mass 43 What is the velocity of the bob of a simple pendulum at its mean position, if it is able to rise to vertical height of 10 cm? ( Take, g = 9. 8 ms −2 ) [BCECE] (a) 2.2 ms −1 (b) 1.8 ms −1 (c) 1.4 ms −1 (d) 0.6 ms −1
2006 44 A spring balance has a scale that reads 0 to 50 kg. The length of the spring is 20 cm. A body suspended from this spring when displaced and released. Oscillates with period of 0.60 s. What is the weight of the body? [J&K CET] (a) 22.40 kg (c) 25.30 kg
(b) 22.35 kg (d) 22.36 kg
45 What is the effect on the time period of a simple pendulum, if the mass of the bob is doubled? [Kerala CEE] (a) Halved (b) Doubled (c) Becomes eight times (d) Becomes zero (e) No effect 46 Choose the correct statement. [J&K CET] (a) Time period of a simple pendulum depends on amplitude. (b) Time shown by a spring watch varies with acceleration due to gravity. (c) In a simple pendulum time period varies linearly with the length of the pendulum. (d) The graph between length of the pendulum and time period is a parabola. 47 Time period of a spring mass system is T. If this spring is cut into two parts whose lengths are in the ratio 1 : 3 and the same mass is attached to the longer part, the new time period will be [J&K CET] 3 T (b) (a) T 2 3 3T (d) 3 T (c) 2 48 The length of second’s pendulum is 1 m on the earth. If mass and diameter of a planet is doubled than that of the earth, then its length becomes [Punjab PMET] (a) 1 m (b) 2 m (c) 0.5 m (d) 4 m
49 What effect occurs on the frequency of a pendulum, if it is taken from the earth’s surface to deep into a mine? (a) Increases [Punjab PMET] (b) Decreases (c) First increases, then decreases (d) No effect 50 A body of mass 5 kg executes SHM of amplitude of 0.5 m. If the force constant is 100 N/m, calculate its time period. (a) 1.41 (b) 0.46 [J & K CET] (c) 0.40 (d) 0.37 51 A 8 kg body perform SHM amplitude 30 cm. The restoring force is 60 N, when the displacement is 30 cm. Find its time period. [J & K CET] (a) 1.236 (b) 1.256 (c) 1.212 (d) 1.846
2005 52 If the length of a pendulum is made 9 times and mass of the bob is made 4 times, then the value of time period becomes 3 (a) 3T (b) (c) 4T (d) 2T [BHU] 2T
53 The masses and length of two simple pendulums are given as respectively m A , mB and l A , lB . If frequency of A is double that of B, then relation between l A and lB is given as [UP CPMT] lB (a) l A = (b) l A = 2lB 2 l 4 (d) l A = B . (c) l A = lB 4 54 The simple pendulum acts as second’s pendulum on earth. Its time on a planet, whose mass and diameter are twice that of the earth is [MHT CET] 1 (b) 2 2 s (c) 2s (d) (a) 2 s s 2 55 A simple pendulum of length l and mass (bob) m is suspended vertically. The string makes an angle θ with the vertical. The restoring force acting on the pendulum is (a) mg tan θ (b) −mg sin θ [MHT CET] (c) mg sin θ (d) −mg cos θ 56 A point mass m is suspended at the end of a massless wire of length L and cross-section area A. If Y is the Young’s modulus for the wire, then the frequency of oscillations for the SHM along the vertical line is [MHT CET] mL mL 1 YA 1 YA (c) (b) 2π (d) π (a) YA YA 2π mL π mL 57 A simple pendulum is taken from the equator to the pole. Its period [Kerala CEE] (a) decreases (b) increases (c) remains the same (d) decreases and then increases (e) becomes infinity
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OSCILLATIONS
58 The resultant spring constant of the system of springs shown below [Kerala CEE] k1
k2
k3
( k1 + k 2 ) (a) k1 + k 2 + k 3 k1 + k 2 (c) 2( k1 + k 2 + k 3 ) ( k + k 2 )( k 3 ) (e) 1 k1 + k 2 + k 3
( 4k1 + 2k 2 )( k 3 ) (b) k1 + k 2 + k 3 k1 k 2 k 3 (d) k1 + k 2 + k 3
59 Two simple pendulums of lengths 1.44 m and 1 m start swinging together. After how many vibrations will they again start swinging together? [J&K CET] (a) 5 oscillations of smaller pendulum (b) 6 oscillations of smaller pendulum (c) 4 oscillations of bigger pendulum (d) 6 oscillations of bigger pendulum 60 Two pendulums begin to swing simultaneously. If the ratio of the frequency of oscillations of the two is 7 : 8, then the ratio of lengths of the two pendulums will be (a) 7 : 8 (b) 8 : 7 [J&K CET] (c) 49 : 64 (d) 64 : 49 61 A spring has length l and spring constant k. If spring is divided in two equal parts, then spring constant of each part is [Punjab PMET] k (c) 2k (d) 4k (a) k (b) 2 62 The amplitude of an oscillating simple pendulum is 10 cm and its time period is 4 s. Its speed after 1 s, when it passes through its equilibrium position is [AMU] (a) zero (b) 2.0 ms −1 (c) 0.3 ms −1 (d) 0.4 ms −1 63 A simple second pendulum is mounted in a rocket. Its time period will decrease when the rocket is [AMU] (a) moving up with uniform velocity (b) moving up with uniform acceleration (c) moving down with uniform acceleration (d) moving around the earth in geostationary orbit 64 Two simple pendulums whose lengths are 100 cm and 121 cm are suspended side by side. Their bobs are pulled together and then released. After how many minimum oscillations of the longer pendulum, will be the two be in phase again? [DUMET] (a) 11 (b) 10 (c) 21 (d) 20
65 A heavy brass sphere is hung from a weightless inelastic spring and as a simple pendulum its time period of oscillation is T. When the sphere is immersed in a non-viscous liquid of density 1/10 that of brass, it will act as a simple pendulum of period [JCECE] 10 (a) T (b) T 9 9 (c) T 10
10 (d) T 9
66 The period of oscillation of a simple pendulum of constant length at surface of the earth is T. Its time period inside a mine will be [KCET] (a) cannot be compared (b) equal to T (c) less than T (d) more than T 67 The period of oscillation of a simple pendulum of length l suspended from the roof of a vehicle, which moves without friction down an inclined plane of inclination α, is given by [WB JEE] (a) 2π
l g cos α
(b) 2π
l g sin α
(c) 2π
l g
(d) 2π
l g tan α
68 A simple harmonic oscillator consists of a particle of mass m and an ideal spring with spring constant k. The particle oscillates with a time period T. The spring is cut into two equal parts. If one part oscillates with the same particle, the time period will be [AIIMS] (a) 2T (b) 2T T T (d) (c) 2 2 69 One-fourth length of a spring of force constant k is cut away. The force constant of the remaining spring will be [AFMC] 3 4 (a) k (b) k 4 3 (c) k (d) 4k 70 A body of mass 500 g is attached to a horizontal spring of spring constant 8π 2 Nm −1 . If the body is pulled to a distance of 10 cm from its mean position, then its frequency of oscillation is [Kerala CEE] (a) 2 Hz (b) 4 Hz (c) 8 Hz (d) 0.5 Hz (e) 4π Hz
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Answers 1 11 21 31 41 51 61
(b) (d) (b) (d) (a) (b) (c)
2 12 22 32 42 52 62
(b) (c) (b) (a) (a) (a) (a)
3 13 23 33 43 53 63
(b) (c) (b) (b) (c) (d) (b)
4 14 24 34 44 54 64
(c) (a) (d) (d) (d) (b) (b)
5 15 25 35 45 55 65
(b) (b) (c) (c) (e) (b) (d)
6 16 26 36 46 56 66
(a) (d) (a) (d) (d) (a) (d)
7 17 27 37 47 57 67
(b) (d) (c) (c) (b) (a) (a)
8 18 28 38 48 58 68
(c) (b) (d) (d) (c) (e) (c)
(b) (a) (c) (c) (b) (a) (b)
9 19 29 39 49 59 69
10 20 30 40 50 60 70
(a) (a) (d) (c) (a) (d) (a)
Explanations 1 (b) The acceleration of particle/body executing SHM at any instant (at position x) is given as a = − ω 2x where, ω is the angular frequency of the body. …(i) ⇒ | a | = ω 2x Here,
x = 5m, | a | = 20 ms−2
Substituting the given values in Eq. (i), we get 20 = ω 2 × 5 20 ω2 = =4 ⇒ 5 or ω = 2 rad s−1 As, we know that time period, T = 2π / ω …(ii) ∴Substituting the value of ω in Eq. (ii), we get 2π T = =πs 2
2 (b) Frequency, n = ⇒ ⇒ ⇒ ⇒ ⇒
1 2π
1 l n1 l2 = = n2 l1 n1 1 = n2 2 n2 = 2 n1
g l
n∝
L2 2L2
n2 > n1 1 Energy, E = mω 2 A 2 = 2π 2mn2 A 2 2 1 and (Q E is same) A2 ∝ mn2 A12 m2n22 ∴ = A22 m1n21 Given, n2 > n1 and m1 = m2 ⇒ A1 > A2. So, amplitude of bob B is smaller than bob A.
GM (G is constant) R2 Rp2 gearth M ∴ = e × 2 gplanet M p Re ge 2 = ⇒ gp 1 gp 1 T Also, T ∝ ⇒ e = Tp ge g
3 (b)Gravity, g =
⇒
2 = Tp
7 (b) The effective acceleration of a bob
σ in water, g′ = g 1 − ,where, σ and ρ ρ are the densities of water and the bob, respectively. Since, the periods of oscillation of the bob in air and water are given as l l and T ′ = 2π T = 2π g g′
1 ⇒Tp = 2 2 s 2
∴
4 (c) Time period of simple pendulum of length l is T = 2π l / g ⇒
T ∝ l
Hence, time period of simple pendulum is inversely proportional to square root to length of pendulum. ∆T 1 ∆l ∴ = [Qg = constant ] T 2 l ∆T 1 = × 3 = 1.5% T 2 5 (b) Acceleration due to gravity, 4 G × πR 3ρ GM 4 3 g= 2 = = πGρR 3 R R2 ⇒ g∝R For pendulum clock, g will increase on the planet so time period will decrease. But for spring clock, it will not change. Hence, P will run faster than S.
6 (a) The effective acceleration in a lift g descending with acceleration is 3 g 2g geff = g − = 3 3 Time period of simple pendulum, ∴ ⇒
T = 2π
L L = 2π 2g / 3 geff
3L T = 2π 2g
8.
T = T′
g′ = g
σ g 1 − ρ g
T σ 1 = 1 − = 1 − [Q σ = 1] T′ ρ ρ T 1 Putting = T′ 2 1 1 We obtain, = 1 − ⇒ ρ=2 2 ρ (c) When the elevator is at rest, its time period is given by l l T = 2π = 2π 10 g When the elevator accelerates upwards, its time period becomes l l T ′ = 2π = 2π 10 + 10 g+a [QT − mg = ma ⇒T = m(g + a)] 1 l l T = 2π = 2π × = 20 10 2 2
9 (b) Velocity of bob, v = 2gl (1 − cosθ ) [using v 2 = u2 + 2gh ] v = 2 × 9.8 × 2 × (1 − cos 60° ) v = 2 × 9.8 ms –1
cos θ l
θ
l m
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OSCILLATIONS
Now, maximum velocity = ωA = π × 50 × 10−3 ~ 0.15 ms−1 = (3.14) × 50 × 10−3 −
10 (a) Let the two pendulums are in same phase, after n vibrations of the longer pendulum. In this time, the shorter pendulum will complete (n + 1) vibrations. l l ∴ n × 2π 2 = (n + 1) 2π 1 g g n × 2π
16 (d) As time period, T = 2π l / g
11 n = 10 (n + 1) ⇒ n = 10
11 (d) For the given figure, 1 2π
k eq m
…(i)
1 2k 2π m If one spring is removed, then k eq = k 1 k …(ii) and f′ = 2π m From Eqs. (i) and (ii), we get 1 f f = 2 ⇒ f′ = f′ 2 f =
12 (c) The time period of the iron ball would be given by, M K So, if mass of the ball is increased to 4 times of its initial mass, then the new period becomes 4M P′ = 2π = 2P K P = 2π
13 (c) As equivalent spring constant when joined in series, k ×k k = ks = k+k 2 Now, the springs are in parallel this equivalent. k k Spring constant, k p = + = k 2 2 Thus, overall k does not change and time period will remain same as T = 2π m / k
14 (a) The angular frequency after
17 (d) The maximum time period of any pendulum on the earth is 1.5 min.
effective value of g increases (i.e. resultant of g and a) 1 Also, the time period, T ∝ geffective So, time period will decreases, while geffective increases.
23 (b) Radius of earth, Re = 6400 km = 6.4 × 106 m, g = 9.8 m/s 2 Time period of simple pendulum of infinte length, T = 2π
18 (b) As time period, T = 6 s
19
Time to come from D to C or C to D T T T 6 = − = = =1s 4 12 6 6 (a) Time period of simple pendulum, l ∆T 1 ∆l , = T = 2π g T 2 l But at temperature θ°C, increase in length of pendulum, ∆l = α∆θ l ∆T 1 ∴ = α∆θ T 2 ∆T 1 ⇒ = × 9 × 10−7 × (30 − 20) T 2 1 = × 9 × 10−7 × 10 2
6.4 × 106 Re . = 2 × 314 9.8 g
= 5076 s = 84.6 min
24 (d) The time period of the pendulum, T = 2π l / g ⇒ T ∝ l Initially, the centre of mass CM of the sphere is at the centre of the sphere. As the water slowly flows out of the hole at the bottom, the CM of the liquid (hollow sphere) first goes on downward and then upward. Hence, the effective length of the pendulum first increases and then decreases.
25 (c) Radius of circular path in the horizontal plane ∆DAB, r = l sinθ Resolving T along the vertical and horizontal directions, we get …(i) T cosθ = Mg
= 4.5 × 10−6 or
∆T = 4.5 × 10−6 × 0.5
θ
= 2.25 × 10−6 s
T = 2π
21 (b) Time period of second pendulum
T sin θ r
T sin θ = Mrω 2 = M (l sin θ )ω 2 ⇒
l = 2 [where, l = length g of second pendulum] 2 l π =1 g
2π
g 9.8 [g = 9.8 m / s2] l= 2 = 2 π π ~ 99 cm = 0.9929 m = 99.29 cm −
T = Mlω 2
…(ii)
On dividing Eq. (ii) by Eq. (i), we get lω 2 1 = ⇒ cosθ g
T = 2s
⇒
T cos θ
l g
It is independent of the mass of the bob. Therefore, time period of the pendulum will remain T.
15 (b) As amplitude
T
l
20 (a) Time period of a simple pendulum,
removing the mass m1 of m2 is given by k (as system is undisturbed) ω= m2 = 50 mm = 50 × 10−3 m 2π Time period, T = ω 2π 2π = = π rad /s ⇒ ω= T 2
l 1 ∆ = × 2 = 1% l 2
∴ Loses in seconds in a day 24 × 3600 = 100 = 36 × 24 = 864 s
121 100 = (n + 1) 2π g g
f =
∆T 1 = T 2
⇒
22 (b) When train accelerates, the
∴ Time period, t =
ω2 =
l cosθ 2π = 2π g ω
26 (a) As, l1 + l2 = l l 3 l 2l l2 = l − l1 = l − = 3 3
⇒ l1 + 2l1 = l or l1 = Also,
g l cosθ
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Again, ⇒ ⇒
1 l k2 l l 3 = = = k l2 2l / 3 2 3 k 2 = k = 1.5k 2 k∝
27 (c) As, time period, T ∝ l / g T1 = T2
⇒
g2 g1
…(i)
If g1 = g , then g g g2 = = 2 2 R h 1 + 1 + R R
(as h = R )
g g2 = ∴ 4 On putting these values in Eq. (i), we obtain T1 g/4 1 1 = = = T2 g 4 2 T2 =2 T1
⇒
28 (d) As, T = 2π Given, ⇒
l ∆T 1 ∆l = ⇒ g T 2 l
∆l = 21% l ∆T 1 = × 21% = 10.5% T 2
⇒
M k
5T M +m = 2π 3 k
⇒
B A
…(ii)
9M + 9m = 25M ⇒16M = 9m m 16 = M 9
30 (d) The simple pendulum at angular
= mg ×
When the lift is moving up with an acceleration a, then time period becomes l T ′ = 2π g+a T′ =
⇒
T l = 2π 2 g+a
l sinθ 2 θ
On dividing Eq. (ii) by Eq. (i), we get
34
a = 3g 400 (d) Given, ρ bob = kg/m 3 3 and ρ water = 1000 kg/m 3
T = 2π = 2π
L g′ g g′ = 4
4L g
= 2 × 2π
L = 2T0 g
35 (c) Time period of simple pendulum placed in a van accelerating at the rate of a ms−2 is given by a a
if θ is small, ~ sinθ − θ
l 2
ml 2 / 3 2 l = 2π mgl / 2 3 g
T1 = T2
3 2
…(ii)
2
Hence,
T 2
Here,
a +
mg
T2 = 2π
…(i)
2
∴
l g
√g
A
= mg
T
B
Inertia factor Spring factor
Here, inertia factor = moment of inertia of rod at one end ml 2 ml 2 ml 2 = + = 12 4 3 Spring factor = Restoring torque per unit angular displacement
l−h In ∆OCB, cosθ = l
h
T = 2π
∴
T2 = 2π
amplitude θ 0 is shown in figure
θ
given by
If g′ be the gravitational acceleration in water, then ρ g 1000 × 3 g′ = 1 − water g = 1 − g = 4000 4 ρ bob
l θ
…(i)
9 M = 25 M + m
M , M +m
l
33 (b) Time period of simple pendulum is
l g
and time period of a uniform rod in given position is given by
On dividing Eq. (i) by Eq. (ii), we have 3 = 5
On standing the effective length of the pendulum measured from the point of suspension decreases. Hence, the time period of cradle decreases.
31 (d) Time period of simple pendulum is given by T1 = 2π
l g
where, l is the length of simple pendulum.
Thus, using Eqs. (i), (ii) and (iii), we obtain 2mg Tmax = mg + l (1 − cosθ 0 ) l θ2 = mg + 2mg 1 + 0 2
M +m k
T ′ = 2π
32 (a) Time period, T = 2π
= mg (1 + θ 20 )
29 (c) Time period, T = 2π and
Maximum tension in the string is mv 2 …(i) Tmax = mg + l When bob of the pendulum comes from A to B, it covers a vertical distance h l−h ∴ cosθ 0 = l …(ii) ⇒ h = l (1 − cosθ 0 ) Also, during B to A, potential energy of bob converts into kinetic energy, 1 i.e. mgh = mv 2 2 …(iii) v = 2gh ∴
g 1
2 l T = 2π g 2 + a2
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OSCILLATIONS
However, the time period of mass attached to the spring is
ρ g , in upward direction 8 Therefore, the resultant force acting on bob in downward direction ρ 7Vρg = Vρg − V g = 8 8 Therefore, effective value of g in liquid 7 is g. 8 l 8 ∴ Time period, T ′ = 2π = T (7g / 8) 7 (ii) V
m T = 2π k It is independent of g as well as a. Hence, when the van accelerates, the time period of the simple pendulum decreases and that of spring remains unchanged. Hence, Tp < T and Ts = T i.e. Tp < Ts
36 (d) When spring of spring constant k is divided in two equal parts, then spring constant of each part becomes 2k. ∴Spring constant in parallel combination, k ′ = 2k + 2k = 4 k m m 1 m ∴ T ′ = 2π = 2π = . 2π 4k 2 k′ k 1 T = .T = 2 2
39 (c) Mass, m = 20 g = 0.02 kg Frequency,
l T = 2π g ∴
ω=
⇒
2π = T
g g , ω2 = l l
or g l
k 5 1 k or 10 = = 0.02 π 2π 0.02 k 100 = ⇒ k = 2 Nm −1 0.02
40 (c) In the arrangement shown in Fig. …(i)
Amplitude when angular displacement is 60° 2πl 2πl = × 60° = 360° 6 Therefore, displacement when angular displacement is 30° 1 2πl πl …(ii) = , y = 2 6 6 Acceleration, a = − ω 2 y Using Eqs. (i) and (ii), we get g πl 10 × 3.14 a=− × =− l 6 6 ~ 5 ms−2 = −5.2 ms−2 −
38 (d) Let l be the length of simple
pendulum, V be the volume and ρ be the density of the material of bob. ρ ∴ Density of the liquid = 8 Time period of simple pendulum in l vacuum, T = 2π g
(i), the two springs are in series. The effective spring constant k s of this arrangement is 1 1 1 1 2+1 3 or = + = = k s k 2k ks 2k 2k 2k ⇒ ks = 3 In the arrangement shown in Fig. (ii), the two springs are in parallel. The effective spring constant k p of this arrangement is kp = k1 + k2 ⇒ = k + 2k = 3k k s 2k / 3 2 = = ∴ kp 3k 9
41 (a) Let the force constant of 2nd piece be k 2 As, ⇒ ⇒
k∝
1 l
k 1 l2 k 2l / 3 = = ⇒ k 2 l1 k2 l/3 k (Q k 1 = k ) k2 = 2
42 (a) The frequency of spring oscillator is
When the simple pendulum is completely immersed in a liquid, then forces acting on bob are (i) Vρg , in downward direction
5 Hz π
Time period of a loaded spring, T = 2π m / k 1 k Frequency, f = 2π m
37 (c) For a simple pendulum, time period,
f =
ν= ⇒
1 2π
k m
1 ν∝ m
Hence,
m ν1 = 2 m1 ν2
or
m2 ν 1 ν 1 = = = 2ν 4 m1 ν 2
⇒
m2 =
2
m1 4
43 (c) The bob possess kinetic T θ energy at its mean position which gets converted to potential energy at 10 cm h height h. But the v total energy A remains conserved in accordance with principle of conservation of total mechanical energy. KE = PE Let velocity of bob at mean position is v and m be its mass, then 1 2 mv = mgh 2 v = 2gh ⇒ Putting g = 9.8 ms−2 , h = 0.1 m ∴
v = 2 × 9.8 × 0.1 = 1.4 ms−1
44 (d) m = 50 kg, y = 20 cm, T = 0.6 (second) F = mg = 50 × 98 N F K = = 2450 N/m y m m or 0.6 = 2π 2450 k m = 22.36 kg ∴ weight of the body = mg = 22.36 × 9.8 = 2191 . N = 22.36 kg T = 2π
45 (e) The time period of a simple pendulum is T = 2π
l g
where, l is length of suspension of pendulum, g is acceleration due to gravity. From the above expression, it is clear that time period of a simple pendulum is not dependent on the mass of bob, hence no effect.
46 (d) The relation between time period (T) and length of pendulum (l) is T = 2π l / g
l
t
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
On squaring and rearranging the terms, we get l T 2 = 4π 2 g which is general equation ( y2 = 4 ax ) of a parabola.
47 (b) The spring mass system oscillates in SHM, its time period is given by T = 2π m / k When spring is cut into ratio 1 : 3, the new time constant is k ′ = 3k ∴ ⇒
3k k T T′ = 3
Since, n ∝ g , and g decreases therefore frequency also decreases.
50 (a) Given m = 5 kg, k = 100 N/m and A = 0.5 m. T = 2π
F = 60 N and y = 0.30 m F = − Ky − F −60 K = = = −200 N/m y 0.30 K 200 = = 5 s −1 m 8 2π 2 × 22 44 T = = = = 1256 . 7×5 35 ω ω=
where, M is mass and R is radius. R 2l T = 2π =2 GM
52 (a) The periodic time of a simple …(i)
pendulum is given by
4 R 2l′ G (2M )
…(ii)
From Eqs. (i) and (ii), we have R 2l 4 R 2l′ = GM G (2M ) l′ = 0.5 m
[∴ l = 1 m]
49 (b) On going below depth h from the surface of the earth. The value of g′ h below is given by g′ = g 1 − , Re hence, g decreases.
where, l is length of pendulum, g is acceleration due to gravity. Given, T1 = T , l1 = l , l2 = 9l T1 l 1 1 ∴ = 1 = = T2 l2 9 3 ⇒
O
T2 = 3T1 = 3T
53 (d) The frequency is given as n=
1 2π
So,
nA = nB
lB lA
⇒
2n = n
lB lA
⇒
lA =
h Re– h
l g
T = 2π
Second’s pendulum on other planet is
g l
⇒ n∝
1 l
lB 4
54 (b) Second’s pendulum is that simple Also, Time period,
T =
1 Frequency (n)
l T = 2π g
pendulum whose time period of vibration is two second. The bob of such pendulum while oscillating passes through the mean position after every one second.
⇒ T ∝
1 g
…(i)
GM (on the earth) R2 G (2M ) but (on the planet) g′ = 4 R2 1 GM g = = 2 R2 2 Eq. (i) gives g T′ = = 2 T g′ but
or
51 (b) Given, m = 8 kg, a = 30 cm
g = GM / R 2
⇒
5 100 T = 141 . s
⇒
Also, if the periodic time of a pendulum is 2 s, then it is called a second’s pendulum.
2 = 2π
m k
T = 2π
harmonic, hence its time period is given by l displacement T = 2π = 2π g acceleration
∴
Now, time period of simple pendulum is given by
l g
where, l is length of pendulum. l 1 ∴ = 2π n h g 1 − Re
T = T′
48 (c) The motion of the bob is simple
Also,
T = 2π
and
g=
T ′ = 2T =2 2s
55 (b) When the
(given,T = 2 s) S
bob is displaced T θ to position P mg P through a small l A B θ mg cos θ angle θ from the vertical, O mg sin θ then various forces acting on the bob at P are (i) the weight mg of the bob acting vertically downwards. (ii) the tension T in the string acting along PS. Resolving mg into two rectangular components, we get (a) mg cosθ acts along PA, opposite to tension T (b) mg sinθ acts along PB, tangent to the arc OP and directed towards O. If the string neither slackens nor breaks but remains taut, then T = mg cosθ The force mg sinθ tends to bring the bob back to its mean position O. ∴ Restoring force acting on the bob is F = − mg sinθ mg and strain 56 (a) In this case, stress = A l (where, l is extension) = L Now, Young’s modulus Y is given by Stress mg / A Y= = l/L Strain YAl mg = (Q mg = kl ) L YAl YA So, kl = ⇒ k= L L Now, frequency is given by n=
1 2π
1 k = m 2π
YA mL
355
OSCILLATIONS
57 (a) Time period of pendulum is given
=
by 1 l or T ∝ g g If simple pendulum is taken from the equator to the pole, acceleration due to gravity increases. Hence, time period of pendulum decreases [Q gpole > gequator ] T = 2π
58 (e) The first two springs are in parallel, so their equivalent spring constant k′ = k1 + k2 Now, this combination is in series with the third spring, so their equivalent spring constant k ′ × k 3 (k 1 + k 2 )(k 3 ) k= = k′ + k3 k1 + k2 + k3
59 (a) Given, l1 = 1.44 m, l2 = 1 m Now, the ratio of time periods of two T 1.44 pendulums, 1 = = 1.2 T2 1 Now, the ratio is positive integer. So, 1.2 would be the integers after multiplied (atleast) by 5. Thus, required answer will be 5 oscillations.
60 (d) The frequency of oscillation of pendulum of length l is given by 1 g n= 2π l Given, n1 : n2 = 7 : 8 , then l n1 l 7 = 2 ⇒ = 2 l1 n2 l1 8 On squaring, we get
l1 64 = l2 49
61 (c) Spring constant, k = F / l If spring is divided into two equal parts, then length l will become half. So, the spring constant will become double, i.e. will become 2k.
62 (a) Given, A = 10 cm = 0.1 m,T = 4 s, t = 1 s. Speed of oscillating simple pendulum is given by dy v= = ν = Aω cosωt dt (as y = A sin ωt ) 2π 2π =A× cos t T T 2π × 0.1 2π × 1 cos = 4 4
2π × 0.1 π cos = 0 4 2
63 (b) The time period of simple pendulum is T = 2π
l g
⇒ T ∝
1 g
T will decrease, when g increases and g will increase when rocket moves up with a uniform acceleration.
64 (b) The time period of a simple pendulum is T = 2π l / g
∴
T1 = T2
T ∝
⇒
l1 l2
(where, l is length of pendulum) Given, l1 = 100 cm, l2 = 121 cm T2 121 11 ⇒ = = T1 100 10
1 g
Let mine be at a depth h below the surface of the earth having radius R, then h g′ = g 1 − , Hence, g decreases R Therefore, from Eq. (i), T increases.
67 (a) We are given that the simple pendulum of length l is hanging from the roof of a vehicle which is moving down the frictionless inclined plane. So, its acceleration is g sinα. Since, vehicle is accelerating a pseudo force m(g sin α ) will act on bob of pendulum which cancel the sinα component of weight of the bob. Hence, we can say that the effective acceleration would be equal to geff = g cosα
In a given time, shorter pendulum will make one oscillation more than the longer.
Now, the time period of oscillation is given by
Let after n oscillations, the pendulums are in same phase, then n × 11 = (n + 1) × 10 ⇒ n = 10
T = 2π
65 (d) The time period of a pendulum in air, T = 2π l / g
…(i)
l being the length of simple pendulum. In liquid, effective weight of sphere w ′ = weight of bob in air − upthrust ⇒ ρvgeff = mg − m′ g = ρVg − ρ′ Vg = (ρ − ρ′ )Vg where, ρ′ = density of sphere ρ = density of liquid. 9 ρ − ρ /10 ∴ geff = g g= ρ 10 Thus,
T ′ = 2π T′ 10 = T 9
l = 2π geff ⇒
l 9 g 10
T′ =
10 T 9
66 (d) Value of g decreases on going below the earth’s surface. The time period (T ) of a simple pendulum of length l and acceleration due to gravity g is given by l …(i) T = 2π g
l l = 2π geff g cosα
68 (c) Mass of the particle = m Spring constant = k Time period of oscillator, T = 2π k∝
As
m k
1 l
(where, l is the length of spring) k ′ = 2k m 1 ∴ T ′ = 2π = T 2k 2 1 69 (b) By using, k ∝ l Since, one-fourth length is cut away, 3 so remaining length is th, hence, k 4 4 4 becomes times, i.e. k ′ = k . 3 3 Q
70 (a) The stretched spring oscillates in accordance with the Hooke’s law which goes as 1 2 1 2 k ν mv = kx ⇒ ω 2 = Qω = 2 2 x m ⇒ f=
1 2π
1 k = m 2π
8π 2 = 2Hz 0.5
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 5 Free, Damped, Forced Oscillations & Resonance and Superposition of SHM state of maximum amplitude of the oscillation is a measure of [CG PMT] (a) free vibration (b) damped vibration (c) forced vibration (d) resonance
2015 1 When two displacements represented by y1 = a sin (ωt ) and y 2 = b cos (ωt ) are superimposed, the motion is [CBSE AIPMT] (a) not a simple harmonic a (b) simple harmonic with amplitude b 2
(c) simple harmonic with amplitude a + b (d) simple harmonic with amplitude
given by y = 4 cos
very sharp when the (a) applied periodic force is small (b) quality factor is small (c) damping force is small (d) restoring force is small
2
(a + b ) 2
2014 2 The displacement of a particle in a periodic motion is 2
2007 5 In case of a forced vibration, the resonance wave becomes
( t / 2) sin (1000t ). This
displacement may be considered as the result superposition of n independent harmonic oscillations. Here, n is [WB JEE] (a) 1 (b) 2 (c) 3 (d) 4
2009 3 Two simple harmonic motions are given by
π x = A sin (ωt + δ ) and y = A sin ωt + δ + act on a 2 particle simultaneously, then the motion of particle will be (a) circular anti-clockwise [UP CPMT] (b) elliptical anti-clockwise (c) elliptical clockwise (d) circular clockwise
4 If the differential equation given by dy d2 y + 2k + ω 2 y = F0 sin pt 2 dt dt describes the oscillatory motion of body in a dissipative medium under the influence of a periodic force, then the
2006 6 A particle is executing two different simple harmonic motions, mutually perpendicular, of different amplitudes and having phase difference of π/2. The path of the particle will be [Manipal] (a) circular (b) straight line (c) parabolic (d) elliptical 7 During the phenomenon of resonance [DUMET] (a) the amplitude of oscillation becomes large (b) the frequency of oscillation becomes large (c) the time period of oscillation becomes large (d) All of the above 8 The equation of a damped simple harmonic motion is d 2x dx + kx = 0. Then, the angular frequency of m 2 +b dt dt oscillation is [Manipal] 1/ 2 1/ 2 2 k b b k (a) ω ′ = − (b) ω ′ = − m 4m m 4m2 k b2 (c) ω ′ = − m 4m
1/ 2
Answers 1 (c)
2 (c)
3 (d)
4 (d)
5 (c)
[BHU]
6 (d)
7 (a)
8 (a)
k b2 (d) ω ′ = − m 4m2
357
OSCILLATIONS
Explanations 1. (c) Given, y1 = a sinωt
π y2 = b cosωt = b sin ωt + 2
x 2 + y2 = A 2
⇒
y
The resultant displacement is given by 2
2
y = y1 + y2 = a + b sin(ωt + φ )
executing resonant vibrations. Less the damping, greater will be sharpness.
_
T1/2 A A
6 (d) If the equations of two mutually x
Hence, the motion of superimposed wave is simple harmonic with amplitude a2 + b2 . t 2 (c) Given, y = 4 cos2 sin (1000t )
2 2 t = 2 × 2 cos ⋅ sin (1000t ) 2 t Q 2 cos2 = (1 + cos t ) 2
= 2(1 + cos t ) sin (1000t ) = 2 sin (1000t ) + 2 cos t ⋅ sin (1000t ) = 2 sin (1000t ) + 2 sin (1000t ) ⋅ cos t = 2 sin (1000t ) + sin (1000t + t ) + sin (1000t − t ) [Q 2 sin A ⋅ cos B = sin ( A + B ) + sin ( A − B )] = 2 sin (1000t ) + sin (1001t ) + sin (999t ) So, n=3 (Q above equation shows three inside independent oscillations)
3 (d) Given, x = A sin (ωt + δ ) and
…(i)
π y = A sin ωt + δ + 2 …(ii) = A cos (ωt + δ )
On squaring and adding Eqs. (i) and (ii), we get x 2 + y2 = A 2 [sin 2 (ωt + δ ) + cos2 (ωt + δ )]
which is the equation of a circle. Now, At (ωt + δ ) = 0, x = 0, y = 0 At (ωt + δ ) = π / 2, x = A, y = 0 At (ωt + δ ) = π , x = 0, y = − A At (ωt + δ ) = 3π / 2 , x = − A, y = 0 At (ωt + δ ) = 2π , x = A, y = 0 From the above data, the motion of a particle is a circle transversed in clockwise direction.
4 (d) The differential equation, dy d2 y + 2k + ω 2 y = F0 sin pt 2 dt dt shows oscillatory motion (forced). The state of maximum amplitude of the oscillation is the measure of resonance.
5 (c) In resonant vibrations of a body, the frequency of external force applied on the body is equal to its natural frequency. If on increasing and decreasing the frequency of external force from the natural frequency by a factor, the amplitude of vibrations reduces very much. In this case, sharp resonance will take place. But if it reduces by a small factor, then flat resonance will take place. The sharp and flat resonance will depend on damping present in the body
perpendicular SHM of same frequency be x = a1 sinωt and y = a2 sin(ωt + φ ) General equation of Lissajous’ figure is x 2 y2 2xy + − cos φ = sin 2 φ a12 a22 a1a2 When φ =
x2 y2 π , then 2 + 2 = 1 2 a1 a2
which represents the path of ellipse.
7 (a) During the phenomenon of resonance, the amplitude of oscillation becomes large. Because applied frequency is equal to natural frequency.
8 (a) Damping force, Fd = −bv where, b = damped constant, v = velocity of oscillation and 1 k k , where ω 0 = 2πν 0 = 2π . = 2π m m ω 0 = angular frequency of free oscillation. Displacement of damped oscillator is given by x = xme− bt / 2m sin (ω′ t + φ ), where, ω′ = angular frequency of damped oscillator. 2
∴
b ω′ = ω 20 − = 2m
k b2 − m 4 m2
14 Waves Quick Review Wave Motion A wave motion is a means of transferring energy and momentum from one point to another without actual transport of matter between two points. Important properties of medium for wave motion are given below (i) The medium must possesses inertia so that its particles can store kinetic energy. (ii) In order to make the particles return to their original position after getting disturbed, the medium must possesses elasticity. (iii) There should be minimum frictional force between the particles of medium.
Characteristics of Wave Motion (i) In a wave motion, the disturbance travels through the medium due to repeated periodic oscillations of the particles of the medium about their mean positions. (ii) The energy is transferred from one place to another without any actual transfer of the particles of the medium. (iii) There is a continuous phase difference between two successive particles because each particle receives disturbance a little later than its preceding particle. (iv) The velocity of a wave is different from the velocity with which the particles vibrate simple harmonically about their mean positions.
(v) In a given medium, the wave velocity remains constant, while the particle velocity changes continuously during its vibration about the mean position. The particle’s velocity is maximum at the mean position and zero at the extreme position. (vi) For the propagation of a mechanical wave, the medium must possesses the properties of inertia, elasticity as well as friction.
Definitions Related to the Wave Motion Some important definitions related to the wave motion are given below (i) Amplitude The maximum displacement suffered by the particles of the medium from their mean position is called amplitude. It is denoted by A (ii) Time Period The time in which a particle of the medium completes one vibration to and fro about its mean position, is known as time period of a wave. It is denoted by T. (iii) Frequency The number of waves produced per unit time in the given medium, is known as frequency of a wave. It is denoted by ν. (iv) Wavelength The distance covered by a wave during the time in which a particle of medium completes one vibration about its mean motion, is known as wavelength of a wave. It is denoted by λ.
359
WAVES
(v) Wave Number The number of waves present in a unit distance along the direction of propagation is known as wave number. It is equal to the reciprocal of wavelength ( λ ). It is denoted by ν. 1 ∴ ν= λ The SI unit of wave number is m −1 . (vi) Phase The position of a point in time on a waveform is known as the phase of a wave. Phase can also be expressed as relative displacement between two corresponding peaks of a waveform. (vii) Path Difference The difference in the path traversed by the two waves, measured in the terms of wavelength of the associated waves is called path difference. (viii) Speed of a Wave Wave speed is a measure of how fast a wave travels. It is calculated as a ratio of how far a wave travels to the time taken by the wave to travel that distance.
Mechanical Waves Waves which requires a material medium for their propagation are known as mechanical waves. Mechanical waves can be further categorised as (i) Transverse Wave In this type of wave, the particles of the medium oscillate perpendicular to the direction of propagation of wave in the form of crests and troughs. (ii) Longitudinal Wave In this type of wave, the particles of the medium oscillate about their mean position along the direction of wave propagation in the form of compressions and rarefactions.
Sound Waves Sound is a form of energy which produces a sensation of hearing in our ears. Sound waves are longitudinal in nature.
Speed of a Longitudinal (Sound) Wave in a Medium • Speed of sound wave ( v ) in a medium (for solids, liquids
and gases) are expressed below Y (i) For solids, v = ρ
where, Y = Young’s modulus and ρ = density of solid. B (ii) For liquids, v = ρ where, B = bulk modulus of elasticity. p where, p = pressure exerted by gas. (iii) For gases, v = ρ
This is also known as Newton’s formula. For gases, bulk modulus is equal to pressure of the gas. • The modification of Newton’s formula is referred to as γp the Laplace correction which is expressed as v = ρ Cp where, γ = adiabatic constant = CV and C p , CV = specific heat capacities of gas at constant pressure and constant volume. • For a gas,
v rms = v sound
3 p/ρ γp / ρ
=
3 γ
• Speed of sound can be compared as follows
v solid > v liquid > vgas
Factors Affecting the Speed of Sound Factors that affect the speed of sound in air are as follows (i) Effect of Temperature The velocity of sound in air increases roughly by 0.61 ms −1 with per degree centigrade rise in temperature. It means sound travels faster in warm air. γRT v= M where, R = universal gas constant, M = molecular mass of gas and T = absolute temperature. (ii) Effect of Pressure It is not effected by the pressure change, if the temperature of the gas remains constant. (iii) Effect of Humidity Its speed in moist-air is slightly greater than dry air . (iv) Effect of Frequency Its speed in air is independent of its frequency.
Characteristics of Sound Sound has following three characteristics energy (i) Loudness It is related to the intensity of time × area sound and is measured in the unit ‘bel’ as I L1 − L2 = 10 log 10 I0 where, I is the intensity of sound to be measured and I 0 is a constant reference intensity 10−12 Wm −2 . (ii) Pitch It is related to the frequency of sound. A shrill or sharp sound has high frequency, hence higher pitch and a grave or dull sound has low frequency, hence lower pitch. (iii) Quality The property of sound due to which difference between two sounds can be made is quality of sound.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Progressive Wave A transverse or longitudinal wave that travel from one point of the medium to another is called a progressive wave. Displacement relation for a wave travelling in + X direction is given by x t y = A sin 2π − ± φ T λ
while displacement relation for a wave travelling in − X direction is given by t x y = A sin 2π + ± φ T λ • In terms of speed of wave ( v ), above relation can be
written as
2π For + X direction, y = A sin ( vt − x ) ± φ λ 2π For − X direction, y = A sin ( vt + x ) ± φ λ In the above equation, v represent speed of wave. • Other forms of displacement relation for progressive waves are y = A sin {(ωt ± kx ) ± φ} = A sin {k (vt + x ) ± φ} x = A sin ω t + ± φ v
2π is the angular frequencies and T 2π ω k= = , λ v where λ is wavelength, v is wave velocity and k is called angular wave number or propagation constant. • The relation between the phase difference, path difference and time difference of a plane progressive wave is represented as 2π Phase difference (∆φ) = × Path difference ( x ) λ • Particle velocity and acceleration in plane progressive harmonic wave As particle displacement, y = A sin(ωt − kx ) dy = Aω cos(ωt − kx ) ∴ Particle velocity, v = dt Here, ω =
Again differentiating the above equation, we get
Energy in Wave • Energy density ( u ) is the total mechanical energy per unit
volume of the medium in a wave. It is expressed as 1 u = ρω 2 A 2 2 where, A = amplitude of wave, ω = angular frequency and ρ = density. • Intensity ( I ) is the flow of energy per unit cross-section of the medium (string) in unit time is expressed as 1 P I = ρω 2 A 2 v or 2 4 πd 2 where, d = distance from line source. • Power ( P ) is the instantaneous rate at which energy is transferred along the medium (string) is expressed as 1 P = ρω 2 A 2 SV 2 where, ρ = density of the medium.
Principle of Superposition of Waves • According to this principle, resultant displacement at any
point is the vector sum of the displacement produced by the two waves when they travel simultaneously in a medium. i.e. y = y1 + y 2 where, y1 and y 2 are displacement of particles at a particular time due to two waves. • In superposition when two waves of same frequency (or wavelength) superimpose, interference of waves is seen as result. • Resultant displacement will be represented as y = y1 + y 2 = A sin(ωt + φ ) where, and
d2 y dt
2
= − Aω 2 sin(ωt − kx ) = − ω 2 y
tan θ =
A12 + A 22 + 2A1 A 2 cos φ A 2 sin φ . A1 + A 2 cos φ
• A = A1 + A 2 = A max is known as constructive
interference, where phase difference φ = 0° or 2nπ ( n = 1, 2, 3, … ). • A = A1 ~ A 2 = A min is known as destructive interference, where phase difference φ = ( 2n − 1)π ( n = 1, 2, 3, … ). • Resultant intensity, I = I 1 + I 2 + 2 I 1 I 2 cos φ where, I 1 , I 2 = intensities due to two waves, I max = I 1 + I 2 + 2 I 1 I 2
Particle acceleration, a=
A=
and
I min = I 1 + I 2 − 2 I 1 I 2 .
361
WAVES
At a rigid boundary, the reflected wave is given by
Beats
y r ( x, t ) = a sin ( kx + ωt + π ) = − a sin ( kx + ωt ) • Different result related to reflection of waves are given in tabular form
• The alternate rise and fall of sound at a given position,
when two sound waves of slightly different frequencies or amplitudes superimpose at a given point is called beats. • Beat frequency Number of beats formed per second are expressed as ( ν1 ~ ν 2 ), i.e. either ( ν1 − ν 2 ) or ( ν 2 − ν1 ) where ν1 , ν 2 are frequencies of two sound waves. • Beat Period It is the reciprocal of beat frequency expressed as 1 T= ν1 − ν 2 • Essential condition for hearing beats is that ( ν1 ~ ν 2 ) should not exceed 10.
Wave property
Reflection
Transmission (Refraction)
v
does not change
changes
f ,T,ω
do not change
do not change
λ, k
do not change
change
A, I
change
change
φ
∆φ = 0, from a rarer medium
does not change
∆φ = π , from a denser medium
Reflection of Waves • When a progressive wave travelling through a medium
reaches a rigid boundary, it gets reflected and the phenomena is called reflection of waves. If equation of incident travelling wave is y i ( x, t ) = a sin ( kx − ωt )
Stationary/Standing Waves These waves are produced when two harmonic waves of equal frequency and amplitude travelling through a medium (string) in opposite directions superimpose on each other.
Stationary Waves in Organ Pipes Its representation of frequency and wavelengths for both closed and open organ pipes are shown in tabular form below Types of Organ Pipes Closed
Vibrating in nth Mode Frequency ( fn ) fn = (2n − 1) f1 for n th overtone fn = (2n + 1) f1 v f1 = 4L Ratio of overtones is 3 : 5 : 7: …… .
Wavelength ( λ n ) λn =
Figures
4L (2n − 1)
(2n – 1) nλ 4 A2
A1
A3
A4
N3
N2
N1
3λ λ …… . , λ, 2 2 λ 3λ 5λ Position of anti-nodes is 0 , , , , …… . 4 4 4
Position of nodes is 0 ,
Open
fn = nf1, where f1 = fundamental frequency. v f1 = 2L Ratio of overtones is 2 : 3 : 4 : 5 : ….. .
λn =
2L n
A1
A2 N1
A3 N2
A4 N3
nλn l= (n – 1) λ 3λ 5λ Position of nodes is , , , …… . 4 4 4 3λ λ Position of anti-nodes is 0 , , λ , , …… . 2 2
N4
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
End Correction ( e ) As the anti-node is not formed exactly at open end of organ pipe an end correction must be applied to get true frequency. It is expressed as
As the frequency of the wave in both strings must be same, so x T y T = 2l1 m1 2l2 m2
(i) For closed organ pipe, v f1 = 4( L + e )
⇒
( e = 0.6r )
x l1 m1 l1 ρ 1 = = y l2 m2 l2 ρ 2
(if radius is equal for both strings.)
where, r = radius of the pipe.
Doppler’s Effect
(ii) For open organ pipe, v f2 = 2( L + 2e )
( e = 12 . r)
Vibration of Stretched String For a string tied at both ends, transverse wave is set up, whose speed is given by v=
T µ
If a wave source and a receiver are moving relative to each other, the frequency observed by receiver is different from the actual source frequency. This phenomena is known as doppler’s effect. For different situations of the source and the observer, the apparent frequencies observed due to doppler’s effect are tabulated as follows Source (s)
Apparent frequency
→ vo
Stationary (vs = 0)
v + vo fa = f v o
vo ←
Stationary (vs = 0)
v − vo fa = f v o
Stationary (vo = 0)
→ vs
v fa = fo v + vs
Stationary (vo = 0)
vs ←
v fa = fo v − vs
→ vo
→ vs
v + vo fa = fo v + vs
vo ←
→ vs
v − vo fa = fo v + vs
→ vo
vs ←
v + vo fa = fo v − vs
vo ←
vs ←
v − vo fa = fo v − vs
Observer (o)
where, µ = mass per unit length of string = volume of unit length × density. Wavelength of stretched string in its nth mode can be expressed in generalised form as 2L , n = 1, 2, 3, … λ= n and corresponding frequency, nv v = f= 2L λ n where, L = length of stretched string and velocity v nth =
n T = = nf1 and is known as nth 2l µ
harmonic or ( n − 1) th overtone.
Vibration of Composite Strings Suppose two strings of different materials and lengths are joined end to end and tied between clamps as shown in figure. Now after plucking, stationary waves are established only at those frequencies which matches with any one harmonic of both the independent string S 1 and S 2 . x-loops
y-loops
l1
l2
where, f o = original frequency of sound wave, f a = apparent frequency, v = speed of sound in medium, v s = speed of source and v o = speed of observer.
363
WAVES
Special Cases of Doppler’s effect (i) If a source of sound is moving towards a stationary cliff a wall, then apparent frequency of sound heard by the stationary observer directly from the source v f′= f (source is moving away) v + vs Apparent frequency of reflected sound heard by v stationary observer, f ′ = f v − vs (ii) Sound source and observer are moving in a direction making an angle with the line joining them O
θ
v + v o cos θ Apparent frequency, f ′ = f v + v o sin θ (iii) When source is rotating about an observer, then v f max = f v − vs and
v f min = f. v + vs
If observer is at the centre of circle, then there will no change in the frequency of sound heard. (iv) If observer is rotating around a source, then
vo
v + vo f max = f v θ
vs
and
v − vo f min = f. v
Topical Practice Questions All the exam questions of this chapter have been divided into 6 topics as listed below Topic 1
—
BASIC OF MECHANICAL WAVES
364–368
Topic 2
—
PROGRESSIVE WAVES
369–375
Topic 3
—
INTERFERENCE AND SUPERPOSITION OF WAVES
375–378
Topic 4
—
BEATS
379–383
Topic 5
—
STATIONARY WAVES : VIBRATIONS OF STRINGS AND ORGAN PIPES
384–397
Topic 6
—
DOPPLER’S EFFECT
398–406
Topic 1 Basic of Mechanical Waves 2018 1 If speed of sound in air is 340 m/s and in water is
2011 8 Each of the properties of sound in Column I primarily
1480 m/s. If frequency of sound is 1000 kHz, then find the value of wavelength in water. [JIPMER] (a) 2.96 mm (b) 1.48 mm (c) 0.74 mm (d) 1 mm
2014 2 Identify the correct statement.
2013 4 Which of the following is different from others? (a) Wavelength (c) Frequency
[Kerala CEE]
[WB JEE]
(b) Velocity (d) Amplitude
5 When a certain volume of water is subjected to increase of 100 kPa pressure, the volume of water decreases by 0.005%. The speed of sound in water must be [UP CPMT] (a) 140 m/s (b) 300 m/s (c) 1400 m/s (d) 5000 m/s 6 Oxygen is 16 times heavier than hydrogen. Equal volumes of hydrogen and oxygen are mixed. The ratio of speed of sound in the mixture to that in hydrogen is (a) 8 (b) 2/ 17 [Manipal] (c) 1/ 8
Column I
[Kerala CEE]
(a) Transverse wave can propagate in gases. (b) Transverse wave consists of compressions and rarefactions. (c) Longitudinal wave can propagate in solids, liquids and gases. (d) In a longitudinal wave, particles of the medium vibrate perpendicular to the direction of propagation. (e) In a longitudinal wave, the higher density corresponds to rarefactions.
3 The speed of sound in air (a) decreases with temperature (b) increases with pressure (c) increases with humidity (d) decreases with pressure (e) increases with density
depends on one of the quantities in Column II. Select the correct answer (matching Column I with Column II) as per code given below the columns. [Haryana PMT, CG PMT]
(d) 32/ 17
7 A sound has an intensity of 2 × 10−8 W / m 2 . Its intensity level (in decibel) is (log 10 2 = 0.3) [WB JEE] (a) 23 (b) 3 (c) 43 (d) 4.3
Codes P (a) A (c) B
Column II
P.
Loudness
A.
Waveform
Q.
Pitch
B.
Frequency
R.
Quality
C.
Intensity
Q B C
R C A
P (b) C (d) B
Q B A
R A C
9 The intensity level of a sound wave is defined by an arbitrary scale. The zero of the scale is taken at the sound wave intensity [BCECE] −12 2 −10 2 (b) 1 × 10 (a) 1 × 10 Wm Wm −16 −14 2 (d) 1 × 10 (c) 1 × 10 Wm 2 Wm 10 A theatre of volume 100 × 40 × 10 m 3 can accommodate 1000 visitors. The reverberation time of the theatre when empty is 8.5 s. If the theatre is now filled with 500 visitors, occupying the front-half seats, the reverberation time changes to 6.2 s. The average absorption coefficient of each visitor is nearly [EAMCET] (a) 0.6 (b) 0.5 (c) 0.45 (d) 0.7 11 A sound absorber attenuates the sound level by 20 dB. The intensity decreases by a factor of [JIPMER] (a) 1000 (b) 10000 (c) 10 (d) 100
2009 12 The pressure variations in the propagation of sound waves in gaseous medium are (a) adiabatic (b) isothermal (c) isobaric (d) isochoric (e) cyclic
13 When a wave undergoes refraction, (a) its frequency changes (b) its amplitude changes (c) its velocity changes (d) Both amplitude and frequency change
[Kerala CEE]
[J&K CET]
365
WAVES
14 The temperature at which the speed of sound in air becomes doubled of its value at 0°C is [VMMC] (a) 1092°C (b) 819 K (c) 819°C (d) 546°C 15 Sound waves transfer (a) only energy not momentum (b) energy (c) momentum (d) Both (b) and (c)
[KCET]
16 A stationary point source of sound emits sound uniformly in all directions in a non-absorbing medium. Two points P and Q are at a distance of 4 m and 9 m respectively from the source. The ratio of amplitudes of the waves at P and Q[KCET] is 3 4 2 9 (a) (b) (c) (d) 2 9 3 4
2008 17 The time of reverberation of a room A is one second. What will be the time (in second) of reverberation of a room, having all the dimensions double of those of room A? [Haryana PMT] (a) 2 (b) 4 (c) 1/ 2 (d) 1
18 Reverberation time does not depend upon [BCECE] (a) temperature (b) volume of room (c) size of window (d) carpet and curtain 19 How many times more intense is a 60 dB sound than a 30 dB sound? [KCET] (a) 1000 (b) 2 (c) 100 (d) 4 20 Assertion The change in air pressure affects the speed of sound. Reason The speed of sound in gases is proportional to the square of pressure. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion (c) Assertion is correct but Reason is incorrect (d) Both Assertion and Reason are incorrect
2007 21 The intensity of sound increases at night due to
[AFMC]
(a) increase in density of air (b) decrease in density of air (c) low temperature (d) None of the above
22 Sound waves are not transmitted over a long distance, because [MHT CET] (a) they are absorbed by the atmosphere (b) they have constant frequency (c) the height of antenna required should be very high (d) velocity of sound waves is very less
23 The gas having average speed four times as that of SO2 (molecular mass 64) is [MHT CET] (a) He (molecular mass 4) (b) O2 (molecular mass 32) (c) H2 (molecular mass 2) (d) CH4 (molecular mass 16) 24 Which one of the following statements is true? [MP PMT] (a) Both light and sound waves in air are transverse. (b) The sound waves in air are longitudinal while the light waves are transverse. (c) Both light and sound waves in air are longitudinal. (d) Both light and sound waves can travel in vacuum. 25 The speed of sound waves in a gas (a) does not depend upon density of the gas (b) depend upon changes in pressure (c) does not depend upon temperature (d) depends upon density of the gas
[J&K CET]
26 A boat at anchor is rocked by waves of velocity 25 ms −1 having crests 100 m apart. They reach the boat once every (a) 4.0 s (b) 8.0 s [AMU] (c) 2.0 s (d) 0.25 s 27 Compressional wave pulses are sent to the bottom of sea from a ship and the echo is heard after 2 s. If bulk modulus of elasticity of water is 2 × 109 Nm −2 and mean temperature is 4°C, the depth of the sea will be [BCECE] (a) 1014 m (b) 1414 m (c) 2828 m (d) None of these
2006 28 When sound waves travel from air to water, which one of the following remains constant? (a) Time period (b) Frequency (c) Velocity (d) Wavelength
[Manipal]
29 Velocity of sound waves in air is 330 ms −1 . For a particular sound in air, a path difference of 40 cm is equivalent to a phase difference of 1.6 π. The frequency of the wave is [Manipal] (a) 165 Hz (b) 150 Hz (c) 660 Hz (d) 330 Hz 30 The velocity of sound is v at 273 K. The temperature at which it is 2v is [Kerala CEE] (a) 2 × 273 K (b) 4 × 273 K (c) 8 × 273 K (d) 16 × 273 K (e) 2 × 273 K 31 Distance between successive compression and rarefaction is 1 m and velocity of sound is 360 ms −1 . Find frequency of the sound wave. [RPMT] (a) 180 Hz (b) 45 Hz (c) 120 Hz (d) 90 Hz
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
32 A bomb explodes on the moon. How long will it take for the sound to reach the earth? [Punjab PMET] (a) 10 s (b) 1000 s (c) 1 day (d) None of these
34 A particle on the trough of a wave at any instant will come to the mean position after a time (T = time period) (a) T/2 (b) T/4 [KCET] (c) T (d) 2T 35 Sound travels faster after rain than on a dry day because
2005 33 The ratio of velocity of sound in hydrogen and oxygen at STP is (a) 16 : 1 (c) 4 : 1
[Haryana PMT]
(a) the temperature of the atmosphere increases after rain (b) the density of air increases after rain (c) the humidity in the air increases after rain (d) None of the above
[KCET]
(b) 8 : 1 (d) 2 : 1
Answers 1 11 21 31
(b) (d) (a) (a)
(c) (a) (a) (d)
2 12 22 32
3 13 23 33
(c) (c) (a) (c)
4 14 24 34
(d) (c) (b) (b)
5 15 25 35
(c) (d) (d) (c)
6 (b) 16 (d) 26 (a)
7 (c) 17 (a) 27 (b)
8 (b) 18 (a) 28 (b)
9 (b) 19 (a) 29 (c)
10 (d) 20 (d) 30 (b)
Explanations p / ρ remain constants. So, velocity of sound is independent of pressure.
1 (b) Given, vw = 1480 m / s, f = 1000 kHz Speed, vw = f λ v 1480 ∴ λ= w = f 1000 × 103
Also, v ∝ T , so with rise in temperature, velocity of sound decreases. 1 , so with increase in Also, v ∝ ρ
mm = 1480 .
density, the velocity of sound decreases.
2 (c) The correct statement is longitudinal wave can propagate in solids, liquids and gases. Transverse wave does not require medium to travel, it consists of crests and troughs. In a longitudinal wave, particles of the medium vibrate to the direction of propagation of wave. In longitudinal wave, higher density corresponds to compressions. Hence, options (a), (b), (d) and (e) are incorrect.
3 (c) The velocity of sound in a gas or air is given by v=
γp = ρ
γ RT M
Hence, option (c) is correct.
4 (d) Amplitude is independent of wavelength, velocity and frequency of oscillation. Because, velocity (v ) = frequency ( f ) × wavelength (λ ), hence these are related with each other. Whereas amplitude is the maximum displacement suffered by the particles of the medium from mean position.
5 (c) Volume elasticity, ...(i)
where symbols have their usual meaning. Thus, from Eq. (i), we can conclude that v∝
With increase in humidity, density of air decreases. So, with rise in humidity, velocity of sound increases.
p ρ
As the pressure of gas or air increases, then density also increases and hence
∆p 100 × 103 = ∆V /V 0.005/100 = 2 × 109
| B |=
Speed of sound, v =
2 × 109 103
B = d
= 1.4 × 10
3
= 1400 m/s
6 (b) Let one mole of each gas has same volume as V . When they are mixed, then density of mixture is
Mass of O2 + Mass of H2 Volume of O2 + Volume of H2 32 + 2 34 17 = = = V + V 2V V
ρ mixture =
Also, ρ H 2 =
2 V
γp Now, velocity = ρ v∝
or
1/ 2
1 ρ
ρH 2 2/V vmixture = = 17/V vH 2 ρ mixture 2 = 17
7 (c) We know that, intensity level in decibel, I L = 10 log10 I 0 2 × 10−8 ∴ L = 10 log10 10−12 (Q I 0 = 12−12 W/m 2 ) L = 10 log10 (2 × 104 ) L = 10 [log10 2 + log10 (10)4 ] L = 10 (4.3) L = 43 decibel
8 (b) Loudness of sound is a subjective term describing the strength of sound. It is related to sound intensity.
367
WAVES
Pitch of sound may be generally characterised by frequency. The perceived pitch of a sound is just the ear's response to frequency, i.e. for most practical purpose, the pitch is just frequency. Quality of sound depends upon the waveform which produces it. P → C, Q → B, R → A
12 (a) When a sound wave propagates in a gaseous medium, the pressure varies in an adiabatic process.
13 (c) When a wave undergoes refraction, then its velocity changes.
14 (c) Speed, v ∝ T ∴
9 (b) Sound intensity is defined as the sound power per unit area. Many sound intensity measurements are made relative to a standard threshold of hearing intensity I 0 = 10−12 Wm 2 ⇒
I 0 = 1× 10−12 Wm 2
10 (d) Number of visitors = 1000 Volume of theatre = 100 × 40 × 10 m 3 Case I Volume acquired by one visitor 100 × 40 × 10 = = 40 m 3 1000 Reverberation time = 8.5 s Case II Volume acquired by one visitor 100 × 40 × 10 = = 80 m 3 500 Reverberation time = 6.2 s The average absorption coefficient, 40 × 8.5 η= 80 × 6.2 85 = ≈ 0.7 124
11 (d) We know that, I β = 10 log I 0 I β 1 = 10 log 1 I 0 I β 2 = 10 log 2 I 0 β 2 − β 1 = 20 I I ⇒ 10 log 2 − 10 log 1 = 20 I 0 I 0
⇒
T2 T1
2=
⇒ ∴
T2 = 4T1 = 4 × 273 =1092 K T2 = 1092 − 273 = 819° C
15 (d) Sound waves transfer both energy and momentum.
16 (d) In a non-absorbing medium when a wave travels in three-dimensional space, then amplitude varies inversely with distance. 1 i.e. A∝ r AP rQ 9 So, = = AQ rP 4
17 (a) Sabine’s formula for reverberation time, 0.16 V αS
where, V is volume of hall in m 3, α = absorption coefficient and S = surface area of room. T ′ V ′ S 8V S = × = ∴ × T S′ V V 4S 8 = =2 4 Hence, T ′ = 2T = 2 × 1 = 2 s
18 (a) Reverberation depends upon the size of the room, opening of the room, i.e. window size and also the material inside room but does not depend upon the temperature of the room.
19 (a) We know that, I L = 10 log10 I 0 ∴
⇒
I 30 = 10 log10 2 I 0 I2 = 103 I0
…(ii)
20 (d) The speed of sound in gaseous
⇒
T =
Similarly,
…(i)
Dividing Eq. (i) by Eq. (ii), we get I1 = 1000 I2
T 4= 2 T1
I ⇒ 10 log 2 = 20 I 1 I 2 = 100I 1
2v T = 2 v T1
I1 = 10 6 I0
⇒
I 60 = 10 log10 1 I 0
medium is given by γp v= ρ At constant temperature, pV = constant
…(i)
…(ii)
If V is the volume of one mole of a gas, then density of gas M ρ= V M or V = ρ where, M is the molecular weight of the gas. ∴ Eq. (ii) becomes, pM = constant ρ or
p = constant, as M is a constant. ρ
Therefore from Eq. (i), we have, v = constant × γ Thus, change in air pressure does not affect the speed of sound.
21 (a) At night, amount of carbon dioxide in atmosphere increases which raises the density of atmosphere. Since, intensity is directly proportional to density, so intensity of sound is more at night.
22 (a) There are several factors which affects the propagation of sound. These are geometric spreading, atmospheric effects and surfaces effects. There are two mechanisms by which acoustic energy is absorbed by the atmosphere. These are molecular relaxation and viscosity effects. The amount of absorption depends on the temperature and humidity of the atmosphere.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPER
23 (a) Average speed vav of gas molecules is inversely proportional to the square root of the absolute temperature T of the gas vav =
⇒
waves) in water is given by
v1 = v2
M2 M1
v = 4v
M2 64
64 =4 16 Hence, the gas is helium (molecular mass 4). ⇒
M2 =
24 (b) In a longitudinal wave, the particles of the medium oscillate about their mean or equilibrium position along the direction of propagation of the wave itself. Sound waves are longitudinal in nature. In transverse wave, the particles of the medium oscillate about their mean or equilibrium position at right angles to the direction of propagation of wave itself. Light wave being electromagnetic are transverse waves.
25 (d) Speed of sound is independent of changes in pressure, it depends upon density of the gas. Because, speed of sound in a gas, rp , means v ∝ p, but actually it v= ρ p RT is not, so because = = constant ρ M at constant temperature.
26 (a) The required relation can be given as v = nλ Given, v = 25 ms−1 and ∴
n=
27 (b) The speed of sound (longitudinal
8RT πM
where, R is gas constant and M be the molecular weight. Given, v1 = v , M 1 = 64 , v2 = 4 v ∴
25 1 = = 0.25 100 4 1 1 Then, T = = =4s n 0.25 ⇒
λ = 100 m 25 = n × 100
v=
B d
where, B is bulk modulus of water and d is density. Given, B = 2 × 109 Nm −2 , d = 103 kgm −3 ∴
2 × 109 = 1.414 × 103 103 = 1414 ms −1
v=
When sound travels back to the observer, it cover’s twice the distance. So, time of echo is given by 2d t= v tv ∴ d= 2 1414 × 2 = = 1414 m 2
T2 v 273 T2 = 4 × 273 K
2v = ⇒
31 (a) λ = 2d = 2 m ν=
v 360 ms−1 = = 180 Hz λ 2m
32 (d) The radius of moon and acceleration due to gravity at its surface both are smaller compared to earth. Therefore, the escape velocity at the moon is 2. 38 kms−1. At the temperature of moon, the average velocity of gas molecules greater than this. Therefore, gas molecules cannot stay at moon. Hence, there is no atmosphere around the moon. Since, sound waves need a medium for propagation, therefore sound produced by the bomb explosion will never reach the earth.
vH = vO
∴
=
28 (b) We know that frequency is independent of refraction, therefore when sound waves travel from air to water, the frequency remains constant.
29 (c) Phase difference of 1. 6π corresponds to path difference of 40 cm. Hence, phase difference of 2π will correspond to a path difference of 50 cm, i.e. λ = 50 cm or 0.5 m. v 330 n= = = 660 Hz ∴ λ 0.5
v2 =
T2 v1 T1
16 = 4 :1 1
come to mean position from the trough T = 4 Crest
0
T/2 T/4
T Trough 3T/4
v=
⇒
MO MH
34 (b) The time taken by the particle to
30 (b) Velocity of sound is given by 3RT M v∝ T ⇒ Given, T1 = 273 K , v1 = v , v2 = 2v v1 T ∴ = 1 v2 T2
γRT M
33 (c) Velocity of sound, v =
35 (c) The speed of sound will become higher as the humidity in the air increases after rain. γp , density of moist air ρ is less than density of dry air. Because, v =
Topic 2 Progressive Waves 2014 1 When a wave travels in a medium, displacement of a
particle is given by y = a sin 2π ( bt − cx ) , where a, b, c are constants. The maximum particle velocity will be twice the wave velocity, if [MHT CET] 1 (a) b = ac (b) b = ac 1 (c) c = πa (d) c = πa 2 The displacement y of a particle in a medium can be π expressed as y = 10−6 sin 100t + 20x + , where t is in 4 second and x in metre. The speed of the wave is [UK PMT] (a) 2000 m/s (b) 5 m/s (c) 20 m/s (d) 5π m/s
2013 3 A wave travelling in the positive x-direction having displacement along y-direction 1 m, wavelength 2π m and frequency of (1/ π ) Hz is represented by [NEET] (a) y = sin ( x − 2t ) (b) y = sin ( 2πx − 2πt ) (c) y = sin (10πx − 20πt ) (d) y = sin ( 2πx + 2πt )
4 A wave pulse in a thin string is incident on a thick string as shown in the figure. If joint is at P, then the form of reflected and transmitted pulses is [AIIMS] P
(a) (b) (c) (d)
5 Which of the following equations represents a wave travelling along Y -axis? [KCET] (a) y = A sin ( kx − ωt ) (b) x = A sin ( ky − ωt ) (c) y = A sin ky cos ωt (d) y = A cos ky sin ωt
2012 6 A progressive wave moving along x-axis is represented by 2π y = A sin ( vt − x ). The wavelengths ( λ ) at which the λ maximum particle velocity is 3 times, the wave velocity is A (a) 3
2A (b) 3π
3 (c) π A 4
[WB JEE]
2 (d) π A 3
7 The equation of a simple harmonic progressive wave is given by y = A sin (100πt − 3x ). Find the distance between π 2 particles having a phase difference of . [MHT CET] 3 π π π π (a) m (b) m (c) m (d) m 9 18 6 3 8 In sine wave, minimum distance between 2 particles always having same speed is [MHT CET] λ λ λ (a) (b) (c) (d) λ 2 4 3 9 A wave equation which gives the displacement along the direction is given by y = 0.001sin (100t + x ), where x and y are in metre and t is in second. This equation represents a wave [Manipal] (a) travelling with a velocity of 100 m/s in the negative x-direction (b) travelling with a velocity of 50/ π m/s in the positive x-direction (c) of wavelength 1 m 100 Hz (d) of frequency π 10 The equation of longitudinal wave represented as y = 20cos π ( 50t − x ) cm, then its wavelength is [Manipal] (a) 120 cm (b) 50 cm (c) 2 cm (d) 5 cm
2011 11 A man stands in a narrow, steep-sided valley. When he shouts, he hears two echoes, one after 1 s and other after 2 s. If the velocity of sound in air is 330 m/s, the width of the valley is [MGIMS] (a) 330 m (b) 495 m (c) 660 m (d) 990 m
2009 12 Angle between wave velocity and particle velocity of a transverse wave is [OJEE] (a) 90º (b) 60º (c) 0º (d) 120º
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
13 A wave motion is described by y( x, t ) = a sin ( kx − ωt ). Then, the ratio of the maximum particle velocity to the wave velocity is [WB JEE] ω dω x (c) (d) (a) ka (b) k dk l
t x 22 y = 3sin π − represents an equation of a 2 4 progressive wave, where t is in second and x is in metre. The distance travelled by the wave in 5 s is [KCET] (a) 8 m (b) 10 m (c) 5 m (d) 32 m
14 A longitudinal wave is represented by x = x 0 sin 2π ( nt − x / λ ). The maximum particle velocity will be four times the wave velocity, if [WB JEE] πx πx (a) λ = 0 (b) λ = 2πx 0 (c) λ = 0 (d) λ = 4πx 0 4 2
23 The equation of a wave travelling on a string is π x y = 4 sin 8t − , where x, y are in cm and t is in 8 2 second. The velocity of the wave is [VMMC] (a) 64 cm/s in −x-direction (b) 32 cm/s in −x-direction (c) 32 cm/s in + x-direction (d) 64 cm/s in + x-direction 24 The equation y = 4 + 2sin ( 6t − 3x ) represents a wave motion, then wave speed and amplitude, respectively are (a) wave speed 1 unit, amplitude 6 units [AIIMS] (b) wave speed 2 units, amplitude 2 units (c) wave speed 4 units, amplitude 1/2 unit (d) wave speed 1/2 unit, amplitude 5 units
15 The equation of a progressive wave is y = 4 sin ( 4πt − 0.04 + π / 3), where x is in metre and t is in second. The velocity of the wave is [WB JEE] (a) 100π m/s (b) 50π m/s (c) 25π m/s (d) π m/s 16 In the case of a travelling wave, the reflection at a rigid boundary will take place with a phase change of [J&K CET] π π π (a) rad (b) rad (c) π rad (d) rad 2 4 6 17 Equation of a progressive wave is given by π y = 0.2cos π 0.04t + 0.02x − . The distance is 6 expressed in cm and time in second. What will be the minimum distance between two particles having the phase difference of π/2 ? [VMMC] (a) 4 cm (b) 8 cm (c) 25 cm (d) 12.5 cm 18 Two points on a travelling wave having frequency 500 Hz and velocity 300 m/s are 60° out of phase, then the minimum distance between the two points is [VMMC] (a) 0.2 (b) 0.1 (c) 0.5 (d) 0.4 19 The longitudinal wave can be observed in [DUMET] (a) elastic media (b) inelastic media (c) Both (a) and (b) (d) None of these 20 A wave equation which gives the displacement along y-direction is given by y = 10−4 sin ( 60t + x ), where x and y are in metre and t is time in second. This represents a wave [AIIMS] −1 (a) travelling with a velocity of 300 ms in the –ve x-direction (b) of wavelength π metre 30 (c) of frequency Hz π (d) of amplitude 104 m travelling along the positive x-direction x t 21 The equation of a wave is y = 5sin − , where x is 0.04 4 in cm and t is in second. The maximum velocity of the wave will be [JIPMER] −1 −1 −1 (a) 1 ms (b) 2 ms (c) 1.5 ms (d) 1.25 ms −1
25 The path difference between the two waves 2πx 2πx y1 = a1 sin ωt − + φ is and y 2 = a 2 cos ωt − λ λ λ (a) φ 2π 2π π (c) φ − λ 2
π λ (b) φ + 2π 2 2π (d) φ λ
[Manipal]
2008 26 The wave described by y = 0. 25sin (10πx − 2πt ), where x and y are in metre and t in second, is a wave travelling along the [CBSE AIPMT] (a) − x-direction with frequency 1 Hz (b) +x-direction with frequency π Hz and wavelength λ = 0.2 m (c) + x-direction with frequency 1 Hz and wavelength λ = 0.2 m (d) −x-direction with amplitude 0.25 m and wavelength λ = 0.2 m
27 The equation of a transverse wave on a stretched string is x t given by y = 0.05 sin 2π − , where x and y are 0.002 01 . expressed in metre and t in second. The speed of the wave is [EAMCET] −1 −1 −1 (c) 200 ms (d) 400 ms −1 (a) 100 ms (b) 50 ms 28 A transverse wave is described by the equation X y = y 0 sin 2π ft − . The maximum particle velocity λ is equal to four times the wave velocity, if [MH CET] πy 0 πy 0 (b) λ = (a) λ = 4 2 (d) λ = 2πy 0 (c) λ = πy 0
371
WAVES
29 In a sinusoidal wave, the time required for a particular point to move from maximum displacement to zero displacement is 0.17 s. The frequency of the wave is [Manipal] (a) 1.47 Hz (b) 0.36 Hz (c) 0.73 Hz (d) 2.94 Hz 30 A transverse wave propagating along x-axis is represented π by y ( x, t ) = 8sin 0.5πx − 4πt − 4 where, x is in metre and t is in second. The speed of the wave is [Haryana PMT] π −1 −1 −1 (a) 4π ms (b) 0.5π ms (c) ms (d) 8 ms −1 4 31 Pressure variation in a mechanical wave depends upon as [DUMET]
(a) ∝ (intensity) 1/ 2 1 (c) ∝ intensity
(b) independent of intensity (d) None of these
32 The equation of a simple harmonic wave is given by y = 6sin 2π ( 2t − 0.1x ), where x and y are in mm and t is in seconds. The phase difference between two particles 2 mm apart at any instant is [KCET] (a) 18° (b) 36° (c) 54° (d) 72°
2007 33 The power of a sound from the speaker of a radio is 20 mW. By turning the knob of the volume control, the power of the sound is increased to 400 mW. The power increase in decibels as compared to the original power is (a) 13 dB (b) 10 dB [Punjab PMET] (c) 20 dB (d) 800 dB
34 Three progressive waves A , B and C are shown in the figure. [UP CPMT] B
A
C
With respect to A, the progressive wave π π (a) B lags by and C leads by 2 2 (b) B lags by π and C leads by π π π (c) B leads by and C lags by 2 2 (d) B leads by π and C lags by π
35 The phase difference between two waves represented by y1 = 10−6 sin [100t + ( x / 50) + 0.5] m and y 2 = 10−6 cos [100t + ( x / 50)] m where x is expressed in metre and t is expressed in second, is approximately [Manipal] (a) 1.07 rad (b) 2.07 rad (c) 0.5 rad (d) 1.5 rad
36 Two waves are given by y1 = cos ( 4t − 2x ) and π y 2 = sin 4t − 2x + . The phase difference between 4 the two waves is [Kerala CEE] π −π 3π π 3π (b) (c) (e) (a) (d) 4 4 4 2 2 37 Which of the following expressions is that of a simple harmonic progressive wave? [MP PMT] (a) a sin ωt (b) a sin ωt cos kx (c) a sin (ωt − kx ) (d) a cos kx 38 The maximum particle velocity in a wave motion is half the wave velocity. Then, the amplitude of the wave is equal to λ 2λ λ (b) (c) (d) λ [KCET] (a) 4π π 2π
2006 39 A point source emits sound equally in all directions in a non-absorbing medium. Two points P and Q are at distance of 2 m and 3 m respectively from the source. The ratio of the intensities of the waves at P and Q is [AIIMS] (a) 9 : 4 (b) 2 : 3 (c) 3 : 2 (d) 4 : 9
40 The distance between two points differing in phase by 60° on a wave having wave velocity 360 ms −1 and frequency 500 Hz is [KCFET] (a) 0.36 m (b) 0.18 m (c) 0.48 m (d) 0.12 m 41 If the equation of a progressive wave is given as t x y = a sin π − , where x is in metre and t is in second, 2 4 then the distance through which the wave moves in 8 s is (a) 2 m (b) 16 m (c) 4 m (d) 8 m [RPMT] 42 When a wave travels in a medium, particles displacement is given by the equation y = 0.03 sinπ ( 2t − 0.01x ), where x and y are in metre and t is in second. The wavelength of the wave is [RPMT] (a) 200 m (b) 100 m (c) 20 m (d) 10 m 43 Equation of progressive wave is [J&K CET] π y = A sin 10πx + 11πt + , 3 (a) its wavelength is 0.2 units (b) it is travelling in the positive x-direction (c) wave velocity is 1.5 units (d) time period of SHM is 1 s t x 1 44 A wave equation is given by y = 4 sin π − + , 5 9 6 where x is in centimetre and t is in second. Which of the following is true? [DUMET] −1 (a) λ = 18 cm (b) v = 4 ms (c) a = 0.4 m (d) f = 50 Hz
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPER
Answers 1 11 21 31 41
(d) (b) (d) (a) (b)
2 12 22 32 42
(b) (a) (b) (d) (a)
3 13 23 33 43
(a) (a) (d) (a) (a)
4 14 24 34 44
(b) (c) (b) (c) (a)
5 15 25 35
(b) (a) (b) (a)
(d) (c) (c) (b)
6 16 26 36
7 17 27 37
(a) (c) (b) (c)
8 18 28 38
(a) (b) (b) (a)
9 19 29 39
(a) (a) (a) (a)
10 20 30 40
(c) (c) (d) (d)
Explanations 1 (d) Given, y = a sin 2π (bt − cx ) On comparing with general equation 2πt 2π y = r sin − x , we get λ T
2π 1 = ω = 2πb ⇒T = T b 1 r = a and λ = c Maximum particle velocity, ωr = 2πba λ b Wave velocity, v = = T c Given, maximum particle velocity = 2 × wave velocity b 1 2πba = 2 × ⇒ c= c πa
2 (b) The displacement is given by
π y = 10−6 sin 100t + 20x + 4 Comparing with standard equation, y = a sin (ωt + kx + φ ) ω = 100 rad s −1, k = 20
where, ω is angular frequency and k is angular wave number 2π 2πν ω Now, k = = = = 20 v λ λν ω 100 v= = = 5 m /s ⇒ 20 20 So, the speed of the wave is 5 m/s.
3 (a) Given, a = 1 m, λ = 2π and f = (1/ π )Hz 2π and ω = 2πf λ y = a sin (kx − ωt ) 1 2π = sin × x − 2π × t 2π π
We know, k = As,
= sin (x − 2t )
4 (b) The reflected and transmitted pulses are rightly shown in Fig. (b).
5 (b) The given equation is
x = A sin (ky − ωt ) which represents a wave travelling along Y-axis, where A is its amplitude. y A
9 (a) The standard equation of a wave
λ
y
O
x
6 (d) Progressive wave, 2π (vt − x ) λ 2πv Particle velocity, (vp )max = A λ According to question, 2πv 2π A⇒λ = A (vp ) max = 3 v = λ 3 y = A sin
7 (a) Given, y = A sin (100πt − 3x ) The general equation, y = A sin (ωt − kx ) ∴ k =3 2π 2π 2π or λ = and k= = λ k 3 π Phase difference, φ = 3 2π π ⋅x = ⇒ λ 3 π λ or x= × 3 2π π 2π π x= × = m ⇒ 3 3 × 2π 9
8 (a) The representation of sine wave is shown as below A
Particle velocity, dy vp = = slope of wave at that point. dt As slope at A and B is zero, hence, their velocities at A and B will be same. The λ distance between A and B is . 2
λ
B
travelling with amplitude a in the negative x-direction with angular velocity ω is given by …(i) y = a sin (ωt + kx ) where, k is a wave number. We compare the given equation with the standard equation, where a = 0.001 m, ω = 100 rads −1 and k = 1 ω 100 = = 100 m/s k 1 2π 2π Wavelength, λ = = = 2π k 1 ω 100 Frequency, ν = = 2π 2π Rest all statements are incorrect. Velocity, v =
10 (c) The standard equation of a wave of amplitude a is given by …(i) y = a cos (ωt − kx ) where, ω is angular velocity, k is the wave number and t is the time. Comparing with given equation, we get k = π. 2π 2π Wavelength, λ = = = 2 cm π k
11 (b) Let s1 and s2 be the distances of man from either side of valley, then 2s1 = vt1 and 2s2 = vt2 ⇒ 2(s1 + s2 ) = v (t1 + t2 ) v (t1 + t2 ) ⇒ s1 + s2 = 2 330 × (1 + 2) ∴ d = s1 + s2 = 2 330 × 3 ⇒ d= = 495 m 2
373
WAVES
Hence, path difference between them λ λ π λ 100 ∆x = × ∆φ = × = = 2π 2π 2 4 4 = 25 cm
12 (a) In a transverse wave, the particles of the medium vibrate about their mean positions in a direction perpendicular to the direction of wave propagation.
Particle
Y
18 (b) As, v = nλ 90°
v 300 3 ∴ λ= = = m n 500 5 Now, phase difference 2π = × path difference λ 2π ∴ 60º = × path difference λ 60º × π 2π × 5 ⇒ = × path difference 180º 3 3 × 60°× π = 0.1 ⇒ Path difference = 2π × 5 × 180°
X Wave
Here, the particle velocity is given by dy dx and wave velocity is given by . dt dt Hence, the angle between particle velocity and wave velocity in a π transverse wave is or 90°. 2
∴ Ratio =
(vp )max v
=
observed in elastic media. Because elasticity in necessary for propagation, i.e. in order to make the particles return to their original position after getting disturbed, the medium must possess elasticity.
ω k
aω k = ka ω
14 (c) The longitudinal wave is given by x = x0 sin [ 2π (nt − x / λ )] 2π = x0 sin 2πnt − x λ Here, we compare the given equation with the equation x = x0 sin (ωt ± kx ) The maximum particle velocity = Aω = x0 (2πn) Wave velocity = nλ From the question, π 2πnx0 = 4 nλ ⇒ λ = x0 2
20 (c) Angular velocity, ω = 2πf 60 = 2πf 30 Hz ∴ Frequency, f = π or
21 (d) Given, equation of wave,
x t y = 5 sin − 0.04 4 The standard equation of a wave in the given form is 2πx y = a sin ωt − λ
Comparing the given equation with the standard equation, we get 1 a = 5 and ω = = 25 0.04
15 (a) The equation of the progressive wave is given as y = 4 sin (4 πt − 0.04 x + π / 3). The velocity of the wave would be equal to ω 4π v= = = 100 π m/s k 0.04
16 (c) In the case of travelling wave, the reflection at a rigid boundary will take place with a phase change of π rad.
17 (c) Comparing with
y = a cos (ωt + kx − φ ), 2π we get k = = 0.02π λ ⇒ λ = 100 cm Also it is given that, phase difference π between particles ∆φ = . 2
= 5 × 2 = 10 m
23 (d) Given, y = 4 sin 4 πt −
where, ω = 4 π and k = ∴
v=
π 16
πx 16
ω 4π = 64 cm/s = π k 16 (in +x-direction)
24 (b) The shape of the wave is shown in the figure Y 6
19 (a) The longitudinal wave can be
13 (a) Maximum particle velocity (vp )max = aω and wave velocity, v =
Now, velocity of wave 1 = vλ = × 8 = 2 m/s 4 ∴ Distance travelled by the wave in 5s
Therefore, maximum velocity of particles of the medium, vmax = aω = 5 × 25 = 125 cms−1
22
= 1.25 ms−1 t x (b) y = 3 sin π − 2 4 t x ⇒ y = 3 sin 2π − 4 8 Comparing with x t y = A sin 2π − , we get T λ 1 1 1 = ⇒v = 4 T 4 1 1 and = ⇒ λ=8 λ 8
4 2
X
From this graph, we see that amplitude of wave is 2 units. Wave speed, Coefficient of t 6 = = 2 units Coefficient of x 3
v=
25 (b) Here,
2π …(i) y1 = a1 sin ωt − x λ 2πx and y2 = a2 cosωt − + φ λ 2πx π ⇒ y2 = a2 sin ωt − +φ+ 2 λ …(ii) From Eqs. (i) and (ii), we get the phase difference between two waves is π φ=φ+ 2 Now, phase difference 2π = × (path difference) λ ⇒ Path difference λ = × (phase difference) 2π λ π ⇒ Path difference = φ + 2π 2
26 (c) Writing the given wave equation, y = 0.25 sin (10πx − 2πt ) …(i) The minus (− ) between (10πx ) and (2πt ) implies that the wave is travelling along positive x-direction. Now, comparing Eq. (i) with standard wave equation …(ii) y = a sin (kx − ωt )
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPER
We have a = 0.25 m,ω = 2π , k = 10π m 2π = 2π ⇒ f = 1 Hz ∴ T 2π 2π Also, λ = = = 0.2 m k 10 π
27
Coefficient of t 0.002 = = 50 ms−1 2π Coefficient of x 0.1
28 (b) We have, (vP )max = 4 v
29
30 (d) The given equation is
π y (x , t ) = 8.0 sin 0.5π x − 4 πt − 4 …(i) The standard wave equation can be written as …(ii) y = a sin (kx − ωt + φ )
Comparing the Eqs. (i) and (ii), we have k = 0.5π , ω = 4 π ∴ Speed of transverse wave, ω 4π v= = = 8 ms−1 k 0.5π
31 (a) Amplitude of pressure variation, pm = BkA and intensity of wave, I ∝ A 2
32
33
So, pm ∝ (I )1/ 2 i.e. Pressure variation ∝ (Intensity) 1/ 2 (d) From the given equation, k = 0.2π 2π = 0.2 π ⇒ λ = 10 mm ⇒ λ 2π 2π ∆φ = ∆x = ×2 10 λ 2π 2 × 180° = = = 72° 5 5 (a) We know that, P ∝ I P1 I 1 …(i) ⇒ = P2 I 2
and
I L2 = 10 log10 2 I 0
y = a cos (ωt − kx ) It is called simple harmonic progressive wave.
or
38 (a) For a wave, 2π …(i) (vt − x ) λ On differentiating Eq. (i) w.r.t. t, we get dy 2πva 2π = cos (vt − x ) dt λ λ Now, maximum velocity is obtained, 2π when cos (vt − x ) = 1 λ 2πva dy ∴ vmax = = dt max λ v (given) But vmax = 2 v 2πva ⇒ = 2 λ λ ⇒ a= 4π y = a sin
= 10 log10 20 = 13 dB
34 (c) Equations of waves A, B and C are respectively π yA = A sinωt, yB = A sin ωt + 2 π and yC = A sin ωt − 2
or y0ω = 4 ( f λ ) or y0 (2πf ) = 4 f λ πy ∴ Wavelength, λ = 0 2 (a) Time for maximum displacement, t = 0.17 s Time period T for one vibration = 4 t = 4 × 0.17 = 0.68 s 1 Frequency = Time period (T ) 1 = = 1.47 Hz 0.68
I L1 = 10 log10 1 I 0
I So, L2 − L1 = 10 log10 2 I 1 P2 = 10 log10 [from Eq. (i)] P1 400 = 10 log10 20
Therefore, the wave is travelling along positive x-direction with frequency 1 Hz and wavelength 0.2 m. (b) Speed of wave 2π =
∴
35
Therefore, w.r.t. A, the progressive π π wave B leads by and C lags by . 2 2 (a) The given waves equations are
39 (a) The average power per unit area that is incident perpendicular to the direction of propagation is called the intensity, i.e. P 1 ⇒ I ∝ 2 I = 4 πr 2 r
y1 = 10−6 sin[100t + (x / 50) + 0.5] m and y2 = 10−6 cos[100t + (x / 50)]m π ⇒ y2 = 10−6 sin 100t + (x / 50) + m 2 π Q sin 2 + θ = cosθ
⇒
= (1.57 − 0.5) rad = 1.07 rad
2
∴
Therefore, phase difference between the two waves is π π ∆φ = 4 t − 2x + − 4 t − 2x + 4 2 =
π π π − =− 4 2 4
37 (c) General equation of wave motion should be represented by y = f (ax ± bt ) or f (at ± bx ) When y is a sine or cosine function such as y = a sin (ωt − kx )
I 1 3 9 = = = 9: 4 I 2 2 4
2π ⋅ ∆x λ The distance between two points, (∆φ ) (λ ) (∆φ ) (v / f ) ∆x = = 2π 2π (π / 3) (360 / 500) = = 0.12 m 2π t x (b) Given, y = a sin π − 2 4
40 (d) Phase angle, ∆φ =
36 (b) Equations of waves,
π y1 = cos (4 t − 2x ) = sin 4 t − 2x + 2 π and y2 = sin 4 t − 2x + 4
2
Here, r1 = 2 m , r2 = 3 m
Hence, the phase difference between the waves is . π 314 ∆φ = − 0.5 rad = − 0.5 rad 2 2
I 1 r2 = I 2 r1
41
Comparing it with standard equation, 2t 2x y = a sin π − T vT 2 1 ⇒ = or T = 4 s T 2 2 1 and = vT 4 8 8 ⇒ v = = = 2 ms−1 T 4 So, distance travelled by wave in 8 s = v × t = 2 × 8 = 16 m
375
WAVES
42 (a) Here, displacement equation is y = 0.03 sin π (2 t − 0.01x ) …(i) The standard equation is x t …(ii) y = a sin 2π − T λ Comparing the given Eq. (i) with standard Eq. (ii), we have
or
2 = 0.01 λ 2 λ= 0.01 = 200 m
43 (a) The standard equation is x t y = a sin 2π − + φ T λ
…(i)
Dividing and multiplying the given equation by 2π , we get 11 10 y = a sin 2π x + t + 1 / 6 …(ii) 2 2 On comparing Eqs. (i) and (ii), we get λ = 2 / 10 = 0.2 units
44 (a) The given equation will be written as t x 1 y = 4 sin π − + 5 9 6
…(i)
The standard wave equation can be written as y = a sin (ωt − kx + φ ) 2π 2π t− ⋅ x + φ …(ii) ⇒ y = a sin T λ Comparing Eqs. (i) and (ii), we get a = 4 cm = 0.04 m 1 1 Frequency, f = = Hz = 0.1 Hz T 10 Wavelength, λ = 2 × 9 = 18 cm Amplitude,
Velocity, v = f λ = 0.1 × 18 = 1.8 cm s−1
Topic 3 Interference and Superposition of Waves 2014 1 Sound
waves are passing through two routes-one in straight path and the other along a semi-circular path of radius r and are again combined into one pipe and superposed as shown in the figure. If the velocity of sound waves in the pipe is v, then frequencies of resultant waves of maximum amplitude will be multiples integral of v v [WB JEE] (a) (b) r ( π − 2) r ( v − 1) 2v v (d) (c) r ( π − 1) r ( π + 1)
2013 2 Two waves having the intensities in the ratio of 9 : 1 produce interference. The ratio of maximum to minimum intensity is equal to [UP CPMT] (a) 10 : 8 (b) 9 : 1 (c) 4 : 1 (d) 2 : 1
3 Assertion It is not possible to have interference between the waves produced by two violins. Reason For interference of two waves, the phase difference between the waves must remain constant. [AIIMS]
(a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion (c) Assertion is correct but Reason is incorrect (d) Assertion is incorrect but Reason is correct
2011 4 Two waves are represented by the equations
y1 = a sin (ωt + kx + 0.57) m and y 2 = a cos (ωt + kx ) m, where x is in metre and t is in second. The phase difference between them is [CBSE AIPMT] (a) 1.25 rad (b) 1.57 rad (c) 0.57 rad (d) 1.0 rad
5 Two sound waves travel in the same direction in a medium. The amplitude of each wave is A and the phase difference between the two waves is 120º. The resultant amplitude will be [Kerala CEE] (a) 2A (b) 2A (c) 3A (d) 4A (e) A 6 A plane progressive wave is given by y = 2cos 6.284( 330t − x ). What is period of the wave? 1 (a) s (b) 2π × 330 s 330 6.284 s (c) ( 2π × 330) −1 s (d) 330
2010 7 Two waves y1 = A1 sin (ωt − β 1 )
[WB JEE]
and
y 2 = A 2 sin (ωt − β 2 ) superimpose to form a resultant wave, whose amplitude is
(a)
A12 + A 22 + 2A1 A 2 cos (β 1 − β 2 )
(b)
A12 + A 22 + 2A1 A 2 sin (β 1 − β 2 )
(c) A1 + A 2 (d) | A1 + A 2 |
[UP CPMT]
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
8 Two waves are passing through a region in the same direction at the same time. If the equations of these waves 2π 2π are y1 = a sin ( vt − x ) and y 2 = b sin [( vt − x ) + x 0 ], λ λ then the amplitude of the resulting wave for x 0 = ( λ / 2) is (a) | a − b| (b) a + b [Manipal] 2 2 2 2 (d) a + b + 2ab cos x (c) a + b 9 Two sound waves, each of amplitude A and frequency ω, π superpose at a point with phase difference of . The 2 amplitude and frequency of the resultant wave are respectively [BCECE] ω A ω A (a) (d) 2A, ω (c) 2A , (b) , ,ω 2 2 2 2 10 Two coherent sources of different intensities sound waves which interfere. The ratio of maximum intensity to the minimum intensity is 25. The intensities of the sources are in the ratio [JCECE] (a) 25 : 1 (b) 5 : 1 (c) 9 : 4 (d) 25 : 16
2009 11 When a stationary wave is formed, then its frequency is (a) same as that of the individual waves (b) twice that of the individual waves (c) half that of the individual waves (d) 2 that of the individual waves
[Manipal]
12 If the phase difference between two sound waves of wavelength λ is 60º, the corresponding path difference is λ (a) 6 6 (e) λ
λ (b) 2
[Kerala CEE]
(c) 2λ
λ (d) 4
13 When two sinusoidal waves moving at right angle to each other superimpose, they produce [Haryana PMT, CG PMT] (a) beats (b) interference (c) stationary waves (d) Lissajous figure 14 Four light sources produce the following four waves I. y1 = a sin (ωt + φ1 ) II. y 2 = a sin 2ωt III. y 3 = a ′ sin (ωt + φ2 ) IV. y 4 = a ′ sin ( 3ωt + φ ) Superposition of which two waves give rise to interference? [EAMCET] (a) I and II (b) II and III (c) I and III (d) III and IV
2008 15 Two waves having intensities 25 : 9 produce interference. The ratio maximum to minimum intensity is equal to (a) 10 : 8 (b) 9 : 1 [AMU] (c) 16 : 1 (d) 2 : 1
16 Two periodic waves of intensities I 1 and I 2 pass through a region at the same time in the same direction. The sum of the maximum and minimum intensities is [MHT CET] (a) I 1 + I 2
(b) ( I 1 + I 2 ) 2
(c) ( I 1 − I 2 ) 2
(d) 2( I 1 + I 2 )
17 Ratio of intensities of two waves is given by 9 : 1, then the ratio of their amplitudes is [MP PMT] (a) 9 : 1 (b) 1 : 9 (c) 3 : 1 (d) 2 : 1
2007 18 A pulse of a wave train travels along a stretched string and reaches the fixed end of the string. It will be reflected back with [MHT CET] (a) a phase change of 180° with velocity reversed (b) the same phase as the incident pulse with no reversal of velocity (c) a phase change of 180° with no reversal of velocity (d) the same phase as the incident pulse but with velocity reversed
2006 19 Two strings with mass per unit length of 25 g cm −1 and
9 g cm −1 are joined together in series. The reflection coefficient for the vibration waves are [MHT CET] 9 3 1 9 (b) (c) (d) (a) 25 5 16 16
20 Two waves represented by the following equations, are travelling in the same medium y1 = 5sin 2π ( 75t − 0.25x ) and y 2 = 10sin 2π (150t − 0.50x ). I The intensity 2 of two waves is [MP PMT] I1 (a) 8 : 1 (b) 2 : 1 (c) 4 : 1 (d) 16 : 1 21 A particle is executing two different simple harmonic motions, mutually perpendicular of different amplitudes and having phase difference of π/ 2. The path of the particle will be [RPMT] (a) circular (b) straight line (c) parabolic (d) elliptical
2005 22 The ratio of intensities of two waves is 16 : 9. If they produce interference, then the ratio of maximum and minimum will be [AFMC] (a) 4 : 3 (b) 49 : 1 (c) 64 : 27 (d) 81 : 49
23 The phenomena arising due to the superposition of waves is/are [AMU] (a) beats (b) stationary waves (c) Lissajous figure (d) All of these
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WAVES
24 The two waves of the same frequency moving in the same direction given rise to [DUMET] (a) beats (b) interference (c) stationary waves (d) None of these
26 Equations of motion in the same direction are given by y1 = 2a sin (ωt − kx ), and y 2 = 2a sin (ωt − kx − θ ).
25 The displacement of a particle executing periodic motion is given by y = 4 cos 2 ( t / 2) sin (1000t ). This expression may be considered to be a result of superposition of [BHU] (a) two waves (b) three waves (c) four waves (d) five waves
The amplitude of the medium particle will be (b) 2a cos θ
(a) 2a cos θ (c) 4a cos
[Manipal]
θ 2
(d)
2a cos θ 2
Answers 1 (a) 11 (c) 21 (d)
2 (c) 12 (a) 22 (b)
3 (a) 13 (d) 23 (d)
4 (d) 14 (c) 24 (b)
5 (e) 15 (c) 25 (b)
6 (a) 16 (d) 26 (c)
7 (a) 17 (c)
8 (a) 18 (c)
9 (d) 19 (c)
10 (c) 20 (c)
Explanations 1 (a) Path difference = (πr − 2r) = (π − 2)r = nλ (π − 2)r λ= n
⇒
where, v = f × λ ⇒ f =
⇒
f = frequency v f = n (π − 2)r
v λ
So, frequency is multiple integral of v (π − 2) r
violins do not interfere because two waves interfere only when the phase difference between them remains constant throughout.
4 (d) Given, y1 = a sin (ωt + kx + 0.57) m and y2 = a cos (ωt + kx ) m π ⇒ y2 = a sin + ωt + kx m 2 Phase difference, ∆φ = φ 2 − φ 1 π = − 0.57 = 1.57 − 0.57 2 = 1rad
5 (e) The resultant amplitude is 2
2
R = P + Q + 2PQ cosθ
7 (a) Phase difference between the two waves is φ = (ωt − β 2 ) − (ωt − β 1 ) = (β 1 − β 2 ) ∴ Resultant amplitude, A=
8 (a) Let φ 1 and φ 2 represent angles of the first and second waves, then 2π [(vt − x ) + x0 ] φ2 = λ 2π and φ1 = (vt − x ) λ λ But x0 = ⇒ φ 2 − φ 1 = π 2 Hence, phase difference φ = π , so amplitude of the resultant wave is R = a2 + b2 + 2ab cos φ
2 (c) We have,
= a2 + b2 + 2ab cos π
I 1 a12 9 = = I 2 a22 1 ⇒ Then,
a1 = a2
(3 + 1)2 (4 )2 16 4 = = = = 4 1 (3 − 1)2 (2)2 Then,
I max : I min = 4 : 1
3 (a) Since, the initial phase difference between the two waves coming from different violins change, therefore the waves produced by two different
A
A
= (a − b)2 = a − b
120°
∴
60°
a 9 3 ⇒ 1= a2 1 1
I max (a1 + a2 )2 = I min (a1 − a2 )2
A12 + A22 + 2 A1 A2 cos (β 1 − β 2 )
A
=
A 2 + A 2 + 2 A 2 cos120º = A
6 (a) We have the progressive wave equation is given by y = 2 cos 6.284 (330t − x ) = 2 cos 2π (330t − x ) = 2 cos (2π × 330 t − 2πx ) ω = 2 π × 330 2π 1 and time period, T = = s ω 330
R = | a − b|
9 (d) Let y1 = A sin (ωt ) π and y2 = A sin ωt + 2 Resultant amplitude π R 2 = A 2 + A 2 + 2 A 2 cos 2 ⇒ R2 = 2 A2 + 2 A2 × 0 ⇒ R2 = 2 A2 ⇒ R = 2A However, both will have the same frequency ω on superimposing.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPER
Therefore, for zero order maxima, cosδ = 1 I max = I 1 + I 2 + 2 I 1I 2
10 (c) Let a1 and a2 be amplitudes of the two waves. For maximum intensity, I max = (a1 + a2 )2
For minimum intensity, δ = (2n − 1)π , where, n = 1, 2, K etc.
2
Given, ⇒
I max 25 (a1 + a2 ) = = 1 I min (a1 − a2 )2 a1 + a2 5 a 3 = ⇒ 1= a1 − a2 1 a2 2
So, for first order minima, cosδ = − 1 I min = I 1 + I 2 − 2 I 1I 2 = ( I 1 − I 2 )2 Therefore,
4
∴
I 1 a12 3 9 = = = = 9: 4 I 2 a22 2 4
11 (c) When a stationary wave is formed, then its frequency is half that of the individual waves.
12 (a) Phase difference 2π (Path difference) = λ π 2π (Path difference) = ⇒ 3 λ λ ⇒ Path difference = 6
13 (d) Lissajous figure is a pattern produced by the intersection of two sinusoidal waves, the axis of which are at right angles to each other.
14 (c) For interference phenomenon, we know that when two waves of equal frequency propagate in same medium and same direction, then interference phenomenon takes place. Here, waves, y1 = a sin (ωt + φ 1 ) and y3 = a′ sin (ωt + φ 2 ) have equal frequency, hence they will produce interference.
15 (c) ⇒ ∴
I 1 a12 25 = = I 2 a22 9 a1 = a2
25 9
mutually perpendicular which have π phase difference of , therefore particle 2 will follow elliptical path.
I 2 )2
= ( I1 +
For minimum intensity, I min = (a1 − a2 )2
21 (d) As the different amplitudes are
I max + I min
= ( I1 +
17
I 2 )2 + ( I 1 − I 2 )2
= 2(I 1 + I 2 ) I 9 (c) Given, 1 = I2 1
…(i)
We know that, I ∝ a2 2
I 1 a1 9 a = ⇒ = 1 I 2 a2 1 a2
So,
∴
a 3 ⇒ 1= a2 1
9 a1 = 1 a2
⇒
2
a1 : a2 = 3 : 1
18 (c) A pulse of a wave train when travels along a stretched string and reaches the fixed end of the string, then it will be reflected back to the same medium and the reflected ray suffers a phase change of π with the incident wave but wave velocity after reflection does not change.
19 (c) Let I r and I i represent the intensities of reflected and incident waves respectively, then I r µ − 1 = I i µ + 1
2
a1 5 = a2 3
I max (a1 + a2 )2 (5 + 3)2 = = I min (a1 − a2 )2 (5 − 3)2 (8)2 64 16 = = = 1 4 (2)2
I max : I min = 16 : 1
16 (d) Resultant intensity of two periodic wave is given by I = I 1 + I 2 + 2 I 1I 2 cosδ
⇒
v=
T / m1 T / m2
m2 = m1
=
I r (5/ 3) − 1 1 = = I i (5/ 3) + 1 16
20 (c) We know that, Intensity ∝ (Amplitude) 2 Hence,
I 1 a12 = I 2 a22
Here, a1 = 5, a2 = 10 I1 5×5 1 = = I 2 10 × 10 4
where, δ is the phase difference between the waves.
⇒
For maximum intensity, δ = 2nπ , where, n = 0, 1, 2, K etc.
So, I 2 / I 1 = 4 / 1
⇒
∴
a1 16 4 = = a2 9 3 4 a1 = a2 3 I max I min
4 a + a2 (a1 + a2 )2 3 2 = = 2 4 (a1 − a2 ) a2 − a2 3
2
= 49 : 1
23 (d) Beats, stationary waves, Lissajous figure all correspond to the phenomena of superposition of waves.
24 (b) The supreme position of waves in which two waves of same frequency (or same wavelength) travelling along same path superimpose each other is called interference of waves.
25 (b) y = 4 cos2 (t / 2) sin (1000t ) = 2 [ 2 cos2 (t / 2) sin (1000t )] = 2 (1 + cos t )sin (1000t ) = 2 sin (1000t ) + 2 sin (1000t )cos t = 2 sin (1000t ) + sin (1001t ) + sin (999t ) Thus, given wave represents the superposition of three waves. y1 = 2a sin (ωt − kx )
2
∴
⇒
I 1 16 a12 = = I2 9 a22
26 (c) The equations of motion are
v where, µ = 1 v2 ⇒
22 (b) Since,
25 5 = 9 3
and y2 = 2a sin (ωt − kx − θ ). Now, the equation of resultant wave is given by y = y1 + y2 = 2a sin (ωt − kx ) + 2a sin (ωt − kx − θ )
⇒ y = 2a 2 sin
ωt − kx + ωt − kx − θ 2
ωt − kx − (ωt − kx − θ ) } × cos { 2 θ θ ⇒ y = 4 a cos sin ωt − kx − …(i) 2 2 Now, comparing Eq. (i) with y = A sin (ωt − kx ), we have θ Resultant amplitude, A = 4 a cos . 2
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WAVES
Topic 4
Beats 2018 1 When two tuning forks A and B are sounded together, x beat/s are heard. Frequency of A is n. Now when one prong of fork B is loaded with a little wax, the number of beats decreases. The frequency of fork B is [JIPMER] (a) n + x (b) n − x (c) n + 2x (d) n − 2x
2 Assertion To hear different beats, difference of the frequencies of two sources should be less than 10. Reason More the number of beats more in the confusion. [AIIMS]
(a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct and Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
2016 3 Three sound waves of equal amplitudes have
frequencies ( n − 1), n, ( n + 1). They superimpose to give beats. The number of beats produced per second will be (a) 1 (b) 4 (c) 3 (d) 2 [NEET]
2013 4 A source of unknown frequency gives 4 beats/s when sounded with a source of known frequency 250 Hz. The second harmonic of the source of unknown frequency gives five beats per second when sounded with a source of frequency 513 Hz. The unknown frequency is [NEET] (a) 254 Hz (b) 246 Hz (c) 240 Hz (d) 260 Hz
2010 8 A tuning fork of frequency 512 Hz makes 4 beats/s with the vibrating string of a piano. The beat frequency decreases to 2 beats/s when the tension in the piano string is slightly increased. The frequency of the piano string before increasing the tension was [CBSE AIPMT] (a) 510 Hz (b) 514 Hz (c) 516 Hz (d) 508 Hz
9 A fork A has frequency 2% more than the standard fork and B has a frequency 3% less than the frequency of same standard fork. The forks A and B when sounded together produced 6 beats/s. The frequency of fork A is [AIIMS] (a) 116.4 Hz (b) 120 Hz (c) 122.4 Hz (d) 238.8 Hz 10 Two instruments having stretched strings are being played in unison. When the tension in one of the instruments is increased by 1%, 3 beats are produced in 2 s. The initial frequency of vibration of each wire is [BHU] (a) 600 Hz (b) 300 Hz (c) 200 Hz (d) 150 Hz 11 The frequencies of two tuning forks A and B are respectively, 1.5% more and 2.5% less than that of the tuning fork C. When A and B are sounded together, 12 beats are produced in 1 s. The frequency of the tuning fork C is [Kerala CEE] (a) 200 Hz (b) 240 Hz (c) 360 Hz (d) 300 Hz (e) 400 Hz
5 Two sound waves of slightly different frequencies propagating in the same direction produce beats due to (a) interference (b) diffraction [UP CPMT] (c) reflection (d) refraction
12 5 beats/s are produced on blowing together two closed organ pipes of the same diameter but of different lengths. If shorter pipe is of 10 cm length and speed of sound in air is 300 m/s, length of other pipe is [VMMC] (a) 10.06 cm (b) 11.22 cm (c) 16 cm (d) 14 cm (e) None of these
6 If ν1 and ν 2 are the frequencies of two tuning forks, then the beat frequency is [J&K CET] ν1 ν2 (a) (b) ν1 + ν 2 (c) (d) ν1 − ν 2 ν2 ν1 2011
13 A sound wave travels with a velocity of 300 ms −1 through a gas. 9 beats are produced in 3 s when two waves pass through it simultaneously. If one of the waves has 2 m wavelength, the wavelength of the other wave is (a) 1.98 m (b) 2.04 m [EAMCET] (c) 2.00 m (d) 1.99 m
7 Two tuning forks A and B, produce notes of frequencies 258 Hz and 262 Hz. An unknown note sounded with A produces certain beats. When the same note is sounded with B, the beat frequency gets doubled. The unknown frequency is [KCET] (a) 250 Hz (b) 252 Hz (c) 254 Hz (d) 245 Hz
14 A disc of a siren containing 60 holes rotates at a constant speed of 360 rpm. The emitted sound is in unison with a tuning fork of frequency [MGIMS] (a) 10 Hz (b) 360 Hz (c) 216 Hz (d) 60 Hz
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
15 Each of the two strings of length 51.6 cm and 49.1 cm are tensioned separately by 20 N force. Mass per unit length of both the strings is same and equal to 1 gm −1 . When both the strings vibrate simultaneously, the number of beats is [CBSE AIPMT] (a) 4 (b) 7 (c) 8 (d) 3
2009 16 A closed organ pipe and an open organ pipe of same length produce 2 beats/s while vibrating in their fundamental modes. The length of the open organ pipe is halved and that of closed pipe is doubled. Then, the number of beats produced per second while vibrating in the fundamental mode is [KCET] (a) 2 (b) 6 (c) 8 (d) 7
17 Beats are produced by two waves given by y1 = a sin 2000πt and y 2 = a sin 2008πt. The number of beats heard per second is [MHT CET] (a) zero (b) one (c) four (d) eight 18 Three sound waves of equal amplitudes have frequencies ( ν − 1), ν, ( ν + 1). They superpose to produce beats. The number of beats produced per second will be [BCECE] (a) ν (b) ν / 2 (c) 2 (d) 1 19 Two waves are represented by y1 = 4 sin 404πt and [BCECE] y 2 = 3sin 400πt. Then, (a) beat frequency is 4 Hz and the ratio of maximum to minimum intensity is 49 : 1 (b) beat frequency is 2 Hz and the ratio of maximum to minimum intensity is 49 : 1 (c) beat frequency is 2 Hz and the ratio of maximum to minimum intensity is 1 : 49 (d) beat frequency is 4 Hz and the ratio of maximum to minimum intensity is 1 : 49
2008 20 A tuning fork A produces 4 beats s −1 with another tuning fork B of frequency 320 Hz. On filling one of the prongs of A, 4 beats s −1 are again heard when sounded with the same fork B. Then, the frequency of the fork A before filling is (a) 328 Hz (b) 316 Hz [AFMC, JCECE] (c) 324 Hz (d) 320 Hz 21 Two sound waves with wavelength 5.0 m and 5.5 m respectively, each propagate in a gas with velocity 330 ms −1 . We expect the following number of beats per second [Haryana PMT] (a) 12 (b) zero (c) 1 (d) 6
22 Beats are produced by frequencies f1 and f 2 ( f1 > f 2 ). The duration of time between two successive maxima or minima is equal to [J&K CET] 1 2 2 1 (a) (b) (c) (d) f1 + f 2 f1 − f 2 f1 + f 2 f1 − f 2
23 Number of beats between A and B is 5 and between B and C is 3. Beat frequency between A and C may be [DUMET] (a) 1 (b) 2 (c) 8 (d) None of these 24 The frequencies of three tuning forks A, B and C have a relation n A > n B > nC . When the forks A and B are sounded together, the number of beats produced is n1 . When A and C are sounded together the number of beats produced is n 2 , then the number of beats produced when B and C are sounded together is [EAMCET] n1 + n 2 (a) n1 + n 2 (b) 2 (c) n 2 − n1 (d) n1 − n 2
2007 25 Which of the following is true regarding beats? (a) Frequency different, amplitude same (b) Frequency same, amplitude same (c) Frequency same, amplitude different (d) None of the above
[UP CPMT]
2006 26 Two tuning forks P and Q when set vibrating, give
4 beats s −1 . If a prong of the fork P is filled, the beats are reduced to 2 s −1 . What is frequency of P, if that of Q is 250 Hz? [AIIMS] (a) 246 Hz (b) 250 Hz (c) 254 Hz (d) 252 Hz
27 Choose the correct statement. [J&K CET] (a) Beats are due to destructive interference. (b) Maximum beat frequency audible to a human being is 20. (c) Beats are as a result of Doppler’s effect. (d) Beats are due to superposition of two waves of nearly equal frequencies. 28 When a tuning fork produces sound waves in air, which one of the following is same in the material of tuning fork as well as in air? [Punjab PMET] (a) Wavelength (b) Frequency (c) Velocity (d) Amplitude 29 A tuning fork of frequency 100 when sound together with another tuning fork of unknown frequency produces 2 beats per second. On loading the tuning fork whose frequency is not known and sounded together with the same tuning fork produces one beat, then the frequency of the unknown tuning fork is [AIIMS] (a) 102 (b) 98 (c) 99 (d) 101 30 The frequency of a tuning fork is 256 Hz. The velocity of sound in air 344 ms −1 . The distance travelled (in metre) by the sound during the time in which the tuning fork completes 32 vibrations, is [EAMCET] (a) 21 (b) 43 (c) 86 (d) 129
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WAVES
2005 31 Two vibrating tuning forks produce progressive waves
given by y1 = 4 sin 500πt and y 2 = 2sin 506πt. Number of beats produced per minute is [CBSE AIPMT] (a) 360 (b) 180 (c) 3 (d) 60
32 There are 26 tuning forks arranged in the decreasing order of their frequencies. Each tuning fork gives 3 beats with
the next. The first one is octave of the last. What is the frequency of 18th tuning fork? [BHU] (a) 100 Hz (b) 99 Hz (c) 96 Hz (d) 103 Hz
33 Three sources of equal intensities with frequencies 400, 401 and 402 vibration per second are sounded together. The number of beat per second is [J&K CET] (a) zero (b) 1 (c) 2 (d) 4
Answers 1 11 21 31
(a) (d) (d) (b)
2 12 22 32
(b) (a) (d) (b)
(a) (b) (b) (c)
3 13 23 33
4 (a) 14 (b) 24 (c)
5 (a) 15 (b) 25 (a)
6 (d) 16 (d) 26 (a)
7 (c) 17 (c) 27 (d)
8 (d) 18 (c) 28 (b)
9 (c) 19 (b) 29 (b)
10 (b) 20 (b) 30 (b)
Explanations 1 (a) Frequency of B can be n + x or n − x. When B is loaded with wax, its frequency will decrease. So if its original frequency is (n + x ), then beat frequency will decrease.
5 (a) Beats are produced on account of
2 (b) According to the property of persistence of hearing the impression of a sound heard perists on our mind 1 for s. To hear distinct beats, time 10 interval between two successive beats 1 should be greater than s. Hence, 10 difference in two frequencies must be less than 10Hz. Frequency of 10 Hz means 10 beats per second, i.e. if the number of beats is more than 10, then they will not be audible or more is the confusion.
3 (a) As we know that,
Beat frequency = f1 ~ f2 = n − (n − 1) = 1 and similarly for n and n + 1 Beat frequency = n + 1 − n = 1
2nd
508
5b
1st
246
2nd
492
21
a be
second is called beat frequency. It is expressed as ν = ν 1 − ν 2.
7 (c) Given, nA = 258 Hz and nB = 262 Hz If it produces x beats with 258 and 2x with 262, then 262 − (258 − x ) = 2x ⇒ 262 − 258 + x = 2x ⇒ x=4 Therefore, unknown frequency is n = 258 − x = 254 Hz.
and the frequency of B, 3 nB = n − n 100 According to the question, nA − nB = 6 2 3 ⇒ n + n − n − n = 6 100 100 5 n=6 ⇒ 100 600 ⇒ n= = 120 Hz 5 The frequency of A 2 nA = n + n 100 = 120 +
/s
513 s ts/
∴ f1 = 512 Hz , so f2 is 508 Hz. On increasing tension, frequency f1 is increased and beat frequency decreases, so f2 is 508 Hz before increasing tension.
9 (c) The frequency of A, nA = n +
2 n 100
2 × 120 100
= 122.4 Hz
10 (b) Initial frequency of vibration, ν∝ T When the tension in one of the instruments is increased by 1%, then ν′ ∝ 1 +
Now, | f1 − f2 | = 4 Hz
ea ts
250
6 (d) The number of beats produced per
and f2 be frequency of piano string.
beats are given below in the diagram. Here, the exact frequency may be determined by loading method. 254
interference of sound waves of slightly different frequencies.
8 (d) Let f1 be frequency of tuning fork
4 (a) For 2nd harmonic, the frequency and
1st
The frequency of unknown tunning fork can be (250 + 4 = 254 Hz) or (250 − 4 = 246Hz) Hence, to produce 5 beats per second from source frequency of 513 Hz, the unknown frequency should be 254 Hz.
1 100 1/ 2
∴ ⇒ ⇒ ⇒
ν′ 1 1 = 1 + = 1+ ν 100 200 ν′ − ν 1 = ν 200 3 beats 3 1 Q ν′− ν = = 2s 2 ν 200 ν = 300 Hz
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
11 (d) Let the frequency of tuning fork C is x Hz. The frequency of tuning fork A is 1.5 x+ x = 1.015x 100 The frequency of tuning fork B is 2.5 x− x = 0.975x 100 Beat frequency of tuning fork A and B is 1.015x − 0.975x = 0.04 x Thus, 0.04 x = 12 12 x= = 300 Hz ⇒ 0.04
12 (a) m = n1 − n2 =
v 1 1 − 4 l1 l2
300 × 100 1 1 ⇒ 5= l − l 4 1 2 1 1 1 20 ⇒ − = l1 l2 300 × 100 1500
13
149 1 1 1 ⇒ = − l2 10 1500 1500 1500 ⇒ l2 = = 10.06 cm 149 9 (b) Frequency, f = = 3 Hz 3 1 1 f =v − λ λ 1 2 1 1 ⇒ 3 = 300 − 2 λ2 ⇒
14
1 1 1 = − 100 2 λ 2
⇒
1 1 1 = − λ 2 2 100
⇒
1 50 − 1 49 = = λ2 100 100
100 λ2 = = 2.04 m ⇒ 49 (b) Speed = 360 rev/min 360 rev/s = 6 rev/s = 60 ∴ Frequency = 6 × 60 = 360 Hz
15 (b) The number of beats will be the difference of frequencies of the two strings. Frequency of first string, f1 = =
1 2l1
T m
1 20 −2 2 × 51.6 × 10 10−3
= 137.03 Hz
Similarly, frequency of second string
= 144.01Hz Number of beats = f2 − f1 = 144 − 137 = 7 beats
16 (d) Given, fo − fc = 2
18 (c) If (ν − 1), ν , (ν + 1) be the frequencies of the three waves and a be the amplitude of each, then y1 = a sin 2π (ν − 1)t ,
1 20 f2 = −2 2 × 49.1 × 10 10−3
…(i)
Frequency of fundamental mode for a v closed organ pipe, fc = 4 Lc Similarly, frequency of fundamental mode for an open organ pipe, v fo = 2Lo Given, Lc = Lo …(ii) ⇒ fo = 2 fc From Eqs. (i) and (ii), we get fo = 4Hz and fc = 2Hz When the length of an open pipe is halved, its frequency of fundamental mode is v fo′ = = 2 fo 2 [ Lo / 2 ]
y2 = a sin 2π νt and y3 = a sin 2π (ν + 1)t Resultant displacement due to all three waves is y = y1 + y2 + y3 = a sin 2πνt + a [sin 2π (ν − 1)t + sin 2π (ν + 1) t ] = a sin 2πνt + a [ 2 sin 2π νt cos 2πt ] = a [ 2 cos 2πt + 1] sin 2πνt = a′ sin 2π νt where, a′ = a [1 + 2 cos 2πt ] So, I ∝ (a′ )2 ∝ a2 (1 + 2 cos 2πt )2 For I to be maximum or minimum, dI =0 dt d ⇒ (1 + 2 cos 2πt )2 = 0 dt i.e. 2(1 + 2 cos πt ) (2 sin 2πt ) × 2π = 0 Either sin 2πt = 0 or 1 + 2 cos 2πt = 0 So,if 1 + 2 cos 2πt = 0 2π 3
= 2 × 4 Hz = 8 Hz When the length of the closed pipe is doubled, its frequency of fundamental mode, v 1 fo′ = = fc 4 (2Lc ) 2 1 = × 2 = 1 Hz 2
⇒
Hence, number of beats produced per second is
i.e. I is minimum and if sin 2πt = 0 2πt = nπ , n = 0, 1, 2, ... 1 3 t = 0, , 1, , 2, ... ⇒ 2 2 ∴ I is therefore 9a2 , a2 , 9a2 , a2.
fo′ − fc′ = 8 − 1 = 7
17 (c) Here, y1 = a sin 2000 πt and
y2 = a sin 2008 πt
Comparing with y = a sin ωt, we have ω 1 = 2000 π ⇒ 2πf1 = 2000π ⇒ f1 = 1000 Hz and ω 2 = 2008π ⇒ 2πf2 = 2008 π ⇒ f2 = 1004 Hz ∴ Beat frequency = | f1 − f2 | = | 1004 − 1000 | = 4 Hz Thus, number of beats heard per second is 4.
2πt = 2πn ±
where, n = 0, 1, 2, ... 1 2 4 5 t = , , , , ... 3 3 3 3 and for these values of t, 1 cos 2πt = − , I = 0, 2
i.e. intensity is maximum (with two different values) i.e. number of beats per second is two.
19 (b) Given, y1 = 4 sin 404 πt and y2 = 3 sin 400πt Comparing with equation y = A sinωt ∴ ω 1 = 404 π , ω 2 = 400π A1 = 4 , A2 = 3 Q
ω 1 = 2πν 1
⇒
404 π = 2πν 1
⇒
ν 1 = 202 Hz
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WAVES
Q
ω 2 = 2πν 2
⇒
400π = 2πν 2
23 (b) Number of beats between A and B,
⇒ ν 2 = 200 Hz Beat frequency = ν 1 − ν 2 = 202 − 200 = 2 Hz 2
2 I max A1 + A2 4 + 3 = = 4 − 3 I min A1 − A2 2
49 7 = = 1 1
20 (b) There are 4 beats between A and B, therefore the possible frequencies of A are 316 or 324, i.e. (320 ± 4 ) Hz.
When the prong of A is filled, its frequency becomes greater than the original frequency. If we assume that original frequency of A is 324, then on filling its frequency will be greater than 324. The beats between A and B will be more than 4. But it is given that, the beats are again 4, therefore, 324 is not possible. Therefore, required frequency must be 316 Hz. This is true because on filing the frequency may increase so as to give 4 beats with B of frequency 320 Hz.
21 (d) Let λ 1 = 5.0 m, v = 330 ms−1 and λ 2 = 5.5 m The relation between frequency, wavelength and velocity is given by v = nλ v …(i) ⇒ n= λ The frequency corresponding to wavelength λ 1, v 330 n1 = = = 66 Hz λ 1 5. 0 The frequency corresponding to wavelength λ 2, v 330 = = 60 Hz n2 = λ 2 5.5 Hence, number of beats per second = n1 − n2 = 66 − 60 = 6
22 (d) The time-interval between two successive beats 1 1 T = = f1 − f2 Beat frequency
n1 = 5 Number of beats between B and C, n2 = 3 Hence, number of beats between A and C, n3 = n1 − n2 = 5 − 3 = 2
24 (c) When A and B are sounded together the number of beats = n1
When A and C are sounded together the number of beats = n2 So, the number of beats produced when B and C are sounded together = n2 − n1
25 (a) When two sound waves of slightly different frequencies and equal amplitude travelling along the same direction superimpose at a point give rise to beats.
26 (a) There are four beats between P and Q, therefore the possible frequencies of P are 246 or 254 (i.e. 250 ± 4 ) Hz. When the prong of P is filled, its frequency becomes greater than the original frequency. If we assume that the original frequency of P is 254, then on filling its frequency will be greater than 254. The beats between P and Q will be more than 4. But it is given that the beats are reduced to 2, therefore, 254 is not possible.
29 (a) Unknown frequency may be 102 Hz or 98 Hz. On loading this tuning fork, its frequency will decrease. Suppose they become 101 Hz or 97 Hz. With 100 Hz, beat frequency will be 1 Hz or 3 Hz. Given frequency is 1 Hz. Hence, unknown frequency should be 102 Hz.
30 (b) Wavelength of sound,
v 344 = m n 256 So, distance travelled by the sound in 32 vibrations is 344 s = 32λ = 32 × = 43 m 256
λ=
31 (b) Here, y1 = 4 sin 500πt and
y2 = 2 sin 506 πt Comparing with y = a sin ωt we have ω 1 = 500π
⇒ 2πf1 = 500π ⇒ f1 = 250 Hz and ω 2 = 506π ⇒ 2πf2 = 506π ⇒ f2 = 253 Hz Now, beats produced per second | f1 − f2 | = 3 Beats produced per minute = 3 × 60 =180
32 (b) Frequency of two consecutive forks is 3. ∴ f = f1 + (n − 1)(d ) (arithmetic progression) Given,
f1 = 2 f , n = 26 and d = − 3
Therefore, the required frequency must be 246 Hz. This is true, because on filling the frequency may increase to 248, giving 2 beats with Q of frequency 250 Hz.
∴
f = 2 f + (26 − 1)(−3)
27 (d) Beats are the periodic and repeating
⇒
fluctuation heard when two sound waves of nearly equal frequencies interfere with one another.
28 (b) Speed of sound depends on pressure, temperature, humidity and motion of air. While there is no effect of frequency on the speed of sound. Sound waves of different frequencies travel with the same speed in air although their wavelengths in air are different.
⇒ f = 75 Hz Frequency of 18th tuning fork is f18 = f1 + (18 − 1)(−3) = 2 × 75 + 17 × (−3) = 150 − 51 = 99 Hz
33 (c) Beats are the periodic and repeating fluctuations heard in the intensity of sound, when two sound waves of very similar frequencies interfere with one another. Beats = Difference in frequencies. Maximum number of beats per second = 402 − 400 = 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 5 Stationary Waves : Vibrations of Strings and Organ Pipes 2019 1 A string wave equation is given by
y = 0.002sin( 300t − 15x ) and mass density is (µ = 01 . kg/m). Then, find the tension force in the string. [AIIMS] (a) 30 N (b) 20 N (c) 40 N (d) 45 N
2 If the speed of sound in air is 330 m/s, then find the number of tones present in an open organ pipe of length 1 m whose frequency is ≤ 1000 Hz. [AIIMS] (a) 2 (b) 4 (c) 8 (d) 6 3 A tuning fork with frequency 800 Hz produces resonance in a resonance column tube with upper end open and lower end closed by water surface. Successive resonance are observed at length 9.75 cm, 31.25 cm and 52.75 cm. The speed of sound in air is [NEET (Odisha)] (a) 500 ms −1 (b) 156 ms −1 (c) 344 ms −1 (d) 172 ms −1
2018 4 An organ pipe open on both ends in the nth harmonic is in resonance with a source of 1000 Hz. The length of pipe is 16.6 cm and speed of sound in air is 332 m/s. Find the value of n. [JIPMER] (a) 3 (b) 2 (c) 1 (d) 4
5 A steel rod 100 cm long is damped at into middle. The fundamental frequency of longitudinal vibrations of the rod are given to be 2.53 kHz. What is the speed of sound in steel? [AIIMS] −1 −1 (a) 6.2 kms (b) 5.06 kms (c) 7.23 kms −1 (d) 7.45 kms −1 6 The fundamental frequency in an open organ pipe is equal to the third harmonic of a closed organ pipe. If the length of the closed organ pipe is 20 cm, the length of the open organ pipe is [NEET] (a) 12.5 cm (b) 8 cm (c) 13.3 cm (d) 16 cm 7 A tuning fork is used to produce resonance in a glass tube. The length of the air column in this tube can be adjusted by a variable piston. At room temperature of 27° C, two successive resonances are produced at 20 cm and 73 cm of column length. If the frequency of the tuning fork is 320 Hz, the velocity of sound in air at [NEET] 27° Cis (a) 350 ms −1 (b) 339 ms −1 (c) 330 ms −1 (d) 300 ms −1
2017 8 The two nearest harmonics of a tube closed at one end and open at other end are 220 Hz and 260 Hz. What is the fundamental frequency of the system? [NEET] (a) 10 Hz (b) 20 Hz (c) 30 Hz (d) 40 Hz
2016 9 The fundamental frequency of a closed organ pipe of length 20 cm is equal to the second overtone of an organ pipe open at both the ends. The length of organ pipe open at both the ends is [NEET] (a) 80 cm (b) 100 cm (c) 120 cm (d) 140 cm
10 A uniform rope of length L and mass m1 hangs vertically from a rigid support. A block of mass m2 is attached to the free end of the rope. A transverse pulse of wavelength λ 1 is produced at the lower end of the rope. The wavelength of the pulse when it reaches the top of the [NEET] rope is λ 2 . The ratio λ 2 / λ 1 is (a)
m1 + m2 m2
(b)
m2 m1
(c)
m1 + m2 m1
(d)
m1 m2
2015 11 An air column, closed at one end and open at the other, resonates with a tuning fork when the smallest length of the column is 50 cm. The next larger length of the column resonating with the same tuning fork is [NEET] (a) 100 cm (b) 150 cm (c) 200 cm (d) 66.7cm
2014 12 If n1 , n 2 and n 3 are the fundamental frequencies of three segments into which a string is divided, then the original fundamental frequency n of the string is given by 1 1 1 1 [CBSE AIPMT] (a) = + + n n1 n 2 n 3 1 1 1 1 (b) = + + n n1 n2 n3 (c) n = n1 + n 2 + n 3 (d) n = n1 + n 2 + n 3
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WAVES
13 The number of possible natural oscillations of air column in a pipe closed at one end of length 85 cm whose frequencies lie below 1250 Hz are (take, velocity of sound = 340 ms −1 ) [CBSE AIPMT] (a) 4
(b) 5
(c) 7
(d) 6
14 A whistle whose air column is open at both ends has a fundamental frequency of 5100 Hz. If the speed of sound in air is 340 ms −1 , then the length of the whistle, in cm is [WB JEE] (a) 5/3 (b) 10/3 (c) 5 (d) 20/3 15 A closed pipe and an open pipe of same length produce 2 beats, when they are set into vibration simultaneously in their fundamental mode. If the length of the open pipe is halved and that of closed pipe is doubled, and if they are vibrating in the fundamental mode, then the number of beats produced is [EAMCET] (a) 4 (b) 7 (c) 2 (d) 8 16 A pipe of 30 cm long open at both the ends produces harmonics. Which harmonic mode of pipe resonates at 1.1 kHz source? (Take, speed of sound in air = 330 ms −1 ) (a) Fifth harmonic (b) Fourth harmonic [KCET] (c) Third harmonic (d) Second harmonic 17 A metallic wire of 1 m length has a mass of 10 × 10−3 kg. If a tension of 100 N is applied to a wire, then what is the speed of transverse wave? [KCET] −1 −1 −1 (a) 100 ms (b) 10 ms (c) 200 ms (d) 0.1 ms −1
2013 18 If we study the vibration of a open pipe at both ends, then
20 What is the fractional change in tension necessary in a sonometer of fixed length to produce a note one octave lower than before? [UP CPMT] 1 1 (a) (b) 4 2 2 3 (c) (d) 3 4
2012 21 A transverse wave propagating on a stretched string of
linear density 3 × 10−4 kg -m −1 is represented by the equation y = 0.2 sin (15x + 60t ) where, x is in metres and t is in seconds. The tension in the string (in newton) is [AFMC] (a) 0.24 (b) 0.48 (c) 1.20 (d) 1.80
22 The frequency of the first overtone of a closed pipe of length l1 is equal to that of the first overtone of an open pipe of length l2 . The ratio of their lengths ( l1 : l2 ) is (a) 2 : 3 (b) 4 : 5 [WB JEE] (c) 3 : 5 (d) 3 : 4
2011 23 Assertion The fundamental frequency of an open organ pipe increases as the temperature is increased. Reason As the temperature increases, the velocity of sound increases more rapidly than length of the pipe. (a) Both Assertion and Reason are correct and Reason is the correct explanation of the Assertion [AIIMS] (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion (c) Assertion is correct but Reason is incorrect (d) Both Assertion and Reason are incorrect
which of the following statements is not true? [NEET] (a) Open end will be anti-node. (b) Odd harmonics of the fundamental frequency will be generated. (c) All harmonics of the fundamental frequency will be generated. (d) Pressure change will be maximum at both ends.
24 Two Cu wires of radii R1 and R 2 are such that ( R1 > R 2 ). Then, which of the following is true? [MHT CET] (a) Transverse wave travels faster in thicker wire (b) Transverse wave travels faster in thinner wire (c) Travels with the same speed in both the wires (d) Does not travel
19 Assertion Velocity of particles while crossing mean position (in stationary waves) from maximum at anti-nodes to zero at nodes. Reason Amplitude of vibration at anti-nodes is maximum and at nodes, the amplitude is zero and all particles between two successive nodes cross the mean position together. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion (c) Assertion is correct but Reason is incorrect (d) Both Assertion and Reason are incorrect (e) Assertion is incorrect but Reason is correct
25 In the fundamental mode, time taken by the wave to reach the closed end of the air filled pipe is 0.01 s. The fundamental frequency is [MHT CET] (a) 25 (b) 12.5 (c) 20 (d) 15 26 n1 is the frequency of the pipe closed at one end and n 2 is the frequency of the pipe open at both ends. If both are joined end to end, find the fundamental frequency of closed pipe so formed. [MHT CET] n1 n 2 n1 n 2 (a) (b) n 2 + 2 n1 2 n 2 + n1 n + 2n 2 2 n + n2 (d) 1 (c) 1 n 2 2 n1 n 2 n1
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
27 The fundamental frequencies of an open and a closed tube, each of same length l with v as the speed of sound in air, respectively are [Manipal] v v v v (b) and (a) and 2l l l 2l v v v v (d) and (c) and 2l 4l 4l 2l 28 A cylindrical tube closed at one end contains air. It produces the fundamental note of frequency 512 Hz. If the tube is opened at both ends, then the fundamental frequency that can be excited is [Manipal] (a) 256 Hz (b) 512 Hz (c) 1024 Hz (d) 128 Hz 29 An air column in a pipe which is closed at one end, will be in resonance with the vibrating body of frequency 166 Hz, if the length of the air column is [Manipal] (a) 0.5 m (b) 1.0 m (c) 1.5 m (d) 2.0 m 30 In a stationary wave, all the particles [OJEE] (a) on either side of a node vibrate in same phase (b) in the region between two nodes vibrate in same phase (c) in the region between two anti-nodes vibrate in same phase (d) of the medium vibrate in same phase 31 Air is blown at the mouth of an open tube of length 25 cm and diameter 2 cm. If the velocity of sound in air is 330 ms −1 , then the emitted frequencies (in Hz) are [Kerala CEE]
(a) 660, 1320, 2640 (c) 302, 664, 1320 (e) 330, 660, 990
(b) 660, 1000, 3300 (d) 330, 990 1690
32 The fundamental frequency of a closed pipe is 220 Hz. If 1 th of the pipe is filled with water, then the frequency 4 of the first overtone of the pipe now is [Haryana PMT] (a) 220 Hz (b) 440 Hz (c) 880 Hz (d) 1760 Hz 33 A pipe opened at both ends produces a note of frequency 3 f1 . When the pipe is kept with th of its length in 4 f water, it produces a note of frequency f 2 . The ratio 1 is f2 [BCECE]
3 (a) 4
4 (b) 3
1 (c) 2
(d) 2
34 A stretched string of length l fixed at both ends can sustain stationary waves of wavelength λ given by [CG PMT] 2 2 n l (b) λ = (a) λ = 2l 2n 2l (c) λ = (d) λ = 2 ln n (Here, n is a integer)
35 Two vibrating strings of the same material but lengths L and 2 L have radii 2 r and r respectively. They are stretched under the same tension. Both the strings vibrate in their fundamental modes, the one of length L with frequency ν1 and the other with frequency ν 2 . The ratio [JIPMER] ν1 / ν 2 is (a) 2 (b) 4 (c) 3 (d) 1 36 A wire under tension vibrates with a fundamental frequency of 600 Hz. If the length of the wire is doubled, the radius is halved and the wire is made to vibrate under one-ninth the tension. Then, the fundamental frequency will become [KCET] (a) 200 Hz (b) 300 Hz (c) 600 Hz (d) 400 Hz 37 A piston of filled in cylindrical pipe is pulled as shown in the figure. A tuning fork is sounded at open end and loudest sound is heard at open length 13 cm, 41 cm and 69 cm. The frequency of tuning fork, if velocity of sound is 350 ms −1 , is [DUMET]
(a) 1250 Hz (b) 625 Hz
(c) 417 Hz
(d) 715 Hz
38 A uniform wire of length L, diameter D and density ρ is stretched under a tension T. The correct relation between its fundamental frequency f, the length L and the diameter D is [KCET] 1 1 (a) f ∝ (b) f ∝ LD L D 1 1 (d) f ∝ (c) f ∝ 2 D LD 2 39 Standing waves are formed on a string when interference occurs between two waves having [MGIMS] (a) the same amplitude travelling in the same direction with no phase difference between them (b) the same amplitude, travelling in the opposite direction with no phase difference between them (c) different amplitudes travelling in the same direction (d) different amplitudes travelling in the opposite direction
2009 40 A wave in a string has an amplitude of 2 cm. The wave
travels in the +ve direction of x-axis with a speed of 128 ms −1 and it is noted that 5 complete waves fit in 4 m length of the string. The equation describing the wave is (a) y = 0.02sin (7.85 x + 1005t ) [BSE AIPMT] (b) y = 0.02 sin (15.7 x − 2010t ) (c) y = 0.02 sin (15.7 x + 2010t ) (d) y = 0.02 sin (7.85 x − 1005t )
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WAVES
41 A resonance in an air column of length 40 cm resonates with a tuning fork of frequency 450 Hz. Ignoring end correction, the velocity of sound in air is [AIIMS] −1 −1 (b) 720 ms (a) 1020 ms −1 (d) 820 ms −1 (c) 620 ms 42. A closed organ pipe of length 1.2 m vibrates in its first overtone mode. The pressure variation is maximum at (a) 0.4 m from the open end [AIIMS] (b) 0.4 m from the closed end (c) Both (a) and (b) (d) 0.8 m from the open end 43 In a resonance pipe, the first and second resonances are obtained at depths 22.7 cm and 70.2 cm, respectively. What will be the end correction? [MHT CET] (a) 1.05 cm (b) 115.5 cm (c) 92.5 cm (d) 113.5 cm 44 Fundamental frequency of pipe is 100 Hz and other two frequencies are 300 Hz and 500 Hz, then [MHT CET] (a) pipe is open at both the ends (b) pipe is closed at both the ends (c) one end is open and another end is closed (d) None of the above 45 In a closed organ pipe, the first resonance occurs at 50 cm. At what length of pipe, the second resonance will occur? (a) 150 cm (b) 50 cm [OJEE] (c) 100 cm (d) 200 cm 46 A sonometer wire supports a 4 kg load and vibrates in fundamental mode with a tuning fork of frequency 416 Hz. The length of the wire between the bridges is now doubled. In order to maintain fundamental mode, the load should be changed to [Kerala CEE] (a) 1 kg (b) 2 kg (c) 4 kg (d) 8 kg (e) 16 kg 47 Damping on sharpness or resonance has (a) no effect [Haryana PMT, CG PMT] (b) more damping, sharper resonance (c) less damping, sharper resonance (d) less damping, less sharp resonance 48 In a stationary wave represented by y = 2a cos kx sin ωt, the intensity at a certain point is maximum when (a) cos kx is maximum [Haryana PMT, CG PMT] (b) cos kx is minimum (c) sin ωt is maximum (d) sin ωt is minimum
49 A sound wave with frequency 256 Hz falls normally on a perfectly reflecting wall. The shortest distance from the wall at which the air particles will have maximum amplitude of vibrations is nearly (velocity of sound in air is 336 ms −1 ) [J&K CET] (a) 32.8 cm
(b) 50 cm
(c) 65.8 cm
(d) 25 cm
50 Which of the following functions does not represent a stationary wave? Here a, b and c are constants. [BCECE] (a) y = a cos bx sin ct (b) y = a sin bx cos ct (c) y = a sin ( bx + ct ) (d) y = a sin ( bx + ct ) + a sin ( bx − ct ) 51 A cylindrical tube open at both the ends has a 1 fundamental frequency of 390 Hz in air. If th of the 4 tube is immersed vertically in water, then the fundamental frequency of air column is [KCET] (a) 260 Hz (b) 130 Hz (c) 390 Hz (d) 520 Hz 52 A cylindrical tube, open at both ends emits a fundamental frequency f in air. The tube is dipped vertically in water, so that half of it is in water. The fundamental frequency of air column is now [MGIMS] (a) f / 2 (b) 3 f / 4 (c) f (d) 2 f 53 The end correction of a resonance column is 1.0 cm. If the shortest length resonating with the tuning fork is 15.0 cm, the next resonating length will be [MGIMS] (a) 31 cm (b) 45 cm (c) 46 cm (d) 47 cm 54 If λ 1 , λ 2 and λ 3 are the wavelengths of the waves giving resonance with the fundamental, first and second overtones respectively of a closed organ pipe. Then, the ratio of wavelengths λ 1 : λ 2 : λ 3 is [UP CPMT] (a) 1 : 3 : 5 (b) 1 : 2 : 3 1 1 (c) 5 : 3 : 1 (d) 1: : 3 5
2008 55 An organ pipe P closed at one end vibrates in its first harmonic. Another organ pipe Q open at both ends vibrates in its third harmonic. When both are in resonance with a tuning fork, the ratio of the length of P to that of Q is [Kerala CEE] 1 1 1 1 (a) (b) (c) (d) 2 4 6 8 1 (e) 3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
56 A string is hanging from a rigid support. A transverse pulse is excited at its free end. The speed at which the pulse travels a distance x is proportional to [Kerala CEE] 1 (a) x (b) x 1 (c) (d) x 2 x (e) x 57 A metal wire of mass per unit length of 9.8 gm −1 is stretched with a tension of 10 kW between two rigid supports 1 m apart. The wire passes at its middle point between the poles of a permanent magnet and it vibrates in resonance when carrying an alternating current of frequency n. The frequency n of the alternating source is [MHT CET]
(a) 50 Hz
(b) 100 Hz
(c) 200 Hz
(d) 25 Hz
58 A uniform wire of linear density 0.004 kgm −1 when stretched between two rigid supports with a tension 3. 6 × 102 N, resonates with a frequency of 420 Hz. The next harmonic frequency with which the wire resonates is 490 Hz. The length of the wire (in metre) is [Punjab PMET] (a) 1.41 (b) 2.14 (c) 2.41 (d) 3.14 59 To increase the frequency by 20%, the tension in the string vibrating on a sonometer has to be increased by (a) 44% (b) 33% [Punjab PMET] (c) 22% (d) 11% 60 Two strings of the same material and the same area of cross-section are used in sonometer experiment. One is loaded with 12 kg and the other with 3 kg. The fundamental frequency of the first string is equal to the first overtone of the second string. If the length of the second string is 100 cm, then the length of the first string is [EAMCET] (a) 300 cm (b) 200 cm (c) 100 cm (d) 50 cm 61 A string vibrates with a frequency of 200 Hz. When its length is doubled and tension is altered, it begins to vibrate with a frequency of 300 Hz. The ratio of the new tension to the original tension is [KCET] (a) 9 : 1 (b) 1 : 9 (c) 3 : 1 (d) 1 : 3 62 A standing wave having 3 nodes and 2 anti-nodes is formed between two atoms having a distance 1.21 Å between them. The wavelength of the standing wave is (a) 1.21 Å (b) 1.42 Å [MHT CET] (c) 6.05 Å (d) 3.63 Å
63 A wave represented by the equation y = a cos ( kx − ωt ) is superposed with another wave to form a stationary wave such that the point x = 0 is a node. The equation for the other wave is [Kerala CEE] (a) y = a cos ( kx + ωt ) (b) y = a sin ( kx + ωt ) (c) y = − a sin ( kx + ωt ) (d) y = − a sin ( kx − ωt ) (e) y = − a cos ( kx + ωt ) 64 A segment of wire vibrates with fundamental frequency of 450 Hz under a tension of 9 kg-wt. Then, tension at which the fundamental frequency of the same wire becomes 900 Hz is [J&K CET] (a) 36 kg-wt (b) 27 kg-wt (c) 18 kg-wt (d) 72 kg-wt 65 A tuning fork of frequency 340 Hz is vibrated just above the tube of 120 cm height. Water is poured slowly in the tube. What is the minimum height of water necessary for the resonance? (Take, speed of sound in air = 340 ms −1 ) (a) 45 cm (b) 30 cm [Punjab PMET] (c) 40 cm (d) 25 cm 66 A stretched wire of length 110 cm is divided into three segments whose frequencies are in ratio 1 : 2 : 3. Their length must be [Punjab PMET] (a) 20 cm, 30 cm, 60 cm (b) 60 cm, 30 cm, 20 cm (c) 60 cm, 20 cm, 30 cm (d) 30 cm, 60 cm, 20 cm 67 A glass tube is open at both the ends. A tuning fork of frequency f resonates with the air column inside the tube. Now, the tube is placed vertically inside water so that half the length of the tube is filled with water. Now, the air column inside the tube is in unison with another fork of frequency f ′. Then, [KCET] (a) f ′ = f (b) f ′ = 4 f f (c) f ′ = 2 f (d) f ′ = 2
2006 68 A closed organ pipe of length 20 cm is sounded with tuning fork in resonance. What is the frequency of tuning fork? (Take, speed of sound = 332 ms −1 ) [AFMC] (a) 300 Hz (c) 375 Hz
(b) 350 Hz (d) 415 Hz
69 Two closed organ pipes A and B have the same length. A is wider than B. They resonate in the fundamental mode at [BHU] frequencies n A and n B respectively, then (a) n A = n B (b) n A > n B (c) n A < n B (d) Either (b) or (c) depending on the ratio of their diameters
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70 A closed organ pipe and an open organ pipe are tuned to the same fundamental frequency. What is the ratio of their lengths? [Manipal] (a) 1 : 2 (b) 2 : 1 (c) 2 : 3 (d) 4 : 3 71 Two stretched strings of same material are vibrating under same tension in fundamental mode. The ratio of their frequencies is 1 : 2 and ratio of the length of the vibrating segments is 1 : 4, then the ratio of the radii of the strings is [Kerala CEE] (a) 2 : 1 (b) 4 : 1 (c) 3 : 2 (d) 8 : 1 (e) 4 : 5 72 To increase the frequency from 100 Hz to 400 Hz, the tension in the string has to be changed by [KCET] (a) 4 times (b) 16 times (c) 2 times (d) None of these 73 A string has tension T. For tripling the frequency, the tension in string will become [DUMET] T (a) 3T (b) 9 T (c) (d) 9T 3 74 A uniform string of length 1.5 m has two successive harmonics of frequencies 70 Hz and 84 Hz. The speed of the wave in the string (in ms −1 ) is [EAMCET] (a) 84 (b) 42 (c) 21 (d) 10.5 75 When the length of the vibrating segment of a sonometer wire is increased by 1% , the percentage change in its frequency is [KCET] 100 99 (a) (b) 101 100 (c) 1 (d) 2
2005 76 If the length of an open organ pipe is 33.3 cm, then the
frequency of fifth overtone is ( v sound = 333 ms −1 ) [MHT CET] (a) 3000 Hz (b) 1500 Hz (c) 2500 Hz (d) 1250 Hz
77 In an open organ pipe of length 1 m, what is the harmonic of resonance obtained with a tuning fork of frequency 480 Hz? (a) First (b) Second [J&K CET] (c) Third (d) Fourth 78 The fundamental frequency of a sonometer wire is n. If its radius is doubled and its tension becomes half, the material of the wire remains same, then the new fundamental frequency will be [BCECE] n n n (d) (c) (a) n (b) 2 2 2 2 79 In open organ pipe, if fundamental frequency is n, then the other frequencies are [BCECE] (a) n, 2 n, 3 n, 4 n (b) n, 3n, 5n (c) n, 2 n, 4 n, 8 n (d) None of these 80 Two instruments having stretched strings are being played in unison. When the tension of one of the instruments is increased by 1%, 3 beats are produced in 2 s. The initial frequency of vibration of each wire is (a) 300 Hz (b) 500 Hz [JCECE] (c) 1000 Hz (d) 400 Hz 81 In an experiment with sonometer, a tuning fork of frequency 256 Hz resonates with a length of 25 cm and another tuning fork resonates with a length of 16 cm. Tension of the string remaining constant, the frequency of the second tuning fork is [KCET] (a) 163.84 Hz (b) 400 Hz (c) 320 Hz (d) 204.8 Hz
Answers 1 11 21 31 41 51 61 71 81
(c) (b) (b) (a) (b) (a) (a) (d) (b)
2 12 22 32 42 52 62 72
(d) (a) (d) (c) (a) (c) (a) (b)
3 13 23 33 43 53 63 73
(c) (d) (a) (c) (a) (d) (e) (d)
4 14 24 34 44 54 64 74
(c) (b) (b) (c) (c) (d) (a) (b)
5 15 25 35 45 55 65 75
(b) (b) (a) (d) (a) (c) (a) (c)
6 16 26 36 46 56 66 76
(c) (d) (a) (a) (e) (e) (b) (a)
7 17 27 37 47 57 67 77
(b) (a) (c) (b) (c) (a) (a) (c)
8 18 28 38 48 58 68 78
(b) (d) (c) (a) (a) (b) (d) (d)
9 19 29 39 49 59 69 79
(c) (b) (a) (b) (a) (a) (c) (a)
10 20 30 40 50 60 70 80
(a) (d) (d) (d) (c) (c) (a) (a)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations …(i) ⇒ λ = 2l Given, l = 100 cm, ν = 2.53 kHz = 2.53 × 103 Hz
and for second resonance,
1 (c) Given, wave equation,
y = 0.002 sin(300t − 15x ) Mass density, µ = 01 . kg/m
A λ/4
Comparing the given wave equation with y = a sin(ωt − kx ), we have
We know that, v = νλ = ν × 2l
N
ω = 300, k = 15
l2
∴ Velocity of wave, ω 300 v= = = 20 m/s k 15
= 2.53 × 10 × 2 × 100 × 10−2
λ/2
= 5.06 × 103 ms −1 = 5.06 kms −1
Wave speed in string is also given by
6 (c) Fundamental frequency for an open
T µ
v=
λ λ 3λ l2 = + = 4 2 4
where, T = tension in the string and µ = mass per unit length of string T 01 . T 400 = 01 .
∴
20 =
⇒ ⇒
…(ii)
From Eqs. (i) and (ii), we get 3λ λ λ l2 − l1 = − = 4 4 2 ⇒
λ = 2 (l2 − l1 )
⇒
v = 2 f (l2 − l1 )
T = 40N
Length of open organ pipe, l = 1m
Here, f = 800 Hz, l1 = 9.75 cm and l2 = 3125 . cm Substituting the given values in Eq. (iii), we get
For open organ pipe, Fundamental frequency, 330 v f0 = = = 165Hz 2l 2 × 1
⇒ v = 2 × 800(3125 . − 9.75) = 34400 cm/s = 344 ms −1
∴Number of tones present in the open organ pipe f 1000 = = f0 165 ~6 = 6.06 −
3. (c) For vibrating tuning fork over a resonance tube, the first resonance is obtained at the length A
4 (c) Given, f = 1000 Hz, v = 332 m/s, −2
l = 16.6 cm = 16.6 × 10 m Frequency in an organ pipe open on both ends, nv 2 fl or f = n= 2l v 2 × 1000 × 16.6 × 10−2 or n= =1 332
5 (b) In fundamental mode, λ λ l=2 = 4 2
λ/4
l1 N
λ l1 = 4
…(iii) v Q λ = f
2 (d) Given, speed of sound, v = 330 m/s Frequency, f = 1000 Hz
N
A
…(i)
[from Eq. (i)] 3
λ/4
l
A λ/4
organ pipe is given as v f1 = 2L where, L is the length of the open organ pipe. Third harmonic for a closed organ pipe is given as 3v f′ = 4 L′ where, L′ is the length of closed organ pipe. According to the question, f = f′ 2 v 3v = ⇒ L = L′ 3 2L 4 L′ Given, L′ = 20 cm 2 40 cm = 13.3 cm ⇒ L = × 20 cm = 3 3 λ 4 3λ For second resonance, l2 = 4 3λ λ ∴ (l2 − l1 ) = − 4 4 or …(i) λ = 2 (l2 − l1 ) As, velocity of sound wave is given as v=νλ where, ν is the frequency. …(ii) ⇒ v = ν[ 2 (l2 − l1 )] [ from Eq. (i)] Here, ν = 320 Hz, l2 = 0.73 m, l1 = 0.20 m (given) Putting the values in Eq. (ii), we get v = 2[ 320(0.73 − 0.20)] = 2 × 320 × 0.53 ~ 339 ms−1. = 339.2ms−1 −
7 (b) For first resonance, l1 =
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WAVES
8 (b) Frequency of nth harmonic in an closed end tube, (2n − 1) v f = n = 1, 2, 3, K 4l Also, only odd harmonics exists in a closed end tube. Now, given two nearest harmonics are of frequency 220 Hz and 260 Hz. ∴
(2n − 1) v = 220 Hz 4l
So for two different cases, we get T λ2 m1 + m2 = 2= T1 λ1 m2
v = 20 Hz 4l ∴ Fundamental frequency of the system v = = 20 Hz 4l ⇒
9 (c) The fundamental frequencies of closed and open organ pipe are given as v v and ν o = νc = 4l 2l′
column is associated with fundamental mode of vibration of the air column as shown in the diagram
L
λ Lmin= — 4
λ 4 λ 50 cm = ⇒ 4 ⇒ λ = 200 cm The next higher length of the air column is λ λ λ + 2λ 3λ L= + = = 4 2 4 4 3 = × 200 = 150 cm 4
Q
Lmin =
12 (a) From law of length, the frequency
Given, the second overtone (i.e. third harmonic) of open pipe is equal to the fundamental frequency of closed pipe i.e 3ν o = νc v v 3 = ⇒ 2l′ 4 l
of vibrating string is inversely proportional to its length, i.e. 1 n ∝ or nl = constant (say k) l k or nl = k or l = n The segments of string of length l1 , l2 , l3 ... have frequencies n1 , n2 , n3 , ... Total length of string is l.
⇒
So
l′ = 6l = 6 × 20 = 120 cm
10 (a) According to question, we have,
∴
Wavelength of transverse pulse v λ= f
or
…(i)
where, v = velocity of the wave and f = frequency of the wave. …(ii)
where, T = tension in the string or rope and µ = mass per unit length of the rope. From Eqs. (i) and (ii), we get
⇒
1 f
λ∝ T
T µ
f =
l = l1 + l2 + l3 + ... . k k k k = + + + ... . n n1 n2 n3 1 1 1 1 = + + + ... . n n1 n2 n3
13 (d) For a pipe closed at one end 340 v fn = n = n −2 4 l 4 85 10 × × = n [100 ] Here, n is an odd number, so for the given condition n can go upto n = 11 because for n =13 condition will not be valid. Because, the given frequencies should lie below 1250 Hz. n =1, 3,5, 7, 9, 11
v 2l
⇒ 5100 =
340 2×l
340 5100 × 2 2 1 l= = m ⇒ 30 × 2 30 100 10 l= = cm 30 3 (b) For fundamental mode (closed v …(i) organ pipe), n1 = 4l and for open organ pipe, v …(ii) n2 = 2l According to the question, n2 − n1 = 2 (beats) v v 2v − v − =2 ⇒ =2 2l 4 l 4l …(iii) ⇒ v = 8l When length of open organ pipe is halved and that of closed organ pipe is doubled, then let the two produce n beats, v v ⇒ − =n l 8l 8v − v 7v ⇒ =n ⇒ =n 8l 8l 7(8l ) n= =7 ⇒ 8l l=
...(i)
(2n + 1) v ...(ii) = 260 Hz 4l On subtracting Eq. (i) from Eq. (ii), we get {(2n + 1) − (2n − 1)} v = 260 − 220 4l v 2 = 40 4 l
λ=
14 (b) For an open pipe, the frequency,
11 (b) The smallest length of the air
Next harmonic occurs at
T As we know, ν = µ
So, number of possible natural oscillations could be 6.
15
16 (d) According to the mode of vibration of air column in an open organ pipe, First mode of vibration, v …(i) ν1 = 2l where, ν 1 = frequency of vibration, v = speed of sound and l = length of organ pipe The frequency of n th mode of vibration, v …(ii) νn = n × ν1 = n × 2l [From Eq. (i)] Given, ν n = 1.1 kHz = 1100 Hz v = 330 ms−1 l = 30 cm = 0.30 m Putting these values in Eq. (ii), we get 330 1100 = n × 2 × 0.30
392
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
1100 × 2 × 0.30 330 660 n= =2 ⇒ 330 So, second harmonic mode of pipe resonates. ⇒
y = A sin (kx + ωt ), we get k = 1.5 and ω = 60 ∴ Velocity of wave, ω 60 v= = = 40 m/s k 1.5 T v= ⇒ m
n=
17 (a) We know that, linear mass density is defined as a measure of mass per unit of length. ∴ Linear mass density, Mass 10 × 10−3 µ= = 1 Length = 10 × 10
−3
∴ The speed of transverse wave, 100 T = = 10 × 103 µ 10 × 10−3
v=
= 1 × 102 = 100 ms−1 where, µ = volume per unit × density.
18 (d) Statement (d) is not true, because at the open ends change in pressure will be zero because velocity is proportional to λ.
19 (b) Stationary wave is represented as shown in figure. It is quite clear from figure that at nodes the amplitude is zero and velocity of particle is also zero and at anti-nodes the amplitude is maximum, so that the velocity of particle is also maximum and all particles cross mean position between two successive nodes. A
A
N
N
21
1 2l
Fundamental frequency of open pipe, v n2 = 2l1 v ⇒ l2 = 2n2 When both pipes are joined, then length of closed pipe l = l1 + l2 v v v = + 4 n 4 n1 2n2
(2n − 1) (d) Here, ν 1 = v 4 l1 n ν2 = v 2l2 Given, ...(i) ν 1 = v2 and for first overtone, n = 2 Putting the value in Eq. (i), we get 2× 2−1 2 v= v 4 l1 2l2 3v 2v = 4 l1 2l2 l 3 So, the ratio of lengths 1 = l2 4
1 1 1 = + 2n 2n1 n2
⇒
n1n2 1 n2+ 2n1 = ⇒ n= n2 + 2n1 2n 2n1n2
27(c)
A
l=
v . As 2l temperature increases, both v and l increase but v increase more rapidly than l. Hence, the fundamental frequency increases as the temperature increases.
open organ pipe is n =
T ρA 1 v∝ A 1 v∝ R
T m
…(i)
⇒
n 1 T′ = 2 2l m
…(ii)
⇒
Fundament al mode (open)
Fundamental mode (closed) A λ1 4
N
l=
A
ν1 =
v v = λ 1 4l
ν1 =
v v = λ 1 2l
28 (c) Let l be the length of pipe, v is the speed of sound, then the fundamental note or first harmonic of closed tube, v n1 = 4l A
[Q A = πR 2]
Because the velocity of wave depends on the radius. So, transverse wave travels faster in thinner wire.
l
λ/4
A
N
λ/2
25 (a) In the fundamental mode, Frequency,
n=
v λ
⇒ n=
⇒
l n= t × 4l
⇒
n=
⇒
n = 25
v 4l l Qv = t
1 [for l = 1m] 0.01 × 4
λ1 2
N
v=
From Eqs. (i) and (ii), we get T′ 1 = ⇒ T 4 1 T′ 1− =1− ⇒ 4 T T − T′ 3 ∴ = 4 T (b) Equation of wave, y = 0.2 sin (1.5x + 60t ) Comparing with standard equation,
⇒
23 (a) The fundamental frequency of an
24 (b) The velocity of a transverse wave,
N
v 4 l1 v l1 = 4 n1
n1 =
⇒
= (40)2 × 3 × 10−4 = 0.48 N
20 (d) From the relation, n=
pipe,
where, m is linear density and T is tension in the string. So, T = v 2m
22
kg/m
26 (a) Fundamental frequency of closed
N Closed tube
A Open tube
v 2l ⇒ n2 = 2n1 Given, n1 = 512 Hz n2 = 2n1 = 2 × 512 = 1024 Hz For open tube, n2 =
393
WAVES
29 (a) When air is blown at the open end of a closed pipe, a longitudinal wave travels in the air of the pipe from open end to closed end. A
λ/4
l
N
When λ is the wavelength and l be the length of pipe and n is the frequency of note emitted and v is the velocity of sound in air, then v n = (fundamental note) λ Given,
n = 166 Hz,
∴
λ=
But,
λ = 4l λ 2 l = = = 0.5 m 4 4
⇒
32 (c) Fundamental frequency of closed pipe v = 220 Hz 4l v = 220 × 4 l
n=
…(i) ⇒ 1 If th of the pipe is filled with 4 water, then remaining length of air 3l column is . 4 Now, fundamental frequency v v = = 3l 3l 4 4 First overtone = 3 × fundamental frequency =3×
v = 332 m/s
332 = 2m 166
600 2 1 T = × × f2 1 2 T /9 600 =3 f2 600 f2 = = 200 Hz 3
37 (b) In a closed organ pipe in which length of air-column can be increased or decreased. The first resonance occurs at λ / 4 and second resonance occurs at 3λ / 4. l1 = λ /4 N
l2 = 3λ/4
[from Eq(i)]
33 (c) For open pipe, f1 =
In this wave pattern, amplitude varies from point to point, but each element of the string (medium) oscillates with the some angular frequency or time period.
35 (d) Fundamental frequency,
31 (a) Given, l = 25 cm, d = 2 cm
then
ν=
1 2l
nλ 2
λ=
2l n
T 1 T = m 2l ρr2
m Qρ = 2 r
1 lr ν lr ∴ 1 = 22 ν 2 l1r1 2L × r = =1 L × 2r ⇒ ν∝
and v = 330 ms −1
nv 2L
v 2L
330 = 660 Hz. = 2 × 25 × 10−2 Similarly for n = 2,3,4, etc. f2, f3 and f4 will be 1320 Hz, 1980Hz and 2640Hz. Hence correct option is (a).
Thus, at first resonance λ = 13 4 and at second resonance 3λ = 41 4
∴
= 625 Hz
38 (a) The fundamental frequency,
1 T 2lr πρ
f1 l2 r2 T = × × 1 f2 l1 r1 T2
…(i)
…(ii)
Subtracting Eq. (i) from Eq. (ii), we have 3λ λ − = 41 − 13 4 4 λ = 28 ⇒ 2 ⇒ λ = 56 cm Hence, frequency of tuning fork 350 v n= = λ 56 × 10−2
f =
1 T 2L µ
f =
1 2L
36 (a) Frequency of wire, f =
A
v 2l
34 (c) If number of loops in string is n, l=
A
N
and for closed pipe, v v f2 = = = 2 f1 l l 4× 4 f1 1 ⇒ = f2 2
∴
A
v 3 × 220 × 4 l = 3l 3l
displacement between two corresponding peaks of a waveform. In stationary wave, at any instant the phase of all particles between two successive nodes is the same, but phase of particles on one side of node is opposite to the phase of particles on the other side of node, i.e. phase difference between any two particles can be either 0 or π.
For n = 1, f1 =
⇒
= 880 Hz
30 (d) Phase is expressed as relative
We know that, for open pipe, f =
⇒
1 T LD πρ 1 f ∝ LD =
⇒
T D2 ρπ 4
394
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
39 (b) When two identical transverse or longitudinal, progressive waves travel in a bounded medium with the same speed and same amplitude, but in opposite directions with no phase difference, then by their superposition a new type of wave is produced which appears stationary in the medium. Thus, it is called stationary or standing wave.
40 (d) In 4 m length, 5 complete waves fit, so, in 1 m length 1.25 complete wave fits. 1 ∴ = 1.25 λ 2π Now, k = = 2π × 1.25 = 7.85 λ ω Now, k= v ⇒ ω = kv = 7.85 × 128 ⇒ ω = 1004.8 rad/s ~ 1005rad / s − Amplitude = 0.02 m ∴ Equation of wave in + x-direction, y = (0.02) sin (7.85x − 1005t )
41 (b) In the first position of resonance, let length of air column is l, λ l1 = 4 ⇒ λ = 4 l1 ⇒ λ = 4 × (0.4) ⇒ λ = 1.6 m Velocity of sound in air, v = fλ = 450 × 1.6 = 720 ms−1
42 (a) In closed organ pipe, open end of the pipe behaves as an anti-node and a node is formed at the closed end in first overtone mode or third harmonics for n = 2 A λ/4 N λ/2
l=1.2 m
A N
⇒ ⇒
3λ 4 λ l 1.2 = 0.4 m = = 4 3 3 l=
Pressure variation will be maximum displacement nodes, i.e. at 0.4 m from the open end.
43 (a) End correction (e) can be calculated by relation (l − 3l1 ) e= 2 2 where, l1 and l2 are depth at first and second resonance. 70.2 − 3 × 22.7 ⇒ e= 2 = 1.05 cm
44 (c)Q n1 : n2 : n3 = 1 : 3 : 5, which is possible when pipe is closed at one end and open at other end.
45 (a) First resonance occurs at 50 cm, so l1 = λ / 4 ⇒ λ = 4 l1 = 4 × 50 = 200 cm Now, length of closed organ pipe at second resonance, 3λ l2 = 4 3 × 200 l2 = = 150 cm ⇒ 4
46 (e) Frequency in fundamental mode, n=
1 2L
T µ
where, T = Mg = tension in string. If length (L) becomes double, then mass (M ) will be 4 times to maintain fundamental mode. Then, the new load = 4× 4 = 16 kg
47 (c) Less damping will result in sharper resonance.
48 (a) y = 2a cos kx sin ωt Comparing with equation y = A sin ωt , we get Amplitude of standing wave, A = 2a cos kx Intensity at a certain point will be maximum when amplitude is maximum. ⇒
cos kx is maximum.
49 (a) Given, f = 256 Hz vsound = 336 ms−1 v 336 λ= = = 1.3125 m f 256 = 131.25 cm The distance between a node (N ) and λ 131.25 adjoining anti-node = = 4 4
= 32.8 cm. Hence, the shortest distance from the wall at which the air particles will have maximum amplitude of vibration is 32.8 cm.
50 (c) Two superimposing waves are as incident wave, y1 = a sin (ωt − kx ) and reflected wave, y2 = a sin (ωt + kx ) Then, by principle of superposition, y = y1 + y2 = a[sin (ωt − kx ) + sin (ωt + kx )] ⇒ y = 2a cos kx sinωt Therefore, option (c) does not represent a stationary wave.
51 (a) Fundamental frequency, open tube, n =
v = 390 Hz. 2l
1 When th of the tube is immersed 4 in water, then it will be open at one 3l end with its new length, i.e. l ′ = . 4 ∴ New fundamental frequency will be v v = n′ = 4 l′ 3l 4 4 ⇒
⇒
v 2 v = 3l 3 2l 2 = × 390 3 n′ = 260 Hz
n′ =
52 (c) For an open organ tube, v . When 2l tube is half immersed in water, the organ tube becomes closed and length of vibrating air column becomes half, i.e. l /2. fundamental frequency f =
∴ New fundamental frequency, v v f′= = = f l 2l 4 2 λ = l1 + e 4 3λ and = l2 + e 4 l2 + e ⇒ =3 l1 + e
53 (d)
⇒
l2 + e = 3l1 + 3e l2 = 3l1 + 2e = 3 × 15 + 2 × 1.0 = 47 cm
395
WAVES
54 (d) According to the question,
57 (a) The wire will vibrate with the same frequency as that of source. This can be considered as an example of forced vibration.
λ l= 1 4
−3
Given, m = 9.8 × 10 kgm
−1
and T = 10 ×103 × 9.8 × 10−3 N = 98 N Frequency of wire,
Fundamental overtone
1 T 2L m
n=
l=
3λ2 4
l=
5λ3 4
= 50 Hz n=
58 (b) First overtone
l=
Second overtone
λ1 4
3λ 2 4 5λ 3 l= 4 l=
∴
λ 1 = 4l
⇒
⇒
λ2 =
4l 3 4l λ3 = 5
⇒
4l 4l : 3 5 1 1 = 1: : 3 5
λ 1 : λ 2 : λ 3 = 4l :
55 (c) First harmonic of closed organ pipe of length l1, v f = , v being velocity of sound. 4 l1 Third harmonic of open organ pipe of 3v length l2, f ′ = . 2l2 Therefore, in resonance condition f = f′ v 3v or = 4 l1 2l2 or
l1 1 = l2 6
56 (e) Speed of transverse pulse, v=
T µ
where, µ is mass of string per unit length. For a transverse pulse, T = µxg ∴
µxg v= µ
⇒
v∝ x
1 2l
T m
⇒ 490 − 420 =
⇒
⇒
98 9.8 ×10−3
1 2 ×1
=
1 2l
⇒ ⇒ ∴
ν=
⇒
ν∝
59 (a) We know that, v ∝ T
T l T ∝v⋅ l
⇒
Given, ν 1 = 200 Hz, ν 2 = 300 Hz, l1 = l and l2 = 2l
3.6 × 102 0.004
1 × 300 2l 300 l= = 2.14 m 2 × 70
T2 ν 2 = T1 ν 1
6 x = 1 + 5 100 36 x =1 + ⇒ 25 100 or x = 44% Thus, tension has to be increased by 44%. ⇒
60 (c) The frequency of the sonometer,
⇒
n=
1 T 2l m
n=
1 Mg 2l πr2d (Q T = Mg , m = πr2d )
⇒
n1 =
1 M 1g 2l1 πr2d
and
n2 =
2 M 2g 2l2 πr2d
From the question, n1 = n2 l2 M2 =2 l1 M1
2
l2 l 1
2
=
2
2
9 300 2l = 200 l 1
62 (a) The given standing wave is shown in the figure, where N represents node and A represents anti-node. N
N
A
Let tension has to be increased by x%, then v + 20% of v T + x % of T = v T
1 T 2l m
61 (a)
⇒
70 =
100 3 1 =2 =2 12 l1 4 1 =2× 2 l1 = 100 cm
A
N
1.21A
As length of one loop or segment is λ / 2, so length of 2 segments is 2 (λ / 2). ∴
2
⇒
λ = 1.21 Å 2 λ = 1.21 Å
63 (e) The equation of given wave is
y = a cos (kx − ωt ) The other possible wave having opposite directions is y′ = − a cos (kx + ωt ) Therefore, equation of stationary wave is ys = y + y′ = a cos (kx − ωt ) − a cos(kx + ωt ) = 2a sin kx ⋅ sinωt At x = 0, ys = 2 a sin 0 ⋅ sinωt = 0 Therefore, a node is formed at x = 0. Hence, the other possible wave equation is y = − a cos (kx + ωt )
64 (a) Fundamental frequency, n= i.e.
1 T 2l m
n∝ T
396
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
When tube is placed inside water with half length immersed in water, then
n1 T = 1 n2 T2
∴
Given, n1 = 450 Hz, n2 = 900 Hz, T1 = 9 kg-wt, T2 = ?
l 2
450 9 = 900 T2
⇒ ⇒
N
l
T2 = 36 kg-wt
v 340 = =1m n 340 If length of resonance columns are l1 , l2 and l3 , then λ=
l=
100 λ 1 l1 = = m = cm = 25 cm 4 4 4 (for first resonance)
l3 =
3 × 100 λ 3 = m= cm = 75 cm 4 4 4 (for second resonance)
5λ 5 5 × 100 = m= cm = 125 cm 4 4 4 (for third resonance)
This case of third resonance is impossible because total length of the tube is 120 cm. So, minimum height of water = 120 − 75 = 45 cm
66 (b) Given, l1 + l2 + l3 = 110 cm and
l λ′ = 2 4
l λ = 2 4
⇒ λ′ = 2l
v v = λ ′ 2l From Eqs. (i) and (ii), we get Frequency, f ′ =
n1 1 l3 l = = ⇒ l3 = 1 n3 3 l1 3
∴ l1 +
l1 l1 + = 110 2 3
So,
l1 = 60 cm, l2 = 30 cm
and
l3 = 20 cm
68 (d) If we adjust the length of air-column in closed organ pipe as such its any natural frequency equals to the frequency of tuning fork, then the amplitude of forced vibrations of air-column increases very much. This is the state of resonance. At first resonance, λ l= ⇒ λ = 4l 4
l = λ/4
A
As l is same, wider pipe A will resonate at a lower frequency, i.e. nA < nB . of closed organ pipe is λ l1 = 1 4 or λ 1 = 4 l1 The length of open organ pipe is λ l2 = 2 or λ 2 = 2l2 2 Here, n1 = n2 (according to the question) v v = λ1 λ2 v v = ⇒ 4 l1 2l2 ∴
l1 : l2 = 1 : 2
1 T 2l πr2d where, l is the length, T is tension, r is the radius and d is the density. n1 1 l1 1 Given, = , = n2 2 l2 4
71 (d) Frequency, n =
⇒
n1 l2 r22 = n2 l1 r12 2
N
n l r2 ⇒ 1 1 = 22 n2l2 r1 ⇒
So, frequency of tuning fork, v v f = = λ 4l Given, l = 20 cm = 0.2 m and
67 (a) For fundamental frequency of vibration of air column, λ l= ⇒ λ = 2l 2 v λ v f = 2l
…(ii)
f′= f
n1 : n2 : n3 : : 1 : 2 : 3 n1 1 l2 l ∴ = = ⇒ l2 = 1 n2 2 l1 2
v = 332 ms−1
Hence, frequency, 332 f = = 415 Hz 4 × 0.2
69 (c) In closed organ pipe, first
Frequency, f = ⇒
λ 2
n1l1 = n2l2 = n3l3
and
Frequency of vibration, v v n= = λ 4(l + 0.3 d )
70 (a) Avoiding end correction, the length
65 (a) Using relation v = nλ,
l2 = 3
where, 0.3d is necessary end correction.
…(i)
resonance occurs at λ / 4, so in fundamental mode of vibration of organ pipe λ = (l + 0.3 d ) 4
r1 n2l2 = = 2 × 4 = 8:1 r2 n1l1
72 (b) As, n ∝ T ∴ T ∝ n2 and T ′ ∝ (4 n)2 Tension in the string, T ′ = 16T .
73 (d) The frequency of a string, 1 T where, µ is mass per 2l µ unit length of strings and T is tension in the string. f ∝ T ∴ f =
⇒ ⇒
T ∝ f2 2 T2 f2 = T1 f1
397
WAVES
Given,
f1 = f , f2 = 3 f and T1 = T
∴
T2 3 f = T f
⇒
T2 = 9T
2
74 (b) Fundamental frequency of string = HCF of the successive harmonics of frequencies 70 Hz and 84 Hz ∴ n = 14 Hz v = 14 ⇒ 2l Speed, v = 2 × 1.5 × 14 = 42 ms−1
= 6 × fundamental frequency. v 6 × 333 =6× = 2L 2 × 33.3 × 10−2 = 3000 Hz
77 (c) For an open organ pipe of length l, the frequency n is given by v n = n′ 2l A
λ/2
l N
75 (c) The frequency of sonometer wire, 1 T 2l m Taking logarithm and differentiating the above relation, we get n=
∆n ∆l 1 ∆T 1 ∆m = + + n l 2 T 2 m ∆n ∆l = + 0 + 0 = 1% ∴ n l Hence, frequency will decrease by 1%.
76 (a) The frequency of vibration in open organ pipe for first mode is given by v v ν1 = = λ 1 2L v or ν1 = 2L This is the lowest frequency of vibration and is called the fundamental frequency. The note or sound of this frequency is called fundamental note or first harmonic. Similarly for n = 2, 2v = 2 ν1 ν2 = 2L
where, v is velocity of sound and n′ is the overtone. frequency Given, n = 480 Hz and l = 1 m, v = 330 ms−1
n(2l ) 480 × 2 × 1 = v 330 = 2.9 ≈ 3 Hence, this is the second overtone or third harmonic. n′ =
3v = 3ν 1 2L
In general, the frequency of vibration in nth normal mode of vibration in open organ pipe would be ν n = nν 1 Hence, frequency of fifth overtone
79 (a) In an open organ pipe, both ends of the pipe are open. There are pressure nodes (or displacement anti-nodes) at both ends. In open organ pipe at both ends, the natural frequencies of oscillation form a harmonic series that includes all integral multiples of the fundamental frequency, i.e. all even and odd harmonics are present. Therefore, if fundamental frequency is n, then other frequencies are n, 2n, 3n, 4 n, … . 1 T 2l m 3 Given, n′ = n + 2 T 101T and = T′ = T + 100 100 1 T′ n′ = 2l m n=
∴
n+
78 (d) Frequency of sonometer wire is given by 1 T n= 2l m where, m is mass of string per unit length and T is tension in the string. Also, m = πr2d where, r being radius of string and d is the density of material of string. So,
n=
For n = 3, ν3 =
⇒
⇒ ⇒ Given,
n = 2×2 n2 n n2 = 2 2
80 (a) The frequency of vibration,
A
and
Hence,
1 T 2l πr2d
T n∝ r r n1 T = 1 × 2 n2 T2 r1 T2 =
T1 , r2 = 2r and n1 = n 2
⇒ n+
3 1 = 2 2l
…(i)
101T 100m
3 1 = 1005 × . 2 2l
T m
…(ii)
From Eqs. (i) and (ii), we get 3 n + = 1.005 × n 2 ∴ n = 300 Hz
81 (b) For sonometer, 1 l n1 l2 = n2 l1 n∝
∴
Given, n1 = 256 Hz, l1 = 25 cm and l2 = 16 cm 256 16 = ⇒ n2 25 n2 =
256 × 25 = 400 Hz 16
Topic 6 Doppler’s Effect 2019 1 Two sources of sound S 1 and S 2 are moving towards and away from a stationary observer with the same speed respectively. Observer detects 3 beats per second. Find the value of speed of sources (approximately) (take, f1 = f 2 = 500 Hz and speed of sound in air = 330 ms −1 ). [AIIMS] A
Observer
B
3 beats/s −1
(a) 1 ms (c) 3 ms −1
−1
(b) 2 ms (d) 4 ms −1
2017 2 The driver of a car travelling with speed 30 ms
−1
towards a hill sounds a horn of frequency 600 Hz. If the velocity of sound in air is 330 ms − 1 , the frequency of reflected sound as heard by driver is [AIIMS] (a) 550 Hz (b) 555.5Hz (c) 720 Hz (d) 500 Hz
3 Two cars moving in opposite directions approach each other with speed of 22 ms −1 and 16.5 ms −1 respectively. The driver of the first car blows a horn having a frequency 400 Hz. The frequency heard by the driver of the second car is (take, velocity of sound = 340 ms −1 ) (a) 350 Hz (b) 361 Hz [NEET] (c) 411 Hz (d) 448 Hz
2016 4 A siren emitting a sound of frequency 800 Hz moves away from an observer towards a cliff at a speed of 15 ms −1 . Then, the frequency of sound that the observer hears in the echo reflected from the cliff is (take, velocity of sound in air = 330 ms −1 ) [NEET] (a) 800 Hz (c) 885 Hz
(b) 838 Hz (d) 765 Hz
2014 5 A speeding motorcyclist sees traffic jam ahead of him. He
slows down to 36 kmh −1 . He finds that traffic has eased and a car moving ahead of him at 18 kmh −1 is honking at a frequency of 1392 Hz. If the speed of sound is 343 ms −1 , then the frequency of the honk as heard by him will be (a) 1332 Hz (b) 1372 Hz [CBSE AIPMT] (c) 1412 Hz (d) 1454 Hz
6 A car is moving with a speed of 72 kmh −1 towards a roadside source that emits sound at a frequency of 850 Hz. The car driver listens to the sound while approaching the source and again while moving away from the source after crossing it. If the velocity of sound is 340 ms −1 , then the difference of the two frequencies, the driver hears, is (a) 50 Hz (b) 85 Hz [WB JEE] (c) 100 Hz (d) 150 Hz 7 A train is approaching towards a platform with a speed of 10 ms −1 , while blowing a whistle of frequency 340 Hz. What is the frequency of whistle heard by a stationary observer on the platform? (Take, speed of sound = 340 ms −1 ) [KCET] (a) 330 Hz (b) 350 Hz (c) 340 Hz (d) 360 Hz 8 The driver of a car travelling with speed of 30 ms −1 towards a hill, sounds a horn of frequency 600 Hz. If the velocity of sound in air is 330 ms −1 , then the frequency of the reflected sound as heard by driver is [UK PMT] (a) 500 Hz (b) 550 Hz (c) 555.5 Hz (d) 720 Hz
2013 9 A train approaches stationary observer, the velocity of train being (1/ 20) th of the velocity of sound. A sharp blast is blown with the whistle of the engine at equal intervals of a second. The interval between the successive blasts as heard by the observer [UP CPMT, KCET] 1 1 (a) (b) min s 20 2 19 19 (c) (d) s min 20 20
10 A train is moving at 30 ms −1 in still air. The frequency of the locomotive whistle is 500 Hz and the speed of sound is 345 ms −1 . The apparent wavelength of sound in front of and behind the locomotive are respectively [Manipal] (a) 0.80 m, 0.63 m (b) 0.63 m, 0.80 m (c) 0.50 m, 0.85 m (d) 0.63 m, 0.75 m 11 The law applicable for determining the apparent change in frequency when a source and an observer are in motion is (a) Doppler’s law (b) Huygens’ law [WB JEE] (c) Newton’s law (d) Galileo’s law
399
WAVES
2012 12 A train is moving at a speed of 200 ms –1 towards a stationary object, emits a sound of frequency 1000 Hz. Some of the sound reaching the object gets reflected back to the train as echo. The frequency of the echo as detected by the driver of the train is (take, speed of sound in air is 300 ms −1 ) (a) 3500 Hz (b) 4000 Hz [CBSE AIPMT] (c) 5000 Hz (d) 3000 Hz
13 A train approaching a railway platform with a speed of 20 ms −1 starts blowing the whistle. Speed of sound in air is 340 ms −1 . If the frequency of the emitted sound from the whistle is 640 Hz, the frequency of sound to a person standing on the platform will appear to be [WB JEE] (a) 600 Hz (b) 640 Hz (c) 680 Hz (d) 720 Hz
2011 14 A source of sound S is moving with a velocity of 50 ms −1 towards a stationary observer. The observer measures the frequency of the source as 1000 Hz. What will be the apparent frequency of the source when it is moving away from the observer after crossing him? (the velocity of the sound in the medium is 350 ms −1 ). [AIIMS] (a) 750 Hz (b) 857 Hz (c) 1143 Hz (d) 1333 Hz
15 A band playing music at a frequency f is moving towards a wall at a speed v b . A motorist is following the band with a speed v m . If v be the speed of the sound, the expression for beat frequency heard by motorist is [AFMC, BHU] v + vm v + vm (a) (b) f f v + vb v − vb 2v ( v + v m ) 2v ( v + v b ) (d) m2 (c) b 2 f f 2 v − vb v − v m2 16 A source of sound is travelling at (100/ 3) ms −1 along a road, towards a point A. When the source is 3 m away from A, a person standing at a point O on a road perpendicular of frequency ν′. The distance of O from A at that time is 4 m. If the original frequency is 640 Hz, then the value of ν′ is (take, velocity of sound = 340 ms −1 ) [BHU] 3m
100 ms–1 3 S θ
4m
A
O
(a) 620 Hz
(b) 680 Hz
(c) 720 Hz
(d) 840 Hz
17 A source of sound moves towards an observer with a velocity 108 kmh −1 and the observer also moves towards the source with the velocity 5 kmh −1 , then the velocity of sound is [UP CPMT] (a) 320 ms −1 (b) 330 ms −1 (c) 340 ms −1 (d) Data insufficient 18 Two sources are at a finite distance apart. They emit sound of wavelength λ. An observer situated between them on line joining the sources, approaches towards one source with speed u, then number of beats heard per second by observer will be [UP CPMT] 2u u u λ (b) (a) (c) (d) λ λ 2λ u 19 A train is moving with a constant speed along a circular track. The engine of the train emits a sound of frequency f. The frequency heard by the guard at rear end of the train is (a) less than f [UP CPMT] (b) equal to f (c) greater than f (d) may be greater than, less than or equal to f depending on the factors like speed of train, length of train and radius of circular track 20 Due to Doppler’s effect, the shift in wavelength observed is 0.1 Å, for a star producing wavelength 6000 Å. The velocity of recession of star will be [BCECE] (a) 2.5 kms −1 (b) 10 kms −1 (c) 5 kms −1 (d) 20 kms −1 21 A source of sound of sound is approaching an observer with speed of 30 ms −1 and the observer is approaching the source with a speed of 60 ms −1 . Then, the fractional change in the frequency of sound is (take, speed of sound in air = 330 ms −1 ) [Manipal] 1 3 (a) (b) 3 10 2 2 (d) (c) 5 3 22 Two tuning forks A and B having a frequency of 500 Hz each are placed with B to the right of A. An observer is between the forks and is moving towards B with a speed of 25 ms −1 . The speed of sound is 345 ms −1 and the wind speed is 5 ms −1 from A to B. Calculate the difference in the two frequencies heard by the observer. (a) 72.5 Hz (b) 55.6 Hz [Manipal] (c) 76.2 Hz (d) 80.9 Hz 23 Two cars are moving on two perpendicular roads towards a crossing with uniform speeds of 72 kmh −1 and 36 kmh −1 . If first car blows horn of frequency 280 Hz, then the frequency of horn heard by the driver of second car when line joining the car makes angle of 45º with the roads, will be [Manipal] (a) 321 Hz (b) 298 Hz (c) 289 Hz (d) 280 Hz
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
24 An observer moves towards a stationary sources of sound, with a velocity one-fifth of the velocity of sound. What is the percentage increase in the apparent frequency? [OJEE] (a) 5% (b) 20% (c) Zero (d) 0.5% 25 Two cars A and B approach a stationary observer from opposite sides as shown in figure. Observer hears no beats. If the frequency of the horn of the car B is 504 Hz, the frequency of horn of car A will be [VMMC] 15 ms–1
A
(a) 529.2 Hz (c) 440.5 Hz (e) None of these
30 ms–1
B
(b) 295.2 Hz (d) 259.2 Hz
26 A sounding source of frequency 500 Hz moves towards a stationary observer with a velocity 30 ms −1 . If the velocity of sound in air is 330 ms −1 , then find the frequency heard by the observer. [VMMC] (a) 500 Hz (b) 550 Hz (c) 355 Hz (d) 55.5 Hz (e) None of these 27 A source of sound producing wavelength of 50 cm is moving away from stationary observer with (1/5)th speed of sound. Then, what is the wavelength of sound heard by observer? [EAMCET] (a) 70 cm (b) 55 cm (c) 40 cm (d) 60 cm 28 Two trains are moving towards each other with speeds of 20 ms −1 and 15 ms −1 relative to the ground. The first train sounds a whistle of frequency 600 Hz, the frequency of the whistle heard by a passenger in the second train before the train meet, is (take, the speed of sound in air is 340 ms −1 ) (a) 600 Hz (b) 585 Hz [JCECE] (c) 645 Hz (d) 666 Hz 29 A bat flies at a steady speed of 4 ms −1 emitting a sound of f = 90 × 103 Hz. It is flying horizontally towards a vertical wall. The frequency of the reflected sound as detected by the bat will be (take, velocity of sound in air is 330 ms −1 ) [KCET] (b) 87.1× 103 Hz (a) 88.1× 103 Hz 3 (d) 89.1× 103 Hz (c) 92.1× 10 Hz 30 A vehicle with a horn of frequency n is moving with a velocity of 30 ms −1 in a direction perpendicular to the straight line joining the observer and the vehicle. The observer receives the sound to have a frequency n + n1 , then (take, sound velocity in air is 300 ms −1 ) [KCET] (a) n1 = 10 n (b) n1 = 0 (c) n1 = 0.1n (d) n1 = −0.1n
31 A stationary police car sounds a siren with a frequency of 990 Hz. If the speed of sound is 330 ms −1 , an observer, driving towards the car with a speed of 33 ms −1 , will hear a frequency of [MGIMS] (a) 891 Hz (b) 900 Hz (c) 1089 Hz (d) 1100 Hz
2008 32 When both the listener and source are moving towards each other, then which of the following is true regarding frequency and wavelength of wave observed by the observer? [BCECE] (a) More frequency, less wavelength (b) More frequency, more wavelength (c) Less frequency, less wavelength (d) More frequency, constant wavelength
33 A body is moving forward and backward and change in frequency observed by the body of a source is 2%. What is velocity of the body? (take, speed of sound is 300 ms −1 . ) (a) 6 ms −1 (b) 2 ms −1 [DUMET] −1 (c) 2.5 ms (d) 3 ms −1 34 With what velocity should an observer approach a stationary sound source, so that the apparent frequency of sound should appear double the actual frequency? [KCET] v (a) (b) 3v 2 (c) 2v (d) v
2007 35 An observer moves towards a stationary source of sound with a speed (1/5)th of the speed of sound. The wavelength and frequency of the source emitted are λ and f, respectively. The apparent frequency and wavelength recorded by the observer are respectively [BHU] (a) f , 1.2 λ (b) 0.8 f , 0.8 λ (c) 1.2 f , 1.2 λ (d) 1.2 f , λ
36 A car is moving towards a high cliff. The car driver sounds a horn of frequency f. The reflected sound heard by the driver has a frequency 2 f. If v be the velocity of sound, then the velocity of the car in the same velocity units, will be [Manipal] v v (b) (a) 3 2 v v (c) (d) 4 2 37 A car sounding a horn of frequency 1000 Hz passes an observer. The ratio of frequencies of the horn noted by the observer before and after passing of the car is 11 : 9. If the speed of sound is v, the speed of the car is [RPMT] 1 1 1 (a) (b) v (c) v (d) v v 10 2 5
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WAVES
38 The difference between the apparent frequency of a source of sound as perceived by the observer during its approach and recession is 2% of the frequency of the source. If the speed of sound in air is 300 ms −1 , then the velocity of the source is [Punjab PMET] (b) 12 ms −1 (a) 1.5 ms −1 (d) 3 ms −1 (c) 6 ms −1 39 An engine moving towards a wall with a velocity 50ms −1 emits a note of 1.2 kHz. Speed of sound in air is 350 ms −1 . The frequency of the note after reflection from the wall as heard by the driver of the engine is [KCET] (a) 2.4 kHz (b) 0.24 kHz (c) 1.6 kHz (d) 1.2 kHz
43 If a source approaches and recedes from observer with same velocity, then the ratio of frequencies (apparent) is 6 : 5, then velocity of source is (take, v s = 330 ms −1 ) (b) 10 ms −1 (a) 20 ms −1 [JCECE]
2005 44 A person is observing two trains one coming towards him
and other leaving with the same velocity 4 ms −1 . If their whistling frequencies are 240 Hz each, then the number of beats per second are heard by the person will be (if velocity of sound is 320 ms −1 ) [BHU] (a) 3
2006 40 A source is approaching a stationary observer with velocity (1/ 10) th that of sound. Ratio of observed and real frequencies will be [RPMT] 9 11 (b) (a) 10 10 10 10 (d) (c) 11 9
(d) 33 ms −1
(c) 30 ms −1
(b) 6
(c) 9
(d) zero
45 A vehicle with horn of frequency ν is moving with a velocity of 30 ms −1 in a direction perpendicular to the line joining the observer and the vehicle. The observer perceives the sound to have a frequency ( ν + ν1 ). If the sound velocity in air is 300 ms −1 , then [AMU] (a) ν1 = 0 (c) ν1 = − 01 . ν
(b) ν1 = 0.1ν (d) ν1 = 10 ν
41 A motorcar is approaching towards a crossing with a velocity of 72 kmh −1 . The frequency of sound of its horn as heard by a policeman standing on the crossing is 260 Hz. The frequency of horn is [J&K CET] (a) 200 Hz (b) 244 Hz (c) 150 Hz (d) 80 Hz
46 A source of sound and an observer are approaching each other with the same speed, which is equal to (1/10) times the speed of sound. The apparent relative change in the frequency of the source is [EAMCET] (a) 22. 2% increase (b) 22. 2% decrease (c) 18. 2% decrease (d) 18. 2% increase
42 An astronaut is approaching the Moon. He sends out a radio signal of frequency 5000 MHz and the frequency of echo is different from that of the original frequency by 100 kHz. His velocity of approach with respect to the Moon is [AMU] −1 −1 (a) 2 km s (b) 3 km s (c) 4 km s −1 (d) 5 km s −1
47 The apparent frequency of a note is 200 Hz, when a listener is moving with a velocity of 40 ms −1 towards a stationary source. When he moves away from the same source with the same speed, the apparent frequency of the same note is 160 Hz. The velocity of sound in air (in ms −1 ) is [KCET] (a) 340 (b) 330 (c) 360 (d) 320
Answers 1 11 21 31 41
(a) (a) (b) (c) (b)
2 12 22 32 42
(c) (c) (a) (a) (b)
3 13 23 33 43
(d) (c) (b) (d) (c)
4 14 24 34 44
(b) (a) (b) (d) (b)
5 15 25 35 45
(c) (a) (a) (d) (a)
6 16 26 36 46
(c) (b) (b) (b) (a)
7 17 27 37 47
(a) (d) (d) (a) (c)
8 18 28 38
(d) (a) (d) (d)
9 19 29 39
(c) (b) (c) (c)
10 20 30 40
(d) (c) (b) (d)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (a) Given, frequency of sound produced source S 1 and S 2 i.e, f1 = f2 = 500 Hz
Speed of sound in air, v = 330 ms −1
vs = speed of source = 22ms−1, vo = speed of observer = 16.5ms
and v = speed of sound = 340ms−1. vs = 22 ms–1 vo =16.5 ms–1
Beats = 3 Hz If vs be the speed of source, when first source is moving towards the observer and f1′ be apparent frequency heard by the observer, then v 330 f1′ = × 500 × f1 = v − vs 330 − vs
vs = 18 ×
−1
source
Frequency heard by the driver in the second car, v + vo 340 + 16.5 fa = f0 = 400 340 − 22 v − vs
4 (b) According to question, situation
∴ Beats = f1′ − f2′ = 3 330 330 ⇒ × 500 − × 500 = 3 330 − vs 330 + vs
15 ms–1 source
500 × 2vs × 330 =3 (330)2 − vs2
Since, vs2 ν Also, λ ′ < λ So, listener, listens more frequency and observe less wavelength.
33 (d) Here, body is acting as an observer. According to the given case, let u be the velocity of the body, then, v − u v + u ν1 = ν and ν 2 = ν v v 2u ∴ ∆ν = ν 2 − ν 1 = ν v ∆ν 2u So, × 100 = × 100 ν v 2u 2= × 100 ⇒ v Given, v = 300 ms −1 v ∴ u= = 3 ms−1 100 v − vo v − vs
34 (d) By using ν′ = ν
v − vo 2 ν = ν v−0 ⇒ vo = − v Negative sign indicates that observer is moving opposite to the direction of velocity of sound. ⇒
35 (d) When an observer moves towards an stationary source of sound, then apparent frequency heard by the observer increases. The apparent frequency heard in this situation, v + vo f′ = f v − vs As source is stationary, hence vs = 0. v + vo f′ = f v
v 5 Substituting in the relation for f ′ , we have v + v / 5 f′= f v 6 = f = 1.2 f 5 Motion of observer does not affect the wavelength reaching the observer, hence wavelength remains λ.
Given,
vo =
36 (b) When the sound is reflected from the cliff, it approaches the driver of the car. Therefore, the driver acts as an observer and both the source (car) and observer are moving. Hence, apparent frequency heard by the observer (driver) is given by v + vo …(i) f′= f v − vs where, vs = velocity of sound and vo = velocity of car Thus, Eq. (i) becomes v + vo 2f = f v − vo ⇒ 2v − 2vo = v + vo ⇒ 3vo = v v vo = ⇒ 3 v ⋅n v − vc
37 (a) nbefore =
⇒ ⇒
⇒ 100 vs = v 2 − vs2 But speed of sound in air, v = 300 ms−1 ∴
38 (d) When source approaches the observer, the apparent frequency heard by observer is v …(i) n′ = n v − vs where, vs = speed of source of sound. During it recession, apparent frequency v …(ii) n′′ = n v + vs 2 (given) Accordingly n′ − n′′ = n 100 v v 2 ∴ n n −n = v − vs v + vs 100
30000 vs = (300)2 − vs2
⇒ vs2 + 30000 vs − 90000 = 0 ∴ −30000 ± (30000)2 + 4 × 90000 vs = 2 −30000 ± 30006 = 2 6 = = 3 ms−1 (taking + ve sign only) 2
39 (c) The reflected sound appears to propagate in a direction opposite to that of moving engine. Thus, the source and the observer can be presumed to approach each other with same velocity. ν′ =
v + vs ν (v + vo ) = ν v − vs (v − vs ) (Q vo = vs )
Given, ν = 1.2 kHz, v = 350 ms −1 and vs = 50 ms −1 ∴
v and nafter = ⋅n v + vc v nbefore 11 v + vc = = ⇒ vc = nafter 9 v − vc 10
v + vs − v + vs 2 v = (v − vs ) (v + vs ) 100 2vs 2 = (v − vs ) (v + vs ) 100
350 + 50 ν′ = 1.2 350 − 50 1.2 × 400 300 = 1.6 kHz =
40 (d) From the relation, v − vobserver f ′ = fo sound v sound − vsource vo = 0, because observer is stationary v ⇒ Frequency, f ′ = fo v v − 10 1 = fo 9 10 ⇒
f ′ / fo = 10 / 9
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
41 (b) From Doppler’s effect, perceived frequency,
source is moving towards observer perceived frequency,
v − vo n′ = n v − vs Here, vs = 72 km h −1 = = 20 ms−1
72 × 1000 60 × 60
vo = 0, v = 332 ms−1 and n′ = 260 Hz ∴ ∴
44 (b) By Doppler’s effect of sound, when
332 260 = n 332 − 20 260 × 312 332 = 244 Hz
n=
42 (b) Let the shift in frequency, ∆n = 100 × 103 Hz n = 5000 MHz = 5000 × 106 Hz and v = relative speed. ∆n 2v Then, = n c 100 × 103 × 3 × 108 ∆n ⇒ v= c= 2n 2 × 5000 × 106 = 3000 ms−1 = 3 km s−1
43 (c) By Doppler’s effect, the perceived frequency when source approaches observer, v …(i) n′ = n v − vs When source recedes the observer, v …(ii) n′′ = n v + vs From Eqs. (i) and (ii), we get n′ v + vs = n′′ v − vs Given, v = 330 ms −1 6 330 + vs ⇒ = 5 330 − vs ⇒ 1980 − 6vs = 1650 + 5vs ⇒ 11vs = 1980 − 1650 = 330 330 vs = = 30 ms−1 11
v n′ = n v − vs where, v is the velocity of sound and vs is velocity of source. Given, n = 240 Hz, v = 320 ms −1 and vs = 4 ms −1 320 ∴ n′ = 240 × 320 − 4 320 = 240 × = 243 Hz 316 When source is moving away from observer, perceived frequency, v n′′ = n v + vs = 240 ×
320 320 + 4
= 237 Hz Number of beats per second (beat frequency) = n′ − n′′ = difference of the frequency of sound source ⇒ = 243 − 237 = 6
45 (a) Actual frequency of horn = ν Apparent frequency perceived by observer, ν = ν + ν 1 Velocity of vehicle, vs = 30 ms−1 Velocity of sound in air, v = 300 ms−1 Doppler’s effect of sound is valid only if source and observer are both in relative motion. As the source is moving in a direction perpendicular to the straight line which joins the observer, hence there is no relative motion between them. Therefore, Doppler’s effect will not occur, thus, ν 1 = 0.
46 (a) Speed of sound = v (say ) Speed of source = speed of observer v (given) = 10
Let natural frequency of sound = n Apparent frequency of sound, v − vo n′ = n v − vs Since, source is moving in the direction of sound and observer moving towards source, then v v and vs = vo = 10 10 v 11v v + 10 ∴ n′ = n = 10 9v 1 v − 10 10 11 n 9 11 2 ⇒ n′ − n = n − n = n 9 9 n′ − n 2 = ⇒ n 9 n′ − n 2 × 100% = × 100% ∴ n 9 200 = % 9 = 22.22% increase ⇒ n′ =
47 (c) When listener is moving towards the source, then apparent frequency v + vo n′ = ×n v Given, n′ = 200 Hz and v = 40 ms −1 v + 40 …(i) ⇒ 200 = ×n v where, v = velocity of sound in air n = actual frequency of sound source. Similarly, when listener is moving away v − v0 n′ = ×n v 160 =
v − 40 ×n v
From Eqs. (i) and (ii), we have 200 v + 40 = 160 v − 40 ⇒ 5v − 200 = 4 v + 160 ⇒ v = 360 ms−1
…(ii)
15 Electrostatics I Quick Review Electric Charges The intrinsic property of atoms and molecules or elementary particles which give rise to electric force between various objects are known as electric charges. Some important points related to charges are given below (i) Charge is a scalar quantity and can be of two types : positive and negative. When some electrons are removed from the atom, it acquires a positive charge and when some electrons are added to the atom, it acquires a negative charge. (ii) Like charges repel each other and unlike charges attract each other. (iii) The property which differentiates the two kinds of charges is called the polarity of charge. If an object possesses an electric charge, then it is said to be electrified or charged. 1 (iv) 1 coulomb = 3 × 109 esu = emu of charge, where 10 esu is electrostatic unit of charge. Its CGS unit is stat coulomb. (v) The dimensional formula of charge [ q] = [ AT].
Basic Properties of Electric Charges Additivity of Charge If a system consists of n charges q1 , q 2 , q 3 .......... q n , then the total charge of the system will be q1 + q 2 + q3 + q 4 +......+ q n . Quantisation of Charge Charge on any object can be an integral multiple of a smallest charge ( e ). Q = ± ne where, n = 1, 2, 3, … and e = 1.6 × 10−19 C.
Conservation of Charge Charge can neither be created nor be destroyed, but can be transferred from one object to another object.
Coulomb’s Law of Electrostatics Force of attraction or repulsion between two stationary point charges are formulated by Coulomb’ s law. According to Coulomb’s law, the force of attraction/repulsion between the charges q1 and q 2 is given by, F =k
q1 q 2 r
2
=
1 q1 q 2 ⋅ 4 πε 0 r 2
where, ε 0 = permittivity of free space and
1 = 9 × 109 N-m 2 /C 2 . 4πε 0
Coulomb’s Law in Vector Form In vector form, Coulomb’s law can be expressed as 1 q1 q 2 ∧ F12 = r 21 4πε 0 r 2 where, F12 = force on charge q1 due to q 2 ∧
and r 21 = unit vector points from charge q 2 to q1 . Similarly, F21 =
1 q1 q 2 ∧ r 12 4πε 0 r 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Forces Between Multiple Charges : Superposition Principle According to the principle of superposition, ‘‘Total force on a given charge due to number of charges is the vector sum of individual forces acting on that charge due to the presence of other charges’’. F1n
q2
q1
F13
q3
F12
qn
Consider a system of n point charges q1 , q 2 , q3 ..... q n distributed in space. Let the charges be q 2 , q3 ... q n , exert forces F12 , F13 ,..... F1n on charge q1 . The total force on charge q1 is given by F1 =
1 4πε 0
q q q q q q 1 2 r$12 + 1 2 r$13 +.....+ 1 2 r$1n 2 2 r2 r1n r1 3 12
Electric Field and Field Strength • The region surrounding a charge or distribution of
charges in which its electrical effects can be observed is called electric field. • The force experienced by a unit positive test charge placed at that point, without disturbing position of source charge is called electric strength. Electric field strength, E = F / q 0 where, q 0 = test charge and F = force on positive test charge. • Electric field at a distance r from a point charge q is
expressed as
E=
q 1 ⋅ 2 4 πε 0 r
• Electric field E at a point P due to the systems of charges
is given by
E (r ) = or
1 4 πε 0
n
q
∑ r 2i r$ i
i=1 i
E = E1 + E2 + ....... + En .
Electric Field Lines Imaginary lines drawn through a region of space so that its tangent at that point is the direction of electric field vectors, are called electric field lines.
Different properties of electric field lines are given below (i) Electric field lines start from positive charges and end at negative charges. In the case of a single charge, they may start or end at infinity. (ii) Tangent to any point on electric field lines shows the direction of electric field at that point. (iii) Two field lines can never intersect each other because if they intersect, then two tangents drawn at that point will represent two directions of field at that point, which is not possible. (iv) In a charge free region, electric field lines can be taken to be continuous curves without any breaks. (v) Electric field lines do not form closed loops (because of conservative nature of electric field). (vi) Electric field lines are perpendicular to the surface of a charged conductor. (vii) Electric field lines contract lengthwise to represent attraction between two unlike charges. (viii) Electric field lines exert sideways pressure to represent repulsion between two like charges.
Electric Field due to Continuous Charge Distributions Electric field due to different types of charge distributions is given by (i) Electric field due to line charge distribution is given by ∧ λ 1 EL = dL r ∫ 2 L 4πε 0 r where, λ = linear charge density, i.e. charge per unit length. (ii) Electric field due to surface charge distribution is given by ∧ σ 1 ES = dS r ∫ 2 S 4πε 0 r where, σ = surface charge density, i.e. charge per unit area. (iii) Electric field due to volume charge distribution is given by ρ ∧ 1 EV = dV r ∫ 2 V 4πε 0 r where, ρ = volume charge density, i.e. charge per unit volume. (iv) Electric field at distance x from the centre of uniformly charged ring of total charge q on its axis is given by 1 qx Ex = 2 2 3/ 2 πε 4 0 (x + R )
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ELECTROSTATICS I
Electric Dipole
W = pE (cos θ1 − cos θ 2 )
A pair of equal and opposite point charges, that are separated by a short distance is known as electric dipole.
where, θ1 and θ 2 are initial and final angles between axis of dipole and electric field.
The product of magnitude of one charge and the distance between the charges is called the magnitude of the electric dipole moment p.
If
θ1 = 90° and θ 2 = θ
∴
W = − pE cos θ or W = − p⋅ E
p = ( 2a ) q
Dipole in Non-uniform Electric Field
Electric Field Intensity due to Electric Dipole Electric field intensity due to an electric dipole in different cases is given below • Electric field intensity at a point on axial line of dipole, 2rp 1 E= 2 4πε 0 ( r − a 2 ) 2 where, r = distance of point on axial line from the centre of dipole and a = half of distance between the charges of dipole. 1 2p . For short dipole, E = 4πε 0 r 3 • Electric field intensity at a point on equatorial line of
−p 1 dipole, E = 2 4πε 0 ( r + a 2 ) 3/ 2 1 −p . For short dipole, E = 4πε 0 r 3
When an electric dipole is placed in a non-uniform electric field, then a resultant force as well as a torque act on it. Let force on electric dipole = ( qE1 − qE 2 ), along the direction of greater electric field intensity. Therefore, electric dipole undergoes rotational as well as linear motion.
Electric Flux Electric flux over an area in an electric field is a measure of the number of field lines crossing a surface. It is denoted by φ E . Let E be electric field at the location of the surface element d S. The electric flux through the entire surface is given by φ E = ∫ E ⋅ d S ⇒ φ E = ∫ E dS cos θ = E cos θ∫ dS S
S
where, θ is smaller angle between E and d S.
• Electric field due to dipole at any point,
1 1 E= 4πε 0 r 3
S
dS
2
1+ 3cos θ
θ
dS E
where, θ = angle between the axis of dipole and the line joining the point and centre of dipole.
The flux of electric field passing through an area is the dot product of electric field vector and area vector.
For axial position, θ = 0.
φ = E ⋅ S = ES cos θ
For equatorial position, θ = 90°.
Dipole in a Uniform Electric Field When a dipole in kept in a uniform electric field, then no force with on it, i.e. F net = 0. In uniform electric field, a torque is applied on electric dipole whose magnitude is given as τ = pE sin θ or
τ = p× E
where, p = dipole moment and E = electric field strength. • Direction of torque is perpendicular to the plane of paper and inwards. • When dipole is parallel or anti-parallel to E, then (i.e.θ = 0°, torque is zero and maximum at θ = 90° or 180°). • Work done in rotating the dipole in uniform electric field is given by
Gauss’s law According to Gauss’ law in electrostatics, ‘‘the total electric 1 flux linked with a closed surface is equal to times the net ε0 charge enclosed by that surface.’’ 1 Thus, φE = ∫ E⋅ dS = [Qenclosed ] s ε0 If a charge Q is placed at the centre part of a cube, then Q electric flux with surface of cube, φ = and electric flux ε0 Q . with any one face of cube = 6ε 0
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Electric field due to various charged symmetrical bodies can be obtained by applying Gauss’s law shown in the following table Uniformly Charged Symmetrical Bodies (i)
Infinitely long wire
Electric Field E=
λ , where λ = line charge density. 2πε 0r
E-r Curve E
r
(ii) Infinite plane sheet
σ , where σ = surface charge density. E= 2ε 0
(iii) Conducting sphere or shell of radius R and charge Q
E = 0 for r < R, Q Q for r = R and E = for r > R E= 4 πε 0R 2 4 πε 0r2
E
r
(iv) Conducting cylinder of linear charge density λ and radius R
(v) Non-conducting cylinder
λ for r > R, E= 2πε 0r λ for r = R and E = 0 for r < R E= 2πε 0R E=
λr for r ≤ R 2πε 0R 2
E r>R O
R
E r>R O
r=R
r
E rR r=R
Topical Practice Questions All the exam questions of this chapter have been divided into 4 topics as listed below Topic 1
—
ELECTRIC CHARGE AND COULOMB’S LAW
410–420
Topic 2
—
ELECTRIC FIELD
420–428
Topic 3
—
ELECTRIC DIPOLE
428–431
Topic 4
—
ELECTRIC FLUX AND GAUSS’S THEOREM
432–435
Topic 1 Electric Charge and Coulomb’s Law 2019 1 Two point charges A and B, having charges +Q and −Q
2018 2 If point charges Q1 = 2 × 10−7 C and Q2 = 3 × 10−7 C are at
respectively, are placed at certain distance apart and force acting between them is F.If 25% charge of A is transferred to B, then force between the charges becomes [NEET] 9F 16F 4F (b) (c) (d) F (a) 16 9 3
30 cm separation, then find electrostatic force between them. (a) 2 × 10−3 N [JIPMER] (b) 6 × 10−3 N (c) 5 × 10−3 N (d) 1× 10−3 N
411
ELECTROSTATICS I
3 Positive charge Q is distributed uniformly over a circular ring of radius R. A point particle having a mass ( m ) and a negative charge − q is placed on its axis at a distance x from the centre. Assuming x < R, find the time period of oscillation of the particle, if it is released from there [neglect gravity]. [AIIMS] 16π 3 ε 0 R 3 m (a) Qq
3 1/ 2
2π ε 0 R (c) 3 q 3
1/ 2
8π 2 ε 0 R 3 (b) q
2013 9 Two pitch balls carrying equal charges are suspended from a common point by strings of equal length, the equilibrium separation between them is r. Now, the strings are rigidly clamped at half the height. The equilibrium separation between the balls now become [NEET]
1/ 2
y y/2
(d) None of these
2017 4 A certain chargeQ is divided into two parts q andQ − q. How the charge Q and q must be related, so that when q and (Q − q ) is placed at a certain distance apart experience maximum electrostatic repulsion? [JIPMER] (a) Q = 2q (b) Q = 3 q (c) Q = 4 q (d) Q = 4 q + c
5 Suppose the charge of a proton and an electron differ slightly. One of them is −e and the other is ( e + ∆e ). If the net of electrostatic force and gravitational force between two hydrogen atoms placed at a distance d (much greater than atomic size) apart is zero, then ∆e is of the order (Take, mass of hydrogen, mh = 1.67 × 10−27 kg) [NEET] −20 −23 (a) 10 (b) 10 C C (c) 10−37 C (d) 10−47 C 6 Two identical conducting balls A and B have positive charges q1 and q 2 respectively but q1 ≠ q 2 . The balls are brought together so that they touch each other and then kept in their original positions. The force between them is [JIPMER] (a) less than that before the balls touched (b) greater than that before the balls touched (c) same as that before the balls touched (d) zero
2014 7 Two charged spheres separated at a distance d exert a force F on each other. If they are immersed in a liquid of dielectric constant K = 2, then the force is (if all conditions are same) [UK PMT] (a) F / 2 (b) F (c) 2F (d) 4F
8 If a charge on the body is 1 nC, then how many electrons are present on the body? [KCET] (a) 1.6 × 1019 (b) 6.25 × 109 (c) 6.25 × 1027 (d) 6.25 × 1028
r
1 (a) 2
2
r (b) 3 2
r′
2r (c) 3
2r (d) 3
10 Each of the two point charges are doubled and their distance is halved. Force of interaction becomes n times, where n is (a) 4 (b) 1 (c) 1/16 (d) 16 [UP CPMT] 11 A cylindrical conductor is placed near another positively charged conductor. The net charge acquired by the cylindrical conductor will be [UP CPMT, KCET] (a) positive only (b) negative only (c) zero (d) either positive or negative 12 Three identical charges are placed at the corners of an equilateral triangle. If the force between any two charges is F, then the net force on each will be [WB JEE] (b) 2 F (c) 3 F (d) 3 F (a) 2 F
2012 13 Three charges each of magnitude q are placed at the corners of an equilateral triangle, the electrostatic force on the charge placed at the centre is (each side of triangle is L) [AFMC] 1 q2 (a) zero (b) ⋅ 4πε 0 L2 q2 1 3q 2 1 (d) (c) ⋅ 2 ⋅ 2 4πε 0 L 12πε 0 L
14 When a piece of polythene is rubbed with wool, a charge of − 2 × 10−7 C is developed on polythene. What is the amount of mass which is transferred to polythene? [UP CPMT] (a) 5.69 × 10−19 kg (b) 6.25 × 10−19 kg (c) 9.63 × 10−19 kg (d) 11.38 × 10−19 kg
2011 15 A charged oil drop is suspended in uniform field of 3 × 104
Vm −1 , so that it neither falls nor rise. The charge on the drop will be (take, the mass of the charge 9.9 × 10−15 kg and g = 10 ms −2 ) [AIEEE 2004] (b) 3.2 × 10−18 C (a) 3.3 × 10−18 C (c) 1.6 × 10−18 C (d) 4 .8 × 10−18 C
412
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
16 Four charges equal to − Q are placed at the four corners of a square and a charge q is at its centre. If the system is in equilibrium, the value of q is [WB JEE] −Q Q (b) (1 + 2 2 ) (a) (1 + 2 2 ) 4 4 −Q Q (d) (1 + 2 2 ) (c) (1 + 2 2 ) 2 2 17 Charge q 2 of mass m revolves around a stationary charge q1 in a circular orbit of radius r. The orbital periodic time of [J&K CET] q 2 would be 1/ 2 1/ 2 4π 2 mr 3 kq q (b) 21 2 3 (a) kq q 4π mr 1 2 4π 2 mr 4 (c) kq1 q 2
1/ 2
4π 2 mr 2 (d) kq1 q 2
1/ 2
18 A soap bubble is given negative charge, then its radius will be [DCE] (a) increase (b) decrease (c) remain changed (d) fluctuate 19 Two identical charged spheres of material density ρ, suspended from the same point by inextensible strings of equal length make an angle θ between the strings. When suspended in a liquid of density σ and the angle θ remains the same. The dielectric constant K of the liquid is [KCET] ρ ρ−σ (a) (b) ρ−σ ρ ρ ρ+σ (c) (d) ρ+σ ρ
2010 20 Two positive ions, each carrying a charge q are separated by a distance d. If F is the force of repulsion between the ions, then the number of electrons missing from each ion will be (e being the charge on an electron) [CBSE AIPMT] 4πε 0 Fd 2 4πε 0 Fe 2 (b) (a) e d2 (c)
4πε 0 Fd 2
(d)
e2
4πε 0 Fd 2 e2
21 Two small spheres of masses M 1 and M 2 are suspended by weightless insulating threads of lengths L1 and L2 . The spheres carry charges Q1 and Q2 respectively. θ1 L1 M1
+Q1
θ2 L2 +Q2
M2
The spheres are suspended such that they are in level with one another and the threads are inclined to the vertical at
angles of θ1 and θ 2 as shown in figure. Which one of the following conditions is essential, if θ1 = θ 2 ? [UP CPMT] (a) M 1 ≠ M 2 but Q1 = Q2 (b) M 1 = M 2 (c) Q1 = Q2 (d) L1 = L2 22 A charged particle of mass 0.003 g is held stationary in space by placing it in a downward direction of electric field of 6 × 104 N/C. Then, the magnitude of charge is [UP CPMT] (b) 5 × 10−10 C (a) 5 × 10−4 C −9 −6 (d) 5 × 10 C (c) 5 × 10 C
23 Two copper balls, each weighing 10 g are kept in air 10 cm apart. If one electron from every 106 atoms is transferred from one ball to the other, the Coulomb force between them is (atomic weight of copper is 63.5) [Manipal] (a) 2.0 × 1010 N (b) 2.0 × 104 N (c) 2.0 × 108 N (d) 2.0 × 106 N 24 Among two discs A and B, first has radius 10 cm and charge 10−6 C and second has radius 30 cm and charge 10−5 C. When they are touched charges on both are q A and [Manipal] q B respectively, will be (a) q A = 2.75 µC, q B = 3.15 µC (b) q A = 1.09 µC, q B = 1.53 µC (c) q A = q B = 5.5 µC (d) None of the above 25 Two charges are at a distance d apart. If a copper plate of thickness d / 2 is kept between them, the effective force will be [Manipal] (a) F / 2 (b) zero (c) 2 F (d) 2F
2009 26 The distance between charges 5 × 10−11 C and
− 2.7 × 10−11 C is 0.2 m. The distance, at which third charge should be placed from second charge in order that it will not experience any force along the line joining the two charges, is [Manipal] (a) 0.44 m (b) 0.65 m (c) 0.556 m (d) 0.350 m
27 When air medium in which two charges kept apart at a distance r is replaced by a dielectric medium of dielectric constant K, the force between the charges is [J&K CET] (a) remain unchanged (b) 1/ K times 1 (d) K 2 times (c) 2 times K 28 Mark the correct option. [Punjab PMET] (a) In electrostatics, there is no motion of charge at all in conductor’s bulk. (b) In electrostatics, there is a motion of charged particle in conductor’s bulk. (c) In electrostatics and current electricity, there is a net motion of charged particles in the bulk of the material of the conductor. (d) In electrostatics and current electricity, there is no net motion of charged particles in the bulk of the material of the conductor.
413
ELECTROSTATICS I
29 A ball with charge − 50 e is placed at the centre of a hollow spherical shell has a net charge of −50e. What is the charge on the shell’s outer surface? [DUMET] (a) − 50 e (b) Zero (c) − 100 e (d) + 100 e 30 If 1010 electrons are acquired by a body every second, then the time required for the body to get a total charge of C will be [DUMET] (a) 2h (b) 2 days (c) 2 yr (d) 20 yr 31 A charge q is placed at the centre of the line joining two equal charges, Q. The system of the three charges will be in equilibrium, if q is equal to [BCECE] Q Q Q Q (a) − (b) − (c) + (d) + 2 4 4 2 32 A pendulum bob of mass m carrying a charge q is at rest with its string making an angle θ with the vertical in a uniform horizontal electric field E. The tension in the string is [BCECE] mg qE mg qE and (b) and (a) sin θ cos θ cos θ sin θ qE mg (c) (d) mg qE 33 Two identical charged spheres suspended from a common point by two massless strings of lengths l, are initially at a distance d (d < < l) apart because of their mutual repulsion. The charges begin to leak from both the spheres at a constant rate. As a result, the spheres approach each other with a velocity v. Then, ν varies as a function of the distance x between the sphere, as [NEET] (a) v ∝ x (b) v ∝ x −1/ 2 (c) v ∝ x −1 (d) v ∝ x1/ 2 34 When 1019 electrons are removed from a neutral metal plate, the electric charge on it is [VMMC] (a) − 1.6 C (b) + 1.6 C (c) 10+19 C (d) 10−19 C 35 Two spherical conductors B and C having equal radii and carrying equal charges in them repel each other with a force F when kept apart at some distance. A third spherical conductor having same radius as that of B but uncharged is brought in contact with B, then brought in contact with C and finally removed away from both. The new force of repulsion between B and C is [JIPMER] F 3F F 3F (b) (c) (d) (a) 4 4 8 8 36 The number of electrons in 2 C of charge is [JIPMER] 29 17 19 (a) 5 × 10 (b) 125 × 10 (c) 1.6 × 10 (d) 9 × 1011
2008 37 A comb rub through one’s dry hair attracts small bits of paper. This is due to [AFMC] (a) comb is a good conductor (b) paper is a good conductor (c) the atoms is the paper get polarised by the charged comb (d) the comb possesses magnetic properties
38 A table tennis ball which has been covered with a conducting paint is suspended by a silk thread, so that it hangs between two metal plates. One plate is earthed and the other plate is connected to a high voltage generator, then the ball [BHU] (a) is attracted to the high voltage plate and stays there (b) hangs without moving (c) swings backward and forward hitting each plate in turn (d) is repelled to the earthed plate and stays there 39 Consider a non-spherical conductor shown in the figure which is given a certain amount of positive charge. The charge distributes itself on the surface such that the charge densities are σ 1 , σ 2 and σ 3 at the region 1, 2 and 3 respectively. Then [Kerala CEE] 3 2
1 3
(a) σ 1 > σ 2 > σ 3 (b) σ 2 > σ 3 > σ 1 (c) σ 3 > σ 1 > σ 2 (d) σ 2 > σ 1 > σ 3 (e) σ 1 > σ 3 > σ 2 40 Three charges 1µC, 1µC and 2µC are kept at the vertices A, B and C of an equilateral triangle ABC of 10 cm side, respectively. The resultant force on the charge at C is [Punjab PMET] (a) 0.9 N (b) 1.8 N (c) 2.72 N (d) 3.12 N
41 What is charge on 90 kg of electrons? (a) 1.58 × 1013 C (b) 2.3 × 1012 C (c) 2.53 × 1012 C (d) None of these
[DUMET]
42 If charge and distance between two charges are reduced to half, then force between them is [DUMET] (a) remain same (b) increases four times (c) reduce four times (d) None of the above 43 Two identical metal spheres charged with + 12 µF and −8µF are kept at a certain distance in air. They are brought into contact and then kept at the same distance. The ratio of the magnitudes of electrostatic forces between them before and after contact is [KCET] (a) 12 : 1 (b) 8 : 1 (c) 24 : 1 (d) 4 : 1 44 A circle of radius a has charge density given by λ = λ 0 cos 2 θ on its circumference. What will be the total charge on the circle? [Guj CET] (a) 2πa (b) Zero (d) None of these (c) πaλ 0 45 Electrical force between two point charges is 200 N. If we increase 10% charge on one of the charges and decrease 10% charge on the other, then electrical force between them for the same distance becomes [Guj CET] (a) 198 N (b) 100 N (c) 200 N (d) 99 N
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2007 46 Assertion The lightning conductor at the top of high building has sharp pointed ends. [AIIMS] Reason The surface density of charge at sharp points is very high resulting in setting up of electric wind. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion (c) Assertion is correct but Reason is incorrect (d) Both Assertion and Reason are incorrect 47 An electron is moving around the nucleus of a hydrogen atom in a circular orbit of radius r. The Coulomb force F between the two is [BHU] e2 e2 (a) k 3 r$ (b) −k 3 r$ r r e2 e2 (d) −k (c) k r$ r$ r r ( where, k = 1/ 4πε 0 ) 48 Two identical spheres carrying charges −9µC and 5µC, respectively are kept in contact and then separated from each other. Point out true statement from the following. In each sphere [Kerala CEE] (a) 1.25 × 1013 electrons are in deficit (b) 1.25 × 1013 electrons are in excess (c) 2.15 × 1013 electrons are in excess (d) 2.15 × 1013 electrons are in deficit (e) 1.52 × 1013 electrons are in excess
49 Two identical charges repel each other with a force equal to 10 g-wt, when they are 0.6 m apart in air ( g = 10 ms −2 ). The value of each charge is [KCET] (a) 2 mC (b) 2 × 10−7 C (c) 2 nC (d) 2µC 50 Two point charges +2C and + 6 C repel each other with a force of 12 N. If a charge of −2C is given to each of these charges, the force will now be [AMU] (a) zero (b) 8 N (attractive) (c) 8 N (repulsive) (d) None of these
2006 51 Electric charges of 1µC, − 1µC and 2µCare placed in air at the corners A , B and C respectively of an equilateral triangle ABC having length of each side 10 cm. The resultant force on the charge at C is [KCET] (a) 0.9 N (b) 1.8 N (c) 2.7 N (d) 3.6 N
52 A pendulum bob carriers a negative charge −q. A positive charge +q is held at the point of support. Then, the time period of the bob is [MHT CET] (a) greater than 2π L/ g
(b) less than 2π L/ g
(c) equal to 2π L/ g
(d) equal to 2π 2L/ g
53 Two identical spheres with charges 4q and −2q kept some distance apart exert a force F on each other. If they are made to touch each other and replaced at their old positions, the force between them will be [J&K CET] 1 1 9 8 (b) F (c) F (d) F (a) F 9 8 8 9
2005 54 Two equal negative charges −q are fixed at the point ( 0, a ) and ( 0, − a ) on the y-axis. A positive charge Q is released from rest at the point ( 2a, 0) on the x-axis. The charge will [BHU] (a) execute SHM about the origin (b) move to the origin and remain at rest (c) move to infinity (d) execute oscillatory but not SHM
55 A and B are two identical spherical charged bodies, which repel each other with force F , kept at a finite distance. A third uncharged sphere of the same size is brought in contact with sphere B and removed. It is then kept at mid-point of A and B. Find the magnitude of force on C. [Manipal]
(a) F/ 2
(b) F/ 8
(c) F
(d) Zero
56 Charges 4Q, q and Q are placed along x-axis at position x = 0,x = l / 2and x = l, respectively. Find the value of q, so that force on charge Q is zero. [DUMET] (a) Q (b) Q / 2 (c) − Q / 2 (d) − Q
Answers 1 (a)
2 (b)
3 (a)
4 (a)
5 (c)
6 (b)
7 (a)
8 (b)
9 (b)
10 (d)
11 (c)
12 (c)
13 (a)
14 (d)
15 (a)
16 (b)
17 (a)
18 (a)
19 (a)
20 (c)
21 (b)
22 (b)
23 (c)
24 (c)
25 (b)
26 (c)
27 (b)
28 (a)
29 (d)
30 (d)
31 (b)
32 (b)
33 (b)
34 (b)
35 (d)
36 (b)
37 (c)
38 (c)
39 (d)
40 (d)
41 (a)
42 (a)
43 (c)
44 (c)
45 (a)
46 (a)
47 (b)
48 (b)
49 (d)
50 (a)
51 (b)
52 (c)
53 (b)
54 (d)
55 (c)
56 (d)
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ELECTROSTATICS I
Explanations 1 (a) The force between two point
charges A and B, having charges + Q and − Q respectively is given by +Q A
–Q B r
k QAQB kQ (− Q ) kQ 2 = = − 2 …(i) 2 2 r r r 1 where, k = constant = 4 πε 0 F=
and r = distance between two charges A and B. When 25% charge of A is transferred to B, then new amount of charge on A and B respectively become 75 3 Q′ A = (QA ) = Q 100 4 25 Q′ B = Q + QB 100 A −3 1 Q = Q − Q = 4 4
2
So, the force between the two charges now becomes 3Q 3 k − Q 4 4 k Q′ A Q′ B F′ = = r2 r2 2 −9kQ 9 F [from Eq. (i)] = = 16 16r2 Thus, the new force between the charges is 9/16 times the initial force between the charges. QQ (b)Q Electrostatic force, F = k 12 2 r 2 × 10−7 × 3 × 10−7 9 = 9 × 10 × (30 × 10−2 )2 = 6 × 10−3 N
3 (a) When the negative charge is shifted at a distance x from the centre of the ring along its axis, then force acting on the point charge due to the ring is –q x Q
F = qE
(towards centre) kQx = q⋅ 2 (R + x 2 )3/ 2
~ R2 If R >> x, then R 2 + x 2 − 1 Qqx and F = (towards centre) ⋅ 4 πε 0 R 3 Since force on charged particle is acting in opposite direction of electric field, hence acceleration on charged particle towards centre of ring is given by 1 F Qqx ⋅ ⇒ a=− =− 4 πε 0 mR 3 m Since, restoring force FE ∝ − x, therefore, motion of charged particle will be SHM. Time period of SHM, T =
2π 16π ε 0R m = ω Qq 3
3
1/ 2
But, acceleration, a = − ω 2x 1 Qqx − ⋅ = −ω 2x 4 πε 0 mR 3 ⇒
ω=
Qq 4 πε 0mR 3
(∆e)2 =
⇒ ∆ε = 1.437 × 10−37 C
6 (b) According to Coulomb’s law, the force of repulsion between them is qq given by F = 1 2 2 4πε 0r q1
q2
A
B r
When the charged spheres A and B are brought in contact, each sphere will attain equal charge q′ q + q2 q′ = 1 2 Now, the force of repulsion between them at the same distance r is F′ =
4 (a) The electrostatic force of repulsion between the charge q and (Q − q) at separation r is given by 1 qQ − q2 1 q(Q − q) ⋅ F= = ⋅ 2 4 πε 0 4 πε 0 r r2 ∂F =0 ∂q 1 (Q − 2q) ⋅ =0 4 πε 0 r2
If F is maximum, then i.e.
As, 1/ 4 πε 0r2 is constant, therefore Q − 2q = 0 or Q = 2q
5 (c) Net charge on one H-atom,
q = − e + e + ∆e = ∆e Net electrostatic repulsive force between two H-atoms, kq2 k (∆e)2 Fr = 2 = d d2 Similarly, net gravitational attractive force between two H-atoms, Gm2 FG = 2r d It is given that, Fr − FG = 0 2 K (∆e) Gm2 ⇒ − 2r = 0 2 d d Gmr2 ⇒ (∆e)2 = K
(6.67 × 10−11 ) (1.67 × 10−27 )2 9 × 109
q′ × q′ 1 = 4 πε 0r2 4 πε 0
q1 + q2 q1 + q2 q1 + q2 2 2 2 = 4πε 0r2 r2
2
2
q + q2 As, 1 > q1q2 2 ∴
F′ > F
7 (a) Consider the situation shown in the diagram. Sphere B
Sphere A d
Let charges on sphere A and B be q1 and q2, respectively. Force between the charges placed in air by Coulomb’s law (spheres can be assumed as point charges placed at their centres) qq …(i) FAB = k 1 1 22 d where, k 1 = 1 / 4 πε 0. d
When the spheres are immersed in a liquid, then force between the charges is q ⋅q q ⋅q …(ii) FAB ′ = k 1 ⋅ 1 22 = k 1 1 22 2d K ⋅d
416
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
where, k is dielectric constant of the liquid = 2. On dividing Eqs. (i) and (ii), we get FAB k = 1 =2 FAB k1 / 2 ′
From Eqs. (iii) and (iv), we get r r ′ 3 r3 ⇒ r′ = 3 = 2y y 2 1 q1q2 4 πε 0 r2 4 1 2q1 × 2q2 = F = 16 F F′ = 1/ 4 4 πε 0 (r / 2)2
nF = 16 F
−9
8 (b) Given, q = 1 nC = 1 × 1 × 10 C (Q 1 nC = 1 × 10−9 C)
= 0.625 × 10
× 10
19
= 6.25 × 10
2
= 2F + F
...(i) ...(ii)
| FA | = | FB | = | FC | and they are equally inclined with each other, so their resultant will be zero.
⇒
C
14 ...(iii)
Similar equation as Eq. (iii), we can write for the case II as shown in figure. r′ 3 kq2 ⇒ = y mg 2⋅ 2 r′ 3 kq2 ...(iv) ⇒ = y mg θ y/2 T1sin θ F
r' mg
L
FC sin 30º
FA
kq r2mg
r3 kq2 = 2 y mg
⇒
FC FC
L
2
⇒
T1
30º 30º
FB FB sin 30º
B
FA = FB cos 30°+ FC cos 30° and FB sin 30° = FC sin 30° (d) Number of electrons transferred, n = q/ e Mass transferred to polythene = me × n q = me × e 2 × 10−7 = 9.1 × 10−31 × 1.6 × 10−19 = 11.38 × 10−19 kg
15 (a) For stationary oil drop,
B
1 (− Q )(− Q ) ⋅ 4 πε 0 a2 1 (− Q )(− Q ) 1 × + 4 πε 0 ( 2a)2 2 1 1 (− Q )q × =0 + 4 πε 0 ( 2a / 2)2 2 1 Q2 1 Q2 1 ⋅ 2 + ⋅ 2⋅ 4 πε 0 a 4 πε 0 2a 2
Force due to electric field = Weight of the oil drop mg qE = mg ⇒ q = E −15 9.9 × 10 × 10 q= 3 × 104 = 3.3 × 10−18 C
1 2Qq 1 ⋅ × =0 4 π ε 0 a2 2 Q Q+ − 2q = 0 2 2
⇒
2 2 Q + Q − 4q = 0
⇒
4 q = (2 2 + 1) Q
⇒
30º L
a
q
–Q
−
FB cos 30º FC cos 30º
r kq2 = 2 2 y r mg
T1cos θ
⇒
A
On dividing Eq. (ii) by Eq. (i), we get T sin θ kq2 / r2 = T cosθ mg tanθ =
⇒
2
13 (a) In the following figure, since
r
FCO FCD
FCD + FCA cos 45° + FCO cos 45°= 0
⇒ Fnet = 3F 2 = 3 F
F T sinθ mg
C
A –Q
1 2
⇒ Fnet = 2F 2 + 2F 2 ×
y
T cosθ
–Q
O
Fnet = F 2 + F 2 + 2F 2 cos 60° 9
FCA
F'
12 (c) Net force on each charge will be
θ T
⇒ n = 16
–Q D
zero, as there is only transfer of electrons from one part of body to the other.
9 (b) For the case I equilibrium of forces, T cosθ = mg T sin θ = kq2 / r2
FCB
11 (c) Net charge acquired by induction is
⇒ n=?
From the property of quantisation charge, 1 × 10−9 q q = ne ⇒ n = = e 1.6 × 10−19 −9
the force experienced by each charge is zero. It is clear that charge placed at centre would be in equilibrium for any value of q, so we are considering the equilibrium of charge placed at any corner.
10 (d) From the formula, F =
According to question, FAB = F F F = 2 ⇒ FAB ⇒ ′ = FAB 2 ′
e = 1.6 × 10−19
16 (b) The system is in equilibrium means
q = Q / 4 (2 2 + 1)
17 (a) We have, 4 π 2mr 1 q1q2 = mrω 2 = 2 4 πε 0 r T2 2 (4 πε 0 )r (4 π 2mr) T2 = q1q2 1/ 2
4 π 2mr3 T = kq1q2 (a) If σ is the surface tension and r is the radius of soap bubble, then pexcess = 4σ / r
⇒
18
When the bubble is charged, 4σ pexcess = pelectrostatics + r After electrification, surface tension decreases. This decrease the pressure and increase 1 the radius p ∝ . r
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ELECTROSTATICS I
19 (a) Er =
mg Fa = Fm (m − m1 )g ρV ρ = = (ρ − σ ) V (ρ − σ )
where, ρ = density of sphere, σ = density of liquid and V = volume of the liquid.
20 (c) Two positive ions each carrying a charge q are kept at a distance d, then it is found that force of repulsion between them is kqq 1 q2 , F= 2 = 4 πε 0 d 2 d where, ∴ F=
q = ne 1 n2e2 ⇒ n= 4πε 0 d 2
4 πε 0 Fd 2 e2
21 (b) For sphere 1, in equilibrium T1 cosθ1
θ1 T1
L1 f1
M1 Q1
T1 sinθ1
T1 cosθ 1 = M 1g and T1 sinθ 1 = F1 ∴ tan θ 1 = F1 / M 1g Similarly for sphere 2, tan θ 2 = F2 / M 2 g F is same on both the charges, θ will be same only if their masses M are equal.
22 (b) By using, qE = mg ⇒ q = mg / E 3 × 10−6 × 10 30 × 10−10 = 6 6 × 104 −10
= 5 × 10
C
23 (c) Number of electrons, 6 × 1023 6 × 1018 1 ...(i) × 10 × 6 = 63.5 63.5 10 Q According to law of quantisation of charge, q = ne ...(ii) From Eqs. (i) and (ii), we get 6 × 1018 × 1.6 × 10−19 q= 63.5 n=
= 1.5 × 10−2 C F=
9 × 109 × 1.5 × 10−2 × 1.5 × 10−2
= 2.0 × 108 N
higher potential to lower potential till it equalizes on the two discs. Given, q1 = 10−6C, q2 = 10−5 C q + q2 10−6 + 10−5 ∴q= 1 = = 5.5µC 2 2
28 (a) In electrostatics, charge is uniformly distributed at the surface of the body. As, there is no motion of the charge in the bulk of the conducting body.
29 (d) The net charge on the outer surface
25 (b) From Coulomb’s law, electric force between two charges is directly proportional to the product of charges and inversely proportional to the square of distance between them. qq e.g. F = k 1 22 d where, 1 k= = proportionality constant. 4 πε 0 If a medium is placed between the 1 q1q2 charges, then F ′ = . 4 πε 0K d 2
is − ( − 50e − 50e) = 100e.
30 (d) 1 electron has a charge of 1.6 × 10−19 C.
1010 electrons would have a charge of q = ne = 1.6 × 10−19 × 1010 = 1.6 × 10−9 C Thus in 1s, charge accumulated = 1.6 × 10−9 C So, time taken to accumulate 1C 1 = 1.6 × 10−9
Since, medium placed between the charge is a metallic plate, so for it K = ∞. Hence, F ′ = 0 (zero).
= 0.625 × 109 s = 173611 h = 7233 days ≈ 20 yr
26 (c)
M1 g
=
24 (c) When touched, charge flows from
10 100
2
A
B
0.2 m q1=5×10–11C
C
Let a charge q is placed at a point C such that force at C is zero. Fq = force at q due to charge q2 2 and Fq1 = force at q due to charge q1. As, Fq1 + Fq 2 = 0 ⇒ Fq1 = − Fq 2 or | Fq1 | = − | Fq 2 | 1 1 qq2 q1 q ⇒ ⋅ = ⋅ 2 4 πε 0 (x + 0.2) 4 πε 0 x 2 ⇒ ⇒
31 (b) Q
q x q2=–2.7×10–11C
5 × 10− 11 2.7 × 10−11 = (x + 0.2)2 x2 x = 0.556 m
27 (b) Force between two charged particles, when air is the medium between them is given as 1 q1q2 ⋅ F= 4 πε 0 r2 where, q1 and q2 are charge on the particles and r is the distance between them. Now, if a dielectric is inserted between them, the force is given as 1 q1q2 qq 1 F′ = ⋅ 2 = ⋅ 12 2 4 πε r 4 πε 0K r 1 (As, ε = K ε 0 ) = F K
Q
C
l/2 q
A
B
l
⇒ Value of q such that all three charges are in equilibrium. i.e., Fnet at B = zero FBA = force at charge Q due to Q and FBC = force at charge Q due to q. FBA + FBC = 0 or | FBA | = | FBC | 1 Q2 1 Qq = 4 πε 0 l 2 4 πε o l 2 / 4 ⇒ ⇒ As, ⇒
Q = q(4 ) q = Q /4 FBA = − FBC Q q = − 4
32 (b) For the equilibrium of the bob, θ T θ T sinθ
T cosθ
mg
T sin θ = qE and T cos θ = mg qE mg and T = T = sin θ cos θ
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Hence, electric force acting between B and C is 1 qB qC 1 (q / 2)(3q / 4 ) F′ = = 4 πε 0 r2 4 πε 0 r2
33 (b) According to question, two identical charged spheres suspended from a common point by two massless strings of length l.
F
q
A
36
q
B x/2
θ
x
C
mg
F F or tan θ = = tan θ mg mg
…(i)
Since, the charges begins to leak from both the spheres at a constant rate. As a result, the spheres approach each other with velocity v. Therefore, Eq. (i) can be rewritten as kq2 x/2 = 2 2 x mg l − (x 2 / 4 ) kq2 x = 2 2 l x mg
[Q x σ1 > σ3
40 (d) The situation is shown in figure.
34 (b) Charge, q = ne ⇒
= 1.76 × 1011 × 90 = 1.58 × 1013 C
42 (a) As per Coulomb’s law, F = k According to question, q1 q2 2 2 qq F′ = k = k 12 2 = F 2 r r 2
37 (c) When a comb rubs through one’s
Q In ∆ABC,
⇒
electrons, therefore, charge on 90 kg of e electrons = × 90 m
=
θ
l2
3 1 q2 3F = 8 4 πε 0 r2 8 (b) Using, q = ne ⇒ 2 = n × 16 . × 10−19 2 = 125 . × 1019 ⇒ n= 16 . × 10−19 = 125 × 1017 electrons
41 (a) Since, e/m is the charge per kg of
−19
× 1.6 × 10
= 1.6C
Force on C due to A q1 = 1 µ C A
35 (d) Let the spherical conductors B and C have same charge as q. The electric force between them is 1 q2 F= 4 πε 0 r2 where, r being the distance between them. When third uncharged conductor A is brought in contact with B, then charge on each conductor q + qB qA = qB = A 2 0+ q q = = 2 2 When this conductor A is now brought in contact with C, then charge on each conductor q + qC qA = qC = A 2 (q / 2) + q 3q = = 2 4
10 cm
=
where, r is the distance between them. When the charges are brought in contact, then 12 − 8 q1 = q2 = 2 4 = = 2 µF 2 1 2×2 4 1 × 2 = 2× ∴ Ffinal = 4 πε 0 4 πε 0 r r 4 1 = 2× 4 πε 0 r | F |initial 96 ∴ = = 24 :1 | F |final 4
Q
C FBC q3 = 2 µ C FAC
O
−12
9
9 × 10 × 1 × 2 × 10 (0.1)2
= 1.8 N
Similarly, FBC = 1.8 N Hence, net force on C is F=
Magnitude of force will be given as 1 96 F= 4 πε 0 r2
44 (c) Charge density, λ = λ 0 cos2 θ
1 qAqC 2 4 πε 0 rAC
2 FAC
Thus, force between them will remains same. 1 12 × (−8) 1 96 (c) Finitial = ⋅ =− ⋅ 2 4 πε 0 4 πε 0 r 2 r
10 cm
B q2 = 1µC 10 cm
FAC =
43
+
2 FBC
q1q2 r2
= (1.8)2 + (1.8)2 + 2 × 1.8 × 1.8 × = 3(1.8)2 = 3 × 1.8 = 3.12 N
1 2
dl P
Let PQ be an element of length dl on the circumference of the circle which makes an angle dθ at the centre of the circle. Then, the charge on the element is ⇒
+ 2FAC FBC cos 60°
dθ a
dq = λ × dl dq = λ 0 cos2 θ ⋅ dl
…(i)
Now, dθ = dl / a ⇒ dl = ad θ ...(ii) Then, from Eqs. (i) and (ii), we get dq = λ 0 cos2 θ ⋅ (ad θ ) ⇒
dq = λ 0a cos2 θ ⋅ d θ
…(iii)
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ELECTROSTATICS I
The total charge on the circle [on integrating Eq. (iii) with limit 0 to 2π ] q=∫
2π 0
λ 0a cos2 θd θ
= λ 0a∫ ⇒
2π 0
cos2θd θ
cos 2θ + 1 dθ 2 [Q cos2 θ = (cos 2θ + 1) / 2 ]
q = λ 0a∫
2π
0
2π
λ a sin 2θ ⇒ q= 0 +θ 2 2 0 λ 0a sin 4 π sin 0 = + 2π − −0 2 2 2 λ 0a ⇒ q= [ 0 + 2π − 0 ] 2 ⇒ q = π aλ 0
45 (a) Let two charges be q1 and q2 and r be the distance between them, then electrical force, 1 q1q2 ⋅ = 200 N …(i) F= 4 πε 0 r 2 If q1 is increased by 10%, then 110 q′1 = q1 100 and q2 is decreased by 10%, then 90 q′2 = q2 100 Then, electrical force between them is 1 q′1 q′2 ⋅ 4 πε 0 r 2 110 90 q × q 1 100 1 100 2 F′ = 4 πε 0 r2 1 q1q2 99 …(ii) ⋅ × F′ = 4 πε 0 r 2 100
F′ =
⇒ ⇒
From Eqs. (i) and (ii), we get 99 F′ = 200 × 100 ⇒ F′ = 198 N
lightning conductor to the earth and there is no harm to building.
This charged electric wind comes in contact with the charged clouds and then source of its charge is neutralised, so potential drops between building and clouds. Hence, chances of lightning on building is reduced. Even if lightning strikes the building, charge is conducted by the
to charge at A
So, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
FA + 2 µC
C
120°
47 (b) Let charges on an electron and hydrogen nucleus be q1 and q2. The Coulomb’s force between them at a distance r is 1 q1q2 F=− r$ 4 πε 0 r 2 1 Putting, = k (given) 4 πε 0 qq F = − k 12 2 r$ r Since, the nucleus of hydrogen atom has one proton, so charge on nucleus is e, i.e. q2 = e and also q1 = e for electron. e2 e⋅ e So F = − k 2 r$ = − k 2 r$ r r r$ r$ but r$ = = |r$ | r Hence,
F = −k
e2 e2 r$ k ⋅ = − ⋅ r$ r3 r2 r
48 (b) Charge on first sphere, q1 = − 9 µC Charge on second sphere, q2 = 5 µC Charges on each sphere after they are kept in contact, q + q2 −9 + 5 q= 1 = 2 2 = − 2µC If n electrons are in excess on each sphere, then q 2 × 10−6 = 1.25 × 1013 n= = e 1.6 × 10−19 Therefore, 125 . × 1013 electrons are in excess on each sphere.
49 (d) Coulomb’s force is given by 1 q1q2 F= 4 πε 0 r 2
46 (a) We know that, surface density of charge is very large on the sharp ends of a conductor. This charge from pointed ends sets up a charged electric wind, to the near by charged clouds.
51 (b) Let FA = Force on charge at C due
∴ (10 × 10−3 ) × 10 =
(9 × 109 ) × q2 (0.6)2 (Q q1 = q2 = q)
or ⇒
10−1 × 0.36 = 4 × 10−12 q2 = 9 × 109 q = 2 × 10−6 C = 2µC
50 (a) On adding −2 C to both, one charge becomes neutral and hence Coulomb’s force get equals to zero.
FB + 1 µC
10 cm
A
∴ FA = 9 × 109 ×
– 1 µC B
10−6 × 2 × 10−6 = 1.8 N (10 × 10−2 )2
Similarly, FB = force on point C due to charge at B = 9 × 109 ×
10 −6 × 2 × 10 −6 = 1.8 N (10 × 10 −2 )2
∴Net force on C, Fnet = (FA )2 + (FB )2 + 2FAFB cos 120° = (1.8)2 + (1.8)2 + 2(1.8)(1.8)(−1/ 2) = 1.8 N
52 (c) There is no change in the restoring force as the electrostatic forces are the central forces. Negative and positive charges at the two extremities of the string affect tension T which does not affect the restoring force. +q
l
So that, the time period of bob is L T = 2π g
53 (b) When spheres are touched and separated, charge is 4 q − 2q 2q q′ = = =q 2 2 From Coulomb’s law, 1 (4 q)(−2q) F= 4 πε 0 r When made to touch, F′ =
1 q2 4 πε 0 r
From Eqs. (i) and (ii), we get F F′ = 8
…(ii)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
54 (d) By symmetry of problem, the components of forces on Q due to charges at A and B along y-axis will cancel each other while along x-axis will add up and will be along CO. Under the action of this force charge Q will move towards O. If at any time charge Q is at a distance x from O. A –q
Since, the restoring force F is not linear, motion will be oscillatory (with amplitude 2a) but not simple harmonic.
55 (c) From Coulomb’s law, the force of attraction between two charged particles (q), kept at distance r apart is F=
1 q2 4 πε 0 r 2
A
θ
O a
Q C
x 2a
B –q
F = 2F cosθ 1 − qQ x =2 × 4 πε 0 (a2 + x 2 ) (a2 + x 2 )1/ 2 1 2qQx i.e. F = 4 πε 0 (a2 + x 2 )3/ 2
=
B q
a
qq (2 − 1) = F 4 πε 0r2
56 (d) From Coulomb’s law, the force acting between two charges (q1 , q2 ) separated at a distance r is given by 1 q1 q2 F= 4 πε 0 r 2
q r
A
contact with sphere B having a charge q q. Therefore, charge on B and C is . 2 From Coulomb’s law, the force on C is (q / 2) (q / 2) q × q/ 2 − FC = 4 πε 0 (r / 2)2 4 πε 0 (r / 2)2
C
B
q
q/2
q/2
r/2
r/2
When two identical spheres are brought in contact, then charge on them is equalised, hence total charge on C is equally shared when brought in
Total force acting on charge Q is 1 qQ 1 4Q ⋅ Q + F= 4 πε 0 (l / 2)2 4 πε 0 (l )2 According to question, F = 0 ∴ ⇒
1 1 4Q 2 qQ + ⋅ =0 2 4 πε 0 (l / 2) 4 πε 0 (l )2 q= −Q
Topic 2 Electric Field 2019 1 Two parallel infinite line charges with linear charge densities +λ C/m and −λ C/m are placed at a distance of 2R in free space. What is the electric field mid-way between the two line charges? [NEET] 2λ λ N/C (b) N/C (a) πε 0 R πε 0 R λ (c) N/C (d) Zero 2πε 0 R
2018 2 An electron falls from rest through a vertical distance h in a uniform and vertically upward directed electric field E. The direction of electric field is now reversed, keeping its magnitude the same. A proton is allowed to fall from rest in it through the same vertical distance h. The time of fall of the electron, in comparison to the time of fall of the proton is [NEET] (a) 10 times greater (b) 5 times greater (c) smaller (d) equal
2017 3 A positively charged ball hangs from a silk thread. We put a positive test charge q 0 at a point and measure F / q 0 , then it can be predicted that the electric field strength E [JIPMER]
(a) > F / q 0 (c) < F / q 0
F (b) = q (d) Cannot be estimated
2016 4 The electric field strength due to a point charge of 5µC at a distance of 80 cm from the charge is (a) 5 × 104 N/C (b) 7 × 104 N/C 4 (c) 3.5 × 10 N/C (d) 7 × 102 N/C
[UP CPMT]
2015 5 The electric field in a certain region is acting radially outward and is given by E = Ar. A charge contained in a sphere of radius a centred at the origin of the field will be given by [CBSE AIPMT] (c) 4πε 0 Aa 3 (d) ε 0 Aa 3 (a) 4πε 0 Aa 2 (b) Aε 0 a 2
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ELECTROSTATICS I
2014 6 Electric field at a point of distance r from a uniformly charged wire of infinite length having linear charge density [Kerala CEE] λ is directly proportional to (d) r −2 (b) r (c) r 2 (a) r −1 (e) None of these
7 Two equal and opposite charges of masses m1 and m2 are accelerated in a uniform electric field through the same distance. What is the ratio of their accelerations, if their ratio of masses is m1 / m2 = 0.5 ? [KCET] a1 a1 a1 a1 (a) = 0.5 (b) = 1 (c) = 2 (d) =3 a2 a2 a2 a2
2013 8 Which one of the following graphs represents the variation of electric field strength E with distance rfrom the centre of a uniformly charged non-conducting sphere? [AIIMS] E
E
(a)
(b) O
R
E
O
r
R
r
R
r
E
(c)
(d) O
R
r
O
9 An electron enters uniform electric field maintained by parallel plates and of value E Vm −1 with a velocity v ms −1 , the plates are separated by a distance d metre, then acceleration of the electron in the field is [Manipal] − Ee Ee Ee d (b) (d) Ee (a) (c) m md m m 10 The insulation property of air breaks down when the electric field is 3 × 106 V/m. The maximum charge that can be given to a sphere of diameter 5 m is approximately [WB JEE] (a) 2 × 10−2 C (b) 2 × 10−3 C (c) 2 × 10−4 C (d) 2 × 10−5 C
2012 11 Assertion If the bob of a simple pendulum is kept in a horizontal electric field, its period of oscillation will remain same. Reason If bob is charged and kept in horizontal electric field, then the time period will be decreased. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
12 The unit of physical quantity obtained by the line integral of electric field is [J&K CET] (a) NC−1 (b) Vm −1 (c) JC−1 (d) C2 N−1 m −2 2010 13 A charged particle is free to move in an electric field. It will travel [BHU] (a) always along a line of force (b) along a line of force, if its initial velocity is zero (c) along a line of force, if it has same initial velocity in the direction of an active angle with the line of force (d) None of the above 14 An electron moving with the speed 5 × 106 m/s is shooted parallel to the electric field of intensity 1 × 103 N / C . Field is responsible for the retardation of motion of electron. Now, evaluate the distance travelled by the electron before coming to rest for an instant. (Mass of e = 9 × 10−31 kg and charge = 1.6 × 10−19 C) [BHU] (a) 7 m (b) 0.7 mm (c) 7 cm (d) 0.7 cm 15 A charged particle of mass mand charge q is released from rest in uniform electric field E. Neglecting the effect of gravity, the kinetic energy of the charged particle after t second is [BHU] Eq 2 M 2E 2t 2 (a) (b) mq 2t 2 Eqm E 2q2t 2 (c) (d) t 2m 16 The electric intensity outside a charged sphere of radius R at a distance r ( r > R ) is [MHT CET] σR 2 σr 2 (a) (b) ε 0 r2 ε0R 2 σr σR (d) (c) ε0R ε0r 17 The electric field that can balance a deuteron of mass [MHT CET] 3.2 × 10−27 kg is −10 −1 −8 −1 (a) 19.6 × 10 NC (b) 19.6 × 10 NC (c) 19.6 × 1010 NC −1 (d) 19.6 × 108 NC −1 18 An electron of mass mand charge q is accelerated from rest in a uniform electric field of strength E. The velocity acquired by it as it travels a distance l is [Manipal] 2Eql 2Eq Eq 2Em (a) (d) (b) (c) ql m ml ml 19 The distance between two charges 6 µC and 15 µC is 2 m. At what point on the line joining the two, the intensity will be zero? [OJEE] (a) At a distance 1 m from 6 µC (b) At a distance 1 m from 15 µC (c) At a distance 0.77 m from 6 µC (d) At a distance 0.77 m from 15 µC
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
20 A particle of mass 2 × 10−3 kg, charge 4 × 10−3 C enters in an electric field of 5 V/m, then its kinetic energy after 10 s is [OJEE] (a) 0.1 J (b) 1 J (c) 10 J (d) 100 J
27 The figure shows electric field E at a distance r in any direction from the origin O. The electric field E is due to [Haryana PMT, CG PMT] E E∝r
E∝
21 The figure shows some of the electric field lines corresponding to an electric field. The figure suggests O A
B
C
[OJEE]
(a) (b) (c) (d)
EA EA EA EA
> E B > EC . = E B = EC = EC > E B > EC > E B
22 The point charges Q and −2Q are placed some distance apart. If the electric field at the location of Q is E, then the electric field at the location of −2Q will be [AIIMS] E 3E (b) − (a) − 2 2 (c) −E (d) −2E q 23 Two point charges − q and + are situated at the origin and 2 at the point ( a, 0, 0) respectively. The point along the x-axis where the electric field vanishes is [Haryana PMT] a (a) x = (b) x = 2a 2 2a 2a (c) x = (d) x = 2−1 2+1 24 At what distance along the central axis of a uniformly charged plastic disc of radius R is the magnitude of the electric field equal to one-half the magnitude of the field at the centre of the surface of the disc? [UMMC] R R (b) (a) 2 3 (d) 3R (c) 2R
2009 25 If the linear charge density of a cylinder is 4 µCm −1 , then electric field intensity at point 3.6 cm from axis is [MHT CET] (b) 2 × 106 NC−1 (a) 4 × 105 NC−1 7 −1 (d) 12 × 107 NC−1 (c) 8 × 10 NC
26 The relation between electric field vector E, the displacement vector D and the polarisation vector P for a dielectric placed in electric field E is given by (a) P = ε 0 E + D (c) D = ε 0 E + P
[Haryana PMT, CG PMT]
(b) P = D + E (d) E = D + P
P
1 r2 r
(a) a charged hollow metallic sphere of radius OP with centre at O (b) a charged solid metallic sphere of radius OP with centre at O (c) a uniformly charged non-conducting sphere of radius OP with centre at O (d) a uniformly charged non-conducting hollow sphere of radius OP with centre at O 28 The magnitude of electric field balance an oil drop of mass m, carrying charge q is (g = acceleration due to gravity) [J&K CET] q mg mg (a) (b) 2 (c) mgq (d) m q q
29 One of the following is not a property of field lines [DUMET]
(a) Field lines are continuous curves without any breaks. (b) Two field lines cannot cross each other. (c) Field lines start at positive charges and end at negative charges. (d) They does not form closed loops.
30 An α-particle of mass 6.4 × 10−27 kg and charge 3.2 × 10−19 C is situated in a uniform electric field of 1.6 × 105 Vm −1 . The velocity of the particle at the end of 2 × 10−2 m path, when it starts from rest is [KCET] 5 −1 5 −1 (b) 8 × 10 ms (a) 2 3 × 10 ms (c) 16 × 105 ms −1 (d) 4 2 × 105 ms −1 31 A oil drop having a mass 4.8 × 10−10 g and charge 24 × 10−18 C stands still between two charged horizontal plates separated by a distance of 1 cm. If now the polarity of the plates is changed, instantaneous acceleration of the drop is ( take , g = 10 ms −2 ) [JCECE] (b) 10 ms −2 (a) 5 ms −2 (d) 20 ms −2 (c) 15 ms −2 32 A charged oil drop is suspended in uniform field of 3 × 104 V/ m, so that it neither falls nor rises. The charge on the drop will be (take, the mass of the charge = 9.9 × 10−15 kg and g = 10 m/s 2 ) [JIPMER] (a) 3.3 × 10−18 C (b) 3.2 × 10−18 C (c) 1.6 × 10−18 C (d) 4.8 × 10−18 C
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ELECTROSTATICS I
2008 33 The electric potential at a point in free space due to a
charge Q coulomb is Q × 1011 V. The electric field at that point is [CBSE AIPMT] (a) 4πε 0Q × 1022 Vm −1 (b) 12πε 0Q × 1020 Vm −1 (c) 4πε 0Q × 1020 Vm −1 (d) 12πε 0Q × 1022 Vm −1
34 A thin conducting ring of radius R is given a charge +Q. The electric field at the centre O of the ring due to the charge on the part AKB of the ring is E. The electric field at the centre due to the charge on the part ACDB of the ring is [CBSE AIPMT] A K C
B
O
D
(a) 3E along KO (b) E along OK (c) E along KO (d) 3E along OK 35 Charge q is uniformly distributed over a thin half ring of radius R. The electric field at the centre of the ring is q q (b) (a) [AIIMS] 2 2 2 2π ε 0 R 4π ε 0 R 2 q q (d) (c) 2 4πε 0 R 2πε 0 R 2
36 Figure below show regular hexagons, with charges at the vertices. In which case, the electric field at the centre zero? [BHU] q
q
q
(a) q
q q –2q
q
–2 q
2q q 2q
q –q
q
(c) q –2q
(b)
(d)
–q
–q –q
q
2q 2q
q
37 How does the electric field (E) between the plates of a charged cylindrical capacitor vary with the distance r from the axis of the cylinder?E [Manipal] 1 1 (b) E ∝ (a) E ∝ 2 r r (c) E ∝ r 2 (d) E ∝ r
38 Consider a thin spherical shell of radius R consisting of uniform surface charge density σ. The electric field at a point of distance x from its centre and outside the shell is (a) inversely proportional to σ [J&K CET] (b) directly proportional to x 2 (c) directly proportional to σ (d) inversely proportional to x 2
2007 39 Two spheres of radii R1 and R 2 respectively are charged and joined by a wire. The ratio of electric fields of spheres is [RPMT] R 22 R12 (b) 2 (a) 2 R1 R2 R R (d) 1 (c) 2 R1 R2
40 Two unlike charges of the same magnitude Q are placed at a distance d. The intensity of the electric field at the middle point in the line joining the two charges is [J&K CET] 8Q (a) zero (b) 4πε 0 d 2 6Q 4Q (c) (d) 2 4πε 0 d 4πε 0 d 2 41 Two parallel plates have equal and opposite charge. When the space between them is evacuated, the electric field between the plates is 2 × 105 V m −1 . When the space is filled with dielectric, the electric field becomes 1 × 105 Vm −1 . The dielectric constant of dielectric material is [Punjab PMET] (a) 1/2 (b) 1 (c) 2 (d) 3 42 The potential of the electric field produced by point charge at any point ( x, y, z ) is given by V = 3x 2 + 5, where x, y are in metre and V is in volt. The intensity of the electric field at ( −2, 1, 0) is [KCET] (a) + 17 Vm −1 (b) −17 Vm −1 (c) + 12 Vm −1 (d) −12 Vm −1 43 A point charge q produces an electric field of magnitude 2 NC −1 at a point distance 0.25 m from it. What is the value of charge? [BVP] 11 −11 (b) 1.39 × 10 C (a) 1.39 × 10 C (d) 13.9 × 1011 C (c) 13.9 × 10−11 C 44 A solid metallic sphere has a charge + 3 Q. Concentric with this sphere is a conducting spherical shell having charge − Q. The radius of the sphere is a and that of the spherical shell is b( b > a ). What is the electric field at a distance [BCECE] R ( a < R < b ) from the centre? 4Q 3Q 3Q Q (a) (b) (c) (d) 2πε 0 R 2πε 0 R 2 4πε 0 R 2 2πε 0 R 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2006 45 The spatial distribution of the electric field due to charges ( A , B ) is shown in figure. Which one of the following statements is correct? [AIIMS]
A
48 Which of the following plots represents the variation of the electric field with distance from the centre of a uniformly charged non-conducting sphere of radius R? [BCECE]
(a)
B
E
(b)
E
1/r 2
(a) (b) (c) (d)
A is positive and B negative | A | > | B | A is negative and B positive | A | = | B | Both are positive but A > B Both are negative but A > B
O
46 A cube has point charges of magnitude −q at all its vertices. Electric field at the centre of the cube is [RPMT] 1 6q 1 8q (a) (b) 4πε 0 3a 2 4πε 0 a 2 1 −8q (c) zero (d) 4πε 0 a 2
(c)
Fe m p = F p me
(d)
O
r
R
E 1/r
(d)
2
O
E r
1/r 2
R
O
r
r
R
1/r 2
R
r
2005 49 Two infinitely long parallel conducting plates having
surface charge densities + σ and − σ respectively, are separated by a small distance. The medium between the plates is vacuum. If ε 0 is the dielectric permittivity of vacuum, then the electric field in the region between the plates is [AIIMS] σ −1 (a) 0 (b) Vm 2ε 0 σ 2σ (c) (d) Vm −1 Vm −1 ε0 ε0
47 Forces exerted by a uniform electric field on an electron having mass me and proton of mass m p are represented as [J&K CET] Fe and Fp respectively are related as Fe me (a) F p = Fe (b) = F p mp (c)
1/r 2
Fe me2 = F p m2p
Answers 1 (b)
2 (c)
3 (a)
4 (b)
5 (c)
6 (a)
7 (c)
8 (c)
9 (a)
10 (b)
11 (a)
12 (c)
13 (b)
14 (c)
15 (c)
16 (a)
17 (b)
18 (a)
19 (c)
20 (c)
21 (c)
22 (a)
23 (c)
24 (b)
25 (b)
26 (c)
27 (c)
28 (d)
29 (d)
30 (d)
31 (d)
32 (a)
33 (a)
34 (b)
35 (a)
36 (a)
37 (a)
38 (d)
39 (c)
40 (b)
41 (c)
42 (d)
43 (a)
44 (b)
45 (a)
46 (c)
47 (a)
48 (d)
49 (c)
Explanations 1 (b) Consider two infinite line charges with linear charge densities + λ C/m and − λ C/m respectively, which are lying in y-direction as shown in the figure below +λ + + + + + + + A
2R
–λ EB – EA – – – R – – – B
Then, the electric field due to line A at the mid-way between the two line charges, i.e. at R is λ … (i) | EA | = N/C 2πε 0R
Due to negative charge on B, EB also lies along +ve x-axis (inward), i.e. from A to B. So, the resultant electric field at R is given as
which lies along +ve x-axis (outward), i.e. from A to B. Similarly, the electric field due to line B at the mid-way between the two line charges, i.e. at R is λ …(ii) | EB | = N/C 2πε 0R
| ER | = | EA | + | EB | Substituting the values from Eqs. (i) and (ii), we get λ λ λ | ER | = + = N/C 2πε 0R 2πε 0R πε 0R which also lies along the + ve x-axis, i.e. from A to B.
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ELECTROSTATICS I
2 (c) Force on a charged particle in the presence of an electric field is given as …(i) F = qE where, q is the charge on the charged particle and E is the electric field. From Newton’s second law of motion, force on a particle with mass m is given as …(ii) F = ma where, a is the acceleration. From Eqs. (i) and (ii), we get F = ma = qE qE …(iii) ⇒ a= m Now, consider that a particle falls from rest through a vertical distance h. Therefore, u = 0 and the second equation of motion becomes 1 s = ut + at 2 2 1 1 qE 2 or h = 0 × t + at 2 = × t 2 2 m [from Eq. (iii)] ⇒
2hm or t = t = qE 2
2hm qE
Since, the particles given in the question is electron and proton and the quantity 2h / qE (here, qp = qe = e) for both of them is constant. Thus, we can write t=k m 2h qE
where,
k=
or
t∝ m
As, mass of proton (mp ) >> mass of electron (me ). Thus, the time of fall of an electrons would be smaller than the time of fall of a protons.
3 (a) Due to presence of test charge q0 in front of positively charged ball, there would be a redistribution of charge on the ball. In the redistribution of charge, there will be less charge on front half surface and more charge on the back half surface. As a result, the net force F between ball and charge will decrease, i.e. the electric field is decreased. Thus, actual electric field will be greater than F / q0.
4 (b) Given, q = 5µC = 5 × 10− 6 C r = 80 cm = 80 × 10− 2 m
10 (b) The electric field due to charge q on
Electric field strength, 1 q E= ⋅ 4 πε 0 r2 5 × 10− 6 (80 × 10− 2 )2
⇒
E = 9 × 109 ×
⇒
E = 7.0 × 104 N/C E = Ar
5 (c) Given,
…(i)
sphere is given by, 1 q E= 4 πε 0 r2 E = 3 × 106 V / m,
Given, ∴
r = (5 / 2) m = 2.5 m q 1 3 × 10 = 4 πε 0 (2. 5)2 6
⇒ 9 × 109 q = 6.25 × 3 × 106 q = 2 × 10−3 C
∴ q
Here,
r=a
⇒
E=
a
1 q ⋅ 4 πε 0 a2
From Eq. (i), 1 q ⋅ = Aa 4 πε 0 a2 ⇒ q = 4 πε 0 Aa3
6 (a) We know that, electric field at distance r from an infinitely long line charge is given by λ E= 2πε 0r ⇒
λ = 2πε 0 ⋅ rE E ∝ r− 1
7 (c) We know that,
…(i) F1 = q1E = m1a1 …(ii) F2 = q2E = m2a2 From Eqs. (i) and (ii), we get a1 F1 / m1 F ⋅ m2 = [Q F1 = F2 ] = a2 F2 / m2 F ⋅ m1 ⇒ ⇒
a1 m2 10 1 = = = =2 a2 m1 0.5 5 a1 =2 [Q m1 / m2 = 0.5 ] a2 k ⋅q r2 = constant = k ⋅ q/ R 2
8 (c)Q Ein ∝ r, Eout = and Esur
Graph (c) correctly represents the variation of electric field intensity due to a uniformly charged non-conducting sphere.
9 (a) We know that, F = eE Therefore, acceleration in electron due to force F F eE a= = m m
11 (a) When the bob is placed in an electric field, the time period of simple pendulum will remain same as the bob is not charged. If simple pendulum having charged bob is placed in a horizontal electric field, then the period will be decreased because there will be an increase in restoring force. So, option (a) is correct. It means that both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
12 (c) The unit of physical quantity obtained by the line integral of electric field is JC−1. dV Q E=− dl W − ∫ Edl = V = ⇒ q
13 (b) Because E point is along the tangent to the lines of force. If initial velocity is zero, then due to the force, it moves in the direction of E.
14 (c) Electric force, qE = ma ⇒
a=
qE 1.6 × 10−19 × 1 × 103 = m 9 × 10−31
Given,
1.6 × 1015 ms−2 9 u = 5 × 106 and v = 0
∴ From
v 2 = u2 − 2as ⇒ s = u2 / 2a
=
(5 × 10 6)2 × 9 2 × 1.6 × 1015 = 0.07 m = 7 cm
∴ Distance, s =
15 (c) When charge q is released in uniform electric field E, then its qE acceleration a = (constant) m So, its motion will be uniformly accelerated motion and its velocity after t second is given by qE v = at = t m
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
The KE of charged particle, 2 1 1 qE q2E 2t 2 KE = mv 2 = m t = 2 m 2m 2
21 (c) Electric field intensity at a
16 (a) The electric intensity outside a charged sphere, kq k (σA ) E= 2 = r r2 1 σ 4 πR 2 σR 2 = = 4 πε 0 r2 ε 0 r2
17 (b) As, E =
18
−27
F mg 3.2 × 10 × 9.8 = = q q . × 10−19 16
As, density of electric line of force in region A andC are more as compare to B. Hence, EA > EB …(ii) From Eqs. (i) and (ii), we get EA = EC > EB
qEl ⇒v = m
of Q1
23
2qEl m
19 (c) EA = Electric field at C due to charge at A and EB = Electric field at C due to charge at B. C
A
2m
qA =6 µC x
2 × 4 × 10−6 36 × 10−3 6 −1 = 2 × 10 NC
= (9 × 109 )
26 (c) Relation between electric field
E = K (−2Q ) / r2
Electric field of Q at the location of −2Q Q E E′ = K 2 = − 2 r (c) Suppose the field vanishes at a distance x, we have kq kq/2 = x 2 (x − a)2
27
vector (E) , displacement vector (D) and polarisation vector (P) for a dielectric placed in an electric field is given as D = ε 0E + P. (c) Electric field due to a uniformly charged non-conducting sphere of radius R is found to be as, For a point r (i.e. r ≤ R) ⇒ E∝r For a point r (i.e. r > R) Hence, OP = R E
Y
E∝r
B qB =15 µC 2– x
As per question, EA + EB = 0 or | EA | = | EB | 1 qA 1 qB = 2 4 πε 0 x 4 πε 0 (2 − x )2 qA qB (2 − x )2 qB = = ⇒ qA x2 x 2 (2 − x )2 2
15 2 − x = x 6 15 2 ⇒ − 1 = x 6
close to the cylinder with linear charge distribution λ is given as λ 1 1 2λ E= = 2πε 0 r 4 πε 0 r
22 (a) Electric field of −2Q at the location
= 19.6 × 10−8 NC −1 qE , s = l and v = ? (a) Here, u = 0, a = m v 2 = u2 + 2as v2 = 0 + 2
25 (b) Electric field intensity at a point
particular point is directly proportional to the number of electric line of forces crossing per unit area. …(i) EA = EB
q/ 2
(–q)
Z
2(x − a)2 = x 2
⇒
2(x − a) = x x=
2a 2 −1
20 (c) Force on a charge placed inside an electric field given as F = qE ⇒ ma = qE ⇒ a = qE / m qE dv qE ⇒ = ⇒ dv = m dt m Integrating with proper limits, v t qE ∫0 dv = ∫0 m dt 1 Now, v = qE (t ) m 1 1 q2E 2t 2 KE = mv 2 = m 2 2 m2 2 2 2 1 qEt (4 × 10–3 )2 × 52 × 102 = = 2 m 2 × 2 × 10–3 = 10 J
form closed loops.
charged disc at a distance x above the centre of the disc, the magnitude of the electric field is x σ E= 1 − 2 2 2ε 0 x + R E 1 σ But such that = Ec = Ec 2 2ε 0 1 x Then, 1 − = x2 + R2 2 ⇒
x x2 + R2
=
1 2
30 (d) Force on a charged particle placed in a uniform electric field is given as F = qE ⇒ ma = qE ⇒ a = qE / m From equation of motion, v 2 = u2 + 2as = (0)2 + 2as ⇒
2qE s m
2 × 3.2 × 10 −19 × 1.6 × 10 5 × 2 × 10 −2 6.4 × 10 −27
v = 4 2 × 105 m/s
⇒
31 (d) Case I When oil drop is in equilibrium, Negative plate F = Eq
E
2
x R R + = 4 4 3 R x= 3
x2 = ⇒
2
v=
=
Squaring both sides and multiplying by x 2 + R 2 to obtain 2
r
28 (d) As per question,
29 (d) Electric lines of force does not
24 (b) At a point on the axis of uniformly ⇒ x = 0.77 m
P
O
Weight of oil drop = Electrostatic force ⇒ mg = qE mg ⇒ E= q
⇒ ( 2 − 1) x = 2a ⇒
1 r2
X
(0, 0, 0) (a, 0, 0) x
⇒
E∝
q mg Positive plate
i.e.
mg = Eq
…(i)
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ELECTROSTATICS I
The fields at O due to AC and BD cancel each other.
Case II When the polarity are reversed,
The field due to CD is acting in the direction OK and equal in magnitude to E due to AKB.
Positive plate F = Eq
E
q Charge on dl = λRdθ λ = πR
Negative plate
mg + Eq = ma [from Eq. (i)] ma = 2mg a = 2g ⇒ a = 20 ms−2
i.e.
32 (a) In steady state,
dl
θ dE
…(i)
=
C
O
q
q
q
37 (a) Electric field due to outer plate is
38
zero and so the electric field due to inner cylindrical charged conductor varies inversely as the distance from the axis. (d) Electric field at a distance x from the centre 1 q 1 ⇒ E∝ 2 E= 4 πε 0 x 2 x
39 (c) When two spheres are joined, Hence, electric potential is same.
D
R2
q1 R12 q2 R22
2
⇒
E1 q1 R2 = E2 q2 R1
or
E1 R1 R2 R = = 2 E2 R2 R1 R1
…(ii)
–Q
d/2
A
B d
C
Electric field at centre (B) due to + Q charge, 1 (Q ) E1 = 4 πε 0 d 2 2 Similarly, electric field due to −Q charge, 1 (Q ) E2 = 4 πε 0 (d / 2)2 Therefore, net electric field at point 1 4Q 1 4Q + E = E1 + E2 = 2 4 πε 0 d 4 πε 0 d 2 1 8Q = 4 πε 0 d 2
41 (c) K =
Ewithout Ewith
dielectric
dielectric
=
2 × 105 =2 1 × 105
42 (d) Potential, (V ) = 3x 2 + 5 Intensity of the electric field dV = = 6x dx = 6 (−2) (E at x = − 2) = − 12 Vm −1
43 (a) Electric field, E = R1
Q+/4
…(i)
placed at a distance d.
q
(a), the fields due to charges at the opposite q corners cancel each other. So, in this case, net q electric field at the centre will be zero.
B
Q+/4
q1 q2 = R1 R2
+Q
2kλ q 2kλ cosθdθ = = R ∫0 R 2π 2ε 0R 2 q Q λ = and l = 2π R l
charge flows till it equalizes. K + Q /4
⇒
40 (b) Two equal and opposite charges are
π/2
36 (a) In the case
34 (b) As the ring is conducting, so
A
V1 = V2 1 q1 1 q2 = 4 πε 0 R1 4 πε 0 R2
[from Eq. (i)]
0
electric field at its centre is zero, i.e. Etotal = 0 or EAKB + EACDB = 0 or EACDB = − EAKB or EACDB = − E (along KO ) Therefore, the electric field at the centre due to the charge on the part ACDB of the ring is E along OK. Alternative Method As the ring is conducting, so electric field at its centre is zero,
∴
2
π /2
4 πε 0 × (Q × 1011 )2 4 πε 0V 2 = Q Q = 4 πε 0Q × 1022 Vm −1
Q /4
dE cosθ
Total field at centre = 2∫ dE cosθ
E=
+
R
k ⋅ λRd θ dE = R2 We need to consider only the component dE cosθ , as the component dE sinθ will cancel out.
33 (a) At any point, electric potential due
where, r is the distance of observation point from the charge. At the same point, electric field is 1 Q …(ii) ⋅ E= 4 πε 0 r 2 Combining Eqs. (i) and (ii), we have
B
Electric field at centre due to dl is
mg
= 3.3 × 10−18 C to charge Q is 1 Q V = ⋅ 4 πε 0 r
A
1 E1 4 πε 0 Ratio of electric fields, = 1 E2 4 πε 0
θ dθ
F = qE
electric force on drop = weight of drop ∴ qE = mg mg ⇒ q= E 9.9 × 10−15 × 10 = 3 × 104
q2
r
35 (a) From figure, dl = Rdθ
q mg
q1
q 9πε 0r2
(0.25)2 × 2 9 × 109 −11 = 139 . × 10 C
q = 4 πε 0r2E =
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
opposite to it. So, the net electric field at centre of the cube is zero.
44 (b) The electric field inside a spherical
shell is everywhere zero, i.e. is E = 0. But point P is outside the inner sphere, hence for a point very close to the surface the intensity of electric field is given by
–q
–q
–q
–q –q
–q
The electric field intensity at a point lying inside the sphere is qr or E ∝ r …(iii) E= 4 πε 0R 3 Also, at the centre of sphere, r = 0. Hence, E = 0. The graphical distribution is shown below
–Q 3Q
a
–q
R b
1 q 4 πε 0 R 2 q = + 3Q
Therefore, E =
1 3Q 4 πε 0 R 2
45 (a) Electric lines of force usually start (i.e. diverge out) from positive charge and end (i.e. converge) on negative charge or extends to infinity. Thus, A is positive charge and B is negative charge. Also, density of lines at A is more than that at B, i.e. | A | > | B | .
46 (c) Clearly, the electric field of each point charge is equal and opposite to the electric field of charge diagonally
E
47 (a) The force (F ) on charge q due to
E=
Given,
–q
48
electric field strength E is F = qE Here, E is uniform, hence Fp = Fe. (d) The electric field intensity at a point lying outside the sphere (non-conducting) is 1 q E= 4 πε 0 r 2 where, r is the distance of that point from centre of sphere. 1 …(i) E∝ 2 ∴ r The electric field intensity at surface of sphere, q 1 or E ∝ 2 …(ii) E= 2 4 πε 0R R where R, being the radius of sphere.
E∝r E∝ 1 r2
O
r=R r
49 (c) Between the plates, i.e. in the region II as shown in figure, electric field is given by +σ
–σ (II)
(I)
(III)
1 (σ 1 − σ 2 ) 2ε 0 1 σ = × 2σ = Vm −1 ε0 2 ε0
E=
Topic 3 Electric Dipole 2016 1 An electric dipole is placed at an angle of 30° with an
electric field intensity 2 × 105 N/C. It experiences a torque equal to 4 N-m. The charge on the dipole, if the dipole length is 2 cm, is [NEET] (a) 8 mC (b) 2 mC (c) 5 mC (d) 7 µC
2014 2 An electric dipole of dipole moment p is placed in a uniform external electric field E. Then, the [Kerala CEE] (a) torque experienced by the dipole is E × p (b) torque is zero, if p is perpendicular to E (c) torque is maximum, if p is perpendicular to E (d) potential energy is maximum, if p is parallel to E (e) potential energy is maximum, if p is perpendicular to E 3 An electric dipole placed in a non-uniform electric field experiences [UK PMT] (a) both a torque and a net force (b) only a force but no torque (c) only a torque but no net force (d) no torque and no net force
2012 4 An electric dipole of moment p is placed in an electric field of intensity E. The dipole acquires a position such that the axis of the dipole makes an angle θ with the direction of the field. Assuming that the potential energy of the dipole to be zero when θ = 90°, then the torque and the potential energy of the dipole will respectively be [CBSE AIPMT] (a) pE sin θ, − pE cos θ (b) pE sin θ, − 2 pE cos θ (c) pE sin θ, 2 pE cos θ (d) pE cos θ, − pE sin θ
2011 5 An electric dipole is placed in an uniform electric field with
the dipole axis making an angle θ with the direction of the electric field. The orientation of the dipole for stable equilibrium is [J&K CET] (a) π/6 (b) π/3 (c) 0 (d) π/2
6 The electric field at a point due to an electric dipole, on an axis inclined at an angle θ(< 90° ) to the dipole axis, is perpendicular to the dipole axis, if the angle θ is [KCET] (a) tan −1 ( 2) (b) tan −1 (1/ 2) (d) tan −1 (1/ 2 ) (c) tan −1 ( 2 )
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ELECTROSTATICS I
2010 7 The electric field and the potential of an electric dipole vary with distance r as 1 1 (a) and 2 r r 1 1 (c) 2 and 3 r r
[Manipal]
1
1 (b) 2 and r r 1 1 (d) 3 and 2 r r
8 An electric dipole of moment p is placed in a uniform electric field E. Then, [Kerala CEE] (i) the torque on the dipole is p × E . (ii) the potential energy of the system is p⋅ E . (iii) the resultant force on the dipole is zero. (a) (i), (ii) and (iii) are correct (b) (i) and (iii) are correct and (ii) is incorrect (c) Only (i) is correct (d) (i) and (ii) are correct and (iii) is incorrect (e) (i), (ii) and (iii) are incorrect 9 The electric dipole moment of an electron and a proton 4.3 nm apart is [DUMET] −28 −29 2 (a) 6.88 × 10 C-m (b) 2.56 × 10 C -m −1 (d) 1.1 × 10−46 C2 -m (c) 3.72 × 10−14 C-m −1 10 Let E a be the electric field due to a dipole in its axial plane distant l and E q be the field in the equatorial plane distant [JCECE] l ′, then the relation between E a and E q will be (a) E a = 4E q (b) E q = 2E a (c) E a = 2E q (d) E q = 3E a
2008 11 The direction of electric field intensity ( E) at a point on the equatorial line of an electric dipole of dipole moment (p) is [Kerala CEE]
(a) along the equatorial line towards the dipole (b) along the equatorial line away from the dipole (c) perpendicular to the equatorial line and the opposite to p (d) perpendicular to the equatorial line and parallel to p (e) along the axial line in the direction of p
12 An electric dipole of moment p is lying along a uniform electric field E. The work done in rotating the dipole by 90° is [Haryana PMT] pE (c) 2 pE (d) pE (b) (a) 2 pE 2 13 An electric dipole has a pair of equal and opposite point charges q and −q are separated by a distance 2 x. The axis of the dipole is defined as [J&K CET] (a) direction from positive charge to negative charge (b) direction from negative charge to positive charge (c) perpendicular to the line joining the two charges drawn at the centre and pointing upward direction (d) perpendicular to the line joining the two charges drawn at the centre and pointing downward direction
14 The dipole moment of a dipole in an uniform external field E is p, then the torque ( τ ) acting on the dipole is [J&K CET] (a) τ = p × E (b) τ = p ⋅ E (c) τ = 2 ( p + E) (d) τ = ( p + E) 2007 15 Three point charges + q, −2q and +q are placed at points ( x = 0, y = a, z = 0), ( x = 0, y = 0, z = 0)and ( x = a, y = 0, z = 0), respectively. The magnitude and direction of the electric dipole moment vector of this charge assembly are (a) 2qa along + y-direction [CBSE AIPMT] 2qa along the line joining points ( x = 0, y = 0, z = 0) and ( x = a, y = a, z = 0) (c) qa along the line joining points ( x = 0, y = 0, z = 0) and ( x = a, y = a, z = 0) (d) 2qa along +x-direction
(b)
16 An electric dipole consists of two opposite charges each 0.05µC separated by 30 mm. The dipole is placed in an uniform external electric field of 106 NC−1 . The maximum torque exerted by the field on the dipole is [Kerala CEE] (b) 3 × 10−3 Nm (a) 6 × 10−3 Nm (c) 15 × 10−3 Nm (d) 1.5 × 10−3 Nm −3 (e) 9 × 10 Nm 17 An electric dipole coincides on z-axis and its mid-point is on origin of the co-ordinate system. The electric field at an axial point at a distance z from origin is E( z ) and electric field at an equatorial point at a distance y from origin is E( y) . E( z ) Here z = y > a, so = .. . E( y) (a) 1 (b) 4 (c) 3
[Guj CET]
(d) 2
2006 18 A charge is situated at a certain distance along the axis of an electric dipole experience a force F. If the distance of the charge from the dipole is doubled, then the force acting on it will become [BHU] F F F (c) (d) (a) 2F (b) 2 4 8 19 What is the angle between the electric dipole moment and the electric field strength due to it on the equatorial line ? [Punjab PMET] (a) 0° (b) 90° (c) 180° (d) None of these
2005 20 The electric field due to an electric dipole at a distance r from its centre in axial position is E. If the dipole is rotated through an angle of 90° about its perpendicular axis, the electric field at the same point will be [J&K CET] E E (c) (d) 2E (a) E (b) 4 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 (b)
2 (c)
3 (a)
4 (a)
5 (c)
6 (c)
7 (d)
8 (a)
9 (a)
10 (c)
11 (c)
12 (d)
13 (b)
14 (a)
15 (b)
16 (d)
17 (d)
18 (d)
19 (c)
20 (c)
Explanations 1 (b)Q Torque on an electric dipole in an electric field, ⇒ | τ | = pE sin θ where, θ is angle between E and p. ⇒ 4 = p × 2 × 105 × sin 30 ⇒ ∴
p = q2l q2l = 4 × 10−5
U = − ∫ τ dθ = − ∫
E –q +q
2 (c) Torque on dipole, τ = pE sin θ
3 (a) Consider the diagram, where an electric dipole is placed in non-uniform electric field. F1
d O F2
Electric field at the sight of q is E1 and electric field at the sight of −q is E2. F1 = force on the charge q = qE1 F2 = force on the charge − q = − qE2 Net force on the dipole, F = F1 + F2 = q (E1 − E2 ) ∴ |E1 | ≠ |E2 | ⇒ |F | ≠ 0 τ 1 = torque on the dipole due to E1 = p × E1 (clockwise) τ 2 = torque on the dipole due to E2 = p × E2 (clockwise) 1 where, p = qd is dipole moment of the dipole. 2 τ net = τ 1 + τ 2 = p × E1 + p × E2 ≠ 0
1 tan θ 2 ⇒ tan θ = 2 tan α = 2 tan (90°− θ ) ⇒ tan 2 θ = 2 ⇒ tanθ = 2 tan α =
…(ii)
θ = tan −1 ( 2 )
they are equal. The components normal to dipole axis cancel away, but along dipole axis add up. Hence, the total electric field E and p is opposite to dipole moment vector p.
12 (d) When an electric dipole is placed in
an electric field E, a torque τ = p × E acts on it. This torque tries to rotated the dipole through an angle θ. If the dipole is rotated from an angle θ 1 to θ 2, then work done by external force is given by W = pE (cosθ 1 − cosθ 2 ) …(i)
7 (d) Electric field and electric potential at a general point at a distance r from the centre of the dipole is 1 p (3 cos2 θ + 1) Eg = 4 πε 0 r3 1 p cosθ 4 πε 0 r2
8 (a) The torque acting on a dipole is
given by τ = p × E, the potential energy of the dipole is given by − U = − p⋅ E and the resultant force on the dipole is zero.
9 (a) The electric dipole moment is equal to
Ea
due to the two charges + q and −q are given by q E+ q = 4 πε 0 (r2 + a2 ) q and E− q = 4 πε 0 (r2 + a2 )
θ
Vg =
Eq p
11 (c) The magnitudes of electric fields
α
and
+q
From Eqs. (i) and (ii), we get Ea = 2 Eq α
⇒
l r
Now, similarly 1 p N/C Eq = 4 πε 0 r3
τ = pE sin θ =0
E
⇒
l
r
6 (c) Here, α + θ = 90°
The direction of torque is perpendicular to the plane of paper inwards, i.e. when the dipole is parallel or anti-parallel to E and maximum at θ = 90°. So, torque is maximum, if p is perpendicular to E.
–q
–q
should be zero.
⇒ 2 × 10−3 C = 2 mC
F1
pE sin θ
= pE [cosθ 1 − cos θ 2 ] = − pE(cos 90°− cosθ ) = − pE cosθ
4 × 10−5 q= 2 × 10−2
q
θ2 θ1
5 (c) For stable equilibrium, the angle θ
where, 2l = 2 cm = 2 × 10− 2 m
F2
on the axis of dipole is given by 1 2p …(i) Ea = . N/C 4 πε 0 r3 where, p is dipole moment. Intensity of electric field at a point on the equatorial line of dipole is given below
Potential energy of the dipole,
p = 4 × 10−5 cm
∴
10 (c) Intensity of electric field at a point
4 (a) Here, torque τ = pE sin θ
τ = p× E
⇒
Hence, both torque (τ net ) and force (F ) act on the dipole.
p = 1.6 × 10−19 × 4.3 × 10−9 [Q p = q × 2l ] = 6.88 × 10− 28 C-m
13
Putting θ 1 = 0° , θ 2 = 90° in the Eq. (i), we get W = pE (cos 0° − cos 90° ) = pE(1 − 0) = pE (b) Axis of an electric dipole is always directed from negative charge to the positive charge.
14 (a) Torque (τ ) acting on the dipole in an uniform external field E τ = Either force × Perpendicular distance = qE × 2a sinθ = (q × 2a) × E sin θ = pE sinθ or τ = p × E
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ELECTROSTATICS I
15 (b) Choose the three coordinate axes as x , y and z and plot the charges with the given coordinates as shown Y
| Ez | = For z >> a, | Ez | =
(0,a,0) q
P (a,a,0)
p a
q (a,0,0)
X
For
Z
O is the origin at which −2q charge is placed. The system is equivalent to two dipoles along x and y-directions, respectively. The dipole moments of two dipoles are shown in figure. The resultant dipole moment will be directed along OP, where P ≡ (a, a, 0). The magnitude of resultant dipole moment is p′ =
2
2
2
p + p = (qa) + (qa)
= 2qa
16 (d) Given, q = 0.05 µC = 5 × 10−8 C, 2a = 30 mm = 0.03 m and E = 106 NC−1 Torque acting on an electric dipole placed in an uniform electric field, τ = pE sin θ For maximum torque, θ = 90° ∴ τ max = pE = E (q × 2a) = 106 × 5 × 10−8 × 0.03 = 1. 5 × 10−3 N-m
17 (d) The magnitude of electric field at an axial point M at a distance z from the origin is given by Y
y –q
O (0,0) +q M 2a z
For
1 p ⋅ 4 πε 0 y3
r from electric dipole is E=
1 2p ⋅ 4 πε 0 r 3
(axial line)
where, p is dipole moment and r is the distance of charge from centre of dipole. 1 or E∝ 3 r Force on charge, F = QE 1 or F∝ 3 r F2 r1 = F1 r2
The direction of electric field is from positive charge to negative charge. As it is clear from the figure, the direction of electric field intensity at a point on the equatorial line of the dipole is opposite to the direction of dipole moment. Hence, angle between them is 180°.
20 (c) When a dipole AB of very small length is taken, then for a point P located at a distance r from the axis the electric field is given by 1 2p …(i) ⋅ E= 4 πε 0 r 3 –q
3
P +q r
O
where, p is dipole moment. When dipole is rotated by 90°, then electric field is given by –q
Given, r1 = r, r2 = 2r and F1 = F
r
3
∴
Electric dipole moment
+q
2l
1 F2 r = = 8 F 2r F F2 = 8
19 (c) An electric dipole is a system Z
P
z = y >> a,
18 (d) The electric field at a point distance
∴
Electric field (E)
–q
| Ez | =2 |E y |
2
The product of one charge and the distance between the charges is called electric dipole moment. The electric dipole moment is a vector quantity whose direction is along the axis of the dipole pointing from the negative charge to the positive charge.
y >> a, |E y | =
⇒
N
2p 4 πε 0z3
and magnitude of electric field at a equatorial point N at a distance y from origin (0, 0) is given by p |E y | = 2 4 πε 0 ( y + a2 )3/ 2
a p –2q (0,0,0) O
1 2 pz ⋅ 4 πε 0 (z2 − a2 )2
formed by two equal and opposite point charges placed at a short distance apart.
P
+q
E′ =
1 p ⋅ 4 πε 0 r 3
…(ii)
From Eqs. (i) and (ii), we get E E′ = 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 4 Electric Flux and Gauss’ Theorem 2019 1 A hollow metal sphere of radius R is uniformly charged. The electric field due to the sphere at a distance r from the centre [NEET] (a) zero as r increases for r < R, decreases as r increases for r > R (b) zero as r increases for r < R, increases as r increases for r > R (c) decreases as r increases for r < R and for r > R (d) increases as r increases for r < R and for r > R
2 Two metal spheres, one of radius R and the other of radius 2R respectively have the same surface charge density σ. They are brought in contact and separated. What will be the new surface charge densities on them? [NEET Odisha] 5 5 (a) σ P = σ , σ Q = σ 6 2 5 5 (b) σ P = σ , σ Q = σ 2 6 5 5 (c) σ P = σ , σ Q = σ 2 3 5 5 (d) σ P = σ , σ Q = σ 3 6 3 A sphere encloses an electric dipole with charge ± 3 × 10−6 C. What is the total electric flux across the sphere? [NEET Odisha] (a) − 3 × 10−6 N-m 2 /C (b) Zero (c) 3 × 106 N-m 2 /C (d) 6 × 10−6 N-m 2 /C
2012 6 In a region, the intensity of an electric field is given by E = 2i$ + 3$j + k$ in NC −1 . The electric flux through a [WB JEE] surface S = 10 $i m 2 in the region is 2 −1 2 −1 (a) 5 Nm C (b) 10 Nm C (c) 15 Nm 2 C −1 (d) 20 Nm 2 C −1
2011 7 There exists an electric field of 1 N/C along y-direction. The flux passing through the square of 1 m placed in [J&K CET] xy-plane inside the electric field is (a) 1.0 Nm 2 C−1 (b) 10.0 Nm 2 C−1 (c) 2.0 Nm 2 C−1 (d) zero
8 A charge Q is enclosed by a Gaussian spherical surface of radius R. If the radius is doubled, then the outward electric flux will [CBSE AIPMT] (a) be reduced to half (b) remain the same (c) be doubled (d) increase four times 9 A square surface of side L metre in the plane of the paper is placed in a uniform electric field E (volt/metre) acting along the same plane at an angle θ with the horizontal side of the square as shown in figure. The electric flux linked to the surface in unit of Nm 2 C−1 is [CBSE AIPMT]
L
2014 4 What is the nature of Gaussian surface involved in Gauss’ law of electrostatics? (a) Scalar (c) Magnetic
E θ
[KCET]
(b) Electrical (d) Vector
2013 5 Three charges q1 , − q1 and q 2 are placed as shown in figure, S is a Gaussian surface. Electric field at any point on [AIIMS] S is –q1
q2 S
+q1
(a) due to q 2 only (c) zero at all the points
(b) uniform at all points (d) due to all the charges
L
(a) EL2 (c) EL2 sin θ
(b) EL2 cos θ (d) zero
10 A point chargeQ is placed at one of the vertices of a cubical block. The electric flux flowing through this cube is [Manipal]
Q (a) 6ε0
Q (b) 4ε 0
Q (c) 8ε 0
Q (d) ε0
11 The total electric flux emanating from a closed surface enclosing an α-particle is (e = electronic charge) [Kerala CEE] (a) 2e/ ε 0 (b) e/ ε 0 (c) eε 0 (d) ε 0 e/ 4 (e) 4e/ ε 0
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ELECTROSTATICS I
12 The electric flux for Gaussian surface A that encloses the charged particles in free is (given , q1 = −14 nC, q 2 = 78.85 nC, q 3 = −56 nC) Gaussian surface A
[MP PMT]
q1 q2 q3
Gaussian surface B
(a) 103 Nm 2 C−1 (b) 103 CN−1 m −2 3 2 −1 (c) 6.32 × 10 Nm C (d) 6.32 × 103 CN−1 m −2 13 A point charge +q is placed at the centre of a cube of side L. The electric flux emerging from the cube is [WB JEE] q 6qL2 q (d) (a) (b) zero (c) ε0 ε0 6L2 ε 0
14 The Gaussian surface for calculating the electric field due to a charge distribution is [J&K CET] (a) any surface near the charge distribution (b) always a spherical surface (c) a symmetrical closed surface containing the charge distribution, at every point of which electric field has a single fixed value (d) None of the above 15 If the amount of flux entering and leaving an enclosed surface respectively are φ1 and φ 2 . The electric charge inside the surface will be [AIEEE 2003] (b) ( φ 2 + φ1 )ε 0 (a) (φ 2 − φ1 )ε 0 ( φ − φ1 ) ( φ + φ1 ) (c) 2 (d) 2 ε0 ε0 2009 16 The total electric flux through a cube when a charge 8q is placed at one corner of the cube is [Kerala CEE] ε0 q (a) ε 0 q (b) (c) 4πε 0 q (d) q 4πε 0 q (e) ε0 17 Electric flux emanating through a surface element dS = 5 $i placed in an electric field E = 4$i + 4$j + 4k$ is [J&K CET] (a) 10 units (b) 20 units (c) 4 units (d) 16 units 18 A Gaussian sphere encloses an electric dipole within it. The total flux across the sphere is [JCECE] (a) zero (b) half that due to a single charge (c) double that due to a single charge (d) dependent on the position of the dipole 19 Gauss’s law is valid for [DUMET] (a) any closed surface (b) only regular closed surfaces (c) any open surface (d) only irregular open surfaces
2008 20 A hollow cylinder has a charge q C
C
A
within it. If φ is the electric flux in unit of voltmeter associated with the curved surface B, the flux linked with the plane surface A in unit of voltmeter will be [AIIMS] q φ q 1 q (a) (c) (d) (b) −φ − φ 2ε 0 3 ε0 2 ε0
21 The electric flux through a closed surface area S enclosing charge Q is φ . If the surface area is doubled, then the flux is [J&K CET] (a) 2φ (b) φ/ 2 (c) φ/ 4 (d) φ
2007 22 A square surface of side L m is in the plane of the paper. A
uniform electric field E (Vm −1 ) , also in the plane of the paper is limited only to the lower half of the square surface (see figure). The electric flux in SI units associated with the surface is [CBSE AIPMT] L L
L E
L
(a)
EL2 ( 2ε 0 )
(b)
EL2 2
(c) zero
(d) EL2
23 A charge q is located at the centre of a cube. The electric flux through any face is [BHU, JIPMER] πq q 2πq 4 πq (d) (b) (c) (a) 6( 4πε 0 ) 6( 4πε 0 ) 6( 4πε 0 ) 6( 4πε 0 ) 24 A charge q is placed at the corner of a cube of side a. The electric flux through the cube is [MHT CET] q q q q (b) (c) (d) (a) ε0 3ε 0 6ε0 8ε0 25 If the electric flux entering and leaving an enclosed surface respectively are φ1 and φ 2 , the electric charge inside the surface will be [RPMT, AFMC] (b) ( φ 2 + φ 1 ) / ε 0 (a) ( φ 2 − φ 1 ) / ε 0 φ − φ2 (c) 1 (d) ε 0 ( φ 1 + φ 2 ) ε0 26 If the uniform surface charge density on the infinite plane sheet is σ, then electric field near the surface will be σ (a) 2ε 0
3σ (b) ε0
σ (c) ε0
[Guj CET]
2σ (d) ε0
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 (a) 11 (a) 21 (d)
2 (d) 12 (a) 22 (c)
3 (b) 13 (a) 23 (d)
4 (d) 14 (c) 24 (d)
5 (d) 15 (a) 25 (d)
6 (d) 16 (e) 26 (a)
7 (d) 17 (b)
8 (b) 18 (a)
9 (d) 19 (a)
10 (c) 20 (a)
Explanations 1 (a) As the hollow sphere is uniformly charged, so the net charge will appear on the surface of the sphere. (i) The electric field at a point outside the hollow sphere is Q φ = ∫ E ⋅ dS = enclosed ε0 S [from Gauss’ law] E
+ + + + +
+
O
+ + R +
r
+ + +
E (4 πr2 ) =
⇒
⇒ E=
+
Q
Q ε0
Q 1 ⇒ E∝ 2 4 πε 0r2 r
(ii) The electric field at the surface (r = R ), Q E= 4 πε 0R (iii) The electric field inside hollow sphere is Q E= = 0 [Q Qinside = 0 ] 4 πε 0r
2 (d) The surface charge density of a closed surface area having charge Q is given by Charge Q σ= = Area A or Q = σA Thus, the charges on sphere P and Q having same charge density as shown in the figure below is given by σ
σ
R P
2
and QQ = σ × 4 π (2R ) = 16πσR …(ii) When they are brought in contact with each other, the total charge will be Q t = QP + QQ = 4 πσR 2 + 16πσR 2 [from Eqs. (i) and (ii)] = 20πσR 2
…(iii)
So, the charges on the sphere P and Q after separation will be distributed as 1 2 QP′ = Qt and QQ′ = Qt ⇒ 3 3 After separation, the new surface charge densities on P and Q will be Q′ 1 Qt σP = P = Area 3 Area 1 20πσR 2 5 = = σ 3 4 πR 2 3 QQ′ 2 Qt and σ Q = = Area 3 Area 2 20πσR 2 = × 3 4 π (2R )2 2 5 5 = × σ= σ 3 4 6
3 (b) When a sphere encloses a charged dipole,
+q
–q
Hence, electric flux across the sphere is zero.
4 (d) The Gauss’ law in electrostatic given a relation between electric flux through any closed hypothetical surface (called a Gaussian surface) and the charge enclosed by the surface. So, the nature of Gaussian surface is vector.
5 (d) The electric field at any point on S
6
(Gaussian surface) is due to all the charges but the flux through the S is due to only charges q2 and −q1 inside the Gaussian surface. (d) Given, E = (2k$ + 3$j + k$ ) NC−1 and
S = 10 $i m 2
We know that, Electric flux, φ = E ⋅ S = (2i$ + 3$j + k$ ) ⋅ (10 i$ ) = 20 Nm 2C−1
7 (d) The flux passing through the square
8
of 1 m placed in xy -plane inside the electric field is zero because number of field lines entering are equal to number of field lines (flux) leaving the surface. So, net flux will be zero, so E = 0. Net enclosed charge (b) Total flux = ε0 Hence, we can say that the electric flux depends only on net enclosed charge by surface. So, flux will remain the same.
9 (d) Flux of electric field E through any 2R
Q
Thus, according to Gauss’s law, the net electric flux across the closed surface is equal to the net charge enclosed by it divided by ε 0, i.e. q φE = in ε0 +3 × 10−6 − 3 × 10−6 = =0 ε0
…(i)
2
In connection of two charged conducting bodies, the potential will become same on both, i.e. QQ QP = 4 π ε 0R 4 π ε 0 2R QP QQ QP 1 = ⇒ = ⇒ 2R R QQ 2
dS
++ +
QP = σ × 4 πR 2 = 4 πσR 2
Here, q = ± 3 × 10−6 C
area A is defined as φ = EA cos θ. The lines are parallel to the surface. ⇒ Angle between E and A = 90°, hence φ = 0.
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ELECTROSTATICS I
10 (c) Let φ total be the total electric flux and φ cube be that of flowing through cube. So, when a point charge Q is placed at one of the vertices of a cubical block, then only (1/8)th part of total flux will pass through this cube, therefore φ Q Q φcube = total = Q φ total = ε 8 8ε 0 0
19 (a) Gauss’ law is valid for any closed surface not necessary to be a regular closed surface.
20 (a) Gauss’ law states that, the net electric flux through any closed surface is equal to the net charge inside the surface divided by ε 0. q i.e. φ total = ε0
11 (a) As we know that, charge on
Let electric flux linked with surfaces A , B and C are φA , φB and φC , respectively. i.e. φ total = φA + φB + φC
α-particle is double to that on electron.
Q By Gauss’ theorem, φ E = ⇒
|φE | =
q ε0
12 (a) Flux is due to charges enclosed per
ε 0. ∴ Total flux = (−14 + 78.85 − 56) nC/ε 0 4π = 8.85 × 10−9 C × 4 πε 0 = 8.85 × 10−9 × 9 × 109 × 4 π ~ 1000 Nm 2 C−1 = 1000.4 Nm 2 / C −
2φA + φB = φ total =
or
φA =
Hence, φA =
1 q − φ (given, φB = φ) 2 ε0
16 (e) Total electric flux, qinside 8q q = = 8ε 0 ε 0 8ε 0 (b) φ = E ⋅ dS, E = 4 $i + 4 $j + 4 k$ and dS = 5i$ ⇒ φ = (4 i$ + 4 $j + 4 k$ ) ⋅ (5i$ ) φ=
17
φ = 20 units
18 (a) Flux through the Gaussian sphere qinside + q − q = ε0 ε0 φ=0
φ=
q ε0
22 (c)Q The angle between area vector S
25 (d) Any closed surface is equal to the net charge inside the surface divided by ε 0. q Therefore, φ = ε0 Let −q1 be the charge, due to which flux φ 1 is entering the surface −q φ1 = 1 ε0 or − q1 = ε 0φ 1 Let + q2 be the charge, due to which flux φ2 is leaving the surface q φ 2 = 2 or q2 = ε 0φ 2 ∴ ε0 So, electric charge inside the surface = q2 − q1 = ε 0φ 2 + ε 0φ 1 = ε 0 (φ 2 + φ 1)
26 (a) Figure shows a portion of a flat thin sheet, infinite in size with constant surface charge density σ (charge per unit area).
and electric field is 90°. S0
S
calculating the electric field due to a charge distribution is a symmetrical closed surface containing the charge distribution, at every point of which electric field has a single fixed value. Net flux leaving the enclosed surface 1 = × Net charge enclosed ε0 1 or φ 2 − φ 1 = ×q ε0 or q = (φ 2 − φ 1 )ε 0
1 q − φB 2 ε0
∴ Flux will remain same, i.e. φ. [Q flux does not depend upon surface area]
14 (c) The Gaussian surface for
15 (a) By Gauss’s theorem,
q ε0
∴
21 (d) By Gauss’ law, φ E =
13 (a) Since, the charge is placed at the centre of the cube, so the electric flux lines move out equally from all sides of the cube. Thus, the electric flux emerging from the cube is equal to q / ε0 ⋅
φC = φA
Since,
−2e 2e = ε0 ε0
cubes. Therefore, electric flux through the cube is 1 q φ′ = 8 ε0
E
23
∴ Flux associated will be φ E = E ⋅ d S = EdS cos 90° = 0 q (d) From Gauss’ law, φ = ε0 This is the net flux coming out of the cube. Since, a cube has 6 sides, so electric flux through any face is 4 πq q φ φ′ = = = 6 6ε 0 6(4 πε 0 )
24 (d) According to Gauss’ law, the electric flux through a closed surface is 1 times the net charge equal to ε0 enclosed by the surface. Since, q is the charge enclosed by the surface, then q the electric flux, φ = . ε0 If charge q is placed at a corner of cube, it will be divided into 8 such
E
E
Let us draw a Gaussian surface (a cylinder) with one end on one side and other end on the other side and of cross-sectional area S 0. Field lines will be tangential to the curved surface, so flux passing through this surfaces is zero. At plane surface electric field has same magnitude and perpendicular to surface. Hence, using q ES = in ε0 where, S is the surface area of cross-section of cylinder. Since, there are two cross-sectional area, therefore surface area, S = 2S 0 (σ )(S 0 ) ∴ E (2S 0 ) = ε0 σ E= ⇒ 2ε 0
16 Electrostatics II (Electric Potential and Capacitance) Quick Quick Review Review Electric Potential • It is the amount of work done in bringing a unit positive test charge from infinity to a point, along any arbitrary
path. It is a scalar quantity, expressed as V =
work done (W ) . charge ( q )
• It is a state function and can have positive, negative or zero value according to the nature of the charge.
dV (potential decreases in the direction of E). dr Electrostatic potential in various cases are shown in the table given below • Electric potential and field are related by E = −
(i)
Cases
Electric potential
A point charge
q V = 4 π ε0 r
Diagrammatic representation
Graphical representation
+q O
P
B
r
E
A
V
∞
dx
x
O
(ii)
A system of charges
V = V1 + V2 + V3 + …
r
q1
1 n qi = ∑ 4 πε0 i = 1 ri
r1 r2
P q4
r4
—
q2 r3 q3
(iii)
A continuous charge distribution
V = ∫ dV =
dq
∫ 4 πε0r
P
+ q……… −q V
+ q……… −q V
O x
X
O
x
X
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ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
(iv)
Cases
Electric potential
Electric dipole
V =
Diagrammatic representation
1 p cosθ 4 π ε0 r 2
Graphical representation
P
p = dipole moment
r D
(a) V =
Q , 4 π ε0 r
(b) V =
1 Q , 4 π ε0 R
for r = R
Q , 4 π ε0 R
for r < R
(vi)
Charged shell of non-conducting sphere
for r > R
V
+ +
+
+Q+
r
+
(c) V =
B +q
R
+ + +
Charged spherical shell of conducting sphere
+ +
(v)
—
p θ a O C
a
A –q
E
3 1 q ⋅ 2 4 πε0 r 3 = Vsurface 2
1 V∝ r
O
Gaussian surface
R O
B
C
Vout∝
1 .q 4πε0 R
r
O
(vii)
Uniformly charged long thin wire
V =
r + l2 − l λ loge 2 πε0 r 2 + l 2 + l
dq [where, λ = line charge density = ] dl
(viii)
Uniformly charged ring
Vcentre = Vr =
1 q ⋅ 4 πε0 R
q 1 ⋅ 4 πε0 R 2 + r 2
1 r
Uniformly charged disc
r
R
λ + + + + l + + + + +
E
√R2+r2 R
—
P
r
V0
V
r P
C
r
r=0
(ix)
r
R
V
At centre, potential Vcentre =
1 Q σR = 4πε0 R ε0
V = 2 πkσ [ R 2 + r 2 − r ]
dq
σR and at r = 0,V = 2 ε0
R
√R2+r2 r
— V
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Equipotential Surface Any surface over which the electric potential is same everywhere is called an equipotential surface. These surfaces for a point charge are concentric spherical surfaces centred at the charge. The potential of these surfaces are expressed as 1 q ⋅ V= 4πε 0 r
Electrostatic Potential Energy Electric potential energy of a system of point charges is defined as the total amount of work done in bringing the different charges to their respective positions from infinitely large mutual separations.
(v) Surface charge density of a conductor could be different at different points. Insulators are the materials through which electric charge cannot flow, e.g. glass, rubber, wood, etc. Insulators are also called dielectrics.
Dielectric and Polarisation • Dielectrics Non-conducting (insulating) materials that
can produce electric effect without conduction are known as dielectrics. • Dielectrics are classified based on their behaviour in external field given in tabular form below Types
Definition
Polar
Centres of positive and negative charges are separated
It is represented by U and for a system of two point charges 1 q1 q 2 q1 and q 2 , U = ⋅ 4 πε 0 r where, r = distance of separation.
Non-polar
For system of n point charges, k n qi q j U= ∑ 2 i , j rij i≠ j
1 ) (where, k = 4πε 0
Potential energy of charges in an external field for different cases are shown below in tabular form. Cases
Potential energy in external field
Single charge
U = q ⋅ V (r )
(ii)
A system of two charges
U = q1V (r1 ) + q2V (r2 ) +
(iii)
Dipole
U = − pE cos θ = − p ⋅ E U = − pE (minimum), for θ = 0° (stable equilibrium). U = + pE (maximum), for θ = 180° i.e. dipole is in unstable equilibrium.
(i)
q1q2 4 πε0r12
Conductors and Insulators Conductors are the materials through which electric charge can flow easily. Under electrostatic conditions, the conductors have following properties (i) Inside a conductor, electrostatic field is zero. (ii) At the surface of a charged conductor, electrostatic field must be normal to the surface at every point. (iii) The interior of the conductor can have no excess charge in the static situation. (iv) Electrostatic potential is constant throughout the volume of the conductor and has the same value (as inside) on its surface.
Centres of positive and negative charges coincide
Diagram E=0
Dipole moment E≠0
P = 0 (E = 0) P > 0 (E ≠ 0 )
E=0
E≠ 0→0
P = 0 (E = 0 ) P > 0 (E ≠ 0)
In a dielectric under the effect of an external field, a net dipole moment is induced. Due to molecular dipole moments, a net charge appears on the surface of the dielectric. Field inside the dielectric gets reduced by E = | E0 | − | Ein | where, E 0 = external electric field between two plates and
E in = electric field inside the dielectric.
E0 + + + + + + +
– – – Ein – – – –
σp
+ + + + + + +
– – – – – – –
Dielectric Constant ( K ) is expressed as K = E 0 / E which is always > 1. • Polarisation The induced dipole moment developed per unit volume in a dielectric slab on placing it in an electric field is called polarisation. It is denoted by P. It is expressed as P = Np where, p = induced dipole moment acquired by an atom of dielectric K and N = number of atoms per unit volume. • Electric susceptibility ( χ ) The polarisation density of dielectric slab is directly proportional to the reduced value of the electric field and may be expressed as P = χ ε 0 E0 where, χ is a constant of proportionality and is called electric susceptibility of the dielectric slab. It is a dimensionless constant. Note 1. For vacuum, χ = 0
2. K = 1 + χ
439
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
• Dielectric strength The maximum electric field that a
dielectric can withstand without breakdown is called its dielectric strength.
Its SI unit is Vm −1 and its practical unit is kV(mm) −1. For air it is about 3 × 106 Vm −1 .
Cylindrical Capacitor
Capacitors and Capacitance A capacitor is a system of two conductors separated by an insulating medium. The conductors have charges Q and − Q with potential difference V = V1 − V2 between them. The electric field in the region between the conductors is proportional to the charge Q. Q
–Q
V1
V2
Conductor 1
If outer sphere is given a charge + Q and inner sphere is earthed, then b2 C = 4 πε 0 b − a
Conductor 2
If the potential difference (V ) is the work done per unit positive charge in taking a small test charge from the conductor 2 to 1 against the field, then V is proportional to Q and the ratio Q /V is a constant. C = Q /V The constant C is called the capacitance of the capacitor. Capacitance C depends on shape, size and separation of the system of two conductors. A capacitor with fixed capacitance is symbolically shown as , while the one with variable capacitance is shown as . In practice, farad is a very big unit, the most common units are its sub-multiples. 1 µF = 10 − 6 F, 1nF = 10 −9 F and 1pF = 10 −12 F
Capacitance of an Isolated Spherical Conductor • If charge Q is given to a spherical conductor of radius R,
then C = 4πε 0 R where, ε 0 = permittivity of the medium. • If sphere is placed in a medium of dielectric constant K, then C = K × 4πε 0 R For air or vacuum, K = 1.
Capacity of a Spherical Conductor Enclosed by an Earthed Concentric Spherical Shell • It consists of two concentric conducting sphere of radii a
and b ( a < b ).
• If inner sphere is given a charge + Q and outer sphere is
earthed, then capacitance will be ab C = 4 πε 0 b − a
It consists of two co-axial cylinders of radii a and b ( a < b ). Its capacitance is given by 2πε 0 l C= b log e a where, l = length of cylinder.
Parallel Plate Capacitor It consists of two parallel metallic plates separated by a small distance as shown q + + + + + + + + + +
–q – – – – – – – – – –
Its capacitance is given by C =
ε0 A d
where, A = area of plates of capacitor and d = distance between plates. • The capacitance of parallel plate capacitor varies with the medium between the plates which is shown below (i) If a dielectric medium of dielectric constant K is filled completely between the plates of capacitor, then Kε 0 A C′ = d (ii) If dielectric medium is filled partially between the plates, then ε0 A C′ = t d−t+ K where, t = thickness of dielectric. (iii) If a metallic slab of thickness t is inserted between the plates, then ε A C′ = 0 (d − t ) (iv) If a number of dielectric slabs are inserted between the plates, then ε0 A C′ = t t t d − ( t 1 + t 2 + t 3 + ... ) + 1 + 2 + 3 + ... K1 K 2 K 3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
• If the space between two plates of a parallel plate capacitor is filled with different dielectrics, then their capacitance for various
combinations are tabulated as shown below Shape of dielectric combination
K1
A/2
A
A a
b A/2
d
Type of combination Effective capacitance
parallel εA C = 0 (K 1 + K 2 ) 2d
Force Between Plates of a Parallel Plate Capacitor Due to equal and opposite charges on plates of capacitor, an attractive force act between them, which is given by F=
Q2 CV 2 = 2Kε 0 A 2dK
This force per unit area is f =
Q2 σ2 F = = A 2Kε 0 A 2 2Kε 0
Q where, σ = = surface charge density. A
Energy Stored in a Capacitor In charging a capacitor, work has to be done against the repulsive electric force. This work done is stored as potential energy in capacitor and given by U =W =
Q2 1 = CV 2 2C 2
Energy density between the plates of a parallel plate U 1 CV 2 capacitor is E = = V 2 Ad
Combination of Capacitors • There are two common methods of combining capacitors
and they are given below
(i) Series Combination • In this combination, the charge on each capacitor is same
(equal to charge given by battery), while potential difference is distributed inversely as the ratio of 1 1 1 capacitance, i.e. V1 :V2 :V3 … = : : :… C1 C 2 C 3
• The equivalent capacitance in this combination is
calculated as,
a
b
a
b
K2
1 1 1 1 = + + +… C s C1 C 2 C 3
d/2
d/2
series
mixed
2ε0AK 1K 2 C= d (K 1 + K 2 )
C=
ε0 A K 1 K 2K 3 + d 2 K2 + K3
• In this combination, the potential energy varies inversely
1 as the capacitance, i.e. U ∝ . C • If n identical capacitors are connected in series, then equivalent capacitance and potential on each capacitor C V respectively are C s = and V ′ = . n n • If n identical plates are arranged as shown below, they constitute ( n − 1) capacitors in series, then equivalent capacitance is + + + +
– – – –
+ + + +
C eq =
– – – –
+ + + +
– – – –
ε0 A ( n − 1)d
(ii) Parallel Combination • In this combination, potential difference on each
capacitor is same (equal to supply voltage), while the charges are distributed in the ratio at capacitance, i.e.
Q1 : Q2 : Q3 :… = C1 : C 2 : C 3 : … The equivalent capacitance of this combination is • calculated as C p = C1 + C 2 + C 3 + … • In this combination, the potential energy varies directly as the capacitance, i.e. U ∝C • If n identical capacitors are connected in parallel, then
equivalent capacitance and charge on each capacitor are respectively C p = nC Q and Q′ = n
441
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
• If n identical plates are arranged as shown below, then
( n − 1) capacitors will be in parallel and their equivalent capacitance is
2
4
1
3
capacitors. This causes some loss of energy which can be given as 1 C C ∆U = U i − U f = 1 2 (V1 − V2 ) 2 2 C1 + C 2
Van de Graaff Generator
6
5
• Due to this connection, charges are shared between two
7
It is a device which is used for generating high electric potential of the order of ten million volts, for accelerating charged particles to a very high speed.
+ + + + + + + + +
C eq = ( n − 1)C • If C p is the effective capacitance or capacity of n identical capacitors connected in parallel and C s is their effective Cp capacitance when connected in series, then = n2. Cs
Common Potential and Energy Loss on Sharing Charges
++ ++ +
S
+
+
+
Iron + Source ++
C2 P2
D
+ + + +
C' C1
potential difference between them, they attain a common potential which can be given as
where, C1 and C 2 = capacitance of two capacitors and V1 and V2 = potential of two capacitors.
++
E.H.T.
• If two capacitors are connected by a wire, then due to
C V + C 2V2 V= 1 1 C1 + C 2
+
P1
Target
Its working is based on following two points (i) The action of sharp points (corona discharge) (ii) Total charge given to a spherical shell resides on its outer surface.
Topical Practice Questions All the exam questions of this chapter have been divided into 3 topics as listed below Topic 1
—
ELECTRIC POTENTIAL AND POTENTIAL ENERGY
442–450
Topic 2
—
CAPACITANCE AND CAPACITORS
451–462
Topic 3
—
GROUPING OF CAPACITORS
463–476
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 1 Electric Potential and Potential Energy 2019 1 Potential difference is given as V ( x ) = − x 2 y volt. Find electric field at a point (1, 2). (a) $i + 4$j Vm −1 (b) −4$i − $j Vm −1 −1 (c) 4i$ + $j Vm (d) 4i$ − $j Vm −1
[JIPMER]
2017 2 A charged particle q is shot with speed v towards another fixed charged particle Q. It approaches Q upto a closest distance r and then returns. If q were given a speed 2v, the closest distance of approach would be [JIPMER] q
(a) r
r
v
(b) 2r
Q
(c) r / 2
(d) r / 4
3 Charges + q and − q are placed at points A and B respectively, which are a distance 2L apart, C is the mid-point between A and B. The work done in moving a charge + Q along the semi-circle CRD is [AIIMS] R
A
(a)
qQ 4πε 0 L
(b)
C
B
qQ 2πε 0 L
(c)
D
qQ 6πε 0 L
(d)
− qQ 6πε 0 L
6 Two charges of equal magnitude q are placed in air at a distance 2a apart and third charge − 2q is placed at mid-point. The potential energy of the system is (ε 0 = permittivity of free space) [MHT CET] q2 3q 2 5q 2 7q 2 (a) − (c) − (d) − (b) − 8πε 0 a 8πε 0 a 8πε 0 a 8πε 0 a 7 Consider two concentric spherical metal shells of radii r1 and r2 ( r2 > r1 ). If the outer shell has a charge q and the inner one is grounded, the charge on the inner shell is − r2 (a) q r1
5 Two concentric spheres kept in air have radii R and r. They have similar charge and equal surface charge density σ. The electrical potential at their common centre is (ε 0 = permittivity of free space) [MHT CET] σ (R + r ) σ (R − r ) (b) (a) ε0 ε0 σ (R + r ) σ (R + r ) (d) (c) 2ε 0 4ε 0
(b) zero
[WB JEE]
(d) − q
8 What is the electric potential at a distance of 9 cm from 3 nC? [KCET] (a) 270 V (b) 3 V (c) 300 V (d) 30 V 9 Work done in carrying an electric charge Q1 once round a circle of radius R with a charge Q2 at the centre of the circle is [EAMCET] Q1Q2 Q1Q2 (b) ∞ (c) (d) 0 (a) 4πε 0 R 4πε 0 R 2
2013 10 A , B and C are three points in a uniform electric field. The electric potential is
[NEET] E
2014 4 A conducting sphere of radius R is given a charge Q. The electric potential and the electric field at the centre of the sphere respectively are [CBSE AIPMT] Q Q (b) and zero (a) zero and 4πε 0 R 4πε 0 R 2 Q Q (c) and (d) Both are zero 4πε 0 R 4πε 0 R 2
− r1 (c) q r2
A B C
(a) (b) (c) (d)
maximum at A maximum at B maximum at C same at all the three points A , B and C
2012 11 Two metallic spheres of radii 1 cm and 3 cm are given
charges of − 1 × 10−2 C and 5 × 10−2 C, respectively. If these are connected by a conducting wire, the final charge on the bigger sphere is [CBSE AIPMT] (a) 2 × 10−2 C (b) 3 × 10−2 C (c) 4 × 10−2 C (d) 1 × 10−2 C
443
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
12 Four point charges − Q, − q, 2q and 2Q are placed, one at each corner of the square. The relation between Q and q for which the potential at the centre of the square is zero, is [CBSE AIPMT] 1 1 (a) Q = − q (b) Q = − (c) Q = q (d) Q = q q 13 Two equal point charges Q are fixed at x = − a and x = + a on X-axis. Another point charge is placed at the origin. The change in electrical potential energy of Q, when it is displaced by a small amount x along X-axis, is approximately proportional to [Manipal] 1 2 3 (a) x (b) x (c) x (d) x 14 A charge + q is placed at the origin O of XY- axis as shown in the figure. The work done in taking a charge Q from A to B along the straight line AB is [WB JEE] B (0, b)
O
(+q)
(a, 0) A
(a)
qQ 4πε 0
a − b ab
(b)
qQ 4πε 0
b − a ab
(c)
qQ 4πε 0
1 b 2 − a b
(d)
qQ 4πε 0
1 a 2 − b b
2011 15 A charge Q is placed at the origin. The electric potential due to this charge at a given point in space isV. The work done by an external force in bringing another charge q from infinity upto the point is [J&K CET] V (b) Vq (c) V + q (d) V (a) q
16 A hollow metal sphere of radius 10 cm is charged such that the potential on its surface becomes 80 V. The potential at the centre of the sphere is [J&K CET] (a) 80 V (b) 800 V (c) 8 V (d) zero 17 Which of the following is not true? [EAMCET] (a) For a point charge, the electrostatic potential varies as 1/ r (b) For a dipole, the potential depends on the position vector and dipole moment vector (c) The electric dipole potential varies as 1/ r at large distance (d) For a point charge, the electrostatic field varies as 1/ r 2
18 It is possible to have a positively charged body at [AIIMS] (a) zero potential (b) negative potential (c) positive potential (d) All of these 19 If an electron is brought towards another electron, then the electric potential energy of the system [AIIMS] (a) increases (b) decreases (c) become zero (d) remaining the same
2010 20 A ball of mass 1 g and charge 10−8 C moves from a point A, where potential is 600 V to the point B, where potential is zero. Velocity of the ball at the point B, is 20 cms −1 . The velocity of the ball at the point A will be [AIIMS] (a) 22.8 cms −1 (b) 228 cms −1 (c) 16.8 ms −1
(d) 168 ms −1
21 The electrostatic potential of a uniformly charged thin spherical shell of charge Q and radius R at a distance r from the centre is [Manipal] Q Q (a) for points outside and for points on 4 πε 0 r 4 πε 0 R surface of the sphere Q for both points inside and outside the shell (b) 4 πε 0 r Q (c) zero for points outside and for points inside 4 πε 0r the shell (d) zero for both points inside and outside the shell 22 The ionisation potential of mercury is 10.39 V. How far an electron must travel in an electric field of 1.5 × 106 V/ m to gain sufficient energy to ionise mercury ? [Manipal] 10.39 10.39 (a) (b) m m 1.6 × 10−19 2 × 1.6 × 10−19 (c) 10.39 × 1.6 × 10−19 m
(d)
10.39 1.5 × 106
m
23 Identify the false statement. [Kerala CEE] (a) Inside a charged or neutral conductor, electrostatic field is zero. (b) The electrostatic field at the surface of the charged conductor must be tangential to the surface at any point. (c) There is no net charge at any point inside the conductor. (d) Electrostatic potential is constant throughout the volume of the conductor. (e) Electric field at the surface of a charged conductor is proportional to the surface charge density. 24 The electric potential on the hollow sphere of radius 1 m is 1000 V. The potential at1/ 4 m from the centre of sphere is (a) 1000 V (b) 500 V [MP PMT] (c) 250 V (d) zero
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
25 There is a uniform electric field of intensity E which is as shown. How many labelled points have the same electric potential as the fully shaded point? [KCET] E
(a) 2 (c) 8
(b) 3 (d) 11
26 If a charged spherical conductor of radius 10 cm has potential V at a point distant 5 cm from its centre, then the potential at a point distant 15 cm from the centre will be [JCECE] 1 2 3 (b) V (c) V (d) 3V (a) V 3 3 2 27 A hollow metal sphere of radius 10 cm is charged, such that the potential on its surface becomes 80 V. The potential at the centre of the sphere is [Guj CET] (a) 80 V (b) 800 V (c) 8 V (d) zero 28 Figure shows three spherical and equipotential surfaces A , B and C round a point charge q. The potential difference V A − VB = VB − VC . If t 1 and t 2 be the distances between them, then [JIPMER] C B A q
t1 t2
(a) t 1 = t 1 (c) t 1 < t 2
(b) t 1 > t 2 (d) t 1 ≤ t 2
2009 29 The electric potential at a point ( x, y, z ) is given by V = − x 2 y − xz 3 + 4 The electric field E at that point is (a) E = ( 2xy + z 3 ) $i + x 2 $j + 3xz 2 k$ (b) E = 2xyi$ + ( x 2 + y 2 )$j + ( 3xz − y 2 )k$ (c) E = z 3 i$ + xyz$j + z 2 k$ (d) E = ( 2xy − z 3 )$i + xy 2 $j + 3z 2 xk$
[CBSE AIPMT]
30 Three concentric spherical shells have radii a, b and c( a < b < c ) and have surface charge densities σ , − σ and σ, respectively. IfV A ,VB andVC denote the potentials of the three shells for c = a + b, we have [CBSE AIPMT] (a) VC = V A ≠ VB (b) VC = VB ≠ V A (c) VC ≠ VB ≠ V A (d) VC = VB = V A
31 Assertion A and B are two conducting spheres of same radius. A being solid and B hollow. Both are charged to the same potential. Then, charge on A = charge on B. Reason Potentials on both are same. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 32 n identical mercury droplets charged to the same potential V coalesce to form a single bigger drop. The potential of new drop will be [AFMC (Manipal)] (a) V / n (b) nV (c) nV 2 (d) n 2/ 3V 33 The charge given to any conductor resides on its outer surface, because [RPMT] (a) the free charge tends to be in its minimum potential energy state (b) the free charge tends to be in its minimum kinetic energy state (c) the free charge tends to be in its maximum potential energy state (d) the free charge tends to be in its maximum kinetic energy state 34 Two equal and opposite charge ( + q and − q ) are situated at distance x from each other, the value of potential at very far point will depend upon [AFMC] (a) only on q (b) only on x (c) on qx (d) on q / x 35 Three point charges q, − 2q and − 2q are placed at the vertices of an equilateral triangle of side a. The work done by some external force to increase their separation to 2a will be [UP CPMT] 1 2q 2 1 q2 (a) (b) 4πε 0 a 4πε 0 2a 1 8q (d) zero (c) 4πε 0 a 2 36 Three charges are placed at the vertex of an equilateral triangle as shown in figure. For what value of Q, the electrostatic potential energy of the system is zero? [OJEE]
+Q a
+q
a
a
+q
(a) −q (b) q/2 (c) −2q (d) −q/2 37 The charge q is projected into a uniform electric field E, work done when it moves a distance y is [OJEE] qy (a) qEy (b) E qE y (d) (c) y qE
445
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
38 Two charged spheres of radii R1 and R 2 have equal surface charge density. The ratio of their potential is [OJEE] (a) R1 /R 2 (b) R 2 /R1 (d) ( R 2 /R1 ) 2 (c) ( R1 /R 2 ) 2 39 The mutual electrostatic potential energy between two protons which are at a distance of 9 × 10−15 m, in 235 nucleus is [J&K CET] 92 U (b) 5.5 × 10−14 J (a) 1.56 × 10−14 J (d) 4.56 × 10−14 J (c) 2.56 × 10−14 J 40 Three charges − q, + Q and + q are placed in a straight line as shown. If the total potential energy of the system is zero, then the ratio q / Q is [J&K CET] –q
(a) 2
(b) 5.5
E
p
x
(c) 4
(d) 1.5
(a) 12 Vm −1
(b) – 6 Vm −1
(c) 6 Vm −1
(d) − 12 Vm −1
[KCET]
2008 42 The work done in bringing a unit positive charge from infinity distance to a point at distance X from a positive charge Q is W. When the potential φ at that point is [J&K CET] WQ W (b) W (c) (a) (d) WQ X Q
43 The electric potential inside a conducting sphere (a) increases from centre to surface [J&K CET] (b) decreases from centre to surface (c) remains constant from centre to surface (d) is zero at every point inside 44 A charge Q is placed at each corner of a cube of side a. The potential at the centre of the cube is [EAMCET] 8Q 4Q 4Q 2Q (a) (b) (d) (c) πε 0 a 4πε 0 a πε 0 a 3πε 0 a 45 A small conducting sphere of radius r is lying concentrically inside a bigger hollow conducting sphere of radius R. The bigger and smaller spheres are charged with Q and q(Q > q ) and are insulated from each other. The potential difference between the spheres will be [KCET] 1 q q 1 q Q (b) (a) − − 4πε 0 r R 4πε 0 R r 1 q Q − 4πε 0 r R
electric field E as shown in the figure. Does the electric field do a positive or negative work on the proton ? Does the electric potential energy of the proton increase or decrease? [AIIMS]
d
41 The electric potential at any point x, y, z in metres is given byV = 3x 2 . The electric field at a point (2, 0, 1) is
(c)
2007 47 In the figure, a proton moves a distance d in a uniform
+q
+Q x
46 If 20 J of work has to be done to move an electric charge of 4 C from a point, where potential is 10V to another point, where potential is V volt, find the value of V. (a) 2 V (b) 70 V [Guj CET] (c) 5 V (d) 15 V
(d)
1 4πε 0
Q q + R r
(a) (b) (c) (d)
Negative, increase Positive, decrease Negative, decrease Positive, increase
48 In bringing an electron towards another electron, the electrostatic potential energy of the system [MHT CET] (a) decreases (b) increases (c) remains same (d) becomes zero 49 If a positive charge is shifted from a low potential region to a high potential region, then electric potential energy (a) decreases [RPMT] (b) increases (c) remains same (d) may increase or decrease 50 Electric potential at the centre of a charged hollow metal sphere is [J&K CET] (a) zero (b) twice as that on the surface (c) half of that on the surface (d) same as that on the surface 51 The potential of a large liquid drop when eight liquid drops are combined is 20 V. Then, the potential of each single drop was [KCET] (a) 10 V (b) 7.5 V (c) 5 V (d) 2.5 V 52 An electric field is spread uniformly in Y-axis. Consider a point A as origin point. The coordinates of point B are equal to (0, 2) m. The coordinates of point C are (2, 0) m. At points A , B and C, electric potentials are V A , VB and VC , respectively. From the following options, which is correct? [Guj CET] (a) V A = VC < VB (b) V A = VB = VC (c) V A = VB > VC (d) V A = VC > VB
446
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2006
2005 58 As per the diagram, a point charge +q is placed at the origin
53 What is not true for equipotential surface for uniform electric field? [AFMC] (a) Equipotential surface is flat (b) Two equipotential surfaces can cross each other (c) Electric lines are perpendicular to equipotential surface (d) Work done is zero E 54 Figure shows three points A+ A , B and C in a region of uniform electric field E. The B+ C line AB is perpendicular and BC is parallel to the field lines. Then, which of the following holds good? [BHU] (a) V A = VB = VC (b) V A = VB > VC (c) V A = VB < VC (d) V A > VB = VC where,V A ,VB andVC represent the electric potentials at the points A , B and C, respectively. 55 Two electric charges 12µCand −6µCare placed 20 cm apart in air. There will be a point P on the line joining these charges and outside the region between them, at which the electric potential is zero. The distance of P from −6µCcharge is [Kerala CEE] (a) 0.10 m (b) 0.15 m (c) 0.20 m (d) 0.25 m (e) None of these
O. Work done in taking another point charge −Q from the point A [coordinates ( 0, a )] to another point B [coordinates ( a, 0)] along the straight path AB is [CBSE AIPMT] y A
O
B
x
(a) zero
− qQ 1 (b) 2a 4 πε 0 a 2
qQ 1 a (c) ⋅ 4πε 0 a 2 2
qQ 1 (d) 2a 4πε 0 a 2
q3 59 Two charges q1 and q 2 are placed C 30 cm apart, as shown in the figure. A third charge q 3 is moved 40 cm along the arc of a circle of radius q2 40 cm from C to D. The change in q1 D 30 cm the potential energy of the system B A q3 is k , where k is 4πε 0 [CBSE AIPMT] (a) 8q 2 (b) 8q1 (c) 6q 2 (d) 6q1
56 The electrical potential on the surface of a sphere of radius r due to a charge 3 × 10−6 C is 500 V. The intensity of electric field on the surface of the sphere is [Take, 1/ 4πε 0 = 9 × 109 N-m 2 C−2 ] (in NC −1 ) [EAMCET] (a) < 10 (b) > 200 (c) between 10 and 20 (d) < 5
60 Which of the following is not the property of equipotential surfaces? [AFMC] (a) They do not cross each other (b) They are concentric spheres for uniform electric field (c) Rate of change of potential with distance on them is zero (d) They can be imaginary spheres
57 The electric potential at the surface of an atomic nucleus ( Z = 50) of radius 9 × 10−15 m is [Guj CET] (a) 80 V (b) 8 × 106 V (c) 9 V (d) 9 × 105 V
61 A solid metal sphere of radius 50 cm carries a charge 25 × 10−10 C. The electrostatic potential at the surface of the sphere will be [DUMET] (a) 25 V (b) 15 V (c) 35 V (d) 45 V
Answers 1 (c)
2 (d)
3 (d)
4 (b)
5 (a)
6 (d)
7 (c)
8 (c)
9 (d)
10 (b)
11 (b)
12 (a)
13 (b)
14 (a)
15 (b)
16 (a)
17 (c)
18 (d)
19 (a)
20 (a)
21 (a)
22 (d)
23 (b)
24 (a)
25 (b)
26 (b)
27 (a)
28 (c)
29 (a)
30 (b)
31 (a)
32 (d)
33 (a)
34 (c)
35 (d)
36 (d)
37 (a)
38 (a)
39 (c)
40 (c)
41 (d)
42 (c)
43 (c)
44 (c)
45 (a)
46 (d)
47 (a)
48 (b)
49 (b)
50 (d)
51 (c)
52 (d)
53 (b)
54 (b)
55 (c)
56 (a)
57 (b)
58 (a)
59 (a)
60 (b)
61 (d)
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
Explanations qQ 1 1 qQ (1 − 3) − = 4 πε 0 3L L 4 πε 0 3L 2qQ qQ =− =− 12πε 0L 6πε 0L
1 (c) Given, potential difference, V (x ) = − x y volt ∴ E = − ∆V ∂ ∂ = − $i (− x 2 y) + $j (− x 2 y) ∂ x ∂ y = − [ −2xy $i − x 2$j ] = 2xy $i + x 2$j
4 (b) Einside = 0 and Vinside = Vsurface =
E at (1, 2) = 2 × 1 × 2 $i + 12 $j = 4 $i + $j Vm −1 kinetic energy of charge q is converted into potential energy. 1 2 1 Q⋅q mv = ∴ 2 4 πε 0 r 1 2Q ⋅ q ⇒ ⋅ r= 4 πε 0 mv 2 1 2Qq In next case, r′ = 4 πε 0 m(2v )2 1 1 2Qq ⇒ ⋅ r′ = 4 4 πε 0 mv 2 r r′ = ⇒ 4
Einside = 0
We know that, potential due to point charge is given by 1 q 9 × 109 × 3 × 10−9 V = = 4 πε 0 r 9 × 10−2
1 Q ⋅ 4 πε 0 R
= 3 × 102
R
Q
force, so work done in carrying an electric charge Q1 once round a circle of radius R with a charge Q2 at the centre of the circle is zero.
5 (a) Potential due to a uniformly charged sphere is 1 Q V = 4 πε 0 R Q Q ε0 Also, σ= = 4 πR 2 4 πε 0R 2
…(i)
σR 1× Q = ε0 4 πε 0
σR Q 1 = × ε 0 4 πε 0 R
⇒
...(ii)
σR ε0 σR Potential due to sphere (1), V1 = ε0 σr Potential due to sphere (2), V2 = ε0 Net potential at centre, V = V1 + V2 σ = (R + r) ε0 (d) Potential energy of the system, 1 q1q2 q1q3 q2q3 U = + + r13 r23 4 πε 0 r12 1 q(−2q) q(−2q) qq = + + 4 πε a a 2a From Eqs. (i) and (ii), we get V =
+Q
–q
A
C
B
L
Electric potential energy of system, 1 q (− q) 1 (− q)Q U1 = ⋅ + ⋅ 4 πε 0 2L 4 πε 0 L 1 qQ + 4 πε 0 L In second case, when charge + Q is moved from C to D +q
–q
A
B
+Q L
D
Electric potential energy of system in this case, 1 q(− q) 1 qQ U2 = ⋅ + ⋅ 4 πε 0 2L 4 πε 0 3L 1 (− q) (Q ) + ⋅ 4 πε 0 L Work done (∆U ) = U 2 − U 1 1 q2 1 qQ 1 qQ = − ⋅ + ⋅ − ⋅ 4 πε 2 L 4 πε 3 L 4 πε 0 0 0 L 1 q2 1 qQ 1 qQ − − ⋅ − ⋅ + ⋅ 4 πε 2 L 4 πε L 4 πε 0 0 0 L
6
because electric field is directed along decreasing potential VB > VC > VA. Therefore, electric potential is maximum at point B.
11 (b) Charge flows from high potential to
2
situated at C. +q
V = 300 V
9 (d) Electrostatic force is a conservative
10 (b) The electric field is maximum at B,
3 (d) In first case, when charge + Q is
2L
r = 9 cm = 9 × 10−2 m
⇒
2 (d) At closest distance r, the whole
L
8 (c) Given, q = 3 nC = 3 × 10−9 C,
=
2
low potential, Electric potential on smaller sphere = Electric potential on bigger sphere KQ1 KQ2 = 3 1 ...(i) ⇒ Q1 = 3Q2 Q1 + Q2 = 4 × 10−2 ⇒
4 Q2 = 4 × 10−2
⇒
Q2 = 10−2 C
From Eqs. (i) and (ii), we get The final charge on the bigger sphere, Q1 = 3 × 10−2 C
12 (a) If potential at centre is zero, then –q
7 (c) Let the charge on the inner shell be q′. The total charge will be zero. Kq′ Kq So, + =0 (Q r2 > r1 ) r1 r2 − Kq/ r2 r q′ = ⇒ q′ = − 1 q ⇒ K / r1 r2
2q
O
0
1 −2q2 2q2 q2 = − + 4 πε 0 a a 2a 2 2 1 −4 q q −7q2 = = + 4 πε 0 a 2a 8πε 0 a
...(ii)
–Q
2Q
V1 + V2 + V3 + V4 = 0 kQ kq k 2Q k 2q − + + =0 r r r r or − Q − q + 2q + 2Q = 0 or Q = −q −
13 (b) Case I Electric potential energy, U1 =
1 2Qq 4 πε 0 a
R
Q
q
x=–a
x=0
x=+a
448
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Case II Electric potential energy, U2 =
19 (a) The work done against the force of
1 1 1 Qq + a + x a − x 4 πε 0
q
Q
q
x=–a
x=x
x=+a
Change in potential energy =U2 −U1 1 1 1 2 = + − Qq + − a x a x a 4 πε 0
20
21 (a) If charge on a conducting sphere of radius R is Q, then potential outside the 1 Q sphere, Vout = 4 πε 0 r 1 Q At the surface of sphere, Vs = 4 πε 0 R
a ( a − x + a + x) − 2 ( a 2 − x 2 ) 1 = Qq 4 πε0 (a 2 − x2 )a 2 1 2x For x < < a , ∆U = Qq 3 4 πε0 a
∆U = x 2
⇒
14 (a) We know that,
Work done = q∆V and potential, Q V = 4 πε 0r
B (0, b)
O
22 (d) Ionisation potential (V ) of mercury is the energy required to strip it of an electron. The electric field strength is V given by, E = d where, d is distance between plates creating electric field.
A (a, 0)
Work done in taking a charge Q from A to B, Q Q W =q − b 4 πε 4 πε 0 0a =
Given, V = 10.39 V ∴
Qq a − b 4 πε 0 ab
23 (b) Electrostatic field at the surface of a conductor is perpendicular to the surface.
24 (a) Inside the conducting charged
∴ Work done, W = qV
sphere, electric field is zero and potential remains constant at all points and equals to potential at the surface.
16 (a) The potential at the centre of the
17
sphere is 80 V, because it remains same at each point under the metallic hollow sphere. 1 (c) For a point charge, V ∝ r 1 p For a dipole, V = ⋅ 4 πε 0 r2 [on axial position] 1 i.e. V ∝ 2 r The electric dipole potential varies as 1/r at large distance is not true.
18 (d) A positively charged body can have positive, negative or zero potential. When we ground the charged body, potential difference between body and ground is zero but not the charge and same for negatively charged body.
E = 1.5 × 106 Vm −1 V 10.39 d= = m E 1.5 × 106
Hence, distance travelled by electron to gain ionisation energy is 10.39 = m 1.5 × 106
15 (b) Potential at a point in a field is defined as the amount of work done in bringing a unit positive test charge (q) from infinity to that point along any arbitrary path, W i.e. V = q
repulsion in moving the two charges closer, increases the potential energy of the system. 1 (a) By using, m(v12 − v22 ) = QV 2 1 × 10−3[ v12 − (0.2)2 ] = 10−8 (600 − 0) 2 ⇒ v1 = 22.8 cms−1
Hence, the potential at 1/4 m from the centre is 1000 V.
25 (b) For a uniform electric field, the
26
equipotential surfaces are placed at right angles to the lines of forces. Therefore, only three points have the same electric field potential. (b) Potential inside the sphere will be same as that on its surface, i.e. q V = Vsurface = volt 10 q Vout = volt 15 Vout 2 2 = ⇒ Vout = V ∴ V 3 3
27 (a) The potential at the centre of the
sphere is 80 V, because it remains same at each point under the metallic hollow sphere.
28 (c) Potential difference between two equipotential surfaces A and B, 1 1 VA − VB = kq − rA rB r − r kqt1 = kq B A = rA rB rArB (VA − VB ) rArB or t1 = kq ⇒ t1 ∝ rArB Similarly, t2 ∝ rB rC Since, rA < rB < rC , therefore rArB < rB rC ∴ t1 < t2
29 (a) Potential gradient relates with electric field according to the − dV following relation, E = dr Given, V = − x 2 y − xz3 + 4 ∂V ∂V $ ∂V $ ∂V $ = − i− j− k ∂r ∂x ∂y ∂x = [(2xy + z3 )$i + x 2$j + 3xz2k$ ]
E=−
30 (b) Given, c = a + b c
C
B
A
b a σ –σ
σ
As, potential is given by 1 q σ V = = R 4 πε 0 R ε 0 Potential at A, σ σ σ VA = a − b+ c ε0 ε0 ε0 σ = (a − b + c) ε0 σ 2σ = (a − b + a + b) = a ε0 ε0 Potential at B, σ σ σ σ VB = b − b + c= c ε0 ε0 ε0 ε0 Potential at C, σ σ σ σ VC = c − c + c= c ε0 ε0 ε0 ε0 Hence, VB = VC ≠ VA or VC = VB ≠ VA
31 (a) As charge is being distributed on the outer surface of conducting sphere and for hollow sphere also, charge is distributed on outer surface. If both spheres have same potential, then charge will be same, independent of the fact that sphere is hollow or solid,
449
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
V1 R2 Q1 = V2 R1 Q2
=
V1 = V2
As,
R1 = R2 ⇒ Q1 = Q2 Therefore, both Assertion and reason are correct and Reason is the correct explanation of Assertion.
32 (d)As, volume of n identical droplets
= volume of bigger droplet 4 3 4 πr (n) = πR 3 3 3 R3 R = ⇒ n = n1/ 3 r r3 ⇒ R = rn1/ 3 Let Q be the final charge on the bigger droplet. By conservation of charge, nq = Q Potential of smaller droplets is 1 q V = 4 πε 0 r Potential of bigger droplet is 1 nq 1 Q = V′ = 4 πε 0 R 4 πε 0 r(n)1/ 3 V ′ = n1− 1/ 3 V = Vn2/ 3
33 (a) Charge given to a conductor is uniformly distributed at its outer surface to acquire its minimum potential energy state.
34 (c) Electric potential at point P is given as V =
1 4 πε 0
A –q
qx cosθ x2 r2 − cos2 θ 4
O θ
r
P
Similarly, U f is also zero. ⇒ U t −U i = 0 Hence, W =0
36 (d) Electrostatic potential energy of the given system is given as 1 1 U = × (Qq + Qq + q2 ) 4 πε 0 a Given, U = 0 ⇒
37 (a) Work done is given as
dW = F dx Force on charge (q) due to uniform electric field is F = qE W
done in increasing the separation from a to 2a is W =U f −Ui +q +q
a –2 q
qEdx ⇒ W = qEy
38 (a) Surface charge density is given as Q Q σ= = A 4 πR 2 As, σA = σB Q1 Q2 ⇒ = 2 4 πR1 4 πR22 Q1 Q1 V1 R1 = ⇒ ⇒ = V2 R2 4 πε 0R12 4 πε 0R22
39 (c) Electrostatic potential energy, 1 q1q2 ⋅ 4 πε 0 r Here, q1 = q2 = 1.6 × 10−19 C, U =
9 × 10 9 × 1.6 × 10 −19 × 1.6 × 10 −19 9 × 10 −15
= 2.56 × 10−14 J
35 (d) According to the question, work
–2 q
y
∫0 dW = ∫0
∴U=
r>>>x Hence, V ∝ qx
⇒
q 2
dW = F ⋅ dx = F dx cosθ For maximum work, θ = 0°
As,
a
2Qq = − q2 ⇒ Q = −
r = 9 × 10−15 m
+q B
x
a
1 [ − 2q2 − 2q2 + 4 q2 ] = 0 4 πε 0a
2a
–2 q
2a
40 (c) Potential energy of the system, − kqQ kQq kq2 − − =0 x x 2x −4 kqQ + kq2 ⇒ =0 2x ⇒ kq2 = 4 kQq ⇒ q / Q = 4
41 (d) Electric potential is given in question,
2a
–2 q
q(−2q) q(−2q) 1 a + a Here, U i = 4 πε 0 + (−2q)(−2q) a
V = 3x 2 As, ⇒
E = − (∂V / ∂x ) ∂ E=− (3x 2 ) = − 6x ∂x
E(2, 0, 1) = − 6(2) = − 12 Vm −1
42 (c) Potential at a point in a field is defined as the amount of work done in bringing a unit positive test charge, from infinity to that point along any arbitrary path, i.e. W W V = ⇒V =φ= q0 Q (Q X VC .
55 (c) Let potential at point P is zero is at x unit from q2, i.e. − 6 µC. ⇒
VP = VA + VB = 0 1 1 qB qA ⋅ =− 4 πε 0 (20 + x ) 4 πε 0 x
⇒
12 × 10−6 − (− 6 × 10−6 ) = x 20 + x
50 (d) Electric potential of charged q spherical shell, V = (0 ≤ r ≤ R ) 4 πε 0R ∴ Electric potential at centre = Electric potential on the surface
51 (c) Volume of 8 drops = Volume of a big drop
4 4 ∴ πr3 × 8 = πR 3 3 3
⇒ 8r3 = R 3 …(i) ⇒ 2r = R According to charge conservation, …(ii) 8q = Q q Potential of one small drop, V ′ = 4 πε 0r Similarly, potential of big drop, Q V = 4 πε 0R V′ q R V′ q 2r Now, = × ⇒ = × 20 8q r V Q r [from Eqs. (i) and (ii)] ∴ V′ = 5 V
⇒
1 q ⋅ 4 πε 0 r 9 × 109 × 3 × 10−6 500 = r 9 × 109 × 3 × 10−6 ⇒ r= 500 ⇒ r = 54 m ∴ Electric field on the surface, 1 q V 500 ⋅ Es = = s = 4 πε 0 R 2 R 54 sphere, Vs =
57 (b) Electric potential at surface,
52 (d) Potential decreases in the direction of electric field. Dotted lines are equipotential lines. Y
(Q q = Ze) 50 × 1.6 × 10 9 × 10−15
= 8 × 106 V
58 (a) Potential at A, VA =
E
y
VB B (0,2) VA
A
1 q 4 πε 0 a
VC C (2,0)
X
VA = VC and VC > VB
When charge q3 is at D, then 1 q1q3 q2q3 UD = + 4 πε 0 0.4 0.1 Hence, change in potential energy, ∆U = U D − UC 1 q2q3 q2q3 = − 4 πε 0 0.1 0.5 q But ∆U = 3 k 4πε 0 q3 1 q2q3 q2q3 k= ∴ − 4 πε 0 4 πε 0 0.1 0.5
O
k = q2 (10 − 2) = 8q2
potential is same everywhere is called an equipotential surface. The electric field and hence lines of force everywhere are at right angles to the equipotential surface. This is so, because there is no potential gradient along any direction parallel to the surface and so no electric field is parallel to the surface.
−19
61 (d) The potential at P is the ratio of the work done in bringing the test charge from infinity to the point P to the magnitude of test charge (q). Thus, the potential at P due to charge + q is given by W 1 q V = = volt q0 4πε 0 r Given,
A
r = 50 cm = 50 × 10−2 m q = 25 × 10−10 C
∴
a
∴
potential energy is 1 q1q3 q2q3 UC = + 4 πε 0 0.4 0.5
This means the electric field and hence lines of force are always at right angles to the equipotential surface. Hence, they are not concentric spheres for uniform electric field. They are concentric spheres for an isolated point charge. Options (a), (c) and (d) are properties of equipotential surface.
= 9.25 < 10 NC−1
= 9 × 109 ×
59 (a) When charge q3 is at C, then its
60 (b) Any surface over which the electric
56 (a) Electric potential on the surface of
1 q 4 πε 0 R
1 q 4 πε 0 a
Thus, work done in carrying a test charge −Q from A to B, W = (VA − VB )(− Q ) = 0
⇒
2x = 20 + x = 20 cm = 0.20 m
V =
Potential at B, VB =
a
B
x
V =
9 × 109 × 25 × 10−10 50 × 10−2
= 45 V
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
Topic 2 Capacitance and Capacitors 2019 1 In a parallel plate capacitor, the capacity increases, if (a) area of the plate is decreased (b) distance between the plates increases (c) area of the plate is increased (d) dielectric constant decrease
[MHT CET]
2 A capacitor of capacitance 15µF having dielectric slab of ε r = 2.5, dielectric strength 30 MV/m and potential difference = 30 V. Calculate the area of the plate. [AIIMS] (a) 6.7 × 10−4 m 2 (b) 4 . 2 × 10−4 m 2 −4 2 (c) 8.0 × 10 m (d) 9.85 × 10−4 m 2 3 A parallel plate capacitor is charged. If the plates are pulled apart [DCE] (a) the capacitance increases (b) the potential difference increases (c) the total charge increases (d) the charge and potential difference remains the same 4 Van de Graaff generator is used to [JIPMER] (a) create a high potential of range of few million volts (b) create a low potential of range of few million volts (c) to de-accelerate projectile; like protons, deuterons, etc. (d) it cannot be used to study collision experiments in physics 2018 5 The electrostatic force between the metal plates of an isolated parallel plate capacitor C having a charge Q and area A is [NEET] (a) proportional to square root of the distance between the plates (b) inversely proportional to the distance between the plates (c) independent of the distance between the plates (d) inversely proportional to the distance between the plates 6 If a capacitor having capacitance 2F and plate separation of 0.5 cm will have area [JIPMER] (a) 1130 cm 2 (b) 1130 km 2 (c) 1130 m 2 (d) None of these
2016 8 A dielectric of dielectric constant K is introduced such that half of its area of a capacitor of capacitance C is occupied by it. The new capacity is [J&K CET] C (a) 2C (b) 2 (1 + K ) C (c) (d) 2C (1 + K ) 2
2015 9 A parallel plate air capacitor of capacitance C is connected to a cell of emfV and then disconnected from it. A dielectric slab of dielectric constant K, which can just fill the air gap of the capacitor is now inserted in it. Which of the following is incorrect? [AIPMT] (a) The potential difference between the plates decreases K times (b) The energy stored in the capacitor decreases K times 1 (c) The change in energy stored is CV 2 (1/ K − 1) 2 (d) The charge on the capacity is not conserved
2014 10 Two thin dielectric slabs of dielectric constants K 1 and
K 2 ( K 1 < K 2 ) are inserted between the plates of a parallel plate capacitor, as shown in the figure below. The variation of electric field E between the plates with distance d as measured from plate P is correctly shown by P
K1
(a)
E
0
2017 7 A parallel plate capacitor of capacitance 100 pF is to be constructed by using paper sheets of 1 mm thickness as dielectric. If the dielectric constant of paper is 4, the number of circular metal foils of diameter 2 cm each required for the purpose is [VITEEE] (a) 40 (b) 20 (c) 30 (d) 10
– – – – – – –
+ + + + + + +
(c)
0
K2
(b)
(d) d
E
0
d
E
[CBSE AIPMT]
Q
d
E
0
d
452
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
11 The capacitance of two concentric spherical shells of radii [EAMCET] R1 and R 2 ( R 2 > R1 ) is ( R 2 − R1 ) (a) 4πε 0 R 2 (b) 4πε 0 R1 R 2 R1 R 2 (d) 4πε 0 R1 (c) 4πε 0 ( R 2 − R1 ) 12 Two capacitors of 10 pF and 20 pF are connected to 200 V and 100 V sources, respectively. If they are connected by the wire, then what is the common potential of the capacitors? [KCET] (a) 133.3 V (b) 150 V (c) 300 V (d) 400 V
2013 13 A parallel plate capacitor is located horizontally such that one of the plates is submerged in a liquid while the other is above the liquid surface. When plates are charged, the level of liquid [AIIMS]
Charged
Liquid
(a) rises (b) falls (c) remains unchanged (d) may rise of fall depending on the amount of charge
14 A capacitor of capacitance C has charge Q and stored energy is W. If the charge is increased to 2Q, the stored energy will be [UP CPMT] W W (a) (b) 4 2 (c) 2W (d) 4W 15 The plates of a parallel plate capacitor with air as medium are separated by a distance of 8 mm. A medium of dielectric constant 2 and thickness 4 mm having the same area is introduced between the plates. For the capacitance to remain the same, the distance between the plates is (a) 8 mm (b) 6 mm [Manipal] (c) 4 mm (d) 10 mm 16 A capacitor having capacity of 2 µF is charged to 200 V and then the plates of the capacitor are connected to a resistance wire. The heat produced (in joule) will be (b) 4 × 10−2 (a) 2 × 10−2 [WB JEE] 4 10 (c) 4 × 10 (d) 4 × 10 17 The capacity of an isolated conducting sphere of radius R is proportional to [KCET, RPMT] 1 2 (b) 2 (a) R R 1 (c) (d) R R
2012 18 A parallel plate capacitor has a uniform electric field E in the space between the plates. If the distance between the plates is d and area of each plate is A, the energy stored in the capacitor is [CBSE AIPMT] 1 E 2 Ad 2 (b) (a) ε 0 E 2 ε0 1 (d) ε 0 EAd (c) ε 0 E 2 Ad 2
19 A spherical drop of capacitance 1µF is broken into eight drops of equal radius. Then, the capacitance of each small drop is [AIIMS] 1 1 1 (b) µF (c) µF (d) 8 µF (a) µF 2 4 8 20 Two identical capacitors each of capacitance 5 µF are charged to potentials 2 kV and 1 kV, respectively. Their negative ends are connected together. When the positive ends are also connected together, the loss of energy of the system is [AFMC, KCET] (a) 160 J (b) zero (c) 5 J (d) 1.25 J 21 An uncharged capacitor with a solid dielectric is connected to a similar air capacitor charged to a potential of V0 . If the common potential after sharing of charges becomes V, then the dielectric constant of the solid dielectric must be [UP CPMT, VMMC]
V (a) 0 V (V0 + V ) (c) V
V (b) V0 V −V (d) 0 V
2011 22 Electric potential of earth is taken to be zero because earth is a good (a) insulator (c) semiconductor
[AIIMS]
(b) conductor (d) dielectric
23 When a capacitor is connected to a battery, [AIIMS] (a) a current flows in the circuit for sometime, then decreases to zero (b) no current flows in the circuit at all (c) an alternating current flows in the circuit (d) None of the above 24 A parallel plate capacitor is connected to a 5 V battery and charged. The battery is then disconnected and a glass slab is introduced between the plates. Then, the quantities that decreases are [KCET] (a) charge and potential difference (b) charge and capacitance (c) capacitance and potential difference (d) energy stored and potential difference
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
2010 25 A charged oil drop of mass 2.5 × 10−7 kg is in space
between the two plates, each of area 2 × 10−2 m 2 of a parallel plate capacitor. When the upper plate has a charge of 5 × 10−7 C and the lower plate has an equal negative charge, the oil remains stationary. The charge of [AIIMS] the oil drop is (Take, g = 10 ms −2 ) (a) 9 × 10−1 C (b) 9 × 10−6 C (d) 1.8 × 10−14 C (c) 8.85 × 10−13 C
26 Work done in placing a charge of 8 × 10−18 C on a condenser of capacity 100 µF is [AFMC] (a) 16 × 10−32 J (b) 31 × 10−26 J (c) 4 × 10−10 J (d) 32 × 10−32 J 27 The capacitance of a parallel plate capacitor with air as medium is 3 µF. With the introduction of a dielectric medium between the plates, the capacitance becomes [BHU] 15 µF. The permittivity of the medium is 2 −1 −2 (a) 5 C N m (b) 15 C2 N−1 m −2 (c) 0.44 × 10−10 C2 N−1 m −2 (d) 8.845 × 10−11 C2 N−1 m −2 28 A 500 µF capacitor is charged at the steady rate of 100 µCs −1 . How long will it take to raise the potential difference between the plates of the capacitor to 10 V? (a) 5 s (b) 10 s [BHU] (c) 50 s (d) 100 s 29 Two conducting spheres of radii R1 and R 2 are charged with charges Q1 and Q2 , respectively. On bringing them in contact, there is [BHU] (a) no increase in the energy of the system (b) an increase in the energy of the system, if Q1 R 2 ≠ Q2 R1 (c) always a decrease in the energy of the system (d) a decrease in the energy of the system, if Q1 R 2 = Q2 R1 30 A parallel plate air capacitor of capacitance C 0 is connected to a cell of emf V and then disconnected from it. A dielectric slab of dielectric constant K, which can just fill the air gap of the capacitor, is now inserted in it. Which of the following is incorrect? [BHU] (a) The potential difference between the plates decreases K times (b) The energy stored in the capacitor decreases K times 1 (c) The change in energy C 0V 2 ( K − 1) 2 1 1 (d) The change in energy C 0V 2 − 1 K 2
453
31 The energy stored in a condenser of capacity C which has been raised to a potentialV is given by [UP CPMT] 1 1 1 2 (b) CV (c) CV (d) (a) CV 2 2 2VC 32 Capacity of a capacitor is 48 µF. When it is charged from 0.1 C to 0.5 C, change in the energy stored is [MHT CET] (a) 2500 J (b) 2.5 × 10−3 J (d) 2.42 × 10−2 J (c) 2.5 × 106 J 33 In a parallel plate capacitor, the capacity increase, if (a) area of the plate is decreased [MHT CET] (b) distance between the plates increases (c) area of the plate is increased (d) dielectric constant decrease 34 The capacitance of a metallic sphere is 1µF, then its radius is nearly [Manipal] (a) 1.11 m (b) 10 m (c) 9 km (d) 1.11 cm 35 A capacitor is charged by a battery and the energy stored is U. The battery is now removed and the separation distance between the plates is doubled. The energy stored now is [Manipal] (a) U / 2 (b) U (c) 2U (d) 4U 36 Energies stored in capacitor and dissipated during charging a capacitor bear a ratio [MP PMT] (a) 1 : 1 (b) 1 : 2 (c) 1 : 1/2 (d) 2 : 1 37 What is the value of capacitance, if the thin metallic plate is introduced between two parallel plates of area A and separated at distance d? [MP PMT] ε0 A 2ε 0 A 4ε 0 A ε0 A (a) (b) (c) (d) 2d d d d 38 What is called electrical energy tank? (a) Resistor (b) Inductor (c) Capacitor (d) Motor
[MP PMT]
39 The radii of the inner and outer spheres of a condenser are 9 cm and 10 cm, respectively. If the dielectric constant of the medium between the two spheres is 6 and charge on the inner sphere is 18 × 10−9 C, then the potential of inner sphere will be, if the other sphere is earthed [Haryana PMT] (a) 180V (b) 30 V (c) 18 V (d) 90 V 40 In a parallel plate capacitor, the separation between the plates is 3 mm with air between them. Now, 1 mm thick layer of a material of dielectric constant 2 is introduced between the plates due to which the capacity increases. In order to bring its capacity of the original value, the separation between the plates must be made [Haryana PMT] (a) 1.5 mm (b) 2.5 mm (c) 3.5 mm (d) 4.5 mm
454
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
41 The plates in a parallel plate capacitor are separated by a distance d with air as the medium between the plates. In order to increase the capacity by 66%, a dielectric slab of dielectric constant 5 is introduced between the plates. What is the thickness of the dielectric slab? [EAMCET] (a) d / 4 (b) d / 2 (c) 5d / 8 (d) d 42 If the energy of a 100 µF capacitor charged to 6 kV could all be used to lift a 50 kg mass, then what would be the greatest vertical height through which mass could be raised? [MGIMS] (a) 0.6 mm (b) 3.6 m (c) 1.2 mm (d) 12 m 43 A charged oil drop of mass 9.75 × 10−15 kg and charge 30 × 10−16 C is suspended in a uniform electric field existing between two parallel plates. The field between the plates is (Take, g = 10 ms −2 ) [JCECE] −1 −1 (a) 3.25 Vm (b) 3000 Vm (c) 325 Vm −1 (d) 32.5 Vm −1
2009 44 Assertion Circuit containing capacitors should be handled cautiously even when there is no current. Reason The capacitors are very delicate and so quickly breakdown. [AIIMS] (a) Both Assertion and Reason are correct but Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
49 If dielectric is inserted in charged capacitor (battery removed), the quantity that remain constant is [MHT CET] (a) capacitance (b) potential (c) intensity (d) charge 50 Capacitance (in farad) of spherical conductor with radius 1 m is [Manipal] −6 −10 (b) 10 (a) 1.1 × 10 (d) 10−3 (c) 9 × 10−9 51 Energy stored per unit volume of a parallel plate capacitor having plate area A and plate separation d when charged to a potential ofV volt is (air space in between the plates) [J&K CET]
1 (a) C 2V 2 2 1 V (c) ε 0 2 d
q2 (b) 4C 1 V 2 (d) ε 0 2 2 d
52 A parallel plate capacitor of plate area A has a charge Q. The force on each plate of the capacitor is [BCECE] 2Q 2 Q2 (b) (a) ε0 A ε0 A 2 Q (d) zero (c) 2ε0 A 53 What is the area of the plates of a 3 F parallel plate capacitor, if the separation between the plates is 5 mm? (b) 4.529 × 109 m 2 [MGIMS] (a) 1.694 × 109 m 2 (c) 9.281 × 109 m 2 (d) 12.981 × 109 m 2
45 The potential energy of a charged parallel plate capacitor isU 0 . If a slab of dielectric constant K is inserted between the plates, then the new potential energy will be [AFMC] U0 U0 2 (c) 2 (b) U 0 K (d) U 0 (a) K K
54 A condenser of capacitance 6 µF was originally charged to 10 V. Now, potential difference is made 20 V. The increase in potential energy is [MGIMS, Punjab PMET] (a) 3 × 10−4 J (b) 6 × 10−4 J (c) 9 × 10−4 J (d) 12 × 10−4 J
46 A capacitor of 10 µF is charged to a potential 50 V with a battery. The battery is now disconnected and an additional charge 200µ C is given to the positive plate of the capacitor. The potential difference across the capacitor will be [UP CPMT] (a) 100 V (b) 70 V (c) 80 V (d) 50 V
55 The outer sphere of a spherical air capacitor is earthed. For increasing its capacitance, [MGIMS] (a) vacuum is created between two spheres (b) dielectric material is filled between the two spheres (c) the space between two spheres is increased (d) the earthing of the outer sphere is removed 2008
47 Capacitors are used in electrical circuits where appliances need more [BVP] (a) current (b) voltage (c) watt (d) resistance
56 The energy required to charge a parallel plate condenser of plate separation d and plate area of cross-section A such that the uniform electric field between the plates is E, is [CBSE AIPMT] 1 2 ε0E ε E2 2 (b) 0 (a) Ad Ad 1 (d) ε 0 E 2 Ad (c) ε 0 E 2 Ad 2
48 If the circumference of a sphere is 2 m, then the capacitance of sphere in water would be (a) 2700 pF (b) 2760 pF (c) 2780 pF (d) 2800 pF
[BVP]
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ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
57 Assertion A parallel plate capacitor is connected across battery through a key. A dielectric slab of dielectric constant K is introduced between the plates. The energy which is stored becomes K times. Reason The surface density of charge on the plate remains constant or unchanged. [AIIMS] (a) Both Assertion and Reason are correct but Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 58 The plates of a parallel plate capacitor are not exactly parallel. The surface charge density [Manipal] (a) is lower at the closer end (b) will not be uniform (c) each plate will have the same potential at every point (d) Both (b) and (c) 59 A sheet of aluminium foil of negligible thickness is introduced between the plates of a capacitor. The capacitance of the capacitor [MP PMT] (a) decreases (b) remains unchanged (c) becomes infinite (d) increases 60 The capacitance C of a capacitor is [J&K CET] (a) independent of the charge and potential of the capacitor (b) dependent on the charge and independent of potential (c) independent of the geometrical configuration of the capacitor (d) independent of the dielectric medium between the two conducting surfaces of the capacitor 61 64 small drops of water having same charge and same radius are combined to form one big drop. The ratio of capacitance of big drop to small drop is [Guj CET] (a) 2 : 1 (b) 1 : 2 (c) 4 : 1 (d) 1 : 4
2007 62 A capacitor of 20 µF charged upto 500 V is connected in
parallel with another capacitor of 10 µF, which is charged upto 200 V. The common potential is [AFMC] (a) 250 V (b) 300 V (c) 400 V (d) 600 V
63 An insulator plate is passed between the plates of a capacitor. Then, current [MP PMT] A
B
(a) first flows from A to B and then from B to A (b) first flows from B to A and then from A to B (c) always flows from B to A (d) always flows from A to B 64 In a capacitor of capacitance 20 µF, the distance between the plates is 2 mm. If a dielectric slab of width 1 mm and dielectric constant 2 is inserted between the plates, then the new capacitance will be [BCECE] (a) 22 µF (b) 26.6 µF (c) 52.2 µF (d) 13 µF
65 To increase the charge on the plate of a capacitor means to [Guj CET]
(a) decrease the potential difference between the plates (b) decrease the capacitance of the capacitor (c) increase the capacitance of the capacitor (d) increase the potential difference between the plates
66 27 small drops each having charge q and radius r coalesce to form a big drop. How many times charge and capacitance will become? [JCECE] (a) 3q, 27 C (b) 27q, 3 C (c) 27q, 27 C (d) 3q, 3 C 67 A parallel plate condenser with oil (dielectric constant 2) between the plates has capacitance C. If oil is removed, the capacitance of capacitor becomes [MHT CET] (a) 2C (b) 2C C C (d) (c) 2 2
2006 68 A parallel plate air capacitor is charged to a potential difference of V volt. After disconnecting the charging battery, the distance between the plates of the capacitor is increased using an insulating handle. As a result, the potential difference between the plates [CBSE AIPMT, J&K CET]
(a) decreases (c) becomes zero
(b) does not change (d) increases
69 If the plates of a parallel plate capacitor are not equal in area, then quantity of charge [MHT CET] (a) on the plates will be same but nature of charge will differ (b) on the plates as well as nature of charge will be different (c) on the plates will be different but nature of charge will be same (d) as well as nature of charge will be same 70 A capacitor of capacitance 6 µF is charged upto 100 V. The energy stored in the capacitor is [Manipal] (a) 0.6 J (b) 0.06 J (c) 0.03 J (d) 0.3 J
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
71 700 pF capacitor is charged by 50 V battery. Electrostatic energy is stored by it will be [RPMT] −8 (a) 17. 0 × 10 J (b) 13.0 × 10−9 J (c) 8.7 × 10−7 J (d) 6.7 × 10−7 J 72 A capacitor is connected to a cell of emf E having some internal resistance r. The potential difference across the [MP PMT]
(a) cell is < E (b) cell is E (c) capacitor is > E (d) capacitor is < E
76 Energy E is stored in a parallel plate capacitor C1 . An identical uncharged capacitor C 2 is connected to it, kept in contact with it for a while and then disconnected, the [EAMCET] energy stored in C 2 is E E E (b) (c) (d) zero 2 3 4 77 Two plates (area = S ) charged to + q1 and + q 2 ( q 2 < q1 ) are brought closer to form a capacitor of capacitance C. The potential difference across the plates is [DUMET] q1 − q 2 q1 − q 2 (a) (b) 2C C q1 − q 2 2( q1 − q 2 ) (d) (c) 4C C (a)
74 The potentials of the two plates of capacitors are +10 V and − 10V. The charge on one of the plates is 40 C. The capacitance of the capacitor is [Punjab PMET] (a) 2 F (b) 4 F (c) 0.5 F (d) 0.25 F
78 Two capacitors of capacitance C1 and C 2 are connected in parallel. If a charge Q is given to the combination, the charge gets shared. The ratio of the charge on the capacitor C1 to the charge on the capacitor C 2 is [Guj CET] (b) C 2 / C1 (a) C1C 2 (c) C1 + C 2 (d) C1 / C 2 79 The two capacitors C1 and C 2 are charged to potentialsV1 andV2 and then connected in parallel. There will be no flow of energy, if [JCECE] (a) C1V1 = C 2V2 (b) V1 = V2 C C (c) C1 = C 2 (d) 1 = 2 V1 V2 2005
75 An air parallel plate capacitor has capacity C. The capacity and distance between plates are doubled when immersed in a liquid, then dielectric constant of the liquid is (a) 1 (b) 2 [Punjab PMET] (c) 3 (d) 4
80 An air filled parallel plate condenser has a capacity of 2 pF. The separation of the plates is doubled and the interspace between the plates is filled with wax. If the capacity is increased to 6 pF, the dielectric constant of wax is [KCET] (a) 2 (b) 3 (c) 4 (d) 6
73 The plates of a charged condenser are connected to a voltmeter. If the plates are moved apart, the reading of voltmeter will [J&K CET] (a) increase (b) decrease (c) remain unchanged (d) information is insufficient
Answers 1 (c)
2 (a)
3 (b)
4 (a)
5 (c)
6 (b)
7 (d)
8 (c)
9 (d)
10 (b)
11 (c)
12 (a)
13 (a)
14 (d)
15 (d)
16 (b)
17 (d)
18 (c)
19 (a)
20 (d)
21 (d)
22 (b)
23 (a)
24 (d)
25 (c)
26 (d)
27 (c)
28 (c)
29 (d)
30 (c)
31 (b)
32 (a)
33 (c)
34 (c)
35 (c)
36 (d)
37 (a)
38 (c)
39 (b)
40 (c)
41 (b)
42 (b)
43 (d)
44 (c)
45 (b)
46 (b)
47 (a)
48 (d)
49 (d)
50 (a)
51 (d)
52 (c)
53 (a)
54 (c)
55 (b)
56 (c)
57 (c)
58 (d)
59 (b)
60 (c)
61 (c)
62 (c)
63 (b)
64 (b)
65 (d)
66 (b)
67 (d)
68 (d)
69 (a)
70 (c)
71 (c)
72 (b)
73 (a)
74 (a)
75 (d)
76 (c)
77 (a)
78 (d)
79 (b)
80 (d)
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ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
Explanations 1 (c) In a parallel plate capacitor, the capacity of capacitor, k ε0A C = d ∴ C ∝A So, the capacity of capacitor increases, if area of the plate is increased.
2 (a) Given, capacitance of a capacitor, C = 15 nF = 15 × 10−9 F,
εr = 2 . 5 Electric field, E = 30 × 106 V/m Potential difference, V = 30 V Area of plate = ? If d be the distance between the plates, then V 30 d= = = 10−6 m E 30 × 106 Capacitance of capacitor,
ε ε A C= 0 r d
⇒
Thus, it means electrostatic force is independent of the distance between the plates.
6 (b)Q Capacitance of a parallel plate
ε0A d Cd 2 × 0.5 × 10−2 A= = ε0 8.854 × 10−12
capacitor, C = ⇒
A = 1130 km 2
⇒
7 (d) The arrangement of n metal plates separated by dielectric acts as parallel combination of (n − 1) capacitors. (n − 1) K ε 0 A Therefore, C = d Here, C = 100 pF = 100 × 10−12 F, K = 4 , ε 0 = 8.85 × 10−12 C2N−1m −2,
−12
8.85 × 10 × 2 .5 × A 10−6 −4 A = 6.7 × 10 m 2
15 × 10−9 =
Substituting the value of C in Eq. (iii), we get Q 2d Q2 F= = 2ε 0 Ad 2ε 0 A
3 (b) The electric field between the plates is given by V E= or V = Ed or V ∝ d d Hence, if the plate are pulled apart the potential difference increases.
4 (a) Van de Graaff generator is a device used to create a high potential difference of range of few million volts.
−2 2
2
A = πr = 314 . × (1 × 10 ) and d = 1 mm = 1 × 10−3.
(n − 1) × 4 × (8.85 × 10−12 ) . × (1 × 10−2 )2 × 314 ∴100 × 10−12 = 1 × 10−3 1111156 . or n= = 9.99 ≈ 10 111156 .
8 (c) The dielectric is introduced such that half of its area is occupied by it. In the given case, the two capacitors are in parallel.
Q2 W = = Fd 2C Q2 …(iii) ⇒ F= 2Cd As ,the capacitance of a parallel plate ε A capacitor is given as C = 0 d
connected to a cell of emf (V ), then charge stored will be q = C V ⇒V = q/C Also, energy stored is, U = 1 / 2CV 2 = q2 / 2C As the battery is disconnected from the capacitor, the charge will not be destroyed, i.e. q′ = q with introduction of dielectric in gap of capacitor, the new capacitance will be C ′ = CK ⇒ V ′ = q / C ′ = q / CK The new energy stored will be U′ =
q2 2CK
q2 1 − 1 2C K 1 1 = CV 2 − 1 K 2
∆U = U ′ − U =
10 (b) Graph of (b) will be the right graph of the electric field inside the dielectrics will be less than the electric field outside the dielectrics. The electric field inside the dielectric could not be zero.
E
0
d
As K 2 > K 1, the drop in electric field for K 2 dielectric must be more than K 1.
11 (c) We know that, A/2
5 (c) As we know, the total work in transferring a charge to a parallel plate capacitor is given as Q2 … (i) W = 2C We can also write a relation for work done as, W = F ⋅ d … (ii) From Eqs. (i) and (ii), we get
9 (d) When a parallel plate air capacitor
A/2 d
∴ But and Thus,
C′ = C1 + C2 Aε 0 C1 = 2d KAε 0 C2 = 2d Aε 0 KAε 0 C′ = + 2d 2d C C ′ = (1 + K ) 2
concentric spherical shells (R2 > R1 ) , 1 Q ...(i) VR1 = ⋅ 4 πε 0 R1 1 Q ...(ii) VR 2 = ⋅ 4 πε 0 R2 V = VR1 − VR 2 =
–Q R1 +Q
R2
1 1 1 ⋅ Q − 4 πε 0 R1 R2
If the capacitance of two concentric spherical shell be C, then Q Q C = = V Q R2 – R1 4 πε 0 R2R1 R1R2 = 4 πε 0 (R2 − R1 )
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
12 (a) Given, C 1 = 10 pF = 10 × 10−12 F, C 2 = 20 pF = 20 × 10−12 F, V1 = 200 V and V2 = 100 V q q We know that, V1 = 1 and V2 = 2 C1 C2 ⇒
…(i) q1 = V1 C 1 ...(ii) q2 = V2 C 2 So, common potential of capacitors, q + q2 V1 C 1 + V2 C 2 V = 1 = C1 + C2 C1 + C2 200 × 10 × 10−12 + 100 × 20 × 10−12 10 × 10−12 + 20 × 10−12 200 × 10 + 100 × 20 = 10 + 20 2000 + 2000 4000 = = = 133.3 V 30 30 (a) When plates of the capacitor are charged, opposite charges are induced on water (dielectric), so due to attractive forces, level of liquid rises. =
13
14 (d) From the formula, W = ∴
⇒ ⇒
Q′ 2 2C (2Q )2 W′= 2C Q2 W′= 4 2C W ′ = 4W
Q2 … (i) 2C
W′ =
(Q Q′ = 2Q)
[from Eq. (i)]
15 (d) Original capacity with air, ε A C = 0 d
...(i)
When dielectric plate (medium) of thickness t is introduced between the plates, then capacity becomes ε0A …(ii) C′ = 1 d′− t 1 − K But as given, C ′ = C ...(iii) where, t = 4 mm, d = 8 mm, K = 2 From Eqs. (i), (ii) and (iii), we get ε0A ε0A = 1 d d′− t 1 − K 1 d = d ′ – t 1 – K 1 d ′ = d + t 1 – K 1 = 8 + 4 1 – = 10 mm 2 Hence, d′ = 10 mm
16 (b) Heat produced in a wire is equal to the energy stored in capacitor, 1 H = CV 2 2 1 = × (2 × 10−6 ) × (200)2 2 = 10−6 × 200 × 200 = 4 × 10−2 J
V = V =
conductor, the electric potential of the conductor becomes V. Then, the capacitance of the conductor is C = q/V Potential on sphere of radius R is 1 q V = 4 πε 0 R q × 4 πε 0R ⇒ C = q
18 (c) Energy density for a parallel plate
1 ε 0E 2 and volume = Ad 2 Hence, total energy = energy density × volume 1 2 = ε 0E × ( Ad ) 2 1 = ε 0E 2 Ad 2
capacitor =
19 (a) Let R and r be the radii of bigger and each smaller drop, respectively. 4 3 4 πR = 8 × πr 3 ∴ 3 3 ...(i) ⇒ R = 2r The capacitance of a smaller spherical drop is .(ii)
C ′ = 4 πε 0R (Q R = 2r) = 2 × 4 πε 0r [from Eq. (ii)] = 2C C′ 1 C = = µF (Q C ′ = 1µF) 2 2
∴
20 (d) Loss of energy =
1 C 1C 2 (V1 − V2 )2 2 (C 1 + C 2 )
=
1 5 × 5 (2000 − 1000)2 × × 10−6 2 (5 + 5)
=
5 × 5 × 1000 × 1000 × 10−6 2 × 10
= 1 .25 J
C1V1 + C 2V2 C1 + C 2
0 + CV0 KC + C CV0 V = C (1 + K ) V0 V = ⇒ 1+ K V ⇒ K +1= 0 V V0 V −V K = − 1= 0 ⇒ V V The dielectric constant of the solid V −V dielectric, K = 0 V
22 (b) Earth is a conducting sphere of
= 4 πε 0R C ∝R
C = 4 πε 0r The capacitance of bigger drop is
Total charge Total capacitance
V =
⇒
17 (d) On giving a charge q to a
⇒
21 (d) Common potential,
large capacitance, V = q/C As, C is very large, so V → 0 for all finite charges. Hence, earth is a conductor.
23 (a) A current flows in the circuit during the time, the capacitor is charged. After the capacitor gets fully charged, the current stops flowing. It means when a capacitor is connected to a battery, a current flows in the circuit for sometime, then reduces to zero.
24 (d) The quantities, energy stored and potential difference decreases because capacitance increases as U =
1 q2 q and V = 2 KC KC
25 (c) We know that, qE = mg ε A mg qQ = mg or q = 0 Q ε0A
8.85 × 10−12 × 2 × 10−2 × 2.5 × 10−7 × 10 = 5 × 10−7 = 8.85 × 10−13 C
26 (d) Here, q = 8 × 10−18 C, C = 100 µF = 10−4 F q 8 × 10−18 V = = ∴ C 10−4 −14 = 8 × 10 V 1 ∴ Work done, W = qV 2 1 = × 8 × 10−18 × 8 × 10−14 2 = 32 × 10−32 J
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ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
27 (c) Capacitance of a parallel plate
ε A capacitor with air is C = 0 . d Capacitance of a same parallel plate capacitor with the introductory of a K ε0A dielectric medium, C ' = d where, K is the dielectric constant of a medium. C′ 15 ∴ =K ⇒K= =5 C 3 ε and K = ε0 or
ε = K ε 0 = 5 × 8.854 × 10−12 = 0.44 × 10−10 C2 N−1 m −2
28 (c) Charge, Q = CV = 500 µF × 10 V
29
= 500 × 10– 6 × 10 = 5 × 10−3 C Now, Q = qt ⇒ t = Q /q 5 × 10−3 t= 100 × 10−6 1 = × 1000 s = 50 s 20 1 Q1 (d) Potential, V1 = 4 πε 0 R1 1 Q2 and V2 = 4 πε 0 R2 Q Q If V1 = V2 , then 1 = 2 R1 R2 ⇒ Q1R2 = Q2R1 In this case, there will be no flow of charges. However, if the given spheres have unequal potentials, then the charges shall flow from higher potential to lower potential. Flow of charges shall be accompanied by loss of energy.
30 (c) Initial energy, 1 U i = C0 V 2 2 When dielectric slab is introduced between plates, then C ′ = KC 0 q q V and V′= = = C ′ KC 0 K Thus, potential difference decreases K times. 2 1 V Final energy, U f = (KC 0 ) K 2 1 1 or U f = C 0V 2 K 2
Thus, the energy stored in the capacitor decreases K times. Change in energy = U f − U i 1 1 = C 0V 2 − 1 K 2 Note that this change of energy is negative, i.e. there is a decrease of energy. Hence, option (c) is incorrect.
31 (b) Energy stored in a capacitor of capacitance C and potential V 1 is CV 2. 2
32 (a) Change in energy, ∆U =
1 q12 2
− C
q22
=
1 (0.5)2 − (0.1)2 2 48 × 10−6
=
1 0.25 − 0.01 2 48 × 10−6
=
1 0.24 1 104 = 2 48 × 10−6 2 2
⇒ U ′ ∝ d, as the separation distance d is doubled the energy stored also becomes 2 times, i.e. U ′ = 2U
36 (d) Half of the energy is dissipated during charging a capacitor. Energy stored in a capacitor 2 ∴ = Energy dissipated during 1 charging a capacitor
37 (a) When a metallic slab is inserted between the plates, capacitance, ε A C = 0 d−t Here, t = 0 as plate is very thin. ε A C = 0 ∴ d
38 (c) Capacitor stores electrical energy, whereas inductor stores magnetic energy. Hence, capacitor is called the electrical energy tank.
39 (b) Given system is a spherical capacitor, so capacitance of system, rr C = K × 4 πε 0 1 2 r2 − r1
= 2500 J
=
33 (c) In a parallel plate capacitor, the capacity of capacitor, C = Kε 0 A / d ⇒ C ∝A So, the capacity of capacitor increases, if area of the plate is increased.
34 (c) For a spherical capacitor of radius R, the capacitance is given by C = 4 πε 0R Given, C = 1 µF = 1 × 10−6 F C ⇒ R= 4 πε 0 = 9 × 109 × 1 × 10−6 m ⇒
R = 9 × 103 = 9 km
35 (c) Energy stored, U =
1 qV 2
As the distance d is increased between the two plates. Now, stored energy, 1 dU ′ = qV ′ 2 =
1 q 1 q2d q = 2 C 2 ε0A
6 9 × 10 −2 × 10 9 9 × 10 1
= 6 × 10−10 F Now, potential of inner sphere will be equal to potential difference of the capacitor. q 18 × 10−9 = 30 V ∴V = = C 6 × 10−10
40 (c) Dielectric constant, t t − d′ 1 2= 1 − d′ 1 d′ = mm 2 K =
⇒ ⇒
∴ New distance = 3 +
1 = 3.5 mm 2
41 (b) The capacity in air, C = ε 0 A / d The capacity when dielectric slab of dielectric constant 5 is introduced between the plates, ε0A C′ = t d−t+ 5 t d−t+ C 5 ...(i) = ∴ C′ d
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
166 ...(ii) (given) C 100 From Eqs. (i) and (ii), we get 4t t d−t+ d− 100 5 5 ∴ = = 166 d d 4 t ⇒ 100 d = 166d − 166 5 ⇒
C′ =
4 t ⇒ 166 = 66d 5 66d × 5 d ⇒ t= = 166 × 4 2
46 (b) Given, V = 50V We know that, Q = CV ⇒ Q = 10 × 10−6 × 50
E=
45
Hence, Assertion is correct but Reason is incorrect. (b) According to question, 1 U 0 = CV 2 2 ε A where, C = 0 d 1 ε0A 2 U0 = V ⇒ 2 d Now, new potential energy, 1 U = C nV 2 2 1 Kε 0 A 2 U = V ⇒ 2 d Kε A Q new capacitance, C n = 0 d U =U0 K
= 1.694 × 109 m 2
...(i)
where, K = dielectric constant of water = 80.1 R = radius of sphere ε 0 = 8.85 × 10−12 C2 /Nm 2 Now, given circumference of sphere =2m ⇒ 2πR = 2 2 1 R= = metre ⇒ 2π π Putting this in Eq. (i), we get C = 801 . × 4 π × 8.85 × 10−12 × ≈ 2800 × 10−12 F = 2800 pF
44 (c) Circuit containing capacitors
If some person handles such a capacitor without discharging it, he may get a severe shock.
where, A = area of capacitor. Cd 3 × 5 × 10−3 A= = ⇒ ε 0 8.85 × 10−12
given by
−1
should be handled cautiously even, when there is no current, because a capacitor does not completely discharge itself.
d = 5 mm = 5 × 10−3 m We know that, C = ε 0 A / d
Separation,
48 (d) Capacitance of a sphere in water is
9.75 × 10−15 × 10 mg = e 30 × 10−16
= 32.5 Vm
53 (a) Given, capacitance, C = 3F
circuit, where appliances need more current.
C = K 4 πε 0R
1 π
capacitor (battery removed), the quantity that remains constant is charge. 1 (a) C = 4 πε 0R = ×1 9 × 109 = 1.1 × 10−10 F
51 (d) Energy stored per unit volume of a parallel plate capacitor is known as energy density. 1 CV 2 U 1 CV 2 ...(i) σ= = 2 = V Ad 2 Ad Now, we know that, C = ε0A / d Putting the value of C in Eq. (i), we get 1 ε 0 AV 2 1 σ= × 2 d Ad ⇒ σ=
1 ε 0V 2 1 V 2 = ε0 2 2 d2 2 d
1 2
54 (c) Potential energy, U = CV 2 1 = C (V22 − V12 ) 2 1 = × 6 × 10−6 (202 −102 ) 2 = 3 × 10−6 × 300 = 9 × 10−4 J
55 (b) The capacitance can be increased
49 (d) If dielectric is inserted in charged
50
σ 2ε 0
Q Q2 = Q = 2 Aε 0 2 Aε 0
47 (a) Capacitors are used in electrical
43 (d) In equilibrium, eE = mg ⇒
F = QE = Q ×
= 500 µC Now, total charge, QT = 500 µC + 200 µC = 700 µC ⇒ 700 µC = 10 × 10−6 × V 700 ⇒ V = = 70 V 10
42 (b) Energy stored in the capacitor is used in lifting the mass. 1 ∴ mgh = CV 2 2 50 × 9.8 × h 1 = × 100 × 10−6 × (6 × 103 )2 2 50 × 9.8 × h 1 = × 100 × 10−6 × 36 × 106 2 1800 h= = 3.6 m ∴ 50 × 9.8
52 (c) Force on one plate due to another is
by two methods, i.e. by increasing the charges and by inserting a dielectric materials between the plates of capacitor. But capacitor here is earthened. So, the only method is to fill dielectric between the two spheres.
56 (c) Energy given by the cell, E = CV 2 Aε Here, C = 0 , V = Ed d Aε 0 2 2 E= ∴ (Ed ) = Aε 0E d d
57 (c) If a dielectric slab of dielectric constant K is filled in between the plates of a condenser while charging it, the potential difference between the plates does not change but the capacity becomes K times, therefore V ′ = V, C ′ = KC . Energy stored in the capacitor, 1 1 U ′ = C ′ V ′ 2 = (KC )(V 2 ) 2 2 1 2 = CV K = KU 2 Thus, energy stored becomes K times. Surface charge density, q′ C ′ V ′ σ′ = = A A KCV q = = K = Kσ A A
461
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
58 (d) Being a conductor, each plate have the same potential at each point. As E ∝ σ, and electric field being the dV gradient of potential E = is dr highest, where the plates are closest to each other. So, surface charge density is highest at closest end and lowest at far end. Hence, it is not uniform.
59 (b) Aluminium is a metal, so when we insert an aluminium foil, equal and opposite charges appear on its two surfaces. Since, it is of negligible thickness, so it will not affect the capacitance.
60 (c) Capacitance, C = Q /V For a dielectric media, C = εA / d Therefore, capacitance C of a capacitor is independent of the geometrical configuration of the capacitor.
61 (c) Let the radius of each small drop be r and the radius of big drop be R. When 64 small drops of water are combined to form one big drop, then the volume remains constant. So, the volume of 64 small drops = the volume of big drop 4 4 i.e. 64 × πr3 = πR 3 3 3 ⇒ 64 r3 = R 3 ⇒ 4r = R …(i) ⇒ R = 4r Now, the capacitance of a spherical conductor is C = 4 πε 0a (a is the radius of the conductor) Now, the capacitance of small drop, …(ii) C 1 = 4 πε 0r and the capacitance of big drop, C 2 = 4 πε 0R On putting the value of R from Eq. (i), we get C 2 = 4 πε 0 (4 r) …(iii) ⇒ C 2 = 16πε 0r On dividing Eq. (iii) by Eq. (ii), we get C 2 16πε 0r = C 1 4 πε 0r ⇒ ⇒
C2 4 = C1 1 C2 : C1 = 4 : 1
62 (c) Common potential,
65 (d) A large amount of charge given to
Net charge V = Net capacitance =
q1 + q2 C 1V1 + C 2V2 = C1 + C2 C1 + C2
Given, C 1 = 20 × 10−6 F ⇒ ⇒
V1 = 500 V C 2 = 10 × 10−6 F
⇒
V2 = 200 V
∴ V =
one plate raises its potential to be maximum and so a potential difference is established across the plates of capacitor.
66 (b) Let R and r be the radii of bigger and each smaller drop, respectively. In coalescing into a single drop, charge remains conserved.
−6
−6
20×10 × 500 + 10×10 × 200 30 × 10−6
= 400 V
63 (b) As insulator plate is passed between the plates of the capacitor, its capacity increases first and then decreases as the plate slips out. As a result, positive charge on plate A increases first and then decreases, hence current in outer circuit flows from B to A and then from A to B.
Charge on bigger drop = 27 × Charge on smaller drop i.e. q′ = 27q Now, before and after coalescing, volume remains same. 4 3 4 πR = 27 × πr3 3 3 ∴ R = 3r Hence, capacitance of bigger drop, C ′ = 4 πε 0R = 4 πε 0 (3 r) = 3(4 πε 0r) = 3C
64 (b) The capacitance C of a capacitor of area A and distance d between plates is given as ε A C = 0 d t
+q
–q
67 (d) The capacitance of a parallel plate capacitor with dielectric (oil) between its plates is …(i) C = Kε 0 A / d When dielectric (oil) is removed, then capacitance, …(ii) C 0 = ε0A / d Comparing Eqs. (i) and (ii), we get ⇒
d
When a dielectric slab of thickness t is placed between the plates, we have ε0A C′ = d − t + t/K −6
Given, C = 20 µF = 20 × 10 F, d = 2 mm = 2 × 10−3 m, ∴
t = 1 mm = 1 × 10−3 m, K = 2 C′ d = 1 C d − t 1 − K C′ 2 × 10−3 . = 133 = C 2×10−3 − 1×10−3 (1 – 1/ 2)
⇒ C′ = 1.33 × 20 × 10−6 = 26 .6 µF
C = KC 0 C C = C0 = 2 K
(Q K = 2)
68 (d) If the battery is removed after charging, then the charge stored in the capacitor remains constant. q = constant Change in capacitance, ε A C′ = 0 d′ As, d′ > d ∴ C′ < C Hence, potential difference between the plates, q V′ = C′ 1 or V′ ∝ C′ i.e.
As capacitance decreases, so potential difference increases.
462
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
The potential difference across the parallel plate capacitor is
69 (a) If the plates of a parallel plate capacitor are not equal in area, then quantity of charge on the plates will be same but nature of charge will different.
70 (c) The energy stored in the capacitor is given by
10V − (−10V) = 20 V Q 40 = = 2F ∴ Capacitance, C = V 20
75 (d) Capacity of air parallel plate capacitor,
1 U = CV 2 2 Given, C = 6 × 10−6 F, V = 100 V ∴
Aε 0 d Capacity of parallel plate capacitor when immersed in liquid and distance is doubled, is KAε 0 C′ = 2d Given, C ′ = 2C K Aε 0 2C = C ∴ Q C = 2 d C =
1 × 6 × 10−6 × (100)2 2 = 3 × 10−2 J = 0.03 J
U =
71 (c) Capacitance, C = 700 pF = 700 × 10−12 F Source voltage, V = 50 V Electrostatic energy is given by 1 E = CV 2 2 = 0.5 × 700 × 10−12 × (50)2
or
76 (c) Let capacitance of a parallel plate capacitor, C 1 = C If energy stored in capacitor C 1 is E.
−7
= 8.7 × 10 J
The charge on capacitor, q = 2EC 1 q2 Q E = 2C
72 (b) When capacitor is fully charged, it draws no current. When no current flows in the circuit, potential difference across the cell = emf of the cell = potential difference across the capacitor, i.e. E.
73 (a) q = CV = constant
…(i)
Capacitance (C) of a parallel plate capacitor is given by ε A …(ii) C = 0 d where, A is area of plates and d the separation between them. From Eqs. (i) and (ii), we get ε A q = 0 ⋅ V = constant d When plates are moved apart, d increases, hence value of C decreases and in order, charge (q) remains constant and V increases.
74 (a) The capacitance of capacitor is C = q/V
K =4
77
When another uncharged capacitor C 2 having same capacitance C is connected to it, then total charge on both capacitor = q. When disconnected, the charge on each one capacitor, 2EC q EC q′ = = = 2 2 2 ∴ Energy stored in C 2 , 1 q′ 2 1 EC 1 E′ = = 2C 2 2 C E E′ = ⇒ 4 (a) Capacitance of the parallel plate ε A capacitor is C = 0 d where, A is area of plates and d is distance between them. Potential difference across the plates, V = Ed
Here,
(q1 − q2 ) 2ε 0 A (q1 − q2 )d q1 − q2 V = = 2C 2ε 0 A
E=
78 (d) In parallel combination, they will have common potential. Total charge Total capacitance Q ∴ V= C1 + C2 C 1Q Charge on C 1 = C 1V = C1 + C2 C 2Q Charge on C 2 = C 2V = C1 + C2 Common potential =
∴ Required ratio C Q / (C 1 + C 2 ) C 1 = 1 = C 2Q / (C 1 + C 2 ) C 2
79 (b) When a conductor of capacitance C is charged, it acquires a potential, V = q/C When connected in parallel, equivalent capacitance of combination is C′ = C1 + C2 1 Also, energy flow E = C ′ V 2 will 2 not take place, if potential across capacitors is same. i.e.
V1 = V2
Aε 0 d When interspace between the plates is filled with wax and distance between the plates is doubled, then KAε 0 C′ = 2d Aε 0 K or C′ = d 2 K or C′ = C 2 K 6=2× ⇒ 2 ⇒ K =6
80 (d) Capacitance with air, C =
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
Topic 3 Grouping of Capacitors 2018 1 An infinite number of identical capacitor each of capacitance 1µF are connected as shown in the figure. Then, the equivalent capacitance between A and B is
[AIIMS]
8 capacitors 16 capacitors ∞
A
3
B
1 (b) µF 2
(a) 1µF
5 Three capacitors 3 µF, 6 µF and 6 µF are connected in series to a source of 120 V. The potential difference (in volt) across the 3 µF capacitor will be [WB JEE] (a) 24 V (b) 30 V (c) 40 V (d) 60 V 2012 6 Effective capacitance between A and B in the figure shown below is (all capacitances are in µF) [Manipal]
(c) 2 µF
(d) ∞
2 Find the capacitance as shown in the figure.
A
6 B
2
[JIPMER]
4
8
d/2
(a) K
(a) 2KAε 0 / ( K + 1) d
(b)
(c) (K + 1) Aε 0 / 2d
(d)
2KAε 0 d 2KAε 0
[AIIMS]
C
C/2
2014 4 In the given figure, the capacitors C1 , C 3 , C 4 and C 5
have a capacitance 4 µF each. If the capacitor C 2 has a capacitance 10 µF, then effective capacitance between A and B will be [UK PMT] C4
C2
C3
B
C5
(b) 4 µF
(c) 6 µF
M C
( K 2 + 1)d
The work done in charging both the capacitor fully is (a) 2CV 2 (b) 1/ 2CV 2 (c) 3 / 4CV 2 (d) 1/ 4CV 2
(a) 2 µF
(d) 23 µF
(c) 21µF
2C
volts, as shown below
C1
14 µF 3
X
2017 3 Two capacitors C and C / 2 are connected to a battery of V
A
(b)
7 In the adjoining figure, the potential difference between X and Y is 60 V. The potential difference between the points M and N will be [WB JEE]
d
V
3 µF 14
(d) 8 µF
C
Y 2C
(a) 10 V
(b) 15 V
(c) 20 V
N
(d) 30 V
8 A parallel plate capacitor with air as the dielectric has t Air capacitance C. A slab of dielectric constant K and t having the same thickness as the separation between the plates, is introduced so as to fill one-fourth of the capacitor as shown in the figure. The new capacitance will be [AFMC] C C (a) ( K + 3) (b) ( K + 2) 4 4 C KC (c) ( K + 1) (d) 4 4 9 Two capacitors 3 µF and 4 µF are individually charged across a 6 V battery. After being disconnected from the battery, they are connected together with the negative plate of one attached to the positive plate of the other. What is the final total energy stored? [AMU] −4 −4 (a) 1.26 × 10 J (b) 2.57 × 10 J (c) 1.26 × 10−6 J (d) 2.57 × 10−6 J
464
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2011 10 If the equivalent capacitance between points P and Q of
15 In the circuit shown in the figure, the potential difference across the 4.5 µF capacitor is [AIIMS]
the combination of the capacitors shown in figure below is 30 µF, the capacitor C is [J&K CET]
3 µF 4.5 µF
20 µF C
6 µF
20 µF
P
Q 12 V
20 µF
(a) 60 µF
(b) 30 µF
(c) 10 µF
(d) 5 µF
11 A capacitor of capacitance C1 is charge to a potentialV and then connected in parallel to an uncharged capacitor of capacitance C 2 . The final potential difference across each capacitor will be [J&K CET] C1V C 2V C2 C (b) (c) 1 + (d) 1 − 2 (a) C1 + C 2 C1 + C 2 C1 C1 12 In the given network, the value of C, so that an equivalent capacitance between points A and B is 3µF, is [KCET] C
2 µF
A 6 µF
4 µF 12 µF
2 µF
1 µF
8 (b) 4V V 3 (c) 6 V (d) 8V 16 A number of condensers, each of the capacitance 1µF and each one of which gets punctured, if a potential difference just exceeding 500 V is applied, are provided. An arrangement suitable for giving capacitance of 2 µF across which 3000 V may be applied requires atleast [AFMC] (a) 6 component capacitors (b) 12 component capacitors (c) 72 component capacitors (d) 2 component capacitors (a)
17 Seven capacitors each of the capacitance 2 µF are be connected in a configuration to obtain an effective capacitance of 10 / 11µF. Which of the combination(s) shown in figure will achieve the desired result? [AFMC]
2 µF
(a) 8 µF
B
1 31 (a) µF (b) µF (c) 48 µF (d) 36 µF 2 5 13 How many 1µF capacitors must be connected in parallel to store a charge of 1 C with a potential of 110 V across the capacitors? [DUMET] (a) 990 (b) 900 (c) 9090 (d) 909
2010 14 A series combination of n1 capacitors, each of value C1 is
charged by a source of potential difference 4V. When another parallel combination of n 2 capacitors, each of value C 2 is charged by a source of potential differenceV, it has the same (total) energy stored in it, as the first combination has. [CBSE AIPMT] The value of C 2 , in terms of C1 is, then n n 2C1 16C1 (a) (b) 16 1 C1 (c) 2 2 C1 (d) n2 n1 n1 n 2 n1 n 2
(b)
(c)
(d)
465
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
18 In the connections shown in the given figure below, the equivalent capacity between A and B will be [UP CPMT] 1
2
1
A
B 2
25 0.2 F capacitor is charged to 600 V by a battery, on removing the battery, it is connected with another parallel plate condenser of 1 F . The potential decreases to [VMMC] (a) 100 V (b) 120 V (c) 300 V (d) 600 V
2
(a) 13/ 6
(b) 6/ 13
(c) 6
(d) 13
19 n identical capacitors each of capacitance C when connected in parallel give the effective capacitance 90 µF and when connected in series give 2.5 µF. Then, the values of n and C respectively, are [Manipal] (a) 6 and 15 µF (b) 5 and 18 µF (c) 15 and 6 µF (d) 18 and 5 µF 20 The number of ways one can arrange three identical capacitors to obtain distinct effective capacitances is (a) 8 (b) 6 (c) 4 (d) 3 [Manipal] 21 Effective capacitance between A and B in the figure shown below is (C1 = C 2 = 20 µF, C 3 = C 4 = 10 µF) [OJEE] A
(a) 10 µF
C1
C2
C3
C4
(b) 15 µF
B
(c) 20 µF
(d) 25 µF
22 In the figure below, the capacitance of each capacitor is 3 µF. The effective capacitance between A and B is
[WB JEE]
A
(a)
3 µF 4
B
(b) 3 µF
3 µF
(c) 6 µF
A +
d
(d) 5 µF
B
2 µF
(b) 2 µF
2 µF
(c) 1 µF
A/2 K2
d/2
K3
d/2
K1
B –
ε0 A K1 K 2K 3 ε 0 A K 1 ( K 2 + K 3 ) + + (b) d 2 K2 + K3 d 2 K2 K3 ε A 2 ε0 A 2 K 2K 3 K +K3 (c) 0 + + 2 (d) d K1 K 2 + K 3 d K1 K1 K 3 (a)
27 Two capacitors, one 4 pF and the other 6 pF, connected in parallel are charged by a 100 V battery. The energy stored in the capacitors is [MGIMS] (a) 1.2 × 10−8 J (b) 2.4 × 10−8 J (c) 5.0 × 10−8 J (d) 1.2 × 10−6 J
2009 28 Three capacitors each of capacitance C and of breakdown voltage V are joined in series. The capacitance and breakdown voltage of the combination will be [CBSE AIPMT]
6 µF
A
36 13 µF
26 Parallel plate capacitor is constructed using three different dielectric materials as shown in the figure. The parallel plates, across which a potential difference is applied of area A metre 2 and separated by a distance d metre. The capacitance across A and B is [VMMC]
C V (a) , 3 3
23 The equivalent capacitance between points A and B in the given figure, is [CG PMT]
(a)
24 Three capacitors of capacitances 1µF, 2 µF and 4 µF are connected first in a series combination and then in parallel combination. The ratio of their equivalent capacitances will be [JIPMER] (a) 2: 49 (b) 49 : 2 (c) 4 : 49 (d) 49: 4
(d) 3 µF
V (b) 3C , 3
C (c) , 3V 3
(d) 3C , 3V
29 Four capacitors of equal capacitance have an equivalent capacitance C1 when connected in series and an equivalent capacitance C 2 when connected in parallel. C The ratio 1 is [CBSE AIPMT] C2 1 1 1 1 (a) (b) (c) (d) 4 16 8 12 30 Three capacitors has a capacitance C are connected in parallel to which a capacitor of capacitance C is connected in series. Effective capacitance is 3.75, then capacity of each capacity is [MHT CET] (a) 4 µF (b) 5 µF (c) 6 µF (d) 8 µF
466
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
31 The effective capacitance between A and B is 3 µF 3 µF
[OJEE]
36 Four capacitors are connected in a circuit as shown in the following figure. Calculate the effective capacitance between the points A and B. [J&K CET] C1 = 1 µF
B
A 3 µF
C3 = 2 µF
(a) 9µF (c) 6µF
(b) 3µF (d) 1µF
C2 = 2 µF
A B
32 The charge deposited on 4 µF capacitor in the circuit is [KCET] 12 V 4 µF
2 µF
(b) 12 × 10−6 C
−6
−6
(c) 24 × 10 C
(b)
24 µF 5
(c) 9 µF
(d) 5 µF
37 How many 6 µF, 200 V condensers are needed to make a condenser of 18 µF, 600 V? [KCET] (a) 9 (b) 18 (c) 3 (d) 27
6 µF
(a) 6 × 10−6 C
C4 = 4 µF
4 (a) µF 3
(d) 36 × 10 C
38 The total energy stored in the condenser system shown in the figure will be [KCET]
33 In figure below, four parallel plates of equal area A and spacing d are arrange, then effective capacitance between [BVP, MP PMT] a and b is
6 µF 2 µF
2V
A d
3 µF
b
a
(a) 2 µJ
ε A (a) 0 d
2ε A (b) 0 d
3ε A (c) 0 d
4 ε0 A (d) d
34 A parallel plate air capacitor has a capacitance C. When it is half filled with a dielectric of dielectric constant 5, the percentage increase in the capacitance will be [JCECE] (a) 400% (b) 66.6% (c) 33.3% (d) 200% 2008 35 Six capacitors each of capacitance of 2 µF are connected as shown in the figure. The effective capacitance between A and B is [Kerala CEE] C
A
C
C
C
(b) 4 µJ
(c) 8 µJ
(d) 16 µJ
2007 39 A parallel plate capacitor is made by stacking n equally spaced plates connected alternatively. If the capacitance between any two adjacent plates is C, then the resultant capacitance is [AIIMS] (a) ( n − 1) C (b) ( n + 1) C (c) C (d) nC 40 Three capacitors each of capacity 4µF are to be connected in such a way that the effective capacitance is 6µF. This can be done by [BHU] (a) connecting two in series and one in parallel (b) connecting two in parallel and one in series (c) connecting all of them in series (d) connecting all of them in parallel
41 In the figure, the equivalent capacitance between A and B is [AMU] 10 µF
B
10 µF
3 µF
A
C
7 µF C
(a) 12 µF 2 (e) µF 3
(b) 8/3 µF
(c) 3 µF
(d) 6 µF
5 µF
(a) 3.75 µF
(b) 5. 25 µF
6 µF
6 µF
(c) 6. 5 µF
B
(d) 10. 5 µF
467
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
42 The equivalent capacity between the points X and Y in the circuit with C = 1µF is [EAMCET] C
47 For circuit, the equivalent capacitance between P and Q is [AMU, KCET] P
Q C
X
Y
C
(b) 3 µF
(d) 0. 5 µF
(c) 1µF
43 Two condensers, one of capacity C and the other of capacity (C / 2) are connected to a V volt battery, as shown below in the figure. The work done in charging fully both the condensers is [CBSE AIPMT]
V
(a) 2 CV 2
1 CV 2 4
C
C
C
(b) 4 C 6C (d) 11
48 A gang capacitor is formed by interlocking a number of plates as shown in figure below. The distance between the consecutive plates is 0.885 cm and the overlapping area of the plates is 5 cm 2 . The capacity of the unit is [KCET]
C 2
C
(b)
C
(a) 6C 3C (c) 2
C
(a) 2 µF
C
(c)
3 CV 2 4
1 (d) CV 2 2
44 A dielectric of dielectric constant K is introduced such that half of its area of a capacitor of capacity C is occupied by it. The new capacity is [J&K CET] (a) 2 C (b) C/2 (c) C / 2 (1 + K ) (d) 2C (1 + K ) 45 Consider a parallel plate capacitor of 10 µF with air filled in the gap between the plates. K=4 Now, one-half of the space between the plates is filled with a dielectric of dielectric constant 4, as shown in the figure. The capacity of the capacitor changes to [Punjab PMET] (a) 25 µF (b) 20 µF (c) 40 µF (d) 5 µF
(a) 1.06 pF (c) 6.36 pF
(b) 4 pF (d) 12.72 pF
49 The combined capacitance of the arrangement shown in the figure given below, (in µF) is [Guj CET] 2 µF
6 µF
(a)
30 11
(b)
8 11
3 µF
(c) 4
(d) 1
50 What is equivalent capacitance of the network? Each capacitor has 1µF capacitance. [JCECE]
2006 46 Five capacitors, each of capacitance value C are connected as shown in the figure. The ratio of capacitance between P and R; and the capacitance between P and Q is 1 (a) µF 3
S C
C R
T
C
C P
(a) 3 : 1 (c) 2 : 3
Q C
(b) 5 : 2 (d) 1 : 1
[AIIMS]
(b) 2µF
3 (c) µF 2
(d) 3µF
51 A 10 µF capacitor is charged to a potential difference of 1000 V. The terminals of the charged capacitor are disconnected from the power supply and connected to the terminals of an uncharged 6 µF capacitor. What is the final potential difference across each capacitor? [Kerala CEE] (a) 167 V (b) 100 V (c) 625 V (d) 250 V (e) None of these
468
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
52 The charge on capacitors in the following figure is [Haryana PMT] 4V
2V
+ –
+ –
2F
2F
6V
32 C (b) 8 C 3 (c) zero (d) ∞ 53 If each capacitor of 9 µF is arranged as shown in figure below, then the equivalent capacitance between the points A and B is [Haryana PMT] (a)
A
57 Across each of two capacitors of capacitance 1µF, a potential difference of 10 V is applied. Then, positive plate of one is connected to the negative plate of the other and negative plate of one is connected to the positive plate of the other. After contact, [DUMET] (a) charge on each is zero (b) charge on each is same but non-zero (c) charge on each is different but non-zero (d) None of the above
2005 58 In the given network capacitance C 2 = 10 µF,C1 = 5 µF
and C 3 = 4 µF. The resultant capacitance between P and Q will be [RPMT] P
B
C1
C2
C1 C2
C3
C3 Q
C4
(a) 15 µF (c) 9 µF
(b) 18 µF (d) 4 .5 µF
54 Two capacitors each of capacity 2 µF are connected in parallel. If they are connected to 100 V battery, then energy stored in them is [J&K CET] (a) 0.02 J (b) 0.04 J (c) 0.01 J (d) 200 J
(a) 4.7 µF (c) 3. 2 µF
(b) 1. 2 µF (d) 2. 2 µF
59 The equivalent capacitance between the points A and B in the following circuit is [BCECE] 1.5 µF A
55 A capacitor having capacitance 1µF with air, is filled with two dielectrics as shown below. How many times capacitance will increase? [Punjab PMET]
3 µF
3 µF 1.5 µF
(b) 2 µF (d) 8 µF
(a) 1µF (c) 4 µF K1 = 8
K2 = 4
(a) 12 (c) 8/3
(b) 6 (d) 3
60 Two identical capacitors C1 and C 2 of equal capacitance are connected as shown in the circuit. Terminals a and b of the key K are connected to charge capacitor C1 using battery of emfV volt. Now, disconnecting a and b, the terminals b and c are connected. Due to this, what will be the percentage loss of energy? [NEET (Odisha)]
56 For the given arrangement of capacitors C1 and C 2 , which of the following statement is true? [Punjab PMET]
a
C1 = 2 pF C2 = 3 pF S1
S3
K
c
b
S2
(a) When S 1 and S 3 closed, V1 = 30 V, V2 = 20 V (b) When S 1 and S 3 closed, V1 = V2 = 0 (c) When S 1 is closed, V1 = 15 V,V2 = 20 V (d) When S 3 is closed, V1 = V2 = 20 V
B
V
(a) 75% (c) 50%
C1
C2
(b) 0% (d) 25%
469
ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
62 A capacitor of 2 µF is charged as shown in the figure. When the switch S is turned to position 2, the percentage of its stored energy dissipated is [NEET]
61 In the given circuit, find the heat produced between A and [JIPMER] B (given C = 1µF) 10 V
1
A
2 S
C
C B
C
(a) 50 µJ
8 µF
2µF
V
(b) 60 µJ
C
(c) 70 µJ
(a) 20% (c) 80%
(d) 100 µJ
(b) 75% (d) 0%
Answers 1 (c)
2 (a)
3 (c)
4 (b)
5 (d)
6 (b)
7 (d)
8 (a)
9 (a)
10 (a)
11 (a)
12 (c)
13 (c)
14 (d)
15 (d)
16 (c)
17 (a)
18 (b)
19 (a)
20 (c)
21 (b)
22 (d)
23 (d)
24 (c)
25 (a)
26 (a)
27 (c)
28 (c)
29 (b)
30 (b)
31 (a)
32 (c)
33 (c)
34 (b)
35 (a)
36 (a)
37 (d)
38 (c)
39 (a)
40 (a)
41 (a)
42 (a)
43 (c)
44 (c)
45 (a)
46 (c)
47 (d)
48 (b)
49 (c)
50 (d)
51 (c)
52 (b)
53 (a)
54 (a)
55 (b)
56 (a)
57 (c)
58 (c)
59 (a)
60 (c)
61 (a)
62 (c)
Explanations 1 (c) This combination forms a GP,
1 1 1 S = 1+ + + + ……………… 2 4 8 a Sum of infinite GP, S = 1− r 1 1 = =2 ⇒ S= 1− 1 / 2 1 2 Hence, capacitance of combination, C ∞ = 2 × 1µF = 2µF
2 (a) This combination is same as the two capacitors are connected in series and distance between plate of each capacitor is d / 2. So, Kε A and C1 = 0 d/2 ε A C2 = 0 d/2 C C Hence, C net = 1 2 C1 + C2 2Kε 0 A 2ε 0 A d d = 2Kε 0 A 2ε 0 A + d d 2KAε 0 C net = (K + 1)d
3 (c) The two capacitors are in parallel. The equivalent capacitance, C 3C C′ = C + = 2 2 Work done in charging the equivalent capacitor is stored in the form of potential energy, W = U = 1 / 2C ′ V 2 1 3C W= × ×V 2 2 2 3 W = CV 2 4
4 (b)
C4
A C1
C2
C3
B
C5
Clearly, the capacitors form Wheatstone bridge arrangement. C1 = C3 = C4 = C5 C4 C3 ⇒ = C1 C5 By symmetry, q1 = q4 , q3 = q5 Also, q1 + q4 = q3 + q5
⇒ ⇒
q1 = q4 = q5 = q3 q2 = 0 S C– + 4 q4
A
+C3 –q3
q2=0 C2
B q5 C5
q1+ C1– T
Hence, the bridge is balanced. The point S and T are in the same potential. No charge can accumulate on C 2 which thus become ineffective. Between A and B, two series combination (C 4 ,C 3 ) and (C 1 ,C 5 ) are connected in parallel. Then, effective capacitance, 1 1 1 1 1 = + = + C ' C1 C5 4 4 4 ⇒ C′ = = 2 µF 2 Similarly, C"= 2µF Hence, equivalent capacitance between A and B is C = C '+ C " = 2 + 2 = 4µF
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Due to balanced Wheatstone bridge arrangement, charge q on C 2 is zero. Hence, net capacitance between A and B will be 4µF.
2C M
X
5 (d) Capacitor are connected in series combination. Hence, equivalent capacitance is given by 1 1 1 1 = + + C C1 C2 C3
2C
⇒ E = 126 . × 10−4 J 20 µF
10 (a)
Equivalent circuit can be drawn as C
20 µF
P
Q
C 2 20 µF
Hence, potential difference across the 3 µF, q = CV q 180 V = = = 60V C 3
6 (b) The points C and D will be at same
3 4 = . Therefore, 6 8 capacitance of 2 µF will be ineffective. So, the equivalent circuit can be shown as the effective capacitance in upper arm in series, is given by
potentials, since
C 6 B 8 D
C1 =
N
Y
Y
In the series combination of capacitors, each capacitor have equal charge.
4
C
C
= 15 . × 120 = 180 µC
A
C
X
1 1 1 1 = + + C 3 6 6 6 ⇒ C = = 15 . µF 4 The charge on the capacitor, q = CV ⇒
3
∴ Energy stored, 1 1 E = (C eq ) V 2 = × 7 × 10−6 × (6)2 2 2 1 ⇒ E = × 7 × 10−6 × 36 2
7 (d) Consider the following circuit
3 × 6 18 = = 2 µF 3+ 6 9
The effective capacitance in lower arm in series, is given by 4 × 8 32 8 C2 = = = µF 4 + 8 12 3 Hence, the resultant capacitance in parallel is given by C = C1 + C2 8 14 = 2+ = µF 3 3
According to the question, VXY = 60V ⇒ VC 2 = 60 V We know that, charge (Q ) = capacitance (C ) × voltage (V ) QC 2 = 60 V ∴ C 2
⇒
⇒ QC 2 = (60)(C 2) = 30C Now QMN = QC 2 = 30C ⇒ (C MN )VMN = 30 C ⇒ (C )(VMN ) = 30 C ⇒ VMN = 30V
8 (a) The capacitor with air as the
⇒ ⇒ ⇒
11 (a) If two capacitors having
dielectric has capacitance, ε 3 A 3ε A C1 = 0 = 0 d 4 4d Similarly, the capacitor with K as the dielectric constant has capacitance, ε K A ε AK C2 = 0 = 0 4d d 4 Since, C 1 and C 2 are in parallel. C net = C 1 + C 2 3ε A ε AK = 0 + 0 4d 4d ε0A 3 K C = + = (K + 3) d 4 4 4
9 (a) Given, C 1 = 3µF, C 2 = 4µF Potential difference, V = 6 V It is given that after disconnection from the battery, both the capacitors are connected in such a way that the negative plate of one capacitor is attached to the positive plate of the other. It means, they are connected in parallel. ⇒C eq = C 1 + C 2 = (3 + 4 ) µF 7µF = 7 × 10−6 F
C′ = C1 + C2 + C3 = 20 + 20 + 20 = 60 µF 1 1 1 = + C ′′ C 60 1 1 1 = + 30 C 60 1 1 1 = − C 30 60 1 2−1 1 1 = ⇒ = C 60 C 60 C = 60 µF
12
capacitances C 1 and C 2 respectively, are connected in parallel, then C eq = C 1 + C 2 The final potential difference across each capacitor C 1V V′ = C1 + C2 16 C (c) Here, 5 =3 16 +C 5 16 48 C = + 3C ⇒ 5 5 C 48 = ⇒ 5 5 ⇒ C = 48µF
13 (c) Charge, q = nCV 1 = n × 1 × 10−6 × 110
⇒
n=
1 110 × 10−6
n=
100000 ≈ 9090 11
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ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
14 (d) Case I When the capacitors are
For option (b),
joined in series, 1 C1 U series = (4V )2 2 n1
2 2
15 (d) The total capacity of capacitor,
16
9 × 4.5 C = µF 13.5 or C = 3 µF Charge, Q = CV = 3 × 13 = 39 µC Potential difference across 4.5 µF 39 = V ≈ 8V 4.5 (c) Minimum number of condensers in 3000 each row = =6 500
2 2
C eq
17
Case II When capacitors are connected in series, 1 1 1 1 = + +L+ Cn C1 C2 Cn
2 2 2 2
2 2
C eq =
n ⋅ C n− 1 1 = Cn Cn
6 1/2
6 × 1/ 2 6 = µF 6 + 1/ 2 13
⇒
For option (d), 2
⇒ ⇒
2 2 2 2 2 2
⇒
4 2/5
C eq =
4 × 2/ 5 4 = µF 4 + 2 / 5 11
Hence, combination of option (a) will provide derived result.
18 (b) A
1
2
1
C1
C2
C3
C4
2
2 ⇒ 10 1
10 × 1 10 = µF 10 + 1 11
Cn = 2.5 nC n−1
C ⋅ C n− 1 = 2.5 nC n− 1 C = 2.5 ⇒ C = 2.5n n
...(ii)
Putting the value of C in Eq. (i), we get 2.5n2 = 90 90 900 n2 = = = 36 ⇒ 2.5 25 ⇒ n=6 Now, putting the value of n in Eq. (ii), we get C = 2.5 × 6 = 15 = 15 µF capacitors to obtain distinct effective capacitances is 4, i.e. (i) A
B
(ii) A
B
(iii) A
B
2
2 2
Cn =
20 (c) The arrangement of three identical B
2
2
C eq =
Case I When capacitors are connected in parallel, C 1 + C 2 + C 3 + L + C n = 90 µF ...(i) ⇒ nC = 90 µF
8 × 2/ 3 8 = = µF 8 + 2 / 3 13
⇒
1 +1 6 6 + 1 + 6 13 = = 6 6 6 C = 13
19 (a) According to the question,
For option (c), 2
If C S is capacity of 6 condensers in a row, 1 1 1 1 1 1 1 = + + + + + =6 CS 1 1 1 1 1 1 1 ⇒ C S = µF 6 Let there be m such rows in parallel. Total capacity = m × C S 2 = m × 1/ 6 ⇒ m = 12 Total number of capacitors = 6 × 12 = 72 (a) For option (a),
∴ 8 2/3
⇒
1 1 1 1 = + + C C 1 C 2eq C 3 = 1+
2 2 2
Case II When the capacitors are joined in parallel, 1 U parallel = (n2C 2 ) V 2 2 Given, U series = U parallel 1 C1 1 or (4V )2 = (n2C 2 ) V 2 2 n1 2 16 C 1 C2 = ⇒ n1 n2
So,
2 2
C5
Here, C 2 ,C 4 and C 5 are in parallel combination. So, C 2 + C 4 + C 5 = 2 + 2 + 2 = 6 = C 2eq Now, C 1 ,C 2 equivalent and C 3 are in series.
(iv) A
B
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1 1 1 1 1 = + = + C′ C1 C2 3 6
21 (b) Here, C 1 and C 2 are in series. Hence, their effective capacitance C′ is given by 1 1 1 = + C′ C1 C2 1 1 1 = + ⇒ C′ 20 20 ⇒ C′ = 10 µF Similarly,
1 1 1 = + C ′′ C 3 C 4
⇒
+
Hence, resultant capacitance C will be C = C ′ + C ′′ = 10 + 5 = 15 µF
22 (d)
25 (a) By using charge conservation,
C1 A
B C3 C4
C 1 = C 2 = C 3 = C 4 = 3µF (given) QC 4 and C 3 are in parallel, i.e. C eq = C 4 + C 3 = (3 + 3) µF = 6µF Now arrangement of capacitors will be as follows C1
26
0.2 × 600 = (0.2 + 1) V 0.2 × 600 V = = 100V ⇒ 1.2 K ε A (a) Here, C 2 = 2 0 2 , d/2 K 2ε 0 A / 2 K 2ε 0 A C2 = = d/2 d K 3ε 0 A C3 = d
d d 1 = + C 2− 3 K 2ε 0 A K 3ε 0 A dK 3 + dK 2 d (K 2 + K 3 ) = = K 2K 3ε 0 A K 2K 3ε 0 A K 2K 3ε 0 A C 2− 3 = d (K 2 + K 3 ) K ε A / 2 K 1ε 0 A Again, C 1 = 1 0 = d 2d Now combining C 1 and C 2− 3, K ε A K 2K 3ε 0 A C 1 + C 2− 3 = 1 0 + d (K 2 + K 3 ) 2d
Now, A
B ′ Ceq
QC 1 is in parallel with the series combination of C 2 and C ′eq . ∴ C eq ′′ between A and B (C 2 × C eq ′ ) = + C1 C 2 + C eq ′ 3 × 6 ⇒ + 3 = 5µF 3 + 6
=
23 (d) C 1 and C 2 are in series, 3 µF
6 µF
C1
C2
A
27 (c) The energy stored in capacitor is B
2 µF
2 µF
C3
C4
ε0A K 1 K 2K 3 + d 2 K 2 + K 3
1 given by E = CV 2. 2 Resultant capacitance, C ' = C 1 + C 2 = 4 + 6 = 10 pF 1 E = × 10 × 10−12 × (100)2 2 (∴1pF = 10−12 F) −8 = 5 × 10 J
C
C
–
V
1 1 1 1 4 + 2+1 7 = + + = = C1 1 2 4 4 4 4 ⇒ C 1 = µF 7 In parallel combination, C 2 = 1 + 2 + 4 = 7 µF C1 4 /7 4 ⇒ = = C2 7 49
Now, C′ and C ′′ are in parallel.
C2
C
⇒ C′′ = 1µF Now, C ' and C '' are in parallel So, C eq = C ' + C '' = 2 + 1 = 3 µF
C ′′ = 5 µF
C2
= C and breakdown voltage = V Here, each capacitance can have a maximum charge of CV.
⇒ C′ = 2 µF Similarly, C 3 and C 4 are in series, 1 1 1 1 1 = + = + C ′′ C 3 C 4 2 2
24 (c) In series combination,
1 1 1 = + C ′′ 10 10
⇒
28 (c) Given, capacitance of each capacitor
29
Now, capacitance of series combination is given by 1 1 1 1 3 = + + = C eq C C C C C ⇒ C eq = 3 Now, breakdown voltage is given by V ′ C Then, CV = V ′ 3 3CV ′ ⇒ = 3V V = C (b) For series combination of capacitance is given by 1 1 1 1 1 = + + + C1 C C C C 1 4 = C1 C C C1 = ⇒ 4 Now, parallel combination of capacitances is given by C 2 = C + C + C + C = 4C C1 C 1 1 Now, = × = C 2 4 4C 16
30 (b) According to question, effective capacitance of parallel capacitors C C
C
C +
– V
= C + C + C = 3C 1 1 1+ 3 4 Now, + = = 3C C 3C 3C 3C = 3.75 ∴ According to question, 4 3.75 × 4 C = = 5 µF 3
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ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
31 (a) Here in the modified figure of question, all the capacitors are in parallel. 3 µF
Their positive plates are connected to each other and so are the negative plates. Therefore, these are joined in parallel, i.e. C p = C 1 + C 2 + C 3 = 3ε 0 A / d
34 (b) Initial capacitance A
C1
B
3 µF
C2
So, effective capacitance is given by C AB = C 1 + C 2 + C 3 C AB = 3 + 3 + 3 = 9 µF
12 V
B C
4 mF A
2 mF
6 mF
Here, capacitors B and C are in parallel. So, their total capacitance is given by, 4 + 2 = 6 µF Now, total capacity of 6 µF and capacitor A are in series with respect to battery 1 1 1 2 1 ∴ = + = = CT 6 6 6 3 CT = 3 µF Now, total charge = CTV = 3 × 12 = 36 µC This is the charge on A and also on charge B and C. Thus, voltage on combination of Q 36 capacitors B and C, = =6V 6 6 Now, charge on capacitor B is given by CB × V = 4 × 6 = 24µC = 24 × 10−6 C
33 (c) Suppose the pair of plates a is connected to positive terminal of the battery and the pair of plate b is connected to negative terminal of the battery. Thus, from figure, we can conclude that, we have three capacitors I, II and III. I a
d
II III
b
difference is the sum of the individual potential difference of each capacitor, i.e. V = V1 + V2 + V3 + L ⇒ 600 = x × 200 ⇒ x = 3 So, there should be three capacitors in series to obtain the required potential difference. The equivalent capacitance of the three capacitors in series is 1 1 1 1 = + + C eq 6 6 6
3 µF
32 (c) Label the figure
37 (d) In series arrangement, potential
d
C = ε0A / d When it is half filled by a dielectric of dielectric constant K, then Kε A ε A C 1 = 0 = 2K 0 d/2 d ε 0 A 2ε 0 A and C 2 = = d/2 d d 1 1 1 1 ∴ = + = + 1 C ′ C 1 C 2 2ε 0 A K d = 2ε 0 A
1 6 d + 1 = 5 10 ε 0 A
⇒ C ′ = 5ε 0 A / 3d Hence, increase in capacitance 5 ε0A ε0A − d × 100 = 3 d ε0A / d 2 = × 100 = 66.6% 3
35 (a) All the capacitors are connected in parallel. Therefore, the effective capacitance between A and B = 6 C = 6 × 2 = 12 µF
⇒ C eq = 2µF Now, we require 18 µF capacitance, for this we need 9 such combinations in parallel. Hence, required condensers = 9 × 3 = 27
38 (c) 6µF and 3µF capacitors are in series ∴
1 1 1 = + C1 6 3
⇒
C 1 = 2 µF
C 1 is parallel to 2µF capacitor ∴
C eq = 2 + 2 = 4 µF 1 1 Total energy, U = CV 2 = × 4 × (2)2 2 2 = 8 µJ
39 (a) Each plate is taking part in the formation of two capacitors except the plates at the ends. These capacitors are in parallel and n plates form (n − 1) capacitors. Thus, equivalent capacitance between A and B = (n − 1)C
40 (a) (a) The network of three capacitors can be shown in the figure below:
36 (a) Effective capacitance of C 2 and C 3, 1 1 1 = + C 2 2 ⇒ C = 1µF Now, C 1 and C are in parallel, therefore effective capacitance, C′ = 1 + 1 = 2µF Now, C′ and C 4 are in series, therefore effective capacitance between points A and B, 1 1 1 3 = + = C ′′ 2 4 4 4 ⇒ C ′′ = µF 3
4 µF
4 µF
C1
C3
A
B 4 µF
C3
Here, C 1 and C 2 are in series and the combination of two is in parallel with C 3. C 1C 2 C net = + C3 C1 + C2 4 × 4 = +4 4 + 4 = 2 + 4 = 6µF
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(b) The corresponding network can be shown in the figure below 4 µF 4 µF
C1 4 µF
A
B
C3
C2
Here, C 1 and C 2 are in parallel and this combination is in series with C 3. So, C net = =
(C 1 + C 2 ) × C 3 (C 1 + C 2 ) + C 3
42
It is a balanced Wheatstone bridge. 5×3 5×3 ⇒ C AB = + 5+ 3 5+ 3 15 ⇒ C AB = 2 × 8 30 = = 3.75 µF 8 (a) The circuit is shown in the figure below. a
A/4
4 µF
4 µF
4 µF
C1
C2
C3
A
B
C
1 1 1 3 + + = 4 4 4 4 4 ⇒ C net = µF 3 =
(d) The corresponding network can be shown in the figure below 4µ F C1 4µF
As points a and b are at same potential, so no charge flows through ab. Hence, capacitance in ab is shorted. Now, two remaining capacitors are in parallel, hence C eq = C + C = 2C = 2 × 1 = 2µF are in parallel order, hence C 3C C′ = C + = 2 2 The work done in charging the equivalent capacitor is stored in the form of potential energy. 1 Hence, W = U = C ′ V 2 2 1 3C 2 = V 2 2 3 = CV 2 4
44 (c) The dielectric is introduced such
A
B
that, half of its area is occupied by it.
C2 4µ F A/2
C3
All of them are in parallel. So, C net = C 1 + C 2 + C 3 = 4 + 4 + 4 = 12µF (a) The circuit can be simplified as shown in the figure below. C 3 µF B 5 µF
3 µF D
A/4
K d
43 (c) The two condensers in the circuit
All of three are in series, so 1 1 1 1 = + + C net C 1 C 2 C 3
A
A/2
1
2
3
b
32 8 = µF 12 3 (c) The corresponding network can be shown in the figure below
5 µF
After filling the dielectric, we have these capacitors of capacitance, ε (A/4) C1 = 0 d Kε 0 ( A / 2) , C2 = d ε (A/4) C3 = 0 d
Y
C
=
41
capacitor, C = 10µF
C X
(4 + 4 ) × 4 (4 + 4 ) + 4
45 (a) Initially, the capacitance of
A/2 d
In the given case, the two capacitors are in parallel. ∴ C′ = C1 + C2 Aε 0 KAε 0 and C 2 = C1 = 2d 2d Aε 0 KAε 0 C Thus, C ′ = = (1 + K ) + 2 2d 2d
∴ Equivalent capacitance, C eq = C 1 + C 2 + C 3 ε 0 A Kε 0 A ε 0 A + + 4d 2d 4d [Q ε 0 A / d = C ] 10 C = 25 µF = 4
=
46 (c) If a source is connected between points P and R, same charge will flow through two capacitors in arms PQ and QR. Similarly, same charge will flow through capacitors in arms PT ,TS and SR. So, equivalent capacitance of right side, C ×C C C′ = = C +C 2 and equivalent capacitance of left side, 1 1 1 1 3 = + + = C ′′ C C C C C ⇒ C ′′ = 3 Now, C′ and C ′′ will in parallel combination, Hence, C 1 = C ′ + C ′′ C C 5C = + = 2 3 6 Similarly, if a source is connected between points P and Q, then equivalent capacitance, C 5C C2 = C + = 4 4 Hence, the required ratio is given by C 1 5C / 6 2 = = C 2 5C / 4 3
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ELECTROSTATICS II (ELECTRIC POTENTIAL AND CAPACITANCE)
47 (d) P
51 (c) The capacitance of system of
A
P=
B
C
A=
B C
C=
D=
G
F
F E= C Q
C
P
Q
D E
G
C
C
C P
3C
2C
C
Q
capacitors, C = C1 + C2 = 10 + 6 = 16 µF The charge stored in first capacitor, q = C 1V = 10 × 1000 = 104 µC Final potential difference across each capacitor, V ′ = q / C = 104 / 16 = 625 V
52 (b) The capacitors are in series, so they
1 1 1 1 = + + C eq 3C 2C C 2 + 3 + 6 11 = = 6C 6C 6C ⇒ C eq = 11
will have same charge. Applying Kirchhoff’s loop law, Q Q −6 + + + 2−4 =0 2 2 ∴ Q = 8C
48 (b) The given arrangement of nine plates is equivalent to the parallel combination of 8 capacitors. The capacity of each capacitor, ε A C = 0 d 8. 854 × 10−12 × 5 × 10−4 = 0.885 × 10−2
53 (a) The arrangement can be redrawn as C1
A C2
∴
= 8C = 8 × 0.5 = 4 pF
49 (c) Capacitors of 6µF and 3µF are in 6 × 3 18 = = 2µF 6+ 3 9 Now, C′ is in parallel with 2µF capacitor, so C′ =
C = C ′ + 2 = 2 + 2 = 4 µF
50 (d) The given circuit can be rearranged as follows, it consists of three capacitors connected in parallel, hence equivalent resistance of the combination is C ′ = C 1 + C 2 + C 3. 1µF
C = C 2 − 13 + C 4 = 6 + 9 = 15µF
54 (a) The energy stored is given by 1 E = CV 2 2 When capacitors are connected in parallel, resultant capacitance C′ = C1 + C2
∴ ⇒
= 2µF + 2µF = 4 µF V = 100 V 1 E = × 4 × 10−6 × (100)2 2 E = 0.02 J
55 (b) Initially the capacitance of
1µF A
capacitors C 1 and C 2 are in series arrangement. So, the potential difference developed across capacitors are in the inverse ratio of their capacities. V1′ C 2 3 pF 3 = = = ∴ V2′ C 1 2 pF 2
C 13 = C 1 + C 3 = 9 + 9 = 18µF C × C 13 C 2 − 13 = 2 C 2 + C 13 9 × 18 = = 6µF 9 + 18
∴
B
d
C′ = 1 + 1 + 1 = 3µF
and V1′ + V2′ = V1 + V2 = 30 + 20 = 50 V We get, V1′ = V1 = 30 V and V2′ = V2 = 20 V
57 (c) A capacitor is an arrangement which can store sufficient quantity of charge. Suppose on giving a charge q to a conductor, the electric potential of the conductor becomes V. Then, the capacitance of the conductor is +q – q A
+q – q
C1
C2
V1
V2
B
q V When two capacitors are connected as given, then charge will be redistributed in the ratio of their capacitance, so charge on each capacitor will be different but non-zero. C =
capacitor
1µF
Given,
After filling with dielectrics, we have two capacitors of capacitance, K ε ( A / 2) C1 = 1 0 d 8 ε0A 4 ε0A = = = 4C 2 d d K ε ( A / 2) and C 2 = 2 0 d 4 ε0A = 2 d 2ε A = 0 = 2C d Hence, their equivalent capacitance, C eq = C 1 + C 2 = 4 C + 2C = 6C i.e. new capacitance will be six times the original.
56 (a) When S 1 and S 3 are closed, the
C3 C4
= 0.5 pF Hence, the capacity of 8 capacitors
series, so
B
ε0A d where, A is area of each plate and d is the separation between the plates. C =
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58 (c) Seeing in the given circuit C 1 and C 2 are connected in parallel. Hence, their equivalent capacitance is given by, C eq = C 1 + C 2 = 5 + 10 = 15µF As, C eq and C 3 are connected in series. Hence, resultant capacitance between P and Q is given by 1 1 1 = + C PQ C eq C 3 1 1 19 + = 15 4 60 60 = = 3.2 µF 19
= ⇒
C PQ
59 (a) The two capacitors each of value
15 . µF are in parallel, so their equivalent capacitance is given by C 1 = 1. 5 + 1. 5 = 3 µF Now, three capacitors each of value 3µF are in series. Hence, their equivalent capacitance is given by 1 1 1 1 = + + C 3 3 3 1 3 = ⇒ C 3 ⇒
C = 1 µF
60 (c) When C 1 is connected to voltage source, it is charged to a potential V and this will be stored as a potential energy in the capacitor given by 1 U = CV 2 2
a
K
∴Potential difference across AB = 10 V
c
b
V
When key is disconnected from battery and b and c are connected, then the charge will be transformed from the capacitor C 1 to capacitor C 2, so a
K
10 V
C2
C1
A
10 V C
C
c
C
B
b V
C1
C2
the loss of energy due to redistribution of charge is given by, C 1C 2 ∆U = (V1 − V2 )2 2(C 1 + C 2 ) C ×C = (V − 0)2 [QC 1 = C 2] 2(C + C ) 1 = CV 2 4 ∆U × 100 ∴Percentage loss = U 1 CV 2 4 = × 100 = 50% 1 CV 2 2
61 (a) Potential drop is zero along an ideal conductor because it has zero resistance. Potential at point A = 10 V Potential at point B = 0 V
C
Heat produced = Energy stored 1 = CV 2 2 1 = × 10−6 × (10)2 = 50 µJ 2
62 (c) Consider the given figure in question, when the switch S is connected to point 1, the initial energy 1 stored in capacitor is = (2µF)V 2 2 When the switch S is connected to point 2, energy dissipated on connection across 8 µF will be 1 C C = 1 2 V2 2 C 1 + C 2 1 2µF × 8µF = ×V 2 × 2 10µF 1 16µF × V 2 × 2 10 Therefore, % loss of energy 16 = × 100 = 80% 2 × 10 =
17 Current Electricity Quick Review Electric Current
Relaxation Time
It is the rate of flow of charge through any cross-sectional area of the conductor and given by dq I= dt For steady flow, I = Q / t = ne / t
It is the time interval between two successive collisions of electrons with the positive ions in the metallic lattice. It is given by mean free path l t= = rms velocity of electron v rms
where, n = number of charge carrier and e = electronic charge.
With rise in temperature v rms increase, consequently t decreases.
If n-particles of charge q moving with velocity v in a unit volume, then current through area A is I = nqvA
Current Density It is the vector having magnitude equal to the current per unit area, i.e. J = I / A If area A makes an angle q with the direction of current, then I J= A cos q
Electric Currents in Conductors The electric current in a conductor can be explained by an electron theory. Free electrons or conduction electrons, carry the charge in the substance from one place to the other. Therefore, the electrical conductivity of a solid substance depends upon the number of free electrons in it.
Drift Velocity It is the average velocity with which the free electrons in a conductor get drifted towards the positive end of the conductor. It is given by eE vd = t, where t = relaxation time. m
Mobility For an electron, it is the drift velocity per unit v et electric field, i.e. m = d = E m Its SI unit is m 2 V -1s -1 . • Relation Between Drift Velocity, Electric Current and Current Density Due to the drift velocity of electrons in a conductor, current flow which is given by I = neAv d . The current density, J = nev d .
Ohm’s Law According to this law, the current flowing through a conductor is directly proportional to the potential difference across its ends, i.e. I µ V or V = IR where, R is resistance of the conductor.
V-I Characteristics • For a metallic conductor which obey ohm’s
law, this characteristic is linear or in straight line inclined at an angle q.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
• For substances like gases and semiconductors, which do
not obey ohm’s law, this characteristic is non-linear. • At different temperatures, V-I curves are different.
V θ I (a) Slope of the line = tan θ = V = R I
1
Conductance is the reciprocal of resistance, i.e. C = 1/ R. Its SI unit is W -1 or siemen.
T1 V
Conductance and Conductivity
T2 2
θ1 θ2 I (b) Here, tan θ1 > tan θ2 So, R1 > R2 i.e., T1 > T2
Resistance
Conductivity is the reciprocal of resistivity, i.e. s = 1/ r. Its SI unit is mho m -1 . • Relation between conductivity, resistivity, electric field and current density J = sE = E/ r
Colour Coding of Carbon Resistors The resistance of a carbon resistor can be calculated by the code given on it in the form of coloured strips. Decimal multiplier
It is the property of a conductor by virtue of which it opposes the flow of current through it. V From Ohm’s law, it is given by R = . I It depends directly on the length of conductor and inversely l on its area of cross-section and also given by R = r A
A
In terms of free electron density ( n ) and relaxation time ( t ), m l the resistance of a conductor is given by R = 2 × . ne t A
Resistivity or Specific Resistance It is the intrinsic property of the substance and independent of the shape and size of conductor. It is given by RA r= l
Temperature Dependance of Resistance and Resistivity • If the temperature of a conductor is changed, its
resistance varies according the given relation, R t = R 0 (1 + a DT ) where, R t and R 0 = resistance at temperature t° Cand 0° C, respectively and a = temperature coefficient of conductor. • Similarly, resistivity also varies as r t = r 0 (1 + a DT ). • For metal, a is positive, i.e. their resistivity and resistance increases with temperature rise and for semiconductor, a is negative, i.e. their resistivity and resistance decreases with temperature rise.
C
D Tolerance power
Colour Coding
where, r = constant of proportionality called resistivity of material of conductor.
In terms of free electron density ( n ) and relaxation time ( t ), the resistivity is given by m r= 2 ne t
B
First two significant figures
Colour
Figure
Multiplier
Black Brown
0 1
1 10 1
Red
2
10 2
Orange Yellow Green Blue Violet Grey White
3 4 5 6 7 8 9
10 3 10 4 10 5 106 10 7 10 8 10 9
Tolerance Power Colour
Gold
Silver
No colour
Tolerance
5%
10%
20%
This colour coding can be easily learned in the sequence “BB ROY Great Britain Very Good Wife”. From colour codes of resistor R = AB ´ C ± D %
Combination of Resistors 1. In Series (i) Equivalent resistance, R = R1 + R 2 + R 3 (ii) Current through each resistor is same. (iii) Sum of potential differences across individual resistors is equal to the potential difference applied by the source. R1 A
R2
R3 B
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CURRENT ELECTRICITY
2. In Parallel
1 1 1 1 (i) Equivalent resistance, = + + R R1 R 2 R 3 (ii) Potential difference across each resistor is same. (iii) Sum of electric currents flowing through individual resistors is equal to the electric current drawn from the source. R 1
R2 A
B
R3
If n identical resistances are first connected in series and then in parallel, the ratio of the equivalent resistance, R s / R p = n 2 /1
Electric Cell It is a device which converts chemical energy into electrical energy. The combination of cell produces a battery. • Emf of a Cell It is the amount of work done in moving a unit positive charge through the whole circuit and given by W E= q Its SI unit is volt or joule/coulomb. Terminal Potential Difference of a Cell In a closed • circuit, it is the potential difference between the two terminal of the cell. It is given byV = iR Its value is always less than the emf of the cell. • Internal Resistance of a Cell It is the resistance offered by the electrolyte of the cell to the flow of current through it. æE ö In terms of E and V, it is represented as r = ç - 1÷ R èV ø If cell is charging state, then E = V - ir.
Kirchhoff’s Laws • Kirchhoff’s First Law [Junction or
Grouping of Cells (i) In Series If n cells, each of emf e and internal resistance r are connected in series to a resistance R, then equivalent emf e, r
(ii) In Parallel If n cells, each of e, r emf e and internal resistance r are connected in parallel to e, r resistance R, then equivalent e, r emf, e eq = e. I Equivalent internal resistance, R 1 1 1 1 n = + +¼+ = req r1 r1 rn r r or req = n e Current in the circuit, I = ( R + r/ n ) (iii) In Mixed Grouping If n e, r e, r e, r identical cells are 1 1 n 2 connected in a row and 2 such m rows are connected in parallel as shown below, I m then equivalent emf of the V combination, e eq = ne. R Equivalent internal resistance of the combination, nr req = m Main current flowing through the load, mne ne = I= nr mR + nr R+ m Potential difference across load, V = IR. I Current from each cell, I ¢ = n V Potential difference across each cell, V ¢ = . n
e, r
e, r
e, r
I R
e eq = e1 + e 2 + ¼ + e n = ne Equivalent internal resistance, req = r1 + r2 + ¼ + rn = nr e eq ne Current in the circuit, I = = ( R + req ) ( R + nr )
I2 Current Law (KCL)] According to this law, “the algebraic I1 sum of currents meeting at the I3 junction is zero”. i.e. SI = 0 I4 According to KCL, I1 + I 2 = I 3 + I 4 The currents entering a junction are taken positive, while the currents leaving the junction are taken negative. This law represents conservation of charges.
• Kirchhoff’s Second Law [Loop or Voltage Law (KVL)]
According to this law, “the algebraic sum of potential differences in a closed loop is zero”, i.e. SV = 0 The potential difference across a source is taken negative, when we traverse from negative to positive terminal otherwise positive.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
The potential difference across a resistor is taken positive, when we traverse in reverse direction of current otherwise negative. This law represents conservation of energy.
Sign Convention for the Application of Kirchhoff’s Law For the application of Kirchhoff’s laws, the following sign conventions are to be considered (i) The change in potential in traversing a resistance in the direction of current is –IR while in the opposite direction is +IR. R
B
A I
–IR
R
B
+E –
B
A
–E
+E –
(i) Total power consumed is given by Ptotal = P1 + P2 + .... 1 (ii) Pconsumed (brightness) µ Prated µ I µ , i.e. in parallel R combination, bulb of greater wattage will give more bright light and more current will pass through it.
Heating Effect of Current
+IR
(ii) The change in potential in traversing an emf source from negative to positive terminal is +E, while in the opposite direction is -E irrespective of the direction of current in the circuit. A
Parallel Combination of Bulbs
B
+E
Due to this electrical energy, the current flowing in a conductor is dissipated as heat energy and given by H=E=
This relation is called Joule’s law of heating.
Wheatstone’s Bridge It is an arrangement of four resistances to determine the value of one of unknown resistance, as shown below
Electrical Energy It is the total work done by the source of emf in maintaining the electric current in the given circuit for a specified time. It is given by E = W = VI t = V 2 t / R
B i1
P G
A
Its SI unit is joule (J) or watt-second.
R
Electricity Consumption To express electrical energy consumed commercially, a special unit kilowatt-hour is used in place of joule. It is also called 1 unit of electrical energy. 1 kilowatt hour or 1 unit of electrical energy is the amount of energy dissipated in 1 hour in a circuit, when the electric power in the circuit is 1 kilowatt. 6
1 kilowatt-hour (kWh) = 3.6 ´ 10 joule (J)
Electric Power It is the rate at which electrical energy is supplied per unit time to maintain the flow of current in a conductor and given by P = VI = I 2 R = V 2 / R.
E
Power Consumption in a Combination of Bulbs
i1
Q
S
i2
i
C i2
D
In balanced condition, P / Q = R / S If position of cell and galvanometer is interchanged, this condition will not change.
Meter Bridge It is based on the working of Wheatstone bridge. R
X B
Its SI unit is watt (W) and its commercial unit is horse power (HP), where 1 HP = 746 W
G (100 – l1)
l1
Series Combination of Bulbs (i) Total power consumed is given by 1 1 1 = + + .... . Peq P1 P2
V 2t V 2t cal joule = R 4.2 R
ig=0
A I
1 , i.e. in series Prated combination, bulb of lesser wattage will give more bright light and potential difference appearing across it will be more.
(ii) Pconsumed ( brightness) µV µ R µ
Meter scale
( ) e
K1
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CURRENT ELECTRICITY
If null point is obtained at length l of meter wise, then R l = X (100 - l ) It is used for following purpose (i) To measure an unknown resistance. (ii) To compare two unknown resistances.
It consists of a long resistive wire of length of about 1 m to 10 m. K
B
+
+
e
–
+
e
– Rh
400
B
J
…(i)
e1 = ( x l1 ) I
300
200
where, x = resistance per unit length. 0 10 20 30 40 50 60 70 80 90
A
+ – 1 e1 G + – 3 2 e2
…(ii)
e 2 = ( x l2 ) I
R
Meter rod
From Eqs. (i) and (ii), we get e1 l1 or = e 2 l2
400
The arrangement is shown in figure. 300
–
200
B
A
+
+ e′ – Rh
J
A
It works on the principle that the fall of potential across any portion is directly proportional to the length of that portion.
E0 R V IR k= = = L L (R 0 + R ) L E 0 = emf of battery R 0 = resistance inserted by rheostat.
0 10 20 30 40 50 60 70 80 90
E S
g R
K2
When K 2 is kept out, e = xl1 I But if by inserting key K 2 and introducing some resistance S (say), then potential difference V is balanced by a length l2 , where
where,
300
200
Meter rod
The potential gradient, i.e. fall in potential per unit length is given by,
K1
400
0 10 20 30 40 50 60 70 80 90
G – +
and
A
+
Determination of Internal Resistance of a Cell using Potentiometer
Rh
J
A
K –
Similarly, when the plug is put in the gap between 2 and 3, we get
Potentiometer
A
The arrangement of two cells of emfs e1 and e 2 which are to be compared is shown in the figure. If the plug is put in the gap between 1 and 3, we get
where, X = unknown resistance.
–
To Compare the emf’s of two Cells using Potentiometer
V = kl2 .
Internal resistance of cell, l - l2 e -V R = 1 r= R V l2
Topical Practice Questions All the exam questions of this chapter have been divided into 5 topics as listed below Topic 1 — ELECTRIC CONDUCTION, OHM’S LAW, RESISTANCE AND CARBON RESISTORS
482–489
Topic 2
—
COMBINATION OF RESISTORS
490–501
Topic 3
—
CELLS & THEIR COMBINATIONS AND KIRCHHOFF’S LAWS
502–510
Topic 4
—
DIFFERENT MEASURING INSTRUMENTS
510–521
Topic 5
—
HEATING EFFECT OF CURRENT
522–530
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 1 Electric Conduction, Ohm’s Law, Resistance and Carbon Resistors 2019 R 1 1 For a wire = and length of wire is l = 5 cm. l 2 If potential difference of 1 V is applied across it, then current through wire will be [AIIMS] (a) 40 A (b) 4 A (c) 25 A (d) 2.5 A 2 A current of 10 A is passing through a metallic wire of cross-sectional area 4 ´ 10-6 m 2 . If the density of the aluminium conductor is 2.7 g/cc considering aluminium gives 1 electron per atom for conduction, then find the drift velocity of the electrons if molecular weight of aluminium is 27 g. [AIIMS] (a) 16 (b) 3.6 ´ 10-4 m/s . ´ 10-4 m/s (c) 2.6 ´ 10-4 m/s (d) 15 . ´ 10-4 m/s -8
3 If resistivity of copper is 172 . ´ 10 W-m and number of free electrons in copper is 8.5 ´ 1028 / m 3 . Find the mobility. [JIPMER] (a) 4. 25 ´ 10-3 m 2 / CW (b) 6.8 ´ 10-3 m 2 / CW (c) 8.5 ´ 10-3 m 2 / CW (d) 3.4 ´ 10-3 m 2 / CW
2018 4 A carbon resistor of (47 ± 4.7) kW is to be marked with rings of different colours for its identification. The colour code sequence will be [NEET] (a) Yellow - Green - Violet - Gold (b) Yellow - Violet - Orange - Silver (c) Violet - Yellow - Orange - Silver (d) Green - Orange - Violet - Gold 5 R = 65 ± 1 W , l = 5 ± 0.1 mm and d = 10 ± 0.5 mm. Find error in calculation of resistivity. [JIPMER] (a) 21% (b) 13% (c) 16% (d) 41% 6 A current i is flowing through the wire of diameter (d) having drift velocity of electrons v d in it. What will be new drift velocity when diameter of wire is made d/4? [JIPMER]
(a) 4v d
v (b) d 4
(c) 16 v d
2015 8 Across a metallic conductor of non-uniform cross-section, a constant potential difference is applied. The quantity which remain constant along the conductor is [NEET] (a) current density (b) current (c) drift velocity (d) electric field
2014 9 The dimensions of mobility of charge carriers are [Kerala CEE]
(a) [M -2 T 2 A] (c) [M -2 T 3 A] (e) [M -1 T 3 A -1 ]
(b) [M -1 T 2 A] (d) [M -1 T 3 A]
10 The temperature coefficient of resistance of an alloy used for making resistors is [Kerala CEE] (a) small and positive (b) small and negative (c) large and positive (d) large and negative (e) zero 11 A wire of resistance 4 W is stretched to twice its original length. In the process of stretching, its area of cross-section gets halved. Now, the resistance of the wire is [EAMCET] (a) 8 W (b) 16 W (c) 1 W (d) 4 W 12 A carbon film resistor has colour code, green, black, violet and gold. The value of the resistor is [KCET] (a) 50 MW (b) 500 MW (c) 500 ± 5% MW (d) 500 ± 10% MW
2013 13 The resistance R t of a conductor varies with temperature t
as shown in figure. If the variation is represented by [AIIMS] R t = R 0 (1 + at + bt 2 ) , then
Rt
v (d) d 16
2017 7 The resistance of a wire is R ohm. If it is melted and stretched to n times its original length, its new resistance will be [NEET] R R (c) n 2 R (d) 2 (a) nR (b) n n
t
(a) a and b both are negative (b) a is positive and b is negative (c) a and b both are positive (d) a is negative and b is positive
483
CURRENT ELECTRICITY
14 A 220 V main supply is connected to a resistance of 100 k W. The effective current is [UP CPMT] (a) 2.2 mA (b) 2.2 2 mA 2.2 (c) mA (d) None of these 2 15 The electrical conductivity of the metal decreases with temperature, because [WB JEE] (a) the energy of the electrons increases with temperature (b) a metal expands on heating (c) the atoms of the metal vibrate more at higher temperature (d) metals have low specific heat
2012 16 Charge passing through a conductor of cross-section area
A = 0.3 m 2 is given by q = 3t 2 + 5t + 2 in coulomb, where t is in second. What is the value of drift velocity at [AIIMS] t = 2 s? (Given, n = 2 ´ 1025 / m 2 ) (a) 0.77 ´ 10-5 m /s (b) 1.77 ´ 10-5 m /s (c) 2.08 ´ 105 m /s (d) 0.57 ´ 10-5 m /s
2011 17 The masses of the three wires of copper are in the ratio 5 : 3 : 1 and their lengths are in the ratio 1 : 3 : 5. The ratio of their electrical resistances is [J&K CET] (a) 5 : 3 : 1 (b) 125 : 15 : 1 (c) 1: 15 : 125 (d) 1 : 3 : 5
2010 18 Two wires of the same material but of different diameters
21 A conducting wire of cross-sectional area 1cm 2 has 3 ´ 1023 charge carriers per metre 3 . If the wire carries a current 24 mA, then drift velocity of carriers is [Manipal] (b) 0.5 ms -1 (a) 5 ´ 10-2 ms -1 (d) 5 ´ 10-6 ms -1 (c) 5 ´ 10-3 ms -1 22 The mobility of free electrons (charge = e, mass = m and relaxation time = t) in a metal is proportional to [Manipal] e m (b) t (a) t m e e m (c) (d) mt et 23 The resistance of a wire is 24 W. It is so stretched that the length becomes four times, then the new resistance of wire will be [OJEE] (a) 248 W (b) 298 W (c) 384 W (d) 428 W 24 A wire of resistance R is elongated n-fold to make a new uniform wire. The resistance of new wire is [WB JEE] (a) nR (b) n 2 R (c) 2nR (d) 2n 2 R 25 Electric field and current density have relation (a) E µ J 2 (b) E µ J 1 1 (c) E µ 2 (d) E2 µ J J
26 A battery is connected to a uniform resistance wire AB and B is earthed. Which one of the following graphs below shows how the current density J varies along AB?
carry the same current I. If the ratio of their diameters is 2 : 1, then the corresponding ratio of their mean drift velocities will be [AFMC] (a) 4 : 1 (b) 1 : 1 (c) 1 : 2 (d) 1 : 4 19 The temperature (T ) dependence of resistivity (r ) of a semiconductor is represented by [BHU] ρ
–+
A
(a)
(b) O
T
ρ
B
(c) O
zero at all points
O
(d) T
J
(b)
J
T
ρ
(c) O
[Haryana PMT]
ρ
(a) O
[MP PMT]
A
O
B
J
(d)
A
B
A
B
J
T
20 Choose the correct statement. [UP CPMT] (a) When we heat a semiconductor, its resistance increases. (b) When we heat a semiconductor, its resistance decreases. (c) When we cool a semiconductor, it becomes superconductor. (d) Resistance of semiconductor is independent of temperature.
O
A
B
O
27 The unit of specific conductivity is (a) W cm -1 (b) W cm -2 -1 (c) W cm (d) W -1 cm -1
[Punjab PMET]
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
28 The current-voltage graph for a given metallic wire at two different temperaturesT1 and T2 is shown in the figure. The [EAMCET] temperatures T1 and T2 are related as
36 Which of the following materials is the best conductor of electricity? [RPMT] (a) Platinum (b) Gold (c) Silicon (d) Copper 37 The resistance of a wire at 300 K is found to be 0.3 W. If the temperature coefficient of resistance of wire is 1.5 ´ 10-3 K -1 , then the temperature at which the resistance becomes 0.6 W is [KCET] (a) 720 K (b) 345 K (c) 993 K (d) 690 K
T1 I
T2
V
(a) T1 > T2
(b) T1 < T2
(c) T1 = T2
35 Resistance of a wire at 20°C is 20 W and at 500°C is 60 W. At what temperature its resistance is 25 W? [OJEE] (a) 160°C (b) 250°C (c) 100°C (d) 80°C
(d) T1 > 2T2
29 The temperature coefficient of resistance of a wire is 0.00125 / °C. At 300 K temperature, its resistance is 1 W. The resistance of the wire will be 2 W at [CG PMT] (a) 1154 K (b) 1100 K (c) 1400 K (d) 1127 K 30 The electrical resistivity of a sample [MGIMS] (a) is proportional to its length (b) is proportional to the area of cross-section (c) is inversely proportional to the length (d) Neither depends on the length nor on the area of cross-section 31 At room temperature, copper has free electron density of 8.4 ´ 1028 m -3 . The electron drift velocity in a copper conductor of cross-sectional area of10-6 m 2 and carrying a current of 5.4 A, will be [JIPMER] (b) 0.4 ms -1 (c) 4 cms -1 (d) 0.4 mms -1 (a) 4 ms -1
2009 32 A steady current is set up in a metallic wire of non-uniform cross-section. How is the rate of flow of free electrons related to the area of cross-section A? [AIIMS] (a) K is independent of A (b) K µ A -1 (c) K µ A (d) K µ A 2 V ( V = applied potential i difference and i = current flowing) is [AFMC] (a) independent of temperature (b) increases as the temperature rises (c) decreases as the temperature rises (d) increases or decreases as temperature rises depending upon the metal
33 For a metallic wire, the ratio
34 A wire 50 cm long and 1 mm 2 in cross-section carries a current of 4 A when connected to a 2 V battery. The resistivity of the wire is [AFMC] (a) 2 ´ 10-7 W - m (b) 5 ´ 10-7 W - m (c) 4 ´ 10-6 W - m (d) 1 ´ 10-6 W - m
38 A flash light lamp is marked 3.5 V and 0.28 A. The filament temperature is 425°C. The filament resistance at 0°C is 4 W. Then, the temperature coefficient of resistance of the material of the filament is [EAMCET] (a) 8.5 ´ 10-3 K -1 (b) 3.5 ´ 10-3 K -1 (c) 0.5 ´ 10-3 K -1 (d) 5 ´ 10-3 K -1 39 The copper having mass of 1kg is drawn into a wire of 1mm diameter and a wire of 2 mm diameter. The resistance of the two wires will be in the ratio [CG PMT] (a) 2 : 1 (b) 1 : 2 (c) 16 : 1 (d) 4 : 1 40 Nichrome or manganin is widely used in wire bound standard resistors, because of their [DUMET] (a) temperature independent resistivity (b) very weakly temperature dependent resistivity (c) strong dependence of resistivity with temperature (d) mechanical strength 41 The current flowing through a wire depends on time as I = 3t 2 + 2t + 5. The charge flowing through the cross-section of the wire in time from t = 0 to t = 2 s is (a) 22 C (b) 20 C [DUMET] (c) 18 C (d) 5 C
2008 42 A wire of a certain material is stretched slowly by 10%. Its new resistance and specific resistance become respectively, [CBSE AIPMT] (a) 1.2 times, 1.1 times (b) 1.21 times, same (c) Both remain the same (d) 1.1 times, 1.1 times
43 The electron drift velocity is small and the charge of the electron is also small but still, we obtain large current in a conductor. This is due to [AFMC] (a) the conducting property of the conductor (b) the resistance of the conductor is small (c) the electron number density of conductor is small (d) the electron number density of conductor is enormous 44 There is current of 40 A in wire of 10-6 m 2 area of cross-section. If the number of free electrons per cubic metre is 1029 , then the drift velocity is [BHU] (b) 25.0 ´ 10-3 ms -1 (a) 250 ´ 10-3 ms -1 (c) 2.50 ´ 10-3 ms -1 (d) 1.25 ´ 10-3 ms -1
485
CURRENT ELECTRICITY
(c) the resistance will be halved and specific resistance will be doubled (d) the resistance and the specific resistance, both will remain unchanged
45 Which part represents the negative dynamic resistance? Potential (V)
[Manipal]
A
C B
E D
Current (I )
(a) AB (b) BC (c) CD (d) DE 46 A wire of resistance 5.5 Wis drawn out uniformly so that its length is increased twice, then its new resistance is (a) 44 W (b) 42 W [Kerala CEE] (c) 40 W (d) 11 W (e) 22 W
47 A metal wire is subjected to a constant potential difference. When the temperature of the metal wire increases, then the drift velocity of the electron in it [KCET] (a) increases and thermal velocity of the electron decreases (b) decreases and thermal velocity of the electron decreases (c) increases and thermal velocity of the electron increases (d) decreases and thermal velocity of the electron increases
2007 48 The length of the wire is doubled. Its conductance will be [AFMC] (a) remain unchanged (b) halved (c) doubled (d) quadrupled 49 An aluminium rod and copper rod are taken such that their lengths are same and their resistances are also same. The specific resistance of copper is half that of aluminium but its density is three times that of aluminium. The ratio of the mass of aluminium rod and that of copper rod will be
51 The colour code for a resistor of resistance 3.5 k Wwith 5% tolerance is [Kerala CEE] (a) orange, green, orange and gold (b) red, yellow, black and gold (c) orange, green, orange and silver (d) orange, green, red and silver (e) orange, green, red and gold 52 For driving current of 2 A for 6 min in a circuit, 1000 J of work is to be done. The emf of the source in the circuit is (a) 1.38 V (b) 1.68 V [BHU] (c) 2.03 V (d) 3.10 V
2006 53 A certain electrical conductor has a square cross-section, 2.0 mm on a side and is 12 m long. The resistance between its ends is 0.072 W. The resistivity of its material is equal to (a) 2.4 ´ 10-6 W - m (b) 1.2 ´ 10-6 W - m [BHU] (c) 1.2 ´ 10-8 W - m
54 A potential difference is applied across the ends of a metallic wire. If the potential difference is doubled, the drift velocity will [MHT CET] (a) be doubled (b) be halved (c) be quadrupled (d) remain unchanged 55 Two copper wires of length l and 2l have radii r and 2 r , respectively. What is the ratio of their specific resistances? [DUMET]
(a) 1: 2
2 (b) 3
1 (c) 3
(c) 1: 1
a conductor are related as E J (a) s = (b) s = J E (e) s = J 2 E
(d) 6
50 The electric resistance of a certain wire of iron is R. If its length and radius are both doubled, then [Manipal] (a) the resistance will be doubled and the specific resistance will be halved (b) the resistance will be halved and the specific resistance will remain unchanged
(b) 2 : 1
(d) 1: 3
2005 56 The electric field E, current density J and conductivitys of
[UP CPMT]
1 (a) 6
(d) 2.4 ´ 10-8 W - m
[Kerala CEE]
(c) s = JE
(d) s =
1 JE
57 What is the drift velocity of electrons, if the current flowing through a copper wire of 1 mm diameter is 1.1A? Assume that, each atom of copper contributes one electron. (Take, density of Cu = 9 g cm -3 and atomic weight of Cu = 63) [DUMET] -1 -1 (b) 0.5 mm s (a) 0.3 mm s (d) 0.2 mm s -1 (c) 0.1 mm s -1
Answers 1 11 21 31 41 51
(a) (b) (c) (d) (a) (e)
2 12 22 32 42 52
(c) (c) (a) (c) (b) (a)
3 13 23 33 43 53
(a) (c) (c) (b) (d) (d)
4 14 24 34 44 54
(b) (a) (b) (d) (c) (a)
5 15 25 35 45 55
(b) (a) (b) (d) (c) (c)
6 16 26 36 46 56
(c) (b) (d) (d) (e) (b)
7 17 27 37 47 57
(c) (c) (d) (c) (d) (c)
8 18 28 38 48
(b) (d) (b) (d) (b)
9 19 29 39 49
(b) (c) (d) (c) (b)
10 20 30 40 50
(a) (b) (d) (b) (b)
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations R 1 = l 2 Length of wire, l = 5 cm = 5 ´ 10-2 m l R = = 2.5 ´ 10-2 W \ 2 Potential difference, V = 1V or IR = 1 1 1 100 I = = = = 40 A R 2.5 ´ 10-2 2.5
As per the colour code for carbon resistors, the colour assigned to numbers. 4-Yellow, 7-Violet, 3-Orange For ±10% accuracy, the colour is silver. Hence, the bands of colours on carbon resistor in sequence are yellow, violet, orange and silver.
1 (a) Given, for a wire,
5 (b) Given,
R = 65 W , DR = 1W , l = 5 ´ 10-3 m, Dl = 0.1 ´ 10-3 m, d = 10 ´ 10-3 m, Dd = 0.5 ´ 10-3 m
2 (c) Given, current, I = 10 A Area of cross-section, A = 4 ´ 10-6 m 2
Q Resistivity, r = RA / l Rp (d / 2 ) 2 pRd 2 or r= = l 4l Dr DR D d Dl = +2 + \ r R d l
Density of conductors, r = 2.7 g/cc = 2.7 ´ 103 kg/m 3 Molecular weight of aluminium, M w = 27g = 27 ´ 10-3 kg If n be the total number of electrons in the conductor per unit volume, then Total number of electrons n= Volume of conductor (V ) Number of atoms per mole ´ Number of moles = V Avogadro number æ M ö = ´ç ÷ è Mw ø V = 6 ´ 1023 ´
r Mw
= 6 ´ 1023 ´
2.7 ´ 103 27 ´ 10-3
\ n = 6 ´ 1028 We know that, drift velocity, I vd = neA 10 = 6 ´ 1028 ´ 16 . ´ 10-19 ´ 4 ´ 10-6 = 2.6 ´ 10-4 m/s
3 (a) Given, resistivity of copper, r = 172 . ´ 10-8 W-m
Electrons density, n = 8.5 ´ 1028 / m3 1 Mobility (m ) = \ r ne 1 = 172 . ´ 10-8 ´ 8.5 ´ 1028 ´ 16 . ´ 10-19 = 4.25 ´ 10-3 m 2/C W
4 (b) Given, R = (47 ± 4.7) kW = 47 ´ 103 ± 10% W
\
æ 0.5 ´ 10-3 ö 1 Dr = + 2ç ÷ 65 r è 10 ´ 10-3 ø
. ´ 10-3 01 5 ´ 10-3 Dr or = 0.0153 + 01 . + 0.02 r Dr or » 0.1353 r So, error in calculation of resistivity is 13.5% » 13%. 1 (c)Q Current, I = nAevd or vd µ A If diameter of wire is d /4, then area will be A / 16, so new drift velocity = 16 vd . +
6
7 (c) Volume of material remains same in stretching. As volume remains same, A1l1 = A2l2 Now, given l2 = nl1 \ New area, A2 = A1l1 / l2 = A1 / n Resistance of wire after stretching, æ l ö l nl R2 = r 2 = r 1 = çr 1 ÷ n2 A2 A1 / n è A1 ø = n2R
é æ l1 ö ù êQ R = çr ÷ ú è A1 ø û ë
8 (b) As the cross-sectional area of the conductor is non-uniform, so current density will be different. As, I = JA …(i) It is clear from Eq. (i), when area increases, the current density
9
decreases, so the number of flow of electrons will be same and thus the current will be constant. drift velocity (b) As, mobility = electric field vd vd v dq v d = = d = d Þ m= æW ö E V W ç q÷ d è ø [metre second -1 ] [metre] [ampere - second] = [kg-metre2 -second - 2 ] =
[LT -1LAT] = [M -1AT 2 ] [ML2T -2 ]
10 (a) The temperature coefficient of resistance of an alloy used for making resistors is small and positive. l 11 (b) By specific resistance, R = r A Given, R1 = 4 W , l1 = l, A1 = A, R2 = ? l2 = 2l, A2 = A / 2 , r = constant l1 R1 A1 l1 ´ A2 = = \ l2 l2 ´ A1 R2 A2 A l´ 4 2 = Þ R2 2l ´ A 4 1 = Þ R2 = 16 W Þ R2 4
12 (c) According to the question, corresponding to the colours of the first and second bands, i.e. green and black, first two significant figures are 5 and 0. Corresponding to the colour of third band, i.e. violet, the multiplier is 107 . Therefore, the value of the resistance is 50 ´ 107 W. The gold colour of the fourth band indicates the tolerance of ± 5%. So, the value of the resistor is written as 50 ´ 107 W ± 5% = 500 ´ 106 W + 5% = 500 ± 5% M W
13 (c) Graph indicates that resistance increases with increase in temperature, so a and b both are positive.
14 (a) According to Ohm’s law, V = IR Þ
I =
V R
487
CURRENT ELECTRICITY
Given, V = 220 V, R = 100 kW = 100 ´ 103 W 220 \ I = 100 ´ 103 Þ
I = 2.2 ´ 10-3 A = 2.2 mA
15 (a) The electrical resistance arises due to the collisions of electrons with the lattice and other electrons in their paths. When temperature increases, the electrons move faster due to their increased kinetic energy. Thus, they make more number of collisions thereby, increasing the resistance. As, resistance is inversely proportional to the conductivity. Hence, when the temperature of the metal increases electrical conductivity decreases.
16 (b) Cross-sectional area of conductor, A = 0.3 m 2 and
n = 2 ´ 1025 m -2
Charge, q = 3t 2 + 5t + 2 C dq Current, i = = 6t + 5 = 17 A dt [Q t = 2 ] We also have i = neAvd i Drift velocity, vd = neA 17 = 2 ´ 1025 ´ 1.6 ´ 10-19 ´ 0.3 17 = 0.96 ´ 106 = 1.77 ´ 10-5 m /s
17 (c) Given, l1 : l2 : l3 = 1 : 3 : 5 = k (say) Þ l1 = 1k, l2 = 3k, l3 = 5k m1 : m2 : m3 = 5 : 3 : 1 = m (say) Þ m1 = 5m, m2 = 3m, m3 = 1m rl Resistance, R = A where, r is resistivity of the material of conductor. l l l So, R1 : R2 : R3 = 1 : 2 : 3 A1 A2 A3 l2 l2 l2 = 1 : 2 : 3 V1 V2 V3 l2 l2 l2 = 1 : 2 : 3 m1 m1 m3 mù é êëQ density = V úû 1 9 25 = : : = 1 : 15 : 125 5 3 1
18 (d) Given, D1 : D2 = 2 : 1 I I ´4 Drift velocity, vd = = nAe npD 2e where, D is the diameter of the wire 1 i.e vd µ 2 D vd1 D22 æ 1 ö 2 1 = 2 =ç ÷ = Þ 4 vd D1 è 2 ø 2
19 (c) The resistivity of a semiconductor decreases with increase in temperature exponentially.
20 (b) With the rise in temperature, conductivity of semiconductor increases while resistance decreases.
21 (c) The current i and area of cross-section A, can be expressed in terms of drift velocity vd and the moving charges is given as i = nevd A where, n is number of charge carriers per unit volume (i.e. number density) and e is the charge on the electron (i.e. charge carrier). Given, A = 1 cm 2 = 1 ´ 10-4 m 2,
25 (b) Electric field E in a conductor of length l and having potential difference V at its ends is given by V …(i) E= Þ V = El l Also, from Ohm’s law, V = IR …(ii) From Eqs. (i) and (ii), we get Irl V = IR = = El A I E= r Þ A \ E = rJ or J = sE where, s = conductivity and r = resistivity or specific resistance of substance. Hence, E µ J.
26 (d) Wire AB is uniform, so current through wire AB at every point across cross-section will be same. Hence, current density, J (= i /A) at every point of the wire will be same.
27 (d) Specific conductivity 1 Specific resistance 1 = = (W -cm)-1 W - cm
=
n = 3 ´ 1023 m -3 and \
i = 24 mA = 24 ´ 10-3 A i vd = neA 24 ´ 10-3 = 23 (3 ´ 10 )(1. 6 ´ 10-19 )(10-4 ) = 5 ´ 10-3 ms-1
22 (a) Drift velocity per unit electric field is called mobility of electrons. v eE i.e. m = d = t E Em et m= \ m
23 (c) In case of stretching the wire, 2
R µl . If length becomes 4 times, so resistance becomes 16 times, i.e R¢ = 16 ´ 24 = 384 W
24 (b) The resistance of a wire is directly proportional to the length of the wire. Thus, R µ l 2 , when the length increases n-fold, resistance will also increase by n-fold times. Also, since the volume of the wire remains constant, so the area of the wire decreases n-fold. Hence, the net resistance increases to n2R, as the area is inversely proportional to resistance.
28 (b) Slope of the I-V curve at any point is equal to reciprocal of resistance at that point. From the given curve, slope for 1 1 > T1 > slope for T2, RT1 RT 2 Þ RT1 < RT2 Also for metallic wire, at higher temperature, resistance will be higher, so T2 > T1
29 (d) Given, a = 0.00125 / °C, R1 = 1 W, and As, Þ Þ Þ
R2 = 2 W, t1 = 300 K = 27° C t2 = T ° C (say) Rt = R0 (1 + at ) R1 (1 + at1 ) = R2 (1 + at2 ) 1 (1 + 0.00125 ´ 27) = 2 (1 + 0.00125 ´ t ) t = 854° C = (854 + 273) K = 1127 K
30 (d) Specific resistance or resistivity is the intrinsic property of the substance and independent of the shape and size of material. Hence, option (d) is correct.
488
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
31 (d) Given, n = 8.4 ´ 1028 m -3, A = 10
-6
m and i = 5.4 A
Drift velocity in a copper conductor, vd = i / neA 5.4 = 8.4 ´ 1028 ´ 1.6 ´ 10-19 ´ 10-6 = 0.4 ´ 10-3 ms-1 = 0.4 mm s-1
32 (c) As, i = Anevd Þ \
dq = Anevd dt dq µ A ÞK µ A dt
dq ö æ çQ i = ÷ è dt ø
33 (b) The resistance of a metallic wire at temperature t° C is given by Rt = R0 (1 + at ) where, a is the coefficient of expansion. The resistance of wire increases on increasing the temperature. Also, from ohm’s law, the ratio ofV / i is equal to R. Hence, on increasing the temperature, the resistance of metallic wire is increased, so the ratio V / i also increases. l 34 (d) As, R = r A V Q V = IR Þ R = I V l …(i) =r Þ I A Putting V = 2 V, l = 50 ´ 10-2 m, I = 4A and A = 1 ´ 10-6 m 2 , in Eq. (i), we get 2 ´ 10-6 = 1´ 10-6 W - m r= 4 ´ 50 ´ 10-2
35 (d) Here, R0 = 20 W, t1 = 20° C, t2 = 500° C and R500 = 60 W Þ Dt = t2 - t1 = 500 - 20 = 480° C As, R500 = R0 (1 + a Dt ) Þ 60 = 20 [1 + a (480)] 1 a= \ 240 Now, let the temperature be t. Then, Rt = 25W Q Rt = R0 [1 + a (Dt )] 1 ù é Þ 25 = 20 ê1 + × Dt 240 úû ë 1 æ5 ö Þ ç - 1÷ = (t - 20) è 4 ø 240 Þ
t = 80° C
36 (d) Copper is the best conductor among
40 (b) Nichrome and manganin are widely
the given materials.
2
37 (c) Given, R300 = 0.3 W, Rt = 0.6 W and t¢ = 300 K = 27° C Temperature coefficient of resistance, a = 1.5 ´ 10-3 K-1
41
used in wire bound standard resistors, because their resistivity is very weakly dependent on temperature. dq (a) As, I = dt Þ
\ R300 = R0 (1 + a ´ 27) ...(i)
Again, Rt = R0 (1 + at ) Þ 0.6 = R0 (1 + 1.5 ´ 10-3 ´ t )
...(ii)
Dividing Eq. (ii) by Eq. (i), we get 1 + 1.5 ´ 10-3 t 0.6 = 0.3 1 + 1.5 ´ 10-3 ´ 27
-3
Þ 2 + 81 ´ 10 = 1 + 1.5 ´ 10 t Þ 2 + 0.081 = 1 + 1.5 ´ 10-3 t 1.081 Þ t= = 720° C = 993 K 1.5 ´ 10-3
38 (d) Resistance at 425° C, V 3.5 350 = = W I 0.28 28 Rt = R0[1 + aDt ]
Þ R425°C =
…(i)
Þ R425°C = R0 [1 + aDt ]
350 = 4 [1 + a (425 - 0)] 28 [from Eq. (i)] a = 5 ´ 10-3 K -1
39 (c) Mass of Ist wire = (pr12l1 ) s Mass of IInd wire = (pr22l2 ) s \ (pr12l1 ) s = (pr22l2 ) s 2
Þ
Q
l1 æ r2 ö =ç ÷ l2 è r1 ø l r 1 R1 A1 = R2 r l2 A2
...(i)
...(ii)
From Eqs. (i) and (ii), we get 2
ær ö ær ö æ 1 ö = ç 2÷ ´ç 2÷ = ç ÷ è r1 ø è r1 ø è 1/ 2 ø = 16 : 1
rl A
l l2 or R µ A V (l + 10% l )2 and R ¢ µ V or
4
2
(as V = Al )
Rµ
10 ö æ l÷ çl + R¢ è 100 ø Therefore, = R l2 æ 11l ö ÷ ç è 10 ø
2
2
121 R¢ = = 100 R l2 or R ¢ = 1.21 R But the specific resistance will remain same for same material.
43 (d) When we close a circuit, the electric field is set up in the conductor, with the velocity of light. Due to which current is set up in entire circuit, which does not wait for the electrons to flow from one portion to other. Also in a conductor, the electron number density, i.e. number of electrons per unit volume of a conductor is very large (» 1028 m -3 ). So, large current in a conductor is obtained irrespective of their small drift velocity.
44 (c) Drift velocity, vd =
R1 l1 A2 l1 æ r2 ö = ´ = ´ç ÷ R2 l2 A1 l2 è r1 ø 2
3 3 2 2 2 2 [ t ] 0 + [ t ] 0 + 5 [ t ] 20 3 2 = 8 + 4 + 10 = 22 C
=
or
Here, Dt = 425° C, R0 = 4 W
Þ
0
R=
= 1 + 1.5 ´ 10-3 t
Þ
2
q = ò [ 3t 2 + 2t + 5 ] dt
\
42 (b) Original resistance of the wire,
Þ 2(1 + 1.5 ´ 10-3 ´ 27)
As,
I dt
1
Þ 0.3 = R0 (1 + 1.5 ´ 10-3 ´ 27)
-3
t2
ò dq = òt
i neA
40 1029 ´ 1.6 ´ 10-19 ´ 10-6 = 2.50 ´ 10-3 ms-1
=
45 (c) From the given V -I graph, the slope represents the resistance. As the part CD has negative slope, hence it has negative dynamic resistance.
489
CURRENT ELECTRICITY
46 (e) Resistance, R =
rl A
or
Rµ
l A
l2 or R µ l 2 V (as, Al = V = constant)
or
Rµ
2
2
Þ
R2 æ l2 ö æ 2l ö =ç ÷ =ç ÷ =4 è lø R1 è l1 ø
or
R2 = 4 R1 = 4 ´ 5.5 = 22 W
47 (d) With rise in temperature, the
48
thermal velocity of the electron increases due to increase in their thermal energy. As the result, the relaxation time decreases and hence drift velocity of charge carrier will also decrease because drift velocity is proportional to the relaxation time. 1 (b) Conductance is given by s = R l A Substituting R = r , we get s = . rl A 1 If A is constant, then we have s µ l s 2 l1 Þ = s 1 l2 s Substituting, l2 = 2l1, we get s 2 = 1 2 We see that, conductance will be halved.
49 (b) Resistance of wire of length l and area of cross-section A is l …(i) R = r× A If V is the volume of wire, then l2 …(ii) R = r× V If d is the density and m is the mass of wire, then l 2d R = r× Þ m µ rd m 2 1 2 mAl d r = Al ´ Al = ´ = \ mCu r Cu dCu 1 3 3
50
rl (b) The resistance of wire, R = A where, r = specific resistance of the wire.
Þ \
l l Þ Rµ 2 A r R1 l1 r22 = ´ R2 l2 r12
Rµ
(Q A = pr2 ) …(i)
Given, l1 = l , l2 = 2l , r1 = r, r2 = 2r and R1 = R Substituting these values in Eq. (i), (2r)2 R l we get = ´ 2 R2 2l r R R Þ = 2 Þ R2 = 2 R2 Therefore, resistance will be halved. Now, the specific resistance of the wire does not depend on the geometry of the wire. Hence, it remains unchanged.
51 (e) As, R = 3.5 kW ± 5% Þ
55 (c) The specific resistance (r) is the
R = 35 ´ 102 ± 5%
As per the colour code for carbon resistors, the colours assigned to numbers, 3 and 5 are orange and green. To the multiplier 102 the colour assigned is red. For ±5% accuracy, the colour is gold. \Colour code is orange, green, red, and gold.
52 (a) If i is the current in a wire, then the charge flowing through the wire in t second is q = it = 2 ´ 6 ´ 60 = 720 C The work done in taking q coulomb (720 C) of charge from one end of wire to other end under a potential difference of V volt (in this case emf) is W =V q W 1000 = = 1.38 V Þ V = q 720
53 (d) Resistance of a conductor is given by rl A RA \ Resistivity, r = l
Substituting the given values in Eq. (i), we get 0.072 ´ 4 ´ 10-6 r= 12 = 2.4 ´ 10-8 W - m eEt 54 (a) Drift velocity is given by vd = m V But E= l where, l is length of the conductor and V is potential difference applied across the ends of the conductor. eVt Þ vd µ V \ vd = ml So, when the potential difference is doubled, then the drift velocity will be doubled. characteristic property of the material of conductor. Its value depend upon the material of conductor and its temperature. Its value does not depend on the length and area of cross-section of the conductor. As, the materials (i.e. copper) of both the wires are same, hence r 1 : r 2 = 1 : 1 .
56 (b) The required relation is J = sE or
s=
J E
57 (c) As, i = ne A vd The number of electrons, Avogadro’s number n= Volume of 63 g of copper =
6.02 ´ 1023 6.02 ´ 1023 = cm 3 7 63 ´ 10-3 9 ´ 10–3
\ n=
6.02 ´ 1029 3 m 7 i neA 1.1 ´ 7
Q i = neAvd or vd =
R=
…(i)
Given, R = 0.072 W, A = (2 ´ 2) mm 2 = 4 ´ 10-6 m 2 , l = 12 m
=
é 6.02 ´ 1029 ´ 1.6 ´ 10-19 ´ p ù ê ´ (0.5 ´ 10-3 )2 úû ë
= 0.1 ´ 10-3 ms-1 = 0.1 mm s-1
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 2 Combination of Resistors 2019 1 The reading of an ideal voltmeter in the circuit shown is [NEET (Odisha)] 20 Ω
30 Ω
2017 5 Find the value of R net between A and B. 10W
10W
A
V 30 Ω
40W 20 Ω
2V
(a) 0.6 V (b) 0 V (c) 0.5 V (d) 0.4 V 2 Find the current in the 8W resistance in the given circuit. [JIPMER] 3W
40W
20W
B 10W
3W
[NEET]
10W
10W
10W
(a) 60 W (c) 70 W
(b) 40 W (d) 20 W
6 FindVP - VQ in the circuit shown in figure.
[NEET]
10W
3W
10W
P
3W
Q 18W
8W
3W
+
R
25W – 10 V
3W
(a) 6.68 V (b) 8 V (c) 4.65 V 7 Find the value of i in shown figure.
24 V
(a) 2 A (b) 3A (c) 4 A (d) 5 A 3 A circuit contain two resistances R1 and R 2 are in series. Find the ratio of input voltage to voltage of R 2 . [JIPMER] R2 R + R2 (a) (b) 1 R1 + R 2 R2 R1 + R 2 R1 (c) (d) R1 R1 + R 2
4 In the given circuit, find voltage across 12 W resistance. [JIPMER] 8Ω 4Ω
8Ω 12A
4Ω
[NEET]
30 Ω i1 60 Ω i2 i
2V
(a)0.2A
(b)0.1A
(c)0.3A
(d) 0.4A
2015 8 A , B and C are voltmeters of resistance R, 1.5 R and 3R
respectively as shown in the figure. When some potential difference is applied between X and Y , the voltmeter [NEET] readings areV A , VB andVC respectively. Then, B
12Ω
(a) 12 V (c) 72 V
(d) 7 V
X
(b) 36 V (d) 48 V
A
(a) V A = VB = VC (c) V A = VB ¹ VC
C
Y
(b) V A ¹ VB = VC (d) V A ¹ VB ¹ VC
491
CURRENT ELECTRICITY
2014 9 The equivalent resistance of two resistors connected in 4 series is 6 W and their parallel equivalent resistance is W. 3 What are the values of resistances? [KCET] (a) 4 W, 6 W (b) 8 W, 1 W (c) 4 W, 2 W (d) 6 W, 2 W 10 Five resistances are connected as shown in figure. If total current flowing is 0.5 A, then the potential difference [EAMCET] V A - VB is 6Ω
6Ω
A
B
6Ω
(a) 8 V
15 Six resistances each of value r = 6 W are connected between points A , B andC as shown in the figure. If R1 , R 2 and R 3 are the resistances between A and B, between B and C and between A and C respectively, then R1 : R 2 : R 3 will be equal to [AMU]
6Ω
6Ω
A 0.5 A
14 Resistors of 6 W and 12 W are connected in parallel. This combination is connected in series with a 10 V battery and 6 W resistor. What is the potential difference between the terminals of the 12 W resistor? [AIIMS] (a) 4 V (b) 16 V (c) 2 V (d) 8 V
r
r
12 Ω
(b) 6 V
(c) 2 V
connected to each other to form a square. If the resistance of each wire is R, then equivalent resistance across the opposite corners is [UP CPMT] (a) R (b) R/ 2 (c) R/ 4 (d) None of these
r=6Ω
r
r
(d) 4 V
2013 11 Four wires each of same length, diameter and material are
r
B
(a) 6 : 3 : 2
C
r
(b) 1 : 2 : 3
(c) 5 : 4 : 3
(d) 4 : 3 : 2
16 What current will flow through the 2k W resistor in the circuit shown in the figure? [WB JEE] 6 kΩ
12 In the given circuit, the equivalent resistance between the points A and B (in ohms) is [Manipal]
4 kΩ
72 V
3 kΩ
2 kΩ
3Ω
A
9Ω
6Ω
12 Ω
(b) 11.6
(a) 3 mA
(b) 6 mA
(c) 12 mA
[WB JEE]
B
(c) 14.5
A
(d) 21.2
2012 13 A ring is made of a wire having a resistance R 0 = 12 W . Find the points A and B as shown in the figure, at which a current carrying conductor should be connected so that the resistance R of the sub-circuit between these points is equal to 8/3 W. [CBSE AIPMT]
B R
(a) 3R
R
(b) R
(b)
B
l1 1 = l2 3
(c)
l1 3 = l2 8
R
(d)
l1 1 = l2 2
(d) None of these
network shown in figure is
(a)
2 R 3
(b)
[OJEE]
R
R
D
l1 5 = l2 8
R 3
2010 18 The effective resistance between points A and C for the
3 R 2
B R
R
(a)
R
(c)
A A
(d) 36 mA
2011 17 The resistance across A and B in the figure below will be
7Ω
5Ω
(a) 9
2Ω
O
R
R R C
(c) 2R
(d)
1 2R
492
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
19 Three resistances 5 W, 5 W and 6 W are connected as shown in figure. If the point S divides the resistance 6 W into two equal halves, the resistance between points P and S is [Kerala CEE]
P
23 The potential difference (in volt) across the resistance R 3 in the circuit shown in figure, is ( R1 = 15 W, R 2 = 15 W, [BCECE] R 3 = 30 W and R 4 = 35 W)
50 V
5Ω
R1
5Ω
R3 R2
S Q
(a) 11 W (e) 4 W
R
6Ω
(b) 8 W
R4
(c) 6 W
(d) 10 W
20 The reading of the ammeter in the following figure will be 6Ω
A
4Ω 2V 3Ω 2Ω
(a) 0.8 A (c) 0.4 A
(b) 0.6 A (d) 0.2 A
[WB JEE]
21 The current in the given circuit is 10 Ω
[JCECE]
5V
A
B 20 Ω
2V
(a) 0.3 A (c) 0.1 A
(b) 0.4 A (d) 0.2 A
22 The equivalent resistance between the points A and B in the following circuit is [DUMET] 5Ω
A
5Ω
B
(a) 3.12 W (c) 6.24 W
5Ω
(a) 5 (c) 15
(b) 7.5 (d) 12.5
24 A uniform wire of resistance R and length L is cut into four equal parts, each of length L/4, which are then connected in parallel combination. The effective resistance of the combination will be [JIPMER] (a) R (b) 4R R R (c) (d) 4 16 2009 25 Four resistances 10 W, 5 W, 7 W and 3 W are connected so that they form the sides of a rectangle AB, BC,CD and DA, respectively. Another resistance of 10 W is connected across the diagonal AC. The equivalent resistance between A and B is [AFMC] (a) 2 W (b) 5 W (c) 7 W (d) 10 W 26 You are given two resistances R1 and R 2 . By using them singly in series and in parallel, you can obtain the resistances of 8 W and 1.5 W, respectively. The values of R1 and R 2 are (a) 1 W and 7 W (b) 1.5 W and 6.5 W [BCECE] (c) 3 W and 5 W (d) 2 W and 6 W 27 A wire of resistance 12 W -m -1 is bent to form a complete circle of radius 10 cm. The resistance between its two diametrically opposite points A and B as shown in the figure, is [CBSE AIPMT]
5Ω
A
B
5Ω
(b) 1.56 W (d) 12.48 W
(a) 0.6 p W (c) 6 p W
(b) 3 W (d) 6 W
493
CURRENT ELECTRICITY
2008 28 In the circuit shown, the current through the 4 W resistor is 1 A when the points P and M are connected to a DC voltage source. The potential difference between the points M and N is [CBSE AIPMT]
2007 32 In the adjoining figure, the equivalent resistance between A and B is A
[Kerala CEE] 1Ω
2Ω
4Ω
6Ω
4Ω 1Ω
2Ω 4Ω
2Ω
B
3Ω P
(a) 5 W (c) 2.5 W (e) 7.8 W
M 0.5 Ω 1Ω
N 0.5 Ω
(a) 1.5 V (b) 1.0 V (c) 0.5 V (d) 3.2 V 29 A piece of wire of resistance R is cut into n equal parts, then these parts are connected in parallel. If the equivalent resistance of the parallel combination is R¢, then ( R / R¢ ) is [BHU]
1 (a) 1 n2 (c) 1
n (b) 1 1 (d) n
33 For two resistance wires joined in parallel, the resultant 6 resistance is W. When one of the resistance wires breaks, 5 the effective resistance becomes 2 W . The resistance of the broken wire is [RPMT] 3 (b) 2 W (a) W 5 6 (c) W (d) 3 W 5 34 The equivalent resistance between A and B (of the circuit shown) is [AMU] 7Ω A
R1 50 Ω
R3
60 Ω
R4
30 Ω
+ 50 Ω
-
R2 R5
30 Ω
6Ω
3Ω
30 In circuit shown below, the resistances are given in ohm and the battery is assumed ideal with emf equal to 3 V. The voltage across the resistance R 4 is [J&K CET]
3V
(b) 8 W (d) 6.8 W
B
4Ω
(a) 4.5 W (c) 5.4 W
(b) 12 W (d) 20 W
35 In a network as shown in the figure, the potential difference across the resistance 2 R is (the cell has an emf of E volt and no internal resistance) [BCECE] 4R
(a) 0.4 V (c) 1.2 V
(b) 0.6 V (d) 1.5 V
R 2R
31 The equivalent resistance between the points A and B will be (each resistance is of 15 W) [KCET] 15 Ω
D
C
15
E
Ω 15
15 Ω
Ω
15 Ω
15
15
Ω
Ω
A
(a) 30 W (c) 10 W
15 Ω
B
(b) 8 W (d) 40 W
(a) 2 E (c) E/ 7
(b) 4 E/ 7 (d) E
36 A copper wire of length 1 m and radius 1 mm is joined in series with an iron wire of length 2 m and radius 3 mm and a current is passed through the wires. The ratio of the current density in the copper and iron wires is [Punjab PMET] (a) 18 : 1 (b) 9 : 1 (c) 6 : 1 (d) 2 : 3
494
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2006 37 The effective resistance across the points A and I is
A
2Ω
2Ω
B
2Ω
H
2Ω
2Ω
[CBSE AIPMT] D
(a) I
2Ω
2Ω
G
resistance R is bent into a complete circle, resistance between two of diametrically opposite points will be
[Kerala CEE]
C
2Ω
2005 41 When a wire of uniform cross-section a, length l and
F
(a) 2 W (c) 0.5 W (e) 10 W
42 In the circuit, E = 6.0V, R1 = 100 W, R 2 = R 3 = 50 W and R 4 = 75 W. The equivalent resistance of the circuit (in ohms) is [KCET]
(b) 1 W (d) 5 W
i
R1
E
38 A wire has resistance 12 W. It is bent in the form of a circle. The effective resistance between the two points on any diameter of the circle is [Haryana PMT] (a) 12 W (b) 24 W (c) 6 W (d) 3 W
(d)
(b) 26.31 (d) None of these
[KCET]
(a) 3 and 4 (c) 12 and 16
(b) 4 and 12 (d) 16 and 3
44 An electrical cable of copper has just one wire of radius 9 mm and its resistance is 5 W . The single wire of the cable is replaced by 6 different well insulated copper wires each of radius 3 mm. The total resistance of the cable will now be equal to [UP CPMT] (a) 270 W (b) 90 W (c) 45 W (d) 7.5 W
[Punjab PMET]
R (c) 16
R3
R2
43 By using only two resistance coils singly, in series or in parallel, one should be able to obtain resistance of 3 W, 4 W, 12 W and 16 W. The separate resistances of the coil are
40 A wire is cut into four pieces, which are put together by sides to obtain one conductor. If the original resistance of wire was R, the resistance of the bundle will be R (b) 8
R4
(a) 11.875 (c) 118.75
39 You are given n resistors, each of resistance r. They are first combined to get minimum possible resistance, then they are connected to get the maximum possible resistance. The ratio between minimum to maximum resistance is [Guj CET] 1 (a) (b) n n 1 (d) 2 (c) n 2 n
R (a) 4
R 8 R (d) 2
(b)
(c) 4 R
E
2Ω
2Ω
R 4
R 32
Answers b
1 11 21 31 41
(d) (a) (c) (c) (a)
2 12 22 32 42
(b) (b) (a) (a) (c)
3 13 23 33 43
(b) (d) (c) (d) (b)
4 14 24 34 44
(d) (a) (d) (a) (a)
5 15 25 35
(b) (c) (b) (b)
6 16 26 36
(c) (a) (d) (b)
7 17 27 37
(b) (c) (a) (b)
8 18 28 38
(a) (a) (d) (d)
9 19 29 39
(c) (e) (c) (d)
10 20 30 40
(d) (c) (a) (c)
495
CURRENT ELECTRICITY
Explanations 1 (d) The given circuit diagram can be drawn as shown below A
D I
I1 20 Ω B 30 Ω I2
V
30Ω
20 Ω
C
3 (b) The situation is shown in the circuit diagram.
E
R1
R2
V1
V2
F
I
2V
The equivalent resistance of circuit is given by 1 1 1 = + Req RAE RDF 1 1 + (20 + 30) (30 + 20) 1 1 2 = + = 50 50 50 Þ Req = 25 W V 2 The current in circuit, I = = A R 25 As the resistance of two branches is same, i.e. 50W. So, the current I 1 = I 2 Þ I = I1 + I2 2 = 2I 1 25 1 Þ A I2 = I1 = 25 \The voltage across AB, 1 V1 = I 1R1 = ´ 20 25 and voltage across CD, 1 V2 = I 2R2 = ´ 30 25 \Voltmeter reading = V2 - V1 =
30 20 25 25 10 = = 0.4 V 25
=
2 (b) As the other end of 8W resistor is grounded, is at zero potential, the potential difference across 8 W resistor = 24 - 0 = 24 V So, current in 8W resistor, V 24 - 0 I = = = 3A R 8
Vi
Current flowing through the circuit, Vi I = R1 + R2 Voltage across R2, V2 = IR2 Vi R2 V2 = R1 + R2 R + R2 Vi = Þ 1 R2 V2 Vi R1 + R2 = Þ V2 R2
Now, circuit becomes A
10 Ω
10 Ω E
C
40 Ω B
4 (d) If R1 be the equivalent resistance of parallel resistors 8W , 8W and 4W, then 1 1 1 1 4 = + + = R1 8 8 4 8 Þ R1 = 2 W \Total resistance of upper branch, R2 = R1 + 4 = 2 + 4 = 6W Now circuit can be redraw of I1
In the circuit, the branch EGHF have three resistances of 10 W, 20 W and 10 W, respectively which are connected in series combination. So, their equilvalent resistance is given by R1 = 10 + 20 + 10 = 40 W This R1 resistance is parallel with 40 W resistance which is connected in the branch EF. So, their equivalent resistance, 40 ´ 40 = 20 W R2 = 40 + 40
4Ω
10 Ω
20 Ω
10 Ω F
D
Now, in the branch CEFD 10 W, 20 W and 10 W resistance are connected in series combination their equivalent resistance is given by R3 = 10 W + 20 W + 40 W = 40 W This R3 is parallel with 40 W resistance which is in branch CD. Their equivalent resistance, 40 ´ 40 = 20 W R4 = 40 + 40 Now, circuit becomes
12A
10 Ω
C
A
12 Ω I2
20 Ω
By current division rule, current 12 ´ 6 through 12 W resistor, I 2 = 12 + 6 1 = 12 ´ = 4A 3 \Voltage across 12W resistor, V = I 2R = 4 ´ 12 = 48 V
5 (b) A
10 W C
10 W
E
40 W B
B
The net resistance between A and B, Rnet = 10 + 20 + 10 = 40 W
6 (c)
10 Ω P
10 W G 40 W
10 Ω
Q
8Ω 20 W
+
10 W
F
10 W H
18 Ω
25 Ω – 10V
10 W D
D
10 Ω
R
496
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
In the given circuit, net resistance between P and Q points is RPQ and net resistance between Q and R points is RQR , then 10 ´ 8 80 40 RPQ = = = W 10 + 8 18 9 10 ´ 18 ´ 25 RQR = 10 ´ 18 + 18 ´ 25 + 25 ´ 10 4500 225 = = W 880 44 So, circuit will be
P
40 Ω 9
Q
225 Ω 44
1 1 1 2+1 = + = Þ R¢ = R R ¢ 15 3R . R 3R Now, VPQ = VA = IR Also, VQS = VB = VC = IR Hence, VA = VB = VC
R
From Eqs. (i) and (ii), we get, R1R2 4 = 6 3 Þ R1R2 = 4 ´ 2 Þ R1R2 = 8 We know that,
10 V
Þ
Q and S is given by
P
1.5 R B
RΩ Q A
S C 3R V
Þ
…(iii)
\
12 (b) The given circuit can be redrawn as
= 36 - 4 ´ 8 Þ
3Ω
R1 - R2 = 4
…(iv) Þ R1 - R2 = 2 From Eqs. (i) and (iv), we get R1 = 4 W and R2 = 2 W
7 (b) Q 60 W and 30 W resistors are
8 (c) The equivalent resistance between
B
1 1 1 = + R ¢ 2R 2R 1 1+ 1 2 = = 2R 2R R¢ R¢ = R
So,
9Ω
A
6Ω A 0.5 A
6Ω 6Ω
6Ω
12 Ω
B
5Ω
B 12 Ω
1 1 1 1 3 = + + = R 6 6 6 6 6 R= =2W \ 3 Now between C and B, 6 W and 6 W are in series whose equivalent resistance and 12 W are in parallel. So, R ¢ = 6 + 6 = 12W 1 1 1 \ = + R ¢¢ R ¢ 12 1 1 2 = + = 12 12 12 Þ R ¢¢ = 6 W The required resistance of the circuit, Req = R + R ¢¢ =2+ 6=8W
7Ω
From the above dotted region, 3 W and 2 W are in series, R = 3 + 2 = 5 W
6Ω
C
2Ω
6Ω
5Ω
parallel between A and C, so
= 0.1 A
R
R
10 (d) Given, 6 W , 6 W and 6 W are in
connected in parallel. So, their net resistance 30 ´ 60 Rnet = 30 + 60 1800 = = 20 W 90 2 2 i= = \ Rnet 20
R
A
R
R1 - R2 = (R1 + R2 )2 - 4 R1R2
æ 40 ö ç ÷ VPQ è 9ø 1760 VPQ or = = æ 225 ö VQR 2025 VQR ç ÷ è 44 ø 1760 VPQ = 3785 10 VPQ = 4.65 V
opposite corners of a square is R + R = 2R. Therefore, for equivalent resistance between two opposite corners of a square, we have two resistances each of value 2R in parallel. A and B are opposite corner.
and, R2 respectively. When R1 and R2 resistances are in series, then R1 + R2 = 6 (according to question) …(i) When R1 and R2 resistances are in parallel, then R1R2 4 …(ii) = R1 + R2 3
In the series circuit, voltages will be divide in the ratio of their resistance. RPQ VPQ = \ RQR VQR
or
11 (a) The resistance of two arms on the
9 (c) Let the values of resistances be R1
+ –
\
So, the potential difference, VA - VB = iReq = 0.5 ´ 8 = 4 V
A
9Ω
6Ω 7Ω
12 Ω
5Ω
B
5 W and 6 W are in parallel, so 5 ´ 6 30 R= = W 5 + 6 11 A
30/11 Ω
9Ω
12 Ω
5Ω
30 W and 7 W are in series, 11
7Ω
B
497
CURRENT ELECTRICITY
R=
30 107 + 7= W 11 11
9Ω
12 Ω
So, Þ
107/11 Ω
12 Ω +
B
107 W and 5 W are in parallel. 11 1 1 11 1 = + + = 0.386 R 12 107 5 R = 2.6 W 9Ω
6Ω
i2
5Ω
12 W,
6Ω
i1
A
–
10 V
Here, 6 W and 12 W are in parallel. 6 ´ 12 6 ´ 12 So, R = = =4W 6 + 12 18
16 (a) In the circuit, 4 kW and 2 kW are in
Total resistance,
2.6 Ω
A
B
Hence, Req = 9 + 2.6 = 11.6 W
13 (d) Let r be the resistance per unit length of wire, then Rs = R1 + R2 = rl1 + rl2 = r(l1 + l2 )…(i)
V 10 = = 1A R 10 The current in 12 W resistor is
\ Current, i =
i2 =
R2
1 A 3
The potential difference in 12 W resistor, 1 V = i2R = ´ 12 = 4 V 3
6 kΩ
I I1
15 (c) The given circuit can be redrawn as 72 V
A
Dividing Eq. (i) by Eq. (ii), we get Rs r(l1 + l2 ) = Rp r(l1l2 ) / (l1 + l2 )
r
æ 3 ö I2 = ç ÷I è 3 + 6ø
C
r
Þ
l l R 12 9 Þ 1+ 2+2= s = = l2 l1 Rp 8 / 3 2
A
Þ R1 r
B
r/3R3 r/2 R2
the effective resistance could be given as 1 1 1 1 3 = + + = Reff R R R R
C
æ r rö = r || ç + ÷ è 3 2ø æ5 ö (r) ç r÷ è6 ø 5 = r R1 = 5 11 r+ r 6
æ 3 ö =ç ÷9 è 3 + 6ø I 2 = 3 mA
17 (c) Three resistances are in parallel, so
Resistance between A and B,
Þ
6 kΩ
From current dividing rule,
r B
3 kΩ
I2
r
r
(l + l )2 = 1 2 l1l2
éQ Rs = 12W and ù êë Rp = 8 / 3W úû If l1 / l2 = x, then 1 5 x+ = Þ x 2 Þ 2x 2 = 2 - 5x = 0 Solving it, we get 1 x = 2 or 2 l1 1 i.e. = 2 or l2 2
Þ Re = 2 kW \Net resistance of the circuit = 6 + 2 = 8 kW Thus, we have 72 I = 8 ´ 103 = 9 ´ 10-3 A = 9 mA
æ R1 ö æ 6 ö i2 = i ç ÷ =1´ ç ÷ è R1 + R2 ø è 6 + 12 ø Þ
When the wire is wound to form a circle, then RR rl ´ rl2 Rp = 1 2 = 1 R1 + R2 rl1 + rl2 rl l …(ii) = 12 l1 + l2
series whose resistance is in parallel with 3 kW. So, their equivalent resistance is 1 1 1 2+1 1 = + = = Re 3 6 6 2
Req = 6 + 4 = 10 W
R1
Hence, option (d) is correct.
Resistance between B and C, r 4r ´ 4 r æ rö 2 3 R2 = || ç r + ÷ = = r 4 r r è ø 11 2 3 + 2 3 Resistance between A and C, r 3r ´ r æ rö 3 2 R3 = || ç r + ÷ = 3 è 2 ø r + 3r 3 2 3r \ R3 = 11 Hence, R1 : R2 : R3 = 5 : 4 : 3
14 (a) The circuit is shown as below
R A
R R
So,
Reff = R /3
B
498
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
18 (a) As RAB = RAO and RBC = ROC , so points O and B will be at same potential and hence resistance ROB becomes ineffective. Similarly, RAO = RAD and ROC = RDC , resistance ROD becomes ineffective. So, excluding RBO and ROD , the equivalent circuit is shown below
From the above dotted region 8 W and 8 W are in parallel, so 8´8 R= =4W 8+ 8
22 (a) The circuit can be redrawn as In series A
R R
R
P S
Re′ =4 Ω
B
2R
O
D
R
5Ω
20 (c) Given circuit is C
R
In parallel
The resistance between points P and S is 4 W. Re¢ = 4 W
R
eq =
B
6Ω 4Ω
Req=R+R =2R
2V
10 Ω
5Ω
In series 5Ω
10/3 Ω
3Ω
2R
B
2R In parallel
Equivalent resistance Req of the given network between points A and C will be given by 1 1 1 1 = + + Req 2R 2R 2R 2 i.e. Req = R 3 (e) Series transformations of circuit is shown below
5Ω
2Ω
C
A
A
As, 6 W, 3 W and 2 W are in parallel, 1 1 1 1 1+ 2 + 3 so = + + = =1 R 6 3 2 6 or R = 1 W 4Ω
2V
A
5Ω
In parallel
25/3 Ω
B ⇐
2R
19
5Ω
A
A
5Ω
5Ω
A
B R
5Ω
5Ω
Req=R+R=2R A
5Ω
A
1Ω
As, 4 W and 1 W are in series, so R = 4 + 1= 5 W 2V
A
5Ω
Req
3.12 Ω
B As,
1 1 1 = + (25/3) Req 5
23 (c) Total resistance of the circuit, 5Ω
P
5Ω
S
3Ω
21 (c) We know that, when current flow is 3Ω
From the above dotted region, 5 W and 3 W are in series, so R = 5 + 3 = 8 W.
8Ω
P S
Current, I = V / R = 2/ 5 = 0.4 A
8Ω
same, then resistors are connected in series, hence resultant resistance is R ¢ = R1 + R2 = 10 W + 20 W = 30 W Also since, cells are connected in opposite directions, the resultant emf is E = E1 - E2 =5V - 2V = 3V From Ohm’s law, E = iR E 3 i= = = 0.1 A Þ R 30
(R1 + R2 ) ´ R3 (R1 + R2 ) + R3 (15 + 15) ´ 30 = 35 + (15 + 15) + 30 30 ´ 30 = 35 + = 50 W 30 + 30 V 50 Current in circuit, i = = =1A R 50 1 Current through R3 , i.e. i ¢ = i / 2 = A 2 Potential difference across R3 1 = i ¢ ´ R3 = ´ 30 = 15 V 2 R = R4 +
499
CURRENT ELECTRICITY
rl or R µ l A R1 l1 L \ = = =4 R2 l2 L / 4 R (Q R1 = R ) R2 = Þ 4 In parallel combination of such four resistances, 1 1 1 1 1 = + + + R ¢ R1 R2 R3 R4 1 1 1 1 1 or = + + + R¢ R / 4 R / 4 R / 4 R / 4 1 4 4 4 4 = + + + Þ R¢ R R R R R 1 16 \ = Þ R¢ = 16 R¢ R
Thus, Eq. (i) becomes, 12 =8 R1 + R1
24 (d) Resistance, R =
Þ
R1 (R1 - 6) - 2(R1 - 6) = 0 Þ R1 = 2 W or 6 W
given circuit is
A
10 Ω
10 Ω
3V
Length of the wire = Circumference of circle = 2pr Þ As, total resistance, R = 2pr (12) …(i) 1 1 1 4 1 = + = = Req R / 2 R / 2 R 6 pr
B
R2, then R1 + R2 = 8 W [in series] ...(i) R1R2 and = 1.5 W [in parallel] ...(ii) R1 + R2 By using Eqs. (i) and (ii), we obtain R1R2 = 1.5 8 12 Þ R1R2 = 12 or R2 = R1
In series R=20 Ω
R2=50 Ω
3V
R3=30 Ω
In the figure dotted part in series, then R = 30 + 20 R = 50 W
(equivalent of 4 Ω 3 Ω) 12 Ω = 7
R1=50 Ω
P
M I
R=50 Ω
R2=50 Ω 3V
1.25 Ω
Let current I flows in lower branch, so
Now, R1 is in series with resistor (5 W ) in arm CB. \ R2 = 5 + 5 = 10 W Again, R2 is in parallel with resistance (10 W ) in arm AB. 1 1 1 = + Þ R=5 W \ R 10 10
26 (d) Let the two resistances be R1 and
R5=30 Ω
R1=50 Ω
V = 4 ´ 1 = 4 V (i.e. across 4 W) Equivalent resistance of lower side 0.5 ´ 0.5 arm, Req = 1 + = 1.25 W 0.5 + 0.5 Now, the circuit can be shown as
R4=30 Ω
Upper dotted part in parallel, then 1 1 1 2+1 = + = R 30 60 60 60 = 20 W Þ 3
[from Eq. (i)] Þ Req = 6p (01 . ) = 0.6 p W
5Ω
R3=60 Ω
R2=50 Ω
Resistance per unit length = 12 W m -1
C
As, 3 W resistor and 7 W resistor are in series. Therefore, resultant = 7 + 3 = 10 W This 10 W equivalent resistance is in parallel with resistance (10 W ) in arm AC. 1 1 1 = + Þ R1 = 5 W \ R1 10 10
In parallel
R1=50 Ω
28 (d) Potential difference across PM, 3Ω
R n2 = R¢ 1
27 (a) As, r = 10 cm = 01 . m
can be drawn as D
Hence,
30 (a) According to the question, the
This gives, R2 = 6 W or 2 W [by Eq. (i)]
25 (b) The circuit given in the question 7Ω
R12 - 8R1 + 12 = 0
Þ
R r n R = R¢ = = n n n2
29
1.25 I = 4 V 4 or I = = 3.2 A 1.25 Therefore, 3.2 A current flows in 1 W resistance, hence potential difference between M and N is V ¢ = 3.2 ´ 1= 3.2 V rl (c) Resistance, R = A If r is the resistance of one cut part, then r(l / n) R r= = A n The resistance R¢ of the parallel combination of resistors is given by 1 1 1 n = + +K= R¢ r r r
In parallel
In the figure dotted part in parallel, then
Þ
1 1 1 2 = + = R 50 50 50 50 R= = 25 W 2 R1=50 Ω
R=25 Ω
In series 3V
Equivalent resistance of the given network, Req = 75 W
500
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
The given circuit can be redrawn as 50 Ω
i
i2 i1
R1
50 Ω
3V
2i –2 i2 3 — R3 3 R4 30 Ω R5
i2
30 Ω
15 Ω
D
15
Ω
15
15
Ω
Ω
15 Ω
A
B
It can be seen that, in the figure that, there is symmetry about DB, that C , O and A are at same potential. Thus, the resistance between C , O and O , A can be removed. The equivalent circuit becomes
15 Ω
15 Ω
D 15
32 (a) The two end sides resistors are ineffective, thus the equivalent circuit of the given circuit is
Ω 15
15 Ω
15 Ω
Ω
15 Ω A
B 30 Ω
D 15
Ω
15 Ω
C In series, so R=15+15 =30Ω 15 Ω
15 Ω A
B
2Ω
4 R and 2R are connected in parallel to each other while resistance R is connected in series with it. Hence, equivalent resistance of 4R and 2R resistance is 1 1 1 3 = + = R ¢ 4 R 2R 4 R 4 R¢ = R Þ 3 R
6Ω
2Ω
i
4R R′= 3 R1 E
B
C
35 (b) In the given circuit, resistors
Thus, the resistance between the points A and B will be 30 ´ 15 Req = = 10 W 30 + 15
In series, so R=15+15=30Ω
parallel while 6 W and 4 W are in parallel also both combinations are in series. 7 ´ 3 4 ´ 6 21 24 So, R eq = = + + 7 + 3 4 + 6 10 10 = 2.1 + 2.4 = 4.5 W
In parallel
C
10R2 = 12 + 6 R2 4 R2 = 12 12 R2 = =3W 4
34 (a) As, resistances 7 W and 3 W are in
A
30 Ω
1Ω
Substituting in Eq. (i), we have 2R2 6 = 2 + R2 5
Þ
B
15 Ω
A
two wires. In parallel combination, R1R2 6 …(i) = R1 + R2 5
or Þ
In series, so R=15Ω +15Ω =30Ω
A
15 Ω
B
A 15 Ω
33 (d) Let R1 and R2 be the resistances of
If one of the wires breaks, then effective resistance becomes 2 W, i.e. R1 = 2 W.
Ω
15 Ω
Ω
O
15 Ω
C
15 Ω
A
C
15
30
15 Ω
The current provided in the circuit is 3 3 1 i= = = 50 + 25 75 25 1 1 1 1 A Þ i1 = ´ i = ´ = 2 2 25 50 1 1 1 1 A and i2 = ´ i = ´ = 2 25 50 2 Now voltage across R4 , 2i 1 1 V = 2 ´ R4 = 2 ´ ´ ´ 30 3 50 3 2 = = 0.4 V 5 (c) The given circuit is
30×30 =15 Ω 30+30
30 Ω
D
R2
(i1=i2)
i
31
60 Ω
In parallel, so R=
1Ω
D
2Ω
Between points C and D, resistors 2 W , 2 W and 2 W are in series, therefore their equivalent resistance, R¢ = 2 + 2 + 2 = 6 W Resistors R¢ and 6 W are in parallel, therefore their equivalent resistance is given by 1 1 1 = + R ¢¢ 6 6 Þ R¢¢ = 3 W Now, between points A and B, 1 W , 3 W and 1 W are in series. Therefore, resultant resistance, R = 1 + 3 + 1 = 5 W.
Thus, equivalent resistance of overall 4 7R circuit, R ¢¢ = R + R = 3 3 Given, emf is E volt, therefore 7R/3 i E
E 3E = R ¢¢ 7R Potential difference across R, 3E 3E V = iR = ´R= 7 7R i=
501
CURRENT ELECTRICITY
36
Potential difference across 2R, 3E 4 E V¢=E = 7 7 i i (b) Current density, J = = 2 A pr But the wires are in series, so they have the same current, hence i1 = i2. J 1 r22 So, = = 9:1 J 2 r12
39 (d) Minimum possible resistance can be found in parallel arrangement and maximum possible resistance can be found in series arrangement. Thus, n 1 1 1 = + + ... + n times = R Rmin R R Þ
and Rmax = R + R + ... + n times
37 (b) The given circuit is symmetrical about AB, the points X , Y and Z are at same potential. X
2Ω
X 2Ω
2Ω
2Ω
2Ω
2Ω I
2Ω
A
2Ω I
2Ω
2Ω
2Ω 2Ω
2Ω 2Ω
2Ω
2Ω Z
Z
Thus, the given circuit reduces to equivalent resistance of 4 W each connected in parallel, as shown below
B A G
2Ω
2Ω
2Ω
2Ω
2Ω
2Ω
2Ω
2Ω
D
Rmin R/n 1 = = Rmax nR n2
cross-section A and specific resistance r, the resistance is given by rl R= A Þ R µl When wire is cut into 4 pieces, then the resistance of each part is l R ¢¢ µ 4 R Þ R ¢¢ = 4 Also, equivalent resistance for parallel combination is 1 1 1 1 1 = + + + R ¢ R1 R2 R3 R4
I
38 (d) As, resistance offered by 2pR length of wire = 12 W Resistance offered by pR length of 12 wire = =6W 2 1 1 1 = + \ Req 6 6 Req = 3 W
\
E
For equivalent resistance of above electrical circuit 1 1 1 1 1 = + + + R 4 4 4 4 1 4 = Þ R 4 Þ R =1W
Þ
Þ Rmax = nR
40 (c) For a wire of length l, area of
2Ω
2Ω
A
Rmin = R / n
1 4 = R ¢ R ¢¢
\
= R¢ =
Þ
4´4 R R 16
complete circle, then resistance of each R semi-circle = 2 R/2
B R/2
42 (c) As, resistors R2 , R3 and R4 are in parallel connection, so their equivalent resistance, 1 1 1 1 = + + R ¢ R2 R3 R4 1 1 1 = + + 50 50 75 3+ 3+ 2 8 4 = = = 150 150 75 75 R¢ = W Þ 4 75 \ R = R1 + R ¢ = 100 + 4 = 118.75 W
43 (b) If we take R1 = 4 W , R2 = 12 W, then in series, R = R1 + R2 = 4 + 12 = 16 W and in parallel, R ´ R2 R= 1 R1 + R2 4 ´ 12 48 = = = 3W 4 + 12 16
44 (a) The resistance of a wire of length l and area of cross-section A is given by rl R= A where, r is specific resistance. Also, A = pr2, r being radius of wire. \
41 (a) When wire is bent to form a
A
Thus, net resistance in parallel combination of two semi-circular R R R2 ´ R resistances, R ¢ = 2 2 = 4 = R R 4 R + 2 2
R1 r22 = R2 r12
Given, r1 = 9 mm, R1 = 5 W and r2 = 3 mm \
5 32 = R2 92
Þ R2 = 5 ´ 9 = 45 W Equivalent resistance of 6 wires each of resistance R2 connected in series, R ¢ = 6 ´ R2 = 270 W
502
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 3 Cells & their Combinations and Kirchhoff’s Laws 2018 1 A set of n equal resistors, of value R each , are connected in series to a battery of emf E and internal resistance R. The current drawn is I. Now, the n resistors are connected in parallel to the same battery. Then, the current drawn from battery becomes 10I. The value of n is [NEET] (a) 20 (b) 11 (c) 10 (d) 9
2 A battery consists of a variable number n of identical cells (having internal resistance r each) which are connected in series. The terminals of the battery are short-circuited and the current I is measured. Which of the graphs shows the correct relationship between I and n? [NEET] I
I
(a)
O
n
I
2Ω 18V 1Ω 12V
(a) 14 V
VA
(d) O
(a) –3 V
n
3 Assertion Terminal voltage of a cell is greater than emf of cell during charging of the cell. [AIIMS] Reason The emf of a cell is always greater than its terminal voltage. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
2017 4 The current passing through the ideal ammeter in the circuit given below is
[KCET] 2Ω
1Ω
4V
(b)1A
[NEET]
3V + –
2W
VB
1W
B
(b) +3 V
(c) +6 V
(d) +9 V
connected in series across an external resistance R. By mistake, one of the cells is connected in reverse, then the current in the external circuit is [WB JEE] 2E 3E (a) (b) 4r + R 4r + R 3E 2E (d) (c) 3r + R 3r + R
8 A circuit consists of three batteries of emf E1 = 1 V, E 2 = 2 V and E 3 = 3 V and internal resistances 1 W, 2 W and 1 W respectively which are connected in parallel as shown in the figure. The potential difference between points P and Q is [WB JEE] E1=1 V E2=2 V
2Ω
(a)1.25A
(d) 30 V
2014 7 Four cells, each of emf E and internal resistance r are
2Ω
4Ω
(c) 18 V
AI = 2 A O
n
(b) 15 V
and B in the given figure is
n
I
(c)
V
2016 6 The potential difference (V A - VB ) between the points A
(b) O
5 Two batteries, one of emf 18V and internal resistance 2W and the other of emf 12V and internal resistance 1W are connected as shown in figure. The voltmeterV will record a reading of [AIIMS]
E3=3 V
(c)0.75A
Q
P
A
(d) 0.5 A
(a) 1.0 V
(b) 2.0 V
(c) 2.2 V
(d) 3.0 V
503
CURRENT ELECTRICITY
9 Two resistors of resistances 2 W and 6 W are connected in parallel. This combination is connected to a battery of emf 2 V and internal resistance 0.5 W. What is the current flowing through the battery? [KCET] 4 4 (c) A (d) 1 A (a) 4 A (b) A 3 17 2013 10 In the electric circuit shown, each cell has an emf of 2 V and internal resistance is 1 W . The external resistance is 2 W. I The value of the current I is (in ampere) [Manipal] (a) 2 (b) 1.25 (c) 0.4 2012
2Ω
(a)
[KCET]
2V 2V 2V
(b)
(d) 1.2
(c)
R
O
E
E
V
V
(d) R
O
R
O
12 In the circuit shown below, the cells A and B have negligible resistance. For V A = 12 V, R1 = 500 W and R = 100 W, the galvanometer (G ) shows no deflection. The value ofVB is [CBSE AIPMT] R1 G VA
(a) 4 V
VB
R
(b) 2 V
(c) 12 V
12 Ω 4Ω
2Ω
12 V, 1 Ω
(a) 1.5 A , 0.5 A (c) 1A, 3 A
(b) 0.5 A, 1.5 A (d) 3 A, 1A
2010 17 Consider the following two statements. I. Kirchhoff’s junction law follows from the conservation of charge.
V
R
O
i2
I
E
V
16 In the circuit shown below, the currents i1 and i2 are i1
11 A cell having an emf E and internal resistance r are connected across a variable external resistance R. As the resistance R is increased, the plot of potential differenceV across R is given by [CBSE AIPMT] E
15 Two cells with the same emf E and different internal resistances r1 and r2 are connected in series to an external resistance R. What is the value of R, if the potential difference across the first cell is zero? [WB JEE] r1 + r2 (a) r1 r2 (b) r1 + r2 (c) r1 - r2 (d) 2
(d) 6 V
13 A current of 2 A flows through a 2 W resistor when connected across a battery. The same battery supplies a current of 0.5 A when connected across a 9 W resistor. The internal resistance of the battery is [CBSE AIPMT] (a) (1/3) W (b) (1/ 4) W (c) 1 W (d) 0.5 W 2011 14 Two batteries of emfs 2 V and 1 V of internal resistances 1 W and 2 W respectively are connected in parallel. The effective emf of the combination is [Kerala CEE] 3 5 3 (b) V (c) V (d) 2 V (a) V 2 3 5 (e) 5 V
II. Kirchhoff’s loop law follows from the conservation of energy. Which of the following is/are correct? [CBSE AIPMT] (a) Both I and II are incorrect (b) I is correct and II is incorrect (c) I is incorrect and II is correct (d) Both I and II are correct
18 Current provided by a battery is maximum, when [UP CPMT] (a) internal resistance is equal to external resistance (b) internal resistance is greater than external resistance (c) internal resistance is less than external resistance (d) None of the above 19 When a resistance R1 is connected across the terminals of a cell, the current is I 1 . When the resistance is changed to R 2 , the current is I 2 . The internal resistance of the cell is I R + I 2 R2 I R + I 2 R1 [OJEE] (b) 1 2 (a) 1 1 I1 + I 2 I1 + I 2 I R - I 2 R1 I R - I 1 R1 (d) 2 2 (c) 1 2 I1 - I 2 I1 - I 2 20 A battery of emf E has an internal resistance r. A variable resistance R is connected to the terminals of the battery. A current I is drawn from the battery. V is the terminal potential difference. If R alone is gradually reduced to zero, then which of the following best describes I and V? [KCET] (a) I approaches zero and V approaches E E (b) I approaches and V approaches zero r E (c) I approaches and V approaches E r (d) I approaches infinity and V approaches E
504
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
21 In the circuit given below, the points A , B and C are 70 V, zero and 10 V respectively. Then, [KCET] 20 Ω
28 In the circuit, the potential difference across PQ will be nearest to [UP CPMT]
B
100 Ω 48 V 80 Ω
A
10 Ω
D 30 Ω
C
(a) 9.6 V
(a) the point D will be at a potential of 60 V (b) the point D will be at a potential of 20 V (c) currents in the paths AD , DB and DC are in the ratio of 1 : 2 : 3 (d) currents in the paths AD , DB and DC are in the ratio of 3 : 2 : 1
23 A student measures the terminal potential difference (V ) of a cell (of emf e and internal resistance r) as a function of the current ( I ) flowing through it. The slope and intercept of the graph between V and I are [CBSE AIPMT] (a) e and -r (b) -r and e (c) r and -e (d) -e and r 2009 24 The potential difference across the terminals of a battery is 50 V, when 11 A current is drawn and 60 V, when 1 A current is drawn. The emf and the internal resistance of the battery are [AFMC] (a) 62 V, 2 W (b) 63 V, 1 W (c) 61 V, 1 W (d) 64 V, 2 W R i1
E1
r1
i2 r2
20 Ω
(b) 6.6 V
(c) 4.8 V
P
(d) 3.2 V
2008 29 Two non-ideal batteries are connected in parallel. Consider
22 A battery of four cells in series, each having an emf of 1.4V and an internal resistance of 2 W is to be used to charge a small 2V accumulator of negligible internal resistance. What is the charging current? [MGIMS] (a) 0.1 A (b) 0.2 A (c) 0.3 A (d) 0.35 A
25 See the electrical circuit shown in this figure. Which of the following equations is a correct equation for it? [AFMC] (a) E1 - ( i1 + i 2 )R - i1 r1 = 0 (b) E 2 - i 2 r2 - E1 - i1 r1 = 0 (c) - E 2 - ( i1 + i 2 )R + i 2 r2 = 0 (d) E1 - ( i1 + i 2 )R + i1 r1 = 0
Q
100 Ω
the following statements. I. The equivalent emf is smaller than either of the two emfs. II. The equivalent internal resistance is smaller than either of the two internal resistances. [UP CPMT] (a) Both I and II are correct (b) I is correct but II is incorrect (c) II is correct but I is incorrect (d) Both I and II are incorrect 30 A cell of emf E and internal resistance r is connected in series with an external resistance nr. Then, the ratio of the terminal potential difference to emf is [Manipal] ( n + 1) 1 n æ 1ö (c) (d) (b) (a) ç ÷ è nø ( n + 1) ( n + 1) n
31 The potential difference between A and B in the following figure is [KCET] 6Ω A
2A
27 Two cells each of same emf e but of internal resistances r1 and r2 are connected in series through an external resistance R. If the potential difference between the ends of the first cell is zero, then what will be the value of R in terms of r1 and r2 ? [JCECE] (a) r1 - r2 (b) r1 + r2 (c) 2r1 - r2 (d) 2r1 + r2
12 V
5Ω
9Ω
B
(a) 32 V (b) 48 V (c) 24 V (d) 14 V 32 The internal resistance of a cell of emf 4 V is 0.1 W . It is connected to a resistance of 3.9 W . The voltage across the cell will be [Guj CET] (a) 3.9 V (b) 2 V (c) 0.1 V (d) 3.8 V 33 For the given electrical arrangement, what is the value of current I? [DUMET] 1A
E2
26 A battery of emf 10 V and internal resistance 3 W is connected to a resistor. The current in the circuit is 0.5 A. The terminal voltage of the battery when the circuit is closed is [JCECE] (a) 10 V (b) 0 V (c) 1.5 V (d) 8.5 V
4V
3A 2A 3A
5A 1A
(a) 6 A
(b) 5 A
4A
I
(c) 7 A
(d) 8 A
2007 34 A cell of emf X is connected across a resistor R. The potential difference across the wire is measured as Y . The internal resistance of the cell should be [Punjab PMET] Y R (a) X (b) ( X - Y ) R Y (X - Y ) Y (c) ( X - Y ) (d) R R
505
CURRENT ELECTRICITY
35 A voltmeter having a resistance of 998 W is connected to a cell of emf 2 V and internal resistance 2 W. The error in the measurement of emf will be [DUMET] (b) 2 ´ 10-3 V (a) 4 ´ 10-1 V (d) 2 ´ 10-1 V (c) 4 ´ 10-3 V
2005 41 What is the current flowing in arm AB? 8Ω
following circuit? (Resistances 1 W and 2 W are represent the internal resistance of the respective cells). [BHU] 1Ω 2V A 4V
C
2Ω
(b) 2.25 V
(c)
5 V 4
(d)
4 V 5
37 4 cells each of emf 2 V and internal resistance of 1 W are connected in parallel to a load resistor of 2 W. Then, the current through the load resistor is [Kerala CEE] (a) 2 A (b) 1.5 A (c) 1 A (d) 0.888 A (e) 0.75 A 38 In the circuit shown, the value of I (in ampere) is
B
(a)
35 A 4
(b)
13 A 7
(c)
5 A 7
(d)
7 A 5
43 A cell of emf E and internal resistance r is connected with external resistance R. The graph between terminal voltage and current is [Haryana PMT] (a)
E/r
E
E
(b)
[KCET]
E/r
4Ω
i
i
4Ω
E
E/r
E 4Ω
I
8V
42 To draw maximum current from a combination of cells, how should the cells be grouped? [AFMC] (a) Series (b) Parallel (c) Mixed (d) Depends upon the values of external and internal resistance
5Ω
(a) 1.75
4Ω
A 2Ω
10 V
2006 36 What is the potential drop between points A and C in the
[AFMC]
(c)
(d)
4W 4 Ω
E/r 1.6 Ω
4V
i
i
44 The value of current I in figure is (a) 1
(b) 0.60
(c) 0.4
(d) 1.5
39 A current of 6 A enters one corner P of an equilateral D PQR having 3 wires of resistances 2 W each and leaves by the corner R. Then, the currents I 1 and I 2 are, respectively [KCET]
1A
2A I
6A
I1
P
2Ω Q
(a) 4 A (c) 3 A
I2 2Ω
2Ω
[J&K CET]
3A
(b) 6 A (d) 5 A
45 The magnitude of I (in ampere) is 60 Ω
R
I
(a) 2 A, 4 A (b) 4 A, 2 A (c) 1 A, 2 A (d) 2 A, 3 A
40 A teacher asked a student to connect N cells each of emf e in series to get a total emf of Ne. While connecting the student, by mistake, reversed by polarity of n cells. The total emf of the resulting series combination is [EAMCET] nö æ (a) e ç N - ÷ (b) e( N - n ) (c) e( N - 2n ) (d) eN è 2ø
[KCET]
15 Ω
5Ω
1A
1A 10 Ω
(a) 0.1 (c) 0.6
(b) 0.3 (d) None of these
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers (c) (c) (d) (b) (b)
1 11 21 31 41
2 12 22 32 42
(c) (b) (d) (a) (d)
3 13 23 33 43
(c) (a) (b) (d) (b)
4 14 24 34 44
(d) (b) (c) (b) (a)
5 15 25 35 45
(a) (c) (a) (c) (a)
6 16 26 36
(d) (b) (d) (b)
7 17 27 37
(a) (d) (a) (d)
(b) (d) (d) (c)
8 18 28 38
9 19 29 39
(d) (d) (c) (a)
10 20 30 40
(d) (b) (c) (c)
Explanations 1 (c) When n equal resistors of resistances R are connected in series, then the current drawn is given as E I = nR + r where, nR = equivalent resistance of n resistors in series and r = internal resistance of battery. r=R
Þ
E E …(i) I = = nR + R R (n + 1)
Similarly, when n equal resistors are connected in parallel, then the current drawn is given as E I¢ = R +R n R where, = equivalent resistance of n n resistors in parallel. Given,
I ¢= 10 I E nE …(ii) Þ 10I = = R ( n + 1)R +R n Substituting the value of I from Eq. (i) in Eq. (ii), we get æ E ö nE 10 ç ÷= è R (n + 1) ø R (n + 1) n = 10
2 (c) If n identical cells are connected in series, then equivalent emf of the combination, Eeq = nE Equivalent internal resistance, req = nr \ or
I =
V
I I
Given,
Þ
effective emf total resistance = 6/ 3 = 2A The potential difference across V will be same as the terminal voltage of either cell
Thus, current (I ) is independent of the number of cells (n) present in the circuit. Therefore, the graph showing the relationship between I and n would be as shown below
Current, I = I=
Eeq req
=
nE nr
E = constant r
O
18V
2Ω
12V
1Ω
n
3 (c) During charging, E = V + ir (due to reversed current). In case of charging, emf of a cell is less than its terminal voltage while in case of discharging emf is greater than terminal voltage. Therefore, Assertion is correct but Reason is incorrect.
4 (d) Here, 2 W and 2 W are in parallel. \ Þ
1 1 1 = + R 2 2 2´2 R= =1W 2+ 2
Now, internal resistance 1 W , 2 W , 4 W and resistance R are in series. \ Rnet = 1 W + 2 W + 4 W + 1 W = 8 W Hence, current, V 4 I = = = 0.5 A R 8
5 (a) It is clear that the two cells oppose each other, hence the effective emf in closed circuit is 18 - 12 = 6V and net resistance is 1 + 2 = 3W (because in the closed circuit the internal resistance of two cells are in series). The current in circuit will be in direction of arrow shown in figure
Since, current is drawn from the cell of 18V, hence V1 = E1 - Ir1 = 18 - (2 ´ 2) = 18 - 4 = 14V VA 2A 2 Ω
6 (d)
+–
1Ω
3V
VB
Applying KVL, V A + SV = V B + 2 ´ 2 + 2 ´ 1 VA - VB - 3 = 4 + 2 VA - VB = 9 V
7 (a) Total net emf of the cell = 3E - E = 2E E
E
E
E
Total internal resistance = 4r \ Total resistance of the circuit = Total internal resistance + External resistance = 4r + R So, the current in the external circuit, 2E Vö æ i= çQ i = ÷ è 4r + R Rø
507
CURRENT ELECTRICITY
8 (b) As, the batteries are in parallel, so
11 (c) Here, E = I (R + r)
their resistances 1 W , 2 W and 1 W are in parallel.
E R+r Also, E = IR + Ir Þ E = V + Ir Er E =V + \ R+r E V=E´r Þ R+r ER E = = R + r 1+ r / R So, with the increase in R, the value of V increases exponentially. This is correctly shown in option (c). Þ
E1=1 V E2=2 V E3=3 V
P
Q
So, the required internal resistance, 1 1 1 1 = + + r r1 r2 r1 1 1 1 + + 1 2 1 2 + 1+ 2 = 2 2 Þ r= W 5 The potential difference between points P and Q, =
E1 E2 E3 + + r r2 r3 E= 1 1/ r 1 2 3 + + =1 2 1 5/ 2 2+ 2+ 6 10/ 2 2 = = 5/ 2 5/ 2 5 = ´2=2V 5
9 (d) Given, R1 = 2 W , R2 = 6 W, E = 2V, r = 0.5 W and I = ? QR1 and R2 are in parallel combination, so
1 1 1 = + R R1 R2
1 1 3+1 + = 2 6 6 6 R = = 1.5 W Þ 4 Then, the current in the circuit, E I = r+ R 2 2 = = =1A 0.5 + 1.5 2.0 =
10
(since internal resistance r is in series with other resistance) Net emf (d) Current = Net resistance 2+ 2+ 2 6 Þ I = = = 1.2 A 1+ 1+ 1+ 2 5
I =
12 (b) Applying Kirchhoff’s law in loop 1, we get 500I + 100I = 12 12 ´ 10-2 So, I = = 2 ´ 10-2 A 6 Hence, VB = 100 (2 ´ 10-2 ) = 2 V
13
Remember that at the condition of no deflection of galvanometer, there is no current through it. E (a) Current, i = R+r E …(i) Þ 2= 2+ r E …(ii) and 0.5 = 9+ r From Eqs. (i) and (ii), we have 2 9+ r = 0.5 2 + r 9+ r 4= Þ 2+ r Þ Þ Þ
4 (2 + r) = 9 + r 8 + 4r = 9 + r 4r - r = 9 - 8 1 3r = 1 Þ r = W 3
14 (b) Equivalent potential in the given parallel circuit is given as E1 E2 + r r2 E1r2 + E2r1 Eeq = 1 = 1 1 r1 + r2 + r1 r2 Here, E1 = 2 V, E2 = 1 V, r1 = 1 W and Þ
r2 = 2 W 2 ´ 2 + 1´1 Eeq = 2+1 4+1 5 = = V 3 3
15 (c) Here are two batteries with emf E each and the internal resistances r1 and r2, respectively. E
E
r1
r2
I R
Hence, we have I (R + r1 + r2 ) = 2E 2E Thus, I = … (i) R + r1 + r2 Now, the potential difference across the first cell would be equal to V = E - Ir1. From the question, V = 0, hence 2Er1 [from Eq. (i)] E = Ir1 = R + r1 + r2 Thus, R + r1 + r2 = 2r1 Hence, R = r1 - r2.
16 (b) The net resistance, R=
12 ´ 4 48 + 2= + 2= 5 W 12 + 4 16
Electric current, E 12 i= = =2A R + r 5+1 From current dividing rule, æ 12 ö 3 i2 = ç ÷ ´ 2 = ´ 2 = 1.5 A è 12 + 4 ø 4 4 1 and i1 = ´ 2 = = 0.5A 16 2
17 (d) Kirchhoff ’s first law follows the conservation of charge. Kirchhoff ’s second law follows the conservation of energy.
18 (d) The current provided by a battery is given by I =
E . R+r
Thus, from the relation, if can be seen that the value of I is maximum when (R + r) is minimum, i.e. R = 0.
19 (d) Let the emf of cell be E and internal resistance be r. E Then, I1 = (r + R1 ) E and I2 = (r + R2 ) On dividing the above equations, we get I 1 (r + R2 ) I R - I 1R1 or r = 2 2 = I 2 (r + R1 ) I1 - I2
508
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
20 (b) Current, I =
E R+r
24 (c) For a closed circuit cells supplies a
When R decreases to zero, then E I = . r Also, V = E - Ir As, R approaches to zero, i.e. I approaches to E / r and V approaches to zero.
I
Þ E, r
Equation of cell, E = V + Ir For V = 50 V and I = 11 A …(i) Þ E = 50 + 11r Similarly, for V = 60 V and I = 1 A …(ii) E = 60 + r From Eqs. (i) and (ii), we get r =1W Substituting the value of r in Eq. (i), we get E = 61 V
A 70 V i1 10 Ω i2 D
C 10 V
20 Ω
25 (a) Applying KVL in loop EBCDE,
B 0V
then we get
VA - VD VD - 0 VD - VC = + 10 20 30 VD VD - 10 + Þ 70 - VD = 2 3 Þ VD = 40 V 70 - 40 = 3A \ i1 = 10 40 - 0 i2 = = 2A 20 40 - 10 and i3 = = 1A 30 22 (d) The net emf, Enet = 4 E = 4 ´ 1.4 = 5.6 V, rnet = 4 r = 4 ´ 2 = 8 W
I =
\
56 7 = = 0.7 A 8 ´ 10 10
Hence, charging current is 0.7 I = = 0.35 A 2
23 (b) As, V = e - ir ÞV = - ri + e ...(i) V ε
R
C r1
E
i1
A
26
Enet = I rnet
i1+i2
B
Þ
Q
Þ
V = IR
junction point D, we get I1 = I2 + I3
i3
and
R
21 (d) Applying Kirchhoff’s law at
30 Ω
I =
constant current in the circuit.
i1
E1
i2
r2
E2 i2
R I = 0.5 A
…(i)
e - Ir1 = 0 2er1 e=0 (r1 + r2 ) + R [from Eq. (i)] er2 - er1 + eR =0 (r1 + r2 ) + R r2 - r1 + R = 0 R = (r1 - r2 )
28 (d) Potential difference across PQ, i.e. potential difference across the resistance of 20 W is V = i ´ 20 48 E and i = = R + r (100 + 100 + 80 + 20) = 0.16 A \ V = 0.16 ´ 20 = 3.2 V
29 (c) Let emf of two cells be E1 and E2 and internal resistances be r1 and r2, respectively. In parallel order, we have E r + E2r1 and equivalent emf, Eeq = 1 2 r1 + r2 rr equivalent resistance, Req = 1 2 r1 + r2 If E1 = E2 and r1 = r2, then Eeq = E and Req = r / 2 . So, emf is equal to the emf of any of the cell and internal resistance is less than the internal resistance of any of cell. Hence, Statement (II) is correct and Statement (I) is incorrect. E E 30 (c) As, I = = r + nr r(n + 1) Þ V = E - Ir E nE =Er= r(n + 1) n+1 V n = \ E n+1
31 (b) For the circuit given in question, E = 10 V
r=3Ω
\Terminal potential difference, V = 8.5 V
27 (a) Current in the circuit, e,r1
On comparing Eq. (i) with y = mx + c, we get m = slope = - r and c = e
F
E1 - (i1 + i2 ) R - i1r1 = 0 Applying KVL, in loop AEDFA, then we get E2 - i2r2 - E1 + i1 r1 = 0 Applying KVL in loop ABCFA, then we get E2 - (i1 + i2 ) R - i2r2 = 0 5 (d) As, V = E - Ir Þ V = 10 ´3 10
Slope= – r
I
D
Þ Þ
2e (r1 + r2 ) + R
e,r2
I
R
or or
VA - (6 ´ 2) - 12 - (9 ´ 2) + 4 - (5 ´ 2) = VB VA - 12 - 12 - 18 + 4 - 10 = VB VA - VB = 48 V
32 (a) The emf of cell, E = 4 V Internal resistance of cell, r = 01 . W External resistance, R = 3.9 W The potential drop across the cell …(i) V = E - Ir Now, the total resistance of the circuit R¢ = r + R
509
CURRENT ELECTRICITY
Here, actual value of emf, E = 2 V Measured value of emf, 1 ´2 V = E - ir = 2 500 1 =2250 1 ö æ \ Error = 2 - ç 2 ÷ è 250 ø
Þ R¢ = 0.1 + 3.9 Þ R¢ = 4.0 W Hence, current in the circuit is E I = R¢ 4 I = =1A Þ 4 Now, from Eq. (i), V = 4 - 1 ´ 01 . Þ V = 4 - 0.1 \ V = 3.9 V
=
33 (d) According to Kirchhoff’s Ist law,
5A 1A
Current at Current at Current at Current at So,
A
combination is 2V, r1 = 1 Ω
A
2V, r3 = 1 Ω
B
2V, r4 = 1 Ω R=2Ω
35 (c) Current taken from the cell,
Now, error in value of emf = actual value of emf - measured emf
6Ω
Key
Net resistance, R¢ = R + and \ Þ
i
1.6 Ω
4V
2.4 Ω 1.6 Ω (C)
…(i)
So, net resistance, R = 2.4 + 1.6 = 4.0 W Therefore, current from the battery, V 4 … (i) i = = = 1A R 4 Now, from the circuit (B), 4 I ¢ = 6I 3 Þ I¢ = I 2 3 5 But i = I + I¢ = I + I = I 2 2 5 [from Eq. (i)] 1= I Þ 2 Þ I = 0.4 A
39 (a) By Kirchhoff’s first law at P,
2V, r2 = 1 Ω
On solving, we get ( X - Y )R r= Y
Given, E = 2V, R = 998 W and r = 2 W 2 1 A i= = \ 998 + 2 500
I
i 4V
37 (d) The combined resistance of
XR R+r
E R+r
4Ω
(B)
R = 5 W , r1 = 1 W , r2 = 2 W E1 = 2 V and E2 = 4 V On putting the given values in Eq. (i), we get 4- 2 2 \ i= = = 0.25 A 5+ 1+ 2 8 The potential drop between points A and C , VA - VC = E1 + ir1 = 2 + 0.25 ´ 1 = 2.25 V
[from Eq. (i)]
i=
I'
4V
Given,
Now, potential difference across the resistor is given by V = IR X Substituting V = Y and I = R+r
1.6 Ω (A)
r2 = 2 Ω
Current in the circuit, E2 - E1 net emf i= = total resistance R + r1 + r2
…(i)
4Ω
4Ω 4V
R=5Ω
cell, then the current through the circuit is given by E I = (R + r)
Y=
E2
2V
34 (b) If r is the internal resistance of the
We get,
4Ω I
1 = 4 ´ 10-3 V 250
E1 r1 = 1 Ω
C
A = 3 - 2 = 1A B = 5 + 1= 6A D = 4 + 1= 5A C = 6 + 5 = 11A I = 11 - 3 = 8 A
Substituting E = X , we get X I = R+r
4Ω
each other. Since, E2 > E1, so current will flow from right to left.
3A
2A B E 3A C D I 4A
stepwise as shown below
36 (b) The emfs E1 and E2 are opposing
1A A
38 (c) We can simplify the network in
r 1 9 =2+ = 4 4 4
V = 2V V = iR V 2´4 8 i= = = R 9 9 = 0.888 A
…(i) I1 + I2 = 6 By Kirchhoff’s second law to the closed circuit PQRP, - 2I 1 - 2I 1 + 2I 2 = 0 Þ - 4 I 1 + 2I 2 = 0 …(ii) Þ 2I 1 - I 2 = 0 Adding Eqs. (i) and (ii), we get 3I 1 = 6 Þ I1 = 2 A From Eq. (i), I2 = 6 - 2 = 4 A
40 (c) If polarity on n cells out of N cells is reversed, then 2n cells will cancel out each other and equivalent emf = (N - 2n) e
510
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
41 (b) Let i1 , i2 be the currents in the two loops of the given circuit, then i1
8Ω
A
4Ω i2 i1 + i 2
10 V
1 2Ω
2
8V
B
Applying to Kirchhoff’s law for loop 1, we get SiR = V Þ 8i1 + 2(i1 + i2 ) = 10 Þ 10i1 + 2i2 = 10 …(i) Þ 5i1 + i2 = 5 Applying Kirchhoff’ law to loop 2, we get 4 i2 + 2(i1 + i2 ) = 8 Þ 6i2 + 2i1 = 8 …(ii) Þ i1 + 3i2 = 4 From Eqs. (i) and (ii), we get 11 A i1 = 14 15 and i2 = A 14 Hence, current flowing in arm AB is 11 15 i1 + i2 = + 14 14 =
42 (d) Current taken from the combination of n cells each of internal resistance r in series with external resistance R is nE i= nr + R Similarly, for parallel combination, nE i= r + nR For mixed grouping of n such cell in m rows with external resistance R is mnE i= mR + nr It is obvious that maximum current obtained from each combination depends on the values of external and internal resistances.
43 (b) As, the terminal voltage of the
44 (a) From Kirchhoff’s first law, in an electric circuit, the algebraic sum of the currents meeting at any junction is zero. i.e. Si = 0 Taking inward direction of current as positive and outward as negative, we have 1 A - 3 A - 2 A + I = 0 Þ I =4A
45 (a) All the resistances are in parallel order, so voltage across them will be equal. 60 Ω
E (0,E)
26 13 A = 14 7
1A 10 Ω
60I = (15 + 5) I 1 60I = 20I 1 I 1 = 3I
\ Þ Þ
…(i)
Again, (15 + 5)I 1 = 10(1 - I - I 1 ) Þ
2I 1 = 1 - I - I 1
Þ
2(3I ) = 1 - I - 3I [from Eq. (i)]
Þ Þ
–r
e=
5Ω
I1 1A 1 – I – I1
battery is given as V = E - ir …(i) Þ V = - ir + E The equation of straight line with slope m and Y intercept c is …(ii) y = mx + c On comparing, Eq. (i) with (ii), we get y = V; x = i m = - r and c = E Thus, current versus terminal voltage graph can be plotted as below V
15 Ω
I
p Slo
Þ
(E/r)
6I + 4 I = 1 10I = 1 1 I = = 0.1A 10
i
Topic 4 Different Measuring Instruments 2019 1 The meter bridge shown in the balance position with P Q P l1 = . If we now Q l2 G interchange the positions of l1 l2 galvanometer and cell, will the bridge work? If yes, that will be balanced condition? [NEET (Odisha)] P l2 - l1 (a) Yes, = (b) No, no null point Q l2 + l1 P l P l (d) Yes, = 1 (c) Yes, = 2 Q l1 Q l2
2 In the circuits shown below, the readings of voltmeters and the ammeters will be [NEET] 10 Ω V1
10 Ω
i1
10 Ω A1
10 V
(a) V1 = V2 and i1 > i 2 (c) V2 > V1 and i1 > i 2
i2
V2
A2
10 V
(b) V1 = V2 and i i = i 2 (d) V2 > V1 and i1 = i 2
511
CURRENT ELECTRICITY
2018 3 Find current ( i ) in circuit shown in figure.
[NEET]
B 5W A
10W
8 A meter bridge is set up as shown in figure, to determine an unknown resistance X using a standard 10 W resistor. The galvanometer shows null point when tapping key is at 52 cm mark. The end-corrections are 1 cm and 2 cm respectively for the ends A and B. The determined value of [IIT JEE] X is
D
10W 10W
10 Ω
X
20W
i C 5V
(a) 0.5 A (c) 1 A
A
(b) 0.2 A (d) 2 A
4 The effective resistance between p and q in given figure is [AIIMS] 6W p
8W
3W
8W
q
10W
4W
10W
20
W
5W
4W
(a) 2W
(b) 3W
(c) 5W
(d) 6W
2017 5 Assertion A potentiometer is preferred over that of a voltmeter for measurement of emf of a cell. Reason Potentiometer does not draw any current from the cell. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct Reason is incorrect. (d) Assertion is incorrect but Reason incorrect.
B
(a) 10.2 W (c) 10.8 W
(b) 10.6 W (d) 11.1 W
2014 9 A potentiometer circuit has been set up for finding the internal resistance of a given cell. The main battery, used across the potentiometer wire, has an emf of 2.0 V and a negligible internal resistance. The potentiometer wire itself is 4 m long. When the resistance R, connected across the given cell, has values of (i) infinity and (ii) 9.5 W. The balancing lengths of the potentiometer wire are found to be 3 m and 2.85 m, respectively. The value of internal resistance of the cell is [CBSE AIPMT] (a) 0.25 W (b) 0.95 W (c) 0.5 W (d) 0.75 W
10 The resistances in the two arms of the meter bridge are 5 W and R W, respectively. When the resistance R is shunted with an equal resistance, the new balance point is at 1.6 l1 . The resistance R is [CBSE AIPMT] 5Ω
2015 6 A potentiometer wire is 100cm long and a constant potential difference is maintained across it. Two cells are connected in series first to support one another and then in opposite direction. The balance points are obtained at 50 cm and 10 cm from the positive end of the wire in the two cases. The ratio of emf is [NEET] (a) 5:4 (b) 3:4 (c) 3:2 (d) 5:1
7 A potentiometer wire has length 4 m and resistance 8W . The resistance that must be connected in series with the wire and an accumulator of emf 2V, so as to get a potential gradient 1 mV per cm on the wire is [NEET 2015] (a) 32 W (b) 40 W (c) 44 W (d) 48 W
RΩ
G
A
(a) 10 W
l1
(b) 15 W
100 – l1 B
(c) 20 W
(d) 25 W
11 In Wheatstone bridge, three resistors P , Q and R are connected in three arms in order and 4th arm of resistance s, is formed by two resistors s1 and s2 connected in parallel. The condition for bridge to be balanced is P / Q [MHT CET] R ( s1 + s2 ) s1 s2 (b) (a) s1 s2 R ( s1 + s2 ) R s1 s2 ( s1 + s2 ) (c) (d) R s1 s2 ( s1 + s2 )
512
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
12 An electron in potentiometer which experiences a force 2.4 ´ 10-19 N . The length of potentiometer wire is 6 m. The emf of the battery connected across the wire is (electronic charge = 1.6 ´ 10-19 C ) [MHT CET] (a) 6 V (b) 9 V (c) 12 V (d) 15 V 13 In potentiometer experiment of a cell of emf 1.25 V gives balancing length of 30 cm. If the cell is replaced by another cell, then balancing length is found to be 40 cm. What is the emf of second cell? [KCET] ~ 1.37 V ~ 1.47 V (d) ~ 1.67 V (c) ~ 1.5 V (b) (a) -
2012 20 A voltmeter of resistance 998 W is connected across a cell of emf 2 V and internal resistance 2 W. The potential difference across the voltmeter is [Manipal] (a) 1.99 V (b) 3.5 V (c) 5 V (d) 6 V
2011 21 The equivalent resistance between the points A and B in the given circuit is
16 If a battery of 6 V is connected to the terminals of 3 m long wire of uniform thickness and resistance of the order of 100 W . The difference of potential between the two points separated by 50 cm in the wire will be [Manipal] (a) 1 V (b) 1.5 V (c) 2 V (d) 3 V
3W
14 Potentiometer measures the potential difference more accurately than a voltmeter, because [UK PMT] (a) it does not draw current from external circuit (b) it draws a heavy current from external circuit (c) it has a wire of high resistance (d) it has a wire of low resistance 15 In a potentiometer experiment, the balancing with a cell is at length 240 cm. On shunting the cell with a resistance of 2 W,the balancing becomes 120 cm. The internal resistance of the cell is [UK PMT] (a) 1 W (b) 0.5 W (c) 4 W (d) 2 W
3W
A
3W A
(a) 3 W
3W
(b) 6 W
(c) 12 W
(d) 1.5 W
22 A potentiometer circuit is set up as shown. The potential gradient across the potentiometer wire, is k volt/cm and the ammeter present in the circuit, reads 1.0 A, when two way key is switched off. The balance points, when the key between the terminals (i) 1 and 2 and (ii) 1 and 3 is plugged in, are found to be at lengths l1 cm and l2 cm, respectively. The magnitudes of the resistors R and X (in ohm) are equal to [CBSE AIPMT] + –
K
A
B
1 2
B
G 3
10 W
R
(a) 10 W (c) 30 W
B
3W
10 W 10 W
10 W
3W D
2013 17 The equivalent resistance between A and B is [Manipal, KCET] 10 W
[J&K CET] C
(b) 20 W (d) 40 W
18 The resistances of the four arms P , Q, R and S in a Wheatstone bridge are 10 W, 30 W, 30 W and 90 W, respectively. The emf and internal resistance of the cell are 7 V and 5 W, respectively. If the galvanometer resistance is 50 W, then the current drawn from the cell will be (a) 1.0 A (b) 0.2 A [NEET] (c) 0.1 A (d) 2.0 A 19 A 100 V voltmeter of internal resistance 20 kW in series with a high resistance R is connected to 110 V line. The voltmeter reads 5 V, the value of R is [AIIMS] (a) 210 k W (b) 315 k W (c) 420 k W (d) 4440 k W
X
– A +
(b) kl1 and k ( l2 - l1 ) (d) kl1 and kl2
(a) k ( l2 - l1 ) and kl2 (c) k ( l2 - l1 ) and kl1
23 Two cells of emfs E1 and E 2 ( E1 > E 2 ) are connected as shown in figure. E1 A
B
E2 C
When a potentiometer is connected between A and B, then the balancing length of the potentiometer wire is 300 cm. On connecting the same potentiometer between A and C, the balancing length is 100 cm. The ratio E1 / E 2 is [AFMC] (a) 3 : 1 (b) 1 : 3 (c) 2 : 3 (d) 3 : 2
513
CURRENT ELECTRICITY
24 Consider the following statements regarding the network shown in the figure. R
R
A
B
G
2R
2R + – E
I. The equivalent resistance of the network between points A and B is independent of value of G. II. The equivalent resistance of the network between 4 points A and B is R. 3 III. The current through G is zero. Which of the above statements is/are correct? [KCET] (a) Only I (b) Only II (c) II and III (d) I, II and III
2010 25 The current I drawn from the 5 V source will be
[AFMC]
10 Ω 5Ω
10 Ω
20 Ω
10 Ω
31 A 10 m long wire of resistance 20 W is connected in series with a battery of emf 3 V and a resistance of 10 W. The potential gradient along the wire (in V/m) is [JCECE] (a) 0.02 (b) 0.1 (c) 0.2 (d) 1.2
I + –
5V
(a) 0.33 A (c) 0.67 A
28 Two resistances are connected in two gaps of a metre bridge. The balance point is 20 cm from the zero end. A resistance of 15 W is connected in series with the smaller of the two. The null point shifts to 40 cm. The value of the smaller resistance (in ohm) is [VMMC] (a) 3 (b) 6 (c) 9 (d) 12 29 The length of a wire of a potentiometer is 100 cm and the emf of its standard cell is E volt. It is employed to measure the emf of a battery whose internal resistance is 0.5 W. If the balance point is obtained at l = 30 cm from the positive end, the emf of the battery is [MGIMS] 30E (a) 100.5 30E (b) 100 - 0.5 30( E - 0.5i ) , where i is the current flow in the (c) 100 potentiometer wire. 30E (d) 100 30 Two resistors 400 W and 800 W are connected in series with a 6 V battery. The potential difference measured by voltmeter of 10 kW across 400 W resistor is [BCECE] (a) 2 V (b) 1.95 V (c) 3.8 V (d) 4 V
2009 32 Seven resistances are connected as shown in the given
(b) 0.5 A (d) 0.17 A
26 The equivalent resistance across A and B is
[JIPMER]
figure. The equivalent resistance between A and B is 10 W
4Ω
4Ω 10Ω
A 4Ω
(a) 2 W (c) 4 W
B
4Ω
5W
(b) 3 W (d) 5 W
27 Five equal resistors, each equal to r are connected as shown in the figure, then the equivalent resistance between points A and B is [CG PMT]
A
(a) r r (c) 5
B
(b) 5r 2r (d) 3
A
10 W
8W
3W
B
6W
6W
[AFMC]
(a) 3 W (c) 4.5 W
(b) 4 W (d) 15 W
33 An ammeter and a voltmeter of resistance R are connected in series to an electric cell of negligible internal resistance. Their readings are A and V, respectively. If another resistance R is connected in parallel with the voltmeter, then (a) Both A and V will increase [AFMC] (b) Both A and V will decrease (c) A will decrease and V will increase (d) A will increase and V will decrease
514
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
34 In a potentiometer of one metre length, an unknown emf voltage source is balanced at 60 cm length of potentiometer wire, while a 3V battery is balanced at 45 cm length. Then, the emf of the unknown voltage source is [AFMC] (a) 3 V (b) 2.25 V (c) 4 V (d) 4.5 V 35 A 2V battery, a 990 W resistor and a potentiometer of 2 m length, all are connected in series. If the resistance of potentiometer wire is 10 W, then the potential gradient of the potentiometer wire is [MHT CET] (a) 0.05 Vm -1 (b) 0.5 Vm -1 (c) 0.01 Vm -1 (d) 0.1 Vm -1 36 In a meter bridge experiment, resistances are connected as shown in figure. The balancing length l1 is 55 cm. Now, an unknown resistance x is connected in series with P and the new balancing length is found to be 75 cm. The value of x is [Kerala CEE] P=3Ω P
Q B G (100 – l1)
l1 A
C K
54 (a) W 13 48 (c) W 11 (e) 5 W
37 If there is no deflection in the galvanometer connected in a circuit shown in figure, then the ratio of lengths AC/CB is [MGIMS]
2008 41 A cell can be balanced against 110 cm and 100 cm of potentiometer wire respectively with and without being short circuited through a resistance of 10 W. Its internal resistance is [CBSE AIPMT] (a) 1.0 W (b) 0.5 W (c) 2.0 W (d) zero 42 Two unknown resistances X and Y are connected to left and right gaps of a metre bridge and the balancing point is obtained at 80 cm from left. When a 10 W resistance is connected in parallel to X the balancing point is 50 cm from left. The values of X and Y , respectively are
shown in the figure. A battery of V volts is connected between A and B. The current flowing in AFCEB will be
B
C
(a) 40 W, 9 W (b) 30 W, 7.5 W (c) 20 W, 6 W (d) 10 W, 3 W 43 In a potentiometer, the null point is received at 7th wire. If we have to change the null point at the 9th wire, what should we do? [DUMET] (a) Attach a resistance in series with battery (b) Increase resistance in main circuit (c) Decrease resistance in main circuit (d) Decrease applied emf
2007 44 Five equal resistances each of resistance R are connected as
15 Ω G
A
40 Three resistances P , Q, R each of 2 W and an unknown resistance S form the four arms of a Wheatstone bridge circuit. When resistance of 6 W is connected in parallel to S , then the bridge gets balanced. What is the value of S ? (a) 2 W (b) 3 W [JIPMER] (c) 6 W (d) 1 W
[Punjab PMET]
20 (b) W 11 11 (d) W 48
60 Ω
39 A potentiometer having the potential gradient of 2 Vcm -1 is used to measure the difference of potential across a resistance of10 W.If a length of 50 cm of the potentiometer wire is required to get the null points, the current passing through 10 W resistor is [MGIMS] (a) 1 (b) 2 (c) 5 (d) 10
[Manipal]
C R
(a) 4 : 1
(b) 1 : 4
(c) 1 : 1
(d) 2 : 1
38 A potentiometer has uniform potential gradient across it. Two cells connected in series (i) to support each other and (ii) to oppose each other are balanced over 6 m and 2 m respectively on the potentiometer wire. The emfs of the cells are in the ratio of [MGIMS] (a) 1 : 2 (b) 1 : 1 (c) 3 : 1 (d) 2 : 1
R
R F
R D
3V R V (c) 2R (a)
R
A B
V R 2V (d) R
(b)
E
515
CURRENT ELECTRICITY
45 A circuit consists of five identical conductors as shown in figure. The two similar conductors are added as indicated by dotted lines. The ratio of resistance before and after addition will be [RPMT]
50 For the network shown in the figure, the value of the current i is [CBSE AIPMT] 2W
1W 1W
4W
1W
1W
7 5
(b)
3 5
(c)
5 3
(d)
46 In the circuit shown in figure, P ¹ R and if the reading of the galvanometer G is same while the switch S is opened or closed, then [Manipal]
6W V
(a) 9V / 35
6 5
(b) 5V / 18
(c) 5V / 9
(d) 18V / 5
51 In the Wheatstone’s network shown in the figure, the current I in the circuit is [Kerala CEE]
P
Q
B
S
(b) I R = I G (d) I Q = I G
W
W
2
G
R
4
(a) I Q = I R (c) I P = I G
3W
1W
i
(a)
4W
5W
A
C
R 4
48 The current in the primary circuit of a potentiometer is 0.2 A. The specific resistance and cross-section of the potentiometer wire are 4 ´ 10-7 W-m and 8 ´ 10-7 m 2 respectively. The potential gradient will be equal to [AIEEE] (a) 0.2 V/m (b) 1 V/m (c) 0.3 V/m (d) 0.1 V/m
2005 49 The equivalent resistance between the points P and Q in the network shown in the figure is given by
8
W
47 A 6 V battery is connected to the terminals of a 3 m long wire of uniform thickness and resistance of 100 W. The difference of potential between two points on the wire separated by a distance of 50 cm will be [Manipal] (a) 2 V (b) 3 V (c) 1 V (d) 1.5 V
I
W
D 2V
(a) 1 A (c) 0.25 A (e) 0.33 A
(b) 2 A (d) 0.5 A
52 The figure below shows a 2.0 V potentiometer used for the determination of internal resistance of a 2.5 V cell. The balance point of the cell in the open circuit is 75 cm. When a resistor of 10 W is used in the external circuit of the cell, the balance point shifts to 65 cm length of potentiometer wire. The internal resistance of the cell is [JCECE]
[BHU]
10 W
2.0 V
30 W
10
W
J G
2.5 V
5W
B
G
10 Ω
P
Q
(a) 2.5 W (c) 1.54 W
5W
(a) 2.5 W
J'
A
(b) 7.5 W
(c) 10 W
(d) 12.5 W
(b) 2.0 W (d) 1.0 W
Answers 1 11 21 31 41 51
(d) (a) (d) (c) (a) (d)
2 12 22 32 42 52
(b) (b) (b) (b) (b) (c)
3 13 23 33 43
(a) (b) (d) (a) (b)
4 14 24 34 44
(b) (a) (d) (c) (c)
5 15 25 35 45
(a) (d) (b) (c) (c)
6 16 26 36 46
(c) (a) (c) (c) (b)
7 17 27 37 47
(a) (a) (a) (a) (c)
8 18 28 38 48
(b) (b) (c) (c) (d)
9 19 29 39 49
(c) (c) (d) (d) (b)
10 20 30 40 50
(b) (a) (b) (b) (b)
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 10 = 1A 10 V2 = i2R = 1 ´ 10 = 10 V V1 = V2 and i1 = i2
1 (d) For balanced position in a meter
10 i2 = 10 Þ i2 =
bridge, \ P
Q
3 (a)
B
G
5W
l1
A
l2
P l1 = Q l2
10W
20 W
10 W
i
C
Now, if position of G and cell is interchanged,
5V
Above circuit satisfies the Wheatstone bridge condition, so no current flows in the branch BC and it behaves like an open circuit. So, circuit becomes as shown below
G P
10 W D
Q
B
l1
l2
The balance condition still remains the same, if the jockey points as the same point as given in the initial condition, for which there is no deflection in the galvanometer or no current will be drawn from the cell. Thus, the bridge will work as usual and balance condition is same, P / Q = l1 / l2
2 (b) For an ideal voltmeter, the resistance is infinite and for an ideal ammeter, the resistance is zero. 10 V
10 W
5W
i1
V1
A1
D
A
20 W
10 W i C 5V
Now, in the above circuit, RABD = 5 + 10 = 15 W RACD = 10 + 20 = 30 W Resistance RABD and RACD in parallel, so 15 ´ 30 450 Rnet = = = 10 W 30 + 15 45 E 5 \ i= = = 0.5 A Rnet 10
4 (b) Figure is equivalent to the one
8W
10 V
5W
i2 V2
A2
Circuit 2
S
20
R
q
10W
W
10W
p
Q
8W
10 Ω
P
4W
10 Ω
C
4W
So, the current in circuit 1 is R ´ i = V or 10 i1 = 10 10 Þ i1 = = 1A 10 \ V1 = i1 ´ R = 1 ´ 10 = 10 V Similarly, for circuit 2, the addition of 10 W to voltmeter does not affect the current and hence
shown below. It is a Wheatstone’s bridge in which
3W
10 V
6W
Circuit 1
D
6´3 = 2W 6+ 3 8 ´ 8 64 Q= = = 4W 8 + 8 16 P=
4 ´ 4 16 = = 2W 4+4 8 20 ´ 5 and S = = 4W 20 + 5 P 2 R We find that, = = Q 4 S R=
i.e. the bridge is balanced and resistance of arm CD is ineffective. Effective resistance between p and q (P + Q ) (R + S ) RAB = P+Q+R+S (2 + 4 ) (2 + 4 ) 6 ´ 6 = = = 3W 2+ 4 + 2+ 4 12
5 (a) When a voltmeter is connected across the two terminals of a cell, it draws a small current from the cell, so it measures terminal potential difference between the two terminals of the cell, which is always less than the emf of the cell. On the other hand, when a potentiometer is used for the measurement of emf of cell, it does not draw any current from the cell. Hence, it accurately measures the emf of cell. Thus, a potentiometer is preferred over a voltmeter.
6 (c) According to question, emf of the cell is directly proportional to the balancing length, i.e. …(i) E µl Now, in the first case, cells are connected in series to support one another, i.e. Net emf = E1 + E2 From Eq. (i), (given) …(ii) E1 + E2 = 50 Again, cells are connected in series in opposite direction, i.e. Net emf = E1 - E2 From Eq. (i), …(iii) E1 - E2 = 10 On dividing Eq. (ii) by Eq. (iii), we get E1 + E2 50 = E1 - E2 10 Þ
E1 5 + 1 6 3 = = = E2 5 - 1 4 2
7 (a) Given, l = 4 m, R = potentiometer wire resistance = 8W dV Potential gradient = = 1mV/cm dr
517
CURRENT ELECTRICITY
10 (b) There are two cases
So, for 400 cm, DV = 400 ´ 1 ´ 10-3 = 0.4 V
Case I For balanced point of meter
Let a resistor Rs connected in series, then V DV = ´R R + Rs 2 0.4 = ´8 Þ 8+ R 16 8+ R= = 40 Þ 0.4 Þ R = 32 W
8 (b) Given, standard resistance, Y = 10W, balance length, L1 = 52 cm and end corrections, x1 = 10 cm and x2 = 2 cm. Now, balance length, L2 = 100 - L1 = 100 - 52 = 48 cm. As, balance condition for meter bridge, X Y = (L1 + x1 ) (L2 + x2 ) X 10 Þ = (52 + 1) (48 + 2) 10 ´ 53 Þ x= = 10.6W 50
9 (c) As, r = internal resistance, then
Also, Þ
rl1 = l - l1 R1
…(ii)
él l ù …(i) l1 - l2 = r ê 2 - 1 ú ë R2 R1 û As, R1 = ¥ Þ l1 = 3 m and R2 = 9.5 Þ l2 = 2.85 cm Putting these values in Eq. (i), we get é 2.85 ù - 0ú Þ (3 - 2.85) = r ê ë 9.5 û
Þ Þ
æ 2.85 ö 015 . =rç ÷ è 9.5 ø 015 . ´ 9.5 2.85 r = 0.5 W r=
…(i)
Case II When R is shunted with equal resistance, i.e. R 1 1 1 = + R¢ R R Þ R ¢ = R/2 5 1.6 l1 = \ R / 2 100 - 1.6 l1
…(ii)
14 (a) Potentiometer measures the potential difference more accurately than a voltmeter because while measuring emf (electromotive force), it does not draw any current from the source of known emf. Potentiometer has its own battery which maintains potential drop across the potentiometer wire.
From Eqs. (i) and (ii), we get æ l1 ö 1.6 l1 2ç ÷= è 100 - l1 ø 100 - 1.6 l1
Driving battery of potentiometer
l1 = 25 cm 5 25 From Eq. (i), = R 75 Þ R = 15 W Þ
E
11 (a) Balanced condition for Wheatstone bridge, P = Q 1 = s
R s 1 1 + s1 s2 ss s= 12 s1 + s2
Potentiometer wire
G
r
15 (d) Initially, kl1 = E - ri = E - r(0) = E where, l1 = balancing length of potentiometer wire = 240 cm.
…(i)
Potentiometer battery
l1
...(ii)
From Eqs. (i) and (ii), we get P R (s1 + s2 ) = Q s1s2
Subtracting Eq. (i) from Eq. (ii), we get él l ù l - l2 - l + l1 = r ê 2 - 1 ú R R ë 2 1û
Þ
Þ
5 l1 = R 100 - l1
Þ …(i)
æ l - l2 ö r = R2 ç ÷ è l2 ø rl2 = l - l2 R2
bridge,
where,
æ l - l1 ö r = R1 ç ÷ è l1 ø Þ
1.25 ´ 40 30 5 ~ 1.67 V E2 = = 1.666 V 3
E2 =
Þ
r
E
Ig=0
…(i)
l2 G I =0 g i1 E
r
i1
R
and
kl2 = E - ri1 = Ri1 Þ i1 =
Þ
kl2 =
13 (b) Given, first balancing length, l1 = 30 cm Second balancing length, l2 = 40 cm, E1 = 1.25 V and E2 = ? So, according to the principle of potentiometer, …(i) E1 = kl1 and …(ii) E2 = kl2 E1 kl1 1.25 30 = Q = Þ E2 40 E2 kl2
G
kl1 = E
Þ
12 (b) Force experienced by electron, F = qE where, E = electric field intensity. \ 2.4 ´ 10-19 = 1.6 ´ 10-19 E Þ E = 1.5 N/C Moreover, E = potential gradient dV i.e. E= dl Þ E ´ l =V Þ V = 1.5 ´ 6 = 9 V
i=0
RE R+r
E R+r …(ii)
where, l2 = balancing length after shunting = 120 cm and R = shunting resistance = 2 W. Dividing Eq. (i) by Eq. (ii), we get l1 R + r r = =1+ l2 R R Þ
æl ö r = R ç 1 - 1÷ è l2 ø
…(iii)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Putting all values in Eq. (iii), we get æ 240 ö r=ç - 1÷ ´ 2 è 120 ø = (2 - 1) ´ 2 = 2 W
40 ´ 120 4800 = = 30 W 120 + 40 160 7 7 = = 0.2 A \ Current, I = (30 + 5) 35 Reff =
16 (a) Potential drop across 3 m long
é E êQ I = R + ë
resistance wire is 6 V. i.e. E1 = 6V and l1 = 3 m, Also, l2 = 50 cm = 0.5 m As we know that, E µ l l E1 l1 or E2 = E1 ´ 2 Þ = l1 E2 l2
19 (c) The circuit is as shown figure 20 kΩ V 100 V
R
Substituting the given values, we get 6 ´ 0.5 E2 = =1V 3
17 (a) The given circuit is in balanced Wheatstone bridge condition. In the given circuit, the ratio of resistances in the opposite arms is same. This implies the current through the middle arm is zero. P 10 1 R 10 1 and = \ = = = Q 10 1 S 10 1 Hence, bridge is balanced. The given circuit can now be reduced to as below 10 W
10 W
110 V
Potential difference across voltmeter =5V \ Current in the circuit, 5 5 i= = RV 20 ´ 103 = 0.25 ´ 10-3 A Voltage across R, V1 = 110 - 5 = 105 V V 105 Hence, R = 1 = i 0.25 ´ 10-3 = 420 ´ 103 = 420 kW
20 (a) From Ohm’s law, current, i=
A
ù ú rû
B
2 E = = 2 ´ 10-3 A R + r 998 + 2
10 W
i
Here, 10 W and 10 W resistors are in series, therefore
V R = 998 Ω
20 W A
B 20 W
Now, the two 20 W resistors are connected in parallel, hence equivalent resistance is 40 1 1 1 1 = = = + R 20 20 20 ´ 20 10
Potential difference across the voltmeter V = iR = (2 ´ 10-3 ) ´ 998 = 1.996 V
21 (d) The given circuit can be redrawn as C
18 (b) Given, P = 10 W, Q = 30 W, R = 30 W, S = 90 W, E = 7 V r = 5 W, R = 50 W Since, the given circuit is a balanced Wheatstone bridge. The effective resistance, (P + Q ) ´ (R + S ) Reff = (P + Q ) + (R + S )
3W
P 3W
R = 10 W
Q 3W
D
3W R A
3W
Þ
22 (b) There are two cases Case I When switches 1 and 2 are connected. \ V1 = k l1 Þ IR = kl1 where, I = 1A Þ R = k l1 Case II When switches 1 and 3 are connected. \ V2 = kl2 Þ I (R + X ) = kl2 Þ R + X = k l2 Þ X = k (l2 - l1 )
B
3 3 = 3 3
between A and B, then it measures only E1 and when connected between A and C, then it measures E1 - E2. E1 l = 1 \ E1 - E2 l2 E1 - E2 l2 Þ = E1 l1 100 E 1- 2 = Þ E1 300 E2 1 Þ =1E1 3 E2 2 Þ = E1 3 E1 3 = \ E2 2 R 2R R 2R Þ 1=1 Hence, the circuit is as balanced Wheatstone bridge circuit. So, current through the arm G is zero and the arm G the circuit is assumed to be removed.
24 (d) As in the given circuit, =
S 3W
P R = Q S
This R would be parallel with the resistance of arm AB. Hence, the resultant resistance would be 3´3 9 R¢ = = = 1.5 W 3+ 3 6
23 (d) When potentiometer is connected
2V 2Ω 10 W
The dotted region represents a balanced Wheatstone bridge. Thus, the current through the arm CD would be zero. Thus, the resultant resistance of Wheatstone bridge would be 1 1 1 = + R (3 + 3) (3 + 3) (3 + 3) ´ (3 + 3) Þ R= (3 + 3) + (3 + 3) 6 ´ 6 36 = = =3W 6 + 6 12
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CURRENT ELECTRICITY
(P + Q ) (R + S ) (P + Q + R + S ) 4 Reff = R Þ 3 Thus, the equivalent resistance between A and B is independent of value of G. Thus,
Reff =
25 (b) The given circuit can be redrawn as 10 W
20 W 10 W
5W
We have
P R 4 4 = , i.e. = Q S 4 4
So, the given circuit is a balanced Wheatstone bridge. Hence, the equivalent resistance (4 + 4 ) ´ (4 + 4 ) RAB = (4 + 4 ) + (4 + 4 ) 8 ´ 8 64 = = =4W 8 + 8 16
10 W
r
P R = Q S 10 5 1 1 = Þ = Þ 20 10 2 2 The circuit shows the balanced condition of Wheatstone bridge and hence no current flows in the middle resistor. So, equivalent circuit would redrawn be as shown below
r
r
r
5W
B r
26 (c) The equivalent circuit can be redrawn as P=4W
Q=4W
R=4W
Potential across 20 W resistance, 1 V ¢ = IR = ´ 20 = 2V 10 DV 2 \ = = 0.2 V /m Dl 10
The two cases may be appeared P 20 P 1 = Þ = Q 100 - 20 Q 4 1 …(i) P= Q Þ 4 P + 15 40 Case II = Q 60 2 …(ii) P + 15 = Q Þ 3 From Eqs. (i) and (ii), we get Q = 36 and the smaller resistance, 1 P= Q =9W 4
Case I
29 (d) From the principle of 10 W
A
B
potentiometer, V l = E L where, E = emf of cell, l = balance point (30 cm) V µ l or
S=4W
100 = 1.95 V 52 V (c) As, V = IR Þ I = R Here, V = 3 V, R = (20 + 10) W 3 3 1 I = = = A Þ (20 + 10) 30 10 æ DV ö Potential gradient = ç ÷ è Dl ø
connected in the two gaps of the metre bridge, such that
10 W and 20 W resistances are in series, then R¢ = 10 W + 20 W = 30 W Similarly, 5 W and 10 W are in series, then R ¢¢ = 15 W Now, R¢ and R ¢¢ are in parallel, then 15 ´ 30 R= = 10 W 15 + 30 V 5 So, I = = = 0.5 A R 10
1 ´ 10 ´ 1000 5200
=
28 (c) Let P and Q be the two resistances
5V
V = IV × RV =
\
Hence, the effective resistance, (2r)(2r) req = =r 4r
10 W
400 æ 1 ö 1 ç ÷= 10400 è 200 ø 5200
Reading in voltmeter,
31
A r
20 W
IV =
B
r
l 30 ´ E 30E = E= L 100 100
connected in series, then total resistance R = 400 + 800 = 1200 W The current through circuit without voltmeter, V 6 1 I = = = R 1200 200 The current through voltmeter,
r r
A
V =
30 (b) Two resistors 400 W and 800 W are
condition of Wheatstone bridge. P R = Q S r r Þ = r r
5V + –
l
or
27 (a) The given figure is in a balanced
I
10 W
L = length of potentiometer wire (100 cm)
32 (b) The given circuit can be redrawn as R7=10 W A 5W
10 W
3W
R5
R3 R4 6 W
R6
8W
B R2 6 W
R1
Equivalent resistance of R1 and R2 (in parallel) is given by 6´6 R¢ = = 3W 6+ 6 Equivalent resistance of R5 and R7 (in parallel) is given by 10 ´ 10 R¢¢ = =5 W 10 + 10
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Now, the circuit is reduced to 5W
A
C
R6
R4
8W
B
3W
40 (b) For balanced condition of
V 2 2 I = = = R 990 + 10 1000
R3
R¢ 5W
35 (c) As the current,
3W
10 Ω 2m
990 Ω
R¢
41 (a) In potentiometer experiment, to
I 2V
D
Now, this circuit can be shown as it is balanced Whetstone bridge because the series arm resistance are same. So, it P R 5 5 means = Þ = Þ 1=1 Q S 3 3 5W
3W
A
Now, DV = Potential drop across 2 2 potentiometer = ´ 10 = 1000 100 Also, potential gradient DV 2 1 = = = = 0.01 V/m l 100 ´ 2 100
36 (c) For the balance point of meter B
bridge
Case I When balancing length is 55 cm
3W
5W
Now, total resistance between AB, (5 + 3)(5 + 3) 8´8 RAB = = =4W (5 + 3) + (5 + 3) 8 + 8
33 (a) Case I Req = 2 R
I
A R
V R
Þ
⇒
Þ R V R
I′
V
Case II Req ¢ = R + R /2 Þ Req ¢ = 3R / 2 As Req > Req ¢ Hence, I¢ > I So, reading of ammeter will increase and voltmeter will also increase (V = I ¢ Re¢q ).
34 (c) We know that, E µ l E = kl For l = 60 cm, E = k ´ 60 …(i) For known emf, i.e. E = 3 V For l = 45 cm, E = k 45 Þ 3 = k (45) 3 \ k= 45 From Eq.(i), we get 3 E= ´ 60 = 4 V 45
æ 45 ö 3+ x=3ç ÷ ´3 è 55 ø x=
81 48 -3= W 11 11
37 (a) As, galvanometer shows zero deflection. (i.e. balanced condition) P l1 Therefore, = Q l2 60 AC = Þ AC : CB = 4 : 1 Þ 15 CB
38 (c) As, E µ l Þ E = kl Case I When E1 = kl1 = k (6)
…(i)
Case II When E2 = kl2 = k (2)
…(ii)
Dividing Eq. (i) by Eq. (ii), we get E1 6 = = 3:1 E2 2 Given, k = 2 V/cm, R = 10 W and l = 50 ´ 10-2 m As we know that, E = RI = kl Þ I = 10 A
where, l1 and l2 are lengths of potentiometer wire with and without short circuited through a resistance. E R+r So, …(ii) = V R [Q E = I (R + r) and V = IR] From Eqs. (i) and (ii), we get R + r l1 r 110 or 1 + = = R l2 R 100 r 10 1 or r = or = ´ 10 = 1 W R 100 10 point from left gap, then X l 80 = = =4 Y 100 - l 20 or
…(i) X = 4Y Again in parallel, the net resistance is 10 X X¢= 10 + X X¢ 50 10 X So, = = 1 or =Y Y 100 - 50 10 + X or or
10 X = 10Y + XY 40Y = 10Y + 4Y 2 [from Eq. (i)]
This is a quadratic in term of Y,on solving which gives Y = 7.5 W Putting Y = 7.5 W in Eq. (i), we get X = 30 W.
43 (b) The working of potentiometer is
There are two cases
39 (d) As, k = potential gradient.
find internal resistance of a cell, let E be the emf of the cell and V be the terminal potential difference, then E l1 …(i) = V l2
42 (b) Let l be the distance of balancing
x is involved P+x l1¢ 3 + x 75 = = Þ Q Q 25 100 - l1¢ Þ
R A
P l1 3 55 = Þ = Q 100 - l1 Q 45 45 Q= ´3W 55
Case II When an unknown resistance
V
Wheatstone bridge circuit, P R 2 2 = Þ = Þ S =3W Q S 2 æ 6S ö ç ÷ è S + 6ø
based on the fact that the fall of potential across any portion of the wire is directly proportional to the length of that portion provided the wire is of uniform area of cross-section and a constant current is flowing through it. To shift the balance point on higher length, the potential gradient of the wire is to be decreased. The same can be obtained by decreasing the main current, which is possible by increasing the resistance in series of potentiometer wire.
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CURRENT ELECTRICITY
44 (c) The given circuit can be redrawn as shown C R A
R R
F
E
B
R
R
46 (b) As galvanometer deflection
47 (c) Total current drawn from the
D
battery i =
Thus, it is balanced Wheatstone bridge, so resistance in arm CD is ineffective and so current does not flow in this arm. Net resistance of the circuit is given by 1 1 1 = + R ¢ (R + R ) (R + R ) 1 1 2 1 = + = = 2R 2R 2R R Þ R¢ = R So, net current drawn from the battery, V V i¢ = = R¢ R As from symmetry, upper circuit AFCEB is half of the whole circuit and is equal to AFDEB. So, in both the halves, half of the total current will flow. Hence, in AFCEB, the current flowing i¢ V is i = = 2 2R
48 (d) Given, I = 0.2 A, specific
resistance, r = 4 ´ 10-7 W-m and cross-section area, A = 8 ´ 10-7 m 2. Potential gradient of a potentiometer, Ir 0.2 ´ 4 ´ 10-7 K = = A 8 ´ 10-7 = 0.1 V/m
49 (b) We can show the network as below
1W 1W
1W
Therefore, if the initial resistance R1 of circuit was 5 W, where resistance of each conductor is 1 W, the new resistance of the circuit will become 2 R2 = 2 + = 3 W 2 5 \ The required ratio of resistance = 3
W
1W
W
1W
Q
30 W
P
10
circuit will acquire the form shown in the following figure. From symmetry considerations, we conclude that the central conductor will not be effective in electric charge transfer.
W
5
10
4 6 = 2 3 Thus, middle arm containing 4 W resistance will be ineffective, i.e. no current flow through it. The equivalent circuit is shown as below balanced Wheatstone bridge as
B
E 6 = = 0.06 A R + r 100 + 0
Resistance of 50 cm wire is rl ¢ æ r ö æ Rö R¢ = = ç ÷ l¢ = ç ÷ l¢ èlø A è Aø 100 50 = ´ 50 = W 300 3 Hence, the potential difference between two points on the wires separated by a distance 50 cm is 50 V = iR ¢ = 0.06 ´ = 1V 3
45 (c) After adjoining two conductors, the
1W
50 (b) The given circuit resembles to
remains unaffected with switch S open or closed, hence the bridge circuit is balanced. Hence, I P = I Q and I R = IG However, as P¹R Hence, IP ¹ IR
5
W
From the circuit diagram, we calculate 10 10 that, = , i.e. 2 = 2 5 5 So, the circuit represents a balanced condition of Wheatstone bridge. Therefore, no current flows through 30 W resistor. Thus, the net resistance in upper arms, (series) RU = 10 + 5 = 15 W The net resistance in lower arms, (series) RL = 10 + 5 = 15 W Hence, equivalent resistance of the network, R ´ RL 15 ´ 15 R= U = = 7.5 W RU + RL 15 + 15
C
2W
4W
3W A i
6W
D
V
Net resistance between A and C through B, R¢ = 4 + 2 = 6 W Net resistance between A and C through D, R ¢¢ = 6 + 3 = 9 W Thus, parallel combination of R ¢ and R ¢¢ gives R ¢ ´ R ¢¢ 6´9 R= = R ¢ + R ¢¢ 6 + 9 54 18 = = W 15 5 5V V V Hence, current, i = = = R 18 / 5 18
51 (d) Since, for balanced condition, 2 4 = , so 5 W resistance can be 4 8 neglected. Therefore, effective resistance, (2 + 4 ) ´ (4 + 8) R= (2 + 4 ) + (4 + 8) 6 ´ 12 = 6 + 12 72 = =4W 18 So, the current in the circuit, V 2 I = = = 0.5 A R 4
52 (c) For a potentiometer, the internal resistance (r) is given by æl ö r = R ç 1 - 1÷ è l2 ø Given, R = 10 W, l1 = 75 cm and \
l2 = 65 cm æ 75 ö r = 10 ç - 1÷ è 65 ø = 10 ´ 0.154 = 1.54 W
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 5 Heating Effect of Current 2019 1 Six similar bulbs are connected as shown
A
in the figure with a DC source of emf E and zero internal resistance. The ratio of power consumption by the bulbs when (i) all are glowing and (ii) in the situation when two from section A and one from section B are glowing, will be
E
[NEET]
(a) 9 : 4
(b) 1 : 2
(c) 2 : 1
B
(d) 4 : 9
2 Which of the following acts as a circuit protection device? [NEET]
(a) Inductor (b) Switch
(c) Fuse
(d) Conductor
3 In the given circuit, if power rating of heater is 1000 W at 100 V, find the resistance R in figure so that heater produces power of 62.5 W. [JIPMER] Heater 10W R
24 V
(a) 5 W
(b) 7 W
(c) 10 W
(d) 8 W
2018 4 Assertion Bulb generally get fused when they are switched ON or OFF. Reason When we switch ON or OFF, a circuit current changes in it rapidly. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion (c) Assertion is correct and Reason is incorrect (d) Assertion is incorrect and Reason is correct
2017 5 You are given resistance wire of length 50 cm and a battery of negligible resistance. In which of the following cases is largest amount of heat generated? [JIPMER] (a) When the wire is connected to the battery directly. (b) When the wire is divided into two parts and both the parts are connected to the battery in parallel. (c) When the wire is divided into four parts and all the four parts are connected to the battery in parallel. (d) When only half of the wire is connected to the battery.
6 N lamps each of resistance r are fed by a machine of resistance R. If light emitted by any lamp is proportional to the square of the heat produced, prove that the most efficient way of arranging them is to place them in parallel arcs, each containing n lamps, where n is the integer nearest to [NEET] 3/ 2 1/ 2 æ r ö æ NR ö (a) ç (b) ç ÷ ÷ è NR ø è r ø (c)( NRr ) 3/ 2 (d) ( NRr )1/ 2
2016 7 A filament bulb (500 W, 100 V) is to be used in a 230 V main supply. When a resistance R is connected in series, it works perfectly and the bulb consumes 500 W. The value of R is [NEET] (a) 230 W (b) 46 W (c) 26 W (d) 13 W
8 The charge following through a resistance R varies with time t as Q = at - bt 2 , where a and b are positive constants. The total heat produced in R is [NEET] a3R a3R (b) (a) 3b 2b a3R a3R (c) (d) b 6b
2013 9 The resistance of the fuse wire is (a) low
(b) moderate (c) zero
[WB JEE]
(d) very high
2012 10 If voltage across a bulb rated 220 V-100 W drops by 2.5% of its rated value, the percentage of the rated value by which the power would decrease is [CBSE AIPMT] (a) 20% (b) 2.5% (c) 5% (d) 10%
11 The power dissipated in the circuit shown in the figure is 30 W. The value of R is [CBSE AIPMT] R 5Ω
10 V
(a) 20 W
(b) 15 W
(c) 10 W
(d) 30 W
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CURRENT ELECTRICITY
2011 12 If the power dissipated in the 9 W resistor in the circuit shown is 36 W, then the potential difference across the 2 W resistor is [CBSE AIPMT] 9Ω
6Ω 2Ω V
(a) 8 V (c) 2 V
(b) 10 V (d) 4 V
13 The maximum power dissipated in an external resistance R, when connected to a cell of emf E and internal resistance r, will be [J&K CET] E2 E2 (b) (a) r 2r E2 E2 (c) (d) 3r 4r
19 Two bulbs consume same power when operated at 200 V and 300 V, respectively. When these bulbs are connected in series across a DC source of 500 V, then [Haryana PMT] (a) ratio of potential differences across them is 3/2 (b) ratio of potential differences across them is 9/4 (c) ratio of powers consumed across them is 4/9 (d) ratio of powers consumed across them is 2/3 20 Consider the diagram in which B1 , B 2 and B 3 are the three identical bulbs connected to a battery of steady emf with key K closed. What happens to the brightness of the bulbs [KCET] B1 and B 2 when the key is opened? B1 K B2 B3
(a) Brightness of the bulb B1 increases and that of B 2 decreases (b) Brightness of the bulbs B1 and B 2 increases (c) Brightness of the bulb B1 decreases and B 2 increases (d) Brightness of the bulbs B1 and B 2 decreases
14 If two bulbs of wattages 25 and 100 W respectively, each rated by 220 V are connected in series with the supply of 440 V, then which bulb will fuse? [AIIMS] (a) 100 W bulb (b) 25 W bulb (c) Both (a) and (b) (d) None of these 2010
21 Two bulbs marked 60 W, 220 V and 100 W, 220 V are connected in series and the series combination is now connected across a 220 V main supply. The power dissipiated in the circuit is [AMU] (a) 37.5 W (b) 75 W (c) 80 W (d) 40 W
15 There are two electric bulbs of 40 W and 100 W. Which one will be brighter when first connected in series and then in parallel? [AFMC] (a) 40 W in series and 100 W in parallel (b) 100 W in series and 40 W in parallel (c) 40 W both in series and parallel will be uniform (d) 100 W both in series and parallel will be uniform
22 Two bulbs 40 W and 60 W of rated voltage 240 V are connected in series across a potential difference of 420 V. Which bulb will work at above its rated voltage? [VMMC] (a) 40 W bulb (b) 60 W bulb (c) Both bulbs will work (d) 20 W bulb
16 An electric immersion heater of 1.08 kW is immersed in water. After the water has reached a temperature of 100°C, how much time will be required to produce 100 g of steam? (a) 50 s (b) 420 s [BHU] (c) 105 s (d) 210 s 17 The resistance of the filament of a lamp increases with the increase in temperature. A lamp rated 100 W and 200 V is connected across 220 V power supply. If the voltage drops by 10%, then the power of the lamp will be [BHU] (a) 90 W (b) more than 81 W (c) between 90 and 100 W (d) between 81 and 90 W 18 A factory is served by a 220 V supply line. In a circuit protected by a fuse marked 10 A, the maximum number of 100 W lamps in parallel that can be turned on, is [Manipal] (a) 11 (b) 22 (c) 33 (d) 66
2009 23 Two electric bulbs rated 50 W and 100 V are glowing at full power, when used in parallel with a battery of emf 120 V and internal resistance 10 W. The maximum number of bulbs that can be connected in the circuit when glowing at full power, is [AIIMS] (a) 6 (b) 4 (c) 2 (d) 8
24 Two similar heater coils separately take 10 min to boil a certain amount of water. If both coils are connected in series, then time taken to boil the same amount of water will be (a) 15 min (b) 20 min [AFMC] (c) 7.5 min (d) 25 min 25 A 30 V, 90 W lamp is to be operated on a 120 V DC line. For proper glow, a resistor of … W should be connected in series with the lamp. [BHU] (a) 40 (b) 10 (c) 20 (d) 30
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
26 Two identical cells each of emf E and internal resistance r are connected in parallel with an external resistance R. To get maximum power developed across R, the value of R is
2008 32 A current of 3 A flows through the 2 W resistor shown in the circuit. The power dissipated in the 5 W resistor is
[OJEE]
r (a) R = 2
(b) R = r
r (c) R = 3
(d) R = 2r
4Ω
27 Three electric bulbs of 200 W, 200 W and 400 W are shown in figure. The resultant power of the combination is 200 Ω
[OJEE]
1Ω
5Ω
400 Ω
(a) 4 W 200 Ω
(a) 800 W (c) 200 W
[CBSE AIPMT]
2Ω
(b) 400 W (d) 600 W
28 An electric bulb rated 220 V, 100 W is connected in series with another bulb rated 220 V, 60 W. If the voltage across the combination is 220 V, the power consumed by the 100 W bulb will be about [Kerala CEE] (a) 25 W (b) 14 W (c) 60 W (d) 100 W (e) 80 W 29 160 W, 60 V lamp is connected at 60 V DC supply. The number of electrons passing through the lamp in 1 min is (charge of electron, e = 1.6 ´ 10-19 C) [Haryana PMT, CG PMT] (a) 1019 (b) 1021 19 (c) 1.6 ´ 10 (d) 1.4 ´ 1020 30 The tungsten filaments of two electric bulbs are of the same length. If one of them gives 25 W power and the other 60 W power, then [J&K CET] (a) both the filaments are of same thickness (b) 25 W bulb has thicker filament (c) 60 W bulb has thicker filament (d) both the filaments have same cross-section area 31 Assertion The power delivered to a light bulb is more just after it is switched ON and the glow of the filament is increasing as compared to when the bulb is glowing steadily, i.e. after sometime of switching ON. Reason As temperature decreases, resistance of conductor increases. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
(b) 2 W
(c) 1 W
(d) 5 W
33 Assertion An electric bulb becomes dim, when an electric heater in parallel circuit is switched ON. Reason Dimness decreases after sometime. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect (d) Both Assertion and Reason are incorrect 34 The maximum current that flows in the fuse wire, before it blows out, varies with the radius r as [BHU] 1/ 2 2/ 3 3/ 2 (d) r (b) r (c) r (a) r 35 The ratio of cross-sectional areas of two conducting wires made up of same material and having same length is 1 : 2. What will be the ratio of heat produced per second in the wires, when same current is flowing in them? [Guj CET] (a) 1 : 4 (b) 2 : 1 (c) 1 : 2 (d) 1 : 1 36 Two electric bulbs are connected one by one across potential difference V. At that time, power consumed in them are P1 and P2 respectively. Now, if potential difference V is applied across series combination of these bulbs, what will be total power consumed? [Guj CET] P1 P2 (a) (c) P1 + P2 (d) P1 P2 (b) P1 P2 P1 + P2 37 A heater coil working on mains produces 100 cal of heat in a certain time. Now, the heater coil is cut into three equal parts and one part is only used for heating. The quantity of heat produced (in calories) in the same time is [EAMCET] (a) 300 (b) 200 (c) 100/3 (d) 200/3
2007 38 The total power dissipated (in watts) in the circuit shown here is [CBSE PMT] (a) 16 (b) 40 (c) 54 (d) 4
6Ω 3Ω
4Ω
18 V
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CURRENT ELECTRICITY
39 The power dissipated across resistance R which is connected across a battery of potential V is P. If the resistance is doubled, then the power decreases by a factor 1 1 [UP CPMT] (a) (b) 2 (c) (d) 4 2 4 40 A battery is charged at a potential of 15 V for 8 H when the current flowing is 10 A. The battery on discharge supplies a current of 5 A for 15 H. The mean terminal voltage during discharge is 14 V. The ‘watt-hour’ efficiency of the battery is [Manipal] (a) 82.5% (b) 80% (c) 90% (d) 87.5%
47 If two identical heaters each rated as 1000 W , 220 V are connected in parallel to 220 V, then the total power consumed is [AMU] (a) 200 W (b) 2500 W (c) 250 W (d) 2000 W
2005 48 For ensuring dissipation of same energy in all three resistors ( R1 , R 2 , R 3 ) connected as shown in figure, their values must be related as [AIIMS] R1
R2
V
41 When three identical bulbs of 60 W, 200 V rating are connected in series to a 200 V supply, the power drawn by them will be [Manipal] (a) 60 W (b) 180 W (c) 10 W (d) 20 W
R3
(a) R1 = R 2 = R 3
(b) R 2 = R 3 and R1 = 4R 2 R2 (c) R 2 = R 3 and R1 = (d) R1 = R 2 + R 3 4 49 A hot electric iron has a resistance of 80 W and is used on a 200 V source. The electrical energy spent, if it is used for 2 h will be [RPMT] (a) 8000 W-h (b) 2000 W-h (c) 1000 W-h (d) 800 W-h
42 A 5 A fuse wire can withstand a maximum power of 1 W in circuit. The resistance of the fuse wire is [MP PMT] (a) 0.2 W (b) 5 W (c) 0.4 W (d) 0.04 W 43 Two bulbs 100 W, 250 V and 200 W, 250 V are connected in parallel across a 500 V line. Then, [AMU] (a) 100 W bulb will be fused (b) 200 W bulb will be fused (c) both bulbs will be fused (d) no bulb will be fused
50 A resistor R has power dissipation P with cell voltage E. The resistor is cut in n equal parts and all parts are connected in parallel with same cell. The new power dissipation is [Haryana PMT] (d) n / P (c) n 2 P (a) nP (b) nP 2
44 A 2 kW boiler used for 1 h/day consumes the following electrical energy in thirty days [AMU] (a) 60 units (b) 120 units (c) 15 units (d) 6 ´ 104 units
51 Two wires have resistances R and 2 R. When both are joining in series and in parallel, then ratio of heats generated in these situations on applying the same voltage is [Punjab PMET] (a) 2 : 1 (b) 1 : 2 (c) 2 : 9 (d) 9 : 2
2006 45 One filament takes 10 min to heat a kettle and another takes 15 min. If connected in parallel, they combinedly take … min to heat the same kettle. [RPMT] (a) 6 (b) 12.5 (c) 25 (d) 7.5
52 If percentage change in current through a resistor is 1%, then the change in power through it would be [DUMET] (a) 1% (b) 2% (c) 1.7% (d) 0.5% 53 Three identical bulbs are connected in series and these together dissipate a power P. If the bulbs are connected in parallel, then the power dissipated will be [DUMET] (a) P/3 (b) 3P (c) 9P (d) P/9
46 If the electric current in a lamp decreases by 5%, then the power output decreases by [Guj CET] (a) 2.5% (b) 10% (c) 5% (d) 20%
Answers 1 11 21 31 41 51
(a) (c) (a) (c) (d) (c)
2 12 22 32 42 52
(c) (b) (a) (d) (d) (b)
3 13 23 33 43 53
(a) (d) (c) (b) (c) (c)
4 14 24 34 44
(a) (b) (b) (a) (a)
5 15 25 35 45
(c) (a) (d) (b) (a)
6 16 26 36 46
(b) (d) (a) (a) (b)
7 17 27 37 47
(c) (d) (c) (a) (d)
8 18 28 38 48
(d) (b) (b) (c) (c)
9 19 29 39 49
(d) (c) (b) (a) (c)
10 20 30 40 50
(c) (c) (c) (d) (c)
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (a) Case I When all bulbs are glowing, then the circuit can be realised as shown in the figure below. A R
B R
R
R
R
R
\The equivalent resistance of this circuit is Req = RA + RB As, section A has three parallel resistance, so equivalent resistance, R RA = 3 Similarly, for section B, equivalent R resistance, RB = 3 R R 2R … (i) Req = + = \ 3 3 3 Thus, power consumed in this circuit, V 2 E 2 3E 2 P1 = = = R Req 2R [using Eq. (i)] …(ii) Case II When two from section A and one from section B glow, the circuit can be realised as shown in the figure below. B R
R
V 2 E 2 2E 2 = = R Req 3R
[using Eq. (iii)]… (iv) So, ratio of power of two cases is obtained from Eqs. (ii) and (iv), we get P1 3E 2 3R 9 = ´ = or 9 : 4 P2 2R 2E 2 4
2 (c) Among given devices fuse is used in
E
A R
P2 =
E
\Equivalent resistance of section A, R RA = 2 and of section B, RB = R Thus, equivalent resistance of the entire circuit becomes 3R R … (iii) Req = RA + RB = + R = 2 2 \Power consumed by this circuit,
electric circuit as a protective device. It helps in preventing excessive amount of current to flow in the circuit or from short circuiting. It has low melting point and low resistivity, so when excess amount of current flows in the circuit, it melts and break the circuit.
4 (a) Switching results in high decay/growth rate of current which results in a high current when bulb is turned ON or OFF (due to back emf). So, a bulb is must likely to get fused when it is just turned ON or OFF.
5 (c) Let R be the resistance of the wire V 2t . R (ii) Resistance of each part will be R / 2. When they are connected in parallel, the resistance will be R/4. Hence, H 2 = 4V 2t / R. (i) The heat generated is H 1 =
(iii) In case of four wires connected in parallel, the resistance will be R / 8. \
3 (a) Power rating of heater, P = 1000 W Voltage rating of heater, V = 100 V +
V″
–
+
Heater V′ –
10Ω
R
100 V
\Resistance of heater, V 2 (100)2 R1 = = = 10 W P 1000 According to question, power dissipated in heater, P¢ = 62. 5 W \Voltage (V ¢ ) across heater can be calculated as (V ¢ )2 P¢ = Þ (V ¢ )2 R1 = P ¢ ´ R1 = 62. 5 ´ 10 Þ V ¢= 25 V (across heater) \ Voltage across 10W resistor, V ¢¢ = 100 - 25 = 75V Current in 10W resistor V ¢¢ 75 = = = 7.5 A 10 10 Current in heater resistor V ¢ 25 = = = 2. 5 A 10 10 So, current in R W = 7.5 - 2.5 = 5A Now, V = IR 25 =5W Þ R =V /I = 5
(iv) H 4 =
H3 =
8V 2t R
V 2t 2V 2 × t = R/2 R
Hence, largest amount of heat will be generated in case of four parts connected in parallel.
6 (b) As each arc containing n lamps, hence resistance of each arc = nr, number of arcs = N / n Total resistance S is given by 1 1 N æ 1ö =S = ç ÷ S nr n è nr ø S =
n2r N
n2r N If E is the emf of the machine, current entering the arcs is E / (R + S ) and in each arc is nE / (R + S )N . Hence, current passing through each lamp, nE I = N (R + n2r / N )
\ Total resistance = R + S = R +
-1
E é R nr ù + N êë n N úû Now, heat produced per second to the lamps is H = N r I 2 =
Since, light emitted is proportional to H 2, therefore light produced is maximum when H 2 and hence H is é R nr ù maximum or ê + ú is minimum. ën Nû
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CURRENT ELECTRICITY
Solving above equation, we get
Hence, we can write, 1/ 2 1/ 2 R nr é æ R ö æ nr ö ù + = êç ÷ - ç ÷ ú èN ø ú n N êë è n ø û
This is minimum, when
2
H =
æ Rr ö + 2ç ÷ èN ø
1/ 2
R nr =0 n N or very small or n is closely equal to (NR / r)1/ 2.
7 (c) If a rated voltage and power are given, then Prated
V2 = rated R
P (Q P = Vi ) V 500 i= =5A 100
\ Current in the bulb, i =
\ Resistance of bulb, 100 ´ 100 Rb = = 20 W 500 Q Resistance R is connected in series. 230 E \Current, i = = Rnet R + Rb 230 = 46 Þ R + 20 = 5 \ R = 26 W
8 (d) Given, charge,
Þ a - 2bt = 0 a …(iii) \ t= 2b Q The total heat produced (H ) can be given as t
H = ò I 2R dt 0
=ò
a / 2b
0
=ò
a / 2b
0
aü ì (a - 2bt )2 R × dt íQ t = ý 2bþ î (a2 + 4 b2t 2 - 4 abt ) Rdt
V2 R For small variation in the value of power, DP 2 ´ DV ´ 100% = ´ 2 ´ 2.5 = 5% P V Therefore, power would decrease by 5%.
R
R1 =
R2 =
Current through series combination, 440 2 I = = A 2420 11 \ Potential difference across 100 W bulb, 2 V2 = R2 ´ I = 484 ´ = 88 V 11
102 102 = 30 R 5 100 = 30 - 20 Þ R = 10 W R
12 (b) The power dissipated in resistor of P= Þ Þ
V2 V2 Þ 36 = R R V 2 = 36 R V = 36 ´ 9
Þ V = 6 ´ 3 = 18 V \ Total current through circuit is æ 9 ´ 6ö V = I Req Þ 18 = I ç ÷ è 9 + 6ø é 18 ù Þ 18 = I ê ú Þ I = 5A ë 5û Potential across 2 W is V = IR Þ
V = 5 (2) = 10 V total emf total resistance E I = R+r
13 (d) As, I = Þ
V 2 (220)2 = = 484 W P2 100
Series resistance, R = R1 + R2 = 2420 W
V2 V2 =PR2 R1
9 W is
V 2 (220)2 = = 1936 W P1 25
Resistance of 100 W bulb,
Given, R1 = 5 W and power, P = 30W In parallel combination, V2 V2 Power, P = + R1 R2
or
E 2R (R - r)2 + 4 R r
14 (b) Resistance of 25 W bulb,
11 (c) Here, R2 = R
Þ
E2 R (R + r)2
For power output to be maximum, dP =0 dR which gives R - r = 0 Þ R=r 2 Er E2 Pmax = = \ 2 4r (r + r)
10 (c) As power, P =
a / 2b
é t 3 4 abt 2 ù H = ê a2t + 4 b2 ú 3 2 û0 ë
=
large current flows through it. Hence, it should have a very high resistance, so that very large amount of heat is produced due to which the fuse wire could melt and break the connectivity of circuit from main supply.
…(i)
Q We know that, dQ Current, I = dt So, Eq. (i) can be written as d I = (at - bt 2 ) dt …(ii) Þ I = a - 2bt For maximum value of t, till the current exist is given by
a3R 6b
9 (d) A fuse wire should melt when a
Þ
Q = at - bt 2
P = I 2R =
15
and across 25 W bulb is V1 = R1 ´ I 2 = 1936 ´ = 352V 11 Thus, the bulb of 25 W will be fused because it can tolerate only 220 V, while the voltage across it is 352 V. R P 100 5 (a) As 1 = 2 = = . R2 P1 40 2 5 Resistance of 40 W bulb is times than 2 100 W. In series, P = i 2R and in parallel, V2 . So, 40 W in series and 100 W in P= R parallel will glow brighter.
16 (d) Let L be the latent heat of vaporisation of water, the heat required for producing 1 g of steam, L = 540 cal = 540 ´ 4.2 = 2268 J Energy supplied = 1080 Js-1 Time required to boil 100 g of water = 540 ´ 4.2 ´ 100 / 1080 = 210 s
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
17 (d) Let the resistance of the lamp
filament be R, then 100 = (200)2/R. When the voltage drops, expected power is P = (220 ´ 0.9)2 / R ¢
Here, R¢ will be less than R, because with the rise in temperature resistance will be decrease. Therefore, P is more than (220 ´ 0.9)2 / R = 81 W. But it will not be 90% of earlier value, because fall in temperature is small.
18 (b) Current required by each bulb, P 100 = A V 220 If n bulbs are joined in parallel, then ni = ifuse 100 or n ´ = 10 or n = 22 220 i=
19 (c) As, P =
V2 V2 ÞR= Þ R µV 2 R P (at constant power) 2
i.e.
4 R1 é 200 ù = = 9 R2 êë 300 úû
When connected in series, potential drop and power consumed are in the ratio of the their resistances. P1 V1 R1 4 So, = = = P2 V2 R2 9
20 (c) When key K is opened, bulb B3 will not draw any current from the source, so that terminal voltage of source increases. Hence, power consumed by bulb B2 increases, so light of the bulb B2 becomes more. The brightness of bulb B1 decreases.
21 (a) When connected in series, power dissipated is PP 100 ´ 60 PS = 1 2 = P1 + P2 100 + 60 6000 = = 37.5 W 160
22 (a) Resistance of 40 W bulb 240 ´ 240 = 1440 W 40 240 Its safe current = = 0.167 A 1440 Resistance of 60 W bulb 240 ´ 240 = = 960 W 60 240 Its safe current = = 0.25 A 960 =
When connected in series to 420 V supply, then the current 420 i= 1440 + 960 420 = = 0.175 A 2400 Voltagte across 40 W bulb, V40 = 0175 . ´ 1440 = 252V Voltage across 60 W bulb, V60 = 0175 . ´ 960 = 168 V Thus, 40 W bulb will work at above its rated voltage.
23 (c) Resistance of each bulb, V 2 (100)2 R= = = 200 W P 50 200 ´ 200 In parallel, R¢= = 100W 400 Power of circuit at 120 V, (120)2 P¢ = = 144 W 100 144 Number of bulbs = = 2.88, 50 i.e. n=2
24 (b) Let time taken by coil 1 be t1 and time taken by coil 2 be t2. When both coil are connected in series, then total time = t1 + t2 Hence, t = 10 + 10 = 20 min [Q H = I 2Rt]
25 (d) Resistance of the lamp, V 2 30 ´ 30 = = 10 W P 90 Current through the lamp, V 30 I = = = 3A R 10 For same power dissipation, current through lamp should be same. When lamp is connected to the 120 V supply, safe resistance of circuit should be V ¢ 120 R¢ = = = 40 W I 3 R=
Resistance required to be connected in series = R ¢ - R = 40 - 10 = 30 W
26 (a) Equivalent resistance, r r + 2R +R= 2 2 2E I = r + 2R
Req = \
For maximum power consumption, I should be maximum, so denominator is minimum.
For this r + 2R = ( r - 2R )2 + 2 r 2R Þ Þ
r - 2R = 0 r R= 2
27 (c) As, P ¢ = 200 + 200 = 400 W 1 1 1 = + Pnet P ¢ P 1 1 2 = + = 400 400 400 Þ Pnet = 200 W Þ
Vs2 R where, Ps and Vs are specified power. 220 ´ 220 (for 100 W bulb) Þ R1 = 100 220 ´ 220 (for 60 W bulb) and R2 = 60 ~ 1291 W Req = R1 + R2 -
28 (b) As, Ps =
Now, power consumed, V 2 220 ´ 220 = = = 37.5 W Req 1291 Current through circuit, V 220 I = = = 017 . A Req 1291 Power of 100 W, V 2 I ¢2R 2 ~ 14 W P100 = = = I 2R R R
29 (b) As, P = VI 160 8 = A 60 3 q ne Also, I = = t t It 8 ´ 60 = 1021 n= = Þ e 3 ´ 1.6 ´ 10-19 Þ
I =
30 (c) As, power is given as V2 . R Also, R = Sl / A V 2A P= \ Sl Two electric bulb made of same material, same length and also same voltage is applied. PµA Hence, bulb produce more power when wire would be thicker. i.e. 60 W bulb has thicker filament. P=
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CURRENT ELECTRICITY
31 (c) When the bulb is turned ON, the voltage is applied across a filament which is initially cold, when it is turned ON. Then, the resistance is also low, thus the current flow will be high. Due to this, a large amount of power will be delivered and the glow of the filament would be more. But after sometime of switching ON, the temperature of the filament increases, thereby increasing its resistance. Hence, less amount of current will flow, leading to less power delivered and the glow of the filament would be lesser as compared to before.
32 (d) Voltage across 2 W resistance, V = 2 ´ 3 = 6V So, voltage across lowest arm, V1 = 6 V Current across 5 W is I =
6 =1A 1+ 5
Thus, power across 5 W, P = I 2R = (1)2 ´ 5 = 5W
33 (b) The electric power of a heater is more than that of a bulb. 1 As P µ , the resistance of heater is R less than that of the electric bulb. When a heater connected in parallel to the bulb is switched ON, it draws more current due to its lesser resistance. Consequently, the current through the bulb decreases, so it becomes dim. When the heater coil becomes sufficiently hot, its resistance becomes more and then it draws a little lesser current. Consequently, the current through the electric bulb recovers. Hence, dimness of the bulb decreases.
34 (a) If I is the safe current through the fuse wire and h is the rate of loss of heat in steady state, then I 2R = hA æ rL ö Þ I 2 ç 2 ÷ = h ´ 2prL è pr ø Þ
35 (b) Given,
I µ r3/ 2 A1 1 = A2 2
i1 = i2 = i, l1 = l2 = l and r1 = r2 = r We know that, heat produced, H = i 2Rt
and heat produced per second, rl ù é H = i 2R ´ 1 ê but, R = ú Aû ë l H = i 2r ´ 1 Þ A rli 2 A So, the ratio of heat produced per second in both the wires æA ö H 1 æ r 1 ö æ l1 ö æ i12 ö = ç ÷ç ÷ç 2÷ ´ ç 2÷ è A1 ø H 2 è r 2 ø è l2 ø è i2 ø Þ
H =
On putting the values, we get H 1 r l i2 2 2 = ´ ´ ´ = H 2 r l i2 1 1 \ H1 : H2 = 2 :1
36 (a) Let R1 and R2 be the resistances of the bulbs. V2 R So, the power consumed in first bulb is V2 …(i) P1 = R1
Power consumed, P =
and power consumed in second bulb is V2 …(ii) P2 = R2 If these two bulbs are combined in series, so the total resistance of the combination is R = R1 + R2 Hence, the power consumed in combination is V2 …(iii) P= (R1 + R2 ) Now, from Eqs. (i) and (ii), R R 1 1 R +R + = 1 + 2 = 1 2 2 P1 P2 V 2 V 2 V 1 1 1 + = Þ P1 P2 V 2 / R1 + R2 From Eq. (iii), we get 1 1 1 + = P1 P2 P PP P + P1 1 Þ 2 = Þ P= 1 2 P1 + P2 P1P2 P
37 (a) Heat, H =
V2 R
For the same potential difference, the heat produced per second, 1 H µ R
One part of the heater coil has a resistance R/3. H R R Hence, 2 = 1 = H 1 R2 R / 3 H 2 3R = Þ 100 R Þ H 2 = 3 ´ 100 = 300 cal
38 (c) The resistances of 6 W and 3 W are in parallel in the given circuit, their equivalent resistance is 1 1 1 1+ 2 1 = + = = R1 6 3 6 2 or
R1 = 2 W Again, R1 is in series with 4 W resistance, hence R = R1 + 4 = 2 + 4 = 6 W Thus, the total power dissipated in the circuit, V2 P= R Given, V = 18 V and R = 6 W (18)2 Þ P= = 54 W 6
39 (a) The rate of dissipation of electric energy is called electric power. W = V it The electric power dissipated will is given by W Vit V2 …(i) P= = = Vi = R t t When resistance is doubled, then let electric power be P¢. V2 …(ii) P¢ = \ 2R From Eqs. (i) and (ii), we get, 1 P¢ = P 2 1 So, power becomes of initial value. 2
40 (d) Input energy when the battery is charged = Vit = 15 ´ 10 ´ 8 = 1200 Wh Energy released when the battery is discharged = 14 ´ 5 ´ 15 = 1050 Wh Hence, efficiency of battery energy output 1050 = = energy input 1200 = 0.875 = 87.5%
41 (d) Let R1 , R2 and R3 be the resistances of three bulbs, respectively. In series order, R = R1 + R2 + R3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
V2 and supply voltage in P series order is the same as the rated voltage. V2 V2 V2 V2 = + + \ P P1 P2 P3 1 1 1 1 or = + + P 60 60 60 60 P= = 20 W Þ 3 P 42 (d) As, power, P = i 2R Þ R = 2 i Given, P = 1W and i = 5A 1 \ R= = 0.04 W (5)2 But R =
43 (c) In parallel order, potential difference across each bulb is same and is equal to applied voltage of 500 V which is more than permissible voltage. So, both bulbs will get fused.
44 (a) Number of units P (in watt) ´ t (in hour) 1000 Þ Number of units 2 ´ 103 ´ 1 ´ 30 = = 60 units 1000 (a) For first filament, V2 H = t1 R1 =
45
Þ
R1 =
V2 t1 H
Þ
R2 =
…(i)
DP Di = 2 = 2 ´ 5% P i
é Di ù êëQ i = 5%úû
= 10% decrease
47 (d) When a single heater (resistance R1 = R ) is connected to 220 V, then it will consume a power, P1 = 1000 W, if two such identical heaters are connected in parallel (total resistance R2 = R1 / 2 = R / 2) to same source, then it will consume power P2. P2 R1 Now, = P1 R2 Þ
P2 = 2P1 = 2000 W
48 (c) The voltage across R2 and R3 is same. Therefore, for same energy loss V2 according to H = t , R2 must be R equal to R3. i.e. R2 = R3 Again, the energy is same in all resistances. …(i) \ i 2R1t = i12R2t R3 R3 1 and i1 = i= i= i R2 + R3 R3 + R3 2
\
2
…(ii) [Q R2 = R3 ]
i R2t 4 [from Eqs. (i) and (ii)] R2 R1 = 4
49 (c) The relation of power is given by
V2 t2 R2 V2 t2 H
or
Thus, i 2R1t =
For second filament, H =
46 (b) Power of lamp, P = i 2R
P= …(ii) 2
V When placed in parallel, H = tP RP 2 V …(iii) RP = tP Þ H From Eqs. (i), (ii) and (iii), we get 1 1 1 = + RP R1 R2 H H H = + Þ V 2tP V 2t1 V 2t2 1 1 1 Þ = + Þ tP = 6 min tP 10 15
V 2 (200)2 = = 500 W R 80
Hence, energy spent = power ´ time = 500 ´ 2 = 1000 W-h
50 (c) The resistance of each part = R / n The effective resistance becomes R / n2. Since, the battery voltage is constant. 1 So, Pµ R P¢ R Þ = P R / n2 Þ
P ¢ = n2P.
51 (c) In series combination, Rs = R + 2R = 3R In parallel combination, R ´ 2R 2R 2 2 Rp = = R = R + 2R 3R 3 Ratio of heats produced, 2 R 2 H s Rp 3 = = = H p Rs 3R 9 Þ Hs : Hp = 2 : 9
52 (b) Maximum percentage error arises due to limit of accuracy of the measured value. By Joule’s law of heating, the power change due to current (i ), through resistor (R) is given by P = i 2R Taking partial differentiation, we have DP Di DR ´ 100 = 2 ´ 100 + ´ 100 P i R DP ´ 100 = 2 ´ 1% = 2% \ P Di DR (given, = 1 and = 0) i R
53 (c) By Joule’s law, the power dissipated through a resistor R, having a potential difference V is V2 P= R¢ When bulbs are connected in series, then R ¢ = R + R + R = 3R Power dissipated, V2 …(i) P= 3R When they are connected in parallel, then 1 1 1 1 3 = + + = R ¢¢ R R R R R R ¢¢ = Þ 3 Power dissipated, V2 P¢ = R/3 From Eqs. (i) and (ii), we have P ¢ = 9P
…(ii)
18 Moving Charges and Magnetism Quick Review • If point P lies symmetrically on the
Magnetic Field The space in the surrounding of a magnet or a current carrying conductor in which its magnetic influence can be experienced is called magnetic field. SI unit of magnetic field is tesla (T) and its CGS unit is gauss (G). Also, 1 T = 104 G • The direction of magnetic field is found by following rules (i) Right hand thumb rule (ii) Maxwell’s cork screw rule
(ii) Magnetic Field due to a Current Carrying Circular Loop
Biot-Savart’s Law According to Biot-Savart’s law, the magnetic field dB at a point P due to a current element Id l is given by µ I (d l × r ) dB = 0 ⋅ 4π r3 µ where, 0 is a proportionality constant having a value of 4π −7 10 TmA −1 in free space.
Applications of Biot-Savart’s Law (i) Magnetic Field due to a Current Carrying Conductor • The magnetic field due to a current
carrying wire of finite length at a point P situated at a normal distance r is µ I B = 0 (sin φ1 + sin φ 2 ) 4 πr
perpendicular bisector of wire XY , then φ 1 = φ 2 = φ (say) and hence µ I sin φ µ I B = 0 ⋅ 2sin φ = 0 2πr 4 πr • For a wire of infinite length, φ 1 = φ 2 = 90° and hence µ I B= 0 2πr
r
number of turns N, carrying a current I through the turns, then the magnetic field at the centre of coil is given by µ NI B= 0 2R • If there is a circular arc of wire subtending an angle θ at the centre of arc, then the magnetic field at the central point is µ I θ B= 0 2R 2π • At a point, situated at a distance r from the
X I
• If there is a circular coil of radius R and
φ2 φ1
× P
centre of a current carrying circular coil along its axial line, the magnetic field is given by B=
Y
µ 0 NIR 2 2( R 2 + r 2 ) 3/ 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
• Inside the Solid Cylinder (r < R) Current i ′ enclosed by
Ampere’s Circuital Law
Amperian loop is lesser than the total current (i).
According to Ampere’s circuital law, the line integral of the magnetic field B around any closed path is equal to µ 0 times, the net current I threading through the area enclosed by the closed path. Mathematically,
R
r Amperian loop
∫ B ⋅ dI = µ 0 ΣI
Applications of Ampere’s Circuital Law
i
P
P
Current density is uniform, i.e. J = J ′ r2 A′ ⇒ i′ = i × = i 2 A R
(i) Magnetic Field due to a Straight Current Carrying Wire at different Positions µ0 i (sin α + sin β ) 4π r where, α and β = angle made by two ends of wire. • At a point of perpendicular bisector, i.e. α = β = θ, then µ i B = 0 ( 2sin θ ) 4π r • When wire is of infinite length, i.e. α = β = 90°, then µ 2i B= 0 4π r • At any perpendicular distance, B =
Hence, at inside point ∫ Bin ⋅ d l = µ 0 i′ ⇒ Bin =
enclosed by the Amperian loop of radius r is given by ( r 2 − R12 ) A′ i′ = i × = i× 2 A ( R 2 − R12 ) P P
R2
r
R1
outside at point P. Now, we will assume Amperian loops as shown below r
R
i
⇒
R2
i
(a) Solid cylinder R1
• The variation in magnetic field due to infinite long solid
cylindrical conductor along its radius is as shown in figure.
R
r
R2
B
i
B max
(c) Thick hollow cylinder
In all the above cases, magnetic field outside the wire at P, µ 0i ∫ B ⋅ d l = B ( 2πr ) = µ 0 i ⇒ B out = 2πr µ i In all the above cases, B surface = 0 2πR Inside the Hollow Cylinder (r < R) Magnetic field • inside the hollow cylinder is zero because no current is enclosed by Amperian loops as shown below
O r=0
i
Amperian loop (a) Thin hollow cylinder
× i
r ∝ B rR
Note That inside the wire B → 0 as r → 0. Also, the magnetic field is continuous at the surface of the wire.
• The variation in magnetic field due to infinite long hollow
cylindrical conductor along its radius is as shown in figure. B Bmax
B≠0
B=0
µ 0 i ( r 2 − R12 ) ⋅ 2πr ( R 22 − R12 )
Variation in Magnetic Field with Radius
(b) Thin hollow cylinder
P
Bin =
r
R
r
Hence, at point P, ∫ B ⋅ dl = µ 0 i′
P
i
Loop
R1
• Outside the Cylinder (r > R) To find magnetic field
Amperian loop
µ 0 ir ⋅ 2π R 2
• Inside the Thick Portion of Hollow Cylinder Current
(ii) Magnetic Field due to a Cylindrical Wire
P
Amperian loop
r
B=0
B∝
B=0
Amperian loop (b) Thick hollow cylinder
+
rR
1 r
r
533
MOVING CHARGES AND MAGNETISM
(iii) Magnetic Field due to a Solenoid (a) Finite Length Solenoid If N = total α β number of turns, l = r length of the solenoid P and n = number of turns per unit length = N / l, then Magnetic field inside the solenoid at point P is given by µ ni B = 0 [sin α + sin β ] 2 (b) Infinite Length Solenoid If the solenoid is of infinite length and the point is well inside it. i.e. α = β = (π/2). So, Bin = µ 0 ni If the solenoid is of infinite length and the point is near one end, i.e. α = 0 and β = ( π / 2), so 1 1 B end = (µ 0 ni ) Q B end = B in 2 2 (c) Variation in magnetic field with distance d from its centre
End of solenoid
Force on a Moving Charge in a Uniform Magnetic Field • The magnetic force Fm acting on a charge q moving with
a velocity v in a magnetic field B is given by Fm = q ( v × B ) The direction of force Fm is given by the rule of vector product. • The force Fm is maximum having a value Fm = qvB when θ = 90°, i.e. charged particle is moving in a direction perpendicular to that of magnetic field. • Depending on the value of θ between v and B, the particle describes following paths as tabulated below Value of θ 0° or 180° 90° Any angle (other than 0°, 90° or 180°)
Time Type Radius Period (r ) of Path (T ) straight line mv 2 πm circular qB qB helical mv sin θ 2 πm qB qB
Frequency (ν) qB 2 πm qB 2 πm
Angular Frequency (ω )
Pitch (P )
qB m
v cosθ ⋅ T
B
Lorentz Force : Motion of a Charged Particle is
B/2
Combined Electric and Magnetic Field
d
If electric field E and magnetic field B are existing at a point, then force on the electric charge q is given by
End of solenoid
F = q [ E + v × B] = Felectric + Fmagnetic
(iv) Magnetic Field due to a Toroid A toroid can be considered as a ring shaped closed solenoid. Hence, it is like an endless cylindrical solenoid.
This force was first given by H. A Lorentz, hence it is called Lorentz force. Here, magnetic force Fm = q( v × B ) = qvB sin θ and electric force Fe = qE.
Winding Core
r
P
O i
Consider a toroid having n turns per unit length. Magnetic field at a point P in the figure is given as µ Ni B = 0 = µ 0 ni 2πr N . where, n = 2πr
(v) Magnetic Field due to an Infinitely Large Carrying Current Sheet Using Ampere’s law, the magnetic field due to a current µ J carrying sheet of infinite length is given by B = 0 . 2 where, J = current density of sheet.
The direction of magnetic force is same as v × B, if charge is positive and opposite to v × B, if charge q is negative.
Cyclotron • It is a device used to accelerate positively charged
particles (like, α-particle, deuterons, etc.) to acquire enough energy to carry out nuclear activities. Bq . • The cyclotron frequency is given by ν = 2πm • The positive ions of charge q and mass m in cyclotron attain maximum energy which is given by 1 B 2q2R 2 (i) E max = ⋅ 2 m where, R is the radius of the dees of the cyclotron. (ii) E max = 2n (V z ) where, n is the number of revolutions completed by the positive ions before leaving the dees.
534
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Force on a Current Carrying Conductor in a Magnetic Field
Moving Coil Galvanometer
• If a current carrying conductor is placed in a magnetic
field, the force experienced by it is given by F = ∫ i( dl × B ).
• This device is used to measure current upto nano ampere. • When coil is in equilibrium, then the current through it is
i = Gα
• In case of a straight conductor, it is given by F = Bil sin θ
Torsion head
• In case of a closed loop, it is given by F = 0
Phosphor bronze strip Concave mirror
• Its direction is given by Fleming’s left hand rule or
Fleming’s right hand thumb rule.
Coil Soft iron core
Force between Two Parallel Current Carrying Conductor If two infinitely long parallel conductors carrying the currents I 1 and I 2 respectively and are separated by a distance r, then magnetic force experienced by length l of any one conductor due to the other current carrying conductor is
1
A 2
i1
T2
F
S
N B
i2
D
C
T1
Hair spring Levelling screw
dl
r
µ 0 2I 1 I 2 ⋅ l r 4π µ 2I I F and force per unit length, = F0 = 0 ⋅ 1 2 l 4π r • The direction of force depends on the direction of current in them as (i) attractive, if current flow in same direction. (ii) repulsive, if current flow in opposite direction. F=
Current Carrying Coil • A current carrying coil is like a bar magnet having
magnetic moment M = NiA , where A = area of coil. • Magnetic moment for a revolving electron, evr . M = IA = 2 • Torque on a current carrying loop in a magnetic field, τ = NBiA sin θ • In vector form, it is represented as τ = M× B
k = galvanometer constant NBA and α = angle of twist due to rotation. • Current sensitivity is the deflection per unit current, i.e. θ NAB Is = = I k Its unit is rad/A or div/A. • Voltage sensitivity is the deflection per unit voltage, i.e. θ NBA Vs = = V Rk Its unit is rad/V or div/V. • It can be converted to an ammeter by connecting a low resistance in parallel or shunt to it, whose value is given by Ig G S = I − Ig where, G =
• It can be converted to a voltmeter by connecting a high
resistance in series, to it, whose value is given by V R = − G Ig
Topical Practice Questions All the exam questions of this chapter have been divided into 4 topics as listed below Topic 1
—
BIOT-SAVART’S LAW AND AMPERE’S CIRCUITAL LAW
535–546
Topic 2
—
MOTION OF A CHARGED PARTICLE IN A MAGNETIC FIELD
547–557
Topic 3
—
FORCE AND TORQUE ON A CURRENT CARRYING CONDUCTOR
558–566
Topic 4
—
MOVING COIL GALVANOMETER
567–572
535
MOVING CHARGES AND MAGNETISM
Topic 1 Biot-Savart’s Law and Ampere’s Circuital Law 2019 1 A cylindrical conductor of radius R is carrying a constant current. The plot of the magnitude of the magnetic field B with the distance d from the centre of the conductor, is correctly represented by the figure [NEET] B
B
(a)
(b) R
B
d
R
d
R
d
B
(c)
(d) R
d
2 Two toroids 1 and 2 have total number of turns 200 and 100 respectively, with average radii 40 cm and 20 cm respectively. If they carry same current i, the ratio of the magnetic fields along the two loops is [NEET (Odisha)] (a) 1 : 1 (b) 4 : 1 (c) 2 : 1 (d) 1 : 2 3 A straight conductor carrying current i splits into two parts as shown in the figure. The radius of the circular loop is R. The total magnetic field at the centre [NEET (Odisha)] P of the loop is (a) zero (b) 3 µ 0 i / 32 R, outward (c) 3 µ 0 i /32R, inward µ i (d) 0 , inward 2R
i1
90º
(a)
5
T
(b)
28µ 0 5
T (c)
a current i as shown in figure. The magnetic induction at the centre O due to entire wire is [JIPMER]
P
i
i2
(a) i
(c)
56 µ 0 5
T (d)
b l
µ 0i 4r µ 0i 4r 2
r o
i d
i
e l
(b)
µ 0i2 4r
(d) None of these
8 In the given figure, what is the magnetic field induction at point O? [JIPMER] µ 0I µ 0I µ 0I (b) (a) + 4 πr 4r 2πr µ 0I µ 0I µ 0I µ 0I (c) (d) + − 4r 4 πr 4r 4 πr
E
r
O
2016 9 A long straight wire of radius a carries a steady current
10 cm
5 cm
I
c
10 cm
50µ 0
45°
R
2017 7 A long wire having a semicircular loop of radius r carries
a
i
P
current I is bent at its mid-point to form an angle of 45°. Induction of magnetic field (in tesla) at point P, distant R from point of bending is equal to [AIIMS] ( 2 − 1) µ 0 I ( 2 + 1) µ 0 I (b) (a) 4 πR 4 πR ( 2 − 1) µ 0 I ( 2 + 1) µ 0 I (d) (c) 4 2πR 4 2πR $ 6 An element dl = dx i (where, dx = 1cm) is placed at the origin and carries a large current i = 10 A. What is the magnetic field on the Y -axis at a distance of 0.5 m? $ $ (a) 2 × 10−8 kT (b) 4 × 10−8 kT [AIIMS] −8 $ −8 $ (c) − 2 × 10 kT (d) − 4 × 10 kT
R
4 Two circular loops having same radius (R = 10 cm) and 7 same current A are placed along same axis as shown in 2 the figure. If distance between their centres is 10 cm, find the value of net magnetic field at point P. [AIIMS]
P
2018 5 A long straight wire, carrying
56µ 0 3
T
I. The current is uniformly distributed over its cross-section. The ratio of the magnetic fields B and B′ at radial distances a/ 2 and 2a respectively, from the axis of the wire is [NEET] 1 1 (b) 1 (c) 4 (d) (a) 2 4
536
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
10 A long wire carrying a steady current is bent into a circular loop of one turn. The magnetic field at the centre of the loop is B. It is then bent into a circular coil of n turns. The magnetic field at the centre of this coil of n turns will be [NEET] (c) 2nB (d) 2n 2 B (a) nB (b) n 2 B 2015 11 A wire carrying current I has Z the shape as shown in adjoining I figure. Linear parts of the wire R are very long and parallel to Y O X -axis while semicircular I I portion of radius R is lying in yz-plane. Magnetic field at X point O is [NEET] µ I µ I (a) B = 0 ⋅ ( πi$ + 2 k$ ) (b) B = − 0 ⋅ ( πi$ − 2 k$ ) 4π R 4π R µ0 I $ µ I 0 (c) B = − ⋅ ( πi + 2 k$ ) (d) B = ⋅ ( πi$ − 2 k$ ) 4π R 4π R 12 An electron moving in a circular orbit of radius r makes n rotations per second. The magnetic field produced at the centre has magnitude [NEET] µ 0 ne µ 0n2e µ 0 ne (d) (a) (b) zero (c) r 2π r 2r 2014 13 Two identical long conducting wires AOB and COD are placed at right angle to each other, with one above other such that O is their common point for the two. The wires carry I 1 and I 2 currents, respectively. Point P is lying at distance d from O along a direction perpendicular to the plane containing the wires. The magnetic field at the point [CBSE AIPMT] P will be µ 0 I2 µ0 (b) (a) (I1 + I 2 ) 2πd I 2 2πd µ µ (c) 0 ( I 12 − I 22 ) (d) 0 ( I 12 + I 22 )1/ 2 2πd 2πd 14 A toroid having 200 turns carries a current of 1A. The average radius of the toroid is 10 cm. The magnetic field at any point in the open space inside the toroid is [Kerala CEE] (a) 4 × 10−3 T (b) zero −3 −3 (c) 0.5 × 10 T (d) 3 × 10 T (e) 2 × 10−3 T P 15 A long conducting wire carrying a current I is bent at 120o (see d figure). The magnetic field B at a I point P on the right bisector of 120° bending angle at a distance d I from the bend is (where, µ 0 is the permeability of free space) [MP PMT] 2µ 0 I µ 0I µ 0I 3µ 0I (d) (c) (b) (a) 2πd 2πd 2πd 3πd
16 The magnetic field due to a current carrying circular loop of radius 3 cm at a point on the axis at a distance of 4 cm from the centre is 54 µT. What will be its value at the centre of the loop? [UK PMT] (a) 200 µT (b) 250µT (c) 125 µT (d) 75 µT 17 A solenoid has length 0.4 cm, radius 1 cm and 400 turns of wire. If a current of 5 A is passed through this solenoid, what is the magnetic field inside the solenoid? (b) 628 × 10−3 T (a) 6.28 × 10−4 T [KCET] −7 (c) 6.28 × 10 T (d) 6.28 × 10−6 T
2013 18 Two similar coils of radius R are lying concentrically with their planes at right angles to each other. The currents flowing in them are I and 2I, respectively. The resultant magnetic field induction at the centre will be [AIPMT CBSE] 5µ 0I 3µ 0 I (b) (a) 2R 2R µ 0I µ 0I (c) (d) 2R R
19 A current i ampere flows along an infinitely long straight thin walled tube. The magnetic induction at any point inside the tube at a distance r metre from axis is [AIIMS] µ 0i µ 0i (d) (a) zero (b) ∞ (c) 2r 2πr 20 The current in the windings on a toroid is 2.0 A. There are 400 turns and the mean circumferential length is 40 cm. If the inside magnetic field is 1.0 T, the relative permeability is near to [AFMC] (a) 100 (b) 200 (c) 300 (d) 400
2010 21 A square conducting loop of side length L carries a current I. The magnetic field at the centre of the loop is (a) independent of L [AIIMS] (b) proportional to L2 (c) inversely proportional to L (d) linearly proportional to L
22 A wire carrying current i and other carrying 2i in the same direction produce a magnetic field B at the mid-point. What will be the field when 2i current is switched off ? [BHU]
(a) B/2
(b) 2B
(c) B
(d) 4B
23 The distance at which the magnetic field on axis as compared to the magnetic field at the centre of the coil carrying current I and radius R is 1/8, would be [MP PMT] (a) R (b) 2R (c) 2R (d) 3R 24 The current in straight wire, if the magnetic field 10−6 Wbm −2 produced at 0.02 m away from it is [MP PMT] (a) 0.1 A (b) 1 A (c) zero (d) 10 A
537
MOVING CHARGES AND MAGNETISM
25 A winding wire which is used to frame a solenoid can bear a maximum 10 A current. If length of solenoid is 80 cm and its cross-sectional radius is 3 cm, then required length of winding wire is (Take, B = 0. 2 T ) [Haryana PMT] (a) 12 (b) 4.8 × 102 m . × 102 m (d) 6 × 103 m (c) 2.4 × 103 m 26 A wire loop PQRSP is constructed by joining two semicircular coils of radii r1 and r2 respectively, as shown in the figure. If the current flowing in the loop is i, then the magnetic induction at the point O is [EAMCET] i r2
32 A solenoid of length 50 cm and a radius of cross-section 1cm has 1000 turns of wire wound over it. If the current carried is 5 A, the magnetic field on its axis, near the centre of the solenoid is approximately (permeability of free space, µ 0 = 4π × 10−7 T-mA −1 ) [MGIMS] (b) 1. 26 × 10−2 T (a) 0.63 × 10−2 T (d) 6.3 T (c) 2.51 × 10−2 T 33 A part of a long wire carrying a current i is bent into a circle of radius r as shown in figure. The net magnetic field at the centre O of the circular loop is [JCECE]
i
O i
r1 S
R
µ 0i 1 1 − 4 r1 r2 µ i 1 1 (c) 0 − 2 r1 r2
(a)
Q
O
r
P
µ 0i 1 1 + 4 r1 r2 µ i 1 1 (d) 0 + 2 r1 r2
(b)
27 A helium nucleus makes full rotation in a circle of radius 0.8 m in 2 s. The value of magnetic field B at the centre of the circle, will be (where, µ 0 = permeability constant) 2 × 10−19 (a) (b) 2 × 10−19 µ 0 [JCECE] µ0 −19 10 (c) 10−19 µ 0 (d) µ0 28 A solenoid of 1.5 m length and 4.0 cm diameter possesses 10 turns/cm. A current of 5 A is flowing through it. The magnetic induction at axis inside the solenoid is (a) 2π × 10−3 T (b) 2π ×10−5 T [CG PMT, JCECE] −3 (c) 2π × 10 G (d) 2π × 10−5 G 29 For the magnetic field to be maximum due to a small element of current carrying conductor at a point, the angle between the element and the line joining the element to the given point must be [VMMC] (a) 0° (b) 90° (c) 180° (d) 45° 30 An electric current passes through a long straight copper wire. At a distance 5 cm from the straight wire, the magnetic field is B. The magnetic field at 20 cm from the straight wire would be [JIPMER] B B B B (b) (c) (d) (a) 6 4 3 2 31 Two long straight wires are set parallel to each other at separation r and each carries a current i in the same direction. The strength of the magnetic field at any point midway between the two wires is [BCECE] µ 0i 2µ 0 i µ 0i (b) (c) (d) zero (a) πr πr 2πr
i
A
µ 0i 4r µ 0i (c) ( π + 1) 2πr
(a)
i
i
B
µ 0i 2r µ 0i (d) ( π − 1) 2πr
(b)
2009 34 A wire is wound in the form of a solenoid of length l and distance d. When a strong current is passed through a solenoid, there is a tendency to [UP CPMT] (a) increase l but decrease d (b) keep both l and d constant (c) decrease l but increase d (d) increase both l and d
35 Which of the following relation represents Biot-Savart’s law? [BVP] µ 0 Id l × r µ 0 Id l × r (a) d B = (b) d B = ⋅ ⋅ r 4π 4π r2 µ Id l × r µ Id l × r (d) d B = 0 ⋅ (c) d B = 0 ⋅ 3 4π 4π r r4 36 Two concentric circular loops of radii R and 2R carry currents of 2i and i respectively, in opposite sense (i.e. clockwise in one coil and counter clockwise in the other coil). The resultant magnetic field at their common centre is [Manipal] 5i i (b) µ 0 (a) µ 0 4R 4R 3i i (c) µ 0 (d) µ 0 4R 2R 37 A straight conductor carrying current I. If the magnetic field at a distance r is 0.4 T, then magnetic field at a distance 2r will be [OJEE] (a) 0.4 T (b) 0.1 T (c) 0.8 T (d) 0.2 T
538
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
38 A charge q coulomb makes n revolutions in one second in a circular orbit of radius r. The magnetic field at the centre of the orbit (in NA −1 m −1 ) is [J&K CET] 2πrn 2πq −7 −7 (a) (b) × 10 × 10 r q 2πq 2πnq −7 −7 (d) (c) × 10 × 10 nr r 39 Magnetic field at the centre of a coil in the form of a square of side 2 cm carrying a current of 1.414 A is [J&K CET] (a) 8 × 10−5 T (b) 18 × 10−5 T (c) 15 (d) 6 × 10−5 T . × 10−5 T 40 A direct current I flows along the length or an infinitely long straight thin walled pipe, then the magnetic field is (a) uniform throughout the pipe but not zero [KCET] (b) zero only along the axis of the pipe (c) zero at any point inside the pipe (d) maximum at the centre and minimum at the edge 41 Two parallel infinitely long current carrying wires are shown in figure. If resultant magnetic field at point A is zero, then determine the value of current I. [AIIMS] 2
1 10 A A
I
18 cm
(a) 50 A
(b) 15 A
9 cm
(c) 30 A
(d) 25 A
42 The magnitude of magnetic induction for a current carrying toroid of uniform cross-section is [JCECE] (a) uniform over the whole cross-section (b) maximum on the outer edge (c) maximum on the inner edge (d) maximum at the centre of cross-section 43 Magnetic field intensity H at the centre of a circular loop of radius r carrying current I ampere is [CG PMT] r 2πI (b) oersted (a) oersted I r I 2πr (c) oersted (d) oersted 2πr I
2008 44 Electron revolving with speed v is producing magnetic field B at centre. Find the relation between radius of path, B and v. [JIPMER] v v (a) B ∝ (b) B ∝ 2 r r v2 v2 (d) B ∝ 2 (c) B ∝ r r
45 Two concentric coils each of radius equal to 2π cm are placed at right angles to each other. 3 A and 4 A are the currents flowing in each coil, respectively. The magnetic induction (in Wb m −2 ) at the centre of the coils will be (Take, µ 0 = 4π × 10−7 Wb A −1 m −1 ). [AIIMS] (c) 5 × 10−5 (d) 7 × 10−5 (a) 12 × 10−5 (b) 10−5 46 Assertion The magnetic field produced by a current carrying solenoid is independent of its length and cross-sectional area. [AIIMS] Reason The magnetic field inside the solenoid is uniform. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 47 Two identical wires A and B have the same length L and carry the same current I. Wire A is bent into a circle of radius R and wire B is bent to form a square of side a. If B1 and B 2 are the values of magnetic induction at the centre of the circle and the centre of the square respectively, then the ratio B1 /B 2 is [BHU] π2 π2 π2 π2 (a) (b) (d) (c) 8 16 8 2 16 2 48 A vertical straight conductor carries a current upward. A point P lies to the East of it at a small distance and another point Q lies to the West at the same distance. The magnetic field at P is [Manipal] (a) greater than at Q (b) same as at Q (c) less than at Q (d) greater or less than at Q depending upon the strength of current 49 The magnetic field at the centre of a circular current carrying conductor of radius r is B c . The magnetic field on its axis at a distance r from the centre is B a . The value of B c : B a will be [KCET] (a) 1: 2 (b) 1: 2 2 (c) 2 2 : 1 (d) 2 : 1 50 Current I is flowing in conductor I shaped as shown in the figure. r The radius of the curved part is r and the length of straight portion is very large. The value of the magnetic field at the centre O will be µ I 3π µ I 3π (a) 0 (b) 0 + 1 − 1 4 πr 2 4 πr 2 (c)
µ 0I π + 1 4 πr 2
(d)
µ 0I π − 1 4 πr 2
I
I
[KCET]
539
MOVING CHARGES AND MAGNETISM
51 A circular coil of wire of radius r has N turns and carries a current I. The magnetic induction B at a point on the axis of the coil at a distance 3r from its centre is [EAMCET] µ 0 IN µ 0 IN µ 0 IN µ 0 IN (b) (c) (d) (a) 4r 8r 16r 32r 52 Two concentric circular coils of 10 turns each are situated in the same plane. Their radii are 20 cm and 40 cm and they carry respectively 0.2 A and 0.3 A currents in opposite direction. The magnetic field (in tesla) at the centre is [BCECE] (a) 35µ 0 / 4 (b) µ 0 / 80 (c) 7µ 0 / 80 (d) 5µ 0 / 4
2007 53 A long solenoid carrying a current produces a magnetic field B along its axis. If the current is doubled and the number of turns per cm is halved, the new value of the magnetic field is [BHU] (a) 2B (b) 4B (c) B/2 (d) B
54 The strength of the magnetic field around a long straight wire, carrying current, is [Kerala CEE] (a) same everywhere around the wire at any distance (b) inversely proportional to the distance from the wire (c) inversely proportional to the square of the distance from the wire (d) directly proportional to the square of the distance from the wire (e) directly proportional to the distance from the wire 55 Two wires A and B are of lengths 40 cm and 30 cm. A is bent into a circle of radius r and B into an arc of radius r. A current I 1 is passed through A and I 2 through B. To have the same magnetic inductions at the centre, the ratio of I 1 : I 2 is [J&K CET] (a) 3 : 4 (b) 3 : 5 (c) 2 : 3 (d) 4 : 3 56 A square wire of each side l carries a current I. What is the magnetic field at the mid-point of the square? [Punjab PMET] I
58 A circular coil carrying a certain current produces a magnetic field B 0 at its centre. The coil is now rewound so as to have 3 turns and the same current is passed through it. The new magnetic field at the centre is [KCET] (a) B 0 / 9 (b) 9B 0 (c) B 0 / 3 (d) 3B 0 59 Two identical coils having same number of turns and carrying equal current have common centre and their planes are at right angles to each other. What is the ratio of magnitude of the resultant magnetic field at the centre and magnetic field due to one of the coils at the centre? [Guj CET] (a) 1: 2 (b) 2 : 1 (c) 1: 1 (d) 2 : 1
2006 60 Circular loop of a wire and a long straight wire carry currents I c and I e respectively, as shown in figure. Assuming that these are placed in the same plane. The magnetic field will be zero at the centre of the loop when the separation H is [AIIMS] (a)
IeR Icπ
(b)
µ I (a) 4 2 0 4π l µ I (c) 16 2 0 4π l
O
I
I
µ0 I 4π l µ I (d) 32 2 0 4π l (b) 8 2
57 A long solenoid has 20 turns cm −1 . The current necessary to produce a magnetic field of 20 mT inside the solenoid is approximately [AMU] (a) 1 A (b) 2 A (c) 4 A (d) 8 A
(c)
πI c IeR
Wire Ic H Ie
Straight
(d)
Ieπ IcR
61 A wire oriented in the East-West direction carries a current eastward. Direction of the magnetic field at a point to the South of the wire is [J&K CET] (a) vertically down (b) vertically up (c) North-East (d) South-East 62 In the adjacent figure is shown a closed path P. A long straight conductor O carrying a current I passes through O and perpendicular to the plane of the paper. Then, which of the following holds good? (a) ∫ B ⋅ dl = 0 (b) ∫ B ⋅ dl = µ 0 I p
I
IcR Ieπ
R
(c) ∫ B ⋅ dl > µ 0 I p
Path P
[BCECE]
p
(d) None of these
2005 63 Two long parallel wires P and Q are both perpendicular to the plane of the paper with distance 5 m between them. If P and Q carry current of 2.5 A and 5 A respectively, in the same direction, then the magnetic field at point half way between the wires is [Kerala CEE] 3µ 0 µ0 3µ 0 µ0 (a) (c) (b) (d) 2π π 2π 2π (e)
3µ 0 π
540
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 11 21 31 41 51 61
(b) (c) (c) (d) (c) (c) (a)
2 12 22 32 42 52 62
(a) (d) (c) (b) (a) (d) (b)
3 13 23 33 43 53 63
(a) (d) (d) (c) (b) (d) (d)
4 14 24 34 44 54
(c) (b) (a) (b) (b) (b)
5 15 25 35 45 55
(a) (d) (c) (c) (c) (a)
6 16 26 36 46 56
(b) (b) (a) (c) (b) (b)
7 17 27 37 47 57
(a) (b) (c) (d) (b) (d)
8 18 28 38 48 58
(c) (a) (a) (d) (b) (b)
9 19 29 39 49 59
(b) (a) (b) (a) (c) (b)
10 20 30 40 50 60
(b) (d) (b) (c) (a) (a)
Explanations 1 (b) The cylinder can be considered to be made from concentric circles of radius R. R
d
(i) The magnetic field at a point outside cylinder, i.e. d > R. From Ampere’s circuital law, ∫ B ⋅ dl = µ 0I ⇒ B ∫ dl = µ 0I B (2πd ) = µ 0I
⇒
B=
µ 0I 2π d
2 (a) The magnetic field within the turns of toroid,
µ 0NI 2πr where, N = number of turns, I = current in loops and r = radius of each turn. Given, N 1 = 200, N 2 = 100 , r1 = 40 cm, r2 = 20 cm and current I is same, then B1 µ 0N 1I 2πr2 = × B2 2πr1 µ 0N 2I B=
Substituting the given values in the above relation, we get B1 N 1 r2 = B2 N 2 r1 200 20 = 100 40
where, µ 0 = permeability of free space. (ii) The magnetic field at surface, i.e. d = R, µ I B= 0 2πR (iii) The magnetic field at inside point. The current for a point inside the cylinder is given by I′ = current per unit cross-sectional area of cylinder × cross-section of loop = ∴B=
∴
1 =1 2
B1 : B2 = 1 : 1
3 (a) The magnetic field at the centre of
an arc subtended at an angle θ is given by µ i θ B= 0 × 2R 2π
Id 2 I πd 2 = 2 2 πR R
i1 270°
R
µ 0I ′ µ 0Id 2 µ I = = 0 d 2πd 2πR 2d 2πR 2
So, the variation of magnetic field can be plotted as
i
A
P 90°
i2
R B i
B B∝d
O
=2×
B∝ 1 d d =R
d
Then, the magnetic field due to larger arc AB is 270 µ i …(i) B1 = 0 1 × 2R 2π which acts in inward direction according to right hand thumb rule.
And magnetic field due to smaller arc AB is 90 µ i …(ii) B2 = 0 2 × 2R 2π which acts in outward direction. The resultant magnetic field, BR = B1 + B2 µ i × 270 µ 0i2 × 90 =− 01 + 4 πR 4 πR [from eqs. (i) and (ii)] …(iii) which acts in inward direction as B1 > B2. Two arcs can also be seen as the two resistances in parallel combination. So, the potential across them will be same, i.e. V1 = V2 …(iv) i1R1 = i2R2 where, R1 and R2 = resistance of respective segments The wire is uniform, so R1 L1 R × 270 = = R2 L2 R × 90 [Q length of arc = radius × angle] From Eq. (iv), we get i1 R2 90 1 ⇒ = = = i2 R1 270 3 or …(v) 3 i1 = i2 From Eqs. (iii) and (v), we get µ BR = 0 (−270i1 + 90i2 ) 4 πR µ = 0 [ −270i1 + 90(3i1 )] 4 πR µ = 0 (−270i1 + 270i1 ) = 0 4 πR
4 (c) Given, radius of identical circular R = 10 cm = 10−1 m 7 Current, I = A 2 loops,
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MOVING CHARGES AND MAGNETISM
Distance from both circular loop at point P, x1 = x2 = x = 5 cm = 5 × 10−2 m From figure, according to Maxwell’s right hand thumb rule, it is clear that magnetic field will be in same direction by both the coils, i.e. B = B1 + B2 µ 0IR 2 µ 0 IR 2 = + 2 2 3/ 2 2 (R + x ) 2 (R 2 + x 2 )3/ 2 =
µ 0 I R2 (R 2 + x 2 )3/ 2
=
µ 0 × 7/ 2 × (10−1 )2 [(01 . )2 + (0.05 )2 ]3/ 2
=
56 µ 0T 5
5 (a)Q B (at P) = θ2
I 45°
I θ1
d
µ 0I (cosθ 1 − cosθ 2 ) 4 πd
P
I 135°
P
In given case, d = R sin 45° = R / 2 θ 1 = 135°, θ 2 = 180° ∴ B (at P) µ 0I = [cos135° − cos180° ] 4 π (R / 2 )
9 (b) Consider two Amperian loops of
magnetic induction at a point to a current carrying element iδl is given by µ iδ l × r δB = 0 ⋅ 4π r3 µ 0 iδl sin θ or B = ⋅ 4π r2 Directed normal to plane containing δl and r, θ being angle between δl and r. Field due to semicircular arc Now, angle between a current element δl of semicircular arc and the radius vector of the element to point c is π / 2. Therefore, the magnitude of magnetic induction B at O due to this element is µ iδl sin π / 2 µ 0iδl = δB = 0 ⋅ 4π r2 4 πr 2 Hence, magnetic induction due to whole semicircular loop is µ iδ l B = Σδ B = Σ 0 ⋅ 2 4π r µ i = 0 2 Σδ l 4π r µ i µ i = 0 2 (πr) = 0 4r 4 πr The magnetic field due to ab and de is zero, because θ = 0° or 180°. So, net magnetic field is µ i B= 0 4r
radius a/2 and 2a as shown in the figure. Applying Ampere’s circuital law for these loops, we get
i.e. B1 = 0 (since, θ = 0°) The magnetic field due to semicircular part, µ nI µ (1 / 2)I µ 0I B2 = 0 = 0 = 2r 4r 2r
2 − 1 µ I = 0 2 4 πR 2 µ I or B (at P ) = 0 ( 2 − 1) T 4 πR −2
6 (b) Here, dl = dx = 1cm = 10 m, i = 10 A, r = 0.5 m µ i (dl × r) dB = 0 ⋅ 4π r3 µ 0 idl $ $ (i × j ) = ⋅ 4 π r2 µ idl = 0 ⋅ 2 k$ 4π r 10−7 × 10 × 10−2 $ k = (0.5)2 $ = 4 × 10−8 kT
a/2
2a
∫ B ⋅ dL = µ 0Ienclosed For the smaller loop, 2
a I a = µ0 × 2 × π 2 2 πa 1 µ I = µ 0I × = 0 4 4 µ 0I , at distance a/2 from the ⇒ B= 4 πa axis of the wire. B × 2π
Similarly, for bigger Amperian loop, B ′ × 2π (2a) = µ 0I [total current enclosed by Amperian loop is I] µ I ⇒ B′ = 0 4 πa at distance 2a from the axis of the wire. B µ I 4 πa So, ratio of = 0 × =1 B ′ 4 πa µ 0I
8 (c) Magnetic field due to straight wire above O is zero,
µ I −1 = 0 − (−1) 2 4 πR 2
∴
7 (a) According to Biot-Savart’s law, the
The magnetic field due to lower straight portion, µ I B3 = 0 (sin 0°+ sin 90° ) 4 πr µ 0I (upward) = 4 πr Net magnetic field, B = B1 + B2 + B3 µ I µ I =0+ 0 + 0 4 r 4 πr µ I µ I (upwards) = 0 + 0 4 r 4 πr
10 (b) A long wire with steady current is bent into a current carrying circle of single turn with radius R. I l
– I ~
C
R [Here, 2πR=l]
Hence, magnetic field at centre is µ I µ 0I µ πI ...(i) = 0 B= 0 = l 2R l 2 2π Now, when wire is bent into a circular loop of n turns. R’ [radius of single loop] l
B′ =
µ 0nI 2R′
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Here, n(2πR′ ) = l l R′ = 2πn µ n2πI µ nI B′ = 0 (2πn) = 0 l 2l [from Eq. (i)] B′ = n2 B
⇒
The magnetic field produced at the centre is µ I µ ne B= 0 = 0 2r 2r
I1 I2
D
B
Y I
3
The point P is lying at a distance d along the Z-axis, P
Now, B1 =
B1 =
Bnet
µ0 I1 µ I and B2 = 0 2 2π d 2π d
B12 + B22 µ 1 = 0 ⋅ (I 12 + I 22 )1/ 2 2π d
14 (b) Magnetic field B at any point in the open space inside the toroid is zero, because the Ampere loop encloses net current which equals to zero in free space.
15 (d) We know that,
B
I
q = e and t = T ωe 2πne e e ⇒ I = = = = = ne 2π T 2π /ω 2π [Q ω = 2πn]
⇒
60°
B r3 = 2 B1 (r + d 2 )3/ 2
B (3)3 = 2 B1 (3 + 4 2 )3/ 2 B 27 = ⇒ B1 (25)3/ 2 54µT 27 = 3 ⇒ B1 5 ⇒
B1 = 90°
⇒
d√3 2
B1 = 250 µT
solenoid is given by
µ 0 I (sin θ 1 + sin θ 2 ) 4 πr
µ0 I =2 × × (sin 90o + sin 30o ) 4 π 3 d 2 2I 1 µ =2 0 × × 1 + π 4 2 d 3 2I 3 µ =2 0 × × = 4 π d 3 2
54 × 125 27
17 (b) The magnetic field inside the
60°
Bnet = 2 e
µ 0ir2 × 2 × r3 B = 2 B1 2(r + d 2 )3/ 2 × µ 0ir2
P
So, for an electron revolving in a circular orbit of radius r
µ 0ir2 2(r + 02 )3/ 2 2
µ 0ir2 ....(ii) 2r3 Dividing Eq. (i) by Eq. (ii), we get
Bnet = ⇒
2
=
30°
r
dB cos θ
d=0
B2
12 (d) As I = q/ t
X
θ
d
µ 0ir2 …(i) 2(r + d 2 )3/ 2 where, i = current in loop, r = radius of loop = 3cm d = distance on axis = 4 cm, and B = magnetic field of current carrying loop. Now, B1 = magnetic field at centre,
B1
90°
X
Magnetic field at O due to semi infinite µ I wire, B1 = 0 × (− k$ ) 4π R µ I B3 = 0 (− k$ ) 4 πR Magnetic field at O due to semi-circular arc in yz-plane, µ I B2 = 0 (− i$ ) 4R The net magnetic field at the centre O B = B1 + B2 + B3 µ I µ I = 0 (−2k$ ) + 0 (− i$ ) 4 πR 4R µ 0I $ =− (2k + πi$ ) 4 πR − µ 0I $ B= (πi + 2k$ ) ∴ 4 πR
i
O
B=
O
C
I O
r
A
Z
1I
dB i
as
regions is given by
R
current carrying loop is given by
13 (d) The given situation can be shown
11 (c) The magnetic field in the different
2
16 (b) As magnetic field at an axis of
3 µ 0I 2πd
B = µ 0 nI where, n = number of turns per unit length and I = current in coil. Now, we have N 400 = 105 n= = L 0.4 × 10−2 and µ 0 = 4 π × 10−7 Tm/A ∴
B = 4 × 314 . × 10−7 × 105 × 5 = 628 × 10−3 T
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MOVING CHARGES AND MAGNETISM
µ 0 2i ⋅ =B 4π R ∴ B1 = B − B2 Now, B2 = 0, as I 2 = 0. ∴ Bnet = B1 = B
18 (a) The magnetic field ( B) at the centre of circular current carrying coil of radius R and current I is given by µ I B= 0 2R Similarly, if current = 2I, then µ 2I Magnetic field = 0 = 2 B 2R So, resultant magnetic field =
µ 0I 2R
At centre, Bcentre =
either arm L
L
O
⇒
…(ii)
1 R3 = (x + R 2 )3/ 2 8 2
⇒
x = 3R
infinite length, the magnetic field is given by µ 2i B= 0 × a 4π ⇒ 10−6
4 π × 10−7 × 2i = 4 π × 0.02
10−7 × 2 × i 0.02 ⇒ i = 01 . A µ 0Ni , where N = total number (c) B = l of turns, l = length of the solenoid. ⇒ 10−6 =
I B
45° L
B1 = =
C
I µ0 × [sin 45° + sin 45° ] 4 π (L / 2) µ 0 2 2I × 4π L
⇒ 0.2 =
Field at centre due to the four arms of the square, B = 4 B1 µ 2 2I = 4 0 × L 4π =
µ 0 2 2I × L π
µ 2 ⋅ 2i and B2 = 0 ⋅ 4π R
4 π × 10−7 × N × 10 0.8
4 × 104 π Since, N turns are made from the winding wire, so length of the wire (L) = 2πr × N [Q 2πr = length of each turns] ⇒ N =
⇒ L = 2π × 3 × 10−2 ×
i.e. B ∝ 1/ L
22 (c) Magnetic field, B1 =
25
µ 0 2i ⋅ 4π R
S
3
R
B1 = B3 = 0 µ i B2 = 0 ⋅ 4 r1 B4 =
Q 1 P
O
(vertically upward)
µ0 i ⋅ (vertically downward) 4 r2
So, Bnet = B2 − B4 µ 1 1 = 0 − i 4 r1 r2 a circle is given by µ i B= 0 2r
24 (a) In case of straight conductor of
L
r2
r1
27 (c) The magnetic field at the centre of
1 R or = 2 2 1/ 2 2 (x + R )
D
√2 L
A
µ 0I 2R
Dividing Eq. (i) by Eq. (ii), we get 2R Baxis µ 0I R 2 = × 2 2 3/ 2 Bcentre 2 (x + R ) µ 0I
zero as no current enclosed by Amperean loop. µ µ Ni (d) Magnetic field, B = 0 r 2πr 4 π × 10−7 × µ r × 400 × 2 1= 40 × 10−2 [Q 2πr = l ] ∴ µ r = 400
21 (c) Magnetic field at the centre due to
i 2
current I , then magnetic field on its axis at a distance x from its centre is given by 2πIR 2 µ …(i) Baxis = 0 2 4 π (x + R 2 )3/ 2
19 (a) Inside the tube, magnetic field is
20
4i
23 (d) If a coil of radius R is carrying
B 2 + (2 B )2 = 5 B 2
= 5 B= 5
are considered as B1 , B2 , B3 and B4, respectively.
B2 − B1 =
4 × 104 π
= 2.4 × 103 m
26 (a) In the following figure, magnetic field at O due to sections 1, 2, 3 and 4
where, i is current and r is the radius of circle. q Also, i = t For helium nucleus, q = 2e 2e ∴ i= t µ 0 ⋅ 2e So, B = 2rt µ 0 × 2 × 16 . × 10−19 = 2 × 0.8 × 2 = 10−19 µ 0
28 (a) Magnetic field, B = µ 0ni = 4 π × 10−7 × 5 × 1000 = 2π × 10−3 T (Q n = 10 turns/cm or n = 1000 turns/m)
29 (b) The magnetic field due to small element conductor of length is given by µ idl sin θ dB = 0 ⋅ 4π r2 This value will be maximum when sin θ = 1 = sin 90° θ = 90°
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B1 is perpendicular to the plane of the page, directed upwards (right hand palm rule 1). The field at the centre O due to the current loop of radius r is µ i B2 = 0 2r B2 is also perpendicular to the page, directed upward (right hand screw rule).
30 (b) The magnetic field at a distance r from the straight wire, r 1 B µ i B = 0 or B ∝ or 2 = 1 B1 r2 r 2πr B2 5 1 = = (Q B1 = B ) ∴ B 20 4 B or B2 = 4
31 (d) Magnetic field due to wire A at B BAq P BBu
i l
i
Magnetic field due to wire (B) at point P is given as µ i BB = 0 2π l BB ⇒ u [perpendicular to plane outward direction] As, BA = BB and BA = − BB ∴ Net magnetic field = B = BA + BB = 0
32 (b) The magnetic field is given by B = µ 0ni −7
−1
where, µ 0 = 4 π × 10 T - mA 1000 ,i=5A n= 50 × 10−2 1000 ⇒ B = 4π ∴ × 10−7 × ×5 50 × 10−2
I 4× µ0 × 4π (a / 2) (sin 45°+ sin 45° ) I
A
45° 45°
E
field at point O due to straight part of wire is µ i B1 = 0 2πr
given as
=4×
µ 0 Id l × r ⋅ 4π r3 µ × 2i (c) B1 = 0 2×R dB =
B
O
a
36
F
C
B
µ 0 2I 2 µ 0I × 2 2 × × = a 4π πa 2
. 4 π × 10−7 × 1414 ×2× 2 π × 2 × 10−2 = 8 × 10−5 T
40 (c) The magnetic field is zero at any
2i
point inside the pipe carrying current I. R
41 (c) Resultant magnetic field due to
i
current carrying parallel wire 1 (10 A) and wire 2 (IA) at point A is zero.
2R
2
µ 0i 4R µ i µ i 3µ 0i = 0 − 0 = R 4R 4R
Similarly, B2 = ∴
Bnet
37 (d) Br is given as X
r
Br =
Br=0.4 T Q 2r B2r
µ0 I µ0 I = = 0.4 T 2π d 2π r
µ I µ I 1µ B2r = 0 = 0 = 0 2π d 2π 2r 2 2π 1 1 B2r = Br = (0.4 ) = 0.2 T 2 2
I r
= nq
[Q q′ = nq]
1
I
10 A 18 cm
A
9 cm
i.e.
B1 = B2 µ 0I 1 µ 0I 2 = 2 r1 2 r2
⇒
I1 I2 = r1 r2
P
I
radius r is given as q′ nq i= = 1 t
r
a/2
=
38 (d) Current through circular orbit of
O
D
35 (c) Biot-Savart’s law in vector form is
Y
B = 126 . × 10−2 T
33 (c) The magnitude of the magnetic
A
39 (a) Bcentre =
d constant.
where, 2l = r. µ i BA = 0 2π l BA ⇒ ⊗ [perpendicular to plane inward direction]
i
4 π × 10−7 nq 2πnq −7 = × 10 r 2r
34 (b) It has a tendency to keep both l and
l 2l
∴
BC =
∴ Resultant field at O is µ i1 B = B1 + B2 = 0 + 1 2r π µ 0i = (π + 1) 2πr
point P is given as A
Magnetic field due to a current in a circular orbit at its centre, µ i BC = 0 2 r
⇒
I 10 = −2 9 × 10 27 × 10−2
⇒
I = 30 A
42 (a) Magnetic field in case of toroid is uniform over the whole cross-section.
43 (b) Magnetic field at the centre of current carrying circular loop, µ I BC = 0 2r As, µ 0 = 4 π × 10−7 T mA–1 BC =
4 π × 10−7 I 2πI oersted = r 2r
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MOVING CHARGES AND MAGNETISM
µ 0I 2r e e ev or I = I = = t 2πr 2πr v
44 (b)Q Magnetic field at centre, B = where,
45
Hence,
µ ev µ 0ev Hence, B = 0 = 2r 2πr 4 πr2 v or B∝ 2 r µ 0I 2 (c) BP = 2R
point due to a straight current carrying conductor depends only on the distance of the point with respect to current carrying conductor but not on the direction. Hence, BP = BQ (at same distance).
I1 = 3 A
49 (c) Magnetic field at centre of current
BQ
µ 0i ....(i) 2r Magnetic field at axial point due to a current carrying coil at distance of r i.e. d=r µ 0ir2 Ba = 2 2(r + d 2 )3/ 2 Bc =
Q
4 π × 10−7 × 4 = 2 × 0.02π = 4 × 10−5 Wb-m −2 µ 0I 1 4 π × 10−7 × 3 = 2R 2 × 0.02π
Ba =
= 3 × 10−5 Wb m −2 B=
−5 2
= (4 × 10 ) + (3 × 10 ) = 5 × 10−5 Wb m −2
46 (b) The magnetic field due to a solenoid having n turns/metre and carrying current I is µ nI B= 0 2
∴
µ 0 2πI × R 4π µ 0 2πI × 2π …(i) = × 4π L [Q L = 2πR , for circular loop] I µ and B2 = 0 × 4 π (a / 2) [sin 45°+ sin 45° ] × 4 where, a = L / 4
Bc : Ba = 2 2 : 1
Magnetic field at O due to straight wire P is Q P
O r R
...(ii) BP = 0 Now, magnetic field due to straight wire R is µ I BR = 0 [sin 0°+ sin 90° ] 4π r µ I …(iii) = 0 4π r ∴
B = BP + BQ + BR µ I 3π = 0 + 1 4 πr 2 [using Eqs. (i), (ii) and (iii)]
…(i)
where, r is the radius of the circular coil. Then, 2πNIr2 µ B= 0 2 4 π [ r + ( 3r )2 ]3/ 2 [Given, x = 3r ] ⇒
B=
µ0 NIr2 ⋅ 2 2 (r + 3r2 )3/ 2
⇒
B=
µ 0 NIr2 ⋅ 2 (4 r2 )3/ 2
⇒
B=
µ 0 NIr2 ⋅ 2 (2r)3
⇒
B=
or
µ 0 NIr2 ⋅ 2 8r3 µ NI B= 0 16r
52 (d) Magnetic field at the centre of circular coil of n turns and radius r is given by µ nI B= 0 2r µ 0nI 1 For first coil, B1 = 2r1 For second coil,
3/ 4 th of circular current carrying arc is µ I 3π 3µ I …(i) BQ = 0 = 0 4π r 2 8r
Also, magnetic field is uniform inside the solenoid. B1 =
....(ii)
50 (a) Magnetic field at centre due to
It is obvious that magnetic field is independent of length and area.
47 (b) We know that,
µ 0ir2 2(2r2 )3/ 2
Bc µ 0i 2(2r2 )3/ 2 =2 2 = × Ba 2r µ 0ir2
Now,
BP2 + BQ2 −5 2
point distance x from its centre, 2πNIr2 µ B= 0⋅ 2 4 π (r + x 2 )3/ 2
carrying coil,
I2 = 4 A
∴
µ 0I 64 × 4 πL 2
51 (c) The magnetic induction at any
48 (b) Magnitude of magnetic field at any
B
BQ =
B1 µ 0 4 π 2I = × B2 4 π L
B1 π2 = B2 8 2
or
BP
and
1 µ 0I 1 ×8×4 × + 2 4 πL 2 µ I 64 …(ii) = 0 × 4 πL 2
B2 =
∴
B2 =
µ 0nI 2 2r2
Hence, resultant magnetic field at the centre of concentric loop is µ nI µ nI B= 0 1 − 0 2 2r1 2r2 Given, n = 10, I 1 = 0.2 A, r1 = 20 cm = 0.20 m I 2 = 0.3 A and r2 = 40 cm = 0.40 m 10 × 0.2 10× 0.3 5 ∴ B = µ 0 − = µ0 2× 0.20 2× 0.40 4
53 (d) Using Ampere’s law,
∫ B ⋅ d l = µ 0 (I net )
…(i)
In our case, I net = (number of turns inside the area) × (current through each turn) = (nl ) I where, n is number of turns per unit length. Eq. (i) can be written as Bl = (µ 0 )(nlI )
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B = µ 0nI or B ∝ nI B1 n1I 1 = B2 n2I 2
or ∴
n Here, n1 = n, n2 = , I 1 = I , 2 I 2 = 2I , B1 = B B n I ∴ = × =1 B2 n / 2 2I B2 = B
or
∴ B=
55 (a) For wire A, length = 40 cm It is bent into a circle, so 40 ∴ 2πr = 40 or r = 2π µ I Magnetic induction at centre = 0 1 2r For wire B, length = 30 cm. It is bent into an arc, so θ = 30/r Magnetic induction at centre due to µ Iθ circular arc = 0 2 4 πr µ 0I 1 µ 0I 2θ Since, = 2r 4 πr 40 I1 30 × 2π θ Qr= ⇒ = = 2π I 2π 2π × 40 2
⇒
I1 3 = I2 4
µ0 I ⋅ (sin φ 1 + sin φ 2 ) 4π a l Here, a = and φ 1 = φ 2 = 45° 2 µ I 1 1 B=4× 0 + 4 π (l / 2) 2 2
56 (b) B = 4
For magnetic field to be zero at the centre of the loop,
µ I = 8 2 0 ⋅ 4π l
B1 = B2 I R µ 0I c µ 0I e = ⇒ H = e πI c 2R 2πH
i.e.
57 (d) By the formula, B = µ 0nI −3
or
20 × 10
or
I =
54 (b) The strength of magnetic field around a straight current carrying wire is given by µ I B= 0⋅ 2π r 1 B∝ ∴ r Therefore, magnetic field due to a straight current carrying wire is inversely proportional to the distance from the wire.
16 µ 0 I 2 4 π l
61 (a) According to right hand thumb −7
= 4 π × 10
× 2000 × I
20 × 10−3 = 8A 4 π × 10−7 × 2000
⇒ I ≈ 8A
rule, if the thumb represents the direction of current in a wire, then the curled fingers will represents the direction of magnetic field. Hence, using right hand thumb rule as per diagram
58 (b) The magnetic field produced at the centre of the circular coil carrying current is given by µ NI B= 0 2r For one turn, N = 1 µ I B0 = 0 2r As the coil is rewound r r′ = , N ′ = 3 3 µ I × 3 9µ 0I ∴ B′ = 0 = = 9 B0 r 2r 2× 3
59 (b) The coils are placed perpendicular to each other. The magnetic field due to current through each at the centre is B. Then, resultant magnetic field due to current through both the coils will be Br =
B2 + B2 = 2 B
Hence, the required ratio will be Br 2 = 2:1 = B 1
60 (a) Magnetic field at the centre O of the loop of radius R is given by µ I B1 = 0 c 2R Magnetic field due to straight current carrying wire at a distance H, is given by µ I B2 = 0 e 2πH
I West
East
Current is towards east, hence magnetic field will be vertically downwards at a point to the south of the wire.
62 (b) A long straight conductor carrying current I passes through O , then by symmetry, all points of the circular path are equivalent and hence the magnitude of magnetic field should be same at these points. The circulation of magnetic field along the circle is ∫ B ⋅ dl = µ 0I (using Ampere’s law) p
63 (d) B1 = B2 =
µ 0I 1 µ 0 2. 5 µ 0 = × = 2π 2. 5 2π 2πr
5 2µ 0 µ 0I 2 µ 0 = × = 2πr 2π 2. 5 2π 2
1
2.5 A
B2
B1 P
5A
5m
Resultant magnetic field at mid-point P, µ µ B = B2 − B1 = 0 (2 − 1) = 0 2π 2π
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MOVING CHARGES AND MAGNETISM
Topic 2 Motion of a Charged Particle in a Magnetic Field 2019 1 Ionised hydrogen atoms and α -particles with same
2016 7 An electron is moving in a circular path under the influence
momenta enters perpendicular to a constant magnetic field B. The ratio of their radii of their paths rH : rα will be [NEET] (a) 1 : 2 (b) 4 : 1 (c) 1 : 4 (d) 2 : 1
2 Assertion A charge particle is released from rest in magnetic field, then it will move in a circular path. Reason Work done by magnetic field is non-zero. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct, but Reason is not the correct explanation of Assertion. (c) Assertion is correct, but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 3 A proton is projected with velocity v = 2i$ in a region where magnetic field B = ( i$ + 3$j + 4k$ ) µT and electric field E = 10$iµ Vm −1 . Then, find out the net acceleration of proton. (a) 1400 ms −2 (c) 1000 ms −2
(b) 700 ms −2 (d) 800 ms −2
[AIIMS]
4 Assertion Electron moving perpendicular to B will perform circular motion. Reason Force by magnetic field is perpendicular to velocity. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct, but Reason is not the correct explanation of Assertion. (c) Assertion is correct, but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 5 If two protons are moving with speed v = 4.5 × 105 ms −1 parallel to each other, then find the value of ratio of electrostatic and magnetic force between them. [AIIMS] (a) 4.4 × 105 (b) 2.2 × 105 (c) 3.3 × 105 (d) 11 . × 105 6 Ratio of charge on positron to mass of positron (in C kg −1 ) is approximately [JIPMER] (a) + 2 × 1011 (b) +5 × 1012 (c) − 2 × 1011 (d) − 5 × 1011
of a transverse magnetic field of 3. 57 × 10−2 T. If the value of e/m is 176 . × 1011 C kg −1 , the frequency of revolution of the electron is [NEET] (a) 1 GHz (b) 100 MHz (c) 62.8 MHz (d) 6.28 MHz
2015 8 The force on a charged particle moving with a velocity v in a magnetic field B is not (a) perpendicular to both v and B (b) maximum, if v is perpendicular to B (c) maximum, if v is parallel to B (d) zero, if v is parallel to B
[MP PET]
2014 9 In cyclotron, for a given magnet, radius of the semicircle traced by positive ion is directly proportional to (where, v = velocity of positive ion) [MHT CET] 2 −1 −2 (c) v (d) v (b) v (a) v
10 When a magnetic field is applied on a stationary electron, it (a) remains stationary [Kerala CEE] (b) spins about its own axis (c) moves in the direction of the field (d) moves perpendicular to the direction of the field (e) moves opposite to the direction of the field 11 A charged particle experiences magnetic force in the presence of magnetic field. Which of the following statement is correct? [KCET] (a) The particle is moving and magnetic field is perpendicular to the velocity (b) The particle is moving and magnetic field is parallel to the velocity (c) The particle is stationary and magnetic field is perpendicular to the velocity (d) The particle is stationary and magnetic field is parallel to the velocity 12 A proton of mass m and charge q is moving in a plane with kinetic energy E. If there exists a uniform magnetic field B, perpendicular to the plane of the motion, the proton will move in a circular path of radius [WB JEE] 2Eq 2Em 2Em Em (a) (b) (c) (d) qB qB 2qB qB
548
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
13 If the velocity of charged particle has both perpendicular and parallel components while moving through a magnetic field, what is the path followed by a charged particle? [KCET] (a) Circular (b) Elliptical (c) Linear (d) Helical 14 A charged particle of mass m and charge q moves along a circular path of radius r that is perpendicular to a magnetic field B. The time taken by the particle to complete one revolution is [UK PMT] 2πmq 2πq 2 B (a) (b) B m 2πqB 2πm (c) (d) qB m
2013 15 When a proton is released from rest in a room, it starts with an initial acceleration a 0 towards West. When it is projected towards North with a speed v 0 , it moves with an initial acceleration 3a 0 towards West. The electric and magnetic fields in the room are [NEET] ma 0 ma 0 2ma 0 2ma 0 (b) (a) West, up West, down e ev 0 e ev 0 3ma 0 2ma 0 ma 0 ma 0 (c) (d) East, up East, down e ev 0 e ev 0
16 A uniform electric field and a uniform magnetic field are produced, pointed in the same direction. An electron is projected with its velocity pointing in the same direction, (a) the electron will turn to its left [AIIMS] (b) the electron will turn to its right (c) the electron velocity will increase in magnitude (d) the electron velocity will decrease in magnitude 17 A proton carrying 1 MeV kinetic energy is moving in a circular path of radius R in uniform magnetic field. What should be the energy of an α-particle to describe a circle of same radius in the same field? [CBSE AIPMT] (a) 2 MeV (b) 1 MeV (c) 0.5 MeV (d) 4 MeV
2011 18 Two particles A and B having equal charges +6 C, after being accelerated through the same potential difference, enter a region of uniform magnetic field and describe circular paths of radii 2 cm and 3 cm, respectively. The ratio of mass of A to that of B is [Kerala CEE] (a) 4/9 (b) 9/5 (c) 1/2 (d) 1/3 (e) None of these
19 The path of a charged particle in a uniform magnetic field, when the velocity and the magnetic field are perpendicular to each other is a [J&K CET] (a) circle (b) parabola (c) helix (d) straight line
20 A proton travelling at 23° w.r.t. the direction of a magnetic field of strength 2.6 mT experiences a magnetic force of 6.5 × 10−17 N. What is the speed of the proton? (b) 4 × 105 ms −1 (a) 2 × 105 ms −1 [DUMET] (d) 6 × 10−5 ms −1 (c) 6 × 105 ms −1 21 What uniform magnetic field applied perpendicular to a beam of electrons moving at 13 . × 106 ms −1 , is required to make the electrons travel in a circular arc of radius 0.35 m? [DUMET] (b) 6 × 10−5 T (a) 2.1 × 10−5 G (c) 2.1 × 10−5 T (d) 6 × 10−5 G
2010 22 In the figure given below, the electron enters into a magnetic field. It will deflect in
[JCECE]
Y e X
(a) + ve x-direction (c) + ve y-direction
(b) – ve x-direction (d) – ve y-direction
23 A deuteron of kinetic energy 50 keV is describing a circular orbit of radius 0.5 m, in a plane perpendicular to magnetic field B. The kinetic energy of a proton that describes circular orbit of radius 0.5 m in the same plane with the same magnetic field is [AFMC] (a) 200 keV (b) 50 keV (c) 100 keV (d) 25 keV 24 A charged particle enters a magnetic field H with its initial velocity making an angle of 45° with H. The path of the particle will be [BHU] (a) straight line (b) a circle (c) an ellipse (d) a helix 25 A charged particle moves along a circle under the action of magnetic and electric fields, then this region of space may have [UP CPMT] (a) E = 0, B = 0 (b) E = 0, B ≠ 0 (c) E ≠ 0, B = 0 (d) E ≠ 0, B ≠ 0 26 Two particles of masses ma and mb and same charge are projected in a perpendicular magnetic field. They travel along circular paths of radius ra and rb such that ra > rb . Then, which is true? [MHT CET] (a) ma v a > mb v b (b) ma > mb and v a > v b (c) ma = mb and v a > v b (d) mb v b > ma v a 27 A charged particle moving with velocity 4 × 106 ms −1 enters perpendicular to a magnetic field B = 2 Wbm −2 . It moves in a circular path of radius 2 cm, then charge per unit mass is [OJEE] 2 −1 3 −1 (a) 10 Ckg (b) 10 Ckg (c) 104 Ckg −1 (d) 108 Ckg −1
549
MOVING CHARGES AND MAGNETISM
28 A charge + Q is moving upwards vertically. It enters a magnetic field directed to North. The force on the charge will be towards [KCET] (a) North (b) South (c) East (d) West 29 A proton enters a magnetic field of flux density 1.5 Wbm −2 with a speed of 2 × 107 ms −1 at angle of 30° with the field. The force on a proton will be [BCECE] (b) 2.4 × 10−12 N (a) 0.24 × 10−12 N (c) 24 × 10−12 N (d) 0.024 × 10−12 N 30 An electron of mass m and charge q is travelling with a speed v along a circular path of radius r at right angles to a uniform magnetic field B. If speed of the electron is doubled and the magnetic field is halved, then resulting path would have a radius of [JIPMER] (a) r/ 4 (b) r/ 2 (c) 2r (d) 4r 31 A particle of mass M and charge Q moving with velocity v describes a circular path of radius R when subjected to a uniform transverse magnetic field of induction B. The work done by the field when the particle completes one full circle is [MGIMS] Mv 2 (a) (b) zero 2πR R (c) BQ 2πR (d) BQv2πR 32 An electric field of 1500 Vm −1 and a magnetic field of 0.40 Wbm −2 act on a moving electron. The minimum uniform speed along a straight line, the electron could have is [CMC] −16 −1 15 −1 (b) 6 × 10 ms (a) 1.6 × 10 ms (c) 3.75 × 103 ms −1 (d) 3.75 × 102 ms −1
2009 33 Work done on electron moving in a solenoid along its axis is equal to i
[BVP] B
(a) zero (c) ilB
v
i
(b) evB (d) None of these
34 The magnetic force acting on a charged particle of charge −2µCin a magnetic field of 2 T acting in y-direction, when the particle velocity is ( 2i$ + 3$j ) × 106 ms −1 , is [CBSE AIPMT]
(a) 8 N in − z-direction (c) 8 N in y-direction
(b) 4 N in z-direction (d) 8 N in z-direction
35 Assertion A proton and an alpha particle having the same kinetic energy are moving in circular paths in a uniform magnetic field. The radii of their circular paths will be equal. Reason Any two charged particles having equal kinetic energies and entering a region of uniform magnetic field
B in a direction perpendicular to B, will describe circular trajectories of equal radii. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 36 A charged particle with velocity v = xi$ + y$j moves in a magnetic field B = yi$ + x$j. Magnitude of the force acting on the particle is F. The correct option for F is I. No force will act on particle, if x = y II. Force will act along Y-axis, if y < x III. Force is proportional to ( x 2 − y 2 ), if x > y IV. Force is proportional to ( x 2 + y 2 ), if y > x [UP CPMT] (a) I and II are correct (b) I and III are correct (c) II and IV are correct (d) III and IV are correct
37 Four charged particles are projected perpendicularly into the magnetic field with equal speed. Which will have minimum frequency? [OJEE] (a) Proton (b) Electron (c) Li + (d) He + 38 Proton and α-particle are projected perpendicularly in a magnetic field, if both move in a circular path with same speed. Then, the ratio of their radii is [OJEE] (a) 1 : 2 (b) 2 : 1 (c) 1 : 4 (d) 1 : 1 39 The magnetic Lorentz force experienced by a charge q, entering a magnetic field B with a velocity v is [Kerala CEE] (a) q ( B × v) (b) q( B × v) (c) q( v⋅ B ) (e) q( v × B )
(d) q 2 ( v × B )
40 In a mass spectrometer used for measuring the masses of ions, the ions are initially accelerated by an electric potential V and then made to describe semicircular paths of radius R using a magnetic field B. If V and B are kept charge on the ion constant, then the ratio will be mass of the ion proportional to [JIPMER] 1 1 2 (b) 2 (c) R (d) R (a) R R 41 A charged particle enters in a strong perpendicular magnetic field. Then, its kinetic energy [MGIMS] (a) increases (b) decreases (c) remains constant (d) first increases and then becomes constant 42 A cyclotron can accelerate (a) β -particles (b) α-particles (c) high velocity gamma rays (d) high velocity X-rays
[MGIMS]
550
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
43 An α-particle and a deuteron projected with equal kinetic energies describe circular paths of radii r1 and r2 respectively, in a uniform magnetic field. The ratio r1 /r2 is (a) 1 (b) 2 [BCECE] 1 (c) (d) 2 2 44 When a positively charged particle enters a uniform magnetic field with uniform velocity, its trajectory can be (i) a straight line (ii) a circle (iii) a helix [JCECE] (a) Only (i) (b) (i) and (ii) (c) (i) and (iii) (d) (i), (ii) and (iii)
2008 45 A particle of mass m, charge Q and kinetic energy T enters a transverse uniform magnetic field of induction B. After 3 s, the kinetic energy of the particle will be [CBSE AIPMT] (a) 3T (b) 2T (c) T (d) 4T
46 A proton, a deuteron and an α-particle with the same kinetic energy enter a region of uniform magnetic field, moving at right angles to B. What is the ratio of the radii of their circular paths? [BHU] (a) 1: 2 : 1 (b) 1: 2 : 2 (c) 2 : 1: 1 (d) 2 : 2 : 1 47 Under the influence of a uniform magnetic field, a charged particle is moving in a circle of radius R with constant speed v. The time period of the motion [MHT CET] (a) depends on v and not on R (b) depends on both R and v (c) is independent of both R and v (d) depends on R and not on v 48 Which of the following while in motion cannot be deflected by magnetic field? [MHT CET] (a) Protons (b) Cathode rays (c) Alpha particles (d) Neutrons 49 The magnetic force on a charged particle moving in the field does no work, because [J&K CET] (a) kinetic energy of the charged particle does not change (b) the charge of the particle remains same (c) the magnetic force is parallel to velocity of the particle (d) the magnetic force is parallel to magnetic field 50 Identify the correct statement from the following. [J&K CET] (a) Cyclotron frequency is dependent on speed of the charged particle. (b) Kinetic energy of charged particle in cyclotron does not dependent on its mass. (c) Cyclotron frequency does not depend on speed of charged particle. (d) Kinetic energy of charged particle in cyclotron is independent of its charge. 51 Frequency of cyclotron does not depend upon [DUMET] (a) charge (b) mass (c) velocity (d) q / m
52 A proton is moving in a uniform magnetic field B in a circular path of radius a in a direction perpendicular to Z-axis along which field B exists. Calculate the angular momentum, if the charge on proton is e. [BCECE] (d) aeB (c) a 2 eB (b) eB 2 a (a) Be / a 2
2007 53 A man carrying suitable instrument for measuring electric and magnetic field passes by a stationary electron with velocity v. Then, these instruments will note [DCE] (a) electric field (b) magnetic field (c) Both (a) and (b) (d) None of these
54 The figure shows three situations when an electron with velocity v travels through a uniform magnetic field B. In each case, what is the direction of magnetic force on the electron? [AIIMS] y
y
y B
v
B
x
1
x
v
B z
x
z
2
v z
3
(a) +ve Z-axis, –ve X-axis, +ve Y-axis (b) –ve Z-axis, –ve X-axis and zero (c) +ve Z-axis, +ve X-axis and zero (d) –ve Z-axis, +ve X-axis and zero
55 The path of an electron in a uniform magnetic field may be (a) circular but not helical [AFMC] (b) helical but not circular (c) Neither helical nor circular (d) Either helical or circular 56 A beam of protons with velocity 4 × 105 ms −1 enters a uniform magnetic field of 0.3 T at an angle of 60° to the magnetic field. Find the radius of the helical path taken by the proton beam. [UP CPMT] (a) 0.2 cm (b) 1.2 cm (c) 2.2 cm (d) 0.122 cm 57 An electron is travelling along the x-direction. It encounters a magnetic field in the y-direction. Its subsequent motion will be [MHT CET] (a) straight line along the x-direction (b) a circle in the xz-plane (c) a circle in the yz-plane (d) a circle in the xy-plane 58 An electron and a proton enter in a magnetic field perpendicularly. Both have same kinetic energy. Which of the following is correct? [RPMT] (a) Trajectory of electron is less curved (b) Trajectory of proton is less curved (c) Both trajectories are equally curved (d) Both move on straight line path
551
MOVING CHARGES AND MAGNETISM
59 A charged particle is moving in a magnetic field of strength B perpendicular to the direction of the field. If q and m denote the charge and mass of the particle respectively, then the frequency of rotation of the particle is [KCET] qB qB 2πm 2π 2 m (b) f = (c) f = (d) f = (a) f = 2 2πm qB qB 2πm − 1 60 If velocity of an electron is ( 2i$ + 3$j ) ms and it enters in the magnetic field of 4k$ tesla, then [Guj CET] (a) it will move in the direction of the magnetic field (b) it will move in the opposite direction to the magnetic field (c) direction of its velocity will change (d) its speed will change
2006 61 When a charged particle moving with velocity v is subjected to a magnetic field of induction B, the force on it is non-zero. This implies that [CBSE AIPMT] (a) angle between v and B is necessarily 90° (b) angle between v and B can have any value other than 90° (c) angle between v and B can have any value other than zero and 180° (d) angle between v and B is either zero or 180°
62 A plane metallic sheet is placed with its face parallel to lines of magnetic induction B of a uniform field. A particle of mass m and charge q is projected with a velocity v from a distance d from the plane normal to the lines of induction. Then, the maximum velocity of projection for which the particle does not hit the plate is [Manipal] 2Bqd Bqd Bqd Bqm (a) (b) (c) (d) m m 2m d 63 An electron moves at right angle to a magnetic field of 1.5 × 10−2 T with a speed of 6 × 107 ms −1 . If the specific charge of the electron is 1.7 × 1011 Ckg −1 , the radius of the circular path will be [Manipal] (a) 2.9 cm (b) 3.9 cm (c) 2.35 cm (d) 2 cm 64 An electron revolves in a circle of radius 0.4Å with a speed of 105 ms −1 . The magnitude of the magnetic field, produced at the centre of the circular path due to the motion of the electron, (in Wb m −2 ) is [Kerala CEE] (a) 0.01 (b) 10 (c) 1 (d) 0.005 (e) 5
67 When deuterium and helium are subjected to an accelerating field simultaneously, then (a) both acquire same energy (b) deuterium accelerates faster (c) helium accelerates faster (d) neither of them is accelerated
[KCET]
68 A proton moving vertically downward enters a magnetic field pointing towards North. In which direction proton will deflect? [DUMET] (a) East (b) West (c) North (d) South 69 A very long straight wire carries a current I. At the instant when a charge + Q at point P has velocity v as shown, the force on the charge is [CBSE] Y Q P v I
(a) opposite to ox (c) opposite to oy
O
X
(b) along ox (d) along oy
2005 70 An electron projected in a perpendicular uniform magnetic
field of 3 × 10−3 T, moves in a circle of radius 4 mm. The linear momentum of electron (in kg-ms −1 ) is [MHT CET]
(a) 1.92 × 10−21
(b) 1. 2 × 10−24
(c) 1.92 × 10−24
(d) 1. 2 × 10−21
71 Cyclotron is a device which is used to [Punjab PMET] (a) measure the charge (b) measure the voltage (c) accelerate protons (d) accelerate electrons 72 A proton is projected with a velocity 107 ms −1 , at right angles to a uniform magnetic field of induction 100 mT. The time (in second) taken by the proton to traverse 90° arc is [EAMCET] (Take, mass of proton = 1.65 × 10−27 kg and charge of proton = 1.6 × 10−19 C) (a) 0. 81 × 10−7 (b) 1. 62 × 10−7 (d) 3. 24 × 10−7 (c) 2. 43 × 10−7
65 If velocity of a charged particle is doubled and strength of magnetic field is halved, then radius becomes [RPMT] (a) 8 times (b) 2 times (c) 4 times (d) 3 times
73 In a cyclotron if a deuteron can gain an energy of 40 MeV, then a proton can gain an energy of [DUMET] (a) 40 MeV (b) 80 MeV (c) 20 MeV (d) 60 MeV
66 A charged particle enters in a uniform magnetic field with a certain speed at right angles to it. In the magnetic field, a change could occur in its [J&K CET] (a) kinetic energy (b) angular momentum (c) linear momentum (d) speed
74 An electron moving in a uniform magnetic field of induction of intensity B , has its radius directly proportional to [DUMET] (a) its charge (b) magnetic field (c) speed (d) None of these
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 11 21 31 41 51 61 71
(d) (a) (c) (b) (c) (c) (c) (c)
2 12 22 32 42 52 62 72
(d) (b) (d) (c) (b) (c) (b) (b)
3 13 23 33 43 53 63 73
(a) (d) (c) (a) (c) (c) (c) (b)
4 14 24 34 44 54 64 74
(a) (d) (d) (a) (d) (c) (c) (c)
5 15 25 35 45 55 65
(a) (a) (b) (c) (c) (d) (c)
6 16 26 36 46 56 66
(a) (d) (a) (b) (a) (b) (c)
7 17 27 37 47 57 67
(a) (b) (d) (c) (c) (d) (d)
(c) (a) (d) (a) (d) (a) (a)
8 18 28 38 48 58 68
9 19 29 39 49 59 69
(c) (a) (b) (e) (a) (a) (d)
10 20 30 40 50 60 70
(a) (b) (d) (a) (c) (c) (c)
Explanations 1 (d) The centripetal force required for circular motion is provided by magnetic force mvp2 ⇒ = Bqvp r mvp r= ⇒ qB
… (i)
where, vp = perpendicular velocity of particle and q = charge on particle. As, momentum, p = mvp p [from Eq. (i)] r= ∴ qB According to the question, moment a of both particle is same. 1 ⇒ r∝ q For ionised hydrogen atom, qH = e and for α-particle, qα = 2 e rH qα 2e 2 ⇒ = = = or 2 : 1 rα qH e 1
2 (d) When a charge particle of charge
3
(q) is released from rest (u = 0) in the uniform magnetic field ( B ), then magnetic force on the charged particle. F = Bqu sinθ = 0, because u = 0. Therefore, the charge particle will not move on circular path. In the magnetic field, force on charge particle always acts in perpendicular direction to the direction of velocity of charge particle, therefore work done by magnetic field on charge particle is zero. Hence, Assertion and Reason both are incorrect. (a) Given, velocity of proton, v = 2i$ Magnetic field, B = ($i + 3$j + 4 k$ ) µT Electric field, E = 10$iµ Vm −1 Applied Lorentz force on the proton, F = qE + q(v × B) = q[ E + (v × B)] = 16 . × 10−19 [10 × 10−6 $i + 2$i × ($i + 3$j + 4 k$ ) × 10−6 ]
= 16 . × 10−19 × 10−6[10$i + 6k$ − 8$j ] F = 16 . × 10−25[10i$ − 8$j + 6k$ ]N ∴ Acceleration of proton, F a= (Q mp = 16 . × 10−27 kg) mp . × 10−25[10i$ − 8$j + 6k$ ] 16 . × 10−27 16 a = 100[10i$ − 8$j + 6k$ ] =
∴Magnetic force on the proton, Fm = B ev µ ev [From Eq. (ii)] = 0 ⋅ 2 ⋅ ev 4π r µ 0 e2v 2 ⋅ 4 π r2 From Eqs. (i) and (iii), we get Fm =
ke2 Fe k ⋅ 4π r2 = = Fm µ 0 e2v 2 v 2 ⋅ µ 0 ⋅ 4 π r2
∴ a = |a | = 100 102 + 82 + 62 = 100 × 14.14 = 1414 ms −2 ~ 1400 ms −2 −
. Fe 9 × 109 × 4 × 314 = Fm (4.5 × 105 )2 × 4 π × 10−7 = 4.4 × 105
4 (a) When an electron enters into a uniform magnetic field in perpendicular direction to the direction of magnetic field, then a magnetic force acts on the electron in perpendicular direction of both direction of magnetic field and direction of velocity of electron and direction of force can be determine by Fleming’s left hand rule. We know that, when direction of force on a particle is in perpendicular to the direction of velocity, then particle moves in uniform circular motion. Therefore, electron moving perpendicular to magnetic field (B) will perform circular motion. Hence, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
5 (a) Given, speed of proton, v = 4.5 × 105 ms −1
Electrostatic force between two protons, e2 Fe = k 2 r Magnetic field produced due to moving proton of speed v, µ ev B= 0⋅ 2 4π r
…(iii)
…(i)
…(ii)
6 (a) Charge on positron, q = e = 16 . × 10−19 C Mass of positron (m) = Mass of electron = 91 . × 10−31 kg ∴
. × 10−19 q 16 . × 1011 = 175 = m 91 . × 10−31 ~ 2 × 1011 Ckg −1 −
7 (a) As we know that, radius of a charged particle in a magnetic field B is given by mv …(i) r= qB where, r = charge on the particle and v = speed of the particle. ∴ The time taken to complete the circle, 2πr T m [from Eq. (i)] T = ⇒ = v 2π qB Here,
q = e, e = 176 . × 1011 C kg −1 m
and
B = 3.57 × 10−2 T
553
MOVING CHARGES AND MAGNETISM
⇒
2π eB = T m 1 e 1 f = B Q = f T 2π m 1 . × 1011 × 3.57 × 10−2 = × 176 2π = 10 . × 109 Hz = 1 GHz
8 (c) Force of charged particle,
F = qvB sinθ Force will be maximum, if θ = 90° i.e. if v is perpendicular to B.
∴
r=
2E m qB
⇒
r=
2Em qB
m
13 (d) Suppose, the velocity v of the particle entering the magnetic field B instead of being perpendicular to B makes an angle with it.
9 (c) In cyclotron, Force on charge = Centripetal force mv 2 ∴ Bqv = r mv r= ⇒ r∝v ⇒ Bq
10 (a) When a magnetic field is applied on a stationary electron, it remains stationary. Because F = q( v × B) If v = 0 ⇒ F = 0
11 (a) By Fleming’s left hand rule, if the particle is moving and magnetic field is perpendicular to the velocity, then the particle experience a force as shown.
B
Then, v may be resolved into two components, v = v cosθ parallel to B and v⊥ = v sinθ perpendicular to B. The component v gives a linear path and the component v⊥ gives a circular path to the particle. The resultant of these two is a helical path whose axis is parallel to the magnetic field.
14 (d) Consider the diagram, where a charged particle of mass m and charge q moves along a circular path. Anti-clockwise as shown. Magnetic field B is assumed to be into plane of paper and of constant magnitude. v
Z F r
Y P +q
(m, q) ×B
B
90° v X
12 (b) Given, kinetic energy = E, mass = m, magnetic field = B and charge = q. We know that, F = qvB sinθ (motion of a charged particle in a uniform magnetic field) If θ = 90°, then F = qvB ...(i) We know that centripetal force, mv 2 …(ii) F= r From Eqs. (i) and (ii), we get mv 2 mv qvB = ,r= r qB 1 2 2E Q E = 2 mv , v = m
15 (a) Initial acceleration, a0 =
∴
T = Time taken to complete one revolution 2π 2π 2πr ⇒ T = = = v/r v ω 2π mv = [From Eq. (i)] v qB =
2πm qB
…(i)
a0m e
ev0 B + eE = 3a0 m
ev0 B + eE = 3a0m ∴ ev0 B = 3ma0 − eE ⇒ = 3ma0 − ma0 [from Eq. (i)] ⇒ ev0 B = 2ma0 2ma0 B= ∴ ev0 or
The direction of electric field is along direction of force, hence towards West. The direction of magnetic field is up.
16 (d) As shown in figure, E B v
e–
B, E and v are in same direction. Due to electric field (E), force on e− will be opposite to its velocity (v) As, angle between v and B is zero (0°). Hence, Fm = qv × B = qVB sinθ = 0 Hence, electron velocity will decrease in magnitude.
17 (b) Radius of circular path, R=
Clearly, centripetal force for the circular movement of the charge will be provided by magnetic Lorentz force (qv × B). mv 2 Hence, = qvB sin 90° r 2 mv ⇒ = qvB r mv …(i) ⇒ r= qB
E=
⇒
eE m
2m(KE ) qB q ∝ m(KE )
So,
e = 2e
Hence,
(mp )(1MeV) (4 me )(KE )
1 1 or = 4 4 KE Energy of α- particle, K = 1 MeV
18 (a) We have, r= r1 = r2 Hence,
2mqV = qB
2mV qB 2
m1 m r2 ⇒ 1 = 12 m2 m2 r2
m1 (2)2 4 = = m2 (3)2 9
19 (a) When v ⊥ B, charge q performs circular path.
554
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
20 (b) Given, θ = 23° ,
27 (d) For a charged particle, entering −3
B = 2.6 mT = 2.6 × 10 T and F = 6.5 × 10
−17
N
We know that , F = qvB sinθ 6.5 × 10−17 = 16 . × 10−19 × v × 2.6 × 10−3 × sin 23° v=
6.5 × 10−17 . × 10−19 × 0.39 2.6 × 10−3 × 16
∴ v = 4 × 105 ms−1
21
mv (c) Radius, r = qB or
. × 10−31 × 1.3 × 106 mv 91 B= = qr . × 10−19 × 0.35 16 = 2.1 × 10−5 T
22 (d) By Fleming’s left hand rule, the
23
field is in outward or +ve z-direction and velocity is in +ve x-direction. So, the electron will deflect in +ve y-direction (c) In this case, magnetic force provides necessary centripetal force, mv 2 i.e. qvB = r mv 2mE Radius of path, r = = Bq qB
or
2m1E1 2mE r= = Bq Bq mE (2m1 ) E1 = = × 50 keV m1 m1 [Q m = 2m1 for deuteron] = 100 keV
24 (d) The component of velocity perpendicular to H will make the motion circular, while that parallel to H will make it move along a straight line. The two together will make the motion helical.
25 (b) A charged particle moves in a
26
straight line under the action of an electric field, whereas it moves in a circular path under the action of a magnetic field. Thus, for the particle moving in a circular path, E = 0, B ≠ 0 mv (a) Radius of circular path, ra = a a qB mv and rb = b b qB According to question, ra > rb ∴
ma va mb vb or ma va > mb vb > qB qB
perpendicular to a magnetic field will execute a circular path. Such that,
33 (a) Net force acting on electron is zero as
Fm = evB sin 0° = 0 I
Fm = qvB sinθ = mν 2 / r ⇒
q v = m rB sinθ
⇒
4 × 106 q = −2 m 2 × 10 × 2 × sin 90°
⇒
B e–
I
28 (d) According to Fleming’s left hand
34 (a) q = −2µC, v = (2$i + 3$j) × 106 ms−1 ,
rule, the force on the charge will be towards West.
B = 2T along y-direction B = 2$j
29 (b) Magnetic force, F = qvB sinθ F = (1.6 × 10−19 ) × (2 × 107 ) ∴ × (1.5)sin 30°
Q Magnetic force, F = q( v × B) = (−2 × 10−6 C)[(2i$ + 3$j) × 106 × 2$j ]
1 2
= (−2 × 10−6 )[ 4 ($i × $j) × 106 ] [Q $j × $j = 0]
F = 2.4 × 10−12 N
30 (d) In a perpendicular magnetic field, Magnetic force = Centripetal force 2
= −8 k$ = 8 N along −z-direction
35 (c) As a charged particle enter magnetic field perpendicular
mv mv i.e. Bqv = ⇒ r= r Bq ∴
r1 v1 B2 (m and q are same) = × r2 v2 B1 r1 1 1 = × r2 2 2
⇒
r2 = 4 r1 ⇒ r2 = 4 r
31 (b) When particle describes circular path in a magnetic field, its velocity is always perpendicular to the magnetic force. Power, P = F ⋅ v = Fv cosθ Here, θ = 90° ∴ P=0 W But P= t ⇒ W = P×t Hence, work done, [everywhere] W =0
32 (c) When electron moves in both electric and magnetic fields such that it moves along a straight line, then qE = qvB E 1500 v= = = 3750 ms−1 B 0.40 v = 3.75 × 103 ms−1
Fm
Hence, work done = zero.
q/ m = 108 C kg–1
F = 1.6 × 10−12 × 2 × 1.5 ×
Fm
⇒
mv 2 = qvB sinθ r mv 2Km r= = qB qB m q
r∝
[For, K 1 = K 2]
where, K = kinetic energy. Hence, Reason is incorrect. rp mp qHe Also, = rHe mHe qp =
1 2 × =1 4 1
rp = rHe ⇒ Assertion is correct.
36 (b) v = x$i + y$j , B = y$i + x$j As, F = q( v × B) F = q[(x$i + y$j) × (y$i + x$j)] = q[ x 2 (k$ ) − y2 (k$ )] = q(x 2 − y2 )k$ If x = y ⇒ F = 0 Also, x > y ⇒ F ∝ (x 2 – y2 )
555
MOVING CHARGES AND MAGNETISM
37 (c) As, r =
mv qB
2πr Also, T = time period = vB 2πmv 2πm = = qBv qB
⇒
38
1 qB =F = T 2πm 1 F∝ m
⇒ Li + has maximum mass, hence Li + will have minimum frequency. mv (a) As, r = qB Here, v and B are constants, m r∝ q r1 m1 q2 ⇒ = r2 m2 q1 r1 1m 2e = r2 4 m 1 e ⇒
r1 1 = r2 2
39 (e) Magnetic Lorentz force is given as F = q( v × B)
40 (a) Magnetic Lorentz force will provide required centripetal force. mv 2 Hence, = qvB R qB 1 = mv R q 1 v = ⇒ m R B ⇒
1 q ∝ m R
41 (c) When a charged particle enters a uniform magnetic field perpendicularly, then the charged particle executes circular motion. Such that its velocity changes but speed v remains constant. The force on the charged particle (Fm = qvB ) only change the direction of v. Hence, KE is remains constant.
42 (b) Cyclotron can accelerate
α-particles (positive charge particle).
43 (c) ⇒
r1 m1 q2 = r2 m2 q1 r1 1 = r2 2
44 (d) When a charged particle (positive) enter a uniform magnetic field with uniform velocity. ⇒ If B and v are in same direction, F = 0 i.e. path will be straight line. ⇒ If B and v are perpendicular, F = q ( v × B) F = qvB sinθ = qvB i.e. path will be circular. ⇒ If B and v have any angle θ [i.e. other than 0° and 90°] i.e. path will be helix.
45 (c) After passing through a magnetic field, the magnitude of its mass and velocity of the particle remain same, so its energy does not change, i.e. kinetic energy will remain T.
46 (a) At right angle to magnetic field, charged particles move on circular path at which magnetic force provides necessary centripetal force to keep it moving on circular path. i.e. ∴
mv 2 r mv = r= qB
qvB =
2mE q2 B 2
where, E = kinetic energy of the particle.
and
rp =
2mE e2 B 2
rd =
2 × 2m × E e2 B 2
ra =
2 × 4m × E (2e)2 B 2
∴ rp : rd : ra = 1 : 2 : 1
47 (c) When magnetic field is perpendicular to motion of charged particle, then centripetal force = magnetic force i.e. or
mv 2 = Bqv R mv R= Bq
Further, time period of the motion, mv 2π Bq 2πR T = = v v 2πm or T = Bq It is independent of both R and v.
48 (d) The protons, cathode rays and the alpha particles are charged particles, so these are deflected by the magnetic field. But neutrons have no charge, so these are not deflected by magnetic field.
49 (a) The magnetic force on a charged particle moving in the field does no work, because the kinetic energy of the charged particle does not change.
50 (c) Cyclotron frequency,
or
n=
v 1 = T 2πr
n=
v Bq 2π mv
mv Q r = Bq
Bq 2πm Thus, cyclotron frequency does not depend upon the speed of the charged particle. The maximum kinetic energy of charged particle is q2 B 2 2 Emax = r 2m or
n=
Thus, KE depends on both the mass and charge of particle.
51 (c) Frequency of cyclotron, ν=
1 Bq = T 2πm
which does not depend upon the velocity of particle.
52 (c) Under uniform magnetic field, force evB acts on proton and provides the necessary centripetal force mv 2/a. mv 2 = evB ∴ a aeB …(i) or v= m Now, angular momentum, J = r × p Here, J = a × mv Putting the value of v from Eq. (i), we get aeB 2 J = a× m = a eB m
53 (c) It will measure both electric and magnetic field when he passes by a stationary electron with some velocity v, as there is a relative motion between them.
54 (c) According to Fleming’s left hand rule, in Figs. (1) and (2), magnetic force on the electron will be directed in + ve Z-axis and + ve X-axis, respectively. In
556
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Fig. (3), velocity of electron and direction of magnetic field are anti-parallel, so no force will act on electron. uniform magnetic field is either helical or circular as a centripetal force produces a circular motion perpendicular to the magnetic field B because of force F = q( v × B), where v is the velocity of electron and q is the charge. If v and B are perpendicular to each other, then particle will describe a circle, but if v is not perpendicular to B, then component of v along B remains unchanged as the motion along the magnetic field will not be affected by the magnetic field. Hence, motion perpendicular to B will be circular producing helical motion as given below ×
×
×
× v × q
F
× × × Circular motion Y
vI
61 (c) When a charged particle q is
y
∴
55 (d) The path of an electron in a
×
F = q( v × B) Here, q = e, v = vxi$ and B = B $j F = evx B y (i$ × $j) = evx B yk$ Hence, subsequent motion of the charged particle will be a circle in the xy-plane.
58 (a) When a charged particle enters a magnetic field perpendicularly, it moves on a circular path. The required centripetal force is provided by magnetic force. i.e. Magnetic force = Centripetal force mv 2 or qvB = r …(i) ∴ r = mv / qB Now, kinetic energy of the particle, 1 K = mv 2 2 mv = 2mK ⇒ Therefore, Eq. (i) becomes
Helical motion
v
r=
2mK qB
moving in a uniform magnetic field B with velocity v such that angle between v and B be θ, then due to interaction between the magnetic field produced due to moving charge and magnetic field applied, the charge q experiences a force which is given by F = qvB sinθ If θ = 0° or 180°, then sinθ = 0 ∴ F = qvB sinθ = 0 Since, force on charged particle is non-zero, so angle between v and B can have any value other than zero and 180°.
62 (b) The charged particle bends in a circle of radius r. ∴ Bqv sin ⇒
r∝ m
or
X
⇒
re = rp
∴
56 (b) Radius of the helical path,
As
B
Z Radius
r=
m(v sin θ ) qB
Given, m = 167 . × 10−27 kg , v = 4 × 105 ms−1, θ = 60° . × 10−27 × 4 × 105 × ( 3 / 2) 167 ∴ r= . × 10−19 × 0.3 16 = 0.012 m = 1. 2 cm
57 (d) If a particle carrying charge q and moving with velocity v through a point in magnetic field B experiences a deflecting force F given by y
F
or or ∴
mv 2 r Bq = mω Bq = m2πf Bq f = 2πm
Bqv =
60 (c) Here, q = −e, v = (2i$ + 3$j) ms−1 and B = 4 k$ T ∴ Fm = q( v × B) = − e[(2i$ + 3$j) × 4 k$ ]
⇒ Fm = 4 e[ 2$j − 3$i ]N x
vmax
63 (c) The formula for radius of circular path is r=
Here, (as v = rω) (Q ω = 2πf )
⇒ Fm ⊥v ⇒ Direction of its velocity will change.
Bqd m Bqd = m
v≤
59 (a) Lorentz force = Centripetal force
= − e[ 8( i$ × k$ ) + 12 ( $j × k$ )] = − e[ −8$j + 12$i ]
BY vx
me < mp , so, re < rp . Hence, trajectory of electron is less curved.
i.e.
q = 16 . × 10−19 C, B = 0.3T
me mp
π Q sin = 1 2
The particle does not hit the plate, if r≤d mv or ≤d Bq
or
vII
r
π mv 2 = r 2 mv r= Bq
∴
mv v = eB e B m
e = 17 . × 1011 C kg–1 m r=
6 × 107 1. 7 × 1011 × 1. 5 × 10−2
= 2. 35 × 10−2 m = 2. 35 cm
64 (c) Given, r = 4 × 10−11 m and v = 105 ms−1 µ I B= 0 2r − ev −e − e As, I = = = T 2πr 2πr v µ − ev −µ 0ev ∴ B = 0 = 2r 2πr 4 πr 2
…(i)
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MOVING CHARGES AND MAGNETISM
Magnitude of B (10−7 ) × 16 . × 10−19 × 105 = 16 × 10−22
71 (c) Cyclotron is a device which is used
Alternative Method Force on proton in magnetic field. y (North)
(Q µ 0 = 4 π × 10–7 TmA–1 )
72
16 . × 10 = 16 = 1 T or Wb m
65
B z (East) −2
v x (Vertically downward)
mv 2 (c) qvB = r mv r= ⇒ qB ∴
r′ =
F = q( v × B) ^
m × 2v = 4r q × B/2
∴
^
^
magnetic field B, F = q( v × B) = qvB [Q θ = 90° ] …(i) and centripetal force, mv r
^
F = q(v i × B j) ^
= qvB k
66 (c) Force acting on particle due to
F=
^
Given, v = v i , B = B j
rule, the direction of magnetic field at point P in plane of paper is perpendicular to the plane of paper inwards, i.e. along z-direction.
v
Now, since charge is moving along x-direction, therefore from Fleming’s left hand rule stretching the forefinger in direction of paper inwards the thumb will indicate the direction of force F acting on the charged particle along oy-direction.
F F v
From Eqs. (i) and (ii), we get mv linear momentum B= = rq charge
Alternative Method As discussed above, B acts inwards into plane of the paper and v is along OX , hence
Since, charge is constant, so change will occur in linear momentum.
F = Q ( v × B) $i $j
67 (d) When deuterium and helium are
of current. So, the direction of current is vertically downward. According to Fleming’s left hand rule, if middle finger represents the direction of current and forefinger represents the direction of magnetic field, then thumb will represent the direction of Lorentz force acting on the proton which deflects the proton in East direction.
Distance covered by proton to traverse 1 90° arc = × circumference 4 1 πr d = × 2πr = 4 2 Time taken by proton to cover distance d, r πm πr / 2 πr π …(i) t= = = = v 2v 2 Bqr / m 2 Bq Putting, m = 1. 65 × 10−27 kg , B = 100 mT = 100 × 10−3 T
69 (d) According to Maxwell’s cork screw
…(ii)
68 (a) Proton will represent the direction
^
Hence, force will act on the proton in z-direction, i.e. towards East.
2
subjected to an accelerating field, neither of them will be accelerated as both of them are neutral. As ions have positive or negative charge, they get accelerated by an electric field or magnetic field moving perpendicular to the field. As, Lorentz force F is exerted due to charge (q), this force cannot be exerted in absence of charge or for neutral particles.
^
(Q i × j = k )
to accelerate positively charged particles, e.g. protons, deuterons, etc. Bqr (b) Velocity of proton, v = m where, r = radius of circular path.
∴ t=
3.14 × 1.65 × 10−27 2 × 100 × 10−3 × 1.6 × 10−19
t = 1.62 × 10−7 s mv 2 = centripetal force r 1 B 2q2r2 Maximum energy, E = 2 m Hence, ratio of energy of deuteron and proton is
73 (b) F = qvB =
2
Ed qd mp = Ep qp md 2
40 q m = Ep q 2m
k$
0 =Q v 0 0 0 −B = Q[ $i (0) − $j(− vB ) + k$ (0)] = + $jQvB i.e. force is along oy-direction.
70
q = 1.6 × 10−19 C, in Eq. (i)
and
mv 2 (c) = evB r mv ⇒ r= eB As for a particle in motion, p = mv mv p = ∴ r= eB eB ⇒ p = eBr ∴ p = 16 . × 10−19 × 3 × 10−3 × 4 × 10−3 = 192 . × 10−24 kg-ms−1
⇒
Ep = 80 MeV
74 (c) The force due to magnetic field acting on the electron of mass m, …(i) F = evB The centripetal force is given by mv 2 …(ii) r where, r is radius of circular path. Equating Eq. (i) with Eq. (ii), we get F=
F = qvB = ⇒
r=
mv 2 r
mv qB
⇒ r∝v Hence, the radius is directly proportional to speed.
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 3 Force and Torque on a Current Carrying Conductor 2019 1 A magnetic needle suspended parallel to a magnetic field require 3J of work to turn it through 60°. The torque needed to maintain the needle in this portion will be (a) 2 3 J
(b) 3 J
3 (d) J 2
(c) 3 J
2018 3 A metallic rod of mass per unit length
0.5 kg m −1 is lying horizontally on a smooth inclined plane which makes an angle of 30° with the horizontal. The rod is not allowed to slide down by flowing a current through it, when a magnetic field of induction 0.25 T is acting on it in the vertical direction. The current flowing in the rod to keep it stationary is [NEET] (a) 14.76 A (b) 5.98 A (c) 7.14 A (d) 11.32 A
4 The magnetic moment of an electron orbiting in a circular orbit of radius r with a speed v is equal to (a) evr/2 (b) evr [JIPMER] (c) er/2v (d) None of these 5 A current carrying loop is placed in a uniform magnetic field. The torque acting on it does not depend upon (a) shape of loop (b) area of loop [JIPMER] (c) value of current (d) magnetic field
2016 6 A square loop ABCD carrying a current i, is placed near and coplanar with a long straight conductor XY carrying a current I, the net force on the loop will be [NEET] B
I
X
A L/2
µ Ii (a) 0 2π
C
i
2µ 0 IiL (b) 3π
L
[MHT CET] 2
(a)
BR 2πµ 0
(b)
2πBR µ0
3
2
(c)
BR 2πµ 0
(d)
2πBR 2 µ0
8 The ratio of magnetic dipole moment of an electron of charge e and mass m in Bohr’s orbit in hydrogen atom to its angular momentum is [MHT CET] e m 2m e (b) (c) (d) (a) m e e 2m 9 An electron in a circular orbit of radius 0.05 nm performs 1016 revolutions per second. The magnetic moment due to this rotation of electron is (in A-m 2 ) [WB JEE] (b) 3.21× 10−22 (a) 2.16× 10−23 (d) 1.26× 10−23 (c) 3.21× 10−24 10 A circular coil of radius 10 cm and 100 turns carries a current 1 A. What is the magnetic moment of the coil? (a) 3.142 × 104 A-m 2 (b) 104 A-m 2 [KCET] (c) 3.14 A-m 2 (d) 3 A-m 2 11 Two thin long conductors separated by a distance d carry currents I 1 and I 2 in the same direction. They exert a force F on each other. Now, the current in one of them is increased to two times and its direction is reversed. The distance is also increased to 3d. The new value of force between them is [UK PMT] F 2F F (a) −2F (b) (c) − (d) − 3 3 3 12 A particle with charge q is moving along a circle of radius R with uniform speed v. The associated magnetic moment [EAMCET] µ is given by 1 1 1 1 (c) qvR (d) q 2 vR (b) q vR (a) v 2 R 2 4 2 2 13 A wire of length L metre carrying a current I ampere is bent in the form of a circle. The magnitude of the magnetic moment is [EAMCET]
D L
µ IiL (c) 0 2π
loop carrying current is B. The magnetic moment of the loop of radius R is ( µ 0 = permeability of free space)
[AIIMS]
2 α-particle is revolving in a circular path with radius r with speed v, then find the value of magnetic dipole moment. [AIIMS] (a) 2 evr (b) evr (c) 3 evr (d) 4 evr
Y
2014 7 Magnetic induction produced at the centre of a circular
2µ 0 Ii (d) 3π
(a)
L2 I 2 4π
(b)
LI 4π
(c)
L2 I 4π
(d)
LI 4π
559
MOVING CHARGES AND MAGNETISM
2013 14 A current loop in a magnetic field
[NEET]
(a) experiences a torque whether the field is uniform or non-uniform in all orientations (b) can be in equilibrium in one orientation (c) can be equilibrium in two orientations, both the equilibrium states are unstable (d) can be in equilibrium in two orientations, one stable while the other is unstable
15 A small circular flexible loop of wire of radius r carries a current I. It is placed in a uniform magnetic field B. The tension in the loop will be doubled, if [UP CPMT] (a) I is doubled (b) B is halved (c) r is doubled (d) both B and I are doubled 16 Two parallel wires carrying currents in the same direction attract each other because of [UP CPMT] (a) potential difference between them (b) mutual inductance between them (c) electric force between them (d) magnetic force between them 17 A rectangular loop carrying a current i is situated near a long straight wire such that the wire is parallel to one of the sides of the loop and is in the plane of the loop. If a steady current I is established in the wire as shown in the figure, the loop will (a) rotate about an axis parallel to the wire (b) move away from the wire (c) move towards the wire (d) remain stationary
I
I
21 Two very long straight parallel wires carry currents i and 2i in opposite directions. The distance between the wires is r. At a certain instant of time a point charge q is at a point equidistant from the two wires in the plane of the wires. Its instantaneous velocity v is perpendicular to this plane. The magnitude of the force due to the magnetic field acting on the charge at this instant is [KCET] 3µ 0 iqv (a) zero (b) 2π r µ 0 iqv µ 0 iqv (c) (d) π r 2π r 22 The torque required to hold a small circular coil of 10 turns, area 1 mm 2 and carrying a current of ( 21/ 44 ) A in the middle of a long solenoid of 103 turns/ m carrying a current of 2.5 A with its axis perpendicular to the axis of the solenoid is [KCET] Solenoid Coil B Axis
(a) 1.5 × 10−6 N-m (c) 1.5 × 10+6 N-m
(b) 1.5 × 10−8 N-m (d) 1.5 × 10+8 N-m
2010 23 A square current carrying loop is suspended in a uniform [WB JEE]
2012 18 A straight wire of length 2 m carries a current of 10 A. If this wire is placed in uniform magnetic field of 0.15 T making an angle of 45° with the magnetic field, the applied force on the wire will be [CBSE AIPMT] 3 N (d) (a) 1.5 N (b) 3 N (c) 3 2 N 2
2011 19 A wire of length l is bent in the form of circular coil of some turns. A current i flows through the coil. The coil is placed in a uniform magnetic field B. The maximum torque on the coil can be [NCERT Exemplar] iBl 2 iBl 2 iBl 2 2iBl 2 (b) (c) (d) (a) 2π 4π π π 20 A square coil of side 10 cm consists of 20 turns and carries a current of 12 A. The coil is suspended vertically and the normal to the plane of the coil makes an angle of 30° with the direction of a uniform horizontal magnetic field of magnitude 0.80 T. What is the magnitude of torque experienced by the coil? [NCERT Exemplar] (a) 0.96 N-m (b) 2.06 N-m (c) 0.23 N-m (d) 1.36 N-m
magnetic field acting in the plane of the loop. If the force on one arm of the loop is F, the net force on the remaining three arms of the loop is [CBSE AIPMT] (a) 3F (b) −F (c) −3F (d) F
24 A coil in the shape of an equilateral triangle of side 0.02 m is suspended from its vertex such that it is hanging in a vertical plane between the pole pieces of permanent magnet producing a uniform field of 5 × 10−2 T. If a current of 0.1 A is passed through the coil, what is the couple acting? [AIIMS] −7 (a) 5 3 × 10 N-m (b) 5 3 × 10−10 N-m 3 (c) × 10−7 N-m 5 (d) None of the above
25 Assertion Torque on the coil is the maximum when coil is suspended in a radial magnetic field. Reason The torque tends to rotate the coil on its own axis. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
560
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
26 Magnetic field at the centre of a circular loop of area A is [AFMC] B. The magnetic moment of the loop will be BA 2 BA 3/ 2 BA 3/ 2 2BA 3/ 2 (b) (c) (a) (d) µ 0π µ 0π µ 0 π 1/ 2 µ 0 π 1/ 2 27 Two thin long parallel wires separated by a distance b are carrying a current i ampere each. The magnitude of the force per unit length exerted by one wire on the other, is [Manipal] µ i µ i2 (b) 0 2 (a) 02 b 2πb µ 0i µ 0i2 (d) (c) 2πb 2πb 28 The ratio of magnetic field and magnetic moment at the centre of a current carrying circular loop is x. When both the current and radius are doubled, the ratio will be [WB JEE] (a) x/8 (b) x/4 (c) x/2 (d) 2x
2008 34 A closed loop PQRS carrying a
P current is placed in a uniform magnetic field. If the magnetic forces F1 on segments PS , SR and RQ are F1 , F2 and F3 respectively and are in S R the plane of the paper and along the directions shown, the force on the F2 segment QP is [CBSE AIPMT] (a) F3 − F1 − F2 (b) ( F3 − F1 ) 2 + F22
(c) ( F3 − F1 ) 2 − F22
current of 2 A. It is suspended in mid-air by a uniform horizontal magnetic field B. The magnitude of B (in tesla) is (assume, g = 9.8 ms −2 ) [JCECE] (a) 2 T (b) 1.5 T (c) 0.55 T (d) 0.65 T
32 A conducting rod of length l and B mass m is moving down a smooth inclined plane of inclination θ with constant velocity v. A current i is v flowing in the conductor in a direction perpendicular to paper θ inwards. A vertically upwards l magnetic field B exists in space. Then, magnitude of magnetic field B is [JCECE] mg mg mg cos θ mg (a) (d) sin θ (b) tan θ (c) il il il ilsin θ 33 The magnetic dipole moment of current loop i, independent of (a) magnetic field in which it is lying (b) number of turns (c) area of the loop (d) current in the loop
(d) F3 − F1 + F2
R
B
P
(a) BIl, 0
I
Q
I
(b) 2BIl, 0
[JCECE, AFMC]
(c) 0, BIl
(d) 0, 0
36 Two streams of protons move parallel to each other in the same direction. Then, these [BHU] (a) do not interact at all (b) attract each other (c) repel each other (d) get rotated to be perpendicular to each other 37 Consider two straight parallel conductors A and B separated by a distance x and carrying individual currents I A and I B , respectively. If the two conductors attract each other, it indicates that [J&K CET] (a) the two currents are parallel in direction (b) the two currents are anti-parallel in direction (c) the magnetic lines of induction are parallel (d) the magnetic lines of induction are parallel to length of conductors 38 The resultant force on the current loop PQRS due to a long current carrying conductor will be [KCET] R
S
15 cm
2009 31 A straight wire of mass 200 g and length 1.5 m carries a
F3
35 A wire PQR is bent as shown in figure and is placed in a region of uniform magnetic field B. The length of PQ = QR = l. A current I ampere flows through the wire as shown. The magnitude of the force on PQ and QR will be
29 A wire of length L is bent in the form of a circular coil and current i is passed through it. If this coil is placed in a magnetic field, then the torque acting on the coil will be maximum when the number of turns is [Haryana PMT] (a) as large as possible (b) any number (c) 2 (d) 1 30 3 A of current is flowing in a linear conductor having a length of 40 cm. The conductor is placed in a magnetic field of strength 500 G and makes an angle of 30° with direction of the field. It experiences a force of magnitude (a) 3 × 104 N (b) 3 × 102 N [JCECE] −4 −2 (d) 3 × 10 N (c) 3 × 10 N
Q
20 A 20 A P 2 cm
[KCET]
10 cm
Q
(a) 10−4 N
(b) 3.6 × 10−4 N
(c) 1. 8 × 10−4 N
(d) 5 × 10−4 N
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MOVING CHARGES AND MAGNETISM
2007 39 A proton with energy of 2 MeV enters a uniform
45 In the given figure, the loop is fixed but straight wire can move. The straight wire will
magnetic field of 2.5 T normally. The magnetic force on the proton is [Kerala CEE] (Take, mass of proton to be 1.6 × 10−27 kg) (a) 3 × 10−12 N (b) 8 × 10−10 N (c) 8 × 10−12 N (d) 2 × 10−10 N (e) 3 × 10−10 N
40 Two free parallel wires carrying currents in the opposite directions [J&K CET] (a) attract each other (b) repel each other (c) do not affect each other (d) get rotated to be perpendicular to each other 41 A and B are two infinitely long straight parallel conductors. C is another straight conductor of length 1 m kept parallel to A and B as shown in the figure. Then, the force experienced by C is [KCET] (a) towards A equal to 0.6 × 10−5 N (b) towards B equal to 5.4 × 10−5 N (c) towards A equal to 5.4 × 10−5 N (d) towards B equal to 0.6 × 10−5 N
A
C
B
3A
2A
5 cm
4A
8 cm
42 Currents of 10 A and 2 A are passed through two parallel wires A and B respectively, in opposite directions. If the wire A is infinitely long and length of the wire B is 2 m, the force acting on the conductor B which is situated at 10 cm distance from A will be [Guj CET] (a) 5 × 10−5 N (b) 4π × 10−7 N (c) 8 × 10−5 N (d) 8π × 10−7 N
2006 43 Graph of force per unit length between two long parallel currents carrying conductor and the distance between them is [J&K CET] (a) straight line (b) parabola (c) ellipse (d) rectangular hyperbola
44 A long horizontal rigidly supported wire carries a current I a = 96 A. Directly above it and parallel to it at a distance, another wire of 0.144 N weight per metre carrying a current I b = 24 A, in a direction opposite to that of I a . If the upper wire is to float in air due to magnetic repulsion, then its distance (in mm) from the lower wire is [EAMCET] (a) 9.6 (b) 4.8 (c) 3.2 (d) 1.6
I1
[AMU]
(a) remain stationary (b) move towards the loop (c) move away from the loop (d) rotates about the axis
2005 46 A coil in the shape of an equilateral triangle of side l is suspended between the pole pieces of a permanent magnet such that B is in plane of the coil. If due to a current i in the triangle a torque τ acts on it, the side l of the triangle is [CBSE AIPMT] (a)
2 τ 3 BI
1/ 2
τ (c) 2 3BI
(b)
2 τ 3 BI
(d)
1 τ 3 BI
1/ 2
47 Three long, straight and parallel wires carrying currents are arranged as shown in the figure. The wire C which carries a current of 50 A, so placed that it experiences no force. The distance of wire C from wire A is [UP CPMT] C
A 15 A
10 A
50 A
x
(a) 9 cm (c) 5 cm
B
(15– x)
(b) 7 cm (d) 3 cm
48 Two parallel wires carrying currents in opposite direction repel each other because of [UP CPMT] (a) potential difference between them (b) mutual inductance between them (c) electric force between them (d) magnetic force between them 49 A circular coil of 20 turns and radius 10 cm is placed in uniform magnetic field of 0.10 T normal to the plane of the coil. If the current in coil is 5 A, then the torque acting on the coil will be [J&K CET] (a) 31.4 N-m (b) 3.14 N-m (c) 0.314 N-m (d) zero
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 11 21 31 41
(b) (c) (a) (d) (d)
(b) (c) (b) (b) (c)
2 12 22 32 42
3 13 23 33 43
(d) (c) (b) (a) (d)
4 14 24 34 44
(a) (d) (a) (b) (c)
5 15 25 35 45
(a) (a) (b) (c) (b)
6 16 26 36 46
(d) (d) (d) (c) (c)
7 17 27 37 47
(b) (c) (d) (a) (a)
8 18 28 38 48
(d) (d) (a) (d) (d)
(d) (b) (d) (c) (d)
9 19 29 39 49
10 20 30 40
(c) (a) (c) (b)
Explanations 1 (b) W = U f −U i = MB [cos 0°− cos 60° ]
⇒
MB = 3J 2 ⇒ MB = 2 3 J ⇒
I =
mg sin θ mg = tan θ LB cos θ LB
m g tan θ I = L B m Here, = 0.5 kg m −1 , L
Torque required, τ = M × B = MB sin 60° 3 =2 3× =3J 2
3 (d) As, the system is in equilibrium, ΣFx = 0 According to the question,
I
co
s
B = 0.25 T Substituting the given values in Eq. (ii), we get 0.5 × 9.8 I = tan 30° 0.25 0.5 × 9.8 1 = × 0.25 3 = 11.32 A
4 (a) Magnetic moment, M = NiA where, N = number of turns of the current loop and i = current. Since, the orbiting electron behaves as a current loop of current i, we can write e e ev i= = = T 2πr / v 2πr
q
v
q F
m
g
q sin q
B
Y
C
i
L
g = 9.8 ms , θ = 30°,
Time period of α-particle, 2π r T = v ∴ Current associated by α-particle, q 2e ev …(i) I = = ⇒ I = T 2πr πr v Magnetic dipole moment, ev ⋅ πr 2 µ =I⋅A= πr ∴ µ = evr
F
6 (d) Consider the given figure,
−2
2 (b) Charge on α-particle, q = 2e
B
…(ii)
Thus, torque does not depends on shape of loop.
mg
or mg sin θ = F cos θ …(i) where, F is the magnitude of force experienced by the rod when placed in a magnetic field and current I is flowing through it. But the force experienced by the given rod in a uniform magnetic field is F = ILB ∴ Eq. (i) becomes, mg sin θ = ILB cos θ
where, A = area of the loop = πr2. ⇒
evr ev 2 M = (1) (πr ) = 2πr 2
5 (a) The torque acting on a current carrying loop is given by τ = MB cosθ = NiAB cosθ [Q M = NiA ] where, N = number of turns, i = current of loop, A = area of loop and B = magnetic field.
X
A L/2
D L
From the above figure, it can be seen that the direction of currents in a long straight conductor XY and arm AB of a square loop ABCD are in the same direction. So, there exist a force of attraction between the two, which will be experienced by AB as µ IiL FBA = 0 L 2π 2 In the case of XY and arm CD , the direction of currents are in the opposite direction. So, there exist a force of repulsion which will be experienced by CD as µ 0IiL FCD = 3L 2π 2 Therefore, net force on the loop ABCD will be Floop = FBA − FCD µ IiL 1 1 = 0 − 2π (L / 2) (3L / 2) ∴ Floop =
2µ 0iI 3π
7 (b) Magnetic moment, M = Current × Area enclosed by loop …(i) =I×A Magnetic induction at the centre of circular loop, 2 BR µ I ...(ii) B= 0 ⇒ I = µ0 2R Here, A = πR 2 .....(iii)
563
MOVING CHARGES AND MAGNETISM
Substituting Eqs. (ii) and (iii) in
The field is perpendicularly inward.
Eq. (i), we get 2 BR 2πBR 3 M = × πR 2 = µ0 µ0
Now, force on the second wire due to first wire, F21 = I 2 (l × B1 ) (towards left) = I 2lB1 sin 90° F21 = I 2lB1 where, l is the length of the wire and d is separation between the two wires. µ I µ I I l F21 = I 2l 0 1 − 0 1 2 2πd 2πd
8 (d) Angular momentum, L = mevr …(i) Therefore, orbital motion of electron is equivalent to a current, I = e (1 / T ) Period of revolution of electron is given by T = 2πr / v 1 ev ∴ I =e = 2πr / v 2πr Area of electron orbit, A = πr2 Magnetic dipole moment of the atom, ev M = × πr2 = evr/2 2πr Using Eq. (i), we have e M e M = = L or 2me L 2m [Q 1 nm = 10
According to question, F21 = F µ I I l ⇒ F= 0 1 2 2πd Now, consider the situation, where the 2I1 current in first wire is doubled and reversed.
m]
n = 1016 rev/s e = 16 . × 10−19 C We know that, the magnetic moment, M = Ai M = πr2 × ne
= 1.26 × 10−23 A - m 2
⇒
10 (c) Given, radius of coil, Number of turns, N = 100 turns Current in coil, i = 1A and magnetic moment, M = ? By magnetic dipole moment of current loop, M = NiA , where A = πr2 M = Niπr2 = 100 × 1 × 3.14 × (10 × 10−2 )2 = 100 × 1 × 314 . × 100 × 10−4 2 = 314 . A-m
d Now, B1 = magnetic field at I 2 (second wire) due to current in the first wire. µ0 = I 2πd 1
shown in the figure. Let the conductor Y carries current i2, situated in a magnetic field B perpendicular to its length. It therefore experiences a magnetic force. The magnitude of the force acting on a length l of Y is
I2
i1
revolutions per O second by the R charge q is given as v 1 N per sec = = T 2πR Current through circular path,
I2
b X
Area,
L 2πR = L ⇒ R = 2π A = πR 2 =
From Fleming’s left hand rule, the direction of this force is towards X . Similarly, force per unit length on X due to Y acts towards Y. Hence, the conductors attract each other.
17 (c) Wires placed close to each other
18
carry current in the same direction and hence attract. Wires placed far apart carry current in opposite directions and hence repel each other. But here attraction is strong and repulsion is weak. So, loop move towards the wire. (d) Given, i = 10 A, B = 0.15 T, θ = 45o and l = 2 m Here, F = ilB sinθ = 10 × 2 × 015 . sin 45° 3 N = 2
19 (b) Let r be the radius of the coil and n be the number of turns formed, then l = 2πrn or r = l /2πn …(i) Maximum torque,
L2 πL2 = 4π 2 4π
Magnetic moment, M = IA =
Y
µ i F = i2 Bl = i2 0 1 l 2π R
‘q ’
i = q(1 / T ) = vq / 2πR Magnetic moment, vq 1 µ = iA = (πR 2 ) = vqR 2πR 2 ∴
i2 Force
v
13 (c) Circumference of circle = 2πR
11 (c) The situation is Given wires are long.
16 (d) Apply Fleming’s left hand rule, as
2I I F′ 2 = − 1 2 = − F I I 3 3 1 2 2F F′ = − 3
12 (c) As, number of
r = 10 × 10−2 m
I1
placed in a magnetic field, a deflection torque (τ) acts on it, this is given by τ = MB sin θ where, M is dipole moment, B is magnetic field, θ is angle between magnetic field and axis of loop. Also, M = IA, thus when I is doubled, the torque is doubled, hence tension is doubled.
Here, negative sign is due to opposite directions of F′ and F.
× 1016 × 1.6 × 10−19
shown in the figure.
15 (a) When a circular flexible loop is
Proceeding as previous case, we can write µ (2I )(I )l F′ = 0 1 2 2πd × 3 Here, force on second wire will be towards right. µ 0 (2I 1 )(I 2 )l F′ So, = − 2πd × 3 µ 0I 1I 2l F 2πd
= 3.14 × (0.05 × 10−9 )2 or
is in equilibrium in two orientations. For parallel magnetic field, it is stable and for anti-parallel it is unstable.
3d
9 (d) Given, r = 0.05 nm = 0.05 × 10−9 m −9
14 (d) The current loop in a magnetic field
τ max = BniA = Bn iπ r2 2
IL 4π
= B ni π ×
l2 iBl 2 = 2 2 4 πn 4π n
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Torque will be maximum, if n = 1
20
Bil 2 ∴ τ max = 4π (a) Given, side of square coil = 10 cm = 0.1 m Number of turns (n) = 20 Current in square coil, I = 12 A Angle made by coil, θ = 30° and magnetic field, B = 0.80 T
23 (b) Forces F1 and F2 acting on the coil
are equal in magnitude and opposite in directions. As the forces F1and F2 have the same line of action, their resultant effect on the coil is zero.
27 (d) Let two long parallel thin wires X and Y carry current i and separated by a distance b apart. i1
F1
F3
b
F4 X
A
F2 θ B
The magnitude of torque experienced by the coil, τ = NI AB sin θ = 20 × 12 × (10 × 10− 2 )2 × 0.80 × sin30° τ = 2.4 × 0.80 sin 30° = = 0.96 N-m
2.4 × 0.80 2
21 (a) The magnetic field induction at P
The two forces F3 and F4 are equal in magnitude and opposite in directions. As the two forces have different lines of action, they constitute a torque. Thus, if the force on one arc of the loop is F, the net force on the remaining three arms of the loop is − F.
24 (a) Torque, τ = iAB sin θ , i = 01 . A, θ = 90° 1 A = × base × height 2 1 a 3 or A= a× 2 2 =
due to currents through both the wires is 2l
P
B=
2
3a = 4
µ0 2i µ 2(2i ) + 0 4 π r/ 2 4 π r/ 2
µ 0 12i ⋅ 4π r acting perpendicular to plane of wire inwards. Now, B and v are acting in the same direction, i.e.θ = 0° Force on charged particle is F = qvB sinθ = qvB × 0 = 0. =
22 (b) We have, M = NIA, B = µ 0nI Torque, τ = MB Here, τ = (n1I 1 A )(µ 0 n2 I 2 ) 21 = 10 × × 10−6 44
3 × (0.02) 4
= 3 × 10−4 m 2; θ = 90° τ = 01 . × 3 × 10−4 × 5 × 10−2 sin 90°
22 × 10−7 × 103 × 2.5 4 × 7 −8
= 1.5 × 10
N-m
placed in a magnetic field, the coil experiences a torque given by τ = NBiA sin θ. Torque is maximum when θ = 90° , i.e. the plane of the coil is parallel to the radial field τ max = NBiA. The torque tends to rotate a coil on its own axis in the magnetic field. Hence, both Assertion and Reason are correct but Reason is not the correct explanation of Assertion.
26 (d) Magnetic field at the centre of circular loop, 2 Br µ 2πI µ 0I B= 0 = ⇒ I = µ0 4π r 2r Also, A = πr2 or r = ( A / π )
1/ 2
Magnetic moment, M = IA = =
2 BA A × π µ0
1/ 2
=
The magnitude of magnetic field B at any point on Y due to current i1 in X is given by µ i B= 0 1 2π b The magnitude of force acting on length l of Y is µ i F = i2 Bl = i2 0 1 l 2π b
F µ 0 i2 = ⋅ 2π b l
2
25 (b) When a current carrying loop is r/2
Y
Force per unit length is F µ 0 i1i2 = l 2π b Given, i1 = i2 = i , therefore
= 5 3 × 10−7 N-m
l r/2
i2 Force
28 (a) The magnetic field at the centre of a current carrying loop is given by µ 2πi µ 0i B= 0 = 4 π a 2a The magnetic moment at the centre of current carrying loop is given by M = i (πa2 ) B µ 0i 1 µ Thus, = × = 0 =x M 2a iπa2 2πa3 [given] When both the current and the radius are doubled, then ratio becomes µ0 µ0 x = = 2π (2a)3 8(2πa3 ) 8
29 (d) Maximum torque, τ max = MB Let number of turns in length l is n, so l = n(2πr) l or r= 2πn
2 Br A µ0
2 BA 3/ 2 µ 0π 1/ 2
τ max = niπr2 B
or
τ max = ⇒ ⇒
niπBl 2 l 2iB = 4 π 2n2 4 πnmin
τ max ∝ 1/ nmin nmin = 1
565
MOVING CHARGES AND MAGNETISM
30 (c) Force, F = Bil sinθ = Bil sin 30° –4
Given, B = 500 G = 500 × 10 T, i = 3A and l = 40 cm = 40 × 10–2 m. F = 500 × 10−4 × 3 × (40 × 10−2 ) ×
1 2
= iA (for single turn) = nAi (for n number of turns) Hence, it is independent of magnetic field.
34 (b) The FBD of the loop is shown as F1
= 3 × 10−2 N
FQR =
to magnetic field B, the weight of the wire should be balanced by the magnetic force (Fm). Fm
F2
Therefore, force on QP will be equal and opposite to sum of forces on other side.
B
39 (c) Energy of proton = 2 MeV = 2 × 1.6 × 10−19 × 106
Q
F4 sin θ
P
mg
To have Fm opposite to mg (i.e. upward), current should be perpendicular to the plane and inward directed. [Fleming’s right hand rule] …(i) Fm = mg …(ii) Fm = Bil From Eqs. (i) and (ii), we get 200 × 10−3 × 9.8 B = mg / il = 2 × 15 . = 0.65 T
32 (b) The situation can be shown as n
Fm θ
co
sθ
F3
F1
F4 cos θ S
…(i) …(ii)
F4 = (F3 − F1 )2 + F22
35 (c) The Lorentz force acting on the current carrying conductor in the magnetic field, F = IBl sinθ Since, wire PQ is parallel to the direction of magnetic field, then θ = 0.
F
m
sin
θ
Also, wire QR is perpendicular to the direction of magnetic field, then θ = 90°. ∴ FQR = IBl sin 90° = IBl
36 (c) Proton has positive charge on it.
Fm cosθ = mg sin θ …(i) Fm = Bil
…(ii)
From Eqs. (i) and (ii), we get mg B= tanθ il
33 (a) Magnetic dipole moment of current loop carrying i current is given as u = iA ⇒ u = iA
Magnetic field, B = 2. 5 T Mass of proton, m = 1.6 × 10−27 kg 1 2 mv 2 v = 2E / m
∴
F2
F4 sinθ = F2 F4 cosθ = (F3 − F1 ) From Eqs. (i) and (ii), we get
= 3.2 × 10−13 J
Energy of proton, E =
R
∴ FPQ = IBl sin 0° = 0
Fm (Magnetic force)
Hence, from figure, Also,
Fnet = FPS − FQR = 6 × 10−4 − 1 × 10−4 = 5 × 10−4 N
Alternative Method F4
10−7 × 2 × 20 × 20 × 15 × 10−2 12 × 10−2
= 1 × 10−4 N
Thus, FQP = (F3 − F1 )2 + F22
I
θ θ t n n i s ne mgmpo g) mg o (C of m
= 6 × 10−4 N
F3
31 (d) To suspend the wire in mid-air due
m
µ0 I1 I2 l 2π r where, r = distance between two parallel conductors. 10−7 × 2 × 20 × 20 × 15 × 10−2 FPS = 2 × 10−2 F=
Therefore, two beams of protons parallel to each other will repel due to repulsive force produced between them.
37 (a) The two conductors are attracting each other, which means that currents flowing are parallel in direction.
38 (d) Force on SR and PQ are equal but opposite, so their net force will be zero. Force between two parallel conductors carrying currents I 1 and I 2,
…(i)
Magnetic force on proton, F = Bqv sin 90° = Bqv Substituting the value of v from Eq. (i), we get 2E F = Bq m = 2.5 × 1.6 × 10−19
2 × 3.2 × 10−13 1.6 × 10−27
= 8 × 10−12 N
40 (b) The force is attractive, if current in two conductors is in same direction and repulsive, if currents are in opposite directions.
41 (d) The force between the conductors is attractive, if the currents in them are in the same direction and repulsive, if the currents are in opposite directions. Mutual force between conductors A and C, µ I I l µ 2× 3×1 F1 = 0 1 2 = 0 2π 0.05 2π r = 2. 40 × 10−5 N
[towards A]
Mutual force between conductors B and C, 4 × 3×1 µ F2 = 0 × 2π 0.08 = 3 × 10−5 N
[towards B]
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Hence, the resultant force experienced by C, F = F2 − F1 = (3 − 2. 4 ) × 10−5 N = 0.6 × 10−5 N
45 (b) If we consider a small element dL (shown in figure), the magnetic force on the considered element is towards the straight wire.
i
46 (c) Torque acting on equilateral F
triangle in a magnetic field B is L
b
µ 0 2I 1I 2 ⋅ l r 4π Here, I 1 = 10 A, I 2 = 2 A, l = 2 m, r = 10 cm = 0.1 m 2 × 10 × 2 × 2 F = 10−7 × ∴ 0.1 = 8 × 10−5 N
S
B
43 (d) The force per unit length between two parallel wires carrying currents i1 and i2 separated by a distance R is given by F µ 0 I 1I 2 = l 2π R F 1 ∝ ⇒ l R Hence, graph between force per unit length and distance between wires is a rectangular hyperbola. F µ 0 2I a I b = l 4π r 10−7 × 2 × 96 × 24 ∴ 0144 . = r
90°
Normal
47 (a)
∴
= 3.2 × 10−3 m = 3.2 mm
Y
µ I F = I 2 Bl = I 2 0 1 l 2π R From Fleming’s left hand rule, the direction of this force is away from X. Similarly, force per unit length on X due to Y is directed away from Y.
3 2 l 4
and θ = 90° Substituting the given values in the expression for torque, we have 3 2 3 2 Il B τ=I × l B sin 90° = 4 4 [Q sin 90° = 1] 1/ 2 τ Hence, l = 2 3 BI
Hence, the conductors repel each other due to magnetic force between them.
49 (d) Torque (τ ) acting on a loop placed in a magnetic field B is given by τ = nBIA sin θ B
I
FAB FBC = l l A
44 (c)
10−7 × 2 × 96 × 24 r= 0144 .
N
τ = IAB sin θ Area of ∆ LMN , A=
R X
O
F
I2
I1
N
l
M
I 2 , situated in a magnetic field B perpendicular to its length. It therefore experiences a magnetic force, the magnitude of the force acting on a length l of Y is F
Y
F=
225 − 15x = 10x 25x = 225 x = 9 cm
48 (d) Let the conductor Y carries current
F F
Thus, the wire move toward the loop.
i
F
dL
I1
carrying current I 2 and placed at a distance r parallel to another infinitely long conductor carrying current I 1 is
X
⇒ ⇒ or
[towards B]
42 (c) Force on a conductor of length l
µ 0 2 × 15 × 50 µ 0 2 × 50 × 10 ⋅ = × 4π 4π x (15 − x ) 15 10 = ⇒ x (15 − x )
C
B
15A
50 A
x
15–x
10 A
where, A is area of loop, I the current through it, n the number of turns, and θ the angle which axis of loop makes with magnetic field B. Since, magnetic field B of coil is parallel to the field applied, hence θ = 0° and sin 0° = 0 ∴ τ=0
567
MOVING CHARGES AND MAGNETISM
Topic 4 Moving Coil Galvanometer 2019 1 A galvanometer of 50 Ω resistance has 25 divisions. A
current of 4 × 10−4 A gives a deflection of one division. To convert this galvanometer into a voltmeter having a range of 25V, it should be connected with a resistance of (a) 2500 Ω as a shunt [JIPMER] (b) 245 Ω as a shunt (c) 2550 Ω in series (d) 2450 Ω in series
2018 2 In the adjoining circuit diagram, the readings of ammeter and voltmeter are 2 A and 120 V, respectively. If the value of R is 75 Ω, then the voltmeter resistance will be [AIIMS] R
A
full scale deflection for a current of 4 mA. To convert it to an ammeter of range 0 to 6 A, [AFMC] (a) 10 mΩ resistance is to be connected in parallel to the galvanometer (b) 10 mΩ resistance is to be connected in series with the galvanometer (c) 5 Ω resistance is to be connected in parallel (d) 2 Ω resistance in series
2010 7 When a resistance of 100 Ω is connected in series with a galvanometer of resistance R, its range is V. To double its range, a resistance of 1000 Ω is connected in series. Find the value of R. [MHT CET] (a) 700 Ω (b) 800 Ω (c) 900 Ω (d) 100 Ω
8 In a galvanometer, 5% of the total current in the circuit passes through it. If the resistance of the galvanometer is G, the shunt resistance S connected to the galvanometer is
V
(a) 100 Ω (c) 300 Ω
2012 6 A galvanometer coil has a resistance of 15 Ω and gives
(b) 150 Ω (d) 75 Ω
2014 3 In an ammeter, 0.2% of main current passes through the galvanometer. If resistance of galvanometer is G, then the resistance of ammeter will be [CBSE AIPMT] 1 499 (b) (a) G G 499 500 1 500 (c) (d) G G 500 499
4 A galvanometer having internal resistance 10 Ω requires 0.01 A for a full scale deflection. To convert this galvanometer to a voltmeter of full scale deflection at 120 V, we need to connect a resistance of [UK PMT] (a) 11990 Ω in series (b) 11990 Ω in parallel (c) 12010 Ω in series (d) 12010 Ω in parallel 5 A galvanometer has a coil of resistance 100 Ω and gives full scale deflection for 30 mA current. If it is to work as a voltmeter of 30 V, the resistance required to be added is (a) 500 Ω (b) 900 Ω [UK PMT] (c) 1000 Ω (d) 1800 Ω
[Manipal]
(a) 19G
G (b) 19
(c) 20G
G (d) 20
9 A moving coil galvanometer is converted into an ammeter reading upto 0.03 A by connecting a shunt of resistance 4r across it and into an ammeter reading upto 0.06 A when a shunt of resistance r is connected across it. What is the maximum current which can be sent through this galvanometer, if no shunt is used? [Haryana PMT] (a) 0.01 A (b) 0.02 A (c) 0.03 A (d) 0.04 A 10 A voltmeter of resistance 1000 Ω gives full scale deflection when a current of 100 mA flows through it. The shunt resistance required across it to enable it to be used as an ammeter reading 1 A at full scale deflection is [Punjab PMET] (a) 10000 Ω (b) 9000 Ω (c) 222 Ω (d) 111 Ω 11 The resistance of an ideal voltmeter is (a) low (b) high (c) infinite (d) zero
[CG PMT]
12 An ammeter reads upto 1 A. Its internal resistance is 0.81 Ω. To increase the range to 10 A, the value of the required shunt is [MGIMS] (a) 0.03 Ω (b) 0.3 Ω (c) 0.9 Ω (d) 0.09 Ω
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
13 A galvanometer acting as a voltmeter should have (a) low resistance in series with its coil [JIPMER] (b) low resistance in parallel with its coil (c) high resistance in series with its coil (d) high resistance in parallel with its coil 14 A 36 Ω galvanometer is shunted by resistance of 4 Ω. The percentage of the total current, which passes through the galvanometer is [JCECE] (a) 8% (b) 9% (c) 10% (d) 91% 15 A galvanometer coil has a resistance of 10 Ω and the ammeter shows full scale deflection for a current of 1 mA. The shunt resistance required to convert the galvanometer into an ammeter of range 0-100 mA is about [DUMET] (a) 10 Ω (b) 1 Ω (c) 0.1 Ω (d) 0.01 Ω
2009 16 A galvanometer has a resistance of 100 Ω. A potential difference of 100 mV between its terminals gives a full scale deflection. The shunt resistance required to convert it into an ammeter reading upto 5 A is [AIIMS] (a) 0.01 Ω (b) 0.02 Ω (c) 0.03 Ω (d) 0.04 Ω
17 The seave of a galvanometer of resistance 100 Ω contains 25 divisions. It gives a deflection of one division on passing a current of 4 × 10−4 A. The resistance (in ohm) to be added to it, so that it may become a voltmeter of range 2.5 V is [UP CPMT] (a) 150 (b) 170 (c) 110 (d) 220 18 A galvanometer can be converted into an ammeter by connecting [Kerala CEE] (a) a high resistance in parallel (b) a very small resistance in series (c) a very small resistance in parallel (d) a high resistance in series (e) a low resistance in series 19 There are three voltmeters of the same range but of resistance 10000 Ω, 8000 Ω and 4000 Ω, respectively. The best voltmeter among these is the one whose resistance is [Manipal] (a) 10000 Ω (b) 8000 Ω (c) 4000 Ω (d) All are equally good 20 A galvanometer of resistance 20 Ω is to be converted into an ammeter of range 1 A. If a current of 1 mA produces full scale deflection, the shunt required for the purpose is (a) 0.01 Ω (b) 0.05 Ω [Manipal] (c) 0.02 Ω (d) 0.04 Ω
21 When a galvanometer is shunted by resistance S, its current capacity increases n times. If the same galvanometer is shunted by another resistance S ′, its current capacity will increase by n′, which is given by ( n + 1)S (a) S′ n+S (c) S′
S ( n − 1) + S ′ (b) S′ S ( n − 1) − S ′ (d) S′
[MGIMS]
22 The resistance of an ammeter is 13 Ω and its scale is graduated for a current upto 100 A. After an additional shunt has been connected to this ammeter, it becomes possible to measure currents upto 750 A by this meter. The value of shunt resistance is [JIPMER] (a) 20 Ω (b) 2 Ω (c) 0.2 Ω (d) 2 kΩ
2008 23 A galvanometer of resistance 50 Ω is connected to a battery
of 3 V along with a resistance of 2950 Ω in series. A full scale deflection of 30 divisions is obtained in the galvanometer. In order to reduce this deflection to 20 divisions, the resistance in series should be [CBSE AIPMT] (a) 5050 Ω (b) 5550 Ω (c) 6050 Ω (d) 4450 Ω 24 The resistance of the shunt required to allow 2% of the main current through the galvanometer of resistance [Kerala CEE] 49 Ω is (a) 1 Ω (b) 2 Ω (c) 0.2 Ω (d) 0.1 Ω (e) 0.01 Ω
25 A voltmeter of range 2 V and resistance 300 Ω cannot be converted into ammeter of range [AMU] (a) 1 A (b) 1 mA (c) 100 mA (d) 10 mA 26 The deflection in a moving coil galvanometer falls from 50 divisions to 10 divisions, when a shunt of 12 Ω is connected with it. The resistance of galvanometer coil is (a) 24 Ω (b) 12 Ω [Guj CET] (c) 6 Ω (d) 48 Ω
2007 27 A galvanometer has resistance of 400 Ω and deflects full scale for current of 0.2 mA through it. The shunt resistance required to convert it into 3 A ammeter is (a) 0.027 Ω (b) 0.054 Ω [RPMT] (c) 0.0135 Ω (d) None of these
28 A voltmeter has resistance of G ohm and range ofV volt. The resistance required in series to convert it into a voltmeter of range nV volt is [Guj CET] (a) ( n − 1) G (b) nG G G (c) (d) n ( n − 1)
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MOVING CHARGES AND MAGNETISM
2006 29 A galvanometer having a resistance of 8 Ω is shunted by
32 A galvanometer has 30 divisions and a sensitivity of 16 µA/div. It can be converted into a voltmeter to read 3 V by connecting [Kerala CEE] (a) resistance of nearly 6 kΩ in series (b) 6 kΩ in parallel (c) 500 Ω in series (d) it cannot be converted (e) 6.6 kΩ in series
a wire of resistance 2 Ω. If the total current is 1 A, the part of it passing through the shunt will be [AFMC] (a) 0.25 A (b) 0.8 A (c) 0.2 A (d) 0.5 A
30 To decrease the range of an ammeter, its resistance need to be increased. An ammeter has resistance R 0 and range I. Which of the following resistance can be connected in series with it to decrease its range to I / n ? [MP PMT] R0 R0 (a) (b) n ( n − 1) R0 (d) None of these (c) ( n + 1)
2005 33 In an ammeter, 10% of main current is passing through the galvanometer. If the resistance of the galvanometer is [KCET] G, then the shunt resistance (in ohm) is (a) 9G (b) G/ 9 (c) 90G (d) G/ 90
34 If resistance of voltmeter is 10000 Ω and resistance of galvanometer is 2 Ω, then find R when voltmeter reads 12 V and galvanometer reads 0.1 A. [BCECE]
31 A galvanometer has a resistance 50 Ω. A resistance of 5 Ω is connected parallel to it. Fraction of the total current flowing through galvanometer is [J&K CET] 1 1 (a) (b) 10 11 1 2 (c) (d) 50 15
R
G V
(a) 118 Ω
(b) 120 Ω
(c) 124 Ω
(d) 114 Ω
Answers 1 11 21 31
(d) (c) (b) (b)
2 12 22 32
(c) (d) (b) (a)
3 13 23 33
(a) (c) (d) (b)
4 14 24 34
(a) (c) (a) (a)
5 (b) 15 (c) 25 (b)
6 (a) 16 (b) 26 (d)
7 (c) 17 (a) 27 (a)
8 (b) 18 (c) 28 (a)
9 (b) 19 (a) 29 (b)
10 (d) 20 (c) 30 (b)
Explanations 1 (d) Given, resistance of galvanometer, Rg = 50Ω Number of divisions = 25 I g = 4 × 10−4 × 25 = 10−2 A
2 (c)QVPQ = (I − I g )R = I g ⋅ G I
A
P
I – Ig
R
Q
2 I 1000 G Also, I r = I G + r
3 (a) As, IG =
Ig R Ig
R is the resistance connected in series of galvanometer to convert into voltmeter ∴ V = I g (Rg + R ) 25 = 10−2 (50 + R ) 25 − 50 = 2500 − 50 10−2 ⇒ R = 2450Ω in series.
⇒R =
where, G = voltmeter (resistance).
Ir
Given, VPQ = 120 V, I = 2 A, R = 75 Ω ⇒ 120 = (2 − I g )75 ⇒ I g = 0.4 A Now, VPQ = I g G ⇒
G=
120 = 300 Ω 0.4
IG
I
V
RG=G G
Shunt r
We know that, potential across G and shunt r are same. ∴ ⇒ ⇒
VG = Vr IG (G ) = I r r 2IG GI = (r) 1000 G + r
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
⇒ 2 (G + r) = 1000 r ⇒ G + r = 500 r G + 1 = 500 ⇒ r ⇒ G / r = 499 1 ⇒ r= G 499
From Eqs. (i) and (ii), we get 0.12 − 4 ig = 0.06 − ig ⇒ ig = 0.02 A
6 (a) To convert a galvanometer into an ammeter, a shunt resistance in parallel is connected to galvanometer. Ig
10 (d) Given, R = 1000 Ω, I g = 100 mA
G
i
∴ V = I gR = 100 × 10−3 × 103 = 100 V …(i)
i – ig
4 (a) Given, internal resistance,
G = 10 Ω, Current, ig = 0.01 A and potential difference, V = 120 V Resistance, V R = −G ig 120 − 10 0.01 = 12000 − 10 R = 11990 Ω To convert a galvanometer into a voltmeter, high resistance, i.e. shunt of 11990 Ω should connect in series with galvanometer. =
5 (b) Let Rx resistance be connected in series to convert galvanometer to voltmeter. G Ig,Rg
Rx V
According to the question, Rg = 100 Ω, I g = 30 mA Current corresponding to full scale deflection. Now, we can write V = I g × Rg + I gRx …(i) = I g (Rg + Rx ) Given, V = 30 V From Eq. (i), we get 30 = (30 mA) (100 Ω + Rx) ⇒
30 = 100 Ω + Rx (30 mA)
⇒
30 V = 100 Ω + Rx 30 × 10−3 A
⇒
103 Ω = 100 Ω + Rx
⇒
Rx = 1000 Ω − 100 Ω = 900 Ω
Ig
S
Since, galvanometer G and shunt S are in parallel, hence igG = (i − ig ) S. igG 4 × 10−3 × 15 ⇒ S = = i − ig 6 − (4 × 10−3 ) 60 × 10−3 = 10 mΩ 5.99 Hence, 10 m Ω resistance is to be connected in parallel to the galvanometer.
Ig
From Eqs. (i) and (ii), we get 1000 r 100 = 1 1000 + r
…(i)
When a resistance of 1000 Ω is connected in series, then its range double. 2V …(ii) ∴ Current, i = 1100 + R
⇒ 1000 + r = 10r ⇒ 9r = 1000 ~ 111 Ω ⇒ r−
11 (c) For an ideal voltmeter, the resistance should be infinite.
12 (d) To increase the range of ammeter, we have to connect a small resistance in parallel (shunt), let its value be R.
From Eqs. (i) and (ii), we get V 2V = 100 + R 1100 + R
1A, 0.81Ω A
R = 900 Ω
8 (b) Current in galvanometer, ig =
5 i 100
R
∴ Shunt resistance, igG 5i / 100G G = = S = 5 i 19 i − ig i− 100
9 (b) For an ammeter,
ig i
=
V r
7 (c) When a resistance of 100 Ω is
⇒
R=1000 Ω
Voltmeter can use as ammeter by providing a shunt resistance parallel to it. Rr …(ii) ∴ Voltage, V = I g R + r
=
connected in series current, then V i= 100 + R
V
S G+S
Applying KCL at junction to divide the current, we get 9R = 0.81 × 1 0.81 R= = 0.09 Ω ⇒ 9
13 (c) Galvanometer act as a voltmeter
where, ig = current in galvanometer. When i = 0.03 A, then shunt resistance, S = 4 r, ⇒ igG = (i − ig )S = (0.03 − ig ) 4 r …(i) When i = 0.06 A, then shunt resistance, S = r and …(ii) igG = (0.06 − ig )r
14
when a very high resistance is connected in series with galvanometer. (c) When galvanometer is shunted to into an ammeter, then SI = (G + S )Ig Ig S = I G+S
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MOVING CHARGES AND MAGNETISM
15
If G = 36 Ω and S = 4 Ω, 1 then I g / I = 10 When I = 100 A, then I g = 10 A Percentage of current passes through galvanometer 10 = × 100 = 10% 100 (c) Resistance of galvanometer coil, R = 10 Ω and current = 1mA Range of current is 0-100 mA. So, the shunt resistance is I gR S = I − Ig =
1 × 10−3 × 10 100 × 10−3 − 1 × 10−3
=
10 = 0.1Ω 99
16 (b) The current required for full scale deflection is PD across galvanometer ig = resistance of galvanometer 100 × 10−3 = 10−3 A 100 The shunt resistance required is ig 10−3 G = S = × 100 5 − 10−3 i − ig ⇒
ig =
= 0.02 Ω
17 (a) The deflection of one division of galvanometer is given by the current = 4 × 10−4 A. ∴The current sensitivity of galvanometer is = 4 × 10−4 A/div ∴ ig = Full scale deflection = Current sensitivity × Total number of divisions = 4 × 10
−4
−2
× 25 = 10
A
Resistance of galvanometer = 100 Ω The value of resistance required, V 2.5 R = − G = −2 − 100 ig 10 = 250 − 100 = 150 Ω
18 (c) A galvanometer can be converted into ammeter by connecting a shunt or low resistance in parallel with the galvanometer because its resistance needs to be lowered, so that maximum current can pass through it and can give accurate reading.
19 (a) Best voltmeter is one with
resistance 10000 Ω. As voltmeter with high resistance draw minimum current (or less current) from circuit and gives reading close to the actual current.
20 (c) As, V = Ig R
21
…(i)
and after shunting with resistance, r Rr …(ii) V = I ′g R′ = 1 × R+ r From Eqs. (i) and (ii), we get 20r (Q R = 20) 1 × 10−3 × 20 = 1 × 20 + r ⇒ 1000 r = 20 + r ⇒ 999 r = 20 ⇒ r = 0.02 Ω G (b) Using the relation, S = (n − 1) ⇒ G = S (n − 1) G and S′ = (n′ − 1) G + S ′ S (n − 1) + S ′ n′ = = ⇒ S′ S′
25 (b) As, I g =
2 20 mA × 1000 mA = 300 3 ∴ I g = 6.67 mA As, range of ammeter cannot be decreased but can be increased only, therefore the instrument cannot be converted to measure the range 1 mA. =
26 (d) Let the value of current for one division of galvanometer be i. Then, the current through the ammeter, I = 50i and current through the galvanometer, I g = 10i Ig We know that, S = G (I − I g ) I − I g 50i − 10i = 12 × G = S 10i Ig = 12 ×
22 (b) Let ia be the current flowing through ammeter and i be the total current. So, a current i − ia will flow through shunt resistance. Potential difference across ammeter and shunt resistance is same. i.e. ia × R = (i − ia ) × S iR …(i) or S = a i − ia Given, ia = 100 A, i = 750 A and R = 13 Ω 100 × 13 Hence, S = = 2Ω 750 − 100
23 (d) The current through the galvanometer, 3 I = = 10−3 A (50 + 2950) i.e. The current for 30 divisions = 10−3 A ∴ Current for 20 divisions 20 2 = × 10−3A = × 10−3A 30 3 For the same deflection to obtain for 20 divisions, let resistance of added resistor is R. 2 3 × 10−3 = ∴ (50 + R ) 3 R = 4450 Ω
or
2 A 300
40i = 48 Ω 10i
27 (a) If i is the maximum current, then a part ig should pass through G and rest i − ig through S. Potential across G and S is same, therefore ig × G = (i − ig ) × S igG ⇒ S = i − ig Given,
G = 400 Ω, ig = 0.2 mA = 0.2 × 10−3 A
i=3 A 0.0002 × 400 ∴ S = = 0.027 Ω 3 − 0.0002 and
28 (a) Resistance required in series, R=
V nV −G = − G = (n − 1)G Ig V G
29 (b) Let total current through the parallel combination be I, the current through the galvanometer be I g and the current through the shunt be I − I g . The shunted galvanometer is shown in the figure. a
Ig
I
G
b
24 (a) Shunt required, S =
I gG I − Ig
=
0.02I × 49 0.98 I = =1Ω I − 0.02 I 0.98 I
a
I − Ig
b
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
The potential difference, Vab = (Va − Vb ) is the same for both paths, so I gG = (I − I g )S ⇒ I g (G + S ) = IS Ig S = ⇒ I S +G The fraction of current passing through shunt I − Ig Ig = =1− I I S G =1− = S +G S +G =
30 (b) As, I g = range of ammeter = I V V (R + r) = R0 Rr
…(i)
Let Rx be the resistance added and range of ammeter becomes I ′g , then 1 I 1 I g − I g′ = = =V − n n R0 R0′ Ig
⇒
R + r I (R + r) =V − n Rr + Rx (R + r) Rr
From Eq. (i), we get V (R + r) = V (R + r) ⇒ nRr Rr + Rx (R + r) − Rr Rr [ Rr + R (R + r ] x ⇒
1 Rx = R0 n − 1
31 (b) The galvanometer G and shunt S is
8 8 = = 0.8 A 2 + 8 10
⇒ I = Ig =
Rr where, R′0 = R0 + Rx = + Rx R + r
connected in parallel, hence potential difference is the same. ∴ ig × G = (i − ig ) × S ig 5 1 S = = = ⇒ i − ig G 50 10 ⇒
10ig = i − ig
⇒
11ig = i
⇒
ig i
=
1 11
32 (a) Current flowing through the galvanometer, I g = 16 µA / div × 30 div = 480 µA The value of resistance in series to the galvanometer is R=
V 3 −G = −0 Ig 480 × 10−6
= 6.25 kΩ
33 (b) Shunt resistance, S =
I gG I − Ig
=
0.1 G G = 1 − 0.1 9
34 (a) Let current I g flows through R and G. For a voltmeter with full scale reading, we have V −G V = I g (G + R ) or R = Ig Given, G = 2 Ω, V = 12 V and ∴
I g = 0.1 A 12 R= − 2 = 120 − 2 = 118 Ω 0.1
19 Magnetism and Matter Quick Review Properties of Magnetic Field Lines
Magnet A magnet is a material or an object that exhibits a strong magnetic field and has a property to attract some specific materials like iron towards it. The magnetic field is invisible but is responsible for properties of a magnet.
Bar Magnet A bar magnet consists of two equal and non-separable magnetic poles. One pole is designated as north pole (N) and the other as south pole (S). These poles are separated at a small distance but they are not exactly at the ends. The distance between two poles of a bar magnet is known as magnetic length of a magnet. Its direction is from S-pole of the magnet to N-pole and it is represented by 2l. It is sometimes also known as effective length ( Le ) of the magnet and is less than its geometric length ( Lg ). S
N Le Lg
5 For a bar magnet, Le = Lg . 6
Magnetic Field Lines The magnetic field lines of a magnetic field are the imaginary lines which continuously represent the direction of that magnetic field.
Important properties of magnetic field lines are given below (i) The magnetic field lines of a magnet form closed continuous loops. (ii) The tangent, at any point of a magnetic field line, represents the direction of net magnetic field B at that particular point. (iii) The number of magnetic field lines crossing per unit area is directly proportional to magnitude of magnetic field. Larger the number of field lines crossing per unit area, the stronger is the magnitude of the magnetic field B. (iv) The magnetic field lines do not intersect each other, for if they did, the direction of the magnetic field would not be unique at the point of intersection. (v) The direction of magnetic field lines is from N to S , if they are outside the magnet and from S to N, if they are inside the magnet. (vi) In case of uniform magnetic field, the magnetic field lines are parallel to each other with equal space between any two lines.
Magnetic Dipole A magnetic dipole is an arrangement which consists of two magnetic poles of equal and opposite strengths separated at a small distance. A bar magnet, a compass needle etc., are the examples of magnetic dipoles.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Magnetic Dipole Moment
Pole Strength Pole strength can be defined as the strength of a magnetic pole to attract magnetic materials towards itself. It is a scalar quantity and its SI unit is ampere-metre (A-m).
It is the product of the strength of either of the pole strength and the magnetic length of the magnet. It is represented by M. It is a vector quantity. –m
M
+m
The force between two magnetic poles separated by some distance is given by µ mm F = 0 12 2. 4π r
The direction of magnetic dipole moment is same as that of 2l. Therefore, M = m( 2l )
It is called Coulomb’s law of magnetic force.
Its SI unit is ampere-metre 2 (A-m 2 ).
S
2l
N
Pole Strength and Magnetic Dipole Moment in Special Cases Special Cases
Figures
If bar magnet is cut into two equal pieces such that the length of each piece becomes half.
–m
Effect on Pole Strength
Formula for New Magnetic Dipole Moment 2l M (becomes half) = 2 2
Remains unchanged
M′ = m ⋅
Pole strength of each piece becomes half
M m M ′ = (2l ) = 2 2
+m
2l
If bar magnet is cut into two equal pieces such that the width of each piece becomes half.
– m+m l
– m +m l
–m
+m
– m/2
+ m/2
– m/2
+ m/2
(becomes half)
2l
If bar magnet is bent in the form of semi-circle. S
–m
+m N
–m
2l
When two identical bar magnets are joined perpendicular to each other.
2r
+m
S
N
M ′ = m(2r) [Q 2l = πr ] 2l 2M M ′ = m × 2 = π π 2 becomes times π
Remains unchanged
M = M 12 + M 22 = 2M
+m
+m –m
Remains unchanged
–m N (+ m)
When two bar magnets are inclined at an angle θ.
Remains unchanged
M2 (– m) S
M θ S (– m)
φ M1
N (+ m)
Resultant magnetic moment, M ′ = M 12 + M 22 + 2M 1M 2 cosθ Angle made by resultant magnetic moment (M ) with M 1 is M 2 sin θ . given by tan φ = M 1 + M 2 cosθ
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MAGNETISM AND MATTER
Magnetic Field Strength due to a Bar Magnet The strength of magnetic field at a point due to a bar magnet is defined as the force experienced by a hypothetical unit north pole, placed at that point. • Magnetic field strength at a point on the axial line of bar µ 2M magnet, B = 0 3 4π d where, M = magnetic moment of bar magnet and d = distance between the point and centre of bar magnet. • Magnetic field strength at a point on the equatorial line of bar magnet, µ M B= 0 3 4π d
Oscillations of a Freely Suspended Magnet When a small bar magnet is suspended in a uniform magnetic field, then torque acting on it makes it oscillate in the uniform magnetic field. I Time period of oscillations, T = 2π MB where, I = moment of inertia of magnet and M = magnetic dipole moment of bar magnet.
Gauss’ Law of Magnetism This law states that, ‘‘the surface integral of a magnetic field over a closed surface is zero.’’ i.e.
∫ B ⋅ dS = 0
• Magnetic field strength at any point,
µ0 M 1+ 3cos 2 θ 4π d 3 where, θ = angle between the axis of magnet and line joining the point and centre of magnet. • The magnetic field at a point due to a bar magnet resembles closely to the magnetic field of a current carrying solenoid, so bar magnet is considered as an equivalent solenoid. B=
Torque on a Magnetic Dipole in Uniform Magnetic Field A magnetic dipole when placed in a uniform magnetic field does not experience any net force. However, it experiences a torque is given by, τ = M × B = MB sin θ where, θ is the angle from magnetic field along which the dipole has been placed.
Work Done by a Magnetic Dipole in Uniform Magnetic Field Due to the torque, dipole align itself in the direction of field and so some work has to be done to rotate it. This work done is stored as potential energy of the dipole and given by U = W = − M ⋅ B = − MB cos θ Work done in rotating a magnetic dipole in a uniform magnetic field from an initial orientation θ1 to final orientation θ 2 is given by W = MB (cos θ1 − cos θ 2 )
N
S
Gaussian surface
Here, the number of field lines entering the Gaussian surface is same as number of lines leaving the Gaussian surface.
The Electrostatic Analogue : Comparison between an Electric Dipole and a Magnetic Dipole The behaviour of a magnetic dipole (may be a bar magnet also) is similar to the behaviour of an electric dipole. The only difference is that the electric dipole moment p is replaced by magnetic dipole moment M and the constant µ 1 is replaced by 0 . 4πε 0 4π The table gives a comparison between an electric dipole and a magnetic dipole as given below Physical Quantity to be Compared
Electric Dipole
Magnetic Dipole
Dipole moment
p = q(2l )
M = m(2l )
Direction of dipole moment
From negative charge to the positive charge.
From south pole to north pole.
Net force in uniform field
0
0
Net torque in uniform field
τ =p×E
τ = M× B
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Physical Quantity to be Compared
Electric Dipole
Magnetic Dipole
Field at far away point on the axis
1 2p (along p) ⋅ 4 πε 0 r3
µ 0 2M (along M) ⋅ 4 π r3
Field at far away point on perpendicular bisector
1 p ⋅ 4 πε 0 r3
Potential energy
Uθ = −p ⋅ E = − pE cosθ
Work done in rotating the dipole
W θ1 − θ 2 = pE (cosθ 1 − cosθ 2 )
µ0 M ⋅ 4 π r3 (opposite to M)
(opposite to p)
U θ = − M⋅ B = −MB cosθ W θ1 − θ 2 = MB(cosθ 1 − cosθ 2 )
Note In the table, θ is the angle between electric or magnetic field (Eor B) and dipole moment (p or M).
Earth’s Magnetism Our earth behaves as a huge powerful magnet and its strength varies from place to place on the earth’s surface. Some definitions related to earth’s magnetism are as follows (i) Geographic Axis The straight line passing through the geographical north and south poles of the earth is called its geographic axis. It is the axis of rotation of the earth. (ii) Magnetic Axis The straight line passing through the magnetic north and south poles of the earth is called the magnetic axis.
Elements of Earth’s Magnetism The earth’s magnetic field at a place can be completely described by three parameters which are called elements of earth’s magnetic field. These three elements are given below
(i) Magnetic Declination or Angle of Declination ( α ) At any place, the acute angle between the magnetic meridian and the geographical meridian is called angle of declination (α ).
(ii) Magnetic Inclination or Angle of Dip (θ) The angle of dip (θ ) at a place is the angle between the direction of Earth’s magnetic field ( B ) and horizontal line in the magnetic meridian. At Earth’s magnetic poles, the magnetic field of earth is vertical, i.e. angle of dip is 90°, the freely suspended magnetic needle is vertical there. At magnetic equator, magnetic field is horizontal or angle of dip is 0°.
(iii) Horizontal and Vertical Component of Earth’s Magnetic Field Let B e be the net magnetic field at some point. H and V be the horizontal and vertical components of B e . Let θ be the angle of dip at some place, then we can see that,
and
H = B e cos θ
…(i)
V = B e sin θ
…(ii)
(iii) Magnetic Equator It is the huge circle on the earth perpendicular to the magnetic axis.
Geographical north
(iv) Magnetic Meridian The vertical plane in the direction of B is called magnetic meridian.
Magnetic north Geographical meridian
(v) Geographic Meridian The vertical plane passing through the line joining the geographical north and south poles is called the geographic meridian. Axis of rotation of the earth Geographical north pole
11
.5°
Magnetic south pole S
Magnetic equator
P H
O
α θ
S N V
M Be Q
R
Squaring and adding Eqs. (i) and (ii), we get Be = H 2 + V 2 Further, dividing Eq. (ii) by Eq. (i), we get
N Magnetic north pole
Magnetic meridian
L
Geographical south pole
Note Earth’s magnetic field varies irregularly from place to place and at a place, it varies with time also.
V θ = tan −1 H By knowing H and θ at some place, we can find B e and V at that place.
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MAGNETISM AND MATTER
Terms Used in Magnetism
permeability of free space and given as µ B . = µr = µ 0 B0
The various terms are used in magnetism as given below (i) Magnetic induction (B) is the number of magnetic field lines passing normally through a cross-sectional area of material. Its SI unit is tesla (T) or weber/metre 2 (Wm −2 ) and CGS unit is gauss (G).
(v) Magnetic intensity (H) is a measure of the capability of external magnetic field to magnetise the given B B substance and given by H = 0 = −I . µ0 µ0
Also, 1T = 104 G
Its SI unit is Am −1 and CGS unit is oersted.
(ii) Intensity of magnetisation (I) is the magnetic moment per unit volume of the magnetic substance. M i.e. I = . V
(vi) Magnetic susceptibility ( χ m ) is the ratio of intensity of magnetisation in a substance to the magnetic I intensity. i.e. χm = H
Its SI unit is Am −1 . (iii) Magnetic permeability (µ ) is the ratio of the magnetic induction to the magnetic intensity. i.e. B µ= . H Its SI unit is Wb/A-m or TmA −1 . (iv) Relative magnetic permeability (µ r ) is the ratio of magnetic permeability of the substance to the Properties Definition
µ r and χ m are related as µ r = χ m + 1.
Magnetic Behaviour of Materials In terms of magnetic behaviour, all substances are categorised in three types; Diamagnetic substances, Paramagnetic substances and Ferromagnetic substances. Their various features are tabulated as follows
Diamagnetic
Paramagnetic
Ferromagnetic
These substances when placed in a magnetic field, acquire feeble magnetism opposite to the direction of the magnetic field.
These substances when placed in a magnetic field, acquire feeble magnetism in the direction of the magnetic field.
These substances when placed in a magnetic field are strongly magnetised in the direction of the field.
H
H M
H M
M
Behaviour in a magnetic field
repelled
attracted
strongly attracted
Magnetic moment
zero
non-zero
non-zero
Relative permeability (µ r )
µr < 1
µr > 1
µ r >> 1
Magnetic susceptibility (χ m )
small and negative
positive
large and positive
Variation of χ m with temperature
χm
χm
χm χ∝T T
O
↑
I versus H H→ -I ↓
bismuth, antimony, gold, quartz, water, alcohol, etc.
T
IS
I
↑
I∝H H→
Examples
T = Tc
T
platinum, aluminium, chromium, air, CuSo 4, etc.
I
HS
H
iron, nickel, cobalt, steel and their alloys.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Curie’s Law • According to Curie’s law, the magnetic susceptibility of
paramagnetic material is given by C χm = T where, C = Curie constant. • Above Curie temperature, a ferromagnetic substance becomes an ordinary paramagnetic substance whose magnetic susceptibility obeys the Curie-Weiss law and given C by χm = T − Tc where, TC = Curie temperature and C = constant.
Hysteresis The phenomenon of the lagging of magnetic induction behind the magnetising field is called hysteresis. The plot of intensity of magnetisation (I) of ferromagnetic substances versus magnetic intensity (H) for a complete cycle of magnetisation and demagnetisation is called hysteresis loop or hysteresis curve . I
Retentivity C
F
O
When intensity of magnetising field ( H ) is decreased, then intensity of magnetisation ( I ) also decreases, but it lags behind H. Therefore when H becomes zero, I does not reduce to zero, i.e. the curve does not retrace itself. Now, this value of intensity of magnetisation ( I ) which is left in the material at H = 0, is called retentivity or remanence ( BO ). When the magnetising field is applied in reverse direction and its intensity H, is increased. The material starts demagnetising. The value of magnetising field needed to reduce magnetisation to zero is called coercivity (OC ). If reverse magnetising field is increased, further the material becomes saturated. Now, if the magnetising field is reduced after attaining the reverse saturation, the cycle repeats itself. The area enclosed by the loop represents loss of energy during a cycle of magnetisation and demagnetisation.
Permanent Magnets and Electromagnet
A
B
Beyond a point, if intensity of magnetising field ( H ) is increased, then intensity of magnetisation ( I ) does not increase.
H
E D Coercivity
It is clear from the above figure that, if intensity of magnetising field ( H ) is increased, then the intensity of magnetisation ( I ) also increases.
The substance which at room temperature retain their magnetic property are called permanent magnets. The electromagnets are the iron core solenoids which show magnetic property when current flows through them, on switching OFF the current, they do not show any magnetic property. The material used as permanent magnet have high retentivity and high coercivity, while the materials for of construction of electromagnets should have high initial permeability and low hysteresis loss.
Topical Practice Questions All the exam questions of this chapter have been divided into 3 topics as listed below Topic 1
—
BAR MAGNET AND MAGNETIC DIPOLE
579–584
Topic 2
—
EARTH’S MAGNETISM
585–588
Topic 3
—
MAGNETIC MATERIALS
589–594
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MAGNETISM AND MATTER
Topic 1 Bar Magnet and Magnetic Dipole 2016 1 A bar magnet is hung by a thin cotton thread in a uniform horizontal magnetic field and is in equilibrium state. The energy required to rotate it by 60° is W. So, the torque required to keep the magnet in this new position is [NEET] W (b) 3 W (a) 3 3W 2W (c) (d) 2 3
2014 2 Following figures show the arrangement of bar magnets in different configurations. Each magnet has magnetic dipole moment m. Which configuration has highest net magnetic dipole moment? [CBSE AIPMT] N
(a)
(b) S S
N
S
S
N
N N N
(c)
(d) 60°
30° S
N
S
N
3 A bar magnet of magnetic moment M and pole strength m is cut into two parts of equal lengths. The magnetic moment and pole strength of either part is [UK PMT] M m m (b) M , (a) , 2 2 2 M (d) M , m (c) ,m 2
2013 4 A north pole of 40 A-m is placed 20 cm apart from a south pole of 80 A-m. Calculate the distance of a point from the south pole on the line joining the two poles where the resultant field due to these poles is zero. [AIIMS] (a) 8.2 cm towards north pole (b) 8.2 cm away from north pole (c) 48.2 cm towards north pole (d) 48.2 cm away from north pole
2012 5 A magnetic needle suspended parallel to a magnetic field requires 3 J of work to turn it through 60°. The torque needed to maintain the needle in this position will be [CBSE AIPMT] 3 (a) 2 3 J (b) 3 J (c) 3 J (d) J 2
2011 6 A magnetic wire of dipole moment 4π A-m2 is bent in the form of semicircle. The new magnetic moment is [J&K CET] (a) 4π A-m 2 (b) 8 A-m 2 2 (c) 4 A-m (d) None of these 7 The magnetic field due to short bar magnet of magnetic dipole moment M and length 2l, on the axis at a distance z (where, z >> l ) from the centre of the magnet is given by formula [J&K CET] µ 0M $ 2 µ 0M $ (a) (b) M M 4 πz 3 4πz 3 4µ 0 M $ µ M $ (c) (d) 0 3 M M 3 µ0z πz 8 A bar magnet is placed in the position of stable equilibrium in a uniform magnetic field of induction B. If it is rotated through an angle 180º, then the work is [J&K CET]
(a) MB
(b) 2MB
MB (c) 2
(d) zero
9 If the magnet is cut into four equal parts such that their lengths and breadths are equal. Pole strength of each part is [MHT CET] (a) m (b) m/ 2 (c) m/ 4 (d) m/ 8
2010 10 A bar magnet having a magnetic moment of 2 × 104 JT −1 is free to rotate in a horizontal plane. A horizontal magnetic field B = 6 × 10–4 T exists in the space. The work done in taking the magnet slowly from a direction parallel to the field to a direction 60º from the field is [CBSE AIPMT]
(a) 0.6 J
(b) 12 J
(c) 6 J
(d) 2 J
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
11 A short bar magnet placed with its axis at 30º with a uniform external magnetic field of 0.16 T experiences a torque of magnitude 0.032 J. The magnetic moment of the bar magnet will be [Punjab PMET] (a) 0.23 JT −1 (b) 0.40 JT −1 (c) 0.80 JT −1 (d) zero 12 A bar magnet of length 3 cm has points A and B along its axis at distances of 24 cm and 48 cm on the opposite sides. Ratio of magnetic fields at these points will be
19 Assertion Two short magnets are placed on a cork which floats on water. The magnets are placed such that the axis of one produced bisects the axis of other at right angles. Then, the cork has neither translational nor rotational motion. [AIIMS] Reason Net force on the cork is zero
[Punjab PMET] A
S
24 cm
(a) 8
N O
(b) 1/ 2 2
B 48 cm
(c) 3
(d) 4
.
13 The work done in turning a magnet of magnetic moment M by an angle of 90º from the meridian is n times. The corresponding work done to turn it through an angle of 60º is [BCECE] (a) n = 1/ 2 (b) n = 2 (c) n = 1/ 4 (d) n = 1 14 The magnetic lines of force inside a bar magnet [MGIMS] (a) are from north pole to south pole of the magnet (b) do not exist (c) depend upon the area of cross-section of the bar magnet (d) are from south pole to north pole of the magnet 15 Two small magnets each of magnetic moment 10 A-m2 are placed in end on position 0.1 m apart from their centres. The force acting between them is [VMMC] (a) 0.6 × 107 N (b) 0.06 × 107 N (c) 0.6 N (d) 0.06 N 16 Torques τ1 and τ 2 are required for magnetic needle to remain perpendicular to the magnetic fields B1 and B 2 at two different places. The ratio B1 / B 2 is [VMMC] τ1 τ2 (b) (a) τ1 τ2 τ1 + τ 2 τ1 – τ 2 (c) (d) τ1 – τ 2 τ1 + τ 2
2009 17 A magnetic needle is kept in a non-uniform magnetic field. It experiences (a) a force only but not a torque (b) a force and torque both (c) a torque only but not a force (d) neither a torque nor a force
[AFMC]
18 Two bar magnets having same geometry with magnetic moments M and 2M are placed in such a way that their similar poles are on the same side, then its time period of the oscillation is T1 . Now, if the polarity of one of the magnets is reversed, then time period of oscillation is T2 , then [AIIMS] (a) T1 < T2 (b) T1 > T2 (c) T1 = T2 (d) T1 = ∞ , T1 = 0
(a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
20 The mathematical equation for magnetic field lines of force is [BVP] (a) ∇ ⋅ B = 0 (b) ∇ ⋅ B ≠ 0 (c) ∇ ⋅ B > 0 (d) ∇ ⋅ B < 0 21 The figure shows the various positions (labelled subscripts) of small magnetised needles P and Q. The arrows show the direction of their magnetic moment. Which configuration corresponds to the lowest potential energy of all the configurations shown? [DUMET] Q4
Q5 Q1
P
Q2 Q3
Q6
(a) PQ3
(b) PQ4
(c) PQ5
(d) PQ6
2008 22 A thin rectangular magnet suspended freely has a period of oscillation equal to T. Now, it is broken into two equal halves (each having half of the original length) and one piece is made to oscillate freely in the same field. If its period of oscillation is T ′. The ratio of T ′/T is [RPMT] 1 1 1 (a) (c) 2 (d) (b) 2 4 2 2
23 A bar magnet suspended freely in a uniform magnetic field is vibrating with a time period of 3 s. If the field strength is increased to 4 times of the earlier field strength, then the time period (in second) will be [Punjab PMET]
(a) 12
(b) 6
(c) 1.5
(d) 0.75
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MAGNETISM AND MATTER
24 A bar magnet of magnetic moment M 1 is axially cut into two equal parts. If these two pieces are arranged perpendicular to each other, the resultant magnetic moment [Punjab PMET] is M 2 . Then, the value of M 1 / M 2 is 1 1 (b) 1 (c) (d) 2 (a) 2 2 2 25 The effect due to uniform magnetic field on a freely suspended magnetic needle is as follows [AFMC] (a) both torque and net force are present (b) torque is present but no net force (c) both torque and net force are absent (d) net force is present but not torque 26 A thin bar magnet of length 2 L is bent at the mid-point, so that the angle between them is 60°. The new length of the magnet is [Manipal] (a) 2 L (b) 3 L (c) 2 L (d) L 27 The magnetic moment of a bar magnet of semi-length 20 cm is 4 × 10−6 Am 2 . Its pole strength is (a) 20 × 10−6 Am (b) 10 × 10−6 Am −6 (c) 80 × 10 Am (d) 40 × 10−6 Am 28 A bar magnet of magnetic moment M, is placed in a magnetic field of induction B. The torque exerted on it is [Guj CET] (a) M × B (b) − B ⋅ M (c) M ⋅ B (d) M ⋅ B
2007 29 A bar magnet is oscillating in the earth’s magnetic field with a period T. What happens to its period and motion, if its mass is quadrupled? [BHU] (a) Motion remains simple harmonic with time period = 4T (b) Motion remains simple harmonic and period remains nearly constant (c) Motion remains simple harmonic with time period T = 2 (d) Motion remains simple harmonic with time period = 2T
30 A long magnet is cut into two equal parts such that the length of each half is same as that of original magnet. If the period of original magnet is T, then the period of new magnet is [J&K CET] (a) T (b) T / 2 (c) T / 4 (d) 2T
31 The time period of a freely suspended bar magnet in a field is 2 s. It is cut into two equal parts along its axis, then the time period is [J&K CET] (a) 4 s (b) 0.5 s (c) 2 s (d) 0.25 s
2006 32 A bar magnet is held at right angle to a uniform magnetic field. The couple acting on the magnet is to be halved by rotating it from this position. The angle of rotation is [J&K CET]
(a) 60°
(b) 45°
(c) 30°
(d) 75°
33 The couple acting on a magnet of length 10 cm and pole strength 15 A-m kept in a field of B = 2 × 10−5 T, at an angle of 30° is [AMU] −5 −3 (a) 1.5 × 10 N-m (b) 1.5 × 10 N-m (c) 1.5 × 10−2 Nm (d) 1.5 × 10−6 N-m 34 Two short bar magnets P and Q are arranged such that their centres are on the X -axis and are separated by a large distance. The magnetic axes of P and Q are along X and Y -axes, respectively. At a point R, mid-way between their centres, if B is the magnitude of induction due to Q, the magnitude of total induction at [EAMCET] R due to the both magnets is 5 (c) (d) B (a) 3B (b) 5 B B 2 35 Work done in rotating a bar magnet from 0 to angle θ is M [JCECE] (a) MH (1 − cos θ ) (b) (1 − cos θ ) H (c) M / H (cos θ − 1) (d) MH (cos θ − 1)
2005 36 The intensity of magnetic field due to an isolated pole of strength m at a point distant r from it will be proportional to [J&K CET] 2 m m r (b) mr 2 (c) (a) 2 (d) r m r 37 For protecting a sensitive equipment from external magnetic field, it should be [AMU] (a) placed inside an iron cane (b) placed inside an aluminium cane (c) surrounded with fine copper sheet (d) wrapped with insulation around it, when passing current through it
Answers 1 (b)
2 (c)
3 (c)
4 (c)
5 (b)
6 (b)
7 (b)
8 (b)
9 (b)
10 (c)
11 (b)
12 (a)
13 (b)
14 (d)
15 (c)
16 (b)
17 (b)
18 (a)
19 (a)
20 (a)
21 (d)
22 (b)
23 (c)
24 (d)
25 (b)
26 (d)
27 (b)
28 (a)
29 (d)
30 (a)
31 (c)
32 (a)
33 (a)
34 (b)
35 (a)
36 (a)
37 (a)
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CHAPTERWISE & TOPICWISE ~ ENGINEERING SOLVED PAPERS
Explanations 1 (b)Q Work done in rotating the
Now,
magnet, W = MB (cos θ 0 − cos θ ) where, M = magnetic moment of the magnet and B = magnetic field. Given, θ 0 = 0° and θ = 60° W = MB (cos 0° − cos 60° ) 1 = MB 1 − 2
Q
1 Q cos 0° = 1 and cos 60° = 2 MB = 2 …(i) ∴ MB = 2W Torque on a magnet in this position is given by, τ = M × B = MB sin θ = 2W ⋅ sin 60° [from Eq. (i)] 3 3 = 2W Q sin 60° = 2 2 = 3W
2 (c) Magnetic dipole moment is from S
4
M ′ m′ (l ) 1 m′ = = M m(2l ) 2 m
When magnet is cut as shown in the diagram, pole strength will not be affected. m′ Hence, m′ = m ⇒ =1 m M [from Eq. (i)] ⇒ M′ = 2 (c) Let at point P, magnetic field is zero
P
∴
40 A-m N x
mnet will be maximum, if cos θ is maximum. cos θ will be maximum when θ will be minimum.
m
m N
S 2l (a)
[from figure]
(20 + x )2 = 2x 2 ⇒ ∴
S
N
l
S l
(b)
For Figs. (a) and (b), magnetic moment of first part, M = m(2l ) = magnetic moment M ′ = m′ (l )
I S
x=
µ0 m along NP 4 π (z − l )2 Similarly, magnetic field at point P due to S-pole, µ m B2 = 0 along PS 4 π (z + l )2 Net magnetic field at P, B1 =
B = B1 − B2 m µ m = 0 − 4 π (z − l )2 (z + l )2 =
5 (b) In this case, work done, W = MB (cos θ 1 − cos θ 2 ) Given, W = 3 J,
⇒
1 MB = 2 2
MB = 2 3 J
Torque, τ = MB sin θ = MB sin (60° ) = (2 3 ) ( 3 / 2) = 3 N-m or J
As wire is bent in the form of semicircle effective distance between the ends is 2r. So, new dipole moment, M ′ = m × 2r As, πr = 2l ⇒ r = 2l /π 2l 2 So, M ′ = m × 2 × = (m × 2l ) π π 2 2 = M = 4 π = 8 A-m 2 π π
µ0 4π
4m lz 2 2 2 (z − l )
µ 0 m × 2l 2 2 2 2z 4 π (z − l ) 2Mz µ B= 0 2 2 2 4 π (z − l ) =
θ 1 = 0° and θ 2 = 60° 3 = MB (cos 0° − cos 60° ) = MB 1 −
N
2l
B B2 P B1
z
20 = 48.2 cm 2 −1
magnetic moment, M = m × 2l = 4π A-m 2 (given) N
axial line of a short bar magnet of magnetic length 2l and strength m. Let us find B at a point P which is at a distance z from the centre of magnet. Magnetic field at point P due to N-pole,
20 + x = 2x
6 (b) If length of wire is 2l, then
m′ = m m′ = m
7 (b) Consider a point P located on the
(towards north pole)
So, at θ = 30° , mnet will be maximum. diagram
20 cm
40 80 = 2 x (20 + x )2
In Fig. (a), θ = 90°, in Fig. (b) it is 180°, in Fig. (c) it is 30° and in Fig. (d) it is 60°.
3 (c) The bar magnet is shown in the
80 A-m S
µ 0 m1 µ 0 m2 = 4 π r12 4 π r22
to N, mnet = m2 + m2 + 2m2 cos θ
…(i)
[∴ M = m (2l)] µ 0 2Mz (Q z > > l ) ⋅ B= 4 π z4 Hence, in vector form, magnetic field at point P due to N -pole can be written as µ 2M $ B= 0 3 M 4π z $ = unit vector along magnetic where, M dipole moment.
8 (b) We know that, As,
W = MB (cosθ 1 − cosθ 2 ) θ 1 = 0° and θ 2 = 180°
Then, W = MB (cos 0° − cos180° ) = 2 MB where, M = magnetic dipole moment of bar magnet.
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MAGNETISM AND MATTER
= MB 1 –
9 (b) The situations are shown in figure. m N
S
m/2 m/2 m/2
N
S
S
N
S
L/2
For each part, m'=
N
m/2 m/2
N
m 2
15
M = 2 × 104 JT −1 B = 6 × 10−4 T
and
Now, work done in rotating the bar magnet from angular position 0° to 60° (in magnitude). W = – M⋅B 60° ⇒W = – ∫ dW = – ∫ M ⋅ B cos θ dθ = – MB
0
60°
∫0 cos θ dθ
= – MB [cos 60° − cos 0° ] = MB × 1/ 2 4
= 2 × 10 JT
−1
−4
× 6 × 10
1 T× 2
=6J
11 (b) Given, θ = 30°, B = 016 . T τ = 0.032 J Magnetic moment, τ 0.032 M= = B sin θ 0.16× sin 30º and
= 0.40 JT −1
12 (a) Magnetic field due to a bar magnet at a distance r from the centre of magnet on axial position, µ 2M B= 0⋅ 3 4π r Given, l = 3 cm, r1 = 24 cm and r2 = 48 cm Putting these values, we get 3
⇒
3
B1 r2 48 = = =8 24 B2 r1
13 (b) Work done, W = MB (cosθ 1 – cosθ 2 ) In first case, θ 1 = 0° and θ 2 = 90º ⇒ W 1 = MB (cos 0º– cos 90º ) = MB In second case, θ 1 = 0º ,θ 2 = 60º ⇒ W 2 = MB (cos 0º– cos 60º )
exert equal and opposite force/torque on each other. Hence, net force/torque on cork will be zero. Therefore, the cork has neither translational nor rotational motion.
14 (d) In case of a bar magnet, outside it,
m/2 L/2
10 (c) Given, magnetic moment,
19 (a) We observe that both the magnets
Given, W 1 = nW 2 MB ⇒ MB = n 2 ⇒ n=2
L S
1 MB = 2 2
the magnetic lines of force start from north pole and end on south pole. But inside it, lines of force are from south pole to north pole. µ 6M 1 M 2 (c) Magnetic force, F = 0 4π r4 µ Given, 0 = 10−7 , M 1 = M 2 4π
20 (a) The divergence of magnetic field is always zero, i.e. ∇ ⋅ B = 0.
21 (d) As potential energy is given as U = − MB (1 − cosθ ) U = − MB [ when θ = 0° , U = minimum ] Hence, M amd B are parallel to each other for minimum potential energy. PQ6 configuration provides θ = 0° ⇒
U min = − MB
= 10 A-m 2 and r = 01 . m
22 (b) When a thin rectangular magnet is
Putting these values, we get 6 × 10 × 10 ⇒ F = 10–7 × (0.1)4 ⇒
F=
divided into two equal parts, the magnetic dipole moment, l M M′ = pole strength × = 2 2 (pole strength remains same)
600 × 10–7 = 0. 6 N 0.0001
Also, the mass of magnet becomes m half, i.e. m′ = 2
16 (b) Torque, τ = MB sin θ and or
τ 1 = MB1 sin 90º = MB1 τ 2 = MB2 sin 90º = MB2 MB1 τ 1 B τ = ⇒ 1= 1 MB2 τ 2 B2 τ 2
Moment of inertia of magnet, I =
17 (b) Magnetic needle kept in a
New moment of inertia,
non-uniform magnetic field, experiences a force and torque both.
2
⇒
…(i)
Now,
When similar poles placed at same side, then M 1 = M + 2M = 3M So, from Eq. (i) 1 …(ii) T1 ∝ 3M
I′ T ′ = 2π M ′ B
When the polarity of a magnet is reversed, then M 2 = 2 M – M = M So, from Eq . (i), 1 T2 ∝ M
…(iii)
Now, on dividing Eq. (ii) by Eq. (iii), we get 1 T1 M = = T2 3M 3 ⇒ Hence,
T2 = 3 T1 T1 < T2
1 m l ml 2 = 12 2 2 12 × 8 I I′ = 8 I T = 2π MB I′ =
18 (a) Using the formula, for time period, 1 I T = 2π ⇒T ∝ MH M
ml 2 12
23
I /8 = 2π MB / 2 T ∴ T′ = 2 T′ 1 ⇒ = T 2 (c) As, the time period, I MB
T = 2π or
T ∝
⇒
T2 = T1
1 B B1 B2
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or or
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
T2 = 3
1 (given) 4
29 (d) Time period,
new magnetic moment of each part, M m M = l= 1 2 2 On placing both the parts perpendicularly, we get M M = 1 M 2 = (M ) + (M ) = 2 2 M1 ⇒ = 2 M2 2
2
25 (b) When a magnetic needle is placed in a uniform magnetic field, equal and opposite forces act on the poles of the needle (as magnetic dipole) which give rise to a torque but no net force.
26 (d) On bending the magnet, the length of the magnet, AC = AB + BC θ θ = L sin + L sin 2 2 [Q θ = 60°] = 2 L sin 30° = 2 L × 1/ 2 = L
27 (b) Given, M = 4 × 10−6 A-m 2 l = 20 cm =
1 m and m = ? 5
M = m × 2l 4 × 10−6 M = 10 × 10−6A-m = ∴ m= 2 × 1/ 5 2l As,
28 (a) When a bar magnet of magnetic moment M is placed in a magnetic field of induction B, then net force on it is FR = mB + (− m) B = 0 +m
X-axis and for magnet Q, axis is along Y-axis. The point R is along axial line w.r.t. magnet P and is along equatorial line w.r.t. magnet Q.
I θ T = 2π = 2π MH α
T2 = 1.5 s
24 (d) When a bar magnet is cut axially,
34 (b) Since for magnet P, axis lies along
or
T ∝ I
or
T ∝ m
⇒
T1 = T2
m1 m2
or
T = T2
m 1 = 4m 2
⇒ T2 = 2T Thus, motion remains simple harmonic with time period 2T.
BR ⇒ Net magnetic field at R due to magnet P and Q is given as
I MB As the magnet is cut into two equal parts along axis, then for each part I M I′ = , M′ = 2 2 ∴ Time period of new magnet,
30 (a) Time period, T = 2π
I′ = M′ B
T′ = ⇒
BR ⇒ BP 2 + BQ 2 [from Eqs. (i) and (ii)]
= 5 B
I ×2 2×M × B
35 (a) Work done in rotating a magnet (from angle 0 to θ) is given by
T′ = T
θ
W = ∫ τ dθ
31 (c) As, time period T = 2π I / MB
⇒
0
where, τ = torque and dθ = angular change. Also, τ = MH sin θ
I M T = 2 s, I ′ = , M ′ = 2 2 T′ = T ⇒ T′ = 2 s
32 (a) As,
θ
τ = MB sin θ
= ∫ MH sin θdθ 0
θ = 90° τ = MB 1 Given, τ 2 = τ 1 2 1 ⇒ MB sinθ = MB 2 ⇒ sin θ = 1/ 2 ⇒ θ = 30° ∴ Angle of rotation = 90° − 30° = 60° where, ⇒
θ
= MH ∫ sin θdθ 0
= MH (− cosθ )θ0
36
Given, 2l = 10 cm, m = 15 A-m
While torque, τ = mB × 2l sin θ = MB sin θ (as, M = 2 ml ) i.e.
τ=M×B
Putting these values, we get = (m × 2l ) × 2 × 10−5 sin 30° = 15 × 10 × 10−2 × 2 × 10−5 × = 1.5 × 10−5 N-m
= − MH (cosθ − cos 0) = MH (1 − cosθ ) (a) The intensity of magnetic field B due to an isolated pole at a distance r µ m from it is given by B = 0 ⋅ 2 4π r m ⇒ B∝ 2 r where, m is pole strength.
37 (a) For protecting sensitive equipment
B = 2 × 10−5 T and θ = 30°. –m
B 2 + (2 B )2
=
33 (a) As, τ = MB sin θ
mB
Hence, magnetic field due to magnet Q, µ M … (i) BQ = 0 3 = B 4π x Magnetic field due to magnet P, µ 2M … (ii) = 2B BP = 0 4 π x3 As at point R, magnetic field due to P and Q magnet are perpendicular to each other,
(Q I = ml 2 /12)
1 2
from external magnetic field, it must be placed inside a iron cane made from ferromagnetic substance, because there are no magnetic lines of force inside it. Iron is a ferromagnetic substance. Hence, it is used to keep the sensitive equipment.
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MAGNETISM AND MATTER
Topic 2 Earth’s Magnetism 2019 1 At a point A on the earth’s surface, the angle of dip δ is
25º. At a point B on the earth’s surface, the angle of dip δ is − 25º. [NEET] We can interpret that (a) A is located in the southern hemisphere and B is located in the northern hemisphere (b) A is located in the northern hemisphere and B is located in the southern hemisphere (c) A and B are both located in the southern hemisphere (d) A and B are both located in the northern hemisphere
2 The relations amongst the three elements of earth’s magnetic field, namely horizontal component H, vertical component V and dip angle δ are [NEET (Odisha)] (B E = total magnetic field) (a) V = B E tan δ, H = B E (b) V = B E sin δ , H = B E cos δ (c) V = B E cos δ , H = B E sin δ (d) V = B E , H = Be E tan δ 2018 3 The horizontal component of the earth’s magnetic field at any place is 0.36 × 10−4 Wbm −2 . If the angle of dip at that place is 60°, then the value of vertical component of the earth’s magnetic field will be (in Wbm −2 ) [AIIMS] −4 −4 (a) 0.12 × 10 (b) 0.24 × 10 (c) 0.40 × 10−4 (d) 0.622 × 10−4
2017 4 If θ1 and θ 2 be the apparent angles of dip observed in two vertical planes at right angles to each other, then the true angle of dip θ is given by [JIPMER] 2 2 2 (a) cot θ = cot θ1 + cot θ 2 (b) tan 2 θ = tan 2 θ1 + tan 2 θ 2 (c) cot 2 θ = cot 2 θ1 − cot 2 θ 2 (d) tan 2 θ = tan 2 θ1 − tan 2 θ 2
2013 5 At the magnetic pole of earth, the value of angle of dip is [AIIMS]
(a) 0° (c) 45°
(b) 30° (d) 90°
6 A circular coil of 5 turns and of 10 cm mean diameter is connected to a voltage source. If the resistance of the coil is 10 Ω, the voltage of the source so as to nullify the horizontal component of earth’s magnetic field of 30 A turn m −1 at the centre of the coil should be [UP CPMT, Manipal]
(a) 6 V, plane of the coil normal to magnetic meridian (b) 2 V, plane of the coil normal to magnetic meridian (c) 6 V, plane of the coil along the magnetic meridian (d) 2 V, plane of the coil along the magnetic meridian (e) 4 V, plane of the coil normal to magnetic meridian
7 A dip needle in a plane perpendicular to magnetic meridian will remain [WB JEE] (a) vertical (b) horizontal (c) in any direction (d) at any angle of dip to the horizontal 8 In the magnetic meridian of a certain place. The horizontal component of the earths magnetic field is 0.26 and the dip angle 60°. What is the magnetic field of the earth in this location? [AIIMS] (a) 0.48 G (b) 0.50 G (c) 0.60 G (d) 0.52 G
2011 9 The angle which the total magnetic field of earth makes with the surface of the earth is called [J&K CET] (a) declination (b) magnetic meridian (c) geographic meridian (d) inclination
10 The plane of a dip circle is set in the geographic meridian and the apparent dip is δ 1 . It is then set in a vertical plane perpendicular to the geographic meridian. The apparent dip angle is δ 2 . The declination θ at the plane is (a) θ = tan –1 (tan δ 1 tan δ 2 ) [Punjab PMET] (b) θ = tan –1 (tan δ 1 + tan δ 2 ) tan δ 1 (c) θ = tan –1 tan δ 2 (d) θ = tan –1 (tan δ 1 – tan δ 2 )
2010 11 Isogonic lines are those for which
[AFMC]
(a) declination is the same at all places on the line (b) angle of dip is the same at the place on the line (c) the value of horizontal component of earth’s magnetic field is the same (d) All of the above
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
12 A magnet 10 cm long and having a pole strength 2 A-m is deflected through 30º from the magnetic meridian. The horizontal component of earth’s induction is 0.32 × 10−4 T, then the value of deflecting couple is [UP CPMT]
(a) 16 × 10–7 Nm (c) 48 × 10–7 Nm
(b) 64 × 10–7 Nm (d) 32 × 10–7 Nm
13 At a certain place, the horizontal component of earth’s magnetic field is 3 times the vertical component. The angle of dip at that place is [UP CPMT] (a) 30º (b) 60º (c) 45º (d) 90º 14 A torque of 10–5 N-m is required to hold a magnet at 90º with the horizontal component of the earth’s magnetic field. The torque required to hold it at 30º will be 1 (a) 5 × 10–6 N-m (b) × 10–5 N-m [Manipal] 2 (c) 5 3 × 10–6 N-m (d) Data is insufficient 15 A short bar magnet is arranged with its north pole pointing geographical north. It is found that the horizontal component of earth’s magnetic induction ( B H ) is balanced by the magnetic induction of the magnet at a point which is at a distance of 20 cm from its centre. The magnetic moment of the magnet is [EAMCET] (if B H = 4 × 10–5 Wbm–2) 2 2 (b) 1.6 A-m (a) 3.2 A-m 2 (d) 0.8 A-m 2 (c) 6.4 A-m 16 The angle of dip at a place on the earth gives [VMMC] (a) the horizontal component of the earth’s magnetic field (b) the location of geographic meridian (c) the vertical component of the earth’s field (d) the direction of the earth’s magnetic field
2008 17 Assertion If a compass needle be kept at magnetic north pole of the earth, the compass needle may stay in any direction. [AIIMS] Reason Dip needle will stay vertical at the north pole of the earth. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
18 A dip needle arranged to move freely in the magnetic meridian dips at an angle θ. If the vertical plane in which the needle moves is rotated through an angle α
α to the magnetic meridian, then the needle will dip by an angle [BHU] (a) θ (b) α (c) more than θ (d) less than θ
19 If the total magnetic field due to the earth is 28 Am −1 , then the total magnetic induction due to the earth is [BHU] (a) 28 T (b) 280 A-cm −1 (c) 0.352 G (d) 0.352 T 20 If a magnet is suspended at angle 30° to the magnetic meridian, the dip needle makes angle of 45° with the horizontal. The real dip is [AMU] (b) tan −1 ( 3 ) (a) tan −1 ( 3 / 2) 3 2 (c) tan −1 (d) tan −1 2 3 21 At a given place on the earth, the angle between the magnetic meridian and the geographic meridian is called [Guj CET] (a) magnetic longitude (b) magnetic declination (c) magnetic latitude (d) magnetic dip
2007 22 A magnetic needle is placed on a cork floating in a still lake in the northern hemisphere. Does the needle together with the cork move towards the north of the lake? [AFMC] (a) Yes (b) No (c) May or may not move (d) Nothing can be said 1 23 If B H = BV , then find the value of angle of dip 3 (where, symbols have their usual meanings). [UP CPMT] (a) 60° (b) 30° (c) 45° (d) 90°
24 The time of vibration of a dip needle vibration in the vertical plane in the magnetic meridian is 3 s. When the same magnetic needle is made to vibrate in the horizontal plane, the time of vibration is 3 2 s. Then, angle of dip will be [BCECE] (a) 90° (b) 60° (c) 45° (d) 30°
2005 25 The dip at a place is δ. For measuring it, the axis of the dip needle is perpendicular to the magnetic meridian. If the axis of the dip needle makes an angle θ with the magnetic meridian, the apparent dip will be given by [Haryana PMT] (a) tan δ cosec θ (b) tan δ sin θ (c) tan δ cos θ (d) tan δ sec θ
MAGNETISM AND MATTER
Answers 1 (b) 11 (a) 21 (b)
2 (b) 12 (d) 22 (b)
3 (d) 13 (a) 23 (a)
4 (a) 14 (a) 24 (b)
5 (d) 15 (a) 25 (a)
6 (a) 16 (d)
7 (a) 17 (b)
8 (d) 18 (c)
9 (a) 19 (c)
10 (c) 20 (d)
Explanations
This means the values δ is positive in northern hemisphere and is negative in southern hemisphere.
horizontal and vertical component of earth’s magnetic field B. B B ...(i) tan θ = V ⇒ cot θ = H BH BV Plane -1
δ
BH
+ve
∴For point A, δ = + 25°, so A lies in the northern hemisphere. Similarly, for B, δ = − 25°, so B lies in the southern hemisphere.
2 (b) Let BE be the
H
net magnetic field δ at same point, H and V be the V horizontal and vertical components of BE . BE Let δ be the angle of dip, which is the angle between direction of earth’s magnetic field BE and horizontal line in the magnetic meridian. Thus, from figure, we can see that H = BE cosδ and V = BE sinδ
3 (d) Vertical component of earth’s magnetic field, BV = BH tanδ = 0.36 × 10−4 × tan 60° −4
= 0.36 × 10
and B = 30 A turn m −1 2 × (5 × 10−2 ) × 10 × (30 × 4 π × 10−7 ) ∴ V = (4 π × 10−7 ) × 5
θ BH cos θ
δ
× 3 = 0.622 × 10−4 T
−4
= 0.622 × 10 Wbm
−2
Let plane 1 and 2 be mutually perpendicular planes making angle θ and (90° − θ ) with magnetic meridian. The vertical component of earth’s magnetic field remain same in two plane but effective horizontal components in the two planes is given by ...(ii) B1 = BH cos θ B2 = BH sin θ B BV Then, tan θ 1 = V = B1 BH cos θ
and
7 (a) A dip needle in a plane perpendicular to the magnetic meridian will remain vertical as the horizontal component to earth’s field is not effective as the axis of rotation of needle lies in the direction of horizontal component of magnetic field.
...(iii)
B cos θ ...(iv) cot θ 1 = H BV B BV Similarly, ⇒ tan θ 2 = V = B2 BH sin θ ⇒
V =6V To nullify the horizontal component of magnetic field of the earth, plane of the coil should be normal to magnetic meridian.
or Plane -2
B sin θ cot θ 2 = H BV
...(v)
8 (d) Given, BH = 0.26 G, δ = 60° BH = B cos δ BH 0.26 G 0.26 G B= = = cosδ cos 60° 0.5
As,
B = 0.52 G
9 (a) The angle which the total magnetic
From Eqs. (iv) and (v), we get ⇒ cot 2 θ 1 + cot 2 θ 2 B 2 cos2 θ BH2 sin 2 θ = H 2 + BV BV2 ⇒ cot 2 θ 1 + cot 2 θ 2 B2 = H2 (cos2 θ + sin 2 θ ) BV ⇒ cot 2 θ 1 + cot 2 θ 2 = cot 2 θ
(given)
r = 10 cm = 10 × 10−2 m, R = 10 Ω
Magnetic meridian
BH sin θ
BV –ve
Field at centre, µ NI µ N V B= 0 = 0 × R 2r 2r 2rRB V = µ 0N
4 (a) Let the BH and BV be the
°– θ
the horizontal component of earth’s magnetic field and the total magnetic field of the earth. Its value is different at different places. It is zero at equator, as the dip needle becomes parallel to horizontal component. It varies from − 90° in south pole to + 90° in the north pole.
90
1 (b) The angle of dip δ is the angle between
5 (d) At the earth’s magnetic poles, the angle of dip is 90°.
6 (a) Magnetic field of 1 A turn m −1 = 4 π × 10−7 T
10
field of the earth makes with the surface of the earth is called declination. V (c) Here, tan δ 1 = H cosθ V V tan δ 2 = = H cos (90º–θ ) H sin θ tan δ 1 sin θ ⇒ = = tan θ tan δ 2 cosθ or
tan δ 1 θ = tan –1 tan δ 2
11 (a) Isogonic lines are those lines, which have same angle of declination at all the places on the line.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
horizontal direction. So, the angle of dip at a place on the earth gives the direction of the earth’s magnetic field.
12 (d) As, couple acting on the bar magnet is given as τ = MBH sin θ τ = (2l ) m BH sinθ Given, 2l = 10 cm = 10 × 10−2 m,
17 (b) We know that at magnetic poles, the horizontal component of the earth’s field is zero, only its vertical component exists. So, as compass needle is free to rotate in horizontal plane and is thus affected by horizontal component only. As H = 0, hence compass needle may stay in any direction.
m = 2 A-m, θ = 30° and BH = 0.32 × 10−4 T Putting these values, we get
13 (a) As, angle of dip is given
= ⇒
BV = BH
BV (given ) 3 BV
1 3
18
δ = 30°
tan θ′ or >1 tan θ ⇒ tan θ′ > tan θ ∴ θ′ > θ i.e. angle of apparent dip θ′ is more than angle of actual dip θ.
14 (a) The magnet in a magnetic field experiences a torque which rotates the magnet to a position in which the axis of the magnet is parallel to the field. τ = MB sin θ where, M is the magnetic dipole moment, B is the magnetic field and θ is the angle between the two.
15
10–5 10 τ2 = = × 10–6 ⇒ 2 2 = 5 × 10–6 N-m µ M (a) As, BH = 0 ⋅ 3 4π r Given, BH = 4 × 10−5 Wbm −2, r = 20 cm = 20 × 10−2 m Putting these values, we get M ⇒ 4 × 10–5 = 10–7 × (20)3 × 10–6 (20)3 × 4 × 10–5 × 10–6 10–7 2 = 3.2 A-m
M =
16 (d) The dip at a place is defined as the angle made by the direction of the earth’s total magnetic field with
T = 2π I / MH When horizontal component is taken T ′ = 2π I / MV (as in vertical plane in magnetic meridian both V and H act on the needle) Given, T = 3 2 s
19 (c) Given, B = 28 Am −1
∴
= 352 × 10−7 T (Q 1 T = 104 G)
20
Plane -1
2 δ′ = tan −1 3
meridian and the geographic meridian is called magnetic declination. (b) Magnetic needle is a dipole which is in the earth’s uniform magnetic field and as a dipole in a uniform field, it does not experience any net force but may experience a couple. So the needle together with the cork will not translate, i.e. not move towards the north of the lake, but will rotate and set itself parallel to the field with its north pole pointing north.
23 (a) Magnetic dip or magnetic inclination is given by tan δ = BV / BH
Magnetic meridian
BH sin θ
…(i)
θ BH cos θ
21 (b) The angle between the magnetic 22
H 3 1 = = V 3 2 2
⇒
= 0.352 G tan δ tan 45° (d) As, tan δ′ = (given) = cosθ cos 30° 1 2 tan δ′ = = 3/2 3 ⇒
T′ = 3 s T′ H = T V
and
Magnetic induction B is given by B = µ 0H = 4 π × 10−7 × 28
Given, τ 1 = 10–5 N-m, θ 1 = 90º and θ 2 = 30º. As we know, …(i) τ 1 = MB sin 90º …(ii) τ 2 = MB sin 30º On dividing Eq. (i) by Eq. (ii) , we get τ 1 10–5 1 = = τ2 τ2 1/ 2
the magnet, H and V are the horizontal and vertical components of the earth’s magnetic field and l is moment of inertia of magnet about its axis of vibration, then the time period of magnet is
θ
tan δ =
The dip needle rotates in a vertical plane and the angle of dip at poles is 90°. Hence, the dip needle will stand vertical at the north pole of the earth. (c) In this question, cos α < 1 1 i.e. >1 cos α
24 (b) When M is magnetic moment of
°–
τ = 32 × 10−7 N-m
1 2
From Eqs. (i) and (ii), we get tanδ = 3 ⇒ δ = 60°
90
τ = 10 × 10−2 (2) (0. 32 × 10−4 ) ×
where, BV and BH are vertical and horizontal components of earth’s magnetic field, respectively. 1 Given, BH = BV 3 BV …(ii) = 3 ⇒ BH
Plane -2
Also, the angle of dip at a place is the angle between the direction of the earth’s magnetic field and the horizontal component of magnetic meridian at that place. H 1 = cos φ = V 2 1 ⇒ cos φ = ⇒ φ = 60° 2 V (a) As, tanδ = H V and tan δ 1 = H cos (90° − θ ) tan δ = = tan δ cosec θ cos (90° − θ )
∴
25
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MAGNETISM AND MATTER
Topic 3 Magnetic Materials 2019 1 Coercivity and retentivity of soft iron is
[JIPMER]
(a) high coercivity, high retentivity (b) low coercivity, high retentivity (c) low coercivity, low retentivity (d) high coercivity, low retentivity
2 Assertion Paramagnetic substances get poorly attracted in magnetic field. Reason Because magnetic dipoles are aligned along external magnetic field weakly. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is true but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2017 3 Assertion The magnetism of magnet is due to the spin motion of electrons. Reason Dipole moment of electron is smaller than that due to orbit motion around nucleus. [AIIMS] (a) Both Assertion and Reason correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
2016 4 The magnetic susceptibility is negative for
7 A paramagnetic sample shows a net magnetisation of 0.8 Am −1 , when placed in an external magnetic field of strength 0.8 T at a temperature 5 K. When the same sample is placed in an external magnetic field of 0.4 T at a temperature of 20 K, the magnetisation is [EAMCET] −1 −2 (a) 0.8 Am (b) 0.8 Am (c) 0.1 Am (d) 0.1 Am −1 8 The magnetic susceptibility of a material of a rod is 299 and permeability of vacuumµ 0 is 4π × 10−7 Hm −1 . Absolute permeability of the material of the rod is [EAMCET] (a) 3771 × 10−7 Hm −1 (b) 3771 × 10−5 Hm −1 (c) 3770 × 10−6 Hm −1 (d) 3771 × 10−8 Hm −1 9 A susceptibility of a certain magnetic material is 400. What is the class of the magnetic material? [KCET] (a) Diamagnetic (b) Paramagnetic (c) Ferromagnetic (d) Ferroelectric
2013 10 Assertion Susceptibility is defined as the ratio of intensity of magnetisation I to magnetic intensity H. Reason Greater the value of susceptibility, smaller the value of intensity of magnetisation I. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but the Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
11 A curve between magnetic moment and temperature of magnet is [AIIMS]
[NEET]
(a) paramagnetic material only (b) ferromagnetic material only (c) paramagnetic and ferromagnetic materials (d) diamagnetic material only
M
(a)
6 A magnetism field of 1500 Am −1 produces a magnetic flux of 2.4 × 10−5 Wb in a bar of iron of cross section 0.5 cm 2 . Calculate permeability of the iron bar used. (a) 4 × 10− 4 TmA −1 (b) 3.2 × 10−4 TmA −1 −4 −1 (c) 2.6 × 10 TmA (d) 4.2 × 10−4 TmA −1
(b) T
T
2014 5 The intensity of magnetisation of a bar magnet is
5.0 × 104 Am −1 . The magnetic length and the area of cross-section of the magnet are 12 cm and 1cm 2 , respectively. The magnitude of magnetic moment of this bar magnet (in SI unit) is [WB JEE] (a) 0.6 (b) 1.3 (c) 1.24 (d) 2.4
M
M
M
(c)
(d)
T
T
12 An iron rod of 0.2 cm 2 cross-sectional area is subjected to magnetizing field of 1200 Am −1 . The susceptibility of iron is 599. Find the value of permeability of rod. [AIIMS] (a) 6.234 × 10− 4 TmA −1 (b) 7.536 × 10−4 TmA −1 −4 −1 (c) 8.212 × 10 TmA (d) 4.245 × 10−4 TmA −1
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
13 A paramagnetic substance of susceptibility 3 × 10−4 is placed in a magnetic field of 4 × 10−4 Am −1 . Then, the intensity of magnetisation in the unit of Am −1 is [KCET] (a) 133 . × 108 (b) 0.75 × 10−8 (c) 12 × 10−8 (d) 14 × 10−8 (e) 12 . × 10−8
2011 14 There are four light-weight-rod samples A, B, C and D separately suspended by threads. A bar magnet is slowly brought near each sample and the following observations are noted. [CBSE AIPMT] (i) A is feebly repelled. (ii) B is feebly attracted. (iii) C is strongly attracted. (iv) D remains unaffected. Which one of the following is true? (a) C is a diamagnetic material (b) D is of a ferromagnetic material (c) A is of a non-magnetic material (d) B is of a paramagnetic material
15 Resultant force acting on a diamagnetic material in a magnetic field is in direction [J&K CET] (a) from stronger to the weaker part of the magnetic field (b) from weaker to the stronger part of the magnetic field (c) perpendicular to the magnetic field (d) in the direction making 60º to the magnetic field 16 The magnetic moment produced in a substance of 1 g is 6 × 10–7 Am2. If its density is 5 g cm −3 , then the intensity of magnetisation (in Am −1 ) will be [Haryana PMT] (a) 8.3×10 6 (b) 3.0 (c) 1.2 × 10–7 (d) 3 × 10–6
2010 17 Assertion A paramagnetic sample displays greater
20 An iron rod of 0.2 cm 2 cross-sectional area is subjected to a magnetising field of 1200 Am −1 . The susceptibility of iron is 599. The magnetic flux produced is [Manipal] (a) 0.904 Wb (b) 1.81 ×10–5 Wb (c) 0.904 × 10–5 Wb (d) 5.43 × 10–5 Wb 21 A domain in a ferromagnetic substance is in the form of a cube of side length 1 µm. If it contains 8 × 1010 atoms and each atomic dipole has a dipole moment of 9 × 10–24 A-m2, then the magnetisation of the domain is [Kerala CEE] (a) 7.2 × 105 Am −1 (b) 7.2 × 103 Am −1 9 −1 (c) 7.2 × 10 Am (d) 7.2 × 1012 Am −1 18 −1 (e) 7.2 × 10 Am
2009 22 If a diamagnetic substance is brought near the North pole
23
24
magnetisation (for the same magnetising field) when cooled. Reason The magnetisation does not depend on temperature. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
18 Obtain the earth’s magnetism. Assume that the earth’s field can be approximated by a gaint bar magnet of magnetic moment 8.0 × 1022 A-m 2 ? The earth’s radius is 6400 km. [AIPMT] (a) 72.9 Am −1 (b) 80 Am −1 (c) 74.4 Am −1 (d) 64 Am −1 19 A magnet of magnetic moment 2.5 A-m 2 weights 66 g. If the density of the material of the magnet is 7500 kg-m 2 find the intensity of magnetisation. [NEET] (a) 2.70 × 105 Am −1 (b) 2.84 × 105 Am −1 (c) 2.84 × 10−5 Am −1 (d) 2.70 × 10−5 Am −1
25
26
27
or the south pole of a bar magnet, it is [CBSE AIPMT] (a) repelled by both the poles (b) repelled by the north pole and attracted by the south pole (c) attracted by the north pole and repelled by the south pole (d) attracted by both the poles On applying an external magnetic field to a ferromagnetic substance, domains [MHT CET] (a) align in the direction of magnetic field (b) align in the direction opposite to magnetic field (c) remain unaffected (d) None of the above The relative permeability of iron is 6000. Its magnetic susceptibility is [Kerala CEE] (a) 5999 (b) 6001 (c) 6000 × 10−7 (d) 6000 × 107 (e) 60 A paramagnetic substance is placed in a weak magnetic field and its absolute temperature T is increased. As a result, its magnetisation [BCECE] (a) increases in proportional to T (b) decreases in proportional to 1/ T (c) increases in proportional to T 2 (d) decreases in proportional to 1/ T 2 Ferromagnetic materials used in a transformer must have (a) low permeability and high hysteresis loss [JCECE] (b) high permeability and low hysteresis loss (c) high permeability and high hysteresis loss (d) low permeability and low hysteresis loss Relative permeability of iron is 5500, then its magnetic susceptibility will be [MGIMS] (a) 5500 × 107 (b) 5500 × 10–7 (c) 5501 (d) 5499
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MAGNETISM AND MATTER
2008 28 Curie temperature is the temperature above which [CBSE AIPMT, MGIMS]
(a) ferromagnetic material becomes paramagnetic material (b) paramagnetic material becomes diamagnetic material (c) paramagnetic material becomes ferromagnetic material (d) ferromagnetic material becomes diamagnetic material 29 Nickel shows ferromagnetic property at room temperature. If the temperature is increased beyond Curie temperature, then it will show [MHT CET] (a) paramagnetism (b) anti-ferromagnetism (c) no magnetic property (d) diamagnetism
30 The magnetic susceptibility of paramagnetic materials is (a) positive but very high [OJEE] (b) negative but small (c) negative but very high (d) positive but small 31 At what temperature iron becomes paramagnetic? [Kerala CEE] (a) 200°C (b) 400°C (c) 600°C (d) 800°C 32 The magnetic moment of atomic neon is (a) zero (b) µ B/ 2 (c) µB
[KCET]
(d) 3µB / 2
33 There are 2.0 × 1024 molecular dipoles in a paramagnetic salt. Each has dipole moment 1.5 × 10−23 A-m 2 . Find maximum (saturation) magnetisation in the specimen. (b) 50 A-m 2 (a) 200 A-m 2 [Guj CET] (d) 30 A-m 2 (c) 20 A-m 2
2007 34 In which type of material, the magnetic susceptibility does not depend on temperature? (a) Diamagnetic (b) Paramagnetic (c) Ferromagnetic (d) Ferrite
[AFMC]
[Punjab PMET]
40 Domain formation is the necessary feature of [Guj CET] (a) ferromagnetism (b) paramagnetism (c) diamagnetism (d) All of the above 41 Permanent magnet has properties retentivity and coercivity respectively (a) high-high (b) low-low (c) low-high (d) high-low
[JCECE]
2006 42 Assertion Diamagnetic materials can exhibit magnetism. Reason Diamagnetic materials have permanent
magnetic dipole moment. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but R is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and R are incorrect.
43 A bar magnet has a coercivity 4 × 103 Am −1 . It is desired to demagnetise it by inserting it inside a solenoid 12 cm long and having 60 turns. The current by the solenoid should be [BHU] (a) 8 A (b) 6A (c) 4.5 A (d) 2 A
2005 44 If the magnetic dipole moment of an atom of diamagnetic material, paramagnetic material and ferromagnetic material are denoted by µ d , µ p and µ f respectively, then [CBSE AIPMT]
35 If a magnetic substance is kept in a magnetic field, then which of the following substances is thrown out? [MHT CET] (a) Paramagnetic (b) Ferromagnetic (c) Diamagnetic (d) Anti-ferromagnetic 36 The magnetic susceptibility of a paramagnetic substance at –73°C is 0.0060, then its value at –173°C will be [WB JEE] (a) 0.0030 (b) 0.0120 (c) 0.0180 (d) 0.0045 37 A hydrogen atom is paramagnetic. A hydrogen molecule is (a) diamagnetic (b) paramagnetic (c) ferromagnetic (d) None of these
39 Curie-Weiss law is obeyed by iron (a) at Curie temperature only (b) at all temperatures (c) below Curie temperature (d) above Curie temperature
[RPMT]
38 A paramagnetic liquid is taken in a U-tube and arranged, so that one of its limbs is kept between pole pieces of the magnet. The liquid level in the limb [J&K CET] (a) goes down (b) rises up (c) remains same (d) first goes down and then rises
(a) µ d ≠ 0 and µ f ≠ 0 (c) µ d = 0 and µ p ≠ 0
(b) µ p = 0 and µ f ≠ 0 (d) µ d ≠ 0 and µ p = 0
45 Among the following properties describing diamagnetism identify the property that is wrongly stated. [KCET] (a) Diamagnetic material do not have permanent magnetic moment. (b) Diamagnetism is explained in terms of electromagnetic induction. (c) Diamagnetic materials have a negative susceptibility (d) The magnetic moment of individual electrons. neutralise each other. 46 The examples of diamagnetic, paramagnetic and ferromagnetic materials are respectively [JCECE] (a) copper, aluminium, iron (b) aluminium, copper, iron (c) copper, iron, aluminium (d) aluminium, iron, copper 47 A needle made of bismuth is suspended freely in a magnetic field. The angle which the needle makes with the magnetic field is [JCECE] (a) 0° (b) 45° (c) 90° (d) 180°
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 11 21 31 41
(c) (a) (a) (d) (a)
2 12 22 32 42
(a) (b) (a) (a) (c)
3 13 23 33 43
(c) (c) (a) (d) (a)
4 14 24 34 44
(d) (d) (a) (a) (c)
5 15 25 35 45
(a) (a) (b) (c) (b)
6 16 26 36 46
(b) (b) (b) (b) (a)
7 17 27 37 47
(d) (c) (d) (a) (c)
8 18 28 38
(a) (a) (a) (b)
9 19 29 39
(c) (b) (a) (d)
10 20 30 40
(c) (b) (d) (a)
Explanations 1 (c) Coercivity and retentivity of soft iron is low, because its magnetisation disappears easily on the removal of external magnetising field.
2 (a) When paramagnetic substances are kept in a external magnetic field, then it develops feeble magnetisation in the direction of external applied magnetic field, i.e. magnetic dipoles are aligned along external magnetic field weakly.
3
4
Hence, both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (c) We know that, the magnetism of the magnet is achieved due to the spin motion of electrons. Also, the spinning electrons possess magnetic dipole moment. This dipole moment is much greater than that due to orbital moment of electrons around the nucleus. So, the Assertion is correct but Reason is incorrect. (d) As we know, the relation between the magnetic permeability and susceptibility of material, i.e. …(i) µr = 1 + χm Q For diamagnetic substances, µr < 1 So, according to Eq. (i), the magnetic susceptibility (χ m ) of diamagnetic substance will be negative. While in the case of para and ferromagnetic substances, magnetic susceptibility is positive.
5 (a) We know that, intensity of magnetisation, I = M /V where, M = magnetic moment, V = volume. So, M = IV Given, M = 5 × 104 Am −1, I = 12 cm = 12 × 10−2 m and V = 1cm 2 = 1 × (10−2 )2 = 1 × 10−4 = 5.0 × 104 × 12 × 10−2 × 1 × 10−4 = 60 × 104 × 10−6 = 0.6 A-m 2
6 (b) Given, H = 1500 Am −1, −5
φ B = 2.4 × 10 Wb and A = 0.5 × 10−4 m 2 Magnetic induction, B=
φ B 2.4 ×10−5 = 0.48 Wb m −2 = A 0.5×10−4
Permeability, B 0.48 m= = = 3.2 × 10− 4 TmA −1 H 1500
7 (d) For paramagnetic sample (Curie’s
law) I ∝ B /T Given, I 1 = 0.8 Am −1 and B1 = 0.8 T T1 = 5 K ⇒ B2 = 0.4 T T2 = 20 K , I 2 = ? I 1 B1 /T1 I B × T2 = ⇒ 1= 1 I 2 B2 /T2 I 2 B2 × T1 ⇒ ⇒
0.8 0.8 × 20 = I2 0.4 × 5 0.4 × 5 I2 = = 0.1 Am −1 20
8 (a) Given, χ m = 299 µ 0 = 4 π × 10−7 Hm −1, µ = ? We know that, µ = µ 0 (1 + χ m ) µ = 4 π × 10−7 (1 + 299) 22 =4× × 10−7 × 300 7 26400 = × 10−7 7 = 3771.4 × 10−7 Hm −1 ~ 3771 × 10−7 Hm −1 −
9 (c) As the value of susceptibility is large and positive, so the class of the magnetic material is ferromagnetic.
11 (a) With rise in temperature, the magnetism of magnet falls linearly and at critical temperature, it becomes zero.
12 (b) Given, A = 0.2 cm 2, H = 1200 Am − 1 and χ m = 599 Permeability,µ = µ 0 (1 + χ m )
= 4 π × 10−7 (1 + 599) = 7.536 × 10− 4 TmA− 1
13 (c) Susceptibility, χ=
Intensity of magnetisation , I Magnetic field , B
Given, χ = 3 × 10−4 and
B = 4 × 10−4 Am −1
or
I = χB I = 3 × 10−4 × 4 × 10−4
⇒
= 12 × 10−8 Am −1
14 (d) Paramagnetic materials will be feebly attracted, diamagnetic material will be feebly repelled and ferromagnetic material will be strongly attracted towards a magnet.
15 (a) Resultant force acting on a diamagnetic material in a magnetic field is in direction from stronger to the weaker part of the magnetic field.
16 (b) Intensity of magnetisation, I =
M M = Mass / Density V
Given, mass = 1 g = 10–3 kg and density = 5g cm −3 =
10 (c) From the relation, susceptibility of the material is χ m = I / H ⇒ χ m ∝ I Thus, it obvious that greater the value of susceptibility of a material greater will be the value of intensity of magnetisation, i.e. more easily it can be magnetised. Therefore, Assertion is correct but Reason is incorrect.
5 × 10–3 kg (10–2 )3
= 5 × 103 kg/m 3 Hence, I =
6 × 10– 7 × 5 × 103 10– 3
= 3.0 Am −1
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MAGNETISM AND MATTER
17 (c) A paramagnetic sample displays greater magnetisation when cooled. This is because at lower temperature, the tendency to disrupt the alignment of dipoles (due to magnetising field) decreases on account of reduced random thermal motion. Magnetisation depends upon temperature.
18 (a) Given, m = 8.0 × 1022 A-m 2 Radius of earth, R = 6400 km = 6.4 × 106 m m m Magnetisation, M = = 4 3 V πr 3 22
8.0 × 10 × 3 M = . × (6.4 × 106 )3 4 × 314 M = 72.9Am −1
66 × 10−5 m 3 75 2.5 × 75 m Magnetisation, M = = V 66 × 10−5 =
M = 2.84 × 105 Am −1
20 (b) Given, χ = 599, A = 0.2 cm 2 = 0.2 × 10−4 m 2,
µ = 7.536 × 10−4 TmA−1 −4
× 1200 T
∴ Magnetic flux, φ B = BA = 7.536 × 10−4 × 1200 × 0.2 × 10−4 Wb −5
= 1.81 × 10
Wb
21 (a) We know that, magnetisation, dipole moment I = volume =
8 × 1010 × 9 × 10−24 10−18 5
= 7.2 × 10 Am
intensity of magnetisation of a material is directly proportional to the magnetic intensiy, As … (i) I ∝ H ⇒ I = χH Also, from Curie’s law, 1 χ∝ T C …(ii) χ= ⇒ T where, T = absolute temperature,
26 (b) Ferromagnetic materials used for transformers must have high permeability and low hysteresis loss.
27 (d) As we know that, µ r = 1 + χ m ⇒ 5500 = 1 + χ m (given) ⇒ χ m = 5500 − 1 = 5499
28 (a) Above Curie temperature, a 29 (a) Nickel shows ferromagnetic
As, µ = µ 0 (1 + χ ) or µ = 4 π × 10−7 (1 + 599) B = µH = 7.536 × 10
25 (b) For a paramagnetic substance, the
ferromagnetic material becomes paramagnetic material.
H = 1200 Am −1
or
µ r =1 + χ m Given, µ r = 6000 ⇒ 6000 = 1 + χ m ⇒ χ m = 6000 − 1= 5999
34 (a) Magnetic susceptibility (χ) is inversely proportional to the absolute temperature and is applicable for paramagnetic and ferromagnetic materials but not for diamagnetic material.
35 (c) Diamagnetic substance is repelled by a magnetic field and hence when a diamagnetic substance is placed inside a magnetic field, it is thrown out.
36 (b) From Curie’s law, χ ∝ T −1 χ= χ
−173o C
χ −73o C
(given)
−1
22 (a) The diamagnetic substances are repelled by both the poles of magnet.
23 (a) For ferromagnetic materials when an external magnetic field is applied, the domains are aligned along the direction of magnetic field.
property at room temperature. If the temperature is increased beyond Curie temperature, then it will show a paramagnetism.
30 (d) Magnetic susceptibility for paramagnetic material is positive but small.
31 (d) As iron is ferromagnetic but above Curie temperature, it becomes paramagnetic. The Curie temperature for iron is 1043 K [i.e. 770 o C ]. Hence, above 770 o C, iron becomes paramagnetic.
32 (a) Since in neon atom, all the orbitals are filled with electrons of opposite spin and, so net dipole moment of neon atom is zero. Hence, neon is diamagnetic material.
33 (d) The maximum magnetisation in the specimen = Number of dipoles × dipole moment = 2.0 × 1024 × 1.5 × 10−23 Am 2 (given) = 30 A-m 2
=
C , where C = constant T T−73o C T−173o C
(273 − 73) (273 − 173) 200 = =2 100 =
From Eqs. (i) and (ii), we get I ∝ 1/T . Thus, I decreases in proportional to 1/T.
Mass Density
19 (b) Volume, V =
24 (a) As we know that,
χ
− 173o C
= 2 × (0. 0060)
χ −173o C = 0.0120
37 (a) Hydrogen atom have unpaired electrons in their orbital and have net magnetic moment and hence it is paramagnetic. But in hydrogen molecule orbital is filled with two electrons in opposite spin with net dipole moment as zero. Hence, hydrogen molecule is diamagnetic.
38 (b) When a paramagnetic liquid is taken in U-tube and one arm is placed between the poles of strong magnet, the liquid is feebly attracted by the magnet. Therefore, the level of the solution in the arm rises.
39 (d) Curie-Weiss law is obeyed by iron above Curie temperature.
40 (a) According to Weiss, due to interaction of spin of electrons of one atom with that of neighbouring atoms, a ferromagnetic material gets divided into small regions called domains, each of which is at all times completely magnetised. But the direction of magnetisation varies from domain to domain, so that the resultant magnetisation of the material is zero.
41 (a) The materials for a permanent magnet should have high retentivity (so that the magnet is strong) and high coercivity (so that the magnetism is not wiped out by stray magnetic fields).
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
42 (c) When a diamagnetic substance is placed in a magnetic field, dipole moments are induced in the atom by the applied field but opposite to the direction of applied field. Hence, diamagnetic materials can show magnetism. When external applied magnetic field is removed, these induced magnetic dipole moments vanished. Hence, diamagnetic material have no permanent magnetic dipole moment.
43 (a) The reversed magnetic field needed to demagnetise the specimen is known as coercivity of the material. B = µ 0H ⇒ µ 0ni = µ 0H Ni N =H ⇒ Q n = L L or
i=
HL N
…(i) 3
−1
Given, H = 4 × 10 Am , L = 12 cm
= 12 × 10−2 m and N = 60 turns Substituting the values in Eq. (i), we get i=
3
4 × 10 × 12 × 10 60
−2
=8A
44 (c) In diamagnetic substances, in each pair of electrons, the spin of both the electrons are in opposite directions. Hence, the electrons of each pair completely cancel the magnetic moment of each other. Thus, the net magnetic moment of each atom of such substances is zero, i.e. µ d = 0. The property of paramagnetism is found in those substances whose atoms or molecules have an excess of electrons spinning in same direction. Hence, atoms of paramagnetic substances have permanent magnetic moment, i.e. µ p ≠ 0. The property of ferromagnetism is found in substances which acquire very strong magnetism when placed in an external magnetic field. Like paramagnetic substances
each atom of ferromagnetic substances also has permanent magnetic moment, i.e. µ f ≠ 0.
45 (b) Diamagnetism is explained in term of spin motion. The net magnetic moment is zero in them. Diamagnetic materials have negative susceptibility.
46 (a) Diamagnetic substances when placed in a magnetic field are feebly magnetised in a direction opposite to the magnetising field, e.g. copper. Paramagnetic substances, when placed in a magnetic field get feebly magnetised in a direction of the magnetising field, e.g. aluminium. Ferromagnetic substances when placed in a magnetic field get strongly magnetised in the direction of the magnetising field, e.g. iron.
47 (c) Bismuth is a diamagnetic substance, hence when placed in an external magnetic field, it rotates such that, its axis becomes perpendicular to the magnetic field.
20 Electromagnetic Induction Quick Review The phenomenon of generation of current or emf by changing the magnetic fields is known as Electromagnetic Induction (EMI). The emf developed in the conductor by the process of EMI is known as induced emf and if the conductor is in the form of a closed loop, then the current flowing in the conductor is known as induced current.
Specific Conditions For θ = 0° S
For θ = 90°
For θ = 180°
S
S
B
B B
Magnetic Flux • The total number of magnetic field lines of
force crossing through any surface normally when it is placed in a magnetic field is known as the magnetic flux of that surface. Magnetic flux through loop, φ B = ∫ B . dS
θ
B is perpendicular to surface vector, i.e. S ⇒ φB = BS cos90° =0
B is anti-parallel to surface vector, i.e. S. ⇒ φB = BS cos 180° = BS (−1) = − BS
Faraday’s Laws of Electromagnetic Induction There are two laws of Faraday which are given below
B dS
B is parallel to surface vector, i.e. S. ⇒ φB = BS cos0° = BS ⇒ φB = maximum
∧ n
Faraday’s First Law Whenever the amount of magnetic flux linked with a circuit changes, an emf is induced in the circuit. Faraday’s Second Law
• When the magnetic field is perpendicular to the
plane of the loop, then magnetic flux will be φ B = BS = maximum value • When the magnetic field B is inclined at an angle θ, w.r.t. the normal to the surface, then the magnetic flux becomes φ B = B ⋅ S = | B | | S |cos θ = BS cos θ where, θ is smaller angle between B and S.
The magnitude of the induced emf in a circuit is equal to the rate of change of magnetic flux through the circuit. Mathematically, Faraday’s second law can be expressed as − dφ B e= dt φ − φ1 ] [QRate of change of magnetic flux = 2 t In the case of a closely wound coil of N turns, the change of flux associated with each turn is the same.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Therefore, the expression for the total induced emf is given by dφ B e= −N dt
Induced Current in a Circuit • If R is the electrical resistance of the circuit, then induced
current in the circuit is given by e 1 dφ I = = − B R R dt Electric charge flown due to induced current, 1 q = I dt = − dφ B R • If induced current is produced in a coil rotated in a uniform magnetic field, then NBA ω sin ωt = I 0 sin ωt I= R NBA ω where, I 0 = = peak value of induced current. R
Lenz’s Law and Conservation of Energy Lenz’s law states that, the direction of any magnetic induction effect is such as to oppose the cause of effect. This law is based upon law of conservation of energy.
Direction of Induced Current with the help of Lenz’s Law Direction of induced current can be determined by checking whether the flux through a conducting loop or circuit is increasing or decreasing. • If flux is decreasing, the magnetic field due to induced current will be along the existing magnetic field. • If flux is increasing, the magnetic field due to induced current will be opposite to existing magnetic field.
Motional Electromotive Force Due to motion of conductor in magnetic field, a potential difference is maintained between the ends of the conductor as long as the conductor continues to move through the uniform magnetic field. This potential difference is called motional electromagnetic force, which is denoted by e and is given by e = Bvl ×
×
×
P
×
×
×
Q ×
v
×
×z
If R is the resistance of the circuit, then current will be written as e Bvl i= = R R
General Form of Motional emf To find motional emf for a conductor of any shape moving in a uniform or non-uniform magnetic field, we will consider any small element d l of a conductor, then the contribution de to the emf is the magnitude of d l multiplied by the component of ( v × B ) which is parallel to d l, i.e. de = ( v × B ) ⋅ d l e = ∫ (v × B )⋅ d l
⇒
Some important points are related to emf are given below • When a conducting rod of length l is moving with a uniform magnetic field B, then an induced emf is set up. The magnitude of induced emf will be e = Blv. • If the rod is moving making an angle θ with the direction of magnetic field, then e = Blvsin θ For motion parallel to B, i.e. v || B. P(+)
×
×
×
×
× ×
× ×
× ×
× ×
×
×
×
×
×
×
×
×
×
×
×
×
×
×
×
× ×
⇒v
R
Q(–)
l
×
• If a conducting rod moves on two parallel conducting
rails, then again an emf is induced whose magnitude is given by [since v ⊥ B] e = Blv
• The direction of induced current is given by Fleming’s
right hand rule. • The induced current in the loop is given by I=
e
=
Blv R
R where, R = resistance in loop. • Due to presence of current and magnetic field , arm PQ experiences a magnetic force is given by B 2l2v R • The force given above is directed opposite to the velocity of the rod and hence power required to maintain constant speed v, i.e. B 2l2v2 P = Fv = R F = BIl =
597
ELECTROMAGNETIC INDUCTION
• An emf is induced between the ends of rod when a
conducting rod of length l rotates about an axis passing through one of its ends (that end may be fixed) with an angular velocity ω in a plane perpendicular to the magnetic field B and is given by e =
1 2 Bl ω 2
Fleming’s Right Hand Thumb Rule to Find the Direction of Induced Current The direction of motional emf or current can be given by Fleming’s right hand thumb rule. If we stretch the thumb, the forefinger and the central finger of right hand in such a way that all are mutually perpendicular to each other and if thumb represents the direction of motion of the conductor and the forefinger represents the direction of magnetic field, then central finger will represent the direction of induced current as shown in figure. Motion of conductor
Thumb
Forefinger
C fin entr ge al r
Direction of magnetic field
Direction of induced current
Inductance Inductance is a scalar quantity which plays same role in an electrical circuit as played by inertia in mechanics. It depends only on the geometry of the coil and intrinsic material properties. It is the ratio of flux linkage to the current. Nφ NBA φtotal = = L= I I I The SI unit of L is henry (H).
Self-Inductance • Self-inductance is the property of a coil by virtue of which
the coil opposes any change in the strength of current flowing through it by inducing an emf in itself called back emf. • Induced emf due to self-induction is given by dφ dI = −L e = −N dt dt where, L = coefficient of self-induction. Nφ and given by L = . i
• When two coils of coefficient of self-inductions L 1 and
L 2 are connected as below (i) In series , then Leq = L1 + L2 (ii) In parallel , then L L Leq = 1 2 L1 + L2
• For a solenoid coil having length l, total number of turns
N and cross-sectional area A, then value of L is µ N 2A L= 0 = µ 0 n 2 Al l where, n = N/ l
Energy Stored in an Inductor • The energy of a capacitor is stored in the electric field
between its plates. Similarly, an inductor has the capability of storing energy in its magnetic field. The total energy U is supplied while the current increases from zero to a final value I is i 1 U = L∫ IdI = LI 2 0 2
∴
W =U =
1 2 LI 2
Thus, if I = 1 A, then 2W = L. Hence, the coefficient of self-inductance is equal to twice the work done in establishing a flow of one ampere current in the circuit. • Energy stored per unit volume in magnetic field is known as energy density. U 1 B2 Energy density = = ∴ V 2µ0
Mutual Inductance The phenomenon according to which an opposing emf is produced in a coil as a result of change in current or magnetic flux linked with a neighbouring coil is called mutual induction. Induced emf due to mutual inductance, dφ B2 dI In secondary coil, e 2 = − N 2 = −M 1 dt dt Also, N 2 φ 2 = MI 1 Its SI unit is henry (H). • If two coils of self-inductances L1 and L2 having mutual inductance M are (i) In series combination, then LS = L1 + L2 ± 2M L L −M2 (ii) In parallel combination, then L p = 1 2 L1 + L2 ± 2M
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
• For a pair of two magnetically coupled coils of
self-inductances L1 and L2 respectively, the mutual inductance is given by M 12 = M 21 = M = k L1 L2
where, k = coefficient of coupling and is given as magnetic flux linked in secondary coil k= magnetic flux linked in primary coil • Value of M for different shapes of coils as given below
Applications of Eddy Currents Eddy currents can be used in many ways as given below (i) In electric brakes in trains. (ii) In induction furnace. (iii) In speedometer of automobiles. (iv) In energy meter and dead-beat galvanometer.
DC Motor
(i) If coupling coefficient k = 1and medium is a free space or air, value of M for a pair of concentric circular coils is µ N N πr 2 M= 0 1 2 2R where, r = radius of the coil (of small radius) and R = radius of the coil (of larger radius). (ii) If a pair of two solenoid coils, wound one over the other, then
• It is an electric machine which converts electrical energy
µ 0N1N 2 A l (iii) If there is a pair of concentric co-planar square coils, then 2 2µ 0N1N 2a2 M= πb where, a = side of the smaller coil and b = side of the larger coil.
• Efficiency of motor is given by
M=
Eddy Currents • The currents induced in bulk pieces of conductors when
the magnetic flux linked with the conductor changes are known as eddy currents. • Eddy currents are always produced in a plane which is perpendicular to the direction of magnetic field. Eddy current shows both heating and magnetic effects. • The magnitude of eddy current is e dφ / dt i= = R R
into mechanical energy. • It is based on the principle that when a current carrying
coil is placed in a magnetic field, it experiences a torque, which rotates it. • Due to rotation of armature coil in the magnetic field, a back emf is induced in the circuit and it is given by e = E − iR where, E = supplied voltage. η=
Pout e = Pin E
AC Generator or Dynamo • It is an electrical machine which is used to convert
mechanical energy into electrical energy. • It is based on the principle of electromagnetic induction and the emf induced is given by dφ = − NBAω sin ωt e= −N dt = e 0 sin ωt where, e 0 = NBAω. • The current induced in the circuit is given by
i′ =
e e0 = sin ωt R R
= i 0 sin ωt
Topical Practice Questions All the exam questions of this chapter have been divided into 4 topics as listed below Topic 1
—
MAGNETIC FLUX AND FARADAY’S & LENZ’S LAWS
599–604
Topic 2
—
MOTIONAL EMF
604–606
Topic 3
—
INDUCTANCE (SELF AND MUTUAL INDUCTANCE)
606–609
Topic 4
—
APPLICATIONS OF EMI (MOTOR AND DYNAMO)
610–611
Topic 1 Magnetic Flux and Faraday’s & Lenz’s Laws 2019 1 A coil of 800 turns effective area 0.05 m 2 is kept
perpendicular to a magnetic field 5 × 10−5 T. When the plane of the coil is rotated by 90º around any of its co-planar axis in 0.1 s, the emf induced in the coil will be [NEET]
(b) 2 × 10−3 V (d) 2 V
(a) 0.2 V (c) 0.02 V
2 Lenz law is based on principle of conservation of [JIPMER] (a) linear momentum (b) energy (c) charge (d) mass
2012 6 A coil of resistance 400 Ω is placed in a magnetic field. If the magnetic flux φ (Wb) linked with the coil varies with time t (s ) as φ = 50t 2 + 4. Current at 2 s is [CBSE AIPMT] (a) 0.5 A (b) 0.1 A (c) 2 A (d) 1 A
7 In a coil of resistance 10 Ω, the induced current developed by changing magnetic flux through it, is shown in figure as a function of time. The magnitude of change in flux through the coil (in weber) is [CBSE AIPMT] i(A)
2018 3 A system S consists of two coils A and B. The coil A
4
carries a steady current I. While the coil B is suspended nearby as shown in figure. Now, if the system is heated, so as to raise the temperature of two coils steadily, then [AIIMS] A
(a) 8
(b) 2
i
0
T/4
2014 4 The current flows from A to B as shown in the figure. What is the direction of current in circle?
T/2
3T/4
[UK PMT]
emf 0
T T/4
T/2 3T/ 4
T/4
T/2 3T/ 4 T
t
B emf
(b) Anti-clockwise (d) None of these
2013 5 A wire loop is rotated in a magnetic field. The frequency [NEET]
T
t
[AIIMS]
(a)
of change of direction of the induced emf is (a) once per revolution (b) twice per revolution (c) four times per revolution (d) six times per revolution
(d) 4
9 The current i in a coil varies with time as shown in the figure. The variation of induced emf with time would be
(a) the two coils shows attraction (b) the two coils shows repulsion (c) there is no change in the position of the two coils (d) induced current are not possible in coil B
(a) Clockwise (c) Straight line
(c) 6
8 The magnetic flux linked with a coil satisfies the relation φ = (4t 2 + 6t + 9 ) Wb, where t is time in second. The emf induced in the coil at t = 2 s is [CBSE AIPMT] (a) 22 V (b) 18 V (c) 16 V (d) 40 V
B
A
t(s)
0.1
0
(b)
0
(c)
emf 0
(d)
emf 0
T/2 3T/ 4 T T/4
T
T/4 T/2 3T/ 4
t
t
t
600
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2008 10 A circular disc of radius 0.2 m is placed in a uniform
magnetic field of induction (1/ π)Wbm − 2 in such a way that its axis makes an angle of 60° with B. The magnetic flux linked with the disc is [CBSE AIPMT] (a) 0.02 Wb (b) 0.06 Wb (c) 0.08 Wb (d) 0.01 Wb
11 When a low flying aircraft passes overhead, we sometimes notice a slight shaking of the picture on our TV screen. This is due to [AFMC] (a) diffraction of the signal received from the antenna (b) interference of the direct signal received by the antenna with the weak signal reflected by the passing aircraft (c) change of magnetic flux occurring due to the passage of aircraft (d) vibration created by the passage of aircraft 12 According to Lenz’s law of electromagnetic induction, [J&K CET]
(a) the induced emf is not in the direction opposing the change in magnetic flux (b) the relative motion between the coil and magnet produces the change in magnetic flux (c) only the magnet should be moved towards coil (d) only the coil should be moved towards magnet
13 The North-pole of a bar magnet is moved towards a coil along the axis passing through the centre of the coil and perpendicular to the plane of the coil. The direction of the induced current in the coil when viewed in the direction of the motion of the magnet is [EAMCET] (a) clockwise (b) anti-clockwise (c) no current in the coil (d) Either clockwise or anti-clockwise 14 Two similar circular loops carry equal currents in the same direction. On moving coils further apart, the electric current will [KCET] (a) increase in both (b) decrease in both (c) remain unaltered (d) increase in one and decrease in the second 15 A conducting ring of radius r is placed perpendicularly inside a time varying magnetic field given by B = B 0 + αt, as shown in the figure. B 0 and α are positive constants. Find the emf produced in the ring. [Guj CET]
2007 16 The magnetic flux through a circuit of resistance R
changes by an amount ∆φ in a time ∆t. Then, the total quantity of electric charge Q that passes any point in the circuit during the time ∆t is represented by [Manipal] ∆φ 1 ∆φ (a) Q = ⋅ (b) Q = R ∆t R ∆φ ∆φ (d) Q = R ⋅ (c) Q = ∆t ∆t
17 Whenever a magnet is moved either towards or away from a conducting coil, an emf is induced, the magnitude of which is independent of [Kerala CEE] (a) the strength of the magnetic field (b) the speed with which the magnet is moved (c) the number of turns of the coil (d) the resistance of the coil (e) the area of cross-section of the coil 18 A circular coil of diameter 21 cm is placed in a magnetic field of induction 10−4 T. The magnitude of flux linked with coil when the plane of coil makes an angle 30° with the field is [J&K CET] (a) 1.44 × 10−6 Wb (b) 1. 732 × 10−6 Wb (c) 3.1 × 10−6 Wb (d) 4.2 × 10−6 Wb
2006 19 A metallic ring is dropped down, keeping its plane perpendicular to a constant and horizontal magnetic field. The ring enters the region of magnetic field at t = 0 and completely emerges out at t = T s, the current in the ring varies as [AIIMS] I
(a) 0
(b)
S r
(a) − π α r 2 (c) −π α 2 r 2
(d) (b) − π α r (d) − π α 2 r
t
T
t
T
t
T
I 0
N
T
I
0
(c)
t
I
0
601
ELECTROMAGNETIC INDUCTION
20 The North-pole of a long horizontal bar magnet is being brought closer to a vertical conducting plane along the perpendicular direction. The direction of the induced current in the conducting plane will be [AFMC] (a) horizontal (b) vertical (c) clockwise (d) anti-clockwise 21 Induced emf in the coil depends upon (a) conductivity of coil (b) amount of flux (c) rate of change of linked flux (d) resistance of coil
2005 27 As a result of change in the magnetic flux linked to the closed loop shown in the figure, an emf V volt is induced in the loop. The work done (in joule) in taking a charge Q coulomb once along the loop is
[UP CPMT]
[CBSE AIPMT]
22 A bar magnet is dropped between a current carrying coil. What would be its acceleration? (a) g downwards [RPMT] (b) Greater than g downwards (c) Less than g downwards (d) Bar will be stationary
(a) QV
(b) zero
(c) 2QV
(d) QV / 2
28 A magnet is made to oscillate with a particular frequency, passing through a coil as shown in figure. The time variation of the magnitude of emf generated across the coil during one cycle is S N
23 A coil having 500 turns of square shape, each of side 10 cm is placed normal to a magnetic field which is increasing at 1 Ts −1 . The induced emf is [J&K CET] (a) 0.1 V (b) 0.5 V (c) 1 V (d) 5 V 24 A coil of 1200 turns and mean area of 500 cm 2 is held perpendicular to a uniform magnetic field of induction 4 × 10−4 . The resistance of the coil is 20 Ω. When the coil is rotated through 180° in the magnetic field in 0.1 s, the average electric current (in mA) induced is [EAMCET] (a) 12 (b) 24 (c) 36 (d) 48
[AIIMS]
V
(a)
emf t
(b)
emf t
25 There is a uniform magnetic field directed perpendicular and into the plane of the paper. An irregular shaped conducting loop is slowly changing into a circular loop in the plane of the paper. Then, [MHT CET] (a) current is induced in the loop in the anti-clockwise direction (b) current is induced in the loop in the clockwise direction (c) AC is induced in the loop (d) No current is induced in the loop
29 The flux associated with coil changes from 1.35 Wb to 0.79 Wb within (1/ 10) s. Then, the charge produced by the earth coil, if resistance of coil is 7 Ω is [MHT CET] (a) 0.08 C (b) 0.8 C (c) 0.008 C (d) 8 C
26 In a closed circuit of resistance 10 Ω, the change of flux φ with respect to time t is given by the equation φ = 2t 2 − 5t + 1, the current at t = 0.25 s will be [Guj CET] (a) 4 A (b) 0.04 A (c) 0.4 A (d) 1 A
30 The Lenz’s law gives (a) direction of induced current (b) magnitude of induced emf (c) magnitude of induced current (d) magnitude and direction of induced current
(c)
emf t
(d)
emf t
[AMU]
Answers
v
1 (c)
2 (b)
3 (a)
4 (d)
5 (b)
6 (a)
7 (b)
8 (a)
9 (d)
10 (a)
11 (c)
12 (b)
13 (b)
14 (a)
15 (a)
16 (b)
17 (d)
18 (b)
19 (b)
20 (d)
21 (c)
22 (c)
23 (d)
24 (b)
25 (a)
26 (c)
27 (a)
28 (a)
29 (a)
30 (a)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (c) Given, area of coil, A = 0.05 m 2, −5
magnetic field, B = 5 × 10 T
dφ dt t Given, φ = 50t 2 + 4 and R = 400 Ω
6 (a) Induced emf of coil, E = −
and number of turns, N = 800 . The magnetic flux linked with the coil, φ = N (B ⋅ A ) = N BA cosθ … (i) where, θ is the angle between B and A. The emf induced when the coil is rotated from θ 1 = 0° to θ 2 = 90°, ∆φ ∆ e=− =− (NBA cosθ ) ∆t ∆t [using Eq. (i)] NBA … (ii) =− (cosθ 2 − cosθ 1 ) ∆t Here, ∆t = 01 . s Thus, substituting the given values in Eq. (ii), we get 800 × 5 × 10−5 × 0.05 × (cos 90° − cos 0° ) e=− 01 . = 2000 × 10−5 = 0.02 V
dφ E= − dt
Current in the coil, E 200 1 i= = = = 0.5 A R 400 2 I =
Change in flux = Area of triangle × R 1 = × 4 × 0.1 × 10 2 2
8 (a) Given, φ = (4 t + 6t + 9) Wb and t=2s
constant because current through straight wire is constant. Magnetic flux through circle is not changing with time. ⇒
dφ B =0 dt
dφ B =0 dt E 0 i= = =0 ⇒ R R Hence, no current is flowing in circle. ⇒
|E | =
5 (b) A wire loop is rotated in a magnetic field. The frequency of change of direction of the induced emf is twice per revolution. In one half, magnetic flux is decreasing and in other half it is increasing.
dφ dt
dφ = 8t + 6 dt dφ =8×2+ 6 dt t = 2
Here, ⇒
3 (a) Coil A carries a steady current 9
electromagnetic induction, the relative motion between the coil and magnet produces the change in magnetic flux. is brought towards one end of the coil, the induced current flows in the coil in such a direction that the end of the coil near the magnet becomes a North-pole, which repels the magnet and opposes the motion of the North-pole of the magnet towards the coil, thus direction of induced current is anti-clockwise. S
Induced emf in the coil = 22 V di (d) Induced emf, e = − L dt T di During 0 to , = constant and 4 dt positive, so e = negative. T T di For to , = 0, so e = 0. 4 2 dt 3T di For T /2 to , = constant and 4 dt negative, so e = positive. This condition is satisfied only by graph in option (d).
10 (a) The magnetic flux φ passing through a plane surface of area A placed in a uniform magnetic field B is given by …(i) φ = BA cosθ where,θ is the angle between the direction of B and the normal to the plane A.
B 60° A
12 (b) According to Lenz’s law of
13 (b) When the North-pole of the magnet
= 2 Wb
of conservation of energy.
4 (d) As magnetic field through circle is
overhead, then it causes a change in magnetic flux and thus causes a disturbance in picture on our TV.
1 dφ ⇒ | dφ | = | IR dt | R dt
We know that, ε =
Putting the values in Eq. (i), we get 1 ∴ φ = × π (0.2)2 × cos 60° π 1 = (0.2)2 × = 0.02 Wb 2
11 (c) When a low flying aircraft is passing
7 (b) Given, R = 10Ω
2 (b) Lenz law is based on the principle with increase in temperature, its resistance increases and so current is decreasing at a constant rate, this induces an emf in B which opposes this change, i.e. current in coil B is in same direction of A, therefore they attract to each other.
⇒ = |100 t |t = 2 = 200 V
t=2
Given, θ = 60°, B = (1 / π ) Wbm −2, A = π (0.2)2
N V N
S
G
14 (a) On moving the coils further apart initially, the flux linked will be reduced. Then, according to Lenz’s law current will increase in both the coils to increase the linked flux.
15 (a) Given, the magnetic field vary with time as …(i) B = B0 + αt Here, B0 and α are positive constants. We know that, the induced emf, dφ …(ii) e=− dt and the magnetic flux is given as φ = BA cosθ where, θ is the angle between the magnetic field Band area vector of ring A. So, θ = 0° ⇒ φ = BA cos 0° = BA …(iii) From Eqs. (ii) and (iii), we get d e = − ( BA ) dt
603
ELECTROMAGNETIC INDUCTION
On putting the value of B from Eq. (i), we get d e = − [( B0 + αt ) A ] dt d = − A [ B0 + αt ] dt = − A[ 0 + α ] = − Aα But A = πr2 is the area of ring, where r is the radius of ring. So,
e = − πr2α
⇒
e = − παr2
16 (b) From Faraday's second law, emf induced in the circuit | e | = ∆φ / ∆t If R is the resistance of the circuit, then e ∆φ i= = R R∆t Thus, charge passes through the circuit and is given by ⇒
Q = i × ∆t ∆φ ∆φ Q= × ∆t = R∆t R
17 (d) Whenever there is relative motion between a magnet and a conducting coil, an emf is induced in the coil, e = – N (dφ / dt ), where, φ = BA cosθ, N = number of turns in coil. Hence, emf induced does not depend on resistance of coil.
18 (b) Given, diameter,
d = 21 cm = 21 × 10− 2 m
21 Radius, r = × 10− 2 m 2 Angle between axis of coil and magnetic field, θ = 90°−30° = 60° Magnetic field induction, B = 10− 4 T We know that, magnetic flux, φ = BA cos θ = 10− 4 × πr2 × cos 60° 22 21 21 × × × 10− 2 × 10− 2 7 2 2 × cos 60° 22 21 21 1 −8 = 10 × × × × 7 2 2 2 11 × 3 × 21 = 10− 8 × 2×2 −6 = 1.732 × 10 Wb = 10− 4 ×
19 (b) During free fall, when the ring enters the horizontal field with its plane perpendicular to it, emf is induced in it due to change in magnetic flux. Due to this emf, a current flows in the ring in such a direction that it opposes the change in flux. When the ring is completely in the magnetic field, there is no change in flux linked with it and thus there is no flow of current in the ring. Now, when the ring leaves the magnetic field, again the flux changes and thus emf is induced. Due the this emf, the current again flows across it, but in the opposite direction as shown below I
t
20 (d) The induced emf will oppose the motion of the magnet. Applying Lenz’s law, the direction of induced current will be anti-clockwise.
21 (c) According to Faraday’s law, the induced emf in a closed loop equals the time rate of change of magnetic flux through the loop. i.e. e = − (dφ B / dt ) Hence, induced emf in a coil depends on the rate of change of flux.
22 (c) When a bar magnet is dropped between current carrying coils, then due to change in magnetic flux, induced current will be produced such that it opposes the motion of magnet. So, acceleration of magnet will be less than g in downward direction.
23 (d) The magnetic flux through area A placed in magnetic field B, φ = BA cosθ Given, θ = 0°, N = 500 and φ = BA. Now, rate of change of magnetic field dB per second = = 1 Ts−1 dt A = (10)2 cm 2 = 10−2 m 2 ⇒ ⇒
d φ d ( BA ) dB = = ⋅A dt dt dt dφ = 1 × 10−2 dt
By Faraday’s law, induced emf dφ e=−N dt = − 500 × 10−2 = − 5 V ⇒
| e| = 5V
24 (b) In perpendicular position in a uniform magnetic field, magnetic flux linked with the each turn of coil, φ 1 = BA On rotating coil through 180°, flux linked, φ 2 = − BA ∴ Change in magnetic flux, ∆φ = φ 2 − φ 1 = − 2BA So, emf induced in the coil, ∆φ 2NBA e=−N = ∆t ∆t where, N is the number of turns in the coil. Given, N = 1200, A = 500 cm 2 = 500 × 10−4 m 2, B = 4 × 10−4 T, R = 20Ω and ∆t = 01 . s. The current in the coil is given by e 2NBA i= = R R∆t =
2 × 1200 × 4 × 10−4 × 500 × 10−4 20 × 0 .1
= 24 × 10−3 A = 24 mA
25 (a) Due to change in the shape of the loop, the magnetic flux linked with the loop increases. Hence, current is induced in the loop in such a direction that it opposes the increases in flux. Therefore, induced current flows in the anti-clockwise direction. × × × × × × × × ×
× × × × × × × × ×
× × × × × × × × ×
× × × × × × × × ×
× × × × × × × × ×
× × × × × × × × ×
× × × × × × × × ×
× × × × × × × × ×
× × × × × × × × ×
× × × × × × × × ×
26 (c) Given, φ = (2 t 2 − 5t + 1), R = 10Ω and t = 0. 25 s Induced emf, dφ d e=− = − (2 t 2 − 5t + 1) dt dt = − (4 t − 5) e (4 t − 5) ∴ Current, i = = − R 10 At t = 0.25 s (4 × 0.25 − 5) (− 4 ) i=− =− = 0.4 A 10 10
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
27 (a) Induced emf Work done in moving charge Charge W i.e. V = ⇒ W = VQ Q =
28 (a) When North-pole of magnet approaches the one face of coil, then the face of the coil becomes a North-pole to oppose this motion and hence current flows anti-clockwise.
29
Thus, in this case emf is developed in the coil and when it completes one half motion it is momentarily at rest and no emf is present.
While magnet is moving to the other side, South-pole approaches the other face of coil making this face a South-pole. The current now flows in clockwise direction and again an emf is developed in the coil.This variation is shown in Fig. (a). e dφ (a) As, I = = R Rdt dφ dφ or Qe = Idt = dt R Integrating both sides, we get dφ φ ∫ Idt = ∫ R or q = R
Nφ R Given, φ 1 = 135 . Wb, φ 2 = 0.79 Wb, ∆φ = φ 2 − φ 1 = (135 . − 0.79) Wb and R = 7Ω. If coil contains N turns, then q =
If there is flux change of ∆φ, then N∆φ 1 q= = × (1.35 − 0.79) = 0.08 C R 7
30 (d) Lenz’s law governs the direction of induced current in electromagnetic induction. Lenz’s law states that, the direction of induced current must be in such a way that it opposes the reason because of which it is produced.
Topic 2 Motional EMF 2015 1 A conducting square frame of side a and a long straight wire carrying current I are located in the same plane as shown in the figure. The frame moves to the right with a constant velocity v. The induced emf the frame will be proportional to x v
(a)
1 x
(c)
[CBSE AIPMT]
(b)
2
1 ( 2x + a ) 2
1
( 2x − a ) 2 1 (d) ( 2x − a ) ( 2x + a )
2014 2 A very small circular loop of radius a is initially (at t = 0 ) co-planar and concentric with a much larger fixed circular loop of radius b. A constant current I flows in the larger loop. The smaller loop is rotated with a constant angular speed ω about the common diameter. The emf induced in the smaller loop as a function of time t is [WB JEE] πa 2 µ 0 I (a) ω cos ωt 2b πa 2 µ 0 I (c) ω sin ωt 2b
[UK PMT]
(a) 5.04 V (c) 2.52 V
(b) 1.26 V (d) 25.2 V
2007 4 A wire of length 50 cm moves with a velocity of
I
a
3 A straight conductor of length 0.4 m is moved with a speed of 7 ms −1 perpendicular to a magnetic field of intensity 0.9 Wbm − 2 . The induced emf across the conductor is
πa 2 µ 0 I (b) ω sin ω 2 t 2 2b πa 2 µ 0 I (d) ω sin 2 ωt 2b
300 m min −1 , perpendicular to a magnetic field. If the emf induced in the wire is 2 V, then the magnitude of the field (in tesla) is [Kerala CEE] (a) 2 (b) 5 (c) 0.4 (d) 2.5 (e) 0.8
2005 5 A copper rod of length l is rotated about one end, perpendicular to the uniform magnetic field B with constant angular velocity ω . The induced emf between two ends of the rod is [MHT CET] 1 2 2 (b) Bωl (a) Bωl 2 3 (c) Bωl 2 (d) 2Bωl 2 2
6 An aeroplane having a wing space of 35 m flies due North with the speed of 90 ms −1 . The induced emf between the tips of the wings will be (take, B = 4 × 10−5 T) [RPMT] (a) 0.013 V (b) 1.26 V (c) 12.6 V (d) 0.126 V
605
ELECTROMAGNETIC INDUCTION
Reason When the magnetic flux linked with a conducting wire loop changes with time an emf is not induced in the cable. [EAMCET] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
7 A straight conductor of length 4 m moves at a speed of 10 ms −1 . When the conductor makes an angle of 30° with the direction of magnetic field of induction of 0.1 Wb m −2 , then induced emf is [RPMT] (a) 8 V (b) 4 V (c) 1 V (d) 2 V 8 Assertion When a conducting wire loop which is inside a uniform magnetic field directed perpendicular to its plane, is moving with uniform velocity, an emf is induced in it.
Answers 1 (d)
2 (c)
3 (c)
4 (e)
5 (a)
6 (d)
7 (d)
8 (d)
Explanations 1 (d) P I
2 (c) We know that, e = NBA ω sin ωt
x S
x
v
B Q
R a
Potential difference (induced emf) across PQ, VP − VQ = B1av µ 0I av = a 2π x − 2 Potential difference (induced emf) across side RS of frame is VS − VR = B2av µ 0I av = a 2π x + 2 Hence, the net potential difference (induced emf) in the loop will be Vnet = (VP − VQ ) − (VS − VR ) µ 0Iav 1 1 = − a a 2π x − x + 2 2 µ 0Iav a = a a 2π x − x + 2 2 1 Thus, Vnet ∝ (2x − a)(2x + a)
where, N = number of loops = 1, µ I B = 0 N/A-m 2b and A = πa2 m 2. Putting the values in Eq. (i), we get µ I ∴ Induced emf, e = 0 (πa2 ) ω sin ωt 2b πa2µ 0I ⋅ ω sin ωt 2b
=
3 (c) Consider the diagram, where a conductor AB of length l is moving perpendicular to an inward magnetic field B. A+ x x x
x x x
x x
x x
x x
x x
x
x
x
x
x x x
l
v
x x x x
B
4 (e) When a wire of length l moves with a velocity v perpendicular to a magnetic field B, an induced emf is produced in the wire given by e = Blv Given, l = 50 cm = 0.5m ⇒ v = 300 m min −1 300 = 5 ms−1 60 and e = 2V Magnetic field, e 2 B= = = 0.8 T lv 0.5 × 5 =
5 (a) To calculate the emf, we can imagine a closed loop by connecting the centre with any point on the circumference, say P with a resistor. Potential difference across the resistor is then equal to the induced emf. It arises due to separation of charges. R
–B
Value of induced emf, | eind | = | l ( v × B)| = lvB sinθ = lvB sin 90° [Q v ⊥ B ] …(i) eind = vBl −1 Given, v = 7 ms , l = 0.4 m and
B = 0.9 Wbm −2
Now, putting the values in Eq. (i), we get eind = 7 × 0.9 × 0.4 = 7 (0.9) (0.4 ) V = 2.52 V
O
θ l
P
e = B × (rate of change of area of loop) If θ is the angle between the rod and the radius of circle at P at time t, the area of the arc formed by the rod and radius is 1 Area (OPR ) = l 2θ 2
606
6
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
where, l is radius of the circle. d 1 ∴ e = B × l 2θ dt 2 1 dθ 1 2 ⇒ = B ⋅ l2 = Bl ω 2 2 dt (Q ω = dθ/ dt) (d) Given, B = 4 × 105 T, l = 35 m and v = 90 ms −1 The induced emf is given by e = Bvl = 4 × 10−5 × 90 × 35
7 (d) Given, l = 4 m, −1
v = 10 ms , θ = 30° B = 01 . Wbm −2. Induced emf is given by e = Bvl sinθ = 0.1 × 10 × 4 sin 30° ⇒ e = 2V and
8 (d) Suppose, a conducting square loop
= 0.126 V
is placed in xy-plane and magnetic field is perpendicular to the xy-plane, i.e. plane of loop. If loop is provided with a uniform velocity the flux
through the loop does not change and hence no EMF is induced in the loop. Y
X
X
X
X
X
X
X
X
X
X
X
X
X
X
X
B v
X
Also, if there is any change in flux through loop. EMF is induced for the loop. Both Assertion and Reason are incorrect.
Topic 3 Inductance (Self and Mutual Inductance) 2018 1 The magnetic potential energy stored in a certain inductor is 25 mJ, when the current in the inductor is 60 mA. This inductor is of inductance [NEET] (a) 1.389 H (b) 138.88 H (c) 0.138 H (d) 13.89 H
2016 2 A long solenoid has 1000 turns. When a current of 4A flows through it, the magnetic flux linked with each turn of the solenoid is 4 × 10−3 Wb. The self-inductance of the solenoid is [NEET] (a) 3 H (b) 2 H (c) 1 H (d) 4 H
2013 3 The current in a self-inductance L = 40 mH is to be increased uniformly from 1 A to 11 A in 4 ms. The induced emf in the inductor during the process is [Manipal] (a) 100 V (b) 0.4 V (c) 40 V (d) 440 V
4 The inductance of a coil is proportional to (a) its length (b) the number of turns (c) the resistance of coil (d) the square of the number of turns
[WB JEE]
2011 5 Two solenoids of equal number of turns have their lengths and the radii in the same ratio 1 : 2. The ratio of their self-inductances will be [Kerala CEE] (a) 1 : 2 (b) 2 : 1 (c) 1 : 1 (d) 1 : 4 (e) 1 : 3
6 What is the self-inductance of solenoid of length 31.4 cm, area of cross-section 10−3 m 2 and total number of turns [J&K CET] 103 ? (a) 4 mH (b) 4 H (c) 40 H (d) 0.4 H 7 What should be the value of self-inductance of an inductor that should be connected to 220 V, 50 Hz supply, so that a maximum current of 0.9 A flows through it? [J&K CET] (a) 11 H (b) 2 H (c) 1.1 H (d) 5 H 8 Two identical induction coils each of inductance L joined in series are placed very close to each other such that the winding direction of one is exactly opposite to that of the other. What is the inductance? (a) L2 (b) 2L (c) L / 2 (d) Zero
2008 9 Two coils are placed close to each other. The mutual inductance of the pair of coils depends upon [RPMT] (a) the rates at which currents are changing in the two coils (b) relative position and orientation of the two coils (c) the materials of the wires of the coils (d) the currents in the two coils
10 When the current changes from +2 A to − 2 A in 0.05 s, an emf of 8V is induced in a coil. The coefficient of self-induction of the coil is [RPMT] (a) 0.2 H (b) 0.4 H (c) 0.8 H (d) 0.1 H
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ELECTROMAGNETIC INDUCTION
11 According to phenomenon of mutual inductance, [J&K CET] (a) the mutual inductance does not depend on the geometry of the two coils involved (b) the mutual inductance depends on the intrinsic magnetic property, like relative permeability of the material (c) the mutual inductance is independent of the magnetic property of the material (d) ratio of magnetic flux produced by the coil 1 at the place of the coil 2 and the current in the coil 2 will be different from that of the ratio defined by interchanging the coils 12 X and Y, two metallic coils are arranged in such a way that, when steady change in current flowing in X coil is 4 A , change in magnetic flux associated with coil Y is 0.4 Wb. Mutual inductance of the system of these coils is [Guj CET] (a) 0.2 H (b) 5 H (c) 0.8 H (d) 0.1 H 13 The induced emf in a secondary coil is 20000 V, when the current breaks in the primary coil. The mutual inductance is 5 H and the current reaches to zero in 10−4 s in the primary. The maximum current in the primary before it breaks is [Punjab PMET] (a) 0.1 A (b) 0.4 A (c) 0.6 A (d) 0.8 A 14 Two coils are wound on the same iron rod, so that the flux generated by one passes through the other. The primary coil has N p turns in it and when a current 2 A flows through it, the flux in it is 2.5 × 10−4 Wb. If the secondary coil has 12 turns, the mutual inductance of the coils is (assume the secondary coil is in open circuit) (a) 10 × 10−4 H
(b) 15 × 10−4 H
(c) 20 × 10−4 H
(d) 25 × 10−4 H
2007 15 If coil is open, then L and R become (a) ∞, 0
(b) 0, ∞
[Punjab PMET]
[MHT CET]
(c) ∞ , ∞
(d) 0, 0
16 Two coils of self-inductances 2 mH and 8 mH are placed so close together that the effective flux in one coil is completely linked with the other. The mutual inductance between these coils is [MP PMT] (a) 10 mH (b) 6 mH (c) 4 mH (d) 16 mH
17 The inductance of a coil is L = 10 H and resistance R = 5 Ω. If applied voltage of battery is 10 V and it switches OFF in 1 ms, then find the value of induced emf of inductor. (a) 2 × 104 V (b) 1.2 × 104 V [DUMET] (d) None of these (c) 2 × 10−4 V 18 A coil of self-inductance 0.5 mH carries a current of 2 A. The energy stored (in joule) is [Guj CET] (a) 1 (b) 0.001 (c) 0.5 (d) 0.05
2006 19 A current i = 10 sin ( 100 πt ) A is passed in first coil, which induces a maximum emf 5 πVin second coil. The mutual inductance between the coils is [Kerala CEE] (a) 10 mH (b) 15 mH (c) 25 mH (d) 20 mH (e) 5 mH 2005 20 In a solenoid, if number of turns is doubled, then self-inductance will become [AFMC] (a) half (b) double (c) 1/ 4 times (d) quadruple 21 Two coils have mutual inductance 0.005 H. The current changes in the first coil according to equation I = I 0 sin ωt , where I 0 = 10 A and ω = 100 π rad s −1 . The maximum value of emf in volt in the second coil is [RPMT] (a) 12 π (b) 8 π (c) 5 π (d) 2 π 22 Two inductors each of inductance L are joined in parallel, then their equivalent inductance will be [RPMT] (a) zero (b) L/ 2 (c) L (d) 2 L 23 For a solenoid having a primary coil of N 1 turns and a secondary coil of N 2 turns, the coefficient of mutual inductance is [Haryana PMT] N1N 2 (a) µ 0µ r l µ 0µ r N 1 N 2 (b) Al (c) µ 0µ r N 1 N 2 Al µ µ N N A (d) 0 r 1 2 l
Answers 1 (d)
2 (c)
3 (a)
4 (d)
5 (a)
6 (a)
7 (d)
8 (b)
9 (b)
10 (d)
11 (b)
12 (d)
13 (b)
14 (b)
15 (b)
16 (c)
17 (a)
18 (b)
19 (e)
20 (d)
21 (c)
22 (b)
23 (d)
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (d) Given, magnetic potential energy stored in an inductor, U = 25 mJ = 25 × 10−3 J Current in an inductor, i0 = 60 mA = 60 × 10−3 A
−3
2 × 25 × 10 500 = 36 3600 × 10−6
L=
or
L = 13.89 H
2 (c) Given, number of turns of solenoid, N = 1000 Current, i = 4A Magnetic flux, φ B = 4 × 10−3 Wb Q Self-inductance of solenoid is given by L = φB ⋅ N / I
…(i)
Substitute the given values in Eq. (i), we get L=
4 × 10−3 × 1000 =1H 4
L
⇒
N2 L = µ0 A l
⇒
L∝N2
L
The current flowing through the inductor is i. Now, we can write, φ = Li where, φ is magnetic flux linked with the inductor. dφ di =L dt dt Given, L = 40 mH dt = net time difference = t2 − t1 = 4 ms = ∆t di = i2 − i1 = 11 − 1 = 10 A = ∆i
10 (d) Given, e = 8V, i1 = 2A, i2 = −2A,
N Q n = l
Thus, inductance of a coil is directly proportional to square of number of turns (N ). µ 0 N 2 πr 2 l Given, r1 / r2 = l1 / l2 = 1 / 2 2 2 L1 r1 l2 1 2 = = × ⇒ 1 L2 r2 l1 2 L1 1 ⇒ = = 1: 2 L2 2
5 (a) Self-inductance, L =
6 (a) Given, A = 10− 3 m 2
l = 31.4 cm = 31.4 × 10 − 2 m N = 103.
and
Magnetic flux, φ = Li ⇒ N BA = Li µ Ni ⇒ N 0 A = Li l L=
⇒ L=
µ N QB= 0 l
µ 0N 2 A l 4 π × 10− 7 × (103 )2 × 10− 3 31.4 × 10− 2
7 (d) Given, | e| = 220 V, di = 0.9A and v= ⇒
⇒ ⇒
1 t 1 1 = v 50 Ldi e = dt 0.9 220 = L × 1/50 t=
L = 4.88 = 5 H
8 (b) For two such coils connected oppositely in series, Leq = L1 + L2 − 2M But
L1 = L2 = L and M = 0 Leq = L + L − 0 = 2L
∆i = i2 − i1 = (−2 − 2)A and dt = 0.05 s Induced emf, di (− 2 − 2) e=−L =−L dt 0.05 (4) 8=L 0.05 8 × 0.05 L= = 0.1 H ⇒ 4
11 (b) Mutual induction depends upon the magnetic permeability of medium between the coils (µ r ) or nature of material on which two coils are wound.
12 (d) We know that, the magnetic flux associated with coil Y is directly proportional to current flowing in X coil. i.e. φY ∝ I X …(i) ⇒ φY = MI X where, φY = change in magnetic flux in coil Y,
[Q φ = B ⋅ A ]
= 4 mH
i
⇒
coils depends on distance between two coils and geometry of two coils, i.e. it depends on relative position and orientation of two coils.
4 (d) From the relation, L = µ 0n2lA
⇒
3 (a) Consider the inductor of inductance i
9 (b) Mutual inductance of the pair of
or Induced emf = 10 × 10 = 100 V
As, the expression for energy stored in an inductor is given as 1 …(i) U = Li02 2 where, L is the inductance of the inductor. Substituting the given values in above Eq. (i), we get 1 (25 × 10−3 ) = × L × (60 × 10−3 )2 2 ⇒
dφ ∆ φ = dt ∆t ∆i (10)A =L = (40 mH) ∆t 4 ms
emf =
So,
i
I X = change in current in coil X and M = mutual inductance. Now, given that IX = 4 A ⇒ φY = 0.4 Wb Then, from Eq. (i) 0.4 = M × 4 0. 4 M = = 0 .1 H ⇒ 4
13 (b) Given, e = 20000 V, M = 5 H and t = 10−4 s.
Mimax t i 20000 = 5 × max 10−4 20000 × 10−4 Current, imax = 5 = 0.4 A
Emf in the coil, e = ⇒
14 (b) Given, φ = 2.5 × 10−4 Wb, ip = 2A, and N = 12. Mutual inductance, N φ 12 × 2.5 × 10−4 M = s = 2 ip = 15 × 10−4 H
609
ELECTROMAGNETIC INDUCTION
15 (b) When coil is open, there is no current in it, hence no flux is associated with it, i.e. φ = 0. Also, we know that flux linked with the coil is directly proportional to the current in the coil i.e. φ∝i ⇒ φ = Li where, L is proportionality constant known as self- inductance. ∴ L = φ/i = 0 Again, since i = 0, hence R = ∞. e QR = i
16 (c) When the total flux associated with one coil links with the other, i.e. a case of maximum flux linkage, then N 2φ B 2 M 12 = i1 and
M 21 =
Similarly, L1 = and
L2 =
N 1φ B1 i2 N 1φ B1 i1 N 2φ B 2 i2
If all the flux of coil 2 links coil 1 and vice-versa, then φ B 2 = φ B1 Since, M 12 = M 21 = M , hence we have N 1N 2φ B1 φ B 2 M 12M 21 = M 2 = = L1L2 i1i2 ∴
V 10 = =2A R 5 Circuit switches OFF in 1 ms ⇒ ∆t = 1 × 10−3 s and L = 10 H
Induced current, ∆i =
∴ Induced emf in inductor, 2 = 2 × 104 V | e | = 10 × 1 × 10−3
18 (b) Energy stored in inductor is given as 1 U = LI 2 2 Given, I = 2A, L = 0.5 mH
Putting the given value in Eq. (i), we get 1 ∴ U = × 0.5 × 10−3 × (2)2 = 0.001 J 2
19 (e) From Faraday’s law of electromagnetic induction, Mdi e=− dt e ⇒ M =− di / dt Given, e = 5π V and i = 10 sin (100 πt ). di = 10 cos (100πt ) ⋅ 100π ∴ dt max
⇒
M max = L1L2 M max = 2 × 8 = 16 = 4 mH
17 (a) Amount of magnetic flux linked
with inductor, φ = Li Now, the emf induced in the inductor is given by dφ d di e=− = − (Li ) = − L dt dt dt di ∆i | e| = L = L ⇒ dt ∆t
21 (c) Given, mutual inductance between two coils, M = 0.005 H, peak current, I 0 = 10 A,
and angular frequency, ω = 100 π rad s −1. Current, I = I 0 sinωt ⇒
[Q cos (100πt )max = 1] = 10 × 100π 5π M = − 10 × 100 π = − 5 × 10−3 H = 5 mH
20 (d) For a solenoid of length l, area of cross-section A, having N closely wound turns, the self- inductance of the solenoid is L=
µ 0N 2 A l
When N ′ = 2N ⇒
L′ =
4µ 0N 2 A µ 0 (2N )2 A = = 4L l l
dI dt
= max
d (I 0 sin ωt ) = I 0 cosωt ⋅ ω dt [Q (cos ωt )max = 1]
= 0.5 × 10−3 H
Given, L1 = 2 mH, L2 = 8 mH ∴
…(i)
Hence, when number of turns is doubled, then self-inductance becomes quadruple.
⇒
dI dt
= 10 × 1 × 100 π max
= 1000 π Hence, induced emf is given by di e =M × dt = 0.005 × 1000 × π = 5πV
22 (b) Inductance of first inductor, L1 = L Inductance of second inductor, L2 = L Now, if these inductors are connected in parallel, then their equivalent inductance is 1 1 1 1 1 2 = + = = + Leq L1 L2 L L L Hence,
Leq =
L 2
23 (d) Coefficient of mutual inductance, M =
φ µ 0 µ r N 1N 2 AI p = Ip lI p
µ 0 µ r N 1N 2 A l where, A and l are the area and length of cross section respectively, I p = current in primary coil, N 1 = turns in primary coil and N 2 = turns in secondary coil. =
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 4 Applications of EMI (Motor and Dynamo) 2019 1 Assertion A metallic surface is moved in and out in magnetic field then emf is induced in it. Reason Eddy current will be produced in a metallic surface moving in and out of magnetic field. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2 In which of the following devices, the eddy current effect is not used? [NEET] (a) Magnetic braking in train (b) Electromagnet (c) Electric heater (d) Induction furnace
2014 3 A dynamo converts
[Kerala CEE]
(a) mechanical energy into thermal energy (b) electrical energy into thermal energy (c) thermal energy into electrical energy (d) mechanical energy into electrical energy (e) electrical energy into mechanical energy
2013 4 An electric generator is based on [WB JEE] (a) Faraday’s laws of electromagnetic induction (b) motion of charged particles in electromagnetic field (c) Newton’s laws of motion (d) fission of uranium by slow neutrons
2012 5 An electric motor runs on DC source of emf 200 V and draws a current 10 A. If the efficiency be 40%, then the resistance of armature is [UP CPMT, AIPMT] (a) 2 Ω (b) 8 Ω (c) 12 Ω (d) 16 Ω
2008 6 Assertion An electric motor will have maximum efficiency when back emf becomes equal to half of applied emf.
Reason Efficiency of electric motor depends only on magnitude of back emf. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
7 At time t = 0 s, voltage of an AC generator starts from 0 V and becomes 2 V at time t = (1/ 100 π ) s. The voltage keeps on increasing upto 100 V, after which it starts to decrease. Find the frequency of the generator. [Guj CET] (a) 2 Hz (b) 5 Hz (c) 100 Hz (d) 1 Hz
2007 8 A six pole generator with fixed field excitation developes an emf of 100 V when operating at 1500 rpm. At what speed must it rotate to develop 120 V? [AIIMS] (a) 1200 rpm (b) 1800 rpm (c) 1500 rpm (d) 400 rpm
9 Use of eddy currents is done in the following except [AFMC]
(a) moving coil galvanometer (b) electric brakes (c) induction motor (d) dynamo
10 Fleming’s left and right hand rules are used in [MHT CET] (a) DC motor and AC generator, respectively (b) DC generator and AC motor, respectively (c) DC motor and DC generator, respectively (d) Both rules are same, anyone can be used 11 Results obtained due to eddy currents is [RPMT] (a) high efficiency between coils of transformer (b) low efficiency between coils of transformer (c) loss of heat in core of transformer (d) None of the above 12 When speed of a DC generator decreases, the armature current [MHT CET] (a) increases (b) decreases (c) does not change (d) increases and decreases continuously
611
ELECTROMAGNETIC INDUCTION
Answers 1 (a)
2 (c)
11 (c)
12 (b)
3 (d)
4 (a)
5 (c)
6 (c)
7 (d)
8 (b)
9 (d)
10 (c)
Explanations 1 (a) When a metallic surface is moved in and out in magnetic field, then magnetic flux linked with metallic surface is changed continuously, hence according to Faraday’s law of electromagnetic induction, an induced emf is produced. Since, metallic plate behaves as a closed path, therefore an induced current (eddy current) starts flowing in the metallic surface. Hence, Assertion and Reason both are correct and Reason is the correct explanation of Assertion.
2 (c) Electric heaters are not based on the eddy current effect. Rather their working is based on Joule’s heating effect of current. According to this effect, the passage of an electric current through a resistor produces heat. However, when a changing magnetic flux is applied to a bulk piece of conducting material, then circulating current is induced in the body of this conductor, which is usually known as eddy currents. This current shows both heating and magnetic effects. Thus, it is the basic principle behind the working of magnetic braking in train, electromagnet and induction furnace.
3 (d) A dynamo converts mechanical energy into electrical energy.
4 (a) An electric generator/dynamo is based on Faraday’s laws of electromagnetic induction.
5 (c) Given, V = 200V, I = 10 A and
40 100 Input power, Pi = VI = 200 × 10 = 2000 W Output power, Po = 40 / 100 × 2000 = 800 W
efficiency = 40% =
Power loss in heating the armature, P = Pi − Po = 2000 − 800 P = 1200 W ∴ I 2R = 1200 ⇒
102 R = 1200 R = 12 Ω
6 (c) Since, the efficiency of an electric motor is given by Output power η= Input power
…(i)
n = 1Hz
8 (b) The emf induced is directly proportional to rate at which flux is intercepted which varies directly as the speed of rotation of the generator. 120 New speed = × 1500 100 = 1800 rpm
9 (d) Eddy currents is not used in dynamo.
To obtain maximum output power differentiating Eq. (i) with respect to e and equating it to zero. d e(E − e) So, =0 de R E e= ⇒ 2 Thus, when back emf becomes equal to half of the applied emf, then efficiency of motor will be maximum.
7 (d) The produced voltage by an AC generator is 2 V at t = (1 / 100 π ) s and maximum produced voltage (e0 ) = 100 V We know that, the induced emf produced by an AC generator is e = e0 sinω t Given, e = 2V, t = (1 / 100 π )s ⇒ e0 = 100 V
But the time (1/ 100π )s is very small, so the angle ω t is also very small. Therefore, for a small angle, sinθ ≈ θ Hence, from Eq. (ii), 2 = 100 × ω × 1/ 100π ⇒ 2π = ω ⇒ 2π = 2πn where, n = frequency of the generator. ∴
From the above relation, it is quite clear that maximum output power corresponds maximum efficiency of motor. Now, output power is given by e(E − e) eI = R where, E = applied voltage and e = back emf.
On putting the values in Eq. (i), we get 2 = 100 sin ω × 1 / 100 π
10 (c) DC motor is a device which converts electrical energy into mechanical energy. It employs Fleming’s left hand rule. DC generator converts mechanical energy into electrical energy in the farm of DC. It employs Fleming’s right hand rule.
11 (c) Due to change of magnetic flux, eddy current is produced in the core of transformer. Loss of heat in the core of transformer occurs due to production of eddy current.
12 (b) When speed of a DC generator …(i)
decreases, then rate of change of magnetic flux through armature coil decreases and hence induced emf across armature coil also decreases, i.e armature current decreases.
21 Alternating Current Quick Review • The currents whose magnitude and direction changes periodically through a load is known as alternating
currents and corresponding voltage as alternating voltage or emf, which are represented respectively as I = I 0 sin ωt, V = V0 sin ωt where, I 0 and V0 = peak value of current and voltages, respectively and ω = angular frequency. Some important terms and definitions related to alternating currents are shown in the following table Terms
Definitions
Expressed as
(i)
Time period
The time taken to complete one cycle of variations.
T = 2 π /ω
(ii)
Frequency
The number of cycles completed per second by AC.
f =
(iii)
Average (mean) value of current and voltage
l
l
1 ω = T 2π
The mean or average value of AC is that value of direct current or voltage I = 1 T / 2 I dt = 2 I = 0.63 I 0 0 which sends the same amount of charge in a circuit as sent by the given av T / 2 ∫0 π AC in its half cycle. I av = 63.7% of I 0 The average value of alternating quantities over complete cycle is zero. The mean value of alternating emf is 2E0 E av = = 0.637 E 0 = 63.7% of E 0 π
(iv)
The rms value of current or voltage
I The root mean square value of AC is the value of direct current which I = 0 = 0.707 I 0 = 70.7% of I 0 produce same amount of heat as produced by given AC for same time rms 2 duration of a complete cycle. E E rms = 0 = 0.707 E 0 = 70.7% of E 0 2
(v)
Phase
Phase is a quantity that represents both the instantaneous value and direction I = I 0 sin (ωt ± φ), initial phase = φ and instantaneous phase = ωt. of alternating quantity. Its unit is radian.
(vi)
Phase difference
Phase difference is the difference of phase between voltage and current.
If V = V0 sin (ωt + φ1) and I = I 0 sin(ωt + φ 2 ), phase difference, φ = φ 2 − φ1 (relative to voltage) and φ = φ1 − φ 2 (relative to current).
613
ALTERNATING CURRENT
AC Circuit Elements • The basic elements of AC circuits are resistor, inductor and capacitor. • Reactance is the opposition offered by inductor or capacitor to the flow of alternating current through it.It is of two types as
given below (i) Inductive reactance is the opposition offered by inductive circuit and given by X L = ωL = 2πfL .
(ii) Capacitive reactance is the opposition offered by capacitive circuit and given by X C = 1/ ωC = 1/ 2πfC. • Impedance is the opposition offered by AC circuit to the flow of AC through it. Its unit is ohm ( Ω ).
The various features of these circuit elements are tabulated below (for applied emf E = E 0 sin ωt) Circuit element Resistor only
Instantaneous current I = I 0 sin ωt
Peak current
Phase difference
Power factor
V0 R
0°
1
Power
Phasor diagram
V0 I 0 2
Graph
E0
E I
V0 XL
90° (current lags the voltage in phase by 90° or π/2)
0
0
E
E0
ωt
I 0 sin ωt–π/2 I
π I = I 0 sin ωt + 2
V0 XC
90° (current leads the voltage in phase by 90° or π/2)
0
0 I0 si n (ωt+π/2)
Capacitor only
I0
2π
ωt
I
0
t
90°
E0
E
E0
E0 sin ωt
π
0
t
π I = I 0 sin ωt − 2
I
I0
ωt
Inductor only
E
E or I
I0
ωt1 π
ωt
2π
I0
I0 E0
E I π/2
E0 sin ωt
ωt
E
E0 I0 0
ωt1
π
I
2π
t
Power in an AC Circuit • It is the product of voltage and the component of current which is in phase with voltage and given by P = VI cos φ,
where V and I are rms values of voltage and currents. • Instantaneous power of AC is given by P = VI = V0 I 0 sin ωt sin (ωt + φ ) 1 • Average power of AC is given by Pav = Vrms I rms cos φ = V0 I 0 cos φ 2 • Power factor is the cosine of angle of lag or lead or the ratio of resistance and impedance. Pav True power It is given by cos φ = = Apparent power V rms I rms
ωt
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Series AC Circuit The circuit elements can be combined in series circuit as given in the table below with their features Combination R-C circuit
Voltage (V)
Current (I) I 0 sin (ωt + φ)
VR2 + VC2
Impedance (Z)
Phase difference ( φ)
R 2 + X C2
tan −1
Power factor (cos φ)
XC R
Phasor diagram
R R 2 + X C2
φ
VR
I
V VC R-L circuit
I 0 sin (ωt − φ)
VR2 + VL2
R 2 + X L2
tan −1
XL R
R
VL
R 2 + X L2
V φ I
VR L-C-R circuit
VR2 + (VL − VC ) 2
I 0 sin (ωt − φ)
R 2 + ( X L − X C ) 2 tan −1 X L − X C R
R R + ( X L − X C )2
VL
2
VL – VC
V φ
VC
VR
I
Note For L-C circuit, Z = ( X L − X C ) 2 or X L − X C u
u
u
If X L > X C , circuit will behave like pure inductor and voltage leads by current by π /2. If X L < X C , circuit will behave like pure capacitor, voltage lags by current by π /2. If X L = X C , then Z = 0, current in circuit will be maximum.
Resonance in Series L-C-R Circuit • Resonance is a condition in a series L-C-R
circuit, when impedance is minimum and phase difference between current and voltage is zero. Then, (ω r ) X L = X C .
• Quality factor is a measure of sharpness of the resonance of an
L-C-R circuit. The variation of Q-factor in series L-C-R circuit with ω is expressed graphically below Q I0
At resonant frequency, 1 ω0 = LC or
f0 =
1 2π LC
Z = R = Z min and
I=
V = I max . Z
R decreases, Q increases
R=100 Ω
⋅ O
Resonant frequency is independent of resistance. At resonating frequency,
R = 10 Ω
I0 I= — √2
ω1 ω0 ω2 ω
• The quantity (Q = ω 0 / 2∆ω ) is the measure of sharpness of
resonance, where ω 1 − ω 2 = 2∆ω is called bandwidth of the circuit, ω 1 = ω 0 + ∆ω and ω 2 = ω 0 − ∆ω .
Note
u
u
Q-factor denotes the sharpness of tuning. Smaller the bandwidth ( ∆ω ), the sharper or narrower is the resonance.
615
ALTERNATING CURRENT
Growth and Decay of Current in L-R Circuit
Charging and Discharging of Capacitor
Conditions and terms related to L-R circuit alongwith its graphs can be shown in tabular form below Conditions Growth of current
Decay of current
Currents
In series R-C circuit, this can be shown in table below Charging
Graphs
I = I 0 (1 − e− t / τ L )
(i) Charge, q = q0 (1 − e− t / RC )
q = q0e− t / RC (τ = RC = time constant of circuit )
(ii) Potential, V = V0 (1 − e− t / RC )
V = V0e− t / RC
(iii) Current, I = E e(− t / τ ) R
I = − I 0et / τ
(iv) At t = τ, 1 q = q0 1 − = 0.63q0 e
At t = τ, q =
I
At t = 0, I = 0 At t = τ L , 1 I = I 0 1 − = 0.63I 0 e L ( where, τ L = = time R constant E and I 0 = = maximum R current).
Discharging
I0 0.63 I0 t
I = I 0 e− t / τ L
(v) Graph,
I
q0
q0
At t = 0 , I = I 0 At t = τ L , I I = 0 = 0.37I 0 e
q0 = 0.37q0 e
q = q0 e
0.37 I0
q = q0(1 – e
t
Note When inductor having resistance is connected to battery, the L growth and decay, where τ = = time constant. R
– t/RC
– t/RC
) O
O
t
t
L-C Oscillations • These are the electrical oscillations of constant amplitude and frequency which are produced when a charged capacitor is
allowed to discharge through a non-resistive inductor. • Terms related to L-C oscillations are shown in tabular form below, where q = q 0 cos(ωt + φ ) and I = I 0 sin(ωt + φ ). Terms Expressions
Equation 2
d q dt
2
+
1 q=0 LC
Frequency ω 1 f = = 2 π 2 π LC
Electric energy U =
q02 2C
cos2 (ωt + φ)
Magnetic energy U =
q02 sin 2 (ωt + φ) 2C
Wattless current is the current which consumes no power for its maintenance in the circuit.
Choke Coil It is a device having high inductance and negligible resistance. It is used to control current in AC circuit, so that the power loss can be minimised like in fluorescent tubes.
Transformer • It is a device which transforms a strong AC at low voltage
into a weaker AC at high voltage or vice-versa based on the principle of electromagnetic induction. Ip e V N =k • For an ideal transformer, s = s = s = ep Vp Np Is
where, k is known as the transformation ratio. • For a step-up transformer k > 1but for a step-down transformer, k < 1. • The efficiency of a transformer is given by output power Vs I s η= = input power V p I p • In a transformer, some power is lost due to following
reasons (i) Heating due to winding resistance and eddy current losses. (ii) Magnetic flux leakage and hysteresis loss. • To minimise these losses, the transformer core is made up of a laminated soft iron strips.
616
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topical Practice Questions All the exam questions of this chapter have been divided into 4 topics as listed below Topic 1
—
INTRODUCTION TO AC AND POWER CONSUMPTION IN AC CIRCUITS
616–621
Topic 2
—
AC CIRCUITS
622–636
Topic 3
—
GROWTH AND DECAY OF CURRENT
636–638
Topic 4
—
TRANSFORMER
638–641
Topic 1 Introduction to AC and Power Consumption in AC Circuits 2018 1 An inductor 20 mH, a capacitor 100 µF and a resistor 50 Ω are connected in series across a source of emf [AIIMS] V = 10 sin 314 t. The power loss in the circuit is (a) 2.74 W (b) 0.43 W (c) 0.79 W (d) 1.13 W
2016 2 An inductor 20 mH, a capacitor 50 µF and a resistor 40 Ω are connected in series across a source of emf [NEET] V = 10sin 340 t. The power loss in AC circuit is (a) 0.67 W (b) 0.76 W (c) 0.89 W (d) 0.51 W
2015 3 A resistance R draws power P when connected to an AC source. If an inductance is now placed in series with the resistance, such that the impedance of the circuit becomes [AIPMT] Z the power drawn will be R R 2 (c) P ( R / Z ) (d) P (b) P (a) P Z Z
2014 4 In L-C-R series circuit, an alternating emf e and current i are given by the equations e = 100 sin (100 t ) volt. π i = 100 sin 100 t + mA 3
The average power dissipated in the circuit will be [MHT CET]
(a) 100 W
(b) 10 W
(c) 5 W
(d) 2.5 W
5 The average power dissipated in AC circuit is 2 W. If a current flowing through a circuit is 2 A, impedance is 1 Ω, then what is the power factor of the circuit? [KCET] (a) 0.5 (b) 1 (c) Zero (d) 1/ 2 6 A hot wire ammeter reads 10 A in an AC circuit. The peak value of the current will be [KCET] 3 10 (a) A (b) A π 2 (c) 10 2 A (d) 6π A
2013 7 A coil of self-inductance L is connected in series with a bulb B and AC source. Brightness of the bulb decreases when (a) frequency of the AC source is decreased [NEET] (b) number of turns in the coil is reduced (c) a capacitance of reactance X C = X L is included in the same circuit (d) an iron rod is inserted in the coil
2011 8 In an AC circuit, V and I are given by
π V =150 sin (150 t ) volt and I =150 sin 150 t + ampere. 3 The power dissipated in the circuit is (a) 106 W (b) 150 W (c) 5625 W (d) zero
[KCET]
617
ALTERNATING CURRENT
9 An AC ammeter is used to measure current in a circuit. When a given direct current passes through the circuit, the AC ammeter reads 3A. When another alternating current passes through the circuit, the AC ammeter reads 4A. Then, the reading of this ammeter, if DC and AC flow through the circuit simultaneously, is [AIIMS] (a) 3 A (b) 4 A (c) 7 A (d) 5 A 10 An AC source is 120 V- 60 Hz. The value of voltage after [BCECE] (1/ 720) s from start will be (a) 20.2 V (b) 42.4 V (c) 84.8 V (d) 106.8 V 11 Alternating current is transmitted at far off places (a) at high voltage and low current [JCECE] (b) at high voltage and high current (c) at low voltage and low current (d) at low voltage and high current
2008 12 In an AC circuit, the emf (e) and the current (i) at any instant are given respectively by [CBSE AIPMT] e = E 0 sin ωt ⇒ i = I 0 sin (ωt − φ ) The average power in the circuit over one cycle of AC is E I E I E I (a) 0 0 (b) 0 0 sin φ (c) 0 0 cos φ (d) E 0 I 0 2 2 2 13 Alternating current cannot be measured by DC ammeter, because [Haryana PMT] (a) AC cannot pass through DC ammeter (b) AC changes direction (c) Average value of current for complete cycle is zero (d) DC ammeter will get damaged
2007 14 The instantaneous voltage through a device of impedance
20 Ω is e = 80 sin 100 πt. The effective value of the current is [Kerala CEE] (a) 3 A (b) 2.828 A (c) 1.732 A (d) 4 A (e) 2 A
15 For high frequency, capacitor offers (a) more resistance (b) less resistance (c) zero resistance (d) None of these
[RPMT]
16 If the power factor changes from 1/2 to 1/4, then what is the increase in impedance in AC? [Punjab PMET] (a) 20% (b) 50% (c) 25% (d) 100%
2006 17 If impedance is 3 times of resistance, then find phase difference. (a) Zero (c) 60°
[RPMT]
(b) 30° (d) Data is incomplete
18 If reading of an ammeter is 10 A, then the peak value of current is [MP PMT] 10 5 (b) (c) 20 2 A (d) 10 2 A (a) A A 2 2 19 An AC is represented by e = 220 sin (100 π ) t volt and is applied over a resistance of 110 Ω. The heat produced in 7 min is [Haryana PMT] (a) 11 × 103 cal (b) 22 × 103 cal (c) 33 × 103 cal (d) 25 × 103 cal 20 An alternating voltageV = V0 sin ω t is applied across a circuit. As a result, the current I = I 0 sin (ω t − π / 2) flows in it. The power consumed in the circuit per cycle is [Guj CET] (a) 0.5V0 I 0 W (b) 0.707V0 I 0 W (c) 1.919V0 I 0 W (d) zero 21 If an AC produces same heat as that produced by a steady current of 4 A, then peak value of current is [JCECE] (a) 4 A (b) 1.56 A (c) 5.6 A (d) 1.41 A 22 The potential difference across an instrument in an AC circuit of frequency f is V and the current through it is I such thatV = 5 cos 2 πft volt and I = 2 sin 2 πft amp. The power dissipated in the instrument is [JCECE] (a) zero (b) 10 W (c) 5 W (d) 2.5 W
2005 23 An alternating current is given by I = I 1 cos ωt + I 2 sin ωt The root mean square current is given by [AMU, Manipal] (I1 + I 2 ) (I1 + I 2 )2 (b) (a) 2 2 (c)
I 12 + I 22 2
(d)
I 12 − I 22 2
24 The peak value of AC voltage on a 220 V mains is (b) 230 2 V (a) 240 2 V [RPMT] (c) 220 2 V (d) 200 2 V 25 The time taken by an alternating current of 50 Hz in reaching from zero to its maximum value will be [J&K CET] (a) 0.5 s (b) 0.005 s (c) 0.05 s (d) 5 s 26 The power factor of series L - C - R circuit when at resonance is [KCET] (a) zero (b) 0.5 (c) 1.0 (d) depends on values of L , C and R
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
27 The instantaneous values of alternating current and voltages in a circuit given as 1 1 i= sin (100 πt ) amp, e = sin (100 πt + π / 3) volt 2 2 The average power (in watts) consumed in the circuit is [CBSE AIPMT]
1 (a) 4 1 (c) 2
3 (b) 4 1 (d) 8
28 In an electrical circuit R , L, C and AC voltage source are all connected in series. When L is removed from the circuit, the phase difference between the voltage and the current in the circuit is π / 3. If instead C is removed from the circuit, the phase difference is again π/ 3. The power factor of the circuit is [CBSE AIPMT] (a) 1/ 2 (b) 1 2 3 (c) 1 (d) 2 29 As given in the figure, a series circuit connected across a 200 V, 60 Hz line consists of a capacitor of capacitive reactance 30 Ω, a non-inductive resistor of 44 Ω and a coil of inductive reactance 90 Ω and resistance 36 Ω. XC = 30 Ω 200 V, ~ 60 Hz
The power dissipated in the coil is (a) 320 W (b) 176 W (c) 144 W (d) 0 W
33 The peak value of an alternating current is 5 A and its frequency is 60 Hz. Find its rms value and time taken to reach the peak value of current starting from zero. (a) 3.536 A, 4.167 ms [MHT CET] (b) 3.536 A, 15 ms (c) 6.07 A, 10 ms (d) 2.536 A, 4.167 ms 34 The power dissipated in an AC circuit is zero, if the circuit is [Kerala CEE] (a) purely resistive (b) purely inductive only (c) either purely inductive or purely capacitive (d) purely capacitive only (e) L-C-R circuit 35 The average power dissipated in a pure capacitance AC circuit is [J&K CET] 1 1 (d) CV 2 (a) CV (b) zero (c) 2 4 CV 36 Power dissipated in an L-C-R series circuit connected to an AC source of emf e is [CG PMT] e2R (a) 2 1 R 2 + ω L − ω C e2
R1 = 44 Ω
(b)
[AMU]
30 The power factor of an R-L circuit is 1/ 2. If the frequency of AC is doubled, then what will be the power factor? [AFMC] (b) 1/ 5 (a) 1/ 3 (d) 1/ 11 (c) 1/ 7 31 Average power in a L-C-R circuit depends upon (a) current [MHT CET] (b) phase difference only (c) emf (d) current, emf and phase difference 32 A coil of inductive reactance 31 Ω has a resistance of 8 Ω. It is placed in series with a condenser of capacitive reactance 25 Ω. The combination is connected to an AC source of 110 V. The power factor of the circuit is (a) 0.56 (b) 0.64 [MP PMT] (c) 0.80 (d) 0.33
1 R 2 + ω L − ω C
2
R 2 1 e 2 R 2 + ω L − ω C (c) R e2R (d) 2 1 2 R + ω L − ω C
37 The power factor in a circuit connected to an AC power supply has a value which is [Manipal] (a) unity when the circuit contains only inductance (b) unity when the circuit contains only resistance (c) zero when the circuit contains an ideal resistance only (d) unity when the circuit contains an ideal capacitance only 38 For a series L-C-R circuit at resonance, the statement which is not true? [KCET] (a) Peak energy stored by a capacitor = Peak energy stored by an inductor (b) Average power = Apparent power (c) Wattless current is zero (d) Power factor is zero
619
ALTERNATING CURRENT
Answers 1 (c)
2 (d)
3 (a)
4 (d)
5 (a)
6 (c)
7 (d)
8 (c)
9 (d)
10 (c)
11 (a)
12 (c)
13 (c)
14 (b)
15 (b)
16 (d)
17 (c)
18 (d)
19 (b)
20 (d)
21 (c)
22 (a)
23 (c)
24 (c)
25 (b)
26 (c)
27 (d)
28 (c)
29 (a)
30 (b)
31 (d)
32 (c)
33 (a)
34 (c)
35 (b)
36 (a)
37 (b)
38 (d)
Explanations 1 (c) Given, inductance, L = 20 mH = 20 × 10 H −6
Capacitance, C =100 µF = 100 × 10 F Resistance, R = 50 Ω emf, V = 10 sin 314 t …(i) Q The general equation of emf is given as …(ii) V = V0 sin ωt On comparing Eqs. (i) and (ii), we get V0 = 10 V ω = 314 rad s−1 The power loss associated with the given AC circuit is given as P = Vrms I rms cos φ V R = Vrms rms Z Z 2
2 V0 V = rms R = R Z 2 ⋅ Z
…(i)
2
∴ Impedance, Z = R + ( X L − X C )
2
1 = R 2 + ωL − ωC
2
∴Substituting the given values in the above equation, we get (314 × 20 × 10−3 ) 1 = (50) + − −4 × 314 10
2
2
2500 + [ 6280 × 10−3 = − 0.00318 × 104 ]2 = 2500 + (25.56)2 ~ 56 Ω = 56.15 Ω − Now, substituting this values in Eq. (i), we get 2
10 100 × 50 P= × 50 = 2 × 3136 2 × 56 = 0.79 W Thus, the power loss in the circuit is 0.79 W.
and impedance, Z = 1 Ω. Power factor, (cos φ ) = ? We know that, P = Vrms × irms ⋅ cos φ
2 (d) Given, inductance, L = 20 mH
−3
Capacitance, C = 50 µF Resistance, R = 40 Ω emf, V = 10 sin 340 t Q Power loss in AC circuit will be given as 2 2 10 E Pav = IV2 R = V ⋅ R = ⋅ 40 Z 2 1 2 340 × 20 × 103 2 1 40 + − × × 10−6 340 50 100 1 = × 40 × 2 1600 + (6.8 − 58.8)2 2000 = ≈ 0.46 W ≈ 0.51 W 1600 + 2704
⇒
3 (a) When a resistor is connected to an AC source. The power drawn will be of V P = Vrms ⋅ I rms = Vrms ⋅ rms R 2 ⇒ Vrms = PR When an inductor is connected in series with the resistor, then the power drawn will be P′ = Vrms ⋅ I rms cos φ where, φ = phase difference. V2 R P⋅R R ∴ P′ = rms ⋅ = ⋅ R Z R Z P⋅R R P′ = = P ⇒ Z Z
4 (d) Average power, Pav = EV IV cos φ =
E0 I 0 cos φ ⋅ 2 2
100 V 100 × 10−3 A π × cos 3 2 2 100 × 100 1 −3 = × 10 × = 2.5 W 2 2
=
5 (a) Given, average power, P = 2W, irms = 2 A
2 P = irms Z ⋅ cos φ (Q Vrms = irms ⋅ Z ) P 2 cos φ = 2 = irms ⋅ Z (2)2 × 1 2 1 = = = 0.5 4 2
6 (c) The reading of hot wire ammeter or
7
rms value of current, I rms = 10 A The peak value of the current is given by I 0 = 2 × I rms = 2 × 10 = 10 2 A (d) As, Z = R 2 + X L2 = R 2 + (2πfL)2 V , P = I 2R Z i.e. with insertion of iron rod L ↑ ⇒ Z ↑ , I ↓ and P ↓ and
I =
8 (c) Given, V = 150 sin (150t ) volt and I = 150 sin (150t + π/3) ampere ∴ I 0 = 150 A and V0 = 150 V 1 Power, P = V0 I 0 cos φ 2 = 0.5 × 150 × 150 × cos 60° = 5625 W
9 (d) Quantity of heat liberated in the ammeter of resistance R (i) due to direct current of 3 A = [(3)2 R / J )] (ii) due to alternating current of 4 A = [(4 )2 R / J )] ∴ Total heat produced per second (3)2 R (4 )2 R 25R = + = J J J Let the equivalent alternating current be I virtual ampere, then I 2R 25R = ⇒ I = 5A J J
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Effective value of current (root mean square value of current), I 4 I rms = 0 = = 2 2 = 2.828 A 2 2
10 (c) V = V0 sinωt ⇒ V = Vrms 2 sinωt 1 After, t = s 720 V = 120 2 sin 2πf t 1 = 120 2 sin 2π × 60 × 720
15 (b) At a higher frequency, the charge on the capacitor plates will vary more dq rapidly, so will be higher dt resulting in an increase in the dq instantaneous current i = . dt
π 1 = 120 2 × 6 2 = 60 2 = 84.8V
= 120 2 sin
11 (a) Alternating current is transmitted at far off places at high voltage and low current.
12 (c) Given, e = E0 sinωt and i = I 0 sin(ωt − φ ) Instantaneous power, Pint = ei = E0I 0 sin ωt sin(ωt − φ ) Average power over one cycle is 1 T Pav = ∑ Pint dt 0 T 1 T = ∑ E0I 0 sin ωt sin(ωt − φ )dt 0 T 1 = × E0I 0 T 2 T ωt cos φ + ∑ 0 (sin sin φ sin ωt cosωt )dt
16
17
This means lower capacitive reactance, i.e. less resistance. R (d) Power factor, cos φ = Z 1 If R is constant, then cos φ ∝ Z cos φ 2 1 / 4 1 Z = = ⇒ Z 2 = 2 Z1 ∴ 1= Z2 cos φ 1 1 / 2 2
XL – XC
θ
and I = I 0 sin (ωt − π / 2) It is obvious that current lags behind the voltage by π/2 in phase. ∴ Power consumed in the circuit, 1 P = V0I 0 cos φ 2 But φ = π / 2 = 90° 1 P = V0I 0 cos 90° = 0 ∴ 2 (Q cos 90° = 0) (c) The peak value of current (I 0 ) is given by, I 0 = 2I rms where, I rms is known as root mean square value of current. Given, I rms =4 A I 0 = 2 × 4 = 5.6 A ⇒
22 (a) Average power dissipated in an AC
circuit is given by, P = VI cos φ where, V is voltage, I the current, φ the phase difference. Given, V = 5 cos 2πft Using sin (90° + θ ) = cosθ, we have V = 5 sin[ 2πft + (π / 2)] and I = 2 sin 2πft Hence, phase difference between V and I is φ = π / 2. P = V ⋅ I cos φ = V ⋅ I cos (π /2) = 0
XL
23 (c) The equation of AC is I = I 1 cosωt + I 2 sin ωt The resultant current is given by
R
I 0 = I 12 + I 22
XC
⇒ ⇒
θ = tan −1 ( 3R / R ) θ = tan −1 ( 3 ) = 60°
I rms =
14 (b) The instantaneous voltage through
= 2 × 10 A = 10 2 A
19
I 2 RT (b) Heat, H = rms cal J I 220 / 110 = 2 Q I rms = 0 = 2 2 ( 2 )2 × 110 × (7 × 60) ∴ H = 4.2 = 22 × 103 cal
I0 = 2
I 12 + I 22 2
[from Eq. (i)]
I 12 + I 22 2 (c) Here, rms voltage, Vrms = 220 V =
18 (d) Ammeter reads the root mean square value of current (irms ) which is related to the peak value of current (i0 ) by the relation i irms = 0 ⇒ i0 = 2 × irms 2
…(i)
Hence, the rms current from relation is
X − XC −1 Z ⇒ θ = tan −1 L = tan R R
13 (c) The full cycle of alternating current
the given device, e = 80 sin 100π t. Comparing the given instantaneous voltage with standard instantaneous voltage e = e0 sinωt, we get e0 = 80 V where, e0 is the peak value of voltage. Impedance (Z ) = 20 Ω Peak value of current, e 80 I0 = 0 = = 4 A Z 20
21
∴ Percentage change 2 Z1 − Z1 = × 100 = 100% Z1 X − XC (c) From the relation, tanθ = L R where, X L − X C is the net impedance of the circuit.
EI T = 0 0 [cos φ × ± 0 ] T 2 (E0I 0 cos φ )T / 2 E0 I 0 cos φ = = T 2 where, cos φ is called the power factor of an AC circuit. consists of two half cycles. For one-half, current is positive and for second-half, current is negative. Therefore, for an AC cycle, the net value of current average out to zero. While the DC ammeter, reads the average value. Hence, the alternating current cannot be measured by DC ammeter.
20 (d) Given, V = V0 sinωt
24
Using the relation, Peak voltage VP = Vrms = 2 2 ∴ Peak value of AC voltage, VP = 220 2 V
25 (b)
I T/2 O
T/4
T ωt
621
ALTERNATING CURRENT
An alternating current is one whose magnitude changes continuously with time between zero and a maximum value and whose direction reverses periodically. The relation between frequency ( f ) and time (T ) is 1 1 T = = = 0.02 s f 50
26
It is clear from the figure, time taken to reach the maximum value is T 0.02 = = 0.005 s 4 4 (c) At resonance, voltage and current are in phase. Average power of circuit is given by P = Erms × I rms × cos φ where, Erms and I rms are root mean square value of voltage and current and cos φ is power factor. In a series L- C-R circuit at resonance, voltage and current being in same phase, therefore φ = 0. Hence, power factor = cos φ = cos 0° = 1.
27 (d) Given equations are 1 sin (100πt ) amp 2 1 and e= sin (100 πt + π / 3) volt 2 1 1 and e0 = ⇒ i0 = 2 2 We know that, average power, Pav = Vrms × irms cos φ 1 1 = × × cos 60° 2 2 (Q irms = i0 / 2 and Vrms = V0 / 2 ) 1 1 1 1 = × × = W 2 2 2 8 i=
28 (c) Here, phase difference X L − XC R π X L − XC ⇒ tan = 3 R tan φ =
π XC = = 3 3 R ...(i) X C = 3R ∴ Similarly, when C is removed π X tan = L = 3 3 R X L = 3R ⇒ When L is removed, tan
...(ii) [from Eq. (i)] ⇒ XC = X L Now, tan φ = 0 ⇒ φ = 0° ∴ Power factor, cos φ = cos 0° = 1
29 (a)
XC = 30 Ω 200 V, ~ 60 Hz
R1 = 44 Ω
34 X L = 90 Ω, R2 = 36 Ω, R1 = 44 Ω X C = 30 Ω, V = 200V and total resistance, R = R1 + R2 = 44 + 36 = 80Ω Z = R 2 + ( X L − X C )2 = (80)2 + (60)2
35 (b) Alternating voltage applied to a
= 6400 + 3600 = 100
pure capacitance circuit is E = E0 sinωt
V 200 Current, I = = = 2A Z 100 Power dissipated in the coil,
Then, through C, as current leads emf by a phase angle of π /2. I = I 0 sin (ωt + π / 2) = I 0 cosωt Work done over a complete cycle,
Pav = I 2R = (2)2 × 80 = 320 W
T
W = ∫ EI dt
30 (b) Power factor, cos φ =
1 = 2
0
R
T
= ∫ (E0 sin ωt )(I 0 cosωt ) dt
R 2 + ω 2L2
0
E0I 0 T 2sin ωt cosωt dt 2 ∫0 EI T = 0 0 ∫ sin 2ωt dt 2 0
This gives, ω L = R. When ω is doubled, we find, R cos φ′ = 2 R + 4ω 2L2 R 1 = = 2 2 5 R + 4R
=
T
⇒W =
circuit, Pav = Vrms irms cos φ Hence, the average power depends upon current, emf and phase difference.
36 (a) Given, e = erms e Z Now, power of AC circuit is given by 2
e i 2R = R Z
where, R is resistance employed and Z the impedance of the circuit. Z = R 2 + ( X L − X C )2 …(ii)
=
Eqs. (i) and (ii), meet to give R …(iii) cos φ = 2 R + ( X L − X C )2
=
33 (a) irms =
8 8 = = 0.80 64 + 36 10
i0 5 = = 3.536 A 2 2
2
Also, i =
…(i)
Given, R = 8 Ω, X L = 31Ω and X C = 25 Ω 8 ∴ cos φ = 2 (8) + (31 − 25)2
R 2 + (ωL − 1 / ωC )
Impedance, Z =
32 (c) Power factor of AC circuit is given R cos φ = Z
E0I 0 cos 2ωt = zero − 2 2ω 0
Hence, average power dissipated in a pure capacitance AC circuit is zero.
31 (d) The average power of an L-C-R
by
1 1 = = 0.01675 f 60 T t = = 4.16 ms ∴ 4 (c) The power in an AC circuit is given by P = VI cos φ. where, φ = phase angle between V and I. Thus, power is zero when cos φ = 0 ⇒ φ = 90° For both pure inductive and pure capacitive, the phase between current and voltage is 90°. Thus, they have zero power dissipation. Time period, T =
37
38
e2
⋅R 2 [ R 2 + (ωL − 1/ωC ) ]2 e2R = 2 [ R + (ωL − 1 / ωC )2 ] R (b) Power factor, cos φ = Z When circuit contains only resistance, then Z = R R cos φ = = 1 ∴ R (d) For a series L-C-R circuit at resonance, Phase difference, φ = 0° ⇒ Power factor = cos φ = 1
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 2 AC Circuits 2019 1 Find resonance frequency in the given circuit L
C
L
C
6 In a series R-C circuit shown in figure, the applied voltage is 10 V and the voltage across capacitor is found to be 8V. Then, the voltage across R and the phase difference between current and the applied voltage will respectively be [AIIMS] 8V
10 V
[JIPMER]
(a)
1 LC
(b)
2
(c)
LC
1 2 LC
(d)
4 LC
2 If maximum energy is stored in a capacitor at t = 0, then find the time after which current in the circuit will be maximum. [AIIMS] L=25 mH
π (a) ms 2
C=10 µF
π (b) ms 4
(c) π ms
(d) 2 ms
3 A circuit when connected to an AC source of 12 V gives a current of 0.2 A. The same circuit when connected to a DC source of 12 V, gives a current of 0.4 A. The circuit is (a) series L-R (b) series R-C [NEET] (c) series L-C (d) series L-C-R 4 In an L-C-R series circuit, source voltage is 120 V and voltage in inductor 50 V and resistance is 40 V, then determine voltage in the capacitor. [AIIMS] (a) VC = 10 ( 5 − 8 2 ) (b) VC = 10 ( 5 + 8 2 ) (c) VC = 20 ( 5 + 8 2 )
(d) VC = 10 ( 5 + 7 2 )
2018 5 In a circuit L, C and R are connected in series with an alternating voltage source of frequency f. The current leads the voltage by 45°. The value of C is [AIIMS] 1 1 (b) (a) 2πf ( 2πfL + R ) πf ( 2πfL + R ) 1 1 (c) (d) 2πf ( 2πfL − R ) πf ( 2πfL − R )
VR
4 (a) 6 V, tan −1 3 5 (c) 6 V, tan −1 3
3 (b) 3 V, tan −1 4 (d) None of these
2017 7 A series R-C circuit is connected to AC voltage source. Consider two cases; (A) When C is without a dielectric medium and (B) When C is filled with dielectric of constant 4. The current I R through the resistor and voltageVC across the capacitor are compared in two cases. Which of the following is true? [AIIMS] A B A B (b) I R < I R (a) I R > I R (c) VCA < VCB
(d) None of these
2014 8 A 15.0 µF capacitor is connected to a 220 V, 50 Hz source.The capacitive reactance is (a) 220 Ω (b) 215Ω (c) 212 Ω (d) 204 Ω
9 In an L -C -R series circuit, the potential difference between the terminals of the inductance is 60 V, between the terminals of the capacitor is 30 V and that across the resistance is 40 V. Then, the supply voltage will be equal to [UK PMT] (a) 10 V (b) 50 V (c) 70 V (d) 130 V 10 A series L-C-R circuit contains inductance 5 mH, capacitance 2 µF and resistance 10 Ω. If a frequency AC source is varied, then what is the frequency at which maximum power is dissipated? [KCET] 105 10−5 (a) (b) Hz Hz π π 2 5 (d) × 103 Hz (c) × 105 Hz π π
623
ALTERNATING CURRENT
2013 11 For high frequency L - C circuit, the maximum charge on the capacitor is Q. The charge on the capacitor, when the energy is stored equally between the electric and magnetic fields is [Manipal] (a) Q/ 2 (b) Q/ 2 (d) Q/ 3 (c) Q/ 3
2012 12 In the circuit shown below, what will be the readings of the voltmeter and ammeter? (Total impedance of circuit, [JCECE] Z = 100 Ω)
18 In the case of an inductor (a) voltage lags the current by π/ 2 (b) voltage leads the current by π/ 2 (c) voltage leads the current by π/ 3 (d) voltage leads the current by π/ 4
[J&K CET]
19 When an AC voltage is applied to an L-C-R circuit, which of the following is true? [DUMET] (a) I and V are out of phase with each other in R (b) I and V are in phase in L with in C, they are out of phase (c) I and V are out of phase in both, C and L (d) I and V are out of phase in L and in phase in C 20 In the series L-C-R circuit shown, the impedance is
A
V 300 V
300 V 50 Hz ~ 220 V
(a) 200 V, 1 A (c) 100 V, 2 A
14 An AC voltage is applied to a resistance R and an inductor L in series. If R and the inductive reactance are both equal to 3 Ω, the phase difference (in rad) between the applied voltage and the current in the circuit is [CBSE AIPMT]
(b) π / 2
(c) zero
(d) π / 6
15 An electron revolves in the path of a circle of radius of 0.5 × 10−10 m at frequency of 5 × 1015 cycles/s. The electric current in the circle is (charge of an electron = 1.6 × 10−19 C ) [AFMC] (a) 0.4 mA (b) 0.8 mA (c) 1.2 mA (d) 1.6 mA 16 The capacity of a pure capacitor is 1F. In DC circuits, its effective resistance will be (a) infinite (b) zero 1 (c) 1 Ω (d) Ω 2 17 An L-C-R series circuit is under resonance. If I m is current amplitude,Vm is voltage amplitude, R is the resistance, Z is the impedance, X L is the inductive reactance and X C is the capacitive reactance, then [J&K CET]
(a) I m
V = m Z
(b) I m
C
R
1H
20 µF
300 Ω
[KCET]
(b) 800 V, 2 A (d) 220 V, 2.2 A
13 In an AC circuit, an alternating voltage e = 200 2 sin 100 t volt is connected to a capacitor of capacity 1µF. The rms value of the current in the circuit is [CBSE AIPMT] (a) 100 mA (b) 200 mA (c) 20 mA (d) 10 mA
(a) π /4
L
V V V = m (c) I m = m (d) I m = m XL XC R
50 V, 50 π Hz
(a) 200 Ω
(b) 100 Ω
(c) 300 Ω
(d) 500 Ω
2010 21 A capacitor of capacitance 1µF is charged to a potential of 1V. It is connected in parallel to an inductor of inductance 10–3 H. The maximum current that will flow in the circuit has the value [AIIMS] (b) 1 A (a) 1000 mA (c) 1 mA (d) 1000 mA
22 Assertion For an electric lamp connected in series with a variable capacitor and AC source; its brightness increases with increase in capacitance. Reason Capacitive reactance decreases with increase in capacitance of capacitor. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct. 0.4 23 In an L-R circuit, the value of L is H and the value π of R is 30 Ω. If in the circuit, an alternating emf of 200 V at 50 cycle /s is connected, the impedance of the circuit and current will be [Manipal] (a) 11.4 Ω, 17.5 A (b) 30.7 Ω, 6.5 A (c) 40.4 Ω, 5 A (d) 50 Ω, 4 A
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
24 In an L-C-R series, AC circuit at resonance, [Manipal] (a) the capacitive reactance is more than the inductive reactance (b) the capacitive reactance equals the inductive reactance (c) the capacitive reactance is less than the inductive reactance (d) the power dissipated is minimum
30 An inductor of 1 H is connected across a 220 V, 50 Hz supply. The peak value of the current is approximately (a) 0.5 A (b) 0.7 A [BCECE] (c) 1 A (d) 1.4 A 31 In the circuit shown in figure neglecting source resistance, the voltmeter and ammeter readings will be respectively,
25 In the figure shown, three AC voltmeters are connected. At resonance, [Kerala CEE] V1
C
V2
C R
R = 30 Ω
L
240 V
(a) 0 V, 3 A (c) 150 V, 6 A
(b) V1 = 0 (d) V1 = V2 ≠ 0
26 In an L-C-R circuit R = 100 Ω. When capacitance C is removed, the current lags behind the voltage by π / 3, when inductance L is removed, the current leads the voltage by π / 3. The impedance of the circuit is [Haryana PMT]
(a) 50 Ω
(b) 100 Ω
XL = 25 Ω XC = 25 Ω
A
V3
(a) V2 = 0 (c) V3 = 0 (e) V3 = V2 ≠ 0
[JCECE]
V
(c) 200 Ω
(d) 400 Ω
27 An inductor L, a capacitor of 20 µF and a resistor of 10 Ω are connected in series with an AC source of frequency 50 Hz. If the current is in phase with the voltage, then the inductance of the inductor is [Punjab PMET] (a) 2.00 H (b) 0.51 H (c) 1.5 H (d) 0.99 H 28 An ideal choke draws a current of 8 A when connected to an AC supply of 100 V, 50 Hz. A pure resistor draws a current of 10 A when connected to the same source. The ideal choke and the resistor are connected in series and then connected to the AC source of 150 V, 40 Hz. The current in the circuit becomes [KCET] 15 (a) A (b) 8 A (c) 18 A (d) 10 A 2 29 An inductive coil has a resistance of 100 Ω. When an AC signal of frequency 1000 Hz is applied to the coil, the voltage leads the current by 45°. The inductance of the coil is [BCECE] 1 1 (a) (b) 10 π 20 π 1 1 (d) (c) 40 π 60 π
(b) 150 V, 3 A (d) 0 V, 8 A
32 The impedance of a circuit, when a resistance R and an inductor of inductance L are connected in series in an AC circuit of frequency f, is [JIPMER] (a) R + 2π 2 f 2 L2
(b) R + 4π 2 f 2 L2
(c) R 2 + 4π 2 f 2 L2
(d) R 2 + 2π 2 f 2 L2
33 In a series L-C-R circuit, resistance R = 10 Ω and the impedance Z = 10 Ω. The phase difference between the current and the voltage is [JIPMER] (a) 0° (b) 30° (c) 45° (d) 60° 34 A sinusoidal voltage of peak value 300 V and an angular frequency ω = 400 rad/s is applied to series L-C-R circuit, in which R = 3 Ω, L = 20 mH and C = 625 µF. The peak current in the circuit is [MGIMS] (a) 30 2 A (b) 60 A (c) 100 A (d) 60 2 A 35 A circuit contains a capacitor and inductance each with negligible resistance. The capacitor is initially charged and the charging battery is disconnected. At subsequent time, the charge on the capacitor will [MGIMS] (a) increase exponentially (b) decrease exponentially (c) decrease linearly (d) remain constant 36 An L-C-R series circuit consists of a resistance of 10 Ω, a capacitor of reactance 60 Ω and an inductor coil. The circuit is found to resonate when put across a 300 V, 100 Hz supply. The inductance of coil is (Take, π = 3 ) (a) 0.1 H (b) 0.01 H [MGIMS] (c) 0.2 H (d) 0.02 H
625
ALTERNATING CURRENT
2009 37 Two inductors L1 and L2 are connected in parallel and a time varying current flows as shown in figure. Then, the [AIIMS] ratio of currents i1 /i 2 at any time t is L1
i1
i
i L2
i2
(a)
L1 L2
(b)
L2 L1
(c)
L12 ( L1 + L2 ) 2
(d)
L22 ( L1 + L2 ) 2
38 An alternating voltage E = 200 2 sin (100t ) is connected to 1 µF capacitor through AC ammeter. The reading of ammeter shall be [MHT CET] (a) 10 mA (b) 20 mA (c) 40 mA (d) 80 mA 39 Same current is flowing in two alternating circuits. The first circuit contains only inductance and the other contains only a capacitor. If the frequency of the emf of AC is increased, the effect on the value of the current will be [MHT CET] (a) increases in the first circuit and decreases in the other (b) increases in both the circuits (c) decreases in both the circuits (d) decreases in the first circuit and increases in the second circuit 40 In a pure inductive circuit, current π (a) lags behind emf by 2 π (b) leads the emf by 2 (c) lags behind by π (d) leads the emf by π
[Manipal]
41 An alternating current of rms value 10 A is passed through a 12 Ω resistor. The maximum potential difference across the resistor is [Manipal] (a) 20 V (b) 90 V (c) 169.68 V (d) None of these 42 220 V, 50 Hz AC is applied to a resistor. The instantaneous value of voltage is (b) 220sin 100πt (a) 220 2 sin 100πt (d) 220sin 50πt (c) 220 2 sin 50πt
[OJEE]
43 In a series resonant circuit, the AC voltage across resistance R, inductor L and capacitor C are 5 V, 10 V and 10 V respectively. The AC voltage applied to the circuit will be [Guj CET] (a) 10 V (b) 25 V (c) 5 V (d) 20 V
44 What is the value of inductance L for which the current is a maximum in a series L-C-R circuit with C = 10 µF and [MHT CET] ω = 1000 s − 1 ? (a) 100 mH (b) 1 mH (c) Cannot be calculated unless R is known (d) 10 mH 45 The instantaneous values of current and voltage in an AC circuit are given by I = 6sin (100 πt + π / 4 ) , [J&K CET] V = 5sin (100 πt − π / 4 ) , then (a) current leads the voltage by 45° (b) voltage leads the current by 90° (c) current leads the voltage by 90° (d) voltage leads the current by 45° 46 The following series L-C-R circuit, when driven by an emf source of angular frequency 70 k-rad/s, the circuit effectively behaves like [EAMCET] R L = 1 µH C = 100 µF
(a) purely resistive circuit (b) series R-L circuit (c) series R-C circuit (d) series L-C circuit with R = 0 47 An AC voltage is applied to a pure inductor L, drives a current in the inductor. The current in the inductor would be [DUMET] (a) ahead of the voltage by π/ 2 (b) lagging the voltage by π/ 2 (c) ahead of the voltage by π/ 4 (d) lagging the voltage by 3π/ 4
48 An electric heater rated 220 V and 550 W is connected to AC mains. The current drawn by it is [KCET] (a) 0.8 A (b) 2.5 A (c) 0.4 A (d) 1.25 A 49 A resistor and a capacitor are connected in series with an AC source. If the potential drop across the capacitor is 5 V and that across resistor is 12 V, then applied voltage is (a) 13 V (b) 17 V [KCET] (c) 5 V (d) 12 V 50 An L-C-R series circuit, connected to a source E, is at resonance. Then, [BCECE] (a) the voltage across R is zero (b) the voltage across R equals applied voltage (c) the voltage across C is zero (d) the voltage across C equals applied voltage 51 A choke is preferred to a resistance for limiting current in AC circuit, because [JCECE] (a) choke is cheap (b) there is no wastage of power (c) choke is compact in size (d) choke is a good absorber of heat
626
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2008 52 From figure shown below, a series L-C-R circuit connected to a variable frequency 200 V source. If C = 80 µF and R = 40 Ω, then the source frequency which drive the circuit at resonance is [VITEEE] C = 80 µF
L=5H R = 40 Ω
V = 200 volt
(a) 25 Hz
(b)
25 Hz π
(c) 50 Hz
(d)
50 Hz π
53 An AC source of angular frequency ω is fed across a resistor R and a capacitor C in series. The current registered is I. If now the frequency of source is changed to ω /3 (but maintaining the same voltage), the current in the circuit is found to be halved. Calculate the ratio of reactance to resistance at the original frequency ω . [AIIMS] 3 2 (a) (b) 5 5 1 4 (d) (c) 5 5 54 In non-resonant circuit, what will be the nature of the circuit for frequencies higher than the resonant frequency? [BHU] (a) Resistive (b) Capacitive (c) Inductive (d) None of these 55 A coil has an inductance of 0.7 H and is joined in series with a resistance of 220 Ω. When an alternating emf of 220 V at 50 Hz is applied to it, then the wattless component of the current in the circuit is [BHU] (a) 5 A (b) 0.5 A (c) 0.7 A (d) 7 A 56 What is the value of inductance L for which the current is a maximum in a series L-C-R circuit with C = 10 µF and ω = 1000 s −1 ? [UP CPMT] (a) 100 mH (b) 1 mH (c) Cannot be calculated unless R is known (d) 10 mH 57 In an L-C-R series AC circuit, if ω 0 is the resonant angular frequency, then the quality factor (Q-factor) is given by [Kerala CEE, Manipal] L (a) ω 0 L/ C (b) (1/ R ) C (c) ω 0C / R (d) L /ω 0 R (e) L / CR
58 The natural frequency of an L-C circuit is 125000 cycle/s, then the capacitor C is replaced by another capacitor with a dielectric medium of dielectric constant K. In this case, the frequency decreases by 25 kHz. The value of K is (a) 3.0 (b) 2.1 [EAMCET] (c) 1.56 (d) 1.7 59 A transistor-oscillator using a resonant circuit with an inductor L (or negligible resistance) and a capacitor C in series produce oscillations of frequency f. If L is doubled and C is changed to 4C, then the frequency will be [Haryana PMT] (a) f /4 (b) 8f (c) f / 2 2 (d) f /2 60 The natural frequency (ω 0 ) of oscillations in L-C circuit is given by [J&K CET] 1 1 (b) (a) LC 2π 2π LC 1 (c) (d) LC LC 61 In L-C-R series circuit, the resonance condition in terms of capacitive reactance ( X C ) and inductive reactance [J&K CET] ( X L ) is (a) X C + X L = 0 (b) X C = 0 (c) X L = 0 (d) X C − X L = 0 62 A 100 V, AC source of frequency 500 Hz is connected to an L-C-R circuit with L = 8.1 mH, C = 12. 5 µF, R = 10 Ω all connected in series as shown in figure. What is the quality factor of circuit? [BCECE] L
(a) 2.02 (c) 20.54
C
R
(b) 2.5434 (d) 200.54
63 In L-C-R resonant circuit, what is the phase angle φ ? (a) 90° (c) 0°
(b) 180° (d) 60°
[DUMET]
64 In R-C circuit, ω = 100 rad s −1 , R = 100 Ω, C = 20 µF. What is impedance? [DUMET] (a) 510 Ω (b) 200 Ω (c) 250 Ω (d) 300 Ω 65 In an AC circuit, a resistance of R ohm is connected in series with an inductor of self-inductance L. If phase angle between voltage and current be 45°, then the value of inductive reactance ( X L ) will be equal to [Guj CET] R R R (a) R (b) (c) (d) 8 4 2
627
ALTERNATING CURRENT
66 A reactance of a 25 µF capacitor at the AC frequency of 4000 Hz is [KCET] 5 (a) (b) 10 Ω Ω π 5 (c) Ω (d) 10 Ω π 67 In an L-C-R series AC circuit, the voltage across each of the components L, C and R is 50 V. The voltage across the L-C combination will be [JIPMER] (a) 50 V (b) 50 2 V (c) 100 V (d) zero
2007 68 The figure shows three circuits with identical batteries, inductors and resistance. Rank the circuits according to the currents through the battery just after the switch is closed, greatest first. [AIIMS] 1.
2.
3.
(a) i 2 > i 3 > i1 (c) i1 > i 2 > i 3
(b) i 2 > i1 > i 3 (d) i1 > i 3 > i 2
69 An inductive coil has a resistance of 100 Ω. When an AC signal of frequency 1000 Hz is applied to the coil, the voltage leads the current by 45°. The inductance of the coil is [AMU] 1 1 (a) (b) 10 π 20 π 1 1 (c) (d) 40 π 60 π 70 The reactance of a coil when used in the AC power supply (220 V, 50 Hz) is 50 Ω. The inductance of the coil is nearly [BHU] (a) 0.16 H (b) 0.22 H (c) 2.2 H (d) 1.6 H 71 An inductor of inductance L and resistor of resistance R are joined in series and connected by a source of frequency ω. Power dissipated in the circuit is R 2 + ω 2 L2 [UP CPMT] V 2R (a) (b) 2 2 2 V (R + ω L ) V (c) 2 2 2 R + ω L
(d)
R 2 + ω 2 L2 V2
72 In a circuit, the current lags behind the voltage by a phase difference of π / 2, the circuit will contain which of the following? [MHT CET] (a) Only R (b) Only C (c) R and C (d) Only L 73 In a choke coil, the reactance X L and resistance R are such that [RPMT] (a) X L = R (b) X L >> R (c) X L
and
VCA
=
> VCB .
8 (c) The capacitive reactance is XC = =
1 2π (50 Hz )(15.0 × 10−6 F)
= 212.3Ω ≈ 212Ω
9 (b) Given, VL = 60 V, VC = 30V, VR = 40 V According to L- C-R series circuit, we know that
VL
VC
+ –
In phasor diagram, VC and VL are in anti-phase to each other due to their 90° leading and lagging relationship with the circuit current I S .
VS
VR
VC
So,
VS = (VL − VC )2 + VR2
−8
2π 10
=
15
1 2π × 10−4
104 5 Hz = × 103 Hz 2π π
capacitance C, charge Q is 1 Q2 U = 2 C Since, energy is stored equally between electric and magnetic fields, 1 1 Q 2 E= 22 C Now,
Frequency, f = 50 Hz and voltage, V = 220 V. Voltmeter reading, Va = VR2 + (VL − VC )2 VR = V and VL = VC Va = 220 V 220 Ammeter reading, I a = = 2.2 A 100
But ∴
φ = 45° π ⇒ φ = rad 4 Q (b) Current, i = = Qf T
and ∴
C = 1µF 200 2 E = 200 V Erms = 0 = 2 2 ω = 100 rad/s 1 XC = ωC 1 = = 104 Ω 1 × 10−6 × 100
1 Q f = T
= 1.6 × 10−19 × 5 × 1015 = 0.8 mA
16 (a) In DC circuits, f = 0 XC =
17
1 1 ⇒ XC = = ∞ 2π (0)C 0
So, the effective resistance will be infinite. V (a) Here, I m = m is true. Z where, Z = ( X L − X C )2 + R 2
18 (b) In case of an inductor voltage leads the current by
π . 2
19 (c) I and V are out of the phase in both, C and L is true. 50 20 (d) X L = 2πfL = 2π × 1 = 100 Ω π
1 XC = = 2πfC
1 50 2π 20 × 10−6 π
= 500 Ω Impedance, Z = R 2 + ( X C − X L )2 = (300)2 + (400)2
13 (c) Given, e = 200 2 sin 100t, ∴
IS
Q Q′ 2 1 Q 2 = ⋅ ⇒ Q′ = 2C 2 2C 2
12 (d) Given, impedance, Z = 100 Ω
VL – VC
θ
1 2π 5 × 10−3 × 2 × 10−6 1
φ = tan −1 (1)
⇒
11 (b) Energy stored in a capacitor of
1 2πνC
VR
=
Erms XC
200 = 2 × 10−2 A 104 = 20 mA X Lω (a) tan φ = L = R R 3Ω ⇒ tan φ = 1 ⇒ tan φ = 3Ω ∴
where , L = 5 × 10−3 H
… (ii) Hence, from above Eqs. (i) and (ii), we conclude that because numerator of I RB is increased from I RA by a factor of 2. I RA
14
Resonant frequency is given by 1 f0 = 2π LC and
irms = =
= 900 + 1600 = 2500
For circuit B,
I RB
∴
= 500 Ω
21 (a) Charge on the capacitor, q0 = CV = 1 × 10−6 × 1 = 10−6 C Here, q = q0 sinωt or I 0 = ωq0 = maximum current Now, ω =
1 1 = = (109 )1/ 2 LC 10−9
631
ALTERNATING CURRENT
L = 10−3 H, C = 10−6 F ∴
tan φ =
I 0 = (109 )1/ 2 × (1 × 10−6 ) = 1000 mA
1 . ωC When capacitance C increases the capacitive reactance decreases. Due to decrease in its values, the current in the E circuit will increase I = 2 2 R + XC and hence brightness of source (or electric lamp) will also increase.
⇒
22 (a) Capacitive reactance X C =
∴
100 = 10Ω 10 Inductive reactance, X L = 2πfL 100 = 2π × 50 × L 8 1 H ⇒ L= 8π X L′ = 2πf ' L 1 = 2π × 40 × = 10 Ω 8π Impedance of the circuit,
0.4 = 40 Ω π
Vrms 200 = =4A Z 50
Z = R 2 + X ′L2
24 (b) The impedance of a series L-C-R circuit is
= (10)2 + (10)2
Z = ( X L − X C )2 + R 2
= 10 2 Ω
At resonance (series resonant circuit), X L = XC ⇒ Zmin = R, i.e. circuit behaves as resistive circuit.
25 (a)
V1
29
V2 C
R
L
V3
At resonance,X L = X C , hence V2 = 0.
26 (b) When C is removed, circuit becomes R-L circuit. π X ....(i) Hence, tan = L 3 R When L is removed, circuit becomes R-C circuit. π X ...(ii) Hence, tan = C 3 R From Eqs. (i) and (ii), we get X L = X C , this is the condition of resonance, Z = R = 100 Ω.
27 (b) In an L-C-R circuit, the current and the voltage are in phase (φ = 0), when
1 (314 s−1 )2 × (20 × 10−6 F)
28 (a) Resistance, R =
Z = R 2 + X L2
irms =
L=
= 0.51H
= (30)2 + (40)2 = 50 Ω and
1 1 ⇒L= ωC 2 ω C
and C = 20 µF = 20 × 10−6 F
R = 30Ω ⇒
R
1 ωC = 0
Here, ω = 2πf = 2 × 3.14 × 50 s−1 = 314 s−1
23 (d) Given, X L = ωL = 2πfL = 2π × 50 ×
ωL =
ωL −
Current in the circuit, V 150 15 A i= = = Z 10 2 2 X (b) tan φ = L R Lω ∴ tan 45° = R R [Q tan 45° = 1] L= ⇒ ω 100 [Qω = 2πf ] = 2π × 1000 1 = 20 π
30 (c) Current (i0) = E0 / X L E0 220 × 2 = Lω 1 × 2π × 50 220 × 2 220 × 2 = = = 1A 100π 100 × 3.14
⇒ i0 =
31 (d) The voltages VL and VC are equal and opposite, so voltmeter reading will be zero. Also, R = 30 Ω , X L = X C = 25 Ω
V
i=
So,
=
2
R + ( X L − X C )2 V 240 = =8A R 30
32 (c) In L-R circuit, Impedance, Z = R 2 + X L2 X L = ωL = 2πfL
Here,
Z = R 2 + 4π 2 f 2L2
⇒
33 (a) Impedance, Z = R 2 + ( X L − X C )2 10 = (10)2 + ( X L − X C )2
∴
100 = 100 + ( X L − X C )2 ...(i) ⇒ X L − XC = 0 Let φ is the phase difference between current and voltage. X L − XC ∴ tan φ = R 0 [from Eq. (i)] tan φ = ⇒ R ∴ φ = 0°
34 (b) The impedance of the circuit, Z = R 2 + ( X L − X C )2 ⇒ X L = ωL = 400 × 20 × 10−3 = 8 Ω XC =
1 1 = =4 Ω ω C 400 × 625 × 10−6
Z = (3)2 + (8 − 4 )2 = 5 ⇒
i=
E 300 = = 60 A Z 5
35 (d) When a charged capacitor of negligible resistance is connected with a non-resistive inductor, the charge across it is converted into emf across inductor and then the emf back into the charge on capacitor. This process continues and oscillations are produced called L-C oscillations. Thus, the amount of charge on the capacitor remains same as there is no loss of energy.
36 (a) Given, frequency, f = 100 Hz Angular velocity, ω 0 = 2 πf = 2 π × 100 ω 0 = 2 × 3 × 100 (Q π = 3) = 600 rad / s 1 Further ω 0 = ....(i) LC 1 Also, XC = = 60 Ω Cω 0
632
⇒
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
C =
1 1 = ω 0 × 60 600 × 60
Now, maximum potential difference = Erms × 2 = 120 × 2
1 C = F ⇒ 36 × 103 So, put this values in Eq. (i), we get 1 600 = 1 L 36 × 103 36 × 103 ⇒ 36 × 10 = L 4
∴
L=
Now,
…(i)
E = 220 sin 2 × π × 50t = 220 sin 100 πt VC = 10 V
and
In the L-C-R circuit, the AC voltage applied to the circuit will be
= 105 rad/s
49 (a) Let the applied voltage be V volt. R
C
44 (a) Current in L-C-R series circuit is given by
200 2 × 100 × (1 × 10 ) 2
= 2 × 10− 2 A = 20 mA
39 (d) We know that current in purely inductive circuit and purely capacitive circuit is given by respectively, E I L = 0 sin (ωt − π / 2) ωL E0 and IC = sin (ωt + π / 2) 1/ ωC = E0 sin (ωt + π / 2) × ωC Here, ω is the frequency of the alternating current. Thus, current will decrease in the first circuit and increase in second circuit.
40 (a) In a pure inductive circuit, current
R = 12 Ω Erms = I rms × R = 10 × 12 = 120 V
1 10−10
× 1 × 10−6
= (5)2 + (10 − 10)2 = 5 V
i=
−6
41 (c) Given, I rms = 10 A
100 × 10
current I lags behind the alternating voltage E by a phase angle of 90°, i.e. by π /2 . P 550 (b)Q P = VI ⇒ I = = = 2.5 A V 220
V = VR2 + (VL − VC )2
V V ωC = rms = 0 XC 2
π or 90°. 2
1 −6
47 (b) In an AC circuit L only , alternating
48
T/4
1 LC
Now, given ω = 70 k-rad/s = 70000 rad/s Here, ω0 > ω Thus, the circuit is capacitive dominant circuit. The circuit effectively behaves like series R-L circuit.
…(ii)
38 (b) Reading of ammeter
lags behind the emf by
=
i
E cosωt ωL2 = 0 × ωL1 E0 cosωt ωL L = 2 = 2 ωL1 L1
and ∴
E = E0 sinωt But ω = 2πν …(i) ∴ E = E0 sin 2πνt Given, E0 = 220 V and ν = 50 Hz
43 (c) Given, VR = 5 V, VL = 10 V
i1 E E = 0 cosωt ÷ 0 cosωt i2 ωL1 ωL2
= I rms
=
voltage,
36 × 10 1 = = 0.1 H 36 × 104 10
E0 cosωt ωL2
=
= 169.68 V
On putting these values in Eq. (i), we get
E i1 = 0 cosωt ωL1 i2 =
ω0 =
42 (b) We know that, instantaneous
3
37 (b) We know that,
and
46 (b) Resonance frequency,
V R 2 + ( X L − X C )2
where, V is rms value of current, R is resistance, X L is inductive reactance and X C is capacitive reactance. For current to be maximum, denominator should be minimum which can be done, if X L = X C . This happens in resonance state of the circuit, 1 1 …(i) ωL = ⇒ L= 2 i.e. ωC ωC Given, ω = 1000 s
−1
C = 10 µF = 10 × 10−6 F.
and Hence, L=
1 = 0.1 H (1000) × 10 × 10−6 2
= 100 mH
45 (c) The phase difference between instantaneous value of I and V is π π π − − = 4 4 2 Hence, current leads the voltage by 90°.
Here, VR = 12 V, VC = 5 V ∴
V = VR2 + VC2 = (12)2 + (5)2 = 144 + 25 = 169 = 13 V
50 (b) Equation of voltage, E = VR2 + (VL − VC )2 At resonance (series circuit), VL = VC ⇒ E = VR i.e. whole applied voltage appeared across the resistance.
51 (b) In an AC circuit, the coil of high inductance and negligible resistance used to control current, is called the choke coil. The power factor of such a coil is given by R R cos φ = ≈ 2 2 2 ω L R +ω L (as R > R circuit is Z = X L − X C
i′
= 104 + 25 × 104
73 (b) To decrease current in an AC
65 (a) The phasor diagram in L-R circuit is given below. Therefore,
B E VL φ I
VR
E R1
In circuit (3), on closing the switch, the current in the inductor is again zero due to the same reason.
VL
O
i2 = i′ =
A
R1
i
i′
Given, the phase angle between voltage and current φ = 45° V IX So, tan φ = L = L VR IR
66
Here, X L = inductive reactance X ⇒ tan 45° = L R XL 1= ⇒ XL = R ⇒ R (c) Capacitive reactance, 1 XC = 2πfC Here, f = 4000Hz, C = 25 × 10−6 F = ∴
XC =
1 2π × 4000 × 25 × 10−6 5 Ω π
67 (d) In an L-C-R series AC circuit, the voltage across inductor L leads the current by 90° and the voltage across capacitor C lags behind the current by 90°. VL
90° i 90°
VR
VC
Hence, the voltage across L-C combination will be zero.
R2
E
Therefore, i3 = i′ =
69
E R1 + R2
Thus, it is obvious that, i2 > i3 > i1 (= 0). X (b) tan φ = L R Lω ⇒ tan 45° = R R L= (Q tan 45° = 1) ⇒ ω 100 1 = = 2 π (1000) 20π
70 (a) Reactance of the coil or inductive reactance is given as X L = ω L = 2πfL where, f is frequency. Given, X L = 50Ω, f = 50 Hz 50 X X L= L = L = ∴ ω 2 πf 2π × 50 =
1 = 0.16 H 2 × 3.14
71 (b) P = VI cos φ 2 V 2R V R V R =V = 2 = 2 Z Z (R + ω 2L2 ) Z
72 (d) When a circuit contains inductance only, then the current lags behind the π voltage by the phase difference of 2 or 90°.
C
When X L = X C , then Z = 0. In this situation, the amplitude of current in the circuit would be infinite. It will be the condition of electrical resonance and frequency is given by 1 f = 2π LC 1 = 10 × 10−3 2 × 3.14 × × 0.25 × 10−6 = 3184.7 cycle s−1 Also, frequency =
velocity wavelength
λ=
c 3 × 108 = 3184.7 f
⇒
= 9.42 × 104 m
75 (a) Impedance of L-C-R series circuit is given by Z = R 2 + ( X L − X C )2 At resonance, X L = X C ⇒ Z = R
76 (d) In L-C-R series circuit, resonance occurs when X L = XC 1 1 ωL = ⇒ ω2 = ⇒ ωC LC 1 1 ⇒ 2πf0 = ω= ⇒ LC LC 1 ⇒ f0 = 2π LC 1 ∴ f0 ∝ C When capacitance of the circuit is made 4 times, let its resonant frequency become f0′. f0′ C ∴ = f0 4C f0 or f0′ = 2
635
ALTERNATING CURRENT
Across C, VC = iX C = 2 × 11 = 22 V So, potential difference across series combination of L and C = VL − VC = 30 − 22 = 8 V
77 (d) Resistance of bulb, V 2 (100)2 = = 200Ω P 50 Current through bulb, V 100 I = = = 0.5A R 200 In a circuit containing inductive reactance ( X L ) and resistance (R), impedance (Z ) of the circuit is R=
Z = R 2 + ω 2L2 Here, Now,
80 (a) Since, current lags behind the voltage in phase by a constant angle, then circuit must contain R and L.
81 (a) From the formula, the frequency of …(i)
200 Z= = 400 Ω 0.5
≈ 1007 Hz
82 (d) Energy of charged capacitor =
X L2 = Z 2 − R 2 = (400)2 − (200)2
⇒ (2πfL)2 = 12 × 104 ∴
L=
2 3 × 100 2 3 = = 1.1 H 2π × 50 π
78 (b) The phase angle (θ ) between I and
= 2 π × 50 ×
Energy generated across inductor coil 1 1 E = CV 2 = Li 2 2 2 Given, C = 16µF = 16 × 10−6 F, and
V = 20 V L = 40 mH = 40 × 10−3 H
1 × 16 × 10−6 × (20)2 2 1 = × 40 × 10−3 × i 2 2 16 2 ⇒ i = ⇒ i = 0.4 A 100
…(i) 200 × 10−3 π
= 20 Ω 1× π 1 XC = = 2πfC 2π × 50 × 10−3
= 10 Ω and R = 10 Ω On substituting values of X L , X C and R in Eq. (i), we get 20 − 10 tanθ = =1 10 π π ⇒ tan θ = tan ⇒θ = 4 4 So, the phase angle of the circuit is π / 4.
83 (a) The phase difference, tan φ =
=
X L = ωL = 2 πfL = 2 π × 50 × 0.01 = π Ω Also, R = 1 Ω ⇒ φ = tan −1 (π )
84 (d) For an L-C-R circuit, the
L
L
C
R
Z = R + ( X L − XC )
2
where, X L = ωL = 2πfL 1 1 and X C = = ωC 2πfC
and
∴The frequency, f =
R
1 2π
1 LC
C , L1 = L 4 Now, the frequency will be 1 1 f ′= 2π C L2 ⋅ 4
2
Given, f =
C
Given, C =
impedance (Z ) is given by
R + ( X L − X C )2
Since, L, C and R are connected in series combination, then potential difference across R is VR = iR = 2 × 3 = 6 V Across L, VL = iX L = 2 × 15 = 30 V
E
XL R
Vrms
10 10 = =2A 9 + 16 5
Capacitive reactance, 1 XC = ωC XL ωL ⇒ = = ω 2LC X C 1/ωC
and
2
Given, R = 3Ω, X L = 15Ω, X C = 11Ω and Vrms = 10 V 10 i= ∴ 2 (3) + (15 − 11)2
85 (a) Inductive reactance, X L = ωL
the frequency of the applied emf should be equal to the natural frequency of the circuit when the resistance of the circuit is zero.
79 (a) Current through the circuit, i=
= 90000 + 160000 = 500 Ω Hence, current in circuit is given by V 50 i= = = 0.1 A Z 500 Voltage across capacitor, i VC = iX C = 2πfC 0.1 = 50 2π × × 20 × 10−6 π 0.1 × 106 = 50 V = 100 × 20
86 (d) The condition for resonance is that
∴
V is given by
X − XC tanθ = L R where, X L = 2πfL
oscillation is 1 1 f = = 2π LC 2π 0.25 × 0.1 × 10−6
= 90000 + (100 − 500)2
Since, f ′ = f ⇒ L2 = 4 L Hence, inductance should be made 4 times.
87 (b) At resonance, X L = X C 1 1 or ω r = ω rC LC 1 1 2πfr = ⇒ fr = LC 2π LC LC = constant (as ν remains same) L2 C 1 L2 C or = = L1 C 2 L 2C L L2 = 2
i.e. ω r L =
50 Hz, R = 300 Ω, L = 1 H π −6
C = 20 µC = 20 × 10 C.
50 ×1 2π × π 1 ∴ Z = (300)2 + − 50 2π × × 20 × 10−6 π
⇒ or ∴ or
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
88 (d) tan φ =
X L ωL 2πfL = = R R R
⇒ tan φ = ⇒
2 × 3.14 × 50 × 0.5 =1 157
Z = R 2 + ( X L − X L )2 = R (Q X L = X C ) Z = 25 Ω (Q R = 25 Ω )
or ∴
91 (b) The frequency of oscillation of L-C
93 (a) The given equation, e = 300 sin [(100π ) t ]volt
circuit is given by
φ = 45° ω ω = ω 2 − ω 1 2π ( f2 − f1 )
1 1 or LC = 2π LC 4π 2 f 2 1 L= 4 π 2 f 2C
⇒
1 LC 1 1 ⇒ Q= × 2π LC ( f2 − f1 ) 1 1 0.4 = × −6 1.3 × 103 2π L × 0.1 × 10
but ω =
Given,
⇒ L=
C = 0.3 pF = 0.3 × 10−12 F 1 ∴ L= 22 22 4× × × (106 )2 7 7 × 0.3 × 10−12 490 = 4 × 484 × 3 × 1012 × 10−12
f = 1 MHz = 1 × 106 Hz
⇒
1 4 π 2 (0.4 × 1.3 × 103 )2 × 0.1 × 10−6
94 (b) Capacitive reactance ( X C ) is given by X C = 1/ωC where, ω is angular frequency and C the capacitance. Also, ω = 2πf , where f is frequency. In a DC circuit, f = 0 ⇒ ω=0 1 XC = = ∞ ⇒ 0
= 0.0844 H = 84.4 mH
92 (c) For better tuning, peak of current
= 0.94 H
growth must be sharp. This is ensured by a high value of quality factor Q. Now, quality factor is given by
90 (b) The impedance of the L-C-R circuit is given by Z = R 2 + ( X L − X C )2
Q=
1 R
…(i)
We know that, … (ii) e = e0 sinωt On comparing Eqs. (i) and (ii), we get e0 = 300 V and R = 100Ω The rms current through the circuit irms = ? e 300 3 irms = 0 = = A 2R 2 × 100 2
f =
89 (b) Quality factor, Q=
From the given options, highest value of Q is associated with R = 15 Ω, L = 3.5 H and C = 30 µF.
L C
Topic 3 Growth and Decay of Current 2019 1
2016 3 An inductor of inductance L = 400 mH and resistors of
12 kΩ 5 µF 9V
15 kΩ 5kΩ
resistances R1 = 4 Ω and R 2 = 2 Ω are connected to battery of emf 12 V as shown in the figure. The internal resistance of the battery is negligible. The switch S is closed at t = 0. The potential drop across L as a function of time is [AIEEE]
In the given circuit, find charge on capacitor after 1s of opening the switch at t = ∞. [AIIMS] (a) 20 e −10 µC (b) 25 e −10 µC (c) 30 e −10 µC (d) 35 e −10 µC
A L R1
2018 2 An ideal coil of 10 H is connected in series with a resistance of 5Ω and a battery of 5 V. After 2 s, after the connection is made, the current flowing (in ampere) in the circuit is [AIIMS] (a) (1 − e ) (b) e (c) e −1 (d) (1 − e −1 )
R2
S
(a) 6e −5t V (c) 6(1 − e − t / 0. 2 ) V
12 −3t e V t (d) 12e −5t V (b)
637
ALTERNATING CURRENT
2010 4 A coil of resistance R and inductance L is connected to a
2007 7 In an L-R circuit, time constant is that time in which
battery of emf e volt. The final current in the coil is [VMMC] e e (a) (b) R L e eL (d) (c) 2 2 2 R +L R + L2
current grows from zero to the value (b) 0.50 I 0 (a) 0.63 I 0 (d) I 0 (c) 0.37 I 0 where, I 0 is steady state current.
8 A coil of 40 H inductance is connected in series with a resistance of 8 Ω and this combination is connected to the terminals of 2 V battery. The inductive time constant of the circuit is (in second) [EAMCET] (a) 40 (b) 20 (c) 5 (d) 0.2
2008 5 When the key K is pressed at t = 0, which of the following statements about the current I in the resistor AB of the given circuit is true? [AIIMS] A 2V
[RPMT]
9 The inductive time constant in an electrical circuit is
1000 Ω
[CG PMT]
K 1µF
C
L (b) R
(a) LR
1000 Ω
(a) I = 2 mA at all t (b) I oscillates between 1 mA and 2 mA (c) I = 1mA at all t (d) At t = 0, I = 2 mA and with time, it goes to 1 mA 6 A coil of inductance 300 mH and resistance 2 Ω is connected to a source of voltage 2 V. The current reaches half of its steady state value in [UP CPMT] (a) 0.05 s (b) 0.1 s (c) 0.15 s (d) 0.3 s
(c)
L R
10 Time constant of L-C circuit is 1 1 LC (a) (b) (c) 2 2 2 π LC 2π 2πL C 2005
R (d) L [BVP]
(d) 2 π LC
11 In order to obtain time constant of 10 s in an R-C circuit containing a resistance of 103 Ω, the capacity of the condenser should be [DUMET] (a) 10 µF (b) 100 µF (c) 1000 µF (d) 10000 µF
Answers 1 (b)
2 (d)
3 (d)
4 (a)
5 (d)
6 (b)
7 (a)
8 (c)
9 (b)
10 (d)
11 (d)
Explanations 1 (b) At t → ∞, capacitor Works as an open circuit as shown in the figure. I1
9V
12 kΩ
15 kΩ
V0
∴Charge on capacitor of 5 µF, q0 = CV0 = 5 × 10−6 × 5 = 25 × 10−6 C = 25 µC When switch is open, then capacitor starts discharging across (5 + 15 = 20 k Ω) and instantaneous charge on capacitor is given by q = q0 e− t / RC −
Therefore, current flow in the circuit, 9 1 I1 = = × 10–3 A (12 + 15 )103 3 ∴ V0 = I 1 × 15 × 103 =
1 × 10−3 × 15 × 103 = 5 V 3
= 25 e
E 5 = =1A R 5 L 10 Now, τ = = = 2s R 5 After 2 s, i.e. at t = 2 s where, I 0 =
Rise of current, I = (1 − e−1 ) A
3 (d) l1 =
1 20× 103 × 5 × 10−6
[Q t = 1s]
= 25 e−10 µC
2 (d) Rise of current in L-R circuit is given by I = I 0(1 − e− t / τ )
F 12 = = 6A R1 2
E=L
dl2 + R2 × l2 dt
I 2 = I 0 (1 − e− t / tc ) ⇒ I0 =
E 12 = =6A R2 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
L 400 × 10−3 = = 0.2 R 2
⇒
tc =
∴
I 2 = 6 (1 − e− t / 0. 2 )
⇒
I0 = I 0 (1 − e− Rt / L ) 2
or I = I 0 1 − or I = 0.63I 0
8 (c) Time constant of L-R circuit,
Potential drop across inductor L = E − R2 I 2
t=
= 12 − 2 × 6(1 − e− bt ) = 12e−5t V
2V
⇒
4 (a) Final current is constant and L plays no role at that instant. Therefore, i = e/ R.
5 (d) At time, t = 0, i.e. when capacitor is charging , 2 = 2 mA 1000 When capacitor is full charged, no current will pass through it, hence current through the circuit, 2 I = = 1 mA 2000 Current, I =
6 (b) The current at any instant is given by I = I 0 (1 − e− Rt / L )
1 e
⇒ ∴
1 = (1 − e− Rt / L ) 2 Rt e− Rt / L = 1 / 2 ⇒ = ln 2 L
L has got dimensions of time and is R known an inductive time constant.
9 (b)
10 (d) For an L-C circuit, resonant frequency
L 300 × 10−3 t = ln 2 = × 0.693 R 2 = 150 × 0.693 × 10−3 = 0.1 s
7 (a) The equation for growth of current in L-R circuit is given by I = I 0 (1 − e− t / τ ) L Here, τ = is called time constant of R the L-R circuit. At a time equal to one time constant, i.e. at t = τ, I = I 0 (1 − e−1 )
L 40 = =5s R 8
=
1 2π LC
Therefore, time constant is 2π LC .
11 (d) In an R-C circuit, the product
τ c = CR is the capacitive time constant of the circuit. Given, τ c = 10 s, R = 103 Ω τc R 10 = 3 = 10−2 F 10 = 10000µF
∴ C =
Topic 4 Transformer 2019 N 50 1 A transformer with turns ratio 1 = is connected to a N2 1 120 V AC supply. If primary and secondary circuit resistances are 15 . kΩ and 1Ω respectively, then find out power of output. [AIIMS] (a) 5.76 W (b) 11.4 W (c) 2.89 W (d) 7.56 W
2014 2 A transformer having efficiency of 90% is working on 200V and 3 kW power supply. If the current in the secondary coil is 6 A, then the voltage across the secondary coil and the current in the primary coil respectively, are [CBSE AIPMT] (a) 300 V, 15 A (b) 450 V, 15 A (c) 450 V, 13.5 A (d) 600 V, 15 A
3 Transformer is used to (a) convert AC to DC voltage (b) convert DC to AC voltage (c) obtain desired DC power (d) obtain desired AC voltage and current (e) obtain desired DC voltage and current
[Kerala CEE]
4 A step-up transformer operates on a 230 V line and supplies a current of 2 A. The ratio of primary and secondary windings is 1 : 25. The primary current is [UK PMT] (a) 12.5 A (b) 50 A (c) 8.8 A (d) 25 A 5 A step-down transformer has 50 turns on secondary and 1000 turns on primary winding. If a transformer is connected to 220 V, 1 A AC source, then what is output current of the transformer? [KCET] (a) (1/20) A (b) 20A (c) 100A (d) 2A
639
ALTERNATING CURRENT
2013 6 Which quantity is increased in step-down transformer? (a) Current (c) Power
(b) Voltage (d) Frequency
[UP CPMT]
2012 7 A transformer of 100% efficiency has 200 turns in the primary and 40000 turns in secondary. It is connected to a 220 V main supply and secondary feeds to a 100 kΩ resistance. The potential difference per turn is [AIIMS] (a) 1.1 V (b) 25 V (c) 18 V (d) 11 V
8 In a step-up transformer, the turns ratio is 1 : 2. A Leclanche cell (emf = 15 . V) is connected across the primary. The voltage developed in the secondary would be [UP CPMT] (a) 3 V (b) 0.75 V (c) 1.5 V (d) zero 9 A transformer works on the principle of (a) self-induction (b) electrical inertia (c) mutual induction (d) magnetic effect of the electrical current
[KCET]
2011 10 A transformer has 500 primary turns and 10 secondary turns. If the secondary has a resistive load of 15 Ω, the currents in the primary and secondary respectively, are
[DUMET]
(a) 0.16A, 3.2 × 10−3 A (b) 3.2 × 10−3 A, 0.16 A (c) 0.16A, 0.16 A (d) 3.2 × 10−3 A, 3.2 × 10−3 A
2008 11 A transformer is used to light a 100 W and 110 V lamp from a 220 V mains. If the main current is 0.5 A, then the efficiency of the transformer is approximately [UP CPMT] (a) 30 % (b) 50 % (c) 90 % (d) 10 %
12 The primary and secondary coils of a transformer have 50 and 1500 turns, respectively. If the magnetic flux φ linked with the primary coil is given by φ = φ 0 + 4t, where φ is in weber, t is time in second and φ 0 is a constant, then the output voltage across the secondary coil is [RPMT] (a) 90 V (b) 120 V (c) 220 V (d) 30 V 13 The core of a transformer is laminated because [Haryana PMT]
(a) energy losses due to eddy currents may be minimised (b) the weight of the transformer may be reduced (c) rusting of the core may be prevented (d) ratio of voltages in primary and secondary may be increased
14 In step-up transformer, relation between number of turns in primary ( N p ) and number of turns in secondary ( N s ) coils is [J&K CET] (a) N s is greater than N p (b) N p is greater than N s (d) N p = 2N s (c) N s is equal to N p 15 A transformer has 1500 turns in the primary coil and 1125 turns in the secondary coil. If the voltage in the primary coil is 200 V, then the voltage in the secondary coil is [EAMCET] (a) 100 V (b) 150 V (c) 200 V (d) 250 V 16 A current of 5 A is flowing at 220 V in the primary coil of a transformer. If the voltage produced in the secondary coil is 2200 V and 50% of power is lost, then the current in secondary will be [KCET] (a) 2.5 A (b) 5 A (c) 0.25 A (d) 0.5 A
2007 17 A step-down transformer reduces the voltage of a transmission line from 2200 V to 220 V. The power delivered by it is 880 W and its efficiency is 88%. The input current is [KCET] (a) 4.65 mA (b) 0.045 A (c) 0.45 A (d) 4.65 A
18 Voltage in the secondary coil of a transformer does not depend upon [BCECE] (a) frequency of the source (b) voltage in the primary coil (c) ratio of number of turns in the two coils (d) Both (b) and (c) 19 When power is drawn from the secondary coil of the transformer, the dynamic resistance [JCECE] (a) increases (b) decreases (c) remains unchanged (d) changes erratically
2006 20 Core of a transformer is made up of (a) soft iron (b) steel
(c) iron
[Punjab PMET]
(d) alnico
2005 21 The turns ratio of a transformer is given as 2 : 3. If the current through the primary coil is 3 A, thus calculate the current through load resistance. [BHU] (a) 1 A (b) 4.5 A (c) 2 A (d) 1.5 A
22 A transformer with efficiency 80% works at 4 kW and 100 V. If the secondary voltage is 200 V, then the primary and secondary currents are respectively, (a) 40 A, 16 A (b) 16 A, 40 A [Kerala CEE] (c) 20 A, 40 A (d) 40 A, 20 A (e) 40 A, 10 A
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
23 The number of turns in primary and secondary of a transformer are 5 and 10 and mutual inductance of transformer is 25 H. Now, if the number of turns in primary and secondary are 10 and 5, the new mutual inductance will be [RPMT] (a) 6.25 H (b) 12.5 H (c) 25 H (d) 50 H
25 If a transformer of an audio amplifier has output impedance 8000 Ω and the speaker has input impedance of 8 Ω, the primary and secondary turns of this transformer connected between the output of amplifier and to loudspeaker should have the ratio [JCECE] (a) 1000 : 1 (b) 100 : 1 (c) 1 : 32 (d) 32 : 1 26 The coefficient of mutual inductance between the primary and secondary coils of transformer is 5 H. A current of 10 A is cut-off in 0.5 s. The induced emf is [JCECE] (a) 1 V (b) 10 V (c) 5 V (d) 100 V
24 Quantity that remains unchanged in a transformer is (a) voltage (b) current [J&K CET] (c) frequency (d) None of these
Answers 1 (a)
2 (b)
3 (d)
4 (b)
5 (b)
6 (a)
7 (a)
8 (d)
9 (c)
10 (b)
11 (c)
12 (b)
13 (a)
14 (a)
15 (b)
16 (c)
17 (c)
18 (a)
19 (a)
20 (a)
21 (c)
22 (a)
23 (c)
24 (c)
25 (a)
26 (d)
Explanations 1 (a) Given, turn ratio of a transformer,
⇒
N 1 = 50N 2 N 1 V1 Since, = N 2 V2 50 =
120 [V1 = 120 V (given)] V2
12 V V2 = ⇒ 5 Output power at secondary coil, Ps =
V22 R2
3 (d) Transformer is used to obtain desired AC voltage and current, because a transformer is a device based on the principle of mutual induction, which is used for converting large AC at low voltage into small current at high voltage and vice-versa.
N 1 50 = N2 1
[R2 = 1Ω (given)] 2
12 5 144 = = 1 25 = 5.76 W
V1 I 2 N 1 = = V2 I 1 N 2 where, all the symbols have their usual meanings. (Suffix 1 is for primary and 2 is for the secondary) N1 1 2 = = ⇒ N 2 25 I where, I = primary side current. I = 50 A
5 (b) We know that,
2 (b) Initial power = 3 kW= 3000 W As efficiency is 90%, then final power 90 = 3000 × = 2700 W 100 ...(i) ⇒ V1I 1 = 3000 W V2I 2 = 2700 W
4 (b) As we know that, for transformer,
…(ii)
So,
V2 =
2700 900 = = 450 V 6 2
and
I1 =
3000 = 15 A 200
Power in the secondary coil = Power in the primary coil Vs × N p = Vp × N s N s Vs ⇒ = N p Vp where, Vs = voltage across secondary coil, Vp = voltage across primary coil, N p = number of turns is primary coil and N s = number of turns in secondary coil.
Given, N s = 50 turns, N p = 1000 turns Vp = 220 V, I s = ? 50 V = s 1000 220 50 × 220 ⇒ Vs = = 11 V 1000 But Vs I s = Vp I p ⇒ 11 × I s = 220 × 1 I s = 220 / 11 = 20 A
6 (a) In step-down transformer, voltage decreases and corresponding current increases.
7 (a) From transformer ratio, Vs N s = Vp N p ⇒
Vs = =
Vp × N s Np 220 × 40000 = 44000 V 200
Potential difference per turn is Vs 44000 = = 1.1 V N s 40000
8 (d) Transformer is an AC device, which work on varying voltage, but Leclanche cell is a DC source with fixed voltage or emf. So, there is no voltage developed across secondary, i.e. it is zero.
641
ALTERNATING CURRENT
9 (c) A transformer works on the 10
principle of mutual induction. ip ip N 10 (b) We have, s = ⇒ = Np is 500 is ip
⇒
is
=
1 ⇒ is = 50ip 50
This condition is satisfied only when current in primary is 3.2 × 10−3 A and in secondary 0.16 A.
11 (c) Efficiency of transformer, η=
Output power Vs I s = Input power Vp I p
Given, Vs I s = 100 W, Vp = 220 V, I p = 0. 5 A 100 Hence, η = = 0.90 or 90% 220 × 0.5
15 (b) By the relation,
Given, N 1 = 1500 turns, N 2 = 1125 turns and V1 = 200 V 1500 200 = ∴ 1125 V2 ⇒
Also, we have, N p = 50 and N s = 1500 Vs N s From relation, = Vp N p ⇒ Vs = Vp
Ns 1500 = 4 = 120 V 50 Np
13 (a) When magnetic flux linked with a
200 × 1125 V2 = = 150 V 1500
16 (c) Given, Vp = 220 V, Vs = 2200 V, I p = 5 A and power loss = 50% Efficiency of transformer (η) is defined as the ratio of output power and input power, i.e. P V I η% = out × 100 = s s × 100 Pin Vp I p 50 =
12 (b) The magnetic flux linked with the primary coil is given by φ = φ 0 + 4t So, voltage across primary coil, dφ d Vp = = (φ 0 + 4 t ) = 4 V dt dt (as φ 0 = constant)
N 1 V1 = N 2 V2
⇒
2200 × I s × 100 220 × 5
I s = 0.25 A
17 (c) Efficiency of transformer, Output power Input power 88 880 = Pi 100 η=
⇒ ⇒
Pi = 1000 W P 1000 Input current, I i = i = = 0.45 A Vi 2200
18 (a) Voltage in the secondary coil of a transformer does not depend upon frequency of the source.
coil changes, induced emf is produced in it and the induced current flows through the wire forming the coil. These currents look like eddies or whirlpools and likewise are known as eddy currents. They are also known as Focault’s current.
19 (a) When power is drawn from the
These currents oppose the cause of their origin, therefore due to eddy currents, a great amount of energy is wasted in the form of heat energy. If core of transformer is laminated, then their effect can be minimised.
20 (a) Soft iron is used for making
14 (a) In step-up transformer, number of turns in primary coil is less than the number of turns in secondary coil. Ns i.e. >1 Np ⇒
Ns > Np
secondary coil of the transformer, its dynamic resistance increases. This is because the flux of secondary coil reduces the flux of core and thus the back emf decreases. This decreases the current in secondary coil. transformer’s cores. Because it has low hysteresis loss.
21 (c) If is and ip be the currents in the primary and secondary coils at any instant and the energy losses be zero, then Power in secondary coil = Power in primary coil Vs × is = Vp × ip ip Vs N s = = = transformer ratio ⇒ is Vp N p
Given, ⇒
Np Ns
2 = , ip = 3 A 3
is =
Np Ns
ip =
22 (a) Efficiency, η = ⇒ ⇒ ⇒
η=
2 ×3=2A 3
Output power Input power
Vs I s Vp I p
80 200 × I s = 100 4000 I s = 16 A
Also, Vp I p = 4000 4000 Ip = = 40 A ⇒ 100
23 (c) Mutual inductance of transformer, ⇒
M ∝ N 1N 2 M1 N 1N 2 = M2 N ′1 N ′2
⇒
25 5 × 10 = M 2 10 × 5
⇒
M 2 = 25 H
24 (c) Frequency remains unchanged in a transformer, while current and voltage changes.
25 (a) From Faraday’s law, the induced emf across primary and secondary is ∆φ , ep = − N p ∆t ∆φ es = − N s ∆t Also, e = iR Rp N p = ∴ Rs N s Given, ∴
Rs = 8000 Ω , Rp = 8 Ω N s Rs 8000 = = N p Rp 8 =
1000 = 1000 : 1 1
26 (d) From Faraday’s law of electromagnetic induction, the induced emf e is given by di e=−M dt Given, M = 5 H, di = 10 A, dt = 0.5 s 10 ∴ e=−5× = − 100 V 0.5 | e | = 100 V
22 Electromagnetic Waves Quick Review Displacement Current
Maxwell’s Equations
While applying the Ampere’s circuital law to find magnetic field at a point outside a capacitor which connected to a time varying current, Maxwell noticed an inconsistency in Ampere’s law. He suggested the existence of an additional current and called it displacement current. B
+ + +
ID
– – –
+ –
“Displacement current is a current which is produced due to rate of change of electric flux with respect to time”. dφ E It is given by I D = ε 0 ...(i) dt According to Ampere’s circuital law, we have
∫ B ⋅ d l = µ 0 IC
...(ii)
where, I C = current threading through Amperian loop. • Modified Ampere’s circuital law is expressed as ∫ B ⋅ d l = µ 0 (IC + I D ) dφ E = µ 0 IC + ε 0 dt
[from Eqs. (i) and (ii)] This is also called Ampere-Maxwell law.
Maxwell’s equations are the basic laws of electricity and magnetism. These equations give complete description of all electromagnetic interactions. There are four Maxwell’s equations which are explained as below (i) Gauss’s Law of Electrostatics This law states that the total electric flux through any closed 1 times the net charge surface is always equal to ε0 enclosed by the surface. q It is given by ∫ E⋅ d S = . S ε0 This equation is called Maxwell’s first equation. (ii) Gauss’s Law of Magnetism This law states that, the net magnetic flux through any closed surface is always zero. It is given by ∫ B ⋅ dS = 0. This equation is called Maxwell’s second equation. (iii) Faraday’s Law of Electromagnetic Induction This law states that the induced emf produced in a circuit is numerically equal to the rate of change of magnetic flux through it. dφ It is given by ∫ E ⋅ d l = − B . dt This equation is called Maxwell’s third equation.
643
ELECTROMAGNETIC WAVES
(iv) Ampere-Maxwell Law This law states that the line integral of the magnetic field along a closed path is equal to µ 0 times the total current threading the surface bounded by that closed path. It is given by dφ E ∫ B ⋅ dl = µ 0 IC + ε 0 dt = µ 0 ( IC + I D )
Characterstics of Electromagnetic Waves Some important characteristics of EM waves are listed as below (i) Light waves are electromagnetic waves. (ii) These waves travel in free space with the speed of light. ( c = 3.0 × 108 ms −1 ) , where c is given by the relation c = 1/ µ 0 ε 0 .
This equation is called Maxwell’s fourth equation.
(iii) The time varying electric ( E) and magnetic ( B ) fields are perpendicular to each other. (iv) The variation in electric and magnetic fields occurs simultaneously and the fields acquire their maximum values E 0 and B 0 at the same place and at the same time. (v) Electric and magnetic field vectors are such that E × B (cross product) is always in the direction of propagation of wave. (vi) In free space, the magnitude of electric and magnetic fields in electromagnetic waves are related by E / B = c. (vii) The energy in electromagnetic waves is divided equally between electric and magnetic fields. (viii) The electromagnetic waves like other waves carry energy and momentum. (ix) These waves exert pressure (radiation pressure), which is expressed as I p= c where, I = light intensity.
Electromagnetic Waves (EM Waves) Maxwell found that time varying electric and magnetic fields produce Electromagnetic Waves (EMW). Thus, electromagnetic waves are the waves which are produced due to changing electric field ( E) and magnetic field (B) simultaneously propagating through space such that the two fields are perpendicular to each other and perpendicular to the direction of wave propagation. • It is represented as x Direction of wave propagation, v O
B
E B
E
z
y
• An electromagnetic wave propagating in z-direction with
the oscillating electric field E along the x-direction and the oscillating magnetic field B along y-direction can be expressed as Ex = E 0 sin ( kz − ωt )i$ and B = B sin ( kz − ωt )$j y
Electromagnetic Spectrum
0
The arrangement of electromagnetic waves in increasing or decreasing order of wavelength ( λ ) or frequency ( ν ) is called electromagnetic spectrum. The range lies from 10−12 m to 104 m , i.e. from γ-rays to radio waves.
Various Electromagnetic Waves of Electromagnetic Spectrum with their Features and Uses Name of Wave (i)
Radio waves
Frequency Range 500 kHz to 1000 MHz
Wavelength Range > 0.1 m
Production
Detection
Rapid acceleration Receiver’s and decelerations aerials. of electrons in aerials.
Uses ●
●
●
(ii)
Microwaves
1 GHz to 300 GHz
0.1 m to 1 mm
Klystron valve or magnetron valve.
Point contact diodes.
●
●
●
These are used in AM (Amplitude Modulation) from 530 kHz to 1710 kHz and ground wave propagation. These are used in TV waves ranging from 54 MHz to 890 MHz. These are used in FM (Frequency Modulation) ranging from 88 MHz to 108 MHz. These are used in RADAR systems for aircraft navigation. These are used in microwave oven for cooking purpose. These are used in study of atomic and molecular structures.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Name of Wave (iii) Infrared waves (heat waves)
(iv)
Frequency Range
Wavelength Range
3 × 1011 Hz to 4 × 1014 Hz.
1 mm to 700 nm
4 × 1014 Hz to 7 × 1014 Hz
Light rays
700 nm to 400 nm
Production
Detection
Vibration of atoms Thermopiles and molecules bolometer and infrared photographic film. Electrons in atoms emit light, when they move from a higher energy level to a lower energy level.
The eye, photocells and photographic film.
Uses ● ●
●
These are used in physical therapy. These are used in satellites for army purpose. These are used in weather forecasting.
Visible rays are used by the optical organs of humans and animals for three primary purposes given below To see things, avoid bumping into them and escape danger. To look for food. To find other living things with which to copulate so as to prolong the species.
●
● ●
(v)
(vi)
Ultraviolet rays 1014 Hz to 1016 Hz
3 × 1016 Hz to 3 × 1021 Hz
X-rays
400 nm to 1 nm
1 nm to 10−3 nm
Photocells and Produced by special lamps and photographic film very hot bodies, sun. Inner shell electrons in atoms moving from higher energy level to a lower energy level. X-ray tubes or inner shell electrons, bombarding metals by high energy electrons.
Photographic film, Geiger tubes and ionisation chamber.
● ●
●
●
●
●
●
●
(vii) Gamma (γ ) rays 3 × 1018 Hz to < 10−3 nm 5 × 1022 Hz.
Radioactive decay of the nucleus.
Photographic film and ionisation chamber.
●
●
●
These are used in burglar alarm. These are used in checking mineral sample. These are used to study molecular structure. To kill germs in water purifiers. Used in LASER eye surgery. These are used in medicine to detect the fracture, diseased organs, stones in the body etc. These are used in engineering to detect fault, cracks in bridges and testing of welds. These are used at metro stations to detect metals or explosive material. These are used to produce nuclear reactions. These are used in radio therapy for the treatment of tumour and cancer. These are used in food industry to kill pathogenic micro-organism.
Topical Practice Questions All the exam questions of this chapter have been divided into 2 topics as listed below Topic 1
—
PROPERTIES OF ELECTROMAGNETIC WAVES
645–649
Topic 2
—
ELECTROMAGNETIC SPECTRUM
649–651
ELECTROMAGNETIC WAVES
Topic 1 Properties of Electromagnetic Waves 2019 1 A parallel plate capacitor of capacitance 20µF is being charged by a voltage source whose potential is changing at the rate of 3 V/s. The conduction current through the connecting wires and the displacement current through the plates of the capacitor would be respectively, [NEET] (a) 60 µA , 60 µA (b) 60 µA, zero (c) zero, zero (d) zero, 60 µA
2018 2 An EM wave is propagating in a medium with a velocity
v = v $i. The instantaneous oscillating electric field of this EM wave is along +Y -axis. Then, the direction of oscillating magnetic field of electromagnetic wave will be along [NEET] (a) − y-direction (b) + z-direction (c) − z-direction (d) −x-direction
2014 3 The ratio of amplitude of magnetic field to the amplitude of electric field for an electromagnetic wave propagating in vacuum is equal to [CBSE AIPMT] (a) the speed of light in vacuum (b) reciprocal of speed of light in vacuum (c) the ratio of magnetic permeability to the electric susceptibility of vacuum (d) unity
4 In electromagnetic wave, according to Maxwell, changing electric field gives [MHT CET] (a) stationary magnetic field (b) conduction current (c) eddy current (d) displacement current 5 The speed of light in an isotropic medium depends on (a) the nature of the source [Kerala CEE] (b) nature of the medium (c) its direction of propagation (d) its intensity (e) the motion of the source relative to the medium 6 Light wave is travelling along y-direction. If the corresponding E vector at any time is along the X -axis, the direction of B vector at that time is along [WB JEE] (a) Y -axis (c) + Z-axis
(b) X -axis (d) − Z-axis
7 A plane electromagnetic wave of frequency 20 MHz travels through a space along x-direction. If the electric field vector at a certain point in space is 6 Vm −1 , then what is the magnetic field vector at that point? [KCET] 1 1 (d) T (a) 2 × 10−8 T (b) × 10−8 T (c) 2 T 2 2
2013 8 There may be a large regions of space where there is no conduction current, but there is only [WB JEE] (a) displacement current due to time varying electric fields (b) induced current due to time varying electric fields (c) Both (a) and (b) (d) Neither (a) nor (b)
9 In an electromagnetic wave, the amplitude of electric and magnetic fields are 100 V/m and 0.265 A/m, respectively. The maximum energy flow is [KCET] (b) 36.5 W/m 2 (a) 26.5 W/m 2 (d) 765 W/m 2 (c) 46.7 W/m 2
2011 10 The electric and magnetic fields, associated with an electromagnetic wave, propagating along the + Z-axis, can be represented by [CBSE AIPMT] $ $ $ (b) E = E 0 j, B = B 0 i$ (a) E = E 0 k , B = B 0 i (d) E = E 0 $i , B = B 0 $j (c) E = E 0 $j , B = B 0 k$
11 Dimensions of ε 0 (a) charge (c) capacitance
dφ E are same as that of dt (b) potential (d) current
2010 12 Which of the following statements is false for the properties of electromagnetic waves? [CBSE AIPMT] (a) Both electric and magnetic field vectors attain the maxima and minima at the same place and same time. (b) The energy in electromagnetic wave is divided equally between electric and magnetic vectors. (c) Both electric and magnetic field vectors are parallel to each other and perpendicular to the direction of propagation of wave. (d) These waves do not require any material medium for propagation.
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13 A plane electromagnetic wave propagating in the x-direction has wavelength of 6.0 mm. The electric field is in the y-direction and its maximum magnitude is 33 Vm −1 . The equation for the electric field as a function of x and t is [AFMC] (a) 11sin π ( t − x / c ) (b) 33 sin π × 1011 ( t − x / c ) (c) 33sin π ( t − x / c ) (d) 11sin π × 1011 ( t − x / c ) 14 The sun delivers 104 W / m 2 of electromagnetic flux to the earth’s surface. The total power that is incident on a roof of dimensions (10 × 10) m 2 will be [BHU] 4 5 (a) 10 W (b) 10 W (c) 106 W (d) 107 W 15 An electromagnetic wave of frequency, ν = 3.0 MHz passes from vacuum into a dielectric medium with permittivity ε = 4.0 , then [MP PMT] (a) wavelength is doubled and the frequency remains unchanged (b) wavelength is doubled and frequency becomes half (c) wavelength is halved and frequency remains unchanged (d) wavelength and frequency both remain unchanged 16 In a free space, electron is placed in the path of a plane electromagnetic wave, it will start moving along [Manipal] (a) centre of earth (b) equator of earth (c) magnetic field (d) electric field 17 An electromagnetic wave going through vacuum is described by E = E 0 sin (kx − ωt) and B = B 0 sin ( kx − ωt ) . Which of the following equations is true? [OJEE] (a) E 0 k = B 0ω (b) E 0ω = B 0 k (c) E 0 B 0 = ωk (d) None of the above 18 Which one of the following is the property of a monochromatic and plane electromagnetic waves in free space? [Kerala CEE] (a) Electric and magnetic fields have a phase difference of π/2. (b) The energy contribution of both electric and magnetic fields are equal. (c) The direction of propagation is in the direction of B × E. (d) The pressure exerted by the wave is the product of its speed and energy density . (e) The speed of the wave is B/E.
19 Which is the correct expression of velocity of light? E 1 [MP PMT] (b) 0 (a) B ε 0µ 0 0 c (d) All of these (c) µ 20 The average magnetic energy density of an electromagnetic wave of wavelength λ travelling in free space is given by [DUMET]
B2 (a) 2λ 2B 2 (c) µ 0λ
B2 (b) 2µ 0 B (d) µ 0λ
21 The speed of electromagnetic waves in vacuum [KCET] (a) increases as we move from γ-rays to radio waves (b) decreases as we move from γ-rays to radio waves (c) is same for all the above (d) None of the above
2009 22 The average electric field of electromagnetic waves in
certain region of free space is 9 × 10−4 NC−1 . Then, the average magnetic field in the same region is of the order of [Kerala CEE] (a) 27 × 10−4 T (b) 3 × 10−12 T 1 (d) 3 × 1012 T (c) × 10−12 T 3 1 (e) × 1012 T 3
23 Which of the following has/have zero average value in a plane electromagnetic wave? [Kerala CEE] (a) Both magnetic and electric fields (b) Electric field only (c) Magnetic field only (d) Magnetic energy (e) Electric energy 24 An electromagnetic wave has [Haryana PMT, CG PMT] (a) electric vector only (b) magnetic vector only (c) electric and magnetic vectors perpendicular to each other (d) neither the electric vector nor the magnetic vector 25 Suppose that the electric field amplitude of an electromagnetic wave is E 0 = 120 N/ C and its frequency is ν = 50.0 MHz. The expressions for E will be [WB JEE] (a) [(120N/ C) sin {(1.05 rad / m) x − (3.14 ×108 rad /s) t}] $i (b) [(120N/ C) sin {(1.05 rad / m) x − (3.14 ×108 rad /s) t}] k$ (c) [(120N/ C) sin {(1.05 rad / m) x − (3.14 ×108 rad /s) t}] $j (d) [(120N/ C) cos {(1.05 rad / m) x − (3.14 ×108 rad /s) t}] $j
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ELECTROMAGNETIC WAVES
2008 26 Assertion The displacement current goes through the gap between the plates of a capacitor when the charge of the capacitor does not change. Reason The displacement current arises in the region in which the electric field and hence the electric flux does not change with time. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion (c) Assertion is correct but Reason is incorrect (d) Both Assertion and Reason are incorrect
2007 27 The electric and magnetic fields of an electromagnetic wave are
[CBSE AIPMT]
(a) in phase and parallel to each other (b) in opposite phase and perpendicular to each other (c) in opposite phase and parallel to each other (d) in phase and perpendicular to each other
28 Electromagnetic waves are produced by (a) accelerated charged particle (b) decelerated charged particle (c) charge in uniform motion (d) None of the above
1 11 21 31
(a) (d) (c) (a)
2 12 22 32
(b) (c) (b) (c)
3 (b) 13 (b) 23 (a)
4 (d) 14 (c) 24 (c)
[UP CPMT]
29 A beam of light travelling along X-axis is described by the electric field, E y = ( 600 Vm −1 ) sin ω ( t − x /c ) , then maximum magnetic force on a charge, q = 2e, moving along Y -axis with a speed of 3.0 × 107 ms −1 is ( e = 1. 6 × 10−19 C ) [UP CPMT] (a) 19. 2 × 10−17 N (c) 0.192 N
(b) 1. 92 × 10−17 N (d) None of these
2006 30 A perfectly reflecting mirror has an area of 1 cm 2 . Light energy is allowed to fall on it for 1 h at the rate of 10 J/s. [MHT CET] The force that acts on the mirror is (a) 3. 35 × 10−8 N (b) 6.7 × 10−8 N −7 (c) 1. 34 × 10 N (d) 2.4 × 10−4 N
31 A parallel plate capacitor is charged to 60 µC. Due to a radioactive source, the plate losses charge at the rate of 1. 8 × 10−8 Cs −1 . The magnitude of displacement current is [MP PMT] −8 −1 −8 −1 (a) 1.8 × 10 Cs (b) 3.6 × 10 Cs (c) 4.1 × 10−11 Cs −1 (d) 5.7 × 10−12 Cs −1
2005 32 The pressure exerted by an electromagnetic wave of
intensity, I ( Wm −2 ) on a non-reflecting surface is [AIIMS] (a) Ic (b) Ic 2 (c) I / c (d) I / c 2
5 (b) 15 (c) 25 (c)
6 (d) 16 (d) 26 (d)
7 (a) 17 (a) 27 (d)
8. (a) 18 (b) 28 (a)
9 (a) 19 (d) 29 (b)
10 (d) 20 (b) 30 (b)
Explanations 1 (a) Given, C = 20µF = 20 × 10−6 F dV = 3 V/s dt The displacement current in a circuit is dφ given by I D = ε 0 dt d = ε 0 (EA ) [Q φ = EA ] dt d V = ε 0 A [Q V = Ed ] dt d ε A dV = 0 d dt
and
As the capacitance of a parallel plate ε A capacitor, C = 0 d dV ID = C ∴ dt Substituting the given values, we get I D = 20 × 10−6 × 3 = 60 × 10−6 A = 60 µ A As displacement current is in between the plates of capacitor and conduction current is in the connecting wires which are equal to each other. So, IC = I D = 60 µA
2 (b) Here, velocity of EM wave v = vi$ Instantaneous oscillating electric field, E = E$j As we know that during the propagation of electromagnetic waves through a medium, oscillating electric and magnetic field vectors are mutually perpendicular to each other and also to the direction of propagation of the wave. i.e. E×B= v …(i) ⇒ (E$j) × B = vi$ As we know that, from vector algebra, $j × k$ = $i …(ii)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Comparing Eqs. (i) and (ii), we get B = Bk$ , where, B (say) is the magnitude of magnetic field. Thus, we can say that, the direction of oscillating magnetic field of the EM wave will be along + z-direction. (b) The ratio of amplitude of magnetic field to the amplitude of electric field for an electromagnetic wave propagating in vacuum is equal to the reciprocal of speed of light in vacuum. B0 i.e. = 1/ c E0
4 (d) According to Maxwell, changing
5 6
electric field produces displacement current. dφ I D = ε0 E dt (b) Speed of light in a medium depends on the electric and magnetic properties of the medium or the nature of the medium. (c) Electromagnetic radiation is a self propagating wave in space with electric and magnetic components. Y
Electric field E
Magnetic field
M
X
∴
H 0 = 0. 265 A/m S = 100 × 0.265 = 26.5 W/m 2
10 (d) In electromagnetic waves, electric vector, magnetic vector and velocity of wave are perpendicular to one another. Hence, As v = v0k$ We know, from vector algebra, $i × $j = k$ ∴ E = E $i 0
and
B = B0$j
11 (d) We know that, displacement current, dφ E dt dφ So, dimensions of ε 0 E are same as dt that of current. I D = ε0
12 (c) The time varying electric and magnetic fields are mutually perpendicular to each other and also perpendicular to direction of propagation of the wave.
13 (b) Angular frequency,
We know that, E × B = v ...(i) ...(ii) i$ × (− k$ ) = $j (from vector algebra) Comparing Eqs. (i) and (ii), we can say that, B is along − Z-axis.
7 (a) Magnetic field, E , where c = 3 × 108 m/s. c 6 B= = 2 × 10−8 T 3 × 108 (a) In vast regions of space, where there is no conduction current, there may be displacement current due to varying electric fields in the region. (a) Maximum rate of energy flow, S = E0H 0 Given, E0 = 100 V/m B=
8
9
Area, A = (10 × 10) m 2 Total power = Solar constant × Area 6
= 10 × (10 × 10) = 10 W permittivity in freee space. In dielectric medium, ε = 4, so refractive index, µ = ε / ε0 = 4 /1 = 2 λ λ = µ 2 c c and wave velocity, v = = µ 2
Wavelength, λ ′ =
18 (b) The energy in EM waves is divided equally between the electric and magnetic fields.
19 (d) The velocity of electromagnetic waves in free space is given by E 1 c= = 0 µ 0 ε 0 B0
20 (b) Energy density of an
14 (c) Given, solar constant, S = 104 W/m 2
15 (c) In vacuum, ε 0 = 1, where ε 0 is
17
electromagnetic wave will experience force due to electric field vector and not due to magnetic field vector. Hence, it will move along the electric field. E (a) As, 0 = c B0 2π Also, k= λ and ω = 2πν These relations give E0 k = B0 ω.
c Moreover in a medium, v = . µ
The equation for the electric field, along Y-axis for electromagnetic wave is x E y = E0 sin ω t − c = 33 sin π × 1011 (t − x / c)
4
16 (d) The electron placed in the path of
= 3 × 108 ms−1
2πc ω = 2πν = λ 2π × 3 × 108 = 6 × 10−3 = π × 1011 rad s−1
These components oscillate at right angles to each other and to the direction of propagation. Here, v = v$j E = E$i
Hence, it is clear that wavelength and velocity will become half but frequency remains unchanged when the wave is passing through any medium.
electromagnetic wave, 1 1 B2 U = ε0 E2 + 2 2 µ0 So, the magnetic energy density is B2 . 2µ 0
21 (c) Speed of electromagnetic waves in vacuum =
1 = constant, µ 0 ε0
so it is same for all of them.
22 (b) Given, E = 9 × 10−9 NC −1 As, ⇒
c = E/B 9 × 10−4 B= 3 × 108 (∴C = 3 × 108 ms −1) = 3 × 10−12 T
23 (a) Both magnetic and electric fields have zero average value in a plane electromagnetic wave.
24 (c) An electromagnetic wave has electric and magnetic vectors perpendicular to each other.
649
ELECTROMAGNETIC WAVES
25 (c) Given, E0 = 120 N / C, ν = 50.0MHz = 50 × 10 Hz We know, ω = 2 πν = (2 × 314 . rad)(50 × 106 Hz ) 8
= 314 . × 10 rad /s
27
ω 314 . × 108 rad / s = c 3 × 108 m / s
= 105 . rad/m As it is clear from the option given wave to be propagating along X -axis, then E is along Y-axis and B is along Z-axis. Clearly, E = E sin (kx − ωt ) $j 0
= [(120N / C) sin{(105 . rad / m)x − (314 . × 108 rad/s) t}] $j
0
⇒
and wave constant, k=
dφ E . dt Hence, electric flux should also change to have displacement current. (d) As, E = E sin (kx − ω t ) i$ I D = ε0
Also,
6
28
B = B0 sin (kx − ω t ) $j
Hence, electric field and magnetic field are in same phase and perpendicular to each other. (a) The electromagnetic waves are produced by the accelerated charge. The electric and magnetic fields produced by the accelerated charge change with time. Therefore, it radiates electromagnetic waves.
29 (b) Maximum magnetic field is given by Given,
E0 c E0 = 600 Vm −1,
B0 =
c = 3 × 108 ms−1
26 (d) The displacement current is given by ID
dφ d q = ε0 E = ε0 dt ε 0 dt
q ε0 dq I0 = ⇒ dt That is it will happen when charge on capacitor does not remain constant but changes with time.
Q From Gauss’s law, φ E =
and ∴
v = 3 × 107 ms −1 600 = 2 × 10−6 T B0 = 3 × 108
Maximum magnetic force imposed on given charge is Fm = qvB0 = 2evB0 = 2 × 1. 6 × 10−19 × 3 × 107 × 2 × 10−6 = 1. 92 × 10−17 N
30 (b) Let, E = energy falling on the
Momentum of photons, h h hν E p= = = = λ (c / ν ) c c t =1h On reflection, change in momentum per second = force 2 p 2E 2 × 10 = = = t ct 3 × 108 = 6.7 × 10−8 N
31 (a) Displacement current is given by dq dt = 18 . × 10−8 Cs−1
ID =
As current is rate of charge flowing, so value of I D is given directly here as 18 . × 10−8 Cs −1 .
32 (c) When a surface intercepts electromagnetic radiation, a force and a pressure are exerted on the surface. As the surface is non-reflecting, so it is completely absorbed and in such case IA the force is, F = c The radiation pressure is the force per unit area, F I p= = A c where, c = speed of light.
surface per second = 10 J
Topic 2 Electromagnetic Spectrum 2014 1 In electromagnetic spectrum, the frequencies of γ-rays, X-rays and ultraviolet rays are denoted by n1 , n 2 and n 3 respectively, then [MHT CET] (a) n1 > n 2 > n 3 (b) n1 < n 2 < n 3 (c) n1 > n 2 < n 3 (d) n1 < n 2 > n 3 2 The electromagnetic waves detected using a thermopile and used in physical therapy are [Kerala CEE] (a) gamma radiations (b) X-rays (c) ultraviolet radiations (d) infrared radiations (e) microwave radiations
3 The wavelength of X-rays is in the range (a) 0.01 Å to 1 Å (b) 0.001 nm to 1 nm (c) 0.001 µm to 1 µm (d) 0.001 cm to 1 cm
[Guj CET]
4 The wavelength of the short radio waves, microwaves and ultraviolet waves are λ 1 , λ 2 and λ 3 respectively. Arrange them in decreasing order. [Guj CET] (a) λ 1 , λ 2 , λ 3 (b) λ 1 , λ 3 , λ 2 (c) λ 3 , λ 2 , λ 1 (d) λ 2 , λ 1 , λ 3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2013 5 The condition under which a microwave oven heats up a food item containing water molecules most efficiently is (a) the frequency of the microwave must match the resonant frequency of the water molecules [NEET] (b) the frequency of the microwave has no relation with natural frequency of water molecules (c) microwaves are heat waves, so always produce heating (d) infrared waves produce heating in a microwave oven
6 If vγ , v X and v M are the speeds of γ-rays, X-rays and microwaves respectively in vacuum, then [Manipal] (a) v γ > v M > v X (c) v γ = v X = v M
(b) v γ > v X > v M (d) None of these
2011 7 The electromagnetic wave having the shortest wavelength is [Kerala CEE] (a) X-rays (b) γ-rays (c) infrared rays (d) microwaves (e) radio waves 8 The part of the spectrum of the electromagnetic radiation used to cook food is [J&K CET] (a) ultraviolet rays (b) cosmic rays (c) X-rays (d) microwaves
2010 9 Which of the following waves has the maximum wavelength? [Haryana PMT] (a) X-rays (b) Infrared rays (c) Ultraviolet rays (d) Radio waves 10 Which of the following shows greenhouse effect? [JCECE] (a) Ultraviolet rays (b) Infrared rays (c) X-rays (d) None of these 11 The magnetic field of plane electromagnetic wave is given by B y = 2 × 10−7 sin (0.5 × 103 x + 1.5 × 1011 t )T . This electromagnetic wave is [DUMET] (a) a visible light (b) an infrared wave (c) a microwave (d) a radio wave
2008 12 Which of the following undergoes largest diffraction? (a) Infrared ray (c) γ-rays
(b) Radio waves [Guj CET] (d) Ultraviolet rays
2007 13 An electromagnetic radiation has an energy of 13.2 keV, then the radiation belongs to the region of (a) visible light (b) ultraviolet (c) infrared (d) X-ray (e) microwave
[Kerala CEE]
14 All components of the electromagnetic spectrum in vacuum have the same [KCET] (a) energy (b) velocity (c) wavelength (d) frequency
2006 15 We find that the temperature of air decreases as one goes up from the earth’s surface, because [MHT CET] (a) the atmospheric pressure drops with height (b) the earth which radiates waves in the infrared region is the main heat source and temperature drops as we go away from it (c) the density of air drops with height and the air therefore cannot hold stronger as we go up (d) winds are stronger as we go up
16 The wavelength of a radio wave of frequency of 1 MHz is
[Haryana PMT]
(a) 400 m (c) 350 m
(b) 300 m (d) 200 m
2005 17 In the electromagnetic spectrum, the visible spectrum lies between (a) radio waves and microwaves (b) infrared and ultraviolet rays (c) microwaves and infrared spectrum (d) X-rays and gamma rays spectrum
[JCECE]
Answers 1 (a) 11 (c)
2 (d) 12 (b)
3 (b) 13 (d)
4 (a) 14 (b)
5 (a) 15 (b)
6 (c) 16 (b)
7 (b) 17 (b)
8 (d)
9 (d)
10 (b)
651
ELECTROMAGNETIC WAVES
Explanations 1 (a) Frequency range of γ-rays 20
7 (b) The electromagnetic wave having
~ 5 × 10 − 3 × 10 (n1 ) − Frequency range of X-rays ~ 3 × 1019 − 1016 (n2 ) − Frequency range of ultraviolet rays ~1016 − 8 × 1014 (n3 ) − ∴ n1 > n2 > n3
2 (d) The electromagnetic waves detected using a thermopile and used in physical therapy are infrared or heat radiations.
3 (b) X-rays wavelength range = 1 × 10
−12
m to 1 × 10
−9
electromagnetic radiation used to cook food is microwaves.
9 (d) The wavelength order is λ radiowaves > λ UV rays > λ IR rays > λ
effect because infrared radiations are trapped by earth atmosphere by and keep the earth warm.
11 (c) We have,
B y = 2 × 10−7 sin (0.5 × 103 x + 15 . × 1011 t )
Comparing with the standard equation B y = B0 sin (kx + ωt ), we get
4 (a) We know that,
k = 0.5 × 103
Short radio waves have wavelength range λ 1 = 1 × 10−1 m to 1 × 104 m
2π k 2π = 0.5 × 103 = 0.01256 m The wavelength range of microwaves is 10−3 to 0.1 m. The wavelength of this wave lies between 10−3 to 0.1 m, so the equation represents a microwave. ⇒
Microwaves wavelength range, −1
λ 2 = 1 × 10 m to 3 × 10 m Ultraviolet rays wavelength range, λ 3 = 1 × 10−8 m to 4 × 10−8 m So, decreasing order of wavelengths are λ 1 ,λ 2 , λ 3. microwaves, which are basically radio waves, to cook food. The commonly used frequency is roughly 2500 MHz (2.5 GHz). Radio waves in this frequency range are absorbed by water, fats and sugars. When absorbed, they are converted directly into heat due to vibration.” Frequency of microwaves matches with the resonant frequency of the water molecules and hence food items with water molecules are effectively heated by microwaves.
6 (c) γ-rays, X-rays and microwaves respectively are electromagnetic waves. They travel with the speed of light in vacuum. Hence, vγ = vX = vM
X -rays
10 (b) Infrared rays show green house
m
5 (a) “A microwave oven uses
= 0.9375 × 10−10 m ≈ 1Å
8 (d) The part of the spectrum of the
= 0.001 nm to 1 nm
−3
c = 3 × 108 ms −1
and
the shortest wavelength is γ-rays.
19
λ=
12 (b) We know that the diffraction of
13
waves is observed, when size of the obstacle is of the order of wavelength of waves. Here, the wavelength of radio waves is largest, so the radio waves undergo largest diffraction. (d) Energy of a photon, hc E= λ hc ∴ Wavelength, λ = E Given, E = 13.2 eV = 13.2 × 103 eV
Q
6.6 × 10−34 × 3 × 108 = 13.2 × 103 × 1.6 × 10−19 h = 6.6 × 10−34 J-s
Wavelength range of X-rays is from 10−11 m to 10−8 m [i.e. 0.1 Å to 100 Å] Therefore, the given electromagnetic radiation belongs to the X-ray region of electromagnetic spectrum.
14 (b) All the components of electromagnetic spectrum have same velocity, i.e. 3 × 108 ms−1.
15 (b) The temperature of air decreases as one goes up from the earth’s surface, because the earth which radiates in the infrared region is the main heat source and temperature drops as we go away from it.
16 (b) We know that, wavelength, c ν ν = 1MHz = 1 × 106 Hz λ=
Given, ∴
λ=
(Q c = νλ)
3 × 108 1 × 106
= 3 × 102 = 300 m
17 (b) Electromagnetic waves have wavelengths as small as 30 Fm to as large as 30 km. The figure shows the electromagnetic spectrum 3×10
–4
(Wavelength in m) 3×10–8 3×10–12
Infrared Ultraviolet g waves rays Microwaves
X-rays
Visible
Hence, visible spectrum lies between infrared and ultraviolet rays.
23 Ray Optics and Optical Instruments Quick Review • The minimum height of a plane mirror to see
Reflection of Light The returning back of light in the same medium from which it has come after striking a smooth polished surface is called reflection of light. After reflection, velocity, wavelength and frequency of light remains same but intensity decreases.
Laws of Reflection There are two laws for reflection of light from a smooth reflecting surface (i) First Law The angle of incidence is equal to the angle of reflection, i.e. ∠i = ∠r. (ii) Second Law The incident ray, the reflected ray and the normal at the point of incidence, all lie in the same plane. These laws are valid for plane as well as curved surfaces as shown in the figure below
r i
i
i
r
r
Reflection of Light from a Plane Mirror • Image formed by a plane mirror is virtual, erect, of same
size and at the same distance from the mirror. • Deviation (δ) produced by a plane mirror and by two inclined plane mirrors can be expressed as (i) For single reflection, δ = (180° − 2i ). (ii) For double reflection, δ = ( 360° − 2θ ).
object’s full size in it is
H , where H = height 2
of the object. • When two plane mirrors are inclined to each
other at an angle θ, multiple images are formed, then number of image formed is given by 360° = N and actual number of image seen is θ n, where
O θ
(i) n = N − 1, if N is even integer. (ii) n = N , if N is odd integer and object is not on the bisector of mirrors. (iii) n = N − 1, if N is odd integer and object is on the bisector of mirrors. 360° (iv) If = N is a fraction, then the number θ of images will be equal to its lower boundary of integral part.
Reflection of Light by Spherical Mirrors • Spherical mirror is a mirror whose reflecting
surface is a part of a hollow shpere. • Spherical mirrors are of two types : concave and convex mirror.
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Terms related to spherical mirrors with the expressions and diagrams are shown in following table Characteristics
Concave Mirror
Convex Mirror
Focus (F) P
C
P
F
F
−R 2 1 P=− f (in metre) − 100 D = f (in cm )
Focal length ( f )
f = − ve =
Power (P )
f = + ve =
R 2
1 f (in metre) 100 D = f (in cm )
P=
For concave mirror, power is negative. Cartesian sign convention
C
For convex mirror, power is positive. Mirror
Direction of Heights incident light upward positive C (−ve), F (−ve)
P (Pole)
+ve
P X-axis Heights Distances against −ve downwards incident light negative negative Distances along incident light positive Concave mirror
Mirror formula
R I O C
F f v
F (+ve) C (+ve)
Convex mirror
+ve P
u
O
P
F
v
R
u=–ve
1 1 1 + = v u f
1 1 1 + = v u f where, u and v = distance of object and image from pole of the mirror. Newton’s formula
f 2 = x1 x2 where, x1 and x2 are the distances of object and image from the focus of the mirror.
Linear magnification general equation
m=
hi v f f −v =− = = ho u f −u f
For concave mirror, m ≥ 1. For convex mirror, m ≤ 1.
where, ho and hi = height of image and object. Longitudinal magnification ● For large object ●
For small object
m=
| v1 | − | v2 | | u2 | − | u1 |
m=
dv − v 2 = 2 = − m2 du u v
v versus u graph
v
u
–f O -f
(+f, f ) O
u
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Refraction of Light It is the phenomena of bending of ray of light when they pass from one transparent medium to another depending on their optical densities.
Laws of Refraction There are two laws of refraction as follows (i) For two particular media, the ratio of the sine of the angle of incidence to the sine of the angle of refraction is constant. µ sin i i.e. = constant = 2 sin r µ1 This is known as Snell’s law. (ii) The incident ray, the reflected ray and the refracted ray, all lie in the same plane. • According to Snell’s law, for two particular media sin i µ 2 v1 = = = 1µ 2 = constant sin r µ 1 v 2 where, µ 2 , µ 1 = refractive indices of media 1 and 2, v 2 , v1 = velocities of light in media 1 and 2 and 1 µ 2 = refractive index of medium 2 w.r.t. medium 1 = relative refractive index. • Refractive index depends on the factors (i) wavelength of light (ii) velocity of light but independent of angle of incidence and frequency of light. c • Absolute refractive index is expressed as µ = , where v c = speed of light in vacuum and v is speed of light in medium. • When light undergoes refraction through several media and finally enters the first medium itself, then it can be expressed as 1 µ 2 × 2µ 3 × 3µ 1 = 1 1µ 3 or 2µ 3 = 1µ 2 where, 1 µ 2 , 2µ 3 and 3 µ 1 are relative refractive indices of media 1, 2 and 3, respectively. • Refractive index depends on following factors (i) Nature and temperature of media. (ii) Wavelength of light, according to Cauchy’s formula B (Qas λ increases, µ decreases) µ=A+ 2 λ • When a light passes through a glass slab, then incident ray and emergent rays are parallel to each other but emergent ray is displaced laterally. The lateral displacement, i.e. perpendicular distance between the
incident and emergent ray for a rectangular glass slab is expressed as d = t sec r sin (i − r) where, t = thickness of the glass slab and d = lateral shift. • When an object is in denser medium and observer is in rarer medium, then object appears to be at lesser depth (apparent depth) than its actual depth. The object also appears to be laterally shifted. • Real and apparent depth have following relationship real depth ( h ) = µ 21 apparent depth ( h′ ) i.e. Real depth > Apparent depth 1 • Lateral shift, y = h − h ′ = 1− h µ 21 where, h and h′ are real and apparent depths and µ 21 = refractive index of second medium w.r.t. first medium.
Critical Angle and Total Internal Reflection (TIR) • Whenever a ray of light goes from a denser medium to a
rarer medium, it bends away from the normal. The angle of incidence ( ∠ i ) in denser medium for which the angle of refraction ( ∠ r ) in rarer medium is 90° is called the critical angle ( ∠C ). µ C = sin −1 r µ d
• If the angle of incidence ( ∠ i ) in the rarer medium is
greater than the critical angle ( ∠C ), then the ray instead of suffering refraction is totally reflected back in the same (denser) medium. This phenomenon is called total internal reflection. iC Denser 90° Rarer
For total internal reflection to take place, 1 µ= = cosec iC sin iC where, iC = critical angle, i.e. angle of incidence in denser medium for which the angle of refraction in rarer medium is 90°.
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RAY OPTICS AND OPTICAL INSTRUMENTS
Refraction of Light through Prism
Dispersion of Light through Prism
A prism is a portion of a transparent medium bounded by two plane faces inclined to each other at a suitable angle. Refraction of light through a prism is shown in the figure given below A K
A N
P
i
B
δ
T
Q
r2 R
r1 O
e S C
• The angle between emergent ray and incident ray is
called angle of deviation (δ ). δ = ( i + e ) − ( r1 + r2 ), where e = emergent angle. or δ = ( i + e ) − A , here A = angle of prism. For minimum deviation, δ m = (µ − 1) A, where µ = refractive index of material of prism. A + δm sin 2 • Prism formula µ = sin A / 2
• Splitting of white light into its seven components of
colours, when passes through a prism is known as dispersion. • Angular dispersion is expressed as δ V − δ R = (µ V − µ R ) A, where, δ V , δ R = deviations of violet & red light. and µ V , µ R = refractive index of prism for violet & red light. • The ratio of the angular dispersion to the average deviation, when a white beam of light is passed through a prism is expressed by the following relation µ − µ R δV − δ R Dispersive power, ω = V = µ −1 δ where, δ = average deviation = (µ Y − 1) A. • Deviation of rays of different colours in prism is shown alongside δR δY δV Red Yellow Violet
Combination of Prisms A ray of light passes through the combination of prism is shown as follows ●
●
Net angular dispersion
δV − δ R = (µV − µ R ) A − (µ′V − µ′R ) A′
Average deviation
δ Y = (µY − 1) A − (µ′Y − 1) A′
●
Dispersion without average deviation
δV − δ R = (µY − 1) A (ω − ω′ )
●
Average deviation without dispersion
ω δY = (µY − 1) A 1 − ω′
A
ω
ω′
δ1 A′
δ2
Refraction at Spherical Surfaces • When two transparent media are separated by a spherical surface, light incident on the surface from one side get refracted
into the medium on the other side. Spherical surfaces are of two types ; Convex and Concave. • Lenses It is a transparent medium (material) bounded by two surfaces atleast one of which should be spherical. Lens are of two types ; Convex lens and Concave lens.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Some basic terms related to lenses are given below Terms
Convex Lens
Focus ● First Principal Focus It is a point on the principal axis of lens from which rays emerging (in convex lens) appear to converge or (in concave lens), becomes parallel to principal axis after refraction.
Concave Lens
O F1
O
F1
f1
f1 ●
Second Principal Focus It is the point on the principal axis at which the rays coming parallel to the principal axis converge (convex lens) or appear to diverge (concave lens) after refraction from the lens.
O
F2
O
F2
f2
f2
Refraction formula for both concave and convex surfaces
µ2 µ1 µ2 − µ1 − = v u R where, µ 1, µ 2 = refractive index of first & second media, R = radius of curvature of spherical surface and u, v = object & image distance.
Refraction formula for plane surface (R = ∞ )
µ2 µ1 − =0 v u
Lens Maker’s formula
1 1 1 = (µ − 1) − R1 R2 f
Magnification
m=
Thin lens formula
1 1 1 − = v u f
Power of lens
P=
Focal length of lens, when it is immersed in liquid
Newton’s formula
I v f f −u = = = O u f +u f
1 f (m )
(a µ g − 1) fl = fa a µ g − 1 aµ l f 2 = x1x2, where x1 , x2 = distance of object and image from first and second principal foci of lens.
• Focal length of convex lens can be determined by the displacement method. If an object and a screen are placed at a distance
D (> 4 f ) and a lens of focal length f is placed between them.
For two different position of lens two images ( I 1 and I 2 ) are formed at the screen, then focal length f = where x = distance between two positions of lens and f =
D2 − x2 , 4D
I I x , where m1 = 1 , m2 = 2 and size of object, O = I 1 I 2 . m1 − m2 O O
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RAY OPTICS AND OPTICAL INSTRUMENTS
Combinations of Lenses The focal length and power of combination of two or more thin lenses with diagram are shown in following table Lenses Separated by a Distance Diagrams
f1
x
Lenses are in Contact f1
f2
f2
O
I u
u
Focal length
x 1 1 1 = + − F f1 f2 f1 f2
1 1 1 = + F f1 f2
Power
P = P1 + P2 − xP1P2
P = P1 + P2
m = m1 × m2
m = m1 × m2
Magnification
Silvering of a Lens Type of Lenses
Focal Lengths
(i)
Plano-convex lens (plane surface is silvered)
(ii)
Plano-convex lens (curved surface is silvered)
(iii)
Double-convex (one surface is silvered)
(iv)
Plano-concave lens (plane surface is silvered)
(iv)
Plano-concave lens (curved surface is silvered)
(v)
Double-concave lens (one surface is silvered)
f =
R 2 (µ − 1)
Concave mirror
R 2µ
Concave mirror
f =
R 2 (2µ − 1)
Concave mirror
R 2 (µ − 1)
Convex mirror
R 2µ
Convex mirror
R 2 (2µ − 1)
Convex mirror
f =− f =
f = f =
Behaves Like
Cutting of a Lens (i) If a symmetrical convex lens of focal length f is cut into two parts along its optical axis (as shown below), then focal length of each part is 2 f. f
2f
2f
(ii) If a symmetrical convex lens of focal length f is cut into two parts along the principal axis, then focal length of each part remain unchanged to f. f
f
f
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Scattering of Light • If the molecules of a medium after absorption of incoming radiations (light) emit them in all directions, then the
phenomenon takes place is called scattering of light. • The intensity of scattered light depends on both, nature of molecules and wavelength of light. 1 Intensity of scattered light ∝ 4 λ
Human Eye and Its Defects • The eye is an organ which give us sense of sight. The eye behaves as a convex lens of refractive index 1.437, image formed
by this lens is real and inverted and formed at retina. • Eye lens is fixed between ciliary muscles, its radius of curvature can be changed by applying the pressure through ciliary muscles . • Different defects of human eye along with their causes and remedies are given below Defect of Vision Myopia or Short-Sightedness It is a defect of eye due to which a person can see near by objects clearly but cannot see far away objects clearly. In this defect, the far point of eye shifts from infinity to a nearer distance.
Causes Increase in curvature of eye lens due to which its focal length decreases.
Remedy
Ray Diagram
This defect can be removed by using a concave lens of appropriate power.
F
R P Myopic eye
F
R P Corrected eye
Hypermetropia or Long-Sightedness In this defect, a person can see far away objects clearly but cannot see near by objects clearly. In this defect, the near point of eye shifts away from the eye.
Decrease in curvature of eye lens due to which its focal length increases.
This defect can be removed by using a convex lens of appropriate power.
N
N
R
P'
Hypermetropic eye
N
R
Corrected eye
Due to non-spherical Astigmatism In this defect, a person cannot focus shape of cornea. on horizontal and vertical lines at the same distance at the same time.
Presbyopia
Due to weakness of ciliary muscle with age.
This defect can be removed by using suitable cylindrical lenses.
This defect can be removed by using bi-focal lens.
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RAY OPTICS AND OPTICAL INSTRUMENTS
Optical Instruments Magnifying power and resolving power of different optical instruments are shown in tabular form below Optical Instruments Simple microscope
Image formed at Near Point of Eye (D) m =1+
Final Image at Infinity
D f
m=
D f
where D = least distance of distinct vision for human eye and f = focal length of simple microscope. Compound microscope (L = vo + fe)
m=−
L D 1 + fe fo
m=−
Resolving Power 1 2 µ m sin θ = ∆d 122 . λ where µ m = refractive index between object & lens and θ = angle subtended by radius of objective on one of the objects.
R=
L D ⋅ (approx) fo fe
where, fo and fe = focal length of objective and eye-piece. Astronomical telescope (refractive telescope) (L = fo + fe)
m=−
fo fe
f 1 + e D
m=−
Reflecting telescope
m=
fo fe
1 D , = dθ 122 . λ where D = aperture or diameter of objective.
R=
fo fe
Topical Practice Questions All the exam questions of this chapter have been divided into 6 topics as listed below Topic 1
—
REFLECTION OF LIGHT AT PLANE AND SPHERICAL MIRRORS
660–664
Topic 2
—
REFRACTION OF LIGHT AT PLANE SURFACE
665–669
Topic 3
—
TOTAL INTERNAL REFLECTION
670–674
Topic 4
—
PRISM AND LENS
674–692
Topic 5
—
SCATTERING OF LIGHT
693-694
Topic 6
—
HUMAN EYE AND OPTICAL INSTRUMENTS
694-701
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 1
Reflection of Light at Plane and Spherical Mirrors 2018 1 An object is placed at a distance of 40 cm from a concave mirror of focal length 15 cm. If the object is displaced through a distance of 20 cm towards the mirror, the displacement of the image will be [NEET] (a) 30 cm towards the mirror (b) 36 cm away from the mirror (c) 30 cm away from the mirror (d) 36 cm towards the mirror
2014 2 To get three images of single object, one should have two plane mirrors at an angle of (a) 60° (b) 90° (c) 120°
[UK PMT]
(d) 30°
3 An object is placed at 20 cm infront of a concave mirror produces three times magnified real image. What is the focal length of the concave mirror? [KCET] (a) −15 cm (b) 6.6 cm (c) 10 cm (d) 7.5 cm
2013 4 A man of height 1.6 m wishes to see his full image in a plane mirror placed at a distance of 2 m. The minimum length of the mirror should be [UP CPMT, Manipal] (a) 0.4 m (b) 0.8 m (c) 1.6 m (d) 2.4 m
5 A person standing infront of a mirror finds his image larger than himself. This implies that the mirror is [KCET] (a) convex (b) parabolic (c) plane (d) concave
2012 6 A rod of length 30 cm lies along the principal axis of a concave mirror of focal length 10 cm in such a way that its end closer to the pole is 20 cm away from the mirror. The length of the image is [CBSE AIPMT] (a) 10 cm (b) 15 cm (c) 2.5 cm (d) 7.5 cm
2011 7 An object 5 cm tall is placed 1 m from a concave spherical mirror which has a radius of curvature of 20 cm. The size of the image is [UP CPMT] (a) 0.11 cm (b) 0.5 cm (c) 0.55 cm (d) 0.60 cm
8 Two mirrors are placed at right angle to each other. A man is standing between them combing his hair. How many images will he see? [Manipal] (a) 2 (b) 3 (c) 1 (d) zero 2010 9 Object is placed 15 cm from a concave mirror of focal length 10 cm, then the nature of image formed will be (a) magnified and inverted [OJEE] (b) magnified and erect (c) small in size and inverted (d) small in size and erect 10 Two mirrors at an angle θ produces 5 images of a point. The number of images produced when θ is decreased to [WB JEE] θ − 30° is (a) 9 (b) 10 (c) 11 (d) 12 11 A square of side 3 cm is located at a distance 25 cm from a concave mirror of focal length 10 cm. The centre of square is at the axis of the mirror and the plane is normal to axis of mirror. The area enclosed by the image of the square is (a) 4 cm 2 (b) 6 cm 2 [BCECE] 2 2 (c) 16 cm (d) 36 cm 12 A plane mirror produces a magnification of [JIPMER] (a) zero (b) −1 (c) +1 (d) between 0 and +1 2009 13 Assertion The formula connecting u, v and f for a spherical mirror is valid only for mirrors sizes which are very small compared to their radii of curvature. Reason Laws of reflection are strictly valid for plane surfaces, but not for large spherical surfaces. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
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14 A ray of light is incident on a plane mirror at an angle of 60°. The angle of deviation produced by the mirror is [AFMC] (a) 120° (b) 30° (c) 60° (d) 90° 15 Ray optics is valid, when characteristic dimensions are [UP CMPT]
(a) of the same order as the wavelength of light (b) much smaller than the wavelength of light (c) of the order of one millimetre (d) much larger than the wavelength of light
16 Two plane mirrors inclined to each other at an angle 72°. What is the number of images formed? [OJEE] (a) 3 (b) 5 (c) 9 (d) 7 2008 17 An object is placed at the focus of a concave mirror. If its focal length is 20 cm, the distance of object is [BCECE] (a) 10 cm (b) 20 cm (c) 40 cm (d) None of these 18 A plane mirror reflects pencil of light to form a real image then the pencil of light incident on the mirror is [DUMET] (a) parallel (b) convergent (c) divergent (d) None of these 19 A clock hung on a wall has marks instead of numerals on its dial. On the adjoining wall, there is a plane mirror and the image of the clock in the mirror indicates the time [Manipal] 7 : 10. Then, the time on the clock is (a) 7 : 10 (b) 4 : 50 (c) 5 : 40 (d) 10 : 7 2007 20 If in the following figure, height of object is O = + 2. 5cm, then height of image I formed is [UP CPMT] O F
f
1.5 f Concave mirror
(a) − 5 cm (c) + 7.5 cm
(b) + 5 cm (d) − 7.5 cm
21 Two plane mirrors are perpendicular to each other. A ray after suffering reflection from the two mirrors will be (a) perpendicular to the original ray [MHT CET] (b) parallel to the original ray (c) parallel to the first mirror (d) at 45° to the original ray
22 A boy stands straight infront of a mirror at a distance of 1 30 cm from it. He sees his erect image whose height is 5 of his real height. The mirror he is using, is [AMU] (a) plane (b) convex (c) concave (d) plano-concave 23 A bulb is placed between two plane mirrors inclined at an angle of 60°. The number of images formed is [AMU] (a) 5 (b) 6 (c) 4 (d) 3 24 An object is placed at a distance of 40 cm infront of a concave mirror of focal length 20 cm. The image produced is (a) real, inverted and smaller in size [Guj CET] (b) real, inverted and of same size (c) real and erect (d) virtual and inverted 2006 25 A short linear object of length b lies along the axis of a concave mirror of focal length f at a distance u from the pole of the mirror, what is the size of image? [Manipal] 2 f f (b) (a) b b u − f u − f f 2 f (d) (c) b u − f u − f 26 An object is placed at a distance equal to focal length of convex mirror. If the focal length of the mirror be f, then the distance of the image from the pole of the mirror is [Manipal, Punjab PMET]
(a) less than f (c) more than f
(b) equal to f (d) infinity
2005 27 Which of the following is not a property of light?
[AFMC]
(a) It requires a material medium for propagation. (b) It can travel through vacuum. (c) It involves transportation of energy. (d) It has finite speed.
28 A concave mirror of focal length 15 cm forms an image having twice the linear dimension of the object. The position of the object when the image is virtual will be (a) 45 cm (b) 30 cm [RPMT] (c) 7.5 cm (d) 22.5 cm 29 An object is placed at a distance 2 f from the pole of a curved mirror (concave or convex) of focal length f. Then, [Haryana PMT] (a) the linear magnification is 1 for both types of curved mirrors (b) the linear magnification is 1 for a convex mirror 1 (c) the linear magnification is for a convex mirror 3 (d) None of the above
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
30 A man having height 6 m, observes image of 2 m height erect, then mirror used is [Punjab PMT] (a) concave (b) convex (c) plane (d) None of the above 31 A flat mirror revolves at a constant angular velocity making 4π rad s −1 . With what velocity will a light spot move along a spherical screen with a radius of 10 m, if the mirror is at a centre of curvature of the screen? [DUMET] (a) 251.2 ms −1 (b) 261.2 ms −1 (c) 271.2 ms −1 (d) 241.2 ms −1
32 A vessel consists of two plane mirrors at right angle (as shown in figure). The vessel is filled with water. The total deviation in incident ray is [DUMET] (a) 0° (b) 90° (c) 180° (d) None of these
90°
33 Which mirror is to be used to obtain a parallel beam of light from a small lamp? [KCET] (a) Plane mirror (b) Convex mirror (c) Concave mirror (d) Any one of the above
Answers 1 11 21 31
(b) (a) (b) (a)
2 12 22 32
(b) (c) (b) (c)
3 13 23 33
(a) (c) (a) (c)
4 14 24
(b) (c) (b)
5 15 25
(d) (d) (b)
6 16 26
(d) (b) (a)
7 17 27
(c) (b) (a)
8 18 28
(b) (b) (c)
9 19 29
(a) (b) (c)
10 20 30
(c) (a) (b)
Explanations 1 1 1 = + f v2 u2
1 (b) Case I When the object distance, u1 = − 40 cm Focal length of mirror, f = − 15 cm O 40 cm f= – 15 cm
Using the mirror formula, we get 1 1 1 = + f v1 u1 Substituting the given values, we get 1 1 −1 − = + 15 v1 40 ⇒ ⇒
1 1 1 3 − 8 −5 = − = = v1 40 15 120 120 −120 v1 = = − 24 cm 5
Case II When the object distance, u2 = 20 cm O 20 cm f= – 15 cm
Using the mirror formula, we get
Substituting the given values, we get 1 1 1 − = + − 15 v2 20 1 1 1 3 − 4 −1 ⇒ = − = = v2 20 15 60 60 ⇒
v2 = − 60 cm
∴ The displacement of the image = v2 − v1 = − 60 − (−24 ) = − 60 + 24 = − 36 cm or = 36 cm, away from the mirror
2 (b) Consider the
M2
diagram where two plane mirrors are inclined at θ M1 0 angle θ. Number of images formed is given by 360° n= − 1 (for odd number of images) θ 360° 3= −1 ⇒ θ 360° = 4 ⇒ θ = 90° ⇒ θ
3 (a) We know that, Linear magnification, m =
f f −u
Given, object distance, u = − 20 cm m = −3 (Q all real images are inverted) f So, −3 = f − (−20) f ⇒ −3 f − 60 = f ⇒ −3 = f + 20 60 4 f = − 60 ⇒ f = − = − 15 cm 4 Since, mirror is concave, f = − 15 cm
4 (b) The minimum length of the mirror required for the purpose is half the height of the person, i.e. 0.8 m.
5 (d) When an object is placed between the pole and focus of concave mirror, then a virtual, erect and magnified image is formed as shown below A′ A F
B
P
B′
Thus, mirror is concave while convex mirror produce an image reduced in size. For a plane mirror, the image is always at the same distance behind the mirror as the object is infront and of same size.
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RAY OPTICS AND OPTICAL INSTRUMENTS
6 (d) By mirror formula, image distance
10 (c) The number of images produced by
of A
the two mirrors is 360° n= −1 θ 360° ⇒ 5= −1 θ ⇒ θ = 60°
1 1 1 + = v u f ⇒
⇒
f = − 10 cm 1 1 1 + = vA u f 1 1 1 = − vA −10 (−50) 30 cm 20 cm
Now, θ − 30° = 60° − 30° = 30° 360° n= −1 ⇒ (30)°
f = –10 cm
= 12 − 1 = 11
11 (a) Linear magnification, A
C
vA = − 12.5 cm Also, image distance of C 1 1 −1 − = vC 20 10
7
⇒
10 I f = = O f − u 10 − 25
m=
−10 −2 = 15 3
4 Axial magnification = m = 9 4 Area of image = × Area of object 9 4 = × (3)2 = 4 cm 2 9 2
vC = − 20 cm The length of image = |vA − vC | = |− 12.5 − (−20)| = 7.5 cm I f (c) = O ( f − u) Since, radius of curvature R = 20 cm, R 20 then focal length, f = = = 10 cm 2 2 u = 1 m = 100 cm I −10 ⇒ = ⇒ | I | = 0.55 cm 5 −10 − (−100)
8 (b) The number of images formed depends upon the angle between the mirrors. If two mirrors make an angle θ with each other, the number of images formed is 360° n= −1 θ When mirrors are kept mutually perpendicular to each other, then θ = 90°. 360° 360° ⇒ n= − 1, n = −1 = 3 θ° 90°
9 (a) When object is placed between centre of curvature and focus, (i.e. f < u), then image will be between 2 f and ∞, real, inverted and large in size or magnified (m > −1). B object A′ C A image
m=
P
360° − 1, when 360° is odd and the θ° θ° object lies symmetrically n = 360° , when 360° is odd and the θ° θ° object lies unsymmetrically o 360 Here, = 5, so number of images 72 formed is either 5 or 4. Since, 4 is not available in option, so it is assumed that object lies unsymmetrically and number of image formed is 5.
17 (b) As the object is at focus and focal length of mirror is 20 cm. So, object is at a distance of 20 cm from mirror.
18 (b) When convergent beam incident on a plane mirror, then mirror forms real image, for a virtual object. Plane mirror I Real image
13
erect and of same size as of object. Thus, magnification of plane mirror is 1. 1 1 1 (c) The mirror formula + = is v u f valid only for mirror sizes which are very small compared to their radii of curvature to avoid spherical aberration. Also, the laws of reflection are valid for plane mirror as well as for curved surfaces. Hence, Assertion is correct but Reason is incorrect.
14 (c) From geometry of figure, the angle of deviation produced by mirror = 30° + 30° = 60°
60º 60º 30º 30º
characteristics dimensions are much larger than the wavelength of light, otherwise diffraction will take place and laws of ray optics will fail.
19 (b) In a plane mirror, the image undergoes depth inversion, hence the time on the image is as much ahead of 12 h and 0 min as the time on actual clock is behind 12 h and 0 min. Time on the image clock = 7 h and 10 min Time on the actual clock = (12 h and 0 min) − (7 h and 10 min) = 4 h and 50 min
20 (a) By concave mirror formula, 1 1 1 = + f v u Here, u = − 1.5 f and f = − f 1 1 1 We have, , = + (− f ) v (− 1.5 f ) 1 1 or v = − 3 f = v −3 f Now, magnification in mirror is given I v by m= = O −u where, I is size of image and O is size of object. Here, O = + 2.5 cm I −3f = ∴ 2.5 − (− 1.5 f ) or
B′
O Virtual object
12 (c) In a plane mirror, the image formed is
15 (d) Ray optics is valid when F
16 (b)
I = − 5 cm
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
21 (b) Angular deviation, δ = 2 π − 2θ (θ is the angle between mirror) π = 2π − 2 × = π 2
Hence, after suffering reflection from the two mirrors, the ray will travel in parallel direction to the original ray.
On differentiating Eq. (i), we get 1 1 0 = − 2 dv − 2 du v u v2 So, dv = − 2 × b (here, du = b) …(ii) u From Eq. (i), 1 1 1 u− f = − = v f u fu u u− f or = v f v f …(iii) = u u− f Now from Eqs. (ii) and (iii), 2
give virtual image but a concave mirror gives a magnified virtual image (when object is placed between F and P). Since, the boy sees his image of diminished size, so the mirror must be convex.
23 (a) The number of images, 360° −1 θ Given, θ = 60° 360° n= −1 ⇒ 60° ⇒ n = 6 −1= 5 n=
Focal length of concave mirror, f = − 20 cm By mirror formula, 1 1 1 1 1 1 or = + = − f v u v f u
shown in figure.
B′
f
placed at 2 f , the real image of the same size as that of object, is formed at 2C. So, for a concave mirror, − f m= = −1 − f − (− 2 f ) For convex mirror, f 1 m= = f − (− 2 f ) 3 less than 1 and positive, hence nature of image is erect, diminished but virtual, so this criteria of image formation is possible in convex mirror only.
31 (a) Angular velocity of mirror Angular velocity of reflected ray = 2 × 4 π = 8π rad s−1
A′
f
29 (c) For a curved mirror, when object is
= 4π rad s −1
F
C
u=−f By mirror formula, f 1 1 1 1 1 2 = − = + = ⇒ v= 2 v f u f f f i.e. the distance of the image formed is less than f .
∴ Velocity of spot, v = 10 × 8π = 80 × 3.14 = 251.2 ms−1
32 (c) The deviation produced by combination of two plane mirrors is δ = 2 π − 2θ π = 2π − 2 × (θ = 90° ) 2
27 (a) Light waves do not require a
1 1 1 1 1 = + = − v −20 (− 40) − 20 40
∴ v = − 40 cm Negative sign implies that image is in front of concave mirror, hence image is real. Magnification produced by concave mirror v (− 40) m=− =− = −1 u (− 40) The image is of the same size and inverted.
25 (b) Using the relation for the focal length of concave mirror 1 1 1 = + f v u
26 (a) Image formed by convex mirror is
B
24 (b) Distance of object, u = − 40 cm
∴
2
f Therefore, size of image = b. u− f
A
1 1 1 1 = − = 15 u 2u 2u 2u = −15 or u = − 7.5 cm
30 (b) As the magnification of image is
f dv = − b u− f
22 (b) Both concave and convex mirrors
⇒ −
…(i)
material medium for their propagation. Also, they travel through vacuum. A metallic plate kept in the path of light rays gets heated up, showing that light involves transportation of energy. Also, speed of light is 3 × 108 ms−1, which is finite.
28 (c) Focal length of concave mirror,
f = − 15 cm Magnification = 2 (for virtual image) Linear magnification, v Size of image m= =− u Size of object v or v = − 2u 2=− u 1 1 1 Now, from the relation = + f v u
90°
⇒ δ = π = 180° Hence, total deviation in incident ray is 180°.
33 (c) If lamp is placed at the focus of concave mirror, then we get parallel beam of light.
F
P
RAY OPTICS AND OPTICAL INSTRUMENTS
Topic 2
Refraction of Light at Plane Surface 2019 1 If velocity of light in air is c, what will be the velocity of light in a medium of refractive index 1.4? (a) 21 (b) 14 . × 108 m/s . × 108 m/s 8 (c) 2.8 × 10 m/s (d) None of these
[JIPMER]
2 If frequency ( ν ) of light is 5 × 1016 Hz and speed of light in air is 3 × 108 m/s. Find the ratio of wavelength of light in a medium of refractive index 2 to air. [JIPMER] 1 3 (a) (b) 3 (c) (d) 2 2 2 3 When a light ray enters from oil to glass on oil- glass interface, then velocity of light changes by a factor of [given, µ oil = 2 and µ glass = 3 / 2] [JIPMER] 4 3 (a) (b) (c) 3 (d) 1 3 4
2018 4 The refractive index of glass is 1.5. The speed of light in glass is (a) 3 × 103 m/s (c) 1× 108 m/s
[AIIMS] 8
(b) 2 × 10 m/s (d) 4 × 108 m/s
2014 5 A glass slab consists of thin uniform layers of progressively decreasing refractive indices RI (see figure) such that the RI of any layer is µ −m ∆µ. Here, µ and ∆µ denote the RI of 0th layer and the difference in RI between any two consecutive layers, respectively. The integer m = 0, 1, 2, 3, ⋅⋅⋅ denotes the numbers of the successive layers. A ray of light from the 0th layer enters the 1st layer at an angle of incidence of 30°. After undergoing the mth refraction, the ray emerges parallel to the interface. If µ = 1.5and ∆µ = 0.015, then the value of mis [WB JEE] 30° µ
i
m
(a) 20
(b) 30
8 The optical path of a monochromatic light is same, if it goes through 4 cm of glass or 4.5 cm of water. If the refractive index of glass is 1.53, the refractive index of the water is [AFMC] (a) 1.30 (b) 1.36 (c) 1.42 (d) 1.46 9 A beam of light composed of red and green rays is incident obliquely at a point on the face of a rectangular glass slab. When coming out on the opposite parallel face, the red and green rays emerge from [AFMC] (a) two points propagating in two different non-parallel directions (b) two points propagating in two different parallel directions (c) one point propagating in two different directions (d) one point propagating in the same direction 10 An objects is placed 21 cm infront of a concave mirror of radius of curvature 10 cm. A glass slab of thickness 3 cm and µ = 1. 5 is then placed close to the mirror in the space between the object and the mirror. The position of final image formed is [BHU] (a) − 3.94 cm (b) − 4.3 cm (c) − 4.93cm (d) 3.94 cm 11 If angle of incidence is twice the angle of refraction in a medium of refractive index µ, then angle of incidence µ µ [MHT CET] (b) 2sin −1 (a) 2cos −1 2 2 (c) 2cos −1 µ (d) 2sin −1 µ 12 Wavelength of light in vacuum is 5890 Å, then its wavelength in glass (µ = 1.5) will be (a) 9372 Å (b) 7932 Å (c) 7548 Å (d) 3927 Å
∆µ r
(c) 40
7 The time required for the light to pass through a glass slab (refractive index = 1.5) of thickness 4 mm is (c = 3 × 108 ms −1 , speed of light in free space) [KCET] (b) 2 × 10−11 s (a) 10−11 s (c) 2 × 1011 s (d) 2 × 10−5 s 2010
(d) 50
2011 6 Sun is visible a little before the actual sunrise and until a little after the actual sunset. This is due to (a) total internal reflection (b) reflection (c) refraction (d) polarisation
[J&K CET]
[OJEE]
13 A transparent cube of 0.21 m edge contains a small air bubble. Its apparent distance when viewed through one face of the cube is 0.10 m and when viewed from the opposite face is 0.04 m . The actual distance of the bubble from the second face of the cube is [JCECE] (a) 0.06 m (b) 0.17 m (c) 0.05 m (d) 0.04 m
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14 To a fish under water, viewing obliquely a fisherman standing on the bank of a lake, the man looks [JCECE] (a) taller than what he actually is (b) shorter that what he actually is (c) the same height as he actually is (d) depends on the obliquity 15 A ray of light is incident on surface of glass slab at an angle 45°. If the lateral shift produced per unit thickness 1 is m, the angle of refraction produced is 3 [KCET] 3 2 (b) tan −1 1− (a) tan −1 3 2 (c) sin −1 1 −
2 3
(d) tan −1
3 − 1 2
2009 16 The frequency of a light wave in a material is 2 × 1014 Hz and wavelength is 5000 Å. The refractive index of material will be [JIPMER] (a) 1.4 (b) 1.5 (c) 3 (d) 1.33
2008 17 A fish in water (refractive index n ) looks at a bird vertically above in the air. If y is the height of the bird and x is the depth of the fish from the surface, then the distance of the bird as estimated by the fish is [KCET] 1 (b) x + ny (a) x + y 1 − n 1 1 (c) x + y 1 + (d) y + x 1 − n n
2007 18 A ray of light is incident on the surface of a glass plate of
thickness t. If the angle of incidence θ is small, the emerging ray would be displaced side ways by an amount (take, n = refractive index of glass) [AIIMS] tθn t θ( n − 1) tθn t θ ( n + 1) (b) (d) (c) (a) ( n + 1) n ( n − 1) n
19 When light passes from one medium to other, then which will not change? [UP CPMT] (a) Frequency (b) Wavelength (c) Amplitude (d) Velocity 20 The refractive indices of glass and water with respect to 3 4 air are and , respectively. Then, the refractive index 2 3 of glass with respect to water is [Kerala CEE] 8 9 7 (a) (b) (c) (d) 2 9 8 6 (e) 0.5
21 In refraction, light waves are bent on passing from one medium to the second medium, because in the second medium [RPMT] (a) the frequency is different (b) the coefficient of elasticity is different (c) the speed is different (d) the amplitude is smaller 3 22 A glass has refractive index and water has refractive 2 4 index . If the speed of light in glass is 2 × 108 ms −1 , 3 then the speed of light in water in ms −1 is [AMU] (a) 1.5 × 106 (b) 1.78 × 108 (c) 2.25 × 108 (d) 2.67 × 108 23 A vessel of height 2 d is half-filled with a liquid of refractive index 2 and the other half with a liquid of refractive index n (the given liquids are immiscible). Then, the apparent depth of the inner surface of the bottom of the vessel (neglecting the thickness of the bottom of the vessel) will be [KCET] d ( n + 2 ) n (b) (a) n 2 d (n + 2 ) 2n nd (c) (d) d (n + 2 ) d + 2n
2006 24 A transparent cube of 15 cm edge contains a small air bubble. Its apparent depth when viewed through one face is 6 cm and when viewed through the opposite face is 4 cm. Then, the refractive index of the material of the cube is [Manipal]
(a) 2.0 (c) 1.6
(b) 2.5 (d) 1.5
25 Maximum lateral displacement of a ray of light incident on a slab of thickness t is [J&K CET] t t t (b) (c) (d) t (a) 2 3 4 26 Considering normal incidence of ray, the equivalent refractive index of combination of two slabs shown in figure is [AMU] Air 10 cm
4 µ1 = 3 µ2 =
3 2
15 cm Air
(a) 1.8 (c) 2
(b) 1.43 (d) None of these
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RAY OPTICS AND OPTICAL INSTRUMENTS
27 A light ray in between two media as given below. The angle of incidence on the boundary in all the cases is 30°. Identify the correct sequence of increasing order of angles of refraction
2005 28 The apparent depth of water in cylindrical water tank of
diameter 2R cm is reducing at the rate of x cm min −1 when water is being drained out at a constant rate. The amount of water drained in cc per minute is (n1 = refractive index of air and n 2 = refractive index of water) [AIIMS] 2 π R n1 x π R 2 n1 x π R 2 n2 2 (a) (d) π R x (b) (c) n2 n2 n1
(1) air to water (2) water to glass (3) glass to water
(Refractive indices of glass and water are respectively 3 4 and ) [EAMCET] 2 3 (a) 1, 2, 3 (c) 3, 1 , 2
29 A plane glass slab is kept over various colour letters, the letter which appears least raised is [BHU] (a) red (b) violet (c) green (d) blue 3
(b) 2, 3, 1 (d) 1, 3, 2
Answers (a) (a) (c)
1 11 21
(a) (d) (c)
2 12 22
(a) (a) (b)
3 13 23
4 14 24
(b) (a) (d)
5 15 25
(d) (b) (d)
6 16 26
(c) (c) (b)
7 17 27
(b) (b) (a)
8 18 28
(b) (b) (b)
(b) (a) (a)
9 19 29
10 20
(c) (b)
Explanations 1 (a) Refractive index of medium
4 (b) From Snell’s law of refraction, sin i µ 2 v1 = = sin r µ 1 v2
Speed of light in vacuum = Speed in medium ⇒ Speed of light in medium Speed of light in vacuum = Refractive index c 3 × 88 ⇒v = = n 14 . = 2 .14 × 108 m/s
2 (a) v = νλ, where ν is same for a source of light. ⇒
v ∝ λ,
v1 λ 1 = v2 λ 2
c c and v2 (in air) = =c n1 n2 λ c / n1 1 1 ⇒ 1= = = [Q n1 = 2 ] λ2 c n1 2
But v1 =
3 (a) Given, µ oil = 2 and µglass = 3 / 2 Velocity of light in oil is given by Velocity of light (c) c voil = = µ oil µ oil c Similarly,vglass = µglass ∴
vglass voil
= =
c / µ glass c / µ oil 2 4 = 3/ 2 3
=
µ oil µglass
Given, v1 = 3 × 108 m/s µ2 1 = µ 2 = 15 . µ1 v2 =
= 2 × 10 m/s
5 (d) By Snell’s law,
µ1 sin i = µ 2 sin r µ sin i = (µ − m ∆µ )sin r Given, µ = 1.5, i = 30° , r = 90° and ∆µ = 0.015 1.5 sin 30° = (1.5 − m × 0.015) sin 90° 3 1 × = (1.5 − m × 0.015) × 1 2 2 3 3 −15 m − = 4 2 1000 3 3 ⇒ 15m = − × 1000 2 4
⇒
actual sunrise and until a little after the actual sunset. This is due to refraction.
7 (b) We know that, na ca = ngcg ng na
v1 3 × 108 3 × 108 m/s = = 1 3/ 2 . 15 µ2 8
⇒
6 (c) Sun is visible a little before the
6−3 15m = × 1000 4 3 1000 m= × 4 15 3000 m= 60 m = 50
ng na
= 1.5 = =
ca cg
3 2
⇒
3 3 × 108 = 2 cg
cg = 2 × 108
⇒
We have, Time = t=
4 × 10−3 2 × 108
Distance Speed or t = 2 × 10−11 s
8 (b) As optical paths are equal, hence ⇒
ng xg = nw xw xg nw = ng xw
= 1.53 ×
4 = 1.36 4.5
9 (b) In any medium other than air or vacuum, the velocities of different colours are different. Therefore, both red and green colours are refracted at different angles of refractions. Hence, after emerging from glass slab through opposite parallel face, they appear at two different points and move in two different parallel directions.
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10 (c) Due to glass slab, increase in path
= (µ − 1) t = (1.5 − 1) 3 cm = 1.5 cm ∴ u′ = − (21 + 1.5) = − 22.5cm 1 1 1 Now, + = − 22.5 v −5 1 1 1 = − ⇒ v 22.5 5 1 5 − 22.5 = ⇒ v 22.5 × 5 22.5 × 5 = − 6.43 cm −17.5 Geometrical distance = − (6.43 − 1.5) ⇒
v=
point O′. Therefore, it appears to the fish as if the man is taller than what he actually is O′ O Air Water N Fish
15 (b) Here, angle of incidence, i = 45° Lateral shift (d ) 1 = Thickness of glass slab (t ) 3
= − 4.93 cm
11 (a) According to Snell’s law,
⇒ ⇒ ⇒ ⇒
12 (d) Given, wavelength in vacuum
= 5890 Å In a medium of refractive index µ, the wavelength of light decreases to λ 5890 = = 3927 Å µ 1.5
13 (a) Refractive index =
Real depth Apparent depth
x
0.21–x
x 0.21 − x = 0.04 0.10 ⇒ 0.21 × 0.04 − x × 0.04 = 0.10 x 0.21 × 0.04 x= = 0.06 m ⇒ 0.14
∴
14 (a) When a ray from man O in air (rarer medium) goes to water (denser medium), then it bends towards the normal. Extend MN backwards meet at
⇒ ⇒
⇒ ⇒
∴
2 3
r = tan −1 1 −
2 3
16 (c) Velocity of light waves in material is ...(i) v = νλ Refractive index of material is c ...(ii) µ= v where, c is speed of light in vacuum or c air, ...(iii) µ= νλ Given, ν = 2 × 1014 Hz, λ = 5000 Å = 5000 × 10−10 m and
P
N θ B
d=
1 1 = (1 − tan r) 3 2
⇒ tan r = 1 −
A
c = 3 × 108 m s−1
From Eq. (iii), we get 3 × 108 =3 µ= 14 2 × 10 × 5000 × 10−10
r
Q
t
r
i = 2r sin 2r µ= sin r 2sin r cos r µ= sin r µ cos−1 = r 2 µ i = 2 cos−1 2
18 (b) In ∆BCE,
–
⇒
Given,
t sin δ t sin(i − r) = cos r cos r d sin (i − r) = t cos r d sin i cos r − cos i sin r = t cos r d sin 45° cos r − cos 45° sin r = t cos r cos r − sin r = 2 cos r d 1 = (1 − tan r) t 2
Lateral shift,
observer is in denser medium, then normal shift, d = (n − 1)h where, h = real depth = y Now, apparent depth or the apparent height of the bird from the surface of the water = y + (n − 1) y = ny. The total distance of the bird as estimated by fish is x + ny.
θ
Refractive index, sin i µ= sin r
M
17 (b) When object is in rarer medium and
S
M
90° d
E
C
R F D
CE BC ⇒ CE = BC sin (θ − r) ⇒ d = BC sin (θ − r) …(i) BM In ∆BMC, cos r = BC BM t …(ii) = ⇒ BC = cos r cos r From Eqs. (i) and (ii), we get t d= sin (θ − r) cos r t (sin θ cos r − cosθ sin r) ⇒ d= cos r sin r = tan r Q cos r d = t (sin θ − cosθ tan r) If n is the refractive index of material of slab (glass) w.r.t. air, then sin θ n= sin r θ For small angle, n = r θ or r = and d = t (θ − 1⋅ r) n (Q sin θ ≈ θ and cosθ ≈ 1, if θ is small) θ 1 d = t θ − = t θ 1 − n n sin (θ − r) =
⇒
d=
t θ (n − 1) n
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RAY OPTICS AND OPTICAL INSTRUMENTS
19 (a) When light passes from one
20
medium to another, its frequency does not change. As intensity ∝ (amplitude) 2 and intensity changes in refraction so, amplitude also changes. The wavelength and velocity of light also changes with refractive index. (b) Refractive index of glass with 3 respect to air, a µ g = 2 Refractive index of water with respect 4 to air, a µ w = 3 Refractive index of glass with respect to water, 3 2 9 aµ g = µ = = w g 4 8 µ a w 3
21 (c) 1µ 2 =
=
Speed of light in second medium Speed of light in first medium
where, 1µ 2 is refractive index of second medium relative to the first medium. Hence, we see that on passing through another medium, speed of light changes due to which it bends, because wavelength changes.
22 (c) Since, µv = constant 3 4 (2 × 108 ) = vw 2 3 ⇒ vw = 2.25 × 108 ms−1
∴
=
d (n + 2 ) n 2
24 (d) Let real depth of the bubble from one side is x and apparent depth is 6. Refractive index, Real depth µ= Apperent depth x 15 − x Then, µ= = 6 4 ⇒ x = 9 cm x 9 Hence, µ = = = 1.5 6 6
25 (d) As, lateral shift in rectangular glass sin(i − r) , maximum cos r displacement will be d = t Hence, maximum lateral displacement is t. slab, d = t
or 2µ 1
Speed of light in first medium Speed of light in second medium
Similarly, for 2nd liquid, d n= x2 d ⇒ x2 = n Total apparent depth = x1 + x2 d d = + 2 n
µ gvg = µ w vw ,
23 (b) Refractive index,
Real depth (d ) Apparent depth (x ) d For 1st liquid 2 = x1 d ⇒ x1 = 2 µ=
26 (b) The equivalent refractive index of combination of slabs for normal incidence is Σti µ= t Σ i µi t +t In this case, µ = 1 2 t1 t + 2 µ1 µ2 10 + 15 ⇒ = 10 15 + 4 / 3 3/ 2 25 25 = = 7.5 + 10 17.5 = 1.43
27 (a) In case (i), ray travels from air (rarer) to water (denser) medium, so it bends towards the normal. In case (ii), ray travels from water (less rarer than glass to glass (denser), so it bends (less than as in case (i)) towards the normal. In case (iii), ray travels from glass (denser) to water (rarer), so it bends away from the normal. Hence, correct sequence will be (a).
28 (b) Let actual height of water in cylindrical tank be h. n2 Actual depth = n1 Apparent depth n2 h or = n1 x dh n2 dt or = n1 dx dt dh n2 dx ∴ = × dt n1 dt or
Change in actual rate of flow n2 = × Change in apparent rate of flow n1 dh n2 or = × x cm min −1 ...(i) dt n1
Thus, amount of water drained in cc per min dh = × πR 2 dt n [from (i)] = 2 × x × πR 2 n1 ⇒
= x π R2
n2 n1
29 (a) We know that, µ =
Real depth Apparent depth
Red colour has minimum value of refractive index and thus maximum value of apparent depth. Hence, it should be raised least.
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 3
Total Internal Reflection 2019 1 In total internal reflection, when the angle of incidence is equal to the critical angle for the pair of media in contact, what will be angle of refraction? [NEET] (a) 0º (b) Equal to angle of incidence (c) 90º (d) 180º
2 Find the value of θ in the given diagram. θ
2 (a) sin −1 3 1 (c) sin −1 2
[JIPMER]
m=2/Ö3
1 (b) sin −1 3 1 (d) sin −1 2
2014 3 In vacuum, to travel distance d, light takes time t and in medium to travel 5d, it takes time T. The critical angle of the medium is [MHT CET] 5T 5t 5t 3t (a) sin −1 (b) sin −1 (c) sin −1 (d) sin −1 t 3T T 5T
2013 4 If the critical angle for total internal reflection from medium to vacuum is 30°, the velocity of light in medium is [Manipal] (a) 3 × 108 m / s (b) 1.5 × 108 m / s 8 (c) 6 × 10 m / s (d) 3 × 108 m / s
5 When a ray of light enters from one medium to another, then its velocity in second medium becomes double. The maximum value of angle of incidence, so that total internal reflection may not take place will be [KCET] (a) 60° (b) 180° (c) 90° (d) 30° 2012 6 If the refractive index of water is 4/3 and that of given slab of glass immersed in it is 5/3, what is the critical angle for a ray of light tending to go from glass to water? [UP CPMT]
3 (a) sin −1 4 3 (b) sin −1 5 4 (c) sin −1 5 (d) Data given are insufficient to make any calculation
2011 7 Light travels in two media A and B with speeds
1.8 × 108 ms −1 and 2.4 × 108 ms −1 respectively. Then, the critical angle between them is [Kerala CEE] −1 2 −1 3 (a) sin (b) tan 3 4 2 3 (d) sin −1 (c) tan −1 3 4 1 (e) sin −1 4 4 8 A diver at a depth of 12 m in water µ = sees, the 3 sky in a cone of semi-vertical angle is [WB JEE] 4 4 (b) tan −1 (a) sin −1 3 3 −1 3 (c) sin (d) 90° 4
2011 9 In optical fibres, the refractive index of the core is (a) grater than that of the cladding (b) equal to that of the cladding (c) smaller than that of the cladding (d) independent of that of the cladding
[DUMET]
10 Wavelength of given light waves in air and in a medium are 6000 Å and 4000 Å respectively. The critical angle is 2 3 [KCET] (a) tan −1 (b) tan −1 3 2 2 3 (d) sin −1 (c) sin −1 3 2 2010 11 A ray of light travelling in transparent medium of refractive index µ falls on a surface separating the medium from air at an angle of incidence of 45°. For which of the following value of µ, the ray can undergo total internal reflection? (a) µ > 1.33 (b) µ > 1.4 [CBSE AIPMT] (c) µ > 1.5 (d) µ > 1.25 12 Which one of the following is not associated with the total internal reflection? [Manipal] (a) The mirage formation (b) Optical fibre communication (c) The glittering of diamond (d) Dispersion of light
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RAY OPTICS AND OPTICAL INSTRUMENTS
13 A ray of light strikes a plane water-air interface from within the water at an angle of incidence i. Which one of the following statements is correct? [Manipal] (a) If i is 90°, the angle of refraction will be the critical angle. (b) If i is equal to the critical angle, the reflected and refracted rays will be at right angles to each other . (c) If i is less than the critical angle, all the light is refracted and the angle of refraction is greater than i. (d) If i is less than the critical angle, some light is refracted and the angle of reflection is less than the critical angle. 14 If refractive index of glass is 1.50 and of water is 1.33, then critical angle is [Manipal] −1 8 −1 2 (b) sin (a) sin 9 3 8 (c) cos −1 (d) None of these 9 15 A light ray going from air is incident (as shown in figure) at one end of a glass fibre (refractive index, µ = 1.5) making an incidence angle of 60° on the lateral surface, so that it undergoes a total internal reflection. How much time would it take to traverse the straight fibre of length 1 km? [OJEE]
(a) 3.3 µs
[DUMET]
22 A small coin is resting on the bottom of a beaker filled with a liquid . A ray of light from the coin travels upto the surface of the liquid and moves along its surface. 3 cm
60°
(b) 6.6 µs
Glass
(c) 5.7 µs
Coin
(d) 3.85 µs
16 A ray of light travels from an optically denser medium towards rarer medium. The critical angle for the two media is C. The maximum possible angle of deviation of the ray is π (a) − C 2
21 Sparkling of diamond is because of (a) total internal reflection (b) refraction (c) diffraction (d) scattering 2007
4 cm
Air Air
19 The critical angle for total internal reflection in diamond is 24.5°. The refractive index of the diamond is [DUMET] (a) 2.45 (b) 1.41 (c) 2.59 (d) 1.59 2008 20 A fish looking up through the water sees the outside world, contained in a circular horizon. If the refractive 4 index of water is and the fish is 12 cm below the water 3 surface, the radius of this circle in cm is [AIIMS] 36 (b) (a) 36 7 7 (d) 4 5 (c) 36 5
[EAMCET]
(b) π − 2 C
(c) 2 C
π (d) + C 2
2009 17 Assertion Endoscopy involves use of optical fibres to study internal organs. Reason Optical fibres are based on phenomenon of total internal reflection. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is not correct. (d) Assertion is incorrect but Reason is correct. 18 The refractive index of water is 1.33. The direction in which a man under water should look to see the setting sun is [Manipal] (a) 49° to the horizontal (b) 90° will be vertical (c) 49° to the vertical (d) along the horizontal
How fast is the light travelling in the liquid? [CBSE AIPMT] (b) 2.4 × 108 ms −1 (a) 1.8 × 108 ms −1 (c) 3.0 × 108 ms −1 (d) 1.2 × 108 ms −1
23 Total internal reflection takes place [AFMC] (a) when a ray moves from denser to rarer and incident angle is greater than critical angle (b) when a ray moves from rarer to denser and incident angle is less than critical angle (c) when a ray moves from rarer to denser and incident angle is equal to critical angle (d) None of the above 24 A ray of light is travelling from glass to air (refractive index of glass = 1.5). The angle of incidence is 50°. The deviation of the ray is [KCET] (a) 0° (b) 80° sin50° sin50° (c) 50° − sin −1 (d) sin −1 − 50° 1.5 1.5 25 The instrument used by doctors for endoscopy works on the principle of [BCECE] (a) total internal reflection (b) reflection (c) refraction (d) None of the above
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2006
2005
26 Light enters at an angle of incidence in a transparent rod of refractive index of the material of the rod. The light once entered into it will not leave it through its lateral face so, whatever be the value of angle of incidence? [AFMC] (a) n > 2 (b) n = 1 (c) n = 1.1 (d) n = 1.3
27 Assertion Diamond glitters brilliantly. Reason Diamond does not absorb sunlight. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
Answers 1 11 21
(c) (b) (a)
(b) (d) (a)
2 12 22
3 13 23
(c) (c) (a)
4 14 24
(b) (a) (b)
5 15 25
(d) (d) (a)
6 16 26
(c) (a) (a)
7 17 27
(d) (a) (b)
8 18
(c) (c)
9 19
(a) (a)
10 20
(c) (b)
Explanations 1 (c) The total internal reflection is the phenomenon of reflection back of light in the denser medium when it travels from denser to rarer medium, when the angle of incidence is greater than the critical angle. While the critical angle for a pair of given media in contact, the angle of incidence in denser medium for which the angle of refraction in rarer medium is 90°.
2 1 2 sin 30° = . 3 2 3 1 sin θ = 3 1 θ = sin −1 3
⇒ (1) sin θ = ⇒ ⇒
3 (c) In vacuum, c = d / t In medium, v =
Normal
ic
Denser r=90°
2 (b)
Rarer
B θ
θ1
A
C
(90°–θ1) µ=2/√3
Since, BC grazes along surface ⇒ angle (90 − θ 1 ) = critical angle C 1 ∴ sin C = µ 3 3 sin (90 − θ 1 ) = ⇒ cosθ 1 = 2 2 ⇒ θ 1 = 30° Now, using Snells’ law on 1st interface, n1 sin θ = n 2 sin θ 1
5d T
As refractive index, c d /t T µ= = = v 5d /T 5t 1 Also, sinC = µ (∴ C is critical angle) 5t C = sin −1 ∴ T
4 (b) Refractive index of medium, 1 sinC where, C is critical angle. Given, C = 30° 1 1 µ= = =2 ∴ sin 30° 1/ 2 v From Snell’s law, µ = 0 vm µ=
where, v0 is speed of light in vacuum and vm the velocity in medium. 3 × 108 = 1.5 × 108 m/s ∴ vm = 2
vrarer 2 = vdenser 1 1 2 (∴ C is critical angle) µ= = sinC 1
5 (d) µ =
sinC =
1 ⇒ C = 30° 2
6 (c) As light ray is going from glass to water and if C is critical angle, then sinC =
1 µ = w µ µg g w
µ 4 / 3 C = sin −1 w = sin −1 5/ 3 µg 4 = sin −1 5
7 (d) If C is critical angle, then speed of light, v1 = 18 . × 108 m/s and v2 = 2.4 × 108 m/s v C = sin −1 1 v2 1.8 × 108 3 = sin −1 = sin −1 8 4 2.4 10 ×
8 (c) We can represent this diagrammatically as
C 12 m C
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RAY OPTICS AND OPTICAL INSTRUMENTS
Thus, we see that
15 (d) When total internal reflection just takes place form lateral surface i = C , i.e. 60° = C 1 ⇒ sin 60° = sin C = µ 2 ⇒ µ= 3 and x = 1km = 1 × 103 m Time taken by light to traverse some distance in a medium, 2 × 103 µx 3 t= = c 3 × 108 = 3.85 µs
1 3 C = sin −1 = sin −1 4 µ
9 (a) In optical fibres, the refractive index of the core is greater than that of the cladding. Thus, the core act as denser medium and cladding as rarer medium. For angle of incidence greater than critical angle, the ray forward through total internal reflection.
10
1 1 6000 λ (c) = 1, = sinC λ 2 sinC 4000 1 3 2 = ⇒ sinC = sinC 2 3 −1 2 ⇒ C = sin 3
16 (a) When the ray passes into the rarer medium, the deviation is δ = φ − θ. This can have a maximum value π of − C , 2
11 (b) For total internal reflection, i > C 1 ⇒ sin i > sin C ⇒ sin 45° > µ ⇒
µ > 2 ⇒ µ > 1.4
with total internal reflection.
14 (a) When a ray of light passes from a denser medium to a rarer medium, it bends away from the normal at the interface of the two media. The angle of incidence is measured with respect to the normal at the refractive boundary. It is given by
18 90°
θ
where, C is critical angle, n2 is the refractive index of rarer medium and n1 of the denser medium. Given, n2 = 133 . and n1 = 1.50 1.33 C = sin −1 1.50 −1 8
C = sin 9
⇒
internal reflection at each stage, hence a signal in the form of light is directed at one end of fibre at a suitable angle, undergoes repeated total internal reflection. Hence, this helps in visual examination of internal organs in endoscopy. Therefore, both Assertion and Reason are correct and Reason is the correct explanation of Assertion. 1 1 (c) sin θ = = µ w 1.33 −1 1 ⇒ θ = sin = 49° to the vertical 1.33
AB = OA tanθC OA AB = = µ 2 −1
12 2
4 −1 3
=
36 7
1 ∴ tanθC = µ 2 − 1
21 (a) The brilliance of diamond is due to total internal reflection of light. µ for diamond is 2.42, so that critical angle for diamond-air interface as calculated is 24.4°. The diamond is cut suitably so that light entering the diamond from any face falls at an angle greater than 24.4°; suffers multiple total internal reflection at the various faces and remains with in the diamond. Hence, the diamond sparkles.
the coin will not emerge out of liquid, if i > C. Therefore, minimum radius R corresponds to i = C . 3 cm R
A
R
S′
In ∆ SAB, ⇒ ⇒
R = tan C h R = h tan C h R= 2 µ −1
Given, R = 3 cm and h = 4 cm
C
∴
θC
But O
C
µ
B
A’
C
20 (b) The situation is shown in figure A
B
4 cm h
critical angle, then 1 µ= sinC 1 µ= ⇒ sin 24.5 ⇒ µ = 2.45
12 cm
1 AB ⇒ tanθC = µ AO
22 (a) As shown in figure, a light ray from
19 (a) If µ is the refractive index and C is
C
n C = sin −1 2 n1
⇒
Denser
17 (a) As optical fibre involves total
then all the light is refracted and the angle of refraction is greater than i.
Rarer 2 Denser 1
φ
π when θ = C and φ = . 2
12 (d) Dispersion of light is not associated 13 (c) If i is less than the critical angle,
Rarer
sinθC =
1
√µ2 – 1
3 1 25 5 = ⇒ µ2 = ⇒µ= 4 9 3 µ2 − 1 µ=
c c 3 × 108 ⇒ v= = µ 5/ 3 v
= 1.8 × 108 ms−1
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
23 (a) Total internal reflection takes place
25 (a) An endoscope is made by optical
when ray goes from denser to rarer medium and incident angle is greater than critical angle.
24 (b) Refractive index, a µ g = 1.5 1 = 1.5 sinC
When the angle of incidence in the denser medium is greater than the critical angle, total internal reflection takes place inside the denser medium. Hence, a ray of light, incident at 50° in glass medium undergoes total internal reflection. Deviation, δ = (180° − (50° + 50° )
refracted beam is AB. At the lateral face, the angle of incidence is θ. For no refraction at this face, θ > C. i.e. sin θ > sin C but
⇒ or
B
i
r
sinC =
27 (b) The critical angle for diamond-air
θ
is nearly 24°. The faces of diamond are cut in such a way that the light ray entered inside the diamond falls on the diamond-air interface at an angle greater than the critical angle and so it suffers repeated total internal reflections and comes out of its faces only in some specific directions. When diamond is seen in these directions, it appears bright and shining. It is understood that it absorbs no light falling on it.
sin (90° − r) > sin C …(i) cos r > sin C sin i By Snell’s law, n= sin r sin i sin r = ⇒ n
50° 50°
sin 2 i > sin C n2
The maximum value of sin i is 1. ⇒ n2 > 2 or n > 2
θ + r = 90° ⇒ θ = 90° − r
A
1−
1 n sin 2 i 1 1− 2 > 2 n n n2 > sin 2 i + 1
Also,
∴ or
δ
∴
From Eq. (i),
26 (a) Let a light ray enters at A and
⇒ C = 42° ∴ Critical angle for glass = 42°
sin 2 i cos r = 1− sin 2 r = 1 − 2 n
∴
fibres and its interior surface is coated with a material which have the greater refractive index, than that of the outer cover (glass). Hence, it is based on total internal reflection.
δ = 80°
Topic 4
Prism and Lens 2019 1 Two similar thin equi-convex lenses, of focal length f each, are kept co-axially in contact with each other such that the focal length of the combination is F1 . When the space between the two lenses is filled with glycerine (which has the same refractive index (µ = 15 . ) as that of glass), then the equivalent focal length is F2 . The ratio of [NEET] F1 : F2 will be (a) 1 : 2 (b) 2 : 3 (c) 3 : 4 (d) 2 : 1
2 Which colour of the light has the longest wavelength? (a) Blue (b) Green [NEET] (c) Violet (d) Red
4 A double convex lens has focal length 25 cm. The radius of curvature of one of the surfaces is doubled of the other. Find the radii, if the refractive index of the material of the lens is 1.5. [NEET (Odisha)] (a) 100 cm and 50 cm (b) 25 cm and 50 cm (c) 18.75 cm and 37.5 cm (d) 50 cm and 100 cm 5 Calculate the focal length of given lens, if the magnification is −0.5.
3 An equi-convex lens has power P. It is cut into two symmetrical halves by a plane containing the principal axis. The power of one part will be [NEET(Odisha) ] (a) 0
(b)
P 2
(c)
P 4
(d) P
O
(a) 6.66 cm (c) 3.88 cm
20 cm
(b) 5.44 cm (d) 1.38 cm
[AIIMS]
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RAY OPTICS AND OPTICAL INSTRUMENTS
6 Find the position of final image from first lens. Given, focal length of each lens is 10 cm. [JIPMER] object
1
40 cm
(a) 40 cm
2
30 cm
(b) 50 cm
12 If minimum deviation = 30°, then speed of light in shown prism will be
3
60°
30 cm
(c) 45 cm
(d) 55 cm
2018 7 The refractive index of the material of a prism is 2 and the angle of the prism is 30°. One of the two refracting surfaces of the prism is made a mirror inwards by silver coating. A beam of monochromatic light entering the prism from the other face will retrace its path (after reflection from the silvered surface) if its angle of incidence on the prism is [JIPMER] (a) 30° (b) 45° (c) 60° (d) zero
8 Assertion Angle of deviation depends on the angle of prism. Reasion For thin prism, δ = (µ − 1) A where, δ = angle of deviation, µ = refractive index and A = angle of prism [NEET] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct. 9 A thin prism having refracting angle 10° is made of glass of refractive index 1.42. This prism is combined with another thin prism of glass of refractive index 1.7. This combination produces dispersion without deviation. The refracting angle of second prism should be [NEET] (a) 4° (b) 6° (c) 8° (d) 10° 10 A lens of refractive index µ is put in a liquid of refractive index µ ′. If the focal length of lens in air f, then its focal length in liquid will be [NEET] − f µ ′ (µ − 1) − f (µ ′− µ ) (b) (a) (µ ′− µ ) µ ′ (µ − 1) µ ′ (µ − 1) fµ′µ (c) − (d) (µ − µ ′ ) f (µ ′− µ ) 11 Two identical glass (µ g = 3/ 2) equi-convex lenses of focal length f each are kept in contact. The space between the two lenses in filled with water (µ w = 4 / 3). The focal length of the combination is [NEET] (a) f / 3 (b) f 4f 3f (c) (d) 3 4
(a) (c)
3 2 2 3
8
× 10 m/s
(b)
× 108 m/s
(d)
1 2
[JIPMER] 8
× 10 m/s
2 × 108 m/s 3
13 A prism of crown glass with refracting angle of 5º and mean refractive index = 1.51 is combined with a flint glass prism of refractive index = 1.65 to produce no deviation. Find the angle of flint glass. [JIPMER] (a) 3.92º (b) 4.68º (c) 5.32º (d) 7.28º
2017 14 A thin prism P1 of angle 4° and refractive index 1.54 is combined with another prism P2 of refractive index 1.72 produce dispersion without deviation, the angle of P2 is [NEET]
(a) 4°
(b) 5.33
(c) 2.6°
(d) 3°
15 A thin symmetrical double convex lens of refractive index µ 2 = 15 . is placed between a medium of refractive index µ 1 = 14 . to the left and another medium of refractive index µ 3 = 1⋅ 6 to the right. Then, the system behaves as (a) a convex lens (b) a concave lens [JIPMER] (c) a glass plate (d) a convexo concave lens 16 The plane face of a plano-convex lens is silvered. If µ be the refractive index and R be the radius of curvature of curved surface, then system will behave like a concave mirror of curvature [JIPMER] 2 (a) µR (b) R /µ (c) R / (µ − 1) (d) [(µ + 1) / (µ − 1)]R
2016 17 The angle of incidence for a ray of light at a refracting surface of a prism is 45°. The angle of prism is 60°. If the ray suffers minimum deviation through the prism, the angle of minimum deviation and refractive index of the material of the prism respectively, are [NEET] (a) 30° and 2 (b) 45° and 2 1 1 (d) 45° and (c) 30° and 2 2
18 The refracting angle of a prism is A and refractive index of the material of the prism is cot (A/ 2). The angle of minimum deviation is [NEET] (a) 180°−3A (b) 180°−2A (c) 90°− A (d) 180°+2A
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2015 19 Two identical thin plano-convex glass lenses (refractive index 1.5) each having radius of curvature of 20 cm are placed with their convex surfaces in contact at the centre. The intervening space is filled with oil of refractive index 1.7. The focal length of the combination is [NEET] (a) − 20 cm (b) − 25 cm (c) − 50 cm (d) 50 cm
2014 20 The angle of a prism is A. One of its refracting surfaces is silvered. Light rays falling at an angle of incidence 2A on the first surface returns back through the same path after suffering reflection at the silvered surface. The refractive index µ of the prism is [CBSE AIPMT] 1 (a) 2sin A (b) 2 cos A (c) cos A (d) tan A 2 21 The equi-convex lens has focal length f. If it is cut perpendicular to the principal axis passing through optical centre, then focal length of each half is [MHT CET] 3f t (d) 2 f (a) (b) f (c) 2 2 22 Two lenses of power 15 D and −3D are placed in contact. The focal length of the combination is [Kerala CEE] (a) 10 cm (b) 15 cm (c) 12 cm (d) 18 cm (e) 8.33 cm
27 A focal length of a lens is 10 cm. What is power of a lens in dioptre? [KCET] (a) 0.1 D (b) 10 D (c) 15 D (d) 1 D
2013 28 A plano-convex lens fits exactly into a plano-concave lens. Their plane surfaces are parallel to each other. If lenses are made of different materials of refractive indices µ 1 & µ 2 and R is the radius of curvature of the curved surface of the lenses, then the focal length of the combination is [NEET] R R (b) (a) 2 (µ 1 + µ 2 ) 2 (µ 1 − µ 2 ) (c)
R (µ 1 − µ 2 )
(a) 4d
(b) 2d
d (d) 4
[WB JEE]
24 An object is placed 30 cm away from a convex lens of focal length 10 cm and a sharp image is formed on a screen. Now, a concave lens is placed in contact with the convex lens. The screen now has to be moved by 45 cm to get a sharp image again. The magnitude of focal length of the concave lens is (in cm) [WB JEE] (a) 72 (b) 60 (c) 36 (d) 20 25 A thin glass (refractive index 1.5) lens has optical power of −5D in air. Its optical power in a liquid medium with refractive index 1.6 will be [UK PMT] (a) 1 D (b) −1D (c) 25 D (d) −25 D 26 A concave lens of focal length f forms an image which is 1 times the size of the object. Then, the distance of object 3 from the lens is [EAMCET] 2 3 (d) f (a) 2 f (b) f (c) f 3 2
2R (µ 1 − µ 2 )
29 A hollow prism is filled with water and placed in air. It will deviate the incident rays [AIIMS] (a) towards the base (b) away from base (c) parallel to base (d) towards or away from base depending on the location 30 The graph between the image distance ( v ) and object distance ( u ) from the convex lens is [AIIMS] (a)
v
23 A luminous object is separated from a screen by distance d. A convex lens is placed between the object and the screen such that it forms a distinct image on the screen. The maximum possible focal length of this convex lens is d (c) 2
(d)
(b)
v
Ou
u
(c)
v
(d) u
v
u
31 A concave mirror of focal length f in vacuum is placed in a medium of refractive index 2. Its focal length in the medium is [WB JEE] f (b) f (c) 2 f (d) 4 f (a) 2 32 A balloon is filled with hydrogen. For sound waves, this balloon behaves like [KCET] (a) a converging lens (b) a diverging lens (c) a concave mirror (d) None of these
2012 33 When a biconvex lens of glass having refractive index 1.47 is dipped in a liquid, it acts as a plane sheet of glass. This implies that the liquid must have refractive index (a) equal to that of glass [CBSE AIPMT] (b) less than one (c) greater than that of glass (d) less than that of glass
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RAY OPTICS AND OPTICAL INSTRUMENTS
34 For the angle of minimum deviation of a prism to be equal to its refracting angle, the prism must be made of material whose refractive index [CBSE AIPMT] (a) lies between 2 and 1 (b) lies between 2 and 2 (c) is less than 1 (d) is grater than 2 35 A ray of light is incident at an angle of incidence on one face of a prism of angle A (assumed to be small) and emerges normally from the opposite face. If the refractive index of the prism is µ, the angle of incidence i, is nearly equal to [CBSE AIPMT] µA (a) µA (b) 2 A A (d) (c) µ 2µ 36 A thin convex lens of refractive index 1.5 has 20 cm focal length in air. if the lens is completely immersed in a liquid of refractive index 1.6, its focal length will be [AIIMS] (a) −160 cm (b) −100 cm (c) + 10 cm (d) + 100 cm 37 The focal length of an equi-convex lens is greater than the radius of curvature of any of the surfaces. Then, the refractive index of the material of the lens is [AFMC] (a) greater than zero but less than 1.5 (b) greater than 1.5 but less than 2.0 (c) greater than 2.0 but less than 2.5 (d) greater than 2.5 but less than 2.0 38 A thin plano-convex lens acts like a concave mirror of focal length 0.2 m when silvered from its plane surface. The refractive index of the material of the lens is 1.5. The radius of curvature of the convex surface of the lens will be (a) 0.1 m (b) 0.75 m [Manipal] (c) 0.4 m (d) 0.2 m
2011 39 A convex lens has a radius of curvature of magnitude 20cm.Which one of the following options describe best the image formed of an object of height 2 cm placed 30 cm from the lens? [CBSE AIPMT] (a) Virtual, upright and height = 0.5 cm (b) Real, inverted and height = 4 cm (c) Real, inverted and height = 1 (d) Virtual, upright and height = 1 40 A ray of light is incident at an angle 60° on one face of a prism of angle 30° and the emergent ray makes 30° with the incident ray. The refractive index of the prism is [Kerala CEE]
(a) 1.732 (e) 1.6
(b) 1.414
(c) 1.5
(d) 1.33
41 Two thin lenses of focal lengths 20 cm and 25 cm are placed in contact. The effective power of the combination is [WB JEE] (a) 9 D (b) 2 D (c) 3 D (d) 7 D 42 A convex lens of focal length 30 cm produces 5 times magnified real image of an object. What is the object distance? [WB JEE] (a) 36 cm (b) 25 cm (c) 30 cm (d) 150 cm 43 A plano-concave lens is made of glass of refractive index 1.5 and the radius of curvature of its curved face is 100 cm. What is the power of the lens? [WB JEE] (a) + 0.5 D (b) − 0.5 D (c) − 2D (d) + 2D 44 A transparent plastic bag filled with air forms a concave lens. Now, if this bag is completely immersed in water, then it behaves as [J&K CET] (a) divergent lens (b) convergent lens (c) equilateral prism (d) rectangular slab 45 Given figures show the arrangements of two lenses. The radii of curvature of all the curved surfaces are same. The ratio of the equivalent focal length of combinations P , Q and R is [J&K CET]
(P)
(a) 1 : 1 : 1 (c) 2 : 1 : 1
(Q)
(R )
(b) 1 : 1 : − 1 (d) 2 : 1 : 2
46 Two thin lenses have a combined power of +9 D. When they are separated by a distance of 20 cm, their equivalent 27 power becomes + D. Their individual powers (in 5 dioptre) are [KCET] (a) 1, 8 (b) 2, 7 (c) 3,6 (d) 4, 5 47 A plano-convex lens has a maximum thickness of 6 cm. When placed on a horizontal table with the curved surface in contact with the table surface, the apparent depth of the bottom most point of the lens is found to be 4 cm. If the lens is inverted such that the plane face of the lens is in contact with the surface of the table, the apparent depth of 17 the centre of the plane face is found to be cm. The 4 radius of curvature of the lens is [ KCET] (a) 68 cm (b) 75 cm (c) 128 cm (d) 34 cm 48 A prism having refractive index 1.414 and refracting angle 30° has one of the refracting surfaces silvered. A beam of light incident on the other refracting surface will retrace its path, if the angle of incidence is [KCET] (a) 0° (b) 30° (c) 60° (d) 45°
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2010 49 A lens having focal length f and aperture of diameter d d in 2 central region of lens is covered by black paper. Focal length of lens and intensity of image now will be respectively [CBSE AIPMT] 3f I I (a) f and (b) and 4 2 4 f 3I I (c) f and (d) and 2 4 2 forms an image of intensity I.Aperture of diameter
50 Assertion There is no dispersion of light refracted through a rectangular glass slab. Reason Dispersion of light is the phenomenon of splitting of a beam of white light into its constituent colours. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. [AIIMS] (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is not correct. (d) Assertion is incorrect but Reason is correct. 51 A double convex lens made of glass (refractive index n = 1.5) has both radii of curvature of magnitude 20 cm incident light rays parallel to the axis of the lens will converge at a distance L such that [AFMC] (a) L = 20 cm (b) L = 10 cm 20 (c) L = 40 cm (d) L = cm 3 52 A convex lens of focal length 1.0 m and a concave lens of focal length 0.25 m are 0.75 m apart. A parallel beam of light is incident in the convex lens. The beam emerging after refraction from both lenses is [BHU] (a) parallel to principal axis (b) convergent (c) divergent (d) None of the above
55 A convex lens has mean focal length of 20 cm. The dispersive power of the material of the lens is 0.02. The longitudinal chromatic aberration for an object at infinity is (b) 0.80 (a) 103 [Manipal] (c) 0.40 (d) 0.20 56 A convex lens of focal length f is placed some where in between an object and a screen. The distance between object and screen is x. If numerical value of magnification produced by lens is m, focal length of lens is [Manipal] mx mx (a) (b) 2 ( m + 1) ( m − 1) 2 ( m + 1) 2 ( m − 1) 2 (d) (c) x x m m 57 How many images are formed by the lens shown, if an object is kept on its axis? [Manipal] µ1
(a) 1
(b) 2
µ2
(c) 3
(d) 4
58 When white light passes through a glass prism, one gets spectrum on the other side of the prism. In the emergent beam, the ray which is deviating least is [OJEE] (a) violet ray (b) green ray (c) red ray (d) yellow ray 59 For an angle of incidence θ, on an equilateral prism of refractive index 3, the ray refracted is parallel to the base inside the prism. The value of θ is [Kerala CEE] (a) 30° (b) 45° (c) 60° (d) 75° (e) 15°
53 The radii of curvature of the two surfaces of a lens are 20 cm and 30 cm and the refractive index of the material of the lens is 1.5. If the lens is concavo-convex, then the focal length of the lens is [BHU] (a) 24 cm (b) 10 cm (c) 15 cm (d) 120 cm
60 The power of a bi-convex lens is 10 D and the radius of curvature of each surface is 10 cm, then the refractive index of the material of the lens is [Kerala CEE] 3 4 (b) (a) 2 3 9 5 (d) (c) 8 3 3 (e) 4
54 A lens behaves as a converging lens in air and a diverging lens in water. The refractive index of the material is (a) equal to unity [UP CPMT] (b) equal to 1.33 (c) between unity and 1.33 (d) greater than 1.33
61 If x1 be the size of the magnified image and x2 be the size of the diminished image in lens displacement method, then the size of the object is [WB JEE] (b) x1 x 2 (a) x1 x 2 (c) x12 x 2 (d) x1 x 22
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RAY OPTICS AND OPTICAL INSTRUMENTS
62 A plano-convex lens ( f = 20 cm) is silvered at plane surface. Now, focal length will be [WB JEE] (a) 20 cm (b) 40 cm (c) 30 cm (d) 10 cm 63 A thin convergent glass lens µ = 1.5 has a power of + 5.0 D. When this lens is immersed in a liquid of refractive index µ l it acts as diverging lens of focal length 100 cm. The value of µ l should be [Punjab PMET] 3 4 5 (a) (b) (c) (d) 2 2 3 3 64 When a lens of refractive index n1 is placed in a liquid of refractive index n 2 , the lens looks to be disappeared only if (a) n1 = n 2 / 2 [DUMET] (b) n1 = 3n 2 / 2 (c) n1 = n 2 (d) n1 = 5n 2 / 2 65 Two beams of red and violet colours made to pass separately through a prism of A = 60°.In the minimum deviation position, the angle of refraction inside the prism will be [KCET] (a) greater for red colour (b) equal but not 30° for both the colours (c) greater for violet colour (d) 30° for both the colours 66 A ray PQ incident on the refracting face BA is refracted in the prism BAC as shown in the figure and emerges from the other refracting face AC as RS, such that AQ = AR. If the angle of prism A = 60° and the refractive index of the material of prism is 3, then the angle of deviation of the ray is [JCECE] A
Q 60° R S P
(a) 60° (c) 30°
B
C
(b) 45° (d) None of these
67 A thin lens made of glass of refractive index µ = 1.5 has a focal length equal to 12 cm in air. It is now immersed in 4 water µ = . Its new focal length is [JCECE] 3 (a) 48 cm (c) 24 cm
(b) 36 cm (d) 12 cm
68 When a thin convex lens is put in contact with a thin concave lens of the same focal length ( f ), the resultant combination has focal length equal to [CG PMT] f (b) 2 f (c) 0 (d) ∞ (a) 2
2009 69 A beam of light consisting of red, green and blue colours is incident on a right angled prism as shown in figure. The refractive indices of the material of prism for red, green and blue colours respectively are 1.33, 1.44, 1.47. The prism will [AIIMS]
45°
(a) separate part of blue colour from red and green colour (b) separate all the three colours from one another (c) separate part of the red colour from green and blue colours (d) not separate even partially any colour from the other two colours
70 A symmetric double convex lens is cut in two equal parts by a plane perpendicular to the principal axis. If the power of the original lens is 4D, the power of a cut lens will be [UP CPMT] (a) 2D (b) 3D (c) 4D (d) 5D 71 A convex lens of focal length 20 cm placed in contact with a plane mirror acts as a [UP CPMT] (a) convex mirror of focal length 10 cm (b) concave mirror of focal length 40 cm (c) concave mirror of focal length 60 cm (d) concave mirror of focal length 10 cm 72 If I 1 and I 2 be the size of the images respectively for the two positions of lens in the displacement method, then the size of the object is given by [Manipal] I1 (b) I × I 2 (a) I2 I (c) I 1 × I 2 (d) 1 I2 73 In the measurement of the angle of a prism using a spectrometer, the readings of first reflected image are Vernier I : 320° 40′, Vernier II : 140° 30′ and those of the second reflected image are Vernier I : 80° 38′, Vernier II : 260° 24′. Then, the angle of the prism is [Kerala CEE] (a) 59° 58′ (b) 59° 56′ (c) 60° 2′ (d) 60° 4′ (e) 60° 0′ 74 An equilateral prism has µ = 2. Angle of incidence for minimum deviation is [OJEE] (a) 45° (b) 30° (c) 60° (d) 90°
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
75 A glass slab of thickness 8 cm contains the same number of waves as 10 cm long path of water when both are traversed by the same monochromatic light. If the 4 refractive index of water is , then the refractive index 3 of glass is [EAMCET] 5 5 (b) (a) 3 4 16 3 (c) (d) 15 2 76 When a glass lens with n = 1.47 is immersed in a trough of liquid, it looks to be disappeared. The liquid in the trough could be [DUMET] (a) water (b) kerosene (c) glycerine (d) alcohol 77 The distance between an object and a divergent lens is m times the focal length of the lens. The linear magnification produced by the lens is [KCET] 1 (a) m (b) m 1 (c) m + 1 (d) m+1
3 4 82 Given, a µ g = and a µ w = . There is an equiconvex 2 3 lens with radius of each surface equal to 20 cm. There is air in the object space and water in the image space. The focal length of lens is [Manipal] (a) 80 cm (b) 40 cm (c) 20 cm (d) 10 cm
83 A diverging meniscus lens of 1.5 refractive index has concave surface of radii 3 and 4 cm. The position of the image, if an object is placed 12 cm infront of the lens is (a) 7 cm (b) − 8 cm [Punja b PMT] (c) 9 cm (d) 10 cm 84 The angle of minimum deviation for a prism is 40° and the angle of the prism is 60°. The angle of incidence in this position will be [DUMET] (a) 30° (b) 60° (c) 50° (d) 100° 85 A convex and a concave lens separated by distance d are then put in contact. The focal length of the combination (a) decreases (b) increases [KCET] (c) becomes zero (d) remains the same 86 A convex lens is made of 3 layers of glass of 3 different materials as in the figures. A point object is placed on its axis. The number of images of the object are [KCET]
78 The angle of minimum deviation for an incident light ray on an equilateral prism is equal to its refracting angle. The refractive index of its material is [KCET] 1 3 3 (c) (a) (d) (b) 3 2 2 2
2008 79 Two thin lenses of focal lengths f1 and f 2 are in contact and co-axial. The power of the combination is f1 f2 (a) (b) f2 f1 f − f2 f + f2 (c) 1 (d) 1 f1 f 2 f1 f 2
[CBSE AIPMT]
80 A thin glass (refractive index 1.5) lens has optical power of − 5 D in air. Its optical power in a liquid medium with refractive index 1.6 will be [AIIMS] (a) 1 D (b) − 1D (c) 25 D (d) − 25 D 81 Assertion A concave mirror and convex lens both have the same focal length in air. When they are submerged in water, they will have same focal length. Reason The refractive index of water is smaller than the refractive index of air. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
(a) 1 (c) 3
(b) 2 (d) 4
2007 87 Assertion A bi-convex lens of focal length 10 cm is split into two equals parts by a plane parallel to its principal axis. The focal length of the each part will be 20 cm. Reason Focal length does not depend on the radii of curvature of two surfaces. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
88 A convex lens is dipped in a liquid whose refractive index is equal to the refractive index of the lens, then its focal length will [AFMC] (a) become small, but non-zero (b) remain unchanged (c) become zero (d) become infinite
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RAY OPTICS AND OPTICAL INSTRUMENTS
89 An equi-convex lens is cut into two halves along (i) XOX ′ and (ii) YOY ′ as shown in the figure. Let f , f ′ and f ′′ be the focal lengths of the complete lens, of each half in case (i), and of each half in case (ii) respectively. Y
X'
O
2006 95 A wire mesh consisting of very small squares is viewed at a distance of 8 cm through a magnifying converging lens of focal length 10 cm, kept close to the eye. The magnification produced by the lens is [AIIMS] (a) 5 (b) 8 (c) 10 (d) 20
96 A leaf which contains only green pigments, is illuminated by a laser light of wavelength 0.6328 µm. It would appear to be [AFMC] (a) brown (b) black (c) red (d) green
X
Y'
Choose the correct statement from the following [BHU] (a) f ′ = f , f ′′ = f (b) f ′ = 2 f , f ′′ = 2 f (c) f ′ = f , f ′′ = 2 f (d) f ′ = 2 f , f ′′ = f
97 Which of the following is true for rays coming from infinity? [AFMC] µ1 µ2
90 An air bubble is contained inside water. It behave as a [UP CPMT]
(a) concave lens (b) convex lens (c) Neither convex nor concave (d) Cannot say f 91 An object is placed at a distance of from a convex 2 lens. The image will be [Punjab PMET] (a) at one of the foci, virtual and double its size 3f (b) at , real and inverted 2 (c) at 2 f, virtual and erect (d) None of the above
92 A ray of light is incident normally on one face of a right angled isosceles prism. It then grazes the hypotenuse. The refractive index of the material of the prism is [KCET] (a) 1.33 (b) 1.414 (c) 1.5 (d) 1.732 93 Two thin equi-convex lenses each of focal length 0.2 m are placed co-axially with their optic centres 0.5 m apart. Then, the focal length of the combination is [KCET] (a) − 0.4 m (b) 0.4 m (c) − 0.1m (d) 0.1m 94 A prism of a certain angle deviates the red and blue rays by 8° and 12°, respectively. Another prism of the same angle deviates the red and blue rays by 10° and 14°, respectively. The prisms are small angled and made of different materials. The dispersive powers of the materials of the prisms are in the ratio [KCET] (a) 5 : 6 (b) 9 : 11 (c) 6 : 5 (d) 11 : 9
(a) Two images are formed (b) Continuous image is formed between focal points of upper and lower lens (c) One image is formed (d) None of the above
98 If the focal length of the lens is 20 cm, what is the distance of the image from the lens in the following figure? [BHU]
12 cm
(a) 5.5 cm
(b) 7.5 cm
(c) 12 cm
(d) 20 cm
99 The image of a small electric bulb fixed on the wall of a room is to be obtained on the opposite wall 4 m away by means of a large convex lens. The maximum possible focal length of the lens required for this purpose will be (a) 0.5 m (b) 1 m (c) 1.5 m (d) 2 m [BHU] 100 The correct arrangement of colours in the descending order of their wavelength is [Kerala CEE] (a) yellow, violet, green, orange (b) orange, yellow, green, violet (c) violet, green, yellow, orange (d) yellow, green, orange, violet (e) orange, green, violet, yellow 101 A concave lens of focal length 20 cm produces an image half the size of the real object. The distance of the real object is [Kerala CEE] (a) 20 cm (b) 30 cm (c) 10 cm (d) 60 cm (e) 40 cm
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
102 If a ray of light is incident on an equilateral glass prism PQR placed on a horizontal table, then for the minimum deviation which of the following is correct? [RPMT] P C
B
D
A R
Q
(a) AB is horizontal (b) CD is horizontal (c) Either AB or CD is horizontal (d) BC is horizontal
103 The refractive index of the material of the prism and liquid are 1.56 and 1.32, respectively. What will be the value of θ for the following refraction? [MP PMT] θ
13 11 3 (c) sin θ ≥ 2
(a) sin θ ≥
(b) sin θ ≥ (d) sin θ ≥
2005 106 A convex lens forms a full image of the object on a screen. If half of the lens is covered with an opaque object, then (a) the image disappears [BHU] (b) half of the image is seen (c) full image is seen and of same intensity (d) full image is seen and of decreased intensity
107 A thin equi-convex lens is made of glass of refractive index 1.5 and its focal length is 0.2 m. If it acts as a concave lens of 0.5 m focal length when dipped in a liquid, the refractive index of the liquid is [EAMCET] 17 15 (b) (a) 8 8 13 9 (d) (c) 8 8 108 If the focal length of a double convex lens for red light is [EAMCET] f R , its focal length for the violet light is (a) f R (b) greater than f R (c) less than f R (d) 2 f R 109 A ray falls on a prism ABC ( AB = BC ) and travels as shown in figure. The least value of refractive index of material of the prism, should be [DUMET]
11 13 1
A
2 104 The effective focal length of the lens combination shown in the figure is − 60 cm. The radii of curvature of the curved surfaces of the plano-convex lenses are 12 cm each and refractive index of the material of the lens is 1.5. The refractive index of the liquid is [EAMCET]
B
Liquid
(a) 1.5 (c) 1.33
(a) 1.33
(d) 1.6 A 105 If the refractive index of a glass prism is cot and A is 2 angle of prism, then angle of minimum deviation is π (a) − A 2 π − A (c) 2
(b) 1.42
(c) 1.53
A (b) 2π − 2 (d) ( π − 2A )
[JCECE]
C
(b) 2 (d) 3
110 White light is incident on one of the refracting surfaces of a prism of angle 5°. If the refractive indices for red and blue colours are 1.641 and 1.659 respectively, the angular separation between these two colours when they emerge out of the prism is [KCET] (a) 0.9° (b) 0.09° (c) 1.8° (d) 1.2° 111 For a given lens, the magnification was found to be twice as large as when the object was 0.15 m distant from it as when the distance was 0.2 m. The focal length of the lens is [KCET] (a) 1.5 m (b) 0.20 m (c) 0.10 m (d) 0.05 m
RAY OPTICS AND OPTICAL INSTRUMENTS
Answers 1 (a)
2 (d)
3 (d)
4 (c)
5 (a)
6 (b)
7 (b)
8 (a)
9 (b)
10 (a)
11 (d)
12 (a)
13 (a)
14 (d)
15 (c)
16 (c)
17 (a)
18 (b)
19 (c)
20 (b)
21 (d)
22 (e)
23 (d)
24 (d)
25 (a)
26 (a)
27 (b)
28 (c)
29 (a)
30 (a)
31 (b)
32 (b)
33 (a)
34 (b)
35 (a)
36 (a)
37 (a)
38 (d)
39 (b)
40 (a)
41 (a)
42 (a)
43 (b)
44 (b)
45 (a)
46 (c)
47 (d)
48 (d)
49 (c)
50 (b)
51 (a)
52 (a)
53 (d)
54 (c)
55 (c)
56 (a)
57 (a)
58 (c)
59 (c)
60 (a)
61 (a)
62 (d)
63 (c)
64 (c)
65 (d)
66 (a)
67 (a)
68 (d)
69 (c)
70 (a)
71 (d)
72 (c)
73 (a)
74 (a)
75 (a)
76 (c)
77 (d)
78 (b)
79 (d)
80 (a)
81 (d)
82 (b)
83 (b)
84 (c)
85 (a)
86 (a)
87 (d)
88 (d)
89 (c)
90 (a)
91 (a)
92 (b)
93 (a)
94 (c)
95 (a)
96 (b)
97 (a)
98 (b)
99 (b)
100 (b)
101 (a)
102 (d)
103 (b)
104 (d)
105 (d)
106 (d)
107 (b)
108 (c)
109 (b)
110 (b)
111 (c)
Explanations 1 (a) Case I When two equi-convex lens of focal length f1 and f2 respectively, are kept co-axially in contact, then the equivalent focal length of combination is Glass
Glass
From Eqs. (i) and (ii), we get F1 : F2 = 1 : 2
2 (d) Different colours of white light have different wavelengths. The descending order of the wavelength of the component of white light is λ red > λ green > λ blue > λ violet
3 (d) When the lens is cut along its Air
1 1 1 = + F1 f1 f2 1 1 [Q Here, f1 = f2] = + f f 2 f … (i) = ⇒ F1 = 2 f Case II When glycerine of same refractive index at that of the glass is filled in the space between two lens, then the combination will now comprises of three lenses; first bi-convex, second bi-concave and third is bi-convex. So, the focal length of the combination now is given as Glass
Glass
Glycerine (µ=1.5)
1 1 1 1 1 = + + = F2 f (− f ) f f ⇒
F2 = f
… (ii)
principal axis, the focal length of the two halves will remain same because the radius of curvature of both the surfaces are still same. So, the power also remains same as 1 P= f f
f
f
4 (c) Using the lens Maker’s formula 1 µ 2 − µ 1 1 1 = − f µ 1 R1 R2 Given, f = 25 cm µ 2 = 15 . , µ 1 = 1 (for air) let R1 = R and R2 = − 2R 1 15 . − 1 1 1 ⇒ − − = 25 1 R 2R 1 1 1 = + 25 × 0.5 R 2R
3 × 25 × 0.5 2 = 18.75 cm R1 = 18.75 cm R2 = 2 × 18.75 = 37.5 cm
⇒
R=
∴
5 (a) From figure,
O
20 cm
Distance of object, u = − 20 cm Magnification, m = − 0.5 Magnification of lens in terms of u and f is given by f f m= − 0.5 = −20 + f u+ f ⇒ 10 − 0.5 f = f ⇒ 15 . f = 10 10 f = 15 . f = 6.66 cm
6 (b) object
40 cm
30 cm L1
30 cm L2
L3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
(i) For refraction from 1st lens, 1 1 1 = − f v u ⇒
1 1 1 1 1 3 cm − = = + = v f u 10 40 40
40 cm 3 This image acts as object for 2nd lens. ⇒ v=
∴ Object distance for 2nd lens L2 40 50 cm = 30 − = 3 3 (ii) Now for refraction from L2 , 1 1 1 − = v u f
⇒ v = 25 cm This image is object for 3rd lens L3 (u = 30 − 25 = 5 cm ) 1 1 1 1 1 = + = − ⇒ v f u 10 5 or v = − 10 cm (location of final image = 10 cm to left of L3) ∴Distance from L1 = 30 + (30 − 10) = 50 cm.
7 (b) According to the question, the figure of mentioned prism is given as A
i
O
30° ° R 90 m=√2
⇒
sin i = sin 30° × 2 1 1 × 2 Q sin 30° = 2 2 1 = 2 1 i = sin −1 = 45° 2 1 Q sin 45° = 2
or
Thus, the angle of incidence of the ray on the prism is 45°.
8 (a) The relation between angle of
deviation δ for a thin prism of angle of prism A and refractive index (µ ) of material of prism is given by δ = (µ − 1) A. Thus, angle of deviation depends on the angle of prism.
(since, there is no refraction at the face AC) Given, refractive index of the material of prism, µ = 2 and angle of prism, A = 30°. If the ray OR has to retrace its path after reflection (as per the given condition), then the ray has to fall normally on the surface AC. This means ∠ARO = ∠ORC = 90° In ∆AOR, ∠AOR + ∠ARO + ∠OAR = 180° ⇒ ∠AOR + 90° + 30° = 180°
When lens is dipped in water, 1 µg 1 1 = − 1 − R1 R2 f ′ µl µg − µl 1 1 − µ l R1 R2
or
f ′ (µ − 1) µ′ − (µ − 1) µ′ = = f (µ − µ′ ) (µ′ − µ) (Qµ l = µ′) − f µ′ (µ − 1) f′ = (µ′ − µ)
∴
or
11 (d) Consider the situation shown in figure. Let radius of curvature of lens surfaces is R. The combination is equivalent to three lenses in contact, 1 1 1 1 2 1 = + + = + ∴ feq f1 f2 f3 f1 f2 µ = 3/2
9 (b) For dispersion without deviation, net deviation produced by the combination of prisms must be zero. Let prism angle of the first and second prisms are A1 and A2, respectively. Similarly, their refractive indices are µ 1 and µ 2. Condition for dispersion without deviation is δ1 − δ2 = 0 ⇒ (µ 1 − 1) A1 − (µ 2 − 1) A2 = 0
C
We have, by lens Maker’s formula 1 1 1 = (µ− 1) − R1 R2 f
=
r2=0
r1
O¢ B
Substituting the given values, we get sin i 2= sin 30°
1 1 1 1 3 2 = + = − = v u f 10 50 50
⇒
P
⇒ ∠AOR = 180° − 120° = 60° …(i) As we know, ∠AOR + ∠r1 = 90° ⇒ ∠r1 = 90° − 60° = 30° [from Eq. (i)] Applying Snell’s law at the face AB, sin i we get µ= sin r
⇒
µ − 1 1.42 −1 A2 = 1 A1 = (10° ) 1.7 −1 µ 2 − 1
⇒ A2 = 6°
10 (a) According to the question,
Here, µ = refractive index of lens µ′ = refractive index of liquid and focal length of lens in air = f
µ
µ′
(Q f1 = f3)
f3
f1 f2
Now,
1 1 2 1 = = (µ − 1) = R f f1 f3
…(i)
1 2 4 −2 = (µ w − 1) − = − 1 R 3 R f2 1 1 2 −2 = − = 3 R 3 2 f (µ − 1) [from Eq. (i)] 1 1 1 1 2 1 ⇒ = − =− × f2 3 3 − 1 f 3 f 2 1 2 2 1 6−2 4 = − × = ∴ = feq f 3 f 3f 3f ⇒ feq =
3f 4
12 (a) Given, A = 60° and δ m = 30° According to prism formula, A + δm sin 2 µ= A sin 2
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RAY OPTICS AND OPTICAL INSTRUMENTS
or or Q
60°+30° sin 2 sin 45° = µ= 60° sin 30° sin 2 µ= 2 Speed of light in air (c) µ= Speed of light in prism (v ) 3 c 3 × 108 v= = = × 108 m/s µ 2 2
13 (a) Let A′ be the angle of flint glass prism. Here, A = 5° and µ = 1.51for crown glass prism. Deviation produced by flint glass, δ′ = (µ − 1) A = (1.51 – 1) × 5 = 2.55° For no deviation, δ′ = δ or
polished surface) respectively, then effective focal length F is given by 1 1 1 1 = + + F fl fm fl R 1 2 1 2 = + = Q fm = = ∞ 2 F fl fm fl As,
1 1 = (µ − 1) R fl
R 1 2(µ − 1) or F = = 2(µ − 1) F R R or R = 2F = (µ − 1)
∴
17 (a) Consider a ray of light PQ incident on the surface AB and moves along RS, after passing through the prism ABC. A
0.65 A′ = 2.55 A′ =
2.55 = 3.92° 0.65
45°
A2 = ?, N 1 = 1.54, N 2 = 1.72 Angle of deviation, δ = (n − 1) A Dispersion produced by both the prism will be equal i.e. (n1 − 1) A1 = (n2 − 1) A2 (n − 1) A1 ⇒ A2 = 1 (n2 − 1) (1⋅ 54 − 1) × 4 = = 3° (1⋅ 72 − 1) Hence, the angle of prism P2 is 3°.
15 (c) For first refracting surface, For parallel beam of light, µ µ µ −1 − 1+ 2= 2 u v R 1⋅ 4 1⋅ 5 1⋅ 5 − 1⋅ 4 + = ⇒ − (− ∞ ) v R v = 15R For second refracting surface, µ2 µ µ − µ2 + 3= 3 −15R v′ R 1⋅ 5 1⋅ 6 1⋅ 6 − 1⋅ 5 ⇒ + = 15R v′ R ⇒ v′ = ∞ Hence, the combination behaves as glass plate.
16 (c) When an object is placed infront of such a lens,the rays first of all refracted from the convex surface, then reflect from the polished plane surface and again refracts from convex surface. If fl and fm be the focal lengths of lens (convex surface) and mirror (plane
P
Q
30° 45° 30° 30° S R
B
C
It is given that, the incident ray suffers minimum deviation. Therefore, the ray inside the prism must be parallel to the base BC of the prism from the geometry of the prism and the ray diagram, it is clear that angle of incidence, i = 45° angle of refraction, r = r′ = 30° angle of emergence, e = 45° Therefore, minimum deviation angle suffered by the ray is δ min = i + e − (r + r′ ) = 90°−60°= 30° Also, we know that, A + δm sin 2 µ= A sin 2 where, µ = refractive index of the material of the prism. A = angle of prism = 60° ∴
60°+30° sin 2 µ= 60° sin 2 sin 45° 1/ 2 = = sin 30° 1/ 2 2 = = 2 2
A + Dm sin 2 µ= A sin 2 A + Dm sin 2 A ⇒ cot = A 2 sin 2 A sin A + Dm cos 2 2 = ⇒ A A sin sin 2 2 A + Dm π A sin − = sin 2 2 2 π A A Dm ⇒ − = + 2 2 2 2 ⇒ Dm = π − 2 A = 180° − 2 A
19 (c) Given, µ g = 15 .
60°
14 (d) Given, angle of prism, A1 = 4 °
18 (b) As, we know that,
µoil = 17 . and R = 20 cm From lens Maker’s formula for the plano-convex lens 1 1 1 = (µ − 1) − f R R 1 2 Here, R1 = R and for plane surface, R2 = ∞ 1 1 = (15 . − 1) − 0 ∴ R flens ⇒
1 1 0.5 or = flens fl R
When the intervening medium is filled with oil, then focal length of the concave lens formed by the oil 1 1 1 1 or = (17 . − 1) − − R R fconcave fc 2 −14 . = − 0.7 × = R R Here, we have two concave surfaces, 1 1 1 so =2× + feq fl fc 0.5 −14 . + R R 1 14 . = − R R 0 .4 =− R R =− 0.4 20 =− = − 50 cm 0.4 =2×
∴
feq
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
20 (b) For the condition giving in question, ray diagram will be shown as M A N N’ 0 0°– A 9 or 2A r = A µ 90º
∠ MON = 90°− A So,
∠ r = 90°− (90°− A )
⇒
∠r = A sin i By Snell’s law, =µ sin r sin (2A ) =µ ⇒ sin ( A ) 2sin A cos A = µ ⇒ µ = 2cos A sin A
21 (d) When an equi-convex lens is cut parallel to principal axis, focal length remains the same and when the lens is cut perpendicular to principal axis, its focal length becomes twice the original.
22 (e) Given, P1 = 15 D and P2 = − 3 D Q
⇒
P = P1 + P2 = 15 D − 3D = 12D 1 100 P= ⇒ P= f (m ) f (cm) 100 12 = f 100 f = = 8.33 cm 12
23 (d) Focal length of a convex lens by
24
displacement method. Focal length of the convex lens, a2 − b2 f = 4a where, a = distance between the image and object and b = distance between two positions of lens. Here, a = d and to form a distinct image b = 0, so the maximum possible d focal length is . 4 (d) For the first condition, f1 = 10 cm, u= − 30 cm, 1 1 1 1 1 1 then = − ⇒ = + f1 v u 10 v 30 1 1 1 30 = − ⇒ v= = 15 v 10 30 2 For the second condition when concave lens is placed,
v′ = (15 + 45) = 60 cm 1 1 1 = − F v′ u
⇒
where, F = focal length of combination. 1 1 1 ∴ = + F 60 30 60 F= = 20 cm ⇒ 3 The magnitude of focal length of concave lens, 1 1 1 = + F f1 f2 1 1 1 ⇒ = + 20 10 f2 ⇒
1 1 1 1 1 1 = − ⇒ = + f v u f −1 u u 3 1 2 1 −3 + 1 ⇒ =− = f u f u [Q f = − f ] ⇒ u=2f
27 (b) Given, f = 10 cm and power, P = ? 1 Focal length (m) 1 100 100 P= = = 10 D ⇒ P= f (m) f (cm) 10 Power of lens, P =
28 (c) Focal length of the combination, 1 1 1 = + F f1 f2 R We have, f1 = (µ 1 − 1) −R and f2 = (µ 2 − 1) 1 µ 1 − 1 or = f1 R
f2 = − 20 cm (negative sign for concave lens)
25 (a) As we know that, from lens Maker formula,
As,
1 µ2 1 1 = − 1 − f µ 1 R1 R2 1 = power of lens (P ) f
µ 2 = 1.5 µ 1 = 1 (air) P1 = power in initial condition. Now, for 2nd case 1 1.5 1 P2 = − 1 − …(ii) 1.6 R1 R2 As,
On putting these values in Eq. (i), we get 1 (µ 1 − 1) (µ 2 − 1) = − F R R [µ 1 − 1 − µ 2 + 1] µ 1 − µ 2 = = R R R F= ⇒ µ1 − µ2
29 (a) The propagation of light ray through a prism is shown below A A N
P2 = power in 2nd condition. On dividing Eq. (i) by Eq. (ii), we get 1.5 − 1 0.5 × 1.6 P1 1 = = P2 1.5 − 1.6 − 0.1 1.6 −5 − 0.8 (as P1 = − 5D ) ⇒ = P2 0.1 + 5 × 0.1 5 P2 = = = 0.625D ⇒ 8 0.8 So, option (a) is close to 0.625 as 0.625 D ≈ 1D. f = − f (for concave) 1 v= u 3 According to the lens formula,
26 (a) Given,
1 − (µ 2 − 1) = f2 R
or
where, f = focal length. µ 2 & µ 1 = refractive index of 2nd & 1st medium. and R1 & R2 = radius of curvature of 1st & 2nd curved surface of lens. So, for 1st case 1 1.5 1 …(i) − P1 = −1 1 R1 R2
....(i)
i P B
30
K δ
T
Q r1
r2 R O
e S C
When a light ray travel from air (rarer) to prism filled with water (denser) of higher refractive index, then it bends towards the normal inside it. At other face, the light is travelling from denser to rarer medium, so it bends away from normal. Thus, the prism deviates the incident ray towards the base of prism as shown in figure above. (a) For convex lens as object comes closer to lens image runs away from it and also object distance is always negative, so correct graphs in option (a).
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RAY OPTICS AND OPTICAL INSTRUMENTS
31 (b) Focal length of mirror is
32
independent of the refractive index of medium in which it is placed. So, focal length of mirror in any medium is same as the focal length of mirror in vacuum. (b) The density of hydrogen is less than the density of air, so velocity of sound in hydrogen is greater than velocity of sound in air. Therefore, hydrogen acts as a rarer medium and the balloon behaves as a diverging lens.
36 (a) From lens formula, 1 1 1 = ( a µ g − 1) − R1 R2 f 1 1 = (1.5 − 1) − R1 R2 Also, l µ g =
On dividing Eq. (i) by Eq. (ii), we get 15 − 1 16 f 1 = =− f ′ (1.5 − 1) 16 × 0.5 ⇒
35
N
A + A A + δm sin sin 2 2 = µ= sin A / 2 sin A / 2 sin A 2 sin A / 2 cos A / 2 = = sin A / 2 sin A / 2 = 4 cos A / 2 In given situation, value of A varies from 0 to 90°. 90° µ min = 2 cos = 2 2 and µ max = 2 cos 0° = 2 sin i (a) Refractive index, µ = sin r sin i or µ = sin A A i
f ′ = −8 × 20 = −160 cm 1 1 1 = (µ − 1) − R1 R2 f
A
r=A
For equi-convex R1 = + R , R2 = − R 1 1 1 2 = (µ − 1) − ∴ = (µ −1) R −R R f R f = ⇒ f > R, so 2 (µ − 1) < 1 2 (µ − 1) 1 i.e. (µ − 1) < ⇒ (µ − 1) < 0.5 2 ⇒ µ < 1.5 Focal length of convex lens is positive, so u cannot be negative. Hence, µ should be greater than zero but less than 1.5.
38 (d) After silvering the plane surface, plano convex lens behaves as a concave mirror of focal length 1 2 = f′ flens But f ′ = 0.2m ⇒ flens = 2 f ′ = 2 × 0.2 = 0.4 m Now, from lens Maker’s formula, 1 1 1 = (µ − 1) − R1 R2 flens ∴
1 1 = (1.5 − 1) × (Q R2 = ∞ ) 0.4 R1
⇒ In case of small angle, i sin i ≈ i and sin A ≈ A ⇒ µ = A Incident angle, i = µA
R1 = 0.5 × 0.4 = 0.2 m
39 (b) In general, we have assumed, µ = 1.5
⇒
1.5 15 = 1.6 16
1 15 1 1 = − 1 − …(ii) f ′ 16 R1 R2
A N
=
37 (a) Focal length of lens,
34 (b) Refractive index,
A
µl
1 1 1 = (l µ g − 1) − R1 R2 f′
∴
33 (a) If bi-convex lens behave like plane sheet, ray will pass undeviated through it only when medium has same refractive index as that of biconvex lens. If fl and fa be the focal length in liquid and air respectively and fl = ∞ (for plane sheet) (a µ g − 1)a µ l fa Thus, fl = ⇒ a µ g = aµ l (a µ g − a µ l )
µg
…(i)
So,
1 1 1 = (15 . − 1) + 20 20 f
f = 20 cm ⇒
1 1 1 = − f v u
1 1 1 = − 20 v (−30) 1 1 1 10 = − = v 20 30 600 hi 60 v = 60 cm ⇒ = =2 ho 30
⇒ hi = 2 × | ho | ⇒ hi = 4 cm Here, image is real, inverted, magnified and height of image is 4 cm.
40 (a) A + δ = i + e
…(i) Put the given values in Eq. (i) 30° + 30° = 60° + e ⇒ e = 60° − 60° e = 0 ⇒ r1 = A = 30° sin i sin 60° µ= = = 3 = 1.732 ∴ sin r sin 30°
41 (a) We have, the effective power given by Peff = P1 + P2 1 Also, we know, P = f 1 1 Hence, Peff = + f1 f2 1 1 ⇒ = + = 5 + 4 = 9D 0.20 0.25
42 (a) We have a lens of focal length 30 cm that produces 5 times magnified real image. 1 1 1 We have, − = 5u − u 30 1 1 1 + = ⇒ 5u u 30 So, u = 36 cm
43 (b) The refractive index is 1.5 and the radius of curvature of the curved face is 100 cm and of the plane side is ∞, hence 1 1 1 P = = (µ − 1) − R1 R2 f 1 1 = (15 . − 1) − = − 0.5 D ∞ 1
44 (b) After completely immersed in water this bag will behave as convergent lens. Since, bag filled with air has lower refractive index than water, hence its nature reverses.
45 (a) In given images P , Q and R lenses are in contact. ∴ For P combination of lenses,
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
1 1 1 2 = + = FP f f f
50 (b) Dispersion is caused due to the
1 1 1 Q = + for combination of lenses F f1 f2 f FP = 2 Similarly, for Q and R combinations, f f and FR = FQ = 2 2 Then, FP : FQ : FR : : 1 : 1 : 1
46 (c) Given, P1 + P2 = 9
47
P = P1 + P2 − dP1P2 27 20 =9− × P1P2 ⇒ 5 100 ⇒ P1P2 = 18 Hence, the above equation is correct for P1 = 3 and P2 = 6 Real depth (d) n = Apparent depth 6 3 n1 = = = 1.5 4 2 6 × 4 24 and n2 = = 17 17 n1 n2 n1 − n2 ⇒ − = u v R 1.5 24 1.5 − 1 − = ⇒ 6 17 × 6 R 15 24 0.5 − = 60 17 × 6 R 1 4 1 17 − 16 1 = − = ⇒ ⇒ 4 17 2R 68 2R 1 1 ⇒ = 34 R ⇒ R = 34 cm
48 (d) At second surface, there is no refraction. So, r2 = 0 ⇒ r1 = A = 30° From Snell’s law, sin i1 sin i1 n= ⇒ n= sin 30° sin r1 1 1 sin i1 = 2 × = 2 2 1 ⇒ sin i1 = ⇒ i1 = 45° 2
49 (c) Intensity, I ∝ A 2
51 (a) Here, n = 1 . 5, as per sign convention followed R1 = +20 cm and R2 = −20 cm 1 1 1 = (n − 1) − R1 R2 f
52
1 1 = (1. 5 − 1) − (+20) (−20) 2 1 = 0.5 × = ⇒ f = + 20 cm 20 20 Incident rays travelling parallel to the axis of lens will converge at its second principal focus. ∴ L = + 20 cm 1 1 d (a) Power of system = + − f1 f2 f1 f2 1 1 0.75 = + − 1 −0.25 (1)(−0.25) = 1 − 4 + 3 = −3 + 3 = 0 Since, power of the system is zero, so its focal length is infinity. Hence, it acts like a plane glass sheet. Therefore, the incident parallel beam of light will remain parallel after emerging from the system.
53 (d) The focal length of the lens, 1 1 1 = (µ − 1) − R1 R2 f
56
of a lens varies slightly with the wavelength and hence, the focal length is also different for different wavelengths. The separation between the images formed by extreme wavelengths of visible range is called the longitudinal chromatic given by f1 − f2 = ω × f where, ω is dispersive power. Given, ω = 0.02 and f = 20 f1 − f2 = 0.02 × 20 = 0.40 (a) Here, ...(i) x = u+ v f f −v ...(ii) m= = f −u f Image is real, magnification is negative f (m + 1) −m = ⇒ u= f f −u m f −v From Eq. (ii), we get − m = f ⇒ v = (m + 1) f Put in Eq. (i), we get (m + 1) x= f + (m + 1) f m mx f= ⇒ (m + 1)2
57 (a) Only one converging point is found by this lens. Therefore, only one image is formed.
58 (c) δ ∝ (µ − 1) µ R is least, so δ R is also least. So, red ray is deviating least.
59 (c) Given, µ = 3 and A = 60° For minimum deviation, r = From Snell’s law, µ =
1 1 1 = (1.5 − 1) − 20 30 f
⇒ 3=
⇒
1 30 − 20 = 0.5 600 f
We have,
⇒
1 1 10 1 = × = f 2 600 120 f = 120 cm
54 (c) If µ g < µ l , then fl and fa have
opposite signs and the nature of lens changes, i.e. a convex lens diverges the light rays and concave lens converges the light rays µ air < µ lens < µ water i.e.
1 < µ lens < 1.33
sin i sin r
A = 30° 2
3 sin i ⇒ i = sin −1 = 60° sin 30° 2
⇒
or
πr 2 2 πr − I 2 A2 4 = 3 = = ⇒ 2 I 1 A1 4 πr (Q I 1 = I ) 3 I 2 = I and focal length remains 4 unchanged. 2
55 (c) The refractive index of the material
difference in the angle of deviation for different colours. In the case of glass slab, the opposite sides are parallel and therefore different colours emerge parallel to each other and are seen simultaneously. Therefore, dispersion does not occur in glass slab, hence both Assertion and Reason are correct but Reason is not the correct explanation of Assertion.
i = θ ⇒ θ = 60°
60 (a) Power of a bi-convex lens is 10 D. Radius of curvature of each surface = 10 cm 1 1 1 ⇒ = (µ − 1) − f R1 R2 100 100 ⇒ 10 = (µ − 1) − − 10 10 ⇒ 10 = (µ − 1) [ 20 ] ⇒ (µ − 1) = ⇒
µ=
3 2
1 2
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RAY OPTICS AND OPTICAL INSTRUMENTS
61 (a) The size of the object in accordance
62 (d) The focal length of the plano-convex lens is 20 cm with the plane surface being silvered. So, the net power of the lens is given 1 2 by P = × 2 = f f Thus, the net focal length is f 20 = = 10 cm 2 2
63 (c) When the lens is in air, we have 1 µg −µa 1 1 = − fa µ a R1 R2 When the lens is in liquid, we have Pa =
1 µg −µl Pl = = fl µl
1 1 R − R 1 2
Given, Pa = 5, Pl = −1 and µ a = 1, µ g = 1.5
1 1 1 = (a µ g − 1) − R1 R2 fa The focal length of lens immersed in water is given by 1 1 1 = (l µ g − 1) − R1 R2 fl where, R1 & R2 are radii of curvatures of the two surfaces of lens and l µ g is refractive index of glass with respect to liquid. aµ g Also, l µ g = aµ l Given, 4 a µ g = 1.5, fa = 12 cm and aµ l = 3 fl (a µ g − 1) = ∴ fa (l µ g − 1) ⇒ ⇒
5 On solving, we get µ l = . 3
68 (d) Fcomb
64 (c) If refractive index of lens n1 is
equal to refractive index of liquid n2, then lens behaves as a plane glass plate and becomes invisible in the medium.
65 (d) Here, angle of prism, A = 60° For minimum deviation, A = 2r A 60° or r = = = 30° for both colours. 2 2
on face AC. So, sin 45° > sin iC 1 1 1 ⇒ sin 45° > ⇒ > ⇒µ > 2 µ 2 µ or µ > 1.41
Q
B G R
30° 30° P
S B
C
Since, ∆ AQR is an equilateral triangle, therefore 60° ∠FQR = = 30° = ∠FRQ 2 ⇒
d = 30° + 30° = 60°
Hence, angle of deviation of the ray is 60°.
act as a mirror 1 1 1 Now, + = v u fequivalent ⇒
B 90°
perpendicularly to the principal axis, it will become a plano-convex lens. Focal length of bi-convex lens, 1 1 1 = (n − 1) − R1 R2 f ⇒ ⇒
1 2 = (n − 1) f R (Q R1 = R and R2 = − R ) R ...(i) f = 2(n − 1)
fequivalent = −
72 (c) In reactants displacement experiment size of object is given by h0 = I 1 × I 2 .
73 (a) Angle of the prism, A =
φ 2
φ1 + φ2 2 where, φ 1 = x2 − x1 = ( 360°+ 80°38′ ) − (320° 40′ ) = 119° 58′ and φ 2 = y2 − y1 = 260° 24′−140° 30′ = 119° 54' 119° 58′+ 119° 54′ 239° 52′ φ= = 2 2 φ 239° 52′ A= = = 59° 58′ 2 4 A + δm sin 2 (a)Q µ= A sin 2 Here, µ = 2 , A = 60° Now, φ =
C 45°
70 (a) Bi-convex lens is cut
1 1 1 = + fequivalent − f − f
20 f =− = − 10 cm 2 2 So, combination will act as concave mirror of focal length 10 cm.
⇒
45°
The deviation for red in comparison to other colour is less, whereas deviation for green and blue are nearly same so, prism will separate part of red colour from green and blue colours.
R
71 (d) The equivalent combination will
A 45°
deviation depends upon the angle of incidence of the light rays falling on the prism. Taking triangle FQR, we have, d = ∠FQR + ∠FRQ
60° F d
Hence, power will become half. 4 New power = = 2 D 2
(1.5 − 1) 0.5 × 4 fl = = 1.5 0.5 12 − 1 4/3 fl = 4 × 12 = 48 cm f f f (− f ) = 1 2 = =∞ f1 + f2 f + (− f )
…(ii)
On comparing Eqs. (i) and (ii),we see the focal length become doubled. 1 . As power of lens, P ∝ Focal length
69 (c) For i > iC , as all rays incident at 45°
66 (a) For a given prism, the angle of
A
For plano-convex lens, 1 1 1 = (n − 1) − R ∞ f1 R f1 = (n − 1)
67 (a) Focal length in air is given by
with the Fresnel’s displacement law is given by x1x2.
74
So,
⇒ ⇒
60° + δ m sin 2 2= 60° sin 2 1 60° + δ m 2 × = sin 2 2 1 60° + δ m = sin 2 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
60° + δ m ⇒ sin 45° = sin 2 ⇒
45° = 30° +
δm 2
1 1.5 1 1 = − 1 − …(ii) fm 1.6 R1 R2 (1.5 − 1) f Thus, m = =−8 fa 1.5 − 1 1.6
⇒ δ m = 30°
A + δ m 60 + 30 = = 45° 2 2 4 10 (a) a nw = and w ng = 8 3 4 10 5 ∴ a ng = a nw × w ng = × = 3 8 3 i=
75
⇒ fm = − 8 × fa 1 1 −1 =−8× Q fa = = − m 5 P 5 ∴
76 (c) The refractive index of liquid must be equal to that of glass, so glycerine is appropriate choice from given option.
81 (d) If a mirror is placed in a medium other than air, its focal length does not R change as f = . But for the lens 2 1 1 1 = (a ng − 1) − R1 R2 fa
77 (d) Given, u = mf ∴
1 1 1 − =− v (− mf ) f
1 1 1 = − 1 + v f m v 1 mf −v = ⇒ − = ⇒ u 1+ m m+1 Thus, linear magnification v −1 = = u m+1 ⇒
and
78 (b)Q Refractive index, A + δm sin 2 µ= sin A / 2 Here, A = δ m = 60 So, ⇒
82
µ= 3
79 (d) If two thin lenses of focal lengths f1 , f2 are placed in contact co-axially, then equivalent focal length of combination (here, d = 0) 1 1 1 0 1 1 = + − = + F f1 f2 f1 f2 f1 f2 Power for the combination, f + f2 1 1 1 P= = + = 1 F f1 f2 f1 f2
80 (a)
1 1 1 = (µ − 1) − R1 R2 fa 1 1 = (1.5 − 1) − R1 R2
and
1 µg − µm 1 1 = − fm µ m R1 R2
…(i)
3 3 4 − 1 − 2 2 3 = − 20 − 20 1 1 1 = + = 40 120 30 4 ∴ f = × 30 = 40 cm 3
83 (b)
1 1 1 = (µ − 1) − R1 R2 f
For given concave lens, R1 = − 3 cm, R2 = − 4 cm and ∴
u = −12 cm 1 1 1 1 − = (µ − 1) + v u −3 4
or
1 1 − 4 + 3 − = (1.5 − 1) 12 v (− 12)
or
1 1 –1 − 1 + = 0.5 × = v 12 12 24
or or
A + δ m 40° + 60° = = 50° 2 2 d 1 1 1 (a) = + − F f1 f2 f1 f2 When the lenses are put together, then d = 0, i.e. the focal length of the combination will decrease. (a) A lens made of three different materials as shown have only one focal length. Thus, for a given object there is only one image. (d) Since, lens is cut into two equal parts by a plane parallel to its principal axis, so both the part still to be biconvex. i=
85
86
87
1 1 1 = (w ng − 1) − R1 R2 fw
As w ng < a ng, hence focal length of lens in water increase. 4 The refractive index of water is and 3 that of air is 1. Hence, µ w > µ a . (a µ g − 1) (a µ g − aµ w ) µ (b) a w = − f R1 R2
o
A + A sin 2 sin 60° µ= = A sin 30° sin 2
= 1.6 m µ 1.6 Pm = = = 1D fm 1.6
84 (c) Angle of incidence,
1 1 1 −1− 2 1 =− − = =− v 24 12 24 8 v = − 8 cm
Principal axis
Hence, focal length of each part will remain as before, i.e. 10 cm. Focal length of bi-convex lens, 1 1 1 = (µ − 1) − R1 R2 f where R1 and R2 be the radii of curvature of two surfaces. Hence, focal length depends on radii of curvature of lens.
88 (d) By lens maker’s formula, 1 1 1 = (µ g − 1) − R1 R2 f
…(i)
When convex lens is dipped in a liquid of refractive index (µ l ), then its focal length, 1 1 ug 1 = − 1 − R1 R2 fl µ l or
1 (µ g − µ l ) 1 1 = − …(ii) R1 R2 fl µl
Dividing Eq. (i) by Eq. (ii), we get fl (µ g − 1) µ l …(iii) = (µ g − µ l ) f But it is given that refractive index of lens is equal to refractive index of liquid, i.e. µ g = µ l . Hence, Eq. (iii) gives, fl (µ g − 1) µ l = = ∞ (infinity). 0 f
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RAY OPTICS AND OPTICAL INSTRUMENTS
1 sin 45°
89 (c) The focal length of equi-convex
∴
µ=
1 1 1 = (µ − 1) − R1 R2 f
or
µ = 2 or µ = 1.414
lens,
…(i)
1 1 1 2 (µ − 1) = (µ − 1) − = R − R f R Case I When lens is cut along XOX ′, then each half is again equi-convex with R1 = + R , R2 = − R ∴ ⇒
1 1 1 = (µ − 1) − f R ( − R ) 1 1 + R R 2 1 = (µ − 1) = ⇒ R f′ = (µ − 1)
f′ = f
Case II When lens is cut along YOY′, then each half becomes plano-convex with R1 = + R , R2 = ∞ 1 1 1 ∴ = (µ − 1) − R1 R2 f ′′
⇒
1 1 = (µ − 1) − R ∞ (µ − 1) 1 = = R 2f
Hence, f ′′ = 2 f .
90 (a) Air bubble contains air whose refractive index is less than its surrounding medium, (i.e. water), so it will behave as concave lens.
91 (a) By lens formula, 1 1 1 f (given, u = − ) = − f v u 2
92
⇒
1 1 1 1 1 2 = + ⇒ = − f v f /2 v f f
⇒
1 1 v f and m = = =− =2 v f u f /2
So, the image will be virtual at the focus and of double size. 1 (b) Refractive index, µ = sinC where, C is the critical angle.
45°
Here, C = 45° (as shown)
93
94
1 1 1 d (a) = + − F f1 f2 f1 f2 1 1 0.5 = + − = − 2.5 0.2 0.2 (0.2)(0.2) 1 F =− = − 0.4 m 2.5 δ − δR (c) Dispersive power, ω = B δ For 1st prism δ − δ R 12° − 8° 2 ω1 = B = = δ 10° 5 δB + δR where, δ= 2 Similarly, for 2nd prism 14 ° − 10° 1 ω2 = = 12° 3 ω1 2 3 6 ⇒ = × = ω2 5 1 5
converge will behave as virtual object at the lens. ∴ u = + 12 cm, f = 20 cm 1 1 1 By lens formula, = − f v u 1 1 1 ∴ = − 20 v 12 1 1 1 3+ 5 8 or = + = = v 20 12 60 60 60 or v= = 7.5 cm 8 So, image will be formed on same side of the virtual object at a distance of 7.5 cm from the lens.
99 (b) Let a large convex lens is placed between two walls at a distance x from wall on which an electric bulb is fixed. Using lens formula, 1 1 1 = − f v u
95 (a) Lens formula is given by 1 1 1 = − f v u
…(i)
Given, f = 10 cm (as lens is converging) u = − 8 cm (as object is placed on left side of the lens) Substituting these values in Eq. (i), we get 1 1 1 1 1 1 = − ⇒ = − 10 v −8 v 10 8 80 1 8 − 10 ⇒ = − 40 cm = ⇒ v= −2 v 80 Hence, magnification produced by the lens, v − 40 m= = =5 u −8
Since, the given wavelength does not belong to green, so it will be absorbed by the leaf and hence, it would appear to be black.
97 (a) Since, lens is made of two layers of different refractive indices, for a given wavelength of light it will have two focal lengths or will form two images at two different points.
98 (b) According to figure, the point on the right side of the lens of which rays
4–x
Wall Convex Wall lens
u = x and v = 4 − x 1 1 1 ∴ = − f 4 − x −x 1 x+4−x 1 4 or or = = f (4 − x )(x ) f (4 − x )(x ) (4 − x ) x or f = …(i) 4 Now, magnification, v 4−x 4−x or 1 = m= = u x x or x = 4 − x or 2x = 4 or x = 2m From Eq. (i), we get (4 − 2)(2) 2 × 2 f = = = 1m 4 4 Putting
96 (b) If an object reflects the colour of light incident on it, it will appear with that colour but if object absorbs the colour of light, it will appear to be black.
x
100 (b) Correct order of wavelength is 101
orange > yellow > green > violet 1 1 1 (a) From lens formula, = − f v u u Given, v = and f = 20 cm 2 1 1 1 1 ⇒ = − = 20 u / 2 u u ⇒
u = 20 cm
102 (d) For minimum deviation position the refracted ray passes parallel to the base of the prism. Hence, BC is horizontal.
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103 (b) Using the formula, prism µ liquid
=
µ liquid µ prism
=
⇒
1.32 11 …(i) = 1.56 13
Now, the condition for the total internal reflection occurs when 11 sinθ ≥ µ, so sinθ ≥ . 13
104 (d) The system is equivalent to combination of three lenses in contact, i.e. 1 1 1 1 = + + F f1 f2 f3
106 (d) The various rays from the object,
Liquid
1
2
3
By lens Maker’s formula 1 1 1 = (1.5 − 1) − f1 −∞ −12 1 1 = 0.5 × = 12 24 (µ − 1) 1 1 1 = (µ − 1) − =− −12 12 f2 6 1 1 1 1 = (1.5 − 1) − = 12 ∞ 24 f3 F = − 60 cm 1 1 1 (µ − 1) = − + −60 24 6 24 (µ − 1) 1 =− + 6 12 (µ − 1) 1 1 = + 6 12 60 (µ − 1) 5 + 1 6 = = 6 60 60 36 (µ − 1) = = 0.6 60 µ = 0.6 + 1 = 1.6
Also, ∴
or or or or
⇒ ⇒
after refraction through different parts of the lens, will still converge at the same point, only their number will be less, when half of the lens is covered with an opaque object. Hence, still the full image of the object is obtained but its intensity will be less.
107 (b) The focal length of a convex lens
of angle A and minimum deviation δ m is given by A + δm sin 2 µ= sin A / 2 A Given, µ = cot 2 (A + δm) sin A 2 ∴ cot = 2 sin( A / 2) (A + δm) sin cos A / 2 2 ⇒ = sin A / 2 sin ( A / 2) A A + δm = sin 2 2 A A + δm ∴ sin 90° − = sin 2 2 cos
and the focal length fR for the red light is largest i.e. fR > fV .
109 (b) The given prism is a right angled
prism and angle ∠ LMN = 45°. Since, the ray is suffering total internal reflection and the critical angle is the angle of incidence in the denser medium for which the angle of refraction in the rarer medium is 90°, i.e. C = 45° and 1 1 µ= = = 2. sin C sin 45° A
of refractive index µ g in air,
1 1 1 = (µ g − 1) − R1 R2 fair
…(i)
where R1 and R2 are the radius of curvatures of its first and second surface. When lens immersed in a liquid of refractive index µ l , then refractive index of material of lens (glass) with respect to liquid is µg …(ii) lµ g = µl ∴ Focal length of lens in liquid 1 1 1 = (l µ g − 1) − R1 R2 f′
…(iii)
µg − 1 µg − 1 f′ = = fair (l µ g − 1) µ g − 1 µl
1.5 = 1 − 0.2 = 0.8 µl
or µ l =
45° N
M
B
C
110 (b) Angular dispersion,
δ b − δ r = (µ b − µ r ) A ⇒ = (1.659 − 1.641) 5° = 0.09°
111 (c) Let as shown 1 and 2 are positions of objects and images in two different situations. Object 2
C
1
F
F
1 C Image
f′ − 0.5 1.5 − 1 0.5 = = = fair 1.5 1.5 0.2 − 1 − 1 µl µl 1.5 − 1 = −0.2 µl ⇒
L
2
Dividing Eq. (i) by Eq. (iii), we get
105 (d) The refractive index (µ ) of a prism
⇒
A A + δm = 2 2 180° − A = A + δ m δ m = 180° − 2 A = π − 2 A 90° −
15 8
15 ∴ Refractive index of liquid = 8
108 (c) In a double convex lens, the speed of violet light is minimum while that of red light is maximum. So, the refractive index (n) of glass is maximum for violet light and minimum for red light (nV > nR ). Hence, according to the formula, 1 1 1 = (n − 1) − the focal length R1 R2 f fV of the lens for violet light is least
v v It is given, 1 = 2 2 u1 u2 Here, u1 = − 15 cm and u2 = − 20 cm u ∴ v1 = 2v2 × 1 u2 = 2v2 ×
15 3 = v2 20 2
1 1 1 = − f v u 1 1 1 = − ⇒ f v1 u1 1 1 1 and = − f v2 u2 1 1 1 1 So, − = − v1 u1 v2 u2 2 1 1 1 ⇒ + = + ⇒ v2 = 20 cm 3v2 15 v2 20 1 1 1 1 1 1 = − = + = f v2 u2 20 20 10 Now,
⇒
f = 10 cm = 0.10 m
RAY OPTICS AND OPTICAL INSTRUMENTS
Topic 5
Scattering of Light 2019 1 Pick the incorrect statement in the context with rainbow. (a) The order of colours is reversed in the secondary rainbow. [NEET] (b) An observer can see a rainbow when his front is towards the sun. (c) Rainbow is a combined effect of dispersion refraction and reflection of sunlight. (d) When the light rays undergo two internal reflections in a water drop, a secondary rainbow is formed.
2010 2 When sunlight is scattered by minute particles of atmosphere, the intensity of light scattered away is proportional to [CG PMT] 4 (a) (wavelength of light) (b) (frequency of light) 4 (c) (wavelength of light) 2 (d) (frequency of light) 2
2009 3 When sunlight is scattered by atmospheric atoms and molecules, the amount of scattering of light of wavelength 440 nm is A. The amount of scattering for the light of wavelength 660 nm is approximately [Kerala CEE] 4 (a) A (b) 2.25A (c) 1.5A (d) 0.66A 9 A (e) 6
4 What will be the colour of the sky as seen from the earth, if there were no atmosphere? [BCECE] (a) Black (b) Blue (c) Orange (d) Red
2008 5 The coming rays are forming rainbows
Red
Violet
Human eye (I)
Violet
Red
[BHU]
Yellow
Human eye (II)
(a) Fig. (I) forms primary rainbow (b) Fig. (I) and (III) form primary rainbow (c) Fig. (II) forms secondary rainbow (d) Fig. (I) forms secondary rainbow
Red
Human eye (III)
6 Blue colour of sea water is due to [KCET] (a) interference of sunlight reflected from the water surface (b) scattering of sunlight by the water molecules (c) image of sky in water (d) refraction of sun light
2007 7 Red colour is used for danger signals, because (a) it causes fear [J&K CET] (b) it undergoes least scattering (c) it undergoes maximum scattering (d) it is in accordance with international convention 2006 8 Pick the correct statement from the following. [J&K CET] (a) Primary rainbow is a virtual image and secondary rainbow is a real image . (b) Primary rainbow is a real image and secondary rainbow is a virtual image . (c) Both primary and secondary rainbows are virtual images. (d) Both primary and secondary rainbows are real images. 2005 9 Assertion By roughening the surface of a glass sheet, its transparency can be reduced. Reason Glass sheet with rough surface absorbs more light. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 10 Assertion The clouds in sky generally appear to be whitish. Reason Diffraction due to clouds is efficient in equal measure at all wavelengths. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 (b)
2 (b)
3 (e)
4 (a)
5 (d)
6 (b)
7 (b)
8 (c)
9 (c)
10 (c)
Explanations 1 (b) The necessary conditions for the rainbow to take place are as follows (i) Sun should be shining in part of the sky while it is raining in opposite part of the sky. (ii) The observer must stand with his back towards the sun. ∴Statement in option (b) is incorrect. However, rest statements regarding the rainbow are correct.
2 (b) Molecules of a medium after
3
absorbing incoming light radiations, emit them in all directions. This phenomenon is called scattering. According to scientist Rayleigh, the 1 intensity of scattered light ∝ 4 ∝ ν 4. λ (e) By Rayleigh’s law of scattering, 4 λ 1 I I ∝ 4 or 2 = 1 I 1 λ 2 λ I 2 440 = A 660 ~A I2 − 6
or or
4 (a) As there is no atmosphere, so no
5
scattering of colours of white light occurs, hence the sky will appear black. (d) In primary rainbow, red is on the top and violet is below, while in secondary rainbow violet is on top and red is below. So, Fig (I) forms secondary rainbow and Fig. (II) forms primary rainbow.
6 (b) Blue colour of sea water is due to 7
4
8
scattering of sunlight by water molecules. (b) Red light is used in danger signals, so that the danger signals can be seen distinctly upto large distances. The light used in the danger signals should not get scattered much, while passing through the atmosphere. Since, the red colour is scattered through a small amount due to its longer wavelength, the danger signals make use of red light. (c) The rainbow is seen as a virtual image in the form of a coloured arc centered on the anti-solar point that is
the point below the horizon, directly opposite the sun in the sky. When conditions are favourable two rainbows are seen, the brighter one is the primary and a fainter one with reversed colours. Hence, both primary and secondary rainbows are virtual images.
9 (c) When glass surface is made rough, then light incident on it is scattered in different directions. Due to which, its transparency decreases. There is no effect of roughness on absorption of light.
10 (c) The clouds consist of dust particles and water droplets. The scattering of sunlight by the big dust particles and water drops is not in accordance with the Rayleigh law. But they scatter the light of all the colours by the same amount, i.e. they are not efficient in diffraction by equal measures at all wavelength. Hence, the clouds are seen generally white. Hence, option (c) is correct.
Topic 6
Human Eye and Optical Instruments 2019 1 If focal length of objective and eye lenses are 10 cm and 10 mm respectively and tube length is 11 cm, then angular magnification of telescope is [AIIMS] (a) 10 (b) 5 (c) 100 (d) 50
2018 2 An astronomical refracting telescope will have large angular magnification and high angular resolution when it has an objective lens of [NEET] (a) large focal length and large diameter (b) large focal length and small diameter
(c) small focal length and large diameter (d) small focal length and small diameter
2014 3 If the focal length of objective lens is increased, then magnifying power of [CBSE AIPMT] (a) microscope will increase but that of telescope decrease (b) microscope and telescope both will increase (c) microscope and telescope both will decrease (d) microscope will decrease but that of telescope will increase
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RAY OPTICS AND OPTICAL INSTRUMENTS
4 Astigmatism is corrected using [Kerela CEE] (a) cylindrical lens (b) plano-convex lens (c) plano-concave lens (d) convex lens (e) concave lens 5 The intermediate image formed by the objective of a compound microscope is [WB JEE] (a) real, inverted and magnified (b) real, erect and magnified (c) virtual, erect and magnified (d) virtual, inverted and magnified 6 An astronomical telescope arranged for normal adjustment has a magnification of 6. If the length of the telescope is 35 cm, then the focal lengths of objective and eye-piece, respectively are [EAMCET] (a) 30 cm, 5 cm (b) 5 cm, 30 cm (c) 40 cm, 5 cm (d) 30 cm, 6 cm 7 A microscope is having objective of focal length 1 cm eye-piece of focal length 6 cm. If tube length is 30 cm and image is formed at the least distance of distinct vision, what is the magnification produced by the microscope? [KCET] (Take, D = 25 cm) (a) 6 (b) 150 (c) 25 (d) 125 8 Diameter of the objective of a telescope is 200 cm. What is the resolving power of a telescope? (Take, wavelength of light = 5000Å) [KCET] (a) 6.56 × 106 (b) 3.28 × 105 (c) 1 × 106 (d) 3.28 × 106
2013 9 For a normal eye, the cornea of eye provides a converging power of 40 D and the least converging power of the eye lens behind the cornea is 20 D. Using this information, the distance between the retina and cornea-eye lens can be estimated to be [NEET] (a) 5 cm (b) 2.5 cm (c) 1.67 cm (d) 1.5 cm
10 A least distance of distinct vision is 25 cm. The focal length of a convex lens is 5 cm. It can act as a simple microscope of magnifying power. [UP CPMT] (a) 4 (b) 5 (c) 6 (d) None of these 11 For a telescope, larger the diameter of the objective lens (a) greater is the resolving power [KCET, Manipal] (b) smaller is the resolving power (c) greater is the magnifying power (d) smaller is the magnifying power 2012 12 The magnifying power of a telescope is 9. When it is adjusted for parallel rays, the distance between the objective and eyepiece is 20 cm. The focal length of lenses are [CBSE AIPMT] (a) 10 cm, 10 cm (b) 15 cm, 5 cm (c) 18 cm, 2 cm (d) 11 cm, 9 cm
2011 13 If the focal length of the eyepiece of a telescope is doubled, its magnifying power ( m ) will be (a) 2m (b) 3m m (c) (d) 4m 2
[WB JEE]
14 A microscope is focussed on an ink mark on the top of a table. If we place a glass slab of 3 cm thick on it, how should the microscope be moved to focus the ink spot again? The refractive index of glass is 1.5. [J&K CET] (a) 2 cm upwards (b) 2 cm downwards (c) 1 cm upwards (d) 1 cm downwards
2010 15 If f o and f e are the focal lengths of the objective and
eyepiece, respectively of a telescope, then its magnifying power will be [UP CPMT] (a) f o + f e (b) f o × f e 1 (c) f o / f e (d) ( f o + f e ) 2
16 If the aperture of a telescope is decreases, then resolving power will be [MHT CET] (a) increases (b) decreases (c) remain same (d) zero 17 Angular resolving power of human eye is (b) 3.6 × 102 (a) 3.4 × 103 4 (d) 3.6× 106 (c) 3.6 × 10
[MP PMT]
18 A telescope using light having wavelength 5000 Å and using lenses of focal lengths 2.5 cm and 30 cm. If the diameter of the aperture of the objective is 10 cm, then the resolving limit of telescope is [Haryana PMT] (a) 6.1× 10−6 rad (b) 5.0× 10−6 rad (c) 8.3 × 10−4 rad (d) 7.3× 10−3 rad 19 Mark the correct one. [Punjab PMET] (a) Our eyes can distinguish between real and virtual image. (b) Virtual image can also be taken on screen. (c) If the incident rays are converging at a point, then the object is real. (d) None of the above. 20 If the red light is replaced by blue light illuminating the object in a microscope, the resolving power of the microscope [Punjab PMET] (a) decreases (b) increases (c) gets halved (d) remains unchanged 21 The magnification produced by an astronomical telescope for normal adjustment is 10 and the length of the telescope is 1.1 m. The magnification, when the image is formed at least distance of distinct vision is [EAMCET] (a) 6 (b) 14 (c) 16 (d) 18
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
22 An astronomical telescope in normal adjustment receives light from a distance source S. The tube length is now decreased slightly, then [BCECE] (a) no image will be formed (b) a virtual image of S will be formed at a finite distance (c) a large, real image of S will be formed behind the eyepiece, far away from it (d) a small, real image of S will be formed behind the eyepiece closes to it 23 An astronomical telescope has an angular magnification of magnitude 5 for distant objects. The separation between the objective and the eye-piece is 36 cm and the final image is formed at infinity. The focal length f o of the objective [JCECE] and the focal length f e of eye-piece are (a) f o = 45 cm and f e = − 9 cm (b) f o = − 7.2 cm and f e = 5 cm (c) f o = 50 cm and f e = 10 cm (d) f o = 30 cm and f e = 6 cm 24 The nearer point of hypermetropia eye is 40 cm. The lens to be used for its correction should have the power (a) + 1.5 D (b) − 1.5 D [CG PMT] (c) + 2.5 D (d) + 0.5 D
2009 25 An eye specialist prescribes spectacles having a combination of a convex lens of local length 40 cm in contact with a concave lens of focal length 25 cm. The power of this lens combination will be [AFMC] (a) + 1.5 D (b) − 1.5 D (c) + 6.67 D (d) − 6.67 D
26 The magnifying power of telescope is high, if [AFMC] (a) both objective and eyepiece have short focal length (b) both objective and eyepiece have large focal length (c) the objective has a large focal length and the eyepiece has a short focal length (d) the objective has a short focal length and the eyepiece has a large focal length. 27 A telescope has an objective of focal length 50 cm and an eyepiece of focal length 5 cm. The least distance of distinct vision is 25. The telescope is focussed for distinct vision on a scale 200 cm away. The separation between the objective and the eyepiece is [Manipal] (a) 75 cm (b) 60 cm (c) 71 cm (d) 74 cm
28 An electron microscope is superior to an optical microscope in [Haryana PMT, CG PMT] (a) having high resolving power (b) being easy to handle (c) low cost (d) quickness of observation 29 If the telescope is reversed, i.e. seen from the objective lens, then [AFMC] (a) object will appear very small (b) object will appear very large (c) there will be no effect on image (d) image will be slightly greater than the earlier one 30 In a laboratory four convex lenses L1 , L2 , L3 and L4 of focal lengths 2, 4, 6 and 8 cm, respectively are available. Two of these lenses form a telescope of length 10 cm and magnifying power is 4. The objective and eye lenses are respectively [JIPMER] (a) L2 , L3 (b) L1 , L4 (c) L1 , L2 (d) L4 , L1
2008 31 An observer looks at a tree of height 15 m with a telescope of magnifying power 10. To him the tree appears [Manipal] (a) 10 times taller (b) 15 times taller (c) 10 times nearer (d) 15 times nearer
32 The resolution limit of the eye is 1 min. At a distance x km from the eye, two persons stand with a lateral separation of 3 m. For the two persons to be just resolved by the naked eye, x should be [Manipal] (a) 10 km (b) 15 km (c) 20 km (d) 30 km 33 In Ramsden eyepiece, the focal length of each lens is F. The distance of the image formed by the objective lens from the eye lens is [Punjab PMET] 14F 13F 12F 11F (b) (c) (d) (a) 15 14 13 12 34 In Ramsden eyepiece, the two plano-convex lenses each of focal length f are separated by a distance 12 cm. The equivalent focal length (in cm) of the eyepiece is (a) 10.5 (b) 12.0 [Punjab PMET] (c) 13.5 (d) 15.5 35 In Huygens’ eyepiece, [Punjab PMET] (a) the cross wires are outside the eyepiece (b) condition for achromatism is satisfied (c) condition for minimum spherical aberration is not satisfied (d) the image formed by the objective is a virtual image
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RAY OPTICS AND OPTICAL INSTRUMENTS
2007 36 Identify the wrong description of the below figures.
2006 43 A telescope has focal length of objective and eyepiece as
[AIIMS] I.
II.
F
III.
F
IV. F
37
38
39
40
F
(a) I represents far-sightedness (b) II correction for short-sightedness (c) III represents far-sightedness (d) IV correction for far-sightedness Diameter of human eye lens is 2 mm. What will be the minimum distance between two points to resolve them, which are situated at a distance of 50 m from eye ? The wavelength of light is 5000Å. [AFMC] (a) 2.32 m (b) 4.28 mm (c) 1.25 cm (d) 12.48 cm A telescope has an objective lens of 10 cm diameter and is situated at a distance of one kilometre from two objects. The minimum distance between these two objects, which can be resolved by the telescope, when the mean wavelength of light is 5000 Å, of the order of [Manipal] (a) 0.5 m (b) 5 m (c) 5 mm (d) 5 cm How should people wearing spectacles work with a microscope? [MP PMT] (a) They should keep on wearing their spectacles (b) They should take off their spectacles (c) They may keep on wearing or take off their spectacles, it makes no difference (d) They cannot use a microscope at all A simple telescope consisting of an objective of focal length 60 cm and a single eye lens of focal length 5 cm is focussed on a distant object in such a way that parallel rays comes out from the eye lens. If the object subtends an angle 2° at the objective, the angular width of the image [Punjab PMET]
1 (d) ° 6 41 The head lights of a jeep are 1.2 m apart. If the pupil of the eye of an observer has a diameter of 2 mm and light of wavelength 5896 Å is used, what should be the maximum distance of the jeep from the observer if the two head lights are just separated ? [KCET] (a) 33.9 km (b) 33.9 m (c) 3.34 km (d) 3.39 m 42 The limit of resolution of an optical instrument arises on account of [Guj CET] (a) reflection (b) diffraction (c) polarisation (d) interference (a) 10°
(b) 24°
(c) 50°
200 cm and 5 cm, respectively. What is magnification of telescope? [AFMC] (a) 40 (b) 80 (c) 50 (d) 0.01
44 A person who can see things most clearly at a distance of 10 cm, requires spectacles to enable to see clearly things at a distance of 30 cm. What should be the focal length of the spectacles? [Manipal] (a) 15 cm (concave) (b) 15 cm (convex) (c) 10 cm (d) zero 45 The magnifying power of objective of a compound microscope is 5. If the magnifying power of microscope is 30, then magnifying power of eyepiece will be [Kerala CEE] (a) 0.17 (b) 6 (c) 3 (d) 25 (e) 35 46 Ability of the eye to see objects at all distance is called [Punjab PMET]
(a) binocular vision (c) hypermetropia
(b) myopia (d) accommodation
47 A person sees clearly at a distance of 100 cm, then power of lens used to see object at 40 cm is [JCECE] (a) 3 D (b) −3 D (c) − 1.5 D (d) + 1.5 D 48 The power of a lens, a short sighted person uses is − 2 D. Find the maximum distance of an object which he can see without spectacles. [JCECE] (a) 25 cm (b) 50 cm (c) 100 cm (d) 10 cm
2005 49 The angular resolution of a 10 cm diameter telescope at a wavelength of 5000 Å is of the order of (a) 106 rad (b) 10−2 rad −4 (c) 10 rad (d) 10−6 rad
[CBSE AIPMT]
50 A telescope has an objective lens of focal length 200 cm and an eyepiece with focal length 2 cm. If this telescope is used to see a 50 m tall building at a distance of 2 km, what is the height of the image of the building formed by the objective lens? [AIIMS] (a) 5 cm (b) 10 cm (c) 1 cm (d) 2 cm 51 Assertion The resolving power of a telescope is more, if the diameter of the objective lens is more. Reason Objective lens of large diameter collects more light. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
52 Large aperture telescopes are used for (a) greater resolution (b) greater magnification (c) reducing lens aberration (d) ease of manufacturer
[Haryana PMT]
53 In a reflecting astronomical telescope, if the objective (a spherical mirror) is replaced by a parabolic mirror of the same focal length and aperture, then [Punjab PMET] (a) the telescope will gather more light (b) spherical aberration will be absent (c) the larger image will be obtained (d) the final image will be erect
54 Magnification of a compound microscope is 30. Focal length of eyepiece is 5 cm and the image is formed at a distance of distinct vision 25 cm. The magnification of the objective lens is (a) 6 (b) 5 (c) 7.5 (d) 10 [DUMET] 55 A Galilean telescope has an objective of focal length 100 cm and magnifying power 50. The distance between the two lenses in normal adjustment will be [BCECE] (a) 98 cm (b) 100 cm (c) 150 cm (d) 200 cm 56 A film projector magnifies a 100 cm 2 film strip on a screen. If the linear magnification is 4, the area of the magnified film on the screen is [BCECE] 2 2 2 2 (a) 1600 cm (b) 400 cm (c) 800 cm (d) 200 cm
Answers 1 (a)
2 (a)
3 (d)
4 (a)
5 (a)
6 (a)
7 (b)
8 (d)
9 (c)
10 (c)
11 (a)
12 (c)
13 (c)
14 (c)
15 (c)
16 (b)
17 (a)
18 (a)
19 (a)
20 (b)
21 (b)
22 (b)
23 (d)
24 (c)
25 (b)
26 (c)
27 (c)
28 (a)
29 (a)
30 (d)
31 (c)
32 (a)
33 (d)
34 (c)
35 (b)
36 (a)
37 (c)
38 (c)
39 (b)
40 (b)
41 (c)
42 (b)
43 (a)
44 (a)
45 (b)
46 (d)
47 (d)
48 (b)
49 (d)
50 (a)
51 (a)
52 (a)
53 (b)
54 (b)
55 (a)
56 (a)
Explanations 1 (a) Given, focal length of objective lens, fo = 10 cm Focal length of eye lens, fe = 10 mm = 1cm Total length = fo + fe = 10 + 1 cm = 11 This is the case when the final image is formed at infinity, therefore Angular magnification, f 10 |m | = o = = 10 fe 1
2 (a) Angular magnification of an astronomical refracting telescope is given as f M = o fe where, fo and fe are the focal length of objective and eyepiece, respectively. From the given relation, it is clear that for large magnification either fo has to be large or fe has to be small. Angular resolution of an astronomical refracting telescope is given as a R= 1.22λ where, ais the diameter of the objective.
Thus, to have large resolution, the diameter of the objective should be large. Hence, from the above, objective lens should have large focal length ( fo ) and large diameter (a).
3 (d) For microscope, L D m= fo fe 1 ⇒ m∝ fo f For telescope, m = o , m ∝ fo fe The magnifying power of microscope will decrease but the magnifying power of telescope will increase.
4 (a) In this defect, eye cannot see horizontal and vertical lines clearly, simultaneously. It is due to imperfect spherical nature of eye lens. This defect can be removed by using cylindrical lenses (Torric lenses).
5 (a) The intermediate image formed by the objective of a compound microscope is real, inverted and magnified.
6 (a) In normal adjustment, the object and the final image are both at infinity and the separation between the objective and the eyepiece is fo + fe.. Thus, …(i) fo + fe = 35 cm Also, the magnifying power of the telescope in normal adjustment is f m = − o = − 6 (given) fe …(ii) fo = 6 fe Solving Eqs. (i) and (ii), we get fo = 30 cm and fe = 5 cm
7 (b) By compound microscope, m=
L fo
D 1 + fe
(where length of tube L = 30 cm, focal length of objective lens fo = 1 cm, focal length of eye-piece fe = 6 cm and D = 25 cm) 25 1 + 6 (6 + 25) = 30 × 6 = 5 × 31= 155 ≅ 150
m=
30 1
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RAY OPTICS AND OPTICAL INSTRUMENTS
8 (d) Given, wavelength of light,
Now, if the focal length of the eyepiece ( fe ) is doubled, then the new magnification would be equal to f m m′ = − o = . 2 fe 2
λ = 5000 Å = 5000 × 10−10 = 5 × 10−7 m
Diameter of telescope, D = 200 cm = 2 m Resolving power of a telescope 1 D = = dθ 1.22λ where, dθ = limit of resolution λ = wavelength of light used and D = diameter of aperture of objective. 1 2 So, RP = dθ 1.22 × 5 × 10−7
14 (c) Given, n = 1.5, ho = 3 cm Refractive index, n = ⇒
Peff = 40 D + 20 D = 60 D 100 100 f = = = 1.67 cm Peff' 60
⇒
10 (c) Magnifying power, m = 1 +
D f
Given, D = 25cm , f = 5 cm 25 ∴ m =1+ ⇒ m =1+ 5 = 6 5
11 (a) The resolving power of a telescope is its ability to show two distant closely lying objects as just separate. The reciprocal of resolving power is the limit of resolution of the telescope. λ Limit of resolution = 1.22 rad, d where λ is wavelength and d the aperture (diameter). Hence, to reduce the limit of resolution of a telescope, we must use objective lens of large aperture (d ).
12
Larger the aperture of the objective lens, smaller the limit of resolution or greater the resolving power of the telescope. f (c) Given, M = o = 9 and fe fo + fe = 20 fo = 9 fe So, 9 fe + fe = 20 ⇒ fe = 2 cm ∴ fo = 9 × 2 = 18 cm
13 (c) We know that, the magnifying f power (m) is given by m = − o . fe
or
ho hi
Given, fe + fo = 1.1 m ⇒ fe + 10 fe = 1.1 × 100 cm
3 hi
11 fe = 110 ⇒ fe = 10 cm Magnification at least distance of distinct vision, f f mb = o 1 + e fe D
hi =
fo , where fo is the focal fe length of the objective lens and fe is the focal length of eyepiece. a (b) The resolving power = 122 . λ where, a = aperture of telescope. ∴ Resolving power ∝ Aperture of telescope If aperture is decreased, then resolving power will decrease. given by m =
16
17 (a) The minimum angular separation
35 10 = 10 1 + = 14 = 10 25 25
22 (b) In an astronomical telescope,
23
=
24 (c) Hypermetropia can be removed by using a convex lens. Focal length of used lens, f = + d = + 40 cm (defected near point) 100 100 = ∴ Power of lens = f (cm) 40
10800 = 3.436 × 103 rad π
18 (a) Given, λ = 5000Å = 5000 × 1010 m and a = 10 cm = 01 . m. Resolving limit 122 . λ 1.22 × (5000 × 10−10 ) = = a 0.1 = 6.1 × 10−6 rad
19 (a) Only real image can be taken on screen. Object is real only when incident rays are diverging from it. Our eyes can distinguish between real and virtual image.
L = fo + fe When tube length is decreased, the image formed by the objective lens will lie between principal focus and optical centre of eye-lens instead of lying at the focus of eye-lens. Therefore, a virtual image will be formed at a finite distance from the eye-lens. f (d) In this case m = o = 5 ...(i) fe and length of telescope = fo + fe = 36 ...(ii) Solving Eqs. (i) and (ii), we get fe = 6 cm , fo = 30 cm
between two objects, so they are just resolved is called resolving limit. For 1 ° eye it is 1 = . Reciprocal of 60 resolving limit is called Resolving Power (RP) 1 1 = = 1 π 1° × 60 60 180
fo = 10 fe fo = 10 fe
21 (b) Magnification,
15 (c) Magnification of a telescope is
We have,
2µ sin θ 122 . λ
Since, λ R > λ B , hence resolving power increases.
3 = 2 cm 1.5 Hence, microscope is moved 3 − 2 = 1 cm upwards ⇒
2 × 107 20 × 106 = = 6.1 6.1 = 3.278 × 106 = 3.28 × 106
9 (c) Given, P1 = 40 D and P2 = 20 D
1.5 =
20 (b) Resolving power =
25
= 2.5 D 1 (b) Power = Focal length Focal length of combination of convex and concave lenses is given by 1 1 1 = + F f1 f2 where, f1 and f2 be the focal lengths of convex and concave lenses, respectively.
700
Now, ⇒
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
1 1 1 = + F 0.4 (−0.25)
fo + fe = 10 cm and magnitude of f magnifying power = o = 4. fe
1 = − 1.5 F
Power, P = − 1.5 D
26 (c) In telescope for high magnifying power, size of objective lens, i.e.( fo ) should be large whereas size of eyepiece, i.e. ( fe ) should be small. f [Q Magnifying power, |M | = o is fe normal adjustement]
31
32
27 (c) Given, fo = 50 cm, fe = 5 cm, d = 25 cm, uo = 200 cm, L = ? 1 1 1 As, − = vo uo fo 1 1 1 ∴ = + vo fo uo 1 1 4 −1 3 = − = = 50 200 200 200 200 vo = cm 3 Linear magnification produced by objective lens,
33
34
v 200 / 3 1 mo = o = − =− uo 200 3 Now,
ve = d = −25 cm
1 1 1 From − = ve ue fe ⇒
−1 1 1 = − ue f e ve 1 1 5+1 = + = 5 25 25 25 ue = − cm 6
Distance between objective and eye piece L = vo + ue =
200 25 + 3 6
400 + 25 425 = = 6 6 = 70.8 cm ≈ 71cm
28 (a) Electron microscope has very high resolving power.
29 (a) If the telescope is reversed, i.e. seen from the objective side, then object will appear very small because in this case magnification becomes reciprocal of initial value.
Both conditions are satisfied, if fo = L4 = 8 cm and fe = L1 = 2 cm. (c) The angle subtended at the eye becomes 10 times larger. This happens only when the tree appears 10 times nearer. l (a) θ = , θ = 1min. r 1 π 1 rad So, θ = = × 60° 180 60 and l = 3m l ∴ x=r= θ 3 = 10 km ⇒ x= π 1 × 180 60 (d) The distance of image formed by the objective lens from the eye-lens 2F F 8 F + 3 F 11F = + = = 3 4 12 12 2f (c) d = 3 3d 3 × 12 or f = = = 18 cm 2 2 Equivalent focal length. f1 f2 f 18 × 18 18 f′ = + = + f1 + f2 4 18 + 18 4
Substituting in Eq. (iii), we get 5 × 10−7 × 50 = 12. 5 × 10−3 m y= 2 × 10−3 = 1.25 cm
38 (c) Resolving limit of telescope,
eyepiece consisting of two plano-convex lenses separated by a distance equal to half the sum of their focal lengths. Its chromatic and spherical aberration is also eliminated.
⇒ Given,
D = 1 km = 1000 m and d = 10 cm = 0.1 m 5000 × 10−10 × 1000 ∴ x= 0 .1 = 5 × 10−3 m = 5 mm
39 (b) Microscope is an optical instrument
40
41
36 (a) Fig. I shows near sightedness, so 37
option (a) is wrong. (c) Angular limit of resolution of eye Wavelength of light = Diameter of eye lens λ i.e. …(i) θ= d If y is the minimum resolution between two objects at distance D from eye, then y …(ii) θ= D From Eqs. (i) and (ii), we have y λ λD or y = …(iii) = D d d Given, λ = 5000 Å = 5 × 10−7 m, D = 50 m
x λ = D d λD x= d λ = 5000Å = 5000 × 10−10 m, θ∝
= 9 + 4.5 = 13.5 cm
35 (b) In Huygens’ eyepiece, a telescope
d = 2 mm = 2 × 10−3 m
and
30 (d) Here, length of telescope of
used to increase the visual angle of near objects which are too small to be seen by naked eye. So, spectacles should be removed while working with a microscope as image is magnified. f (b) Magnification, m = o fe Angle subtanded by the image Also m = Angle subtended by the object fo α ∴ = fe β f × β 60 × 2 ⇒ α= o = fe 5 = 24 ° D×d (c) Distance of jeep, x = 1. 22 × λ where, D = diameter of lens, = 2 mm = 2 × 10−3 m d = separation between sources = 1.2 m λ = 5896 Å = 5896 × 10−10 m (2 × 10−3 ) × 1. 2 1. 22 × 5896 × 10−10 ⇒ x = 3. 34 km (b) According to ray optics, the image of a point object formed by an ideal lens is a point only. However, because of the diffraction effects, the image of a single point in the object formed by a circular lens will actually be a bright central circular region surrounded by concentric dark and light rings. The minimum distance between these two rings which can just be seen as separate by the optical instrument is called the limit of resolution. ⇒
42
x=
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RAY OPTICS AND OPTICAL INSTRUMENTS
fo fe where, fo = focal length of objective = 200 cm and fe = focal length of eyepiece = 5cm. 200 = 40 ∴ |M | = 5 (a) Since, the person is not able to see distant objects beyond 10 cm so, he should use concave lens in his spectacles. Concave lens will form the image of object distant 30 cm, at 10 cm it means u = − 30 cm, v = − 10 cm 1 1 1 1 1 2 = − = − =− f v u −10 −30 30 1 1 or =− f 15 |M | =
43 (a)
44
So,
f = − 15 cm
Minus sign signifies that lens used in concave.
45 (b) Total magnification, M = M o × M e Given, M = 30 and M o = 5 M 30 Me = = =6 ⇒ Mo 5
46 (d) Accommodation is ability of eye to 47
see object at all distance. 1 1 1 (d) By lens formula, = − f v u Given, ∴ ⇒ ⇒
v = − 100 cm and u = − 40 cm 1 1 1 =− − f 100 −40 1 1 1 =− + f 100 40 1 −1 + 2. 5 1. 5 = = f 100 100
Hence, power of lens is P=
100 1. 5 = 100 × = 1. 5 D f (cm ) 100
1 Focal length (m) Given, P = − 2D 1 ∴ Focal length = − = − 0. 5 m 2
48 (b) Power (P ) =
⇒ F = − 50 cm Hence, maximum distance of an object, which he can see without spectacles is 50 cm. 1. 22λ d 1. 22 × 5000 × 10−10 = 10 × 10−2
49 (d) Angular resolution =
= 61 . × 10−6 ≈ 10−6 rad
50 (a) For objective (convex) lens, 1 1 1 = − fo vo uo 1 1 1 = + vo fo uo
or Here, and ∴
3
O = 50 m = 5 × 10 cm 1 1 1 = + vo 200 −200 × 103 =
103 − 1 999 = 200 × 103 200 × 103
200 × 103 cm 999 v I Magnification, m = o = uo O
or
∴ or
vo =
I 200 × 103 = 999 × 200 × 103 5 × 103 I =
microscope at least distance of distinct vision (D = 25 cm ) has magnification, M = M o × M e where M o is magnification of objective lens and M e that of eyepiece. Given, fe = 5 cm , D = 25 cm and M = 30 D Also, M = M o 1 + fe ⇒
fo = 200 cm, uo = − 2 km = − 2 × 105 cm
⇒
54 (b) The image formed in a
5 × 103 ≈ 5 cm 999
a 1.22λ where, a is the diameter of objective lens and λ is the wavelength of light used. It is obvious that on increasing a, more light is collected by objective lens and so the image formed is more bright. Thus, resolving power of telescope increases.
51 (a) Resolving power of telescope =
52 (a) A telescope will have small value of angular limit of resolution and hence high resolving power, if objective of large diameter is used.
53 (b) When a spherical objective mirror is replaced by a parabolic mirror, it eliminates the spherical aberration.
25 30 = M o × 1 + 5
⇒ Mo =
30 =5 6
55 (a) In Galilean telescope, a convergent lens is used as the objective and a divergent lens as the eyepiece. Magnifying power and length of telescope are written as f M = o ue and L = fo − ue In normal adjustment, i.e. in relaxed eye state
So, or
ue = fe f M ∞ = o = 50 fe fe =
fo 100 = = 2 cm 50 50
and
L∞ = fo − fe
⇒
L∞ = 100 − 2 = 98 cm
56 (a) Linear magnification = 4 Areal magnification = (Linear magnification) 2 = (4 )2 = 16 Therefore, area of magnified film on the screen = areal magnification × area = 16 × 100 = 1600 cm 2
24 Wave Optics Quick Review According to wave theory of light, light is a form of energy which travels in the form of transverse waves. Wave theory introduced the concept of wavefront.
Wavefront • It is the locus of all those points (wavelets or particles) which are vibrating in the same phase condition. The
shape of the wavefront depends on a nature and dimension of source of light. • Types of wavefront are classified according to the table given below Source of Light (i)
Point source (rays are radial emerging from centre).
Shape of Wavefronts Spherical and ecentric with point source at their centre.
Figure 4
Aµ
3
(iii) Very far off source (emitting parallel rays).
1 r
I µ
1 r2
I µ
1 r
2 1 r
(ii) Linear and all points are equidistant from the source.
Amplitude (A) Intensity (I)
Cylindrical and co-axial with the source as their common axis.
Direction of propagation
Aµ
1 r
1 2 3 r
A µ r0
Plane Light rays
Plane wavefronts
I µ r0
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WAVE OPTICS
Huygens’ Principle According to Huygens’ principle, (i) Each point on the given wavefront (called primary wavefront) is the source of a secondary disturbance (called secondary wavelets) and the wavelets emanating from these points spread out in all directions with the speed of the wave. (ii) A surface touching these secondary wavelets, tangentially in the forward direction at any instant gives the shape of a new wavefront at that instant. This is called secondary wavefront. On the basis of the above principle, many optical phenomena like interference, diffraction as well as refraction can be explained. This principle could not explain electromagnetic nature of light.
Types of Interference
(i) Constructive (when f = 2np , for two waves meet in cos f = maximum same phase) f = 0, 2p , 4 p … (ii) Destructive (when f = (2n - 1)p , for two waves meet in cos f = minimum opposite phase) = -1 f = p , 3p , 5p , …
(i) The sources of light which is continuously emitting light waves of same frequency with a zero or constant phase difference are called coherent sources. (ii) The sources of light which do not maintain constant phase difference are called incoherent sources.
Principle of Superposition of Waves According to superposition principle, at a particular point in the medium, the resultant displacement y produced by a number of waves is the vector sum of the displacements produced by each of the waves ( y1 , y2 , ... ). i.e.
I max = ( I1 +
I max I 1 + I 2 + 2 I 1 I 2 = I min I 1 + I 2 - 2 I 1 I 2 2
æ I + I 2 ö æ a1 + a 2 ö 2 ÷ =ç = çç 1 ÷ ÷ è I 1 - I 2 ø è a1 - a 2 ø I max æ r + 1ö =ç ÷ I min è r - 1ø
where, r =
2
a1 = amplitude ratio. a2
• For two interfering waves, if f 0 is the originating phase
difference and D be the path difference between them, then total phase difference between them is given by, f = ( f 0 + 2p / l )D
Young’s Double Slit Experiment The experimental arrangement is shown in figure below. In this experiment, the monochromatic light is used.The following terms are expressed below P S1
Interference of Light same wavelength) emitted by two coherent sources, travelling in a given direction is called interference. • The intensity of resultant wave does not remain uniform, at some points, intensity is maximum, while at some points, intensity is minimum. • Amplitude and intensity of interference of two waves are expressed as A R = a12 + a 22 + 2a1 a 2 cos f and I R = I 1 + I 2 + 2 I 1 I 2 cos f where a1 , a 2 = amplitude of two light waves, f = phase difference between them and I 1 , I 2 = intensities of two light waves. The resultant intensity is just the sum of intensities , i.e. I = I1 + I 2 + I 3 + ¼ . • According to phase difference in superimposing waves, interference is divided into two categories in the given table
I 2 )2
I min = ( I 1 - I 2 )2
y = y1 + y 2 + y 3 + y 4 + .. .
• Superimposition of two light waves of same frequency (or
Intensities
• Comparison of intensities of maxima and minima
\
Coherent and Incoherent Sources of light
Phase Difference
S
x d O
S2 D
• For light waves reaching at a point P, situated at a
distance x from central point O, the path difference ( D ) is given by xd D = S 2P - S1P = D xd = nl, then we get nth bright fringe, where • If D n = 1, 2, 3, 4 .. . xd l = ( 2n - 1) , then we get nth dark fringe, where • If D 2 n = 1, 2, 3, 4.. . • Fringe Width ( b ) The separation between any two consecutive bright or dark fringes is called fringe width (b) and it is given by Dl b= d
704
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
• Angular Fringe Width (q ) Its width is expressed as
b l = D d • The maximum and minimum intensity of the fringes are expressed as follows f I = I max cos 2 and I min = 0 2 • The fringe width in a medium of refractive index (m ), when whole apparatus of Young’s double slit experiment is immersed, will be expressed as Dl . bm = md • Distribution of intensity in Young’s double slit experiment is shown graphically below q=
4 I (Intensity with interference)
• The apparent change in frequency or wavelength of light due
to relative motion between the source of light and observer is called doppler’s effect. • Depending on the relative motion between source of light and stationary observer, the following terms obtained can be shown in tabular form below Relative Position Source moving towards observer
I (Intensity with only one source)
v n¢ = n æç1 + ö÷ è cø
Apparent Wavelength
Fractional Change in Frequencies/ Wavelength
v Dl Dn v = = l ¢ = l æç1 - ö÷ è n c cø l
Doppler’s Shift
Violet shift (Apparent wavelength < Actual wavelength)
Dl Dn v Red shift (Apparent v = = l ¢ = l æç1 + ö÷ è l n c wavelength < cø Actual wavelength)
where, n = actual frequency, n¢ = apparent frequency, v = speed of source w.r.t. stationary observer and c = speed of light.
A thin film (soap or oil film) spread over water produce bright or dark fringes due to interference between from upper and lower surface which are shown in table given below
Diffraction of Light • The phenomena of bending of light around the corners of an
•
Interference Bright Fringe Dark Fringe l Reflected 2m t cos r = nl , 2mt cos r = (2n + 1) , light 2 where n = 0, 1, 2, 3, .. . where n = 0, 1, 2, 3, .. . l Transmitted 2mt cos r = nl 2mt cos r = (2n + 1) light 2
Shift in Interference Pattern When a thin transparent sheet of thickness t and refractive index m is inserted in one of the interfering beams, then following terms can be calculated (i) Additional path difference due to sheet = (m - 1) t b D (ii) Fringe shift = (m - 1) t = (m - 1) t l d (iii) If due to presence of thin film, the fringe pattern shifts by n fringes, then (m - 1) t nl n= Þ t= l (m - 1) P y
t
O
S2 D
• • •
obstacle/aperture of the size of the wavelength is called diffraction of light. In the figure given alongside, diffraction pattern due to single slit is +2λ/a shown. +λ/a For a central bright fringe (central maxima) surrounded by dark and O –λ/a bright lines (secondary minima and maxima). –2λ/a In the given figure of diffraction fringe pattern, intensity is maximum at point O. 2Dl Width of the central maxima, 2 y = a 2l Angular width, 2q = . a Angular position and distance of nth secondary minima and maxima from central maxima are shown in tabular form below Intensity (f )
λ/2 λ 3λ/2 2λ-Path difference π 2π 3π 4π-Phase difference
Interference in Thin Films
S1
Apparent Frequency
v Source n¢ = n æç1 - ö÷ moving è cø away from the observer
2 I (Intensity without interference)
− 2λ − 3λ/2 −λ −λ/2 − 4 π − 3 π − 2π − π
Doppler’s Effect of Light
Pattern of Fringe
Path Difference (2 n + 1)l 2
Secondary maxima
a sin q =
Secondary minima
a sin q = ± nl, where n = 1, 2 , 3, ...
Angular Position
Distance from Central Maxima
sin q » q »
(2 n + 1)l 2a
yn =
(2 n + 1)lf 2a
sin q » q »
nl a
yn = D × q =
nlf a
• The angular width of central maxima is double as compared
to the angular width of secondary diffraction maxima.
705
WAVE OPTICS
Fresnel’s Distance (z F ) The distance travelled by a beam of width ( x ) before spreading out due to diffraction is known as Fresnel’s d2 distance. It is expressed as z F = l where, d = size of slit or hole. • Spreading due to diffraction is prominent for distances much greater than z F . • Image formation can be explained in ray optics for distances much lesser than z F , i.e. d >>> l.
Malus’s Law According to Malus’s law, the intensity of emergent light out of analyser varies as I µ cos 2 q or I = I 0 cos 2 q, where q is the angle between the planes of transmission of polariser and analyser. Figure given below explains Malus law Transmission axis θ
Diffraction Grating • It consists of large number of equally spaced parallel
slits, used for measuring wavelengths accurately. • Resolving power of the diffraction grating is expressed as l l R= = l 2 - l 1 Dl where, l 1 , l 2 = two nearly equal wavelength (Dl = l 2 - l 1 ).
Resolving Power of Optical Instruments • It is the ability of optical instruments to observe the
separate images of two close objects.
2m sin q 1 , = • Resolving Power of Microscope R = l Dd where m = refractive index of medium between object and objective and q = angle subtended by a radius of objective lens on one of the objects. • Resolving Power of Telescope 1 D , R= = Dq 1.22l
Unpolarised light
• The phenomena of limiting the vibration of electric
• • • •
vector in one direction in a plane perpendicular to the direction of propagation of light wave is called polarisation of light. The plane perpendicular to the plane of oscillation is called plane of polarisation. Thin film of ultramicroscopic crystals used to produce the plane polarised light is known as polaroids. The crystal or polaroid on which unpolarised light is incident is called polariser. Crystal or polaroid on which polarised light in incident is called analyser.
Polariser
A0
Analyser
I = Intensity A = Amplitude
Polarisation of Transverse Mechanical Waves If a transverse mechanical wave is passed through a narrow slit, so that the plane of vibration of the wave is parallel to the slit, then the wave passes through the slit with its vibrations being unaffected and the wave is said to be plane polarised.
Polarisation by Reflection When a beam of unpolarised light is reflected from the surface (unpolished) of a transparent medium of refractive index n at the polarising angle i p , the reflected light is completely plane polarised, shown in the following figure
Unpolarised light µ
θp
Plane polarised reflected light
θp 90° θr
Partial polarised refracted light
where D = aperture diameter of objective.
Polarisation of Light
I0
Brewster’s Law According to Brewster’s law, a reflected light is completely plane polarised at certain angle of incidence ( i p ) when a beam of unpolarised light is reflected from a transparent medium (refractive index = m). It can be expressed as tan i p = m • Accordingly, the reflected and transmitted rays are mutually perpendicular, • Thus, angle of refraction, r = 90° - i p .
Polarisation of Light by Scattering It is the phenomena of bluish appearance of reflected light in the direction perpendicular to the incident beam.
706
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topical Practice Questions All the exam questions of this chapter have been divided into 4 topics as listed below Topic 1 — NATURE OF LIGHT AND HUYGENS’ PRINCIPLE
706–707
Topic 2
—
INTERFERENCE OF LIGHT
708–720
Topic 3
—
DIFFRACTION OF LIGHT
720–723
Topic 4
—
POLARISATION OF LIGHT
724–728
Topic 1 Nature of Light and Huygens’ Principle 2019 1 Huygens’ principle does not use (a) reflection (c) diffraction
[JIPMER]
(b) refraction (d) point of spectra origin
2014 2 Wavefront is the locus of all points, where the particles of the medium vibrate with the same (a) phase (b) amplitude (c) frequency (d) period
[KCET]
2009 3 A wavefront is represented by the plane y = 3 - x. The propagation of wave takes place at [MGIMS] (a) 45° with x-direction (b) 135° with x-direction (c) 60° with x-direction (d) No sufficient data
4 Wavefront of a wave has direction with wave motion (a) parallel (b) perpendicular [MGIMS] (c) opposite (d) at an angle of q 5 Huygens’ principle of secondary wavelets may be used to (a) find the velocity of light in vacuum [Manipal] (b) explain the particle’s behaviour of light (c) find the new position of a wavefront (d) explain photoelectric effect 6 Which one of the following property of light does not support wave theory of light? [DCE] (a) Light obeys laws of reflection and refraction. (b) Light waves get polarised. (c) Light shows photoelectric effect. (d) Light shows interference. 7 According to Newton’s corpuscular theory, the speed of light is [KCET] (a) same in all the media (b) lesser in rarer medium (c) lesser in denser medium (d) independent of the medium
2008 8 Wave theory cannot explain the phenomena of I. Polarisation II. Diffraction III. Compton effect IV. Photoelectric effect Which of the following is correct? [EAMCET] (a) I and II (b) II and III (c) III and IV (d) IV and I
2007 9 Which of the following phenomenon exhibits particle’s nature of light? (a) Interference (b) Diffraction (c) Polarisation (d) Photoelectric effect
[MHT CET]
2006 10 Which of the following generates a plane wavefront? (a) a-rays (b) b -rays [MHT CET] (c) g -rays (d) None of these 11 Light waves travel in vacuum along theY -axis. Which of the following may represent the wavefront? [RPMT] (a) y = constant (b) x = constant (c) z = constant (d) x + y + z = constant
12 The wavefront due to a source situated at infinity is (a) spherical (b) cylindrical [Haryana PMT] (c) planar (d) None of these
2005 13 When a ray of light is incident normally on a surface, then (a) the total internal reflection takes place (b) it passes undeviated (c) it undergoes dispersion (d) it gets absorbed by the surface
[J&K CET]
WAVE OPTICS
Answers 1 (d) 11 (a)
2 (a) 12 (c)
3 (b) 13 (b)
4 (b)
5 (c)
6 (c)
7 (b)
8 (c )
9 (d)
10 (d)
Explanations 1 (d) Huygens’ principle use the phenomenon of light as
9 (d) Photoelectric effect states that the light travels in the form of
reflection, refraction and diffraction but does not use point of spectra origin.
2 (a) On the wavefront, all the points are in the same phases. 3 (b) Equation of plane is given as y = - x+ 3 On comparing Eq. (i) with the equation of straight line, y = mx + c Here, m = -1 tan q = - 1 Þ q = 135° with x-direction
…(i)
Plane wavefront
…(ii)
motion of wave. (c) Every point on a given wavefront act as a secondary source of light and emits secondary wavelets which travels in all directions with the speed of light in the medium. A surface touching are these secondary wavelets tangentially in the forward direction, gives the shape of a new wavefront at that instant of time. Hence, secondary wavelets may be used to find the new position of the wavefront.
6 (c) Photoelectric effect does not support the wave theory of light. 7 (b) According to Newton’s corpuscular theory, the speed of light is lesser in rarer medium and more in denser medium. This was the main reason of failure of this theory.
8 (c) The wave theory cannot explain the phenomena of Compton effect and photoelectric effect.
This effect is explained on the basis of quantum nature of light. So, it clearly explains the particle’s nature of light.
10 (d)
4 (b) Wavefront of a wave is perpendicular to the direction of 5
bundles or packets of energy called photons.
When the point source or linear source of light is at very large distance, a small portion of spherical or cylindrical wavefront appears to be plane, such a wavefront is called a plane wavefront. From the given options none of the sources generates plane wavefront, but it can be artificially produced by reflection from a mirror or by refraction through a lens.
11 (a) As, velocity of light is perpendicular to the wavefront and light wave is travelling in vacuum along the Y-axis, therefore, the wavefront is represented by y = constant.
12 (c) As the parallel rays, will come from the source situated at infinity, hence the wavefront is planar and it is perpendicular to the rays.
13 (b) From Huygens’ principle, if the incident wavefront is parallel to the interface of the two media (i = 0), then the refracted wavefront will also be parallel to the interface (r = 0). In other words, if light rays fall normally on the surface, then on passing to the second medium, they will not deviate from their original path.
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 2 Interference of Light 2019 1 In a double slit experiment, when light of wavelength 400 nm was used, the angular width of the first minima formed on a screen placed 1 m away, was found to be 0.2º. What will be the angular width of the first minima, if the entire experimental apparatus is immersed in water? (m water = 4 / 3) [NEET] (a) 0.15º (b) 0.051° (c) 0.1º (d) 0.266º
2 Distance of 5th dark fringe from centre is 4 mm. If D = 2 m, l = 600 nm, then distance between slits is [AIIMS] (a) 1.35 mm (b) 2.00 mm (c) 3.25 mm (d) 10.35 mm 3 A light of wavelength 500 nm is incident on a Young’s double slit. The distance between slit and screen is D = 1. 8 m and distance between slits is d = 0.4 mm. If screen moves with a speed of 4 ms -1 , then with what speed first maxima will move? [AIIMS] (a) 5 mms -1 (b) 4 mms -1 (c) 3 mms -1 (d) 2 mms -1 4 Assertion Distance between position of bright and dark fringe remain same in Young’s double slit experiment. lD Reason Fringe width, b = d [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 5 In a Young’s double slit experiment, if there is no initial phase difference between the light from the two slits, a point on the screen corresponding to the 5th minimum has path difference. [NEET (Odisha) ] l l l l (a) 5 (b) 10 (c) 9 (d) 11 2 2 2 2
2018 6 In Young’s double slit experiment, the separation d between the slits is 2 mm, the wavelength l of the light used is 5896 Å and distance D between the screen and slits is 100 cm. It is found that, the angular width of the fringes is 0.20°. To increase the fringe angular width to 0.21° (with same l and D), the separation between the slits needs to be changed to [NEET] (a) 2.1 mm (b) 1.9 mm (c) 1.8 mm (d) 1.7 mm
2017 7 Young’s double slit experiment is first performed in air and then in a medium other than air. It is found that 8th bright fringe in the medium lies, where 5th dark fringe lies in air. The refractive index of the medium is nearly [NEET] (a) 1.25 (b) 1.59 (c) 1.69 (d) 1.78
8 White light is used to illuminate two slits in Young’s double slit experiment. The separation between the slits is b and the screen is at a distance d ( >> b ) from the slits. At a point on the screen directly in front of one of the slits, which wavelengths are missing? [JIPMER] 2 2 2 b b b b b b (a) , , (b) , , 2d 4d 6 d d 3d 5d 2 2 2 b b b b b b , (d) , , (c) , d 3d 5d 2d 4d 6 d 9 An interference pattern is observed by Young’s double slit experiment. If now the separation between coherent source is halved and the distance of screen from coherent sources is doubled, then new fringe width [AIIMS] (a) becomes double (b) becomes one-fourth (c) remains same (d) becomes four times 10 The Young’s double slit experiment is performed with blue and green light of wavelengths 4360 Å and 5460 Å respectively. If x is the distance of 4th maxima from the central one, then [AIIMS] (a) x blue = x green (b) x blue > x green (c) x blue < x green (d) x blue / x green 11 The maximum numbers of possible interference maxima for slit separation equal to twice the wavelength in Young’s double slit experiment is [JIPMER] (a) infinite (b) five (c) three (d) zero
2016 12 The intensity at the maximum in a Young’s double slit experiment is I 0 . Distance between two slits is d = 5l, where l is the wavelength of light used in the experiment. What will be the intensity infront of one of the slits on the screen placed at a distance D = 10 d? [NEET] I0 3 (b) I 0 (a) 4 4 I0 (d) I 0 (c) 2
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13 The interference pattern is obtained with two coherent light sources of intensity ratio n. In the interference pattern, the I - I min will be ratio max I max + I min [NEET] n 2 n n 2 n (a) (b) (c) (d) n +1 n +1 ( n + 1) 2 ( n + 1) 2 2014 14 In the Young’s double slit experiment, the intensity of light at a point on the screen (where the path difference is l) is K , (l being the wavelength of light used). The intensity at a point where the path difference is l/ 4, will be [J&K CET] (a) K (b) K / 4 (c) K / 2 (d) zero 15 A fringe width of a certain interference pattern is b = 0.002 cm. What is the distance of 5th dark fringe from centre? [KCET] (a) 9 ´ 10-3 cm (b) 11 ´ 10-2 cm (c) 1.1 ´ 10-2 cm (d) 3.28 ´ 106 cm 16 Two coherent monochromatic beams of intensities I and 4I respectively are superposed. Then, the maximum and minimumintensities in the resulting pattern are [WB JEE] (a) 5I and 3I (b) 9I and 3I (c) 4I and I (d) 9I and I 17 Colours appear on a thin soap film and soap bubbles due to the phenomenon of [UK PMT] (a) interference (b) scattering (c) diffraction (d) dispersion 18 In Young’s double slit experiment, the ratio of maximum and minimum intensities in the fringe system is 9 : 1. The ratio of amplitudes of coherent sources is [UK PMT] (a) 9 : 1 (b) 3 : 1 (c) 2 : 1 (d) 1 : 1 19 In Young’s double slit interference experiment, using two coherent waves of different amplitudes, the intensities ratio between bright and dark fringes is 3. Then, the value of the ratio of the amplitudes of the wave that arrive there is æ 3 + 1ö æ 3 - 1ö ÷ (b) ç ÷ (c) 3 : 1 (a) ç è 3 - 1ø è 3 + 1ø
[EAMCET]
(d) 1: 3
20 A fringe width of a certain interference pattern is b = 0.002 cm. What is the distance of 5th dark fringe centre? [CET] (a) 1 ´ 10- 2 cm (b) 11 ´ 10- 2 cm (c) 1.1 ´ 10- 2 cm (d) 3.28 ´ 106 cm 2013 S1 21 The Young’s double slit experimental arrangement is shown in figure below. If l is the wavelength of light used and ÐS 1CS 2 = q, then the fringe width will be [AIIMS] (a)
l q
(b)
l 2q
(c) lq
θ
S2
(d)
2l q
C
22 In Young’s double slit experiment, the slits are 2 mm apart and are illuminated by photons of two wavelengths l 1 = 12000 Å and l 2 = 10000 Å. At what minimum distance from the common central bright fringe on the screen 2 m from the slit will a bright fringe from one interference pattern coincide with a bright fringe from the other? [NEET] (a) 8 mm (b) 6 mm (c) 4 mm (d) 3 mm 23 The ratio of intensity at the centre of a bright fringe to the intensity at a point distance one-fourth of the distance between two successive bright fringes will be [WB JEE] (a) 4 (b) 3 (c) 2 (d) 1 24 Two beams of light of intensities I 1 and I 2 , interfere to give an interference pattern, if the ratio of the maximum I 25 intensity to the minimum intensity is , then 1 is 9 I2 [KCET] 5 81 (a) (b) 4 (c) (d) 16 3 625
2012 25 Assertion The pattern and the position of fringes always remain same even after the introduction of transparent medium in a path of one of the slit. Reason The central fringe is bright or dark depends upon the initial phase difference between the two coherent sources. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct. 26 In Young’s double slit experiment, the fringe width is b. If the entire arrangement is placed in a liquid of refractive index n, the fringe width becomes [AFMC] b b b (c) (d) (a) nb (b) n+1 n-1 n
27 In a Young’s double slit experiment, the separation between the two slits is 0.9 mm and the fringe are observed 1 m away. If it produces the second dark fringe at a distance of 1 mm from the central fringe, the wavelength of the monochromatic source of light used is [Manipal] (a) 450 nm (b) 400 nm (c) 500 nm (d) 600 nm 28 In Young’s double slit experiment, the two slits are d distance apart, interference pattern is observed on a screen at a distance D from the slits. A dark fringe is observed on the screen directly opposite to one of the slits, the wavelength of light is [WB JEE] D2 d2 D2 d2 (a) (d) (b) (c) 2d 2D d D
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2011 29 In a double slit interference experiment, the fringe width obtained with a light of wavelength 5900 Å was 1.2 mm for parallel narrow slits placed 2 mm apart. In this arrangement, if the slit separation is increased by one-and-half times the previous value, then the fringe width is [EAMCET] (a) 0.9 mm (b) 0.8 mm (c) 1.8 mm (d) 1.6 mm
30 In Young’s double slit experiment, the angular width of the fringes is 0.20° for the sodium light ( l = 5890 Å ). In order to increase the angular width of the fringes by 10%, the necessary change in wavelength is [Manipal] (a) zero (b) increased by 6479 Å (c) decreased by 589 Å (d) increased by 589 Å 31 In Young’s double slit experiment, the intensity of light coming from one of the slits is doubled the intensity from the other slit. The ratio of the maximum intensity to the minimum intensity in the interference fringe pattern observed is [Punjab PMET, Manipal] (a) 34 (b) 40 (c) 25 (d) 38 32 In Young’s double slit experiment, if d , D and l represents, the distance between the slits, the distance of the screen from the slits and wavelength of light used respectively, then the bandwidth is inversely proportional to [Kerala CEE] (a) l (b) d (c) D (d) l2 2 (e) D 33 A Young’s double slit set up for interference is shifted from air to within water, then the fringe width [J&K CET] (a) becomes infinite (b) decreases (c) increases (d) remain unchanged 34 In Young’s double slit experiment, the two slits are separated by 1 mm and the screen is placed 1m away. The fringe separation for blue and green light of wavelength 500 nm is [J&K CET] (a) 10 mm (b) 0.5 mm (c) 20 mm (d) 15 mm 35 In the case of light waves from two coherent sources S 1 and S 2 , there will be constructive interference at an arbitrary point P, if the path difference, S 1 P - S 2 P is [J&K CET]
æ (a) ç n + è
1ö ÷l 2ø
(b) nl
æ (c) ç n è
1ö ÷l 2ø
(d)
l 2
36 In Young’s double slit experiment, fringes of width b are produced on a screen kept at a distance of 1 m from the slit. When the screen is moved away by 5 ´ 10-2 m, fringe width changes by 3 ´ 10-5 m. The separation between the slits is 1 ´ 10-3 m. The wavelength of the light used [KCET] is ... nm. (a) 400 (b) 500 (c) 600 (d) 700
37 Consider the following statements in case of Young’s double slit experiment. [EAMCET] I. A slit S is necessary, if we use an ordinary extended source of light. II. A slit S is not needed, if we use an ordinary but well collimated beam of light. III. A slit S is not needed, if we use a spatially coherent source of light. (a) I, II and III (b) I and II (c) II and III (d) I and III 38 Two monochromatic light waves of amplitudes 3A and 2A interfering at a point have a phase difference of 60°. The intensity at that point will be proportional to [KCET] (a) 5A 2 (b) 13A 2 (c) 7A 2 (d) 19A 2
2010 39 If the 8th bright band due to light of wavelength l 1 coincides with 9th bright band from light of wavelength l 2 in Young’s double slit experiment, then the possible wavelengths of visible light are [Manipal] (a) 400 nm and 450 nm (b) 425 nm and 400 nm (c) 400 nm and 425 nm (d) 450 nm and 400 nm
40 The Young’s double slit experiment is performed with light of wavelength 6000 Å, where in 16 fringes occupy a certain region on the screen. If 24 fringes occupy the same region with another light of wavelength l, then l is (a) 6000 Å (b) 4500 Å [Kerala CEE] (c) 5000 Å (d) 4000 Å (e) 5500 Å 41 If the ratio of maximum and minimum intensities of an interference pattern is 36 : 1, then the ratio of amplitudes of the two interfering waves will be [EAMCET] (a) 3 : 7 (b) 7 : 4 (c) 4 : 7 (d) 7 : 5 42 The wavelength of the light used in Young’s double slit experiment is l . The intensity at a point on the screen is I, l where the path difference is . If I 0 denotes the maximum 6 [KCET] intensity, then the ratio of I and I 0 is (a) 0.866 (b) 0.5 (c) 0.707 (d) 0.75 43 What is the minimum thickness of a thin film required for constructive interference in the reflected light from it? Given, the refractive index of the film = 1.5 and wavelength of the light incident on the film = 600 nm. [KCET]
(a) 100 nm (c) 50 nm
(b) 300 nm (d) 200 nm
44 Between two coherent sources, the phase difference is (a) f ( x ) = constant [JIPMER] (b) f ( t ) = constant (c) f( x) = f ( t ) = constant (d) f ( x ) ¹ f ( t )
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45 If Young’s double slit experiment is performed in water instead of air, then [JIPMER] (a) no fringes would be seen (b) fringe width would decrease (c) fringe width would increase (d) fringe width would remain unchanged 2008 46 Two periodic waves of intensities I 1 and I 2 pass through a region at the same time in the same direction. The sum of the maximum and minimum intensities is [CBSE AIPMT] (a) ( I 1 + I 2 ) (b) ( I 1 + I 2 ) 2 (c) ( I 1 - I 2 ) 2
(d) 2 ( I 1 + I 2 )
47 Assertion In Young’s double slit experiment, the two slits are at distance d apart. Interference pattern is observed on a screen at a distance D from the slits. At a point on the screen when it is directly opposite to one of the slits, a dark fringe is observed. Then, the wavelength of wave is proportional to the square of distance of two slits. Reason For a dark fringe intensity is zero. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) A is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 48 A beam of light of wavelength 600 nm from a distant source falls on a single slit 1 mm wide and the resulting diffraction pattern is observed on a screen 2 m away. The distance between the first dark fringes on either side of the central bright fringe is [AFMC] (a) 1.2 cm (b) 1.2 mm (c) 2.4 cm (d) 2.4 mm 49 If white light is used in the Newton’s rings experiment, the colour observed in the reflected light is complementary to that observed in the transmitted light through the same point. This is due to [AFMC] (a) 90° change of phase in one of the reflected waves (b) 180° change of phase in one of the reflected waves (c) 145° change of phase in one of the reflected waves (d) 45° change of phase in one of the reflected waves 50 White light may be considered to be mixture of wave with wavelength ranging between 3000 Å and 7800 Å. An oil film of thickness 10000 Å is examined normally by the reflected light. If m = 1.4, then the film appears bright for (a) 3733 Å, 4308 Å , 5091 Å , 6222 Å [BHU] (b) 4000 Å , 5091 Å , 5600 Å (c) 4667 Å , 6222 Å , 7000 Å (d) 4000 Å , 4667 Å , 5600 Å , 7000 Å 51 In an interference experiment, the spacing between successive maxima or minima is [MHT CET] ld lD dD ld (a) (b) (c) (d) D d l 4D
52 The necessary condition for an interference by two sources of light is that [Manipal] (a) two light sources must have the same wavelength (b) two point sources should have the same amplitude and same wavelength (c) two sources should have the same wavelength, nearly the same amplitude and have a constant phase difference (d) two point sources should have a randomly varying phase difference 53 Colours in thin films are due to (a) diffraction phenomenon (b) scattering phenomenon (c) interference phenomenon (d) polarisation phenomenon
[J&K CET]
54 In Young’s double slit experiment, the distance between two slits is halved and the distance between the screen and slit is made three times. Then, the width of the fringe [Guj CET] (a) becomes half (b) remains the same (c) becomes 6 times (d) becomes 4 times 55 In Young’s double slit experiment, two coherent sources are placed 0.90 mm apart and the fringes are observed 1m away. If it produces the second dark fringe at a distance of 1 mm from the central fringe, the wavelength of monochromatic light used would be [BCECE] (b) 10 ´ 10-4 cm (a) 60 ´ 10-4 cm (d) 6 ´ 10-5 cm (c) 10 ´ 10-5 cm
2007 56 In Young’s double slit experiment, the distance between two slits is 0.6 mm and these are illuminated with a light of wavelength 4800 Å. The angular width of first dark fringe on the screen distant 120 cm from slits will be [BHU] -4 -4 (a) 8 ´ 10 rad (b) 6 ´ 10 rad (c) 4 ´ 10-4 rad
(d) 16 ´ 10-4 rad
57 What causes change in the colours of the soap or oil films for the given beam of light? [BHU] (a) Angle of incidence (b) Angle of reflection (c) Thickness of film (d) None of these 58 In a double slit experiment, the distance between slits is increased 10 times, whereas their distance from screen is halved, then what is the fringe width? [MHT CET] 1 (a) It remains same (b) Becomes 10 1 1 (d) Becomes (c) Becomes 20 90 59 In a Fresnel’s biprism experiment, the two positions of lens give separation between the slits as 16 cm and 9 cm, respectively. What is the actual distance of separation? (a) 12.5 cm (b) 12 cm [MHT CET] (c) 13 cm (d) 14 cm
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60 In a certain double slit experiment arrangement, interference fringes of width 1.0 mm each are observed when light of wavelength 5000 Å is used. Keeping the set up unaltered, if the source is replaced by another source of wavelength 6000 Å, the fringe width will be [Kerala CEE] (a) 0.5 mm (b) 1.0 mm (c) 1.2 mm (d) 1.5 mm (e) 1.8 mm 61 Separation between slits is halved and between screen and slits is doubled, then find the value of final fringe width if original is w. [RPMT] (a) w (b) 9 w (c) 4 w (d) 2 w 62 If white light is used in Young’s double slit experiment (a) no interference pattern is formed [J&K CET] (b) white fringes are formed (c) central bright fringe is white (d) central bright fringe is coloured 63 What happens to the fringe pattern when the Young’s double slit experiment is performed in water instead of air? [Punjab PMET]
(a) Shrinks (c) Unchanged
(b) Disappear (d) Enlarged
64 If Lis the coherence length and c is the velocity of light, the coherent time is [Punjab PMET] L c 1 (c) (d) (a) cL (b) c L Lc 65 The maximum intensity of fringes in Young’s experiment is I. If one of the slits is closed, then the intensity at that place becomes I 0 . Which of the following relations is true? (a) I = I 0 [Punjab PMET] (b) I = 2I 0 (c) I = 4I 0 (d) There is no relation between I and I 0 66 Light from two coherent sources of the same amplitude A and wavelength l illuminates the screen. The intensity of the central maxima is I 0 . If the sources were incoherent, the intensity at the same point will be [KCET] (a) 4I 0 (b) 2I 0 (d) I 0 / 2 (c) I 0 67 In Young’s double slit experiment with sodium vapour lamp of wavelength 589 nm and the slits 0.589 mm apart, the half angular width of the central maxima is [KCET] (a) sin -1 (0.01) (b) sin -1 (0.0001) (c) sin -1 (0.001) (d) sin -1 (0.1) 68 100 p phase difference = ... path difference. (a) 10 l (b) 25 l (c) 50 l (d) 100 l
[Guj CET]
2006 69 The path difference produced by two waves is 3.75 mm and the wavelength is 5000 Å. The point is [MHT CET] (a) uncertain (b) dark (c) partially bright (d) bright 70 Two light rays having the same wavelength l in vacuum are in phase initially. Then, the first ray travels a path L1 through a medium of refractive index n1 while the second ray travels a path of length L2 through a medium of refractive index n 2 . The two waves are then combined to produce interference. The phase difference between the two waves is [MHT CET] 2p 2p (a) (b) ( L2 - L1 ) ( n1 L1 - n 2 L2 ) l l 2p 2p æ L1 L2 ö (c) (d) ( n 2 L1 - n1 L2 ) ç ÷ l è n1 n 2 ø l 71 In Young’s double slit experiment when sodium light of wavelength 5893 Å is used, then 62 fringes are seen in the field of view. Instead, if violet light of wavelength 4358 Å is used, then the number of fringes that will be seen in the field of view will be [MP PMT] (a) 54 (b) 64 (c) 74 (d) 84 72 Two coherent sources of intensity ratio b interfere, then the value of ( I max - I min ) /( I max + I min ) is [Haryana PMT] (a)
1+ b b
(c)
1+ b 2 b
æ1 + b ö (b) ç ÷ è b ø (d)
2 b 1+ b
73 In Young’s double slit experiment with monochromatic light, the central fringe will be [J&K CET] (a) coloured (b) white (c) bright (d) black 74 In the phenomenon of interference, energy is [J&K CET] (a) destroyed at bright fringes (b) created at dark fringes (c) conserved, but it is redistributed (d) same at all points 75 In a Young’s double slit experiment, one of the slit is covered with a transparent sheet of thickness 3.6 ´ 10-3 cm due to which position of central fringe shifts to a position originally occupied by 30th bright fringe. The refractive index of the sheet, if l = 6000 Å is [AMU] (a) 1.5 (b) 1.2 (c) 1.3 (d) 1.7 76 Two coherent monochromatic light sources are located at two vertices of an equilateral triangle. If the intensity due to each of the sources independently is 1 Wm -2 at the third vertex, the resultant intensity due to both the sources at that point (i.e. at the third vertex) is ( in Wm -2 ) [EAMCET] (c) 2 (d) 4 (a) zero (b) 2
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77 The relationship between phase difference Df and the path difference Dx between two interfering waves is given by [J&K CET] ( l = wavelength) l 2p æ ö æ ö (a) Dx = ç ÷ Df (b) Dx = ç ÷ Df è 2p ø èlø ælö (c) Df = ç ÷ Dx è 2p ø
79 In Young’s double slit experiment, the aperture screen distance is 2 m. The slit width is 1 mm and light of 600 nm is used. If a thin plate of glass (m = 1.5) of thickness 0.06 mm is placed over one of the slits, then there will be a lateral displacement of the fringes by [BCECE] (a) zero (b) 6 cm (c) 10 cm (d) 15 cm
(d) Df = 2( 2p ) Dx
80 In Young’s double slit experiment, the slit width and the distance of slits from the screen both are doubled. The fringe width [BCECE] (a) increases (b) decreases (c) remains unchanged (d) None of these
2005 78 If two waves represented by y1 = 4 sin wt and pù é y 2 = 3sin ê wt + ú interfere at a point, the amplitude of 3û ë resulting wave will be about [KCET] (a) 7 (b) 6 (c) 5 (d) 3.5
Answers 1 11 21 31 41 51 61 71
(a) (b) (a) (a) (d) (b) (c) (d)
2 12 22 32 42 52 62 72
(a) (c) (b) (b) (d) (c) (c) (d)
3 13 23 33 43 53 63 73
(a) (b) (c) (b) (a) (c) (a) (c)
4 14 24 34 44 54 64 74
(a) (c) (d) (b) (a) (c) (b) (c)
5 15 25 35 45 55 65 75
(c) (a) (c) (b) (b) (d) (c) (a)
6 16 26 36 46 56 66 76
(b) (d) (d) (c) (d) (a) (d) (d)
7 17 27 37 47 57 67 77
(d) (a) (d) (d) (a) (c) (c) (a)
8 18 28 38 48 58 68 78
(c) (c) (d) (d) (b) (c) (c) (a)
9 19 29 39 49 59 69 79
(d) (a) (b) (d) (b) (b) (b) (b)
10 20 30 40 50 60 70 80
(c) (c) (d) (d) (a) (c) (b) (c)
Explanations /
1 (a) The angular width in YDSE is given by
= 4 ´ 10-3 m
b D where, b is the separation between two fringes. D is the distance between the slits and screen. If YDSE apparatus is immersed in a liquid of refractive index m, then the wavelength of light and hence the angular width decreases m times. i.e. b q and q¢ = = mD m q=
Here, m (for water) = 4 / 3 and q = 0.2° 0.2 q¢ = = 015 . ° Þ 4/3
2 (a) Given, distance between source and observer, D = 2m Distance of 5th dark fringe from centre
db =? dt In Young’s double slit experiment, Dl fringe width, b = d Differentiating with respect to t, we get db l dD 5 ´ 10-7 ´4 = = × dt d dt 4 ´ 10-4 Speed of first maxima =
-7
Wavelength, l = 600 nm = 6 ´ 10
m
Distance of 5th dark fringe from centre b 9b =b + b+ b + b + = 2 2 where, b = fringe width. 9b According to question, = 4 ´ 10-3 2 9 Dl ´ = 4 ´ 10-3 2 d 9 2 ´ 6 ´ 10-7 ´ = 4 ´ 10-3 2 d Þ d = 135 . ´ 10-3 m = 135 . mm
3 (a) Given, wavelength of light, l = 500 nm = 5 ´ 10-7 m Distance between slit and screen, D = 18 . m Distance between two slits, d = 0.4 mm = 4 ´ 10-4 m dD Velocity of screen = = 4 ms -1 dt
= 5 ´ 10-3 ms -1 = 5 mms -1
4 (a) Distance between position of bright and dark fringe is called fringe width in Young’s double slit experiment, Dl which is given by b = d where, b = fringe width, D = distance between source and screen, d = distance between two slits and l = wavelength of monochromatic light wave. Therefore, in Young’s double slit experiment, fringes are of equal width,
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i.e., width of bright and dark fringes are same. Hence, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
The path difference between the waves reaching the point P is Dp = BP - AP = (d 2 + b2 )1/ 2 - d æ b2 ö = d ç1 + 2 ÷ d ø è
5 (c) In a Young’s double slit experiment, the path difference for nth l minima is given by, Dy = (2n - 1) 2 For 5th minima, n = 5 l 9l Dy = [ 2 (5) - 1] = \ 2 2
Given,
q1 = 0.20° , q2 = 0.21°, d1 = 2 mm Substituting the given values in Eq. (i), we get 0.20° d2 = 0.21° 2 mm 0.20 0.40 Þ d2 = 2 ´ = 0.21 0.21 \ = 1.9 mm
8 (c) The situation is shown in the figure P O
d
Þ Þ
w¢ =
S2
w¢ =4 w w¢ = 4 w
In the above figure, S 1 and S 2 are the two different slits. Given, distance between slits S 1 and S 2, d = 5l. Distance between screen and slits, D = 10 d = 50l, where l is the wavelength of light used in the experiment. According to question, the intensity at maximum in this Young’s double slit experiment is I 0. Þ I max = I 0 Q Path difference d d´ dYn 2 = d = l {Q d = 5l} = = 10 d 20 4 D
(becomes four times)
Screen
As, l blue < lgreen \ xblue < xgreen
11 (b) The condition of interference maxima is nl d nl n Given, d = 2l and sin q = = 2l 2
O 50 l
D¢l 2Dl 4Dl = = d¢ d (d / 2)
where, x = distance of 4th maxima from the central one
\ Refractive index of the medium, 16 m= = 1.7777 » 1.78 9
B
\
2.5 l
S1 5l
Hence, the missing wavelengths are b2 b2 b2 , , , .. . d 3d 5d Dl (d) Fringe width (w) = d Now, distance between the coherent sources is halved, i.e. d ¢ = d / 2 and distance of coherent source and screen is doubled, i.e. D ¢ = 2D.
position of bright fringes on the screen are given by nDl x= d Hence, distance of nth maxima will be D x = nl µ l d l blue = 4360 Å , lgreen = 5480 Å
5th dark fringe in air = 8th bright fringe in the medium Dl nDl (2n - 1) = 2d md lD lD (2 ´ 5 - 1) =8 2d md lD lD 9 =8 2d md 8´2 9 8 ⇒ ⇒ m= = 9 2 m
b
9
12
10 (c) In Young’s double slit experiment
7 (d) According to question,
A
-d
é b2 1 b2 ù » d ê1 + × 2 ú - d = 2 d û 2d ë For a dark band, b2 l Dp = = (2n - 1) 2d 2 1 b2 where, n = 1, 2, 3 or l = × (2n - 1) d
6 (b) In a Young’s double slit experiment, angular width of a fringe is given as l q= d where, l is the wavelength of the light source and d is the distance between the two slits. 1 q d …(i) q µ or 1 = 2 Þ d q2 d1
1/ 2
Thus, there is central maximum (q = 0° ), on either side of it maxima lie at q = 30° and q = 90°, so maximum number of possible interference maxima is 5. (c) Screen
13
A path difference of l corresponds to phase difference 2p, so for path difference l/4. Phase difference, 2p l f= ´ = p / 2 = 90° l 4 As we know, I = I 0 cos2 f / 2 90° I = I 0 cos2 Þ 2 2 æ 1 ö I = I0 ´ ç Þ ÷ è 2ø I0 Þ I = 2 I (b) It is given that, 2 = n Þ I 2 = nI 1 I1 \ Ratio of intensities is given by I max - I min I max + I min =
d sin q = nl, sin q =
The magnitude of sin q lies between 0 and 1. When n = 0, sin q = 0 Þ q = 0° When n = 1, sin q = 1 / 2 Þ q = 30° When n = 2, sin q = 1Þ q = 90°
=
( I 2 + I 1 )2 - ( I 2 - I 1 )2 ( I 1 + I 2 )2 + ( I 2 - I 1 )2 2
2
2
2
æ I2 ö æ I ö + 1÷ - ç 2 - 1÷ ç è I1 ø è I1 ø æ I ö ö æ I2 + 1÷ + ç 2 - 1÷ ç è I1 ø ø è I1
=
( n + 1)2 - ( n - 1)2 2 n = ( n + 1)2 + ( n - 1)2 n + 1
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14 (c) For net intensity, I ¢ = 4 I 0 cos2 æ 2p ö Case I K = 4 I 0 cos2 ç ÷ è 2 ø
f 2
2p æ ö ´ l÷ çQ f = è ø l K = 4 I 0 cos2 (p ) …(i) Þ K = 4I0 2 p / ö æ Case II K ¢ = 4 I 0 cos2 ç ÷ è 2 ø 2p l ö æ ´ ÷ çQ f = è l 4ø K ¢ = 4 I 0 cos2 (p / 4 ) …(ii) Þ K ¢ = 2I 0 Comparing Eqs. (i) and (ii), we get K ¢ = K /2
15 (a) The distance of 5th dark fringe from centre is given by ll 2d As, n = 4 for 5th dark fringe. 9 lD So, x5 = 2 d lD As, =b d So, x5 = 9/ 2 b = 9/ 2 ´ 0.002 = 9 ´ 10-3 cm xn = (2n + 1)
16 (d) We know that, I 2 )2
experiment, amplitudes corresponding to the sources S 1 and S 2 be a1 and a2 and intensities be I 1 and I 2 respectively.
I min = ( I 1 - I 2 )2
…(ii)
So, the ratio of the maximum and minimum intensities is 2 ( 4 I + I )2 I max ( I 1 + I 2 ) = = 2 I min ( I 1 - I 2 ) ( 4 I - I )2 (given)
2
I max æ 3 I ö 9 =ç ÷ = = 9:1 I min è I ø 1
(Screen) (Young’s double slit experiment)
We know that, the intensity for a source (I ) having an amplitude a are related as, I µ a2 From maximum intensity, amax = a1 + a2 i.e. sources are in phase. For minimum intensity, amin = a1 - a2 i.e. sources are out of phase. 2 2 and I min µ amin So, I max µ amax 2
Hence, the maximum and minimum intensities in the resulting pattern are 9I and I.
17 (a) The diagram below shows a thin soap film.
æa ö æ a + a2 ö I Þ max = ç max ÷ = ç 1 ÷ è a1 - a2 ø I min è amin ø
Air Thin soap film
2
According to given question, I max 9 = I min 1 Þ
1 2
P
S1
…(i)
The minimum intensity,
t
18 (c) Let in Young’s double slit
S2
The maximum intensity, I max = ( I 1 +
Consider the case, when the thin soap film is viewed by the light reflected by it (1 and 2). Due to the reflection, from a denser medium (film) ray 1 suffers additional phase change of p, apart from the phase change due to the path difference between 1 and 2. So, the rays 1 and 2 produce the phenomenon of interference when they meet. When white light is to used, the path difference (phase difference) will satisfy the condition of maxima for certain wavelengths and condition of minima for other wavelengths. This gives coloured appearance of the film. Similarly, in the case with soap bubble, the film between the inner and outer surfaces acts as a thin film and phenomenon can be explained as previous case.
æ a / a + 1ö 9=ç 1 2 ÷ è a1 / a2 - 1 ø
æ a / a + 1ö Þ (3)2 = ç 1 2 ÷ è a1 / a2 - 1 ø a /a + 1 3= 1 2 Þ a1 / a2 - 1
Þ
a1 + a2 a2 3= a1 - a2 a2 a1 + a2 3= a1 - a2
Þ 3 (a1 - a2 ) = a1 + a2 Þ 3a1 - 3a2 = a1 + a2 Þ 2a1 = 4 a2 a1 4 Þ = a2 2 a1 : a2 = 2 : 1
Þ
19 (a)
I bright
=
I dark
I max = 3 (given) I min
(a1 + a2 )2 3 = (a1 - a2 )2 1 a + a2 = 3 Þ 1 a1 - a2 Þ
Þ a1 + a2 = 3 (a1 - a2 ) a1 = a2
Þ
3+1 3 -1
20 (c) The distance of 5th dark fringe from centre is given by lD xn = (2n + 1) 2d As, n = 5 for 5th dark fringe So,
x5 =
11 lD 11 ö æ lD = b÷ = b çQ ø è d 2 d 2
Given, b = 0.002 cm So, = 11/2 ´ 0.002 = 0.011 cm = 1.1 ´ 10-2 cm Dl 21 (a) Fringe width, b = d d But, here q = Þ d = Dq D Dl l \ b= = Dq q
22 (b) Given, l1 = 12000 Å , l 2 = 10000 Å , D = 2 m and
d = 2 mm = 2 ´ 10- 3 m
We have,
l 2 n1 10000 5 = = = l 1 n2 12000 6 nl D ö æ çQ xn = ÷ è d ø
2
2
As, x = (given)
n1l 1D 5 ´ 12000 ´ 10- 10 ´ 2 = d 2 ´ 10- 3
= 5 ´ 1.2 ´ 104 ´ 10- 10 ´ 103 m = 6 ´ 10–3 m = 6mm
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
23 (c) Intensity at the centre be bright fringe, I 0 = I + I + 2 I × I cos 0° Þ I 0 = 4 I …(i) b Intensity at a point distance with a 4 2p p phase difference = = is 4 2 p I ¢ = I + I + 2 I × I cos 2 = 2I + 2 I × I ´ 0 …(ii) Þ I ¢ = 2I On dividing Eq. (i) by Eq. (ii), we get I0 4I = =2 \ I ¢ 2I I 0 = 2I + 2I
2
24 (d)
æ a + a2 ö I max 25 25 or ç 1 = ÷ = è a1 - a2 ø I min 9 9
Dl = 0.1l = 0.1 ´ 5890 Å
Þ
= 589 Å (increases) I max ( 2I + I )2 æ 2 + 1ö =ç = ÷ I min ( 2I - I )2 è 2 - 1 ø
31 (a)
28 (d) According to given question, Young’s double slit experiment is given by the diagram alongside.
é ( 2 + 1) ( 2 + 1) ù =ê ú ë ( 2 - 1) ( 2 + 1) û
(amplitude) µ (intensity) 2
I 1 æ a1 ö = ç ÷ = 16 I 2 è a2 ø
25 (c) If a transparent medium of thickness t and refractive index m is introduced in the path of one of the slit, then effective path in air is increased by an amount (m - 1)t due to introduction of plate. Therefore, the zeroth fringe shifts to a new position where the two optical paths are equal. In such cases, fringe width remains unchanged.
26 (d) Fringe width, b = Dl / d …(i) (for air) When entire arrangement is placed in a liquid of refractive index n, then it becomes Dl …(ii) b¢ = nd b b ¢ Dl d = ´ Þ b¢ = n b nd Dl
27 (d) The distance between two consecutive dark fringes or bright fringes are recognised as b (fringe width) and that between central fringe and first dark fringe on either side is b/2.
2
2
æ2 + 1+ 2 2ö 9 + 8 + 12 2 =ç ÷ = 2-1 ø 1 è
d
2
2
(given) Now, rationalising the denominator by multiplying the denominator with numerator and with denominator itself.
y = d/2
Þ 3a1 + 3a2 = 5a1 - 5a2 Þ 5a1 - 3a1 = 3a2 + 5a2 Þ 2a1 = 8a2 Þ a1 = 4 a2 a1 =4 a2
Hence,
Dq 10 = q 100 So, from Eq. (i) Dl Dq 10 = = = 0.1 l q 100 Given,
S2
where, a is amplitude. a1 + a2 5 or = a1 - a2 3
As,
Given, d = 0.9 mm = 0.9 ´ 10-3 m and D = 1m Spacing between second dark fringe and central fringe b 3b =b + = = 1 mm 2 2 2 Þ b = ´ 1 mm 3 lD 2 = mm Þ d 3 2 0.9 ´ 10- 3 \ l = ´ 10- 3 ´ 3 1 = 600 ´ 10-9 = 600 nm
= 34 D
32 (b) The bandwidth is inversely
S1
From the given figure, we see that the distance between the slits is equal to d and the distance between the slit and screen is equal to D. Hence, for the nth dark fringe, we know that Dl d (2n - 1) = 2d 2 Hence, we get d2 d2 for n = 1 l= = (2n - 1)D D
29 (b) By Young’s double slit interference lD d Given, b 1 = 1.2 mm d2 1 = 1 = 1.5 d1 2 b 1/ d1 1 So, b µ Þ 1 = b 2 1/ d2 d b 1.2 d Þ 1 = 2 = 1. 5 Þ = 1.5 b2 b 2 d1 1.2 4 = = 0.8 mm Þ b2 = 1.5 5
experiment, b =
33
proportional to the distance between lD 1 the slits d as b = Þ bµ d d (b) When a Young’s double slit set up for interference is shifted from air to within water, then the fringe width decreases.
34 (b) Given,
d = 1 ´ 10- 3 m , l = 500 ´ 10- 9 m
and D = 1 m Fringe separation, b=
lD 500 ´ 10- 9 ´ 1 = 500 ´ 10- 6 = d 1 ´ 10- 3
= 0.5 ´ 10- 3 m = 0.5 mm
35 (b) The path difference S 1P - S 2P is a whole number of wavelength, for the interference at an arbitrary point P. So, S 1P - S 2P = nl (for maximum intensity) P
S1 d
O (YDSE)
S2
30 (d) Let l be the wavelength of monochromatic light incident on slit S, then the angular distance between two consecutive fringes, i.e. the angular fringe width is …(i) q = l /d where, d is distance between coherent sources.
36 (c) In Young’s double slit experiment, we have lD d lDD Db = d b=
Þ l=
Dbd DD
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2
3 ´ 10-5 ´ 1 ´ 10-3 = 6 ´ 10-7 m l= 5 ´ 10-2 or l = 600 nm
Þ
43 (a) Given, l = 600 nm = 600 ´ 10-9 m and u = 15 . Condition for constructive interference, l 2 mt = (2n + 1) 2 where, n = 0, 1, 2, 3 For minimum thickness, n = 0 l 2 mt = 2 l 600 ´ 10- 9 = 100 nm Þ t= = 4m 4 ´ 1.5
37 (d) In the case of Young’s double slit experiment, a slit S is necessary, if we use an ordinary extended source of light and slit S is not needed, if we use a spatially coherent source of light.
38 (d) Given, A1 = 3 A = A2 = 2 A and
q = 60° We know that, A=
A12 + A22 + 2 A1 A2 cos q
A 2 = A12 + A22 + 2 A1 A2 cos 60°
1 I = 9 A2 + 4 A2 + 2 ´ 3 A ´ 2 A ´ 2 2 I = 19 A
44 (a) Two sources are said to be
39 (d) Position of nth bright fringe from nlD . d 8l 1D 9l 2D l 9 \ = Þ 1= d d l2 8 central maxima is
45 (given)
Hence, the possible wavelengths of visible light is of the ratio of 9 : 8 . Therefore, only option (d) is correct 450 nm 9 because ratio of = 400 nm 8
40 (d) Given, l1 = 6000Å, n1 = 16 fringes and n2 = 24 fringes nDl [Position of n th fringe = d Þ n1l 1 = n2l 2] l 6000 24 n = Þ 1= 2 Þ l 2 n1 l2 16 6000 ´ 16 96000 Þ l2 = = = 4000 Å 24 24
41 (d) Þ Þ
Þ
I max æ a1 + a2 ö =ç ÷ I min è a1 - a2 ø
2
a1 + a2 36 (given) = a1 - a2 1 a1 + a2 =6 a1 - a2 a1 + a2 = 6a1 - 6a2 7a2 = 5a1 a1 7 = Þ a1 : a2 = 7 : 5 a2 5
42 (d) Phase difference, 2p ´ Path difference l 2p l p = ´ = = 60° 6 3 l æ fö Intensity, I = I 0 cos2 ç ÷ è 2ø f=
æ d2 l d2 ö D = D ç1 + = = ÷ 2D 2 2D 2 ø è
æ 3ö I = cos2 (30° ) = ç ÷ = 0.75 I0 è 2 ø
coherent, if they emit light waves of same frequency or wavelength and of a stable phase difference. i.e. f (x ) = constant. Dl or b µ l (b) Fringe width, b = d If the Young’s double slit experiment is performed in water, wavelength l decreases, so fringe width also decreases.
46 (d) Resultant intensity of two periodic
where, d is the phase difference between the waves. For maximum intensity, d = 2np , n = 0, 1, 2,K etc. Therefore, for zero order maxima, cos d = 1
48 (b) Given, l = 600 nm = 600 ´ 10-9 m D = 2 m and d = 1m Fringe width, b=
lD 600 ´ 10-9 ´ 2 = d 1 ´ 10-3
= 12 ´ 10-4 m So, the distance between the first dark fringes on either side of the central bright fringe is x = b = 12 ´ 10- 4 m = 1.2 mm
49 (b) Newton’s ring is a phenomena in which an interference pattern is created by reflection of light between spherical surface and an adjacent touching flat surface. There is a phase reversal of p at two places as reflected and transmitted part and total phase difference is 0.
50 (a) The film appears bright, if the path difference is
I 2 )2
For minimum intensity, d = (2n - 1) p , where, n = 1, 2, K etc. Therefore, for 1st order minima, cos d = - 1 I min = I 1 + I 2 - 2 I 1I 2
l 2 mt cos r = (2n - 1) , 2 where, n = 1, 2, 3, .. . \
Therefore, I max + I min 2
I2 ) + ( I1 - I2 )
4mt cos r (2n - 1)
4 ´ 14 . ´ 10000 ´ 10-10 cos 0° (2n - 1) 56000 = Å (2n - 1)
\ 2
l=
l=
= ( I 1 - I 2 )2 = ( I1 +
l=
The ray reflected at the upper surface of the air film suffers no phase change, while the ray reflected internally at the lower surface suffers a phase change of p.
waves is given by I = I 1 + I 2 + 2 I 1I 2 cos d
I max = I 1 + I 2 + 2 I 1I 2 = ( I 1 +
d2 Þ l µ d2 D Also, intensity of a dark fringe is zero.
or
l = 56000 Å, 18666 Å, 11200 Å, 8000 Å,
6222 Å, 5091 Å, 4308 Å, 3733 Å
= 2(I 1 + I 2 )
47 (a) When a dark fringe is obtained at the point on the screen opposite to one of the slits, then S 1P = D
The wavelengths which are not within specified ranges are to be rejected, hence option (a) is the correct answer
51 (b) In an interference experiment, the
and S 2P = D 2 + d 2 1/ 2
æ æ d2 ö d2 ö = D ç1 + 2 ÷ = D ç1 + ÷ D ø 2D 2 ø è è Path difference = S 2P - S 1P
spacing between successive maxima and minima is called the fringe width Dl and it is given by b = d
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52 (c) Two sources should have the same wavelength, nearly the same amplitude and have a constant phase difference. If the phase difference between two interfering waves does not remain constant, interference pattern will not be sustained.
57 (c) When a thin film of oil spreads over
53 (c) When the light rays fall on thin film
If thickness of film at a point is such that optical path difference d = 0, l , 2l , 3l,... then, the film l 3l 5l appears dark and if d = , , ,... 2 2 2 film will appear bright.
of oil, then rays are reflected from upper and lower layer of the thin films. These reflected rays produce interference pattern due to which the surface of thin film appears as coloured.
54 (c) Given that, the distance between d 2 and the distance between screen and slit D ¢ = 3D We know that, the fringe width is Dl …(i) b= d According to question D¢l 3D × l Þ b¢ = Þ b¢ = d¢ d/2 6Dl …(ii) b¢ = Þ d On dividing Eq. (ii) by Eq. (i), we get 6Dl b¢ b¢ = d Þ = 6 Þ b ¢ = 6b Dl b b d Hence, the width of the fringe becomes 6 times. two slits
monochromatic light, d be the distance between coherent sources and D be the distance between the screen and source, then fringe width is Dl D 'l b= Þ b' = d d' Dö æ ç given, d ' = 10d , D ' = ÷ è 2ø \ Þ
minima l 2x l = 2(2n - 1) = (2n - 1) d D 2d Given, d = 0.6 mm = 0.6 ´ 10-3 m l = 4800 Å = 4.8 ´ 10-7 m, n = 1 \
2x (2 ´ 1 - 1) ´ 4.8 ´ 10-7 = D 0.6 ´ 10-3 = 8 ´ 10-4 rad
D l Dl b ¢= 2 = 10d 20d b b¢ = 20
Dl ö æ ÷ çQ b = è d ø
59 (b) Fresnel used a biprism to obtain the
S1
and l 2 = 6000 Å b1 l1 10 . 5000 or = = \ b2 l2 b 2 6000 6000 b2 = = 1.2 mm Þ 5000
61 (c) In interference pattern, lD =w d According to the given condition, l ´ 2D (given) w¢ = d/2 lD =4´ = 4w d Fringe width =
62 (c) When a white light is used in Young’s double slit experiment, then different component colours of white light produce their own interference pattern. The path difference for all colours is zero at the centre of screen, so bright fringes of different colours overlap at the centre. Consequently, the central fringe is white.
63 (a) In Young’s double slit experiment,
Biprism P O Fringe pattern
d S S
Q
S2
D
In order to measure the distance d between the virtual sources S 1 and S 2 , Glazebrook gave a method, known as magnification method due to Glazebrook. If d1 and d2 are the distance between real images of S 1 and S 2, then d = d1d2 Given,
d1 = 16 cm, d2 = 9 cm
\
d = 16 ´ 9 = 12 cm
Dl or b µ l d
Given, b 1 = 10 . mm, l 1 = 5000 Å
two coherent sources for producing interference fringes in the laboratory. In biprism, the virtual images act as two coherent sources are superimposed and interference fringes are formed in overlapping region PQ on a screen placed at O.
x2 = 1 mm = 1 ´ 10-3 m and D = 1m.
56 (a) Angular fringe width of first
b=
58 (c) Let l be the wavelength of
55 (d) Given, d = 0.9 mm = 0.9 ´ 10-3 m,
= 6 ´ 10-5 cm
slit experiment is given by
Hence, colours of soap film change because of thickness of film.
d¢ =
Distance of n th dark fringe from central fringe (2n - 1)lD xn = 2d (2 ´ 2 - 1)lD 3lD x2 = = \ 2d 2d 3l ´ 1 -3 Þ 1 ´ 10 = 2 ´ 0.9 ´ 10-3
60 (c) The fringe width obtained in a two
the surface of water and observed in broad day light, then brilliant colours are observed. These colours arise due to the interference of sunlight reflected from lower surface and upper surface of the film.
64
let a screen be placed at a distance D, d be the distance between coherent sources. The fringe width is given by b = Dl / d, where l is the wavelength of light used. When the entire setup is dipped in water, l wavelength, l w = a is decreases. m Therefore, fringe width decreases and hence fringe pattern shrinks. Coherence length (b) Coherent time = Velocity of light L = c
65 (c) Suppose slit width’s are equal, so they produce waves of equal intensity say I ¢. Resultant intensity at any point, I R = 4 I ¢ cos2 f, where f is the phase difference between the waves at the point of observation. For maximum intensity, f = 0° …(i) Þ I max = 4 I ¢ = I
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If one of slits is closed, resultant intensity at the same point will be I ¢ only, i.e. …(ii) I ¢ = I0 Comparing Eqs. (i) and (ii), we get
d' =d
I = 4I0
66 (d) The rays of light from two coherent sources superimpose each other on the screen forming alternate maxima (with maximum intensity I 0) and minima (with intensity zero). If two non-coherent sources superimpose, there will be no maxima and minima, I instead the intensity will be 0 2 throughout.
67 (c) Given, l = 589 nm = 589 ´ 10-9 m and d = 0.589 mm = 0.589 ´ 10-3 m In Young’s double slit experiment, half angular width is given by, l sin q = d Þ Þ
sin q =
589 ´ 10-9 = 10-3 0.589 ´ 10-3
q = sin -1 (0.001)
68 (c) Given, phase difference = 100p Path difference =
=
l ´ Phase 2p difference
l ´ 100 p = 50l 2p
69 (b) Given, path difference, Dx = 3.75 mm = 3.75 ´ 10-6 m and wavelength, l = 5000 Å = 5 ´ 10-7 m Dx 3.75 ´ 10-6 37.5 = = = 7.5 l 5 5 ´ 10-7 Þ Dx = 7.5 l Here, Dx is odd multiple of l, so point is dark.
70 (b) The optical path between any two points is proportional to the time of travel. The distance traversed by light in a medium of refractive index m in time t is given by …(i) d = vt where, v is velocity of light in the medium. The distance traversed by light in a vacuum in this time, d ' = ct d [from Eq. (i)] d ' = c× v
71
c = md v
…(ii) cö æ ç Since m = ÷ è vø
This distance is the equivalent distance in vacuum and is called optical path. Here, optical path for first ray = n1L1, optical path for second ray = n2L2 Path difference = n1L1 - n2L2 Now, phase difference = 2p / l ´ path difference 2p = ´ (n1L1 - n2L2 ) l (d) Given, l 1 = 5893 Å, n1 = 62, l 2 = 4358 Å As field of view in case of both the wavelengths is same, hence n1 b 1 = n2 b 2 æ Dl ö æ Dl ö As, n1 ç 1 ÷ = n2 ç 2 ÷ è d ø è d ø Þ
æl ö 5893 n2 = n1 ç 1 ÷ = 62 ´ » 84 è l2 ø 4358
72 (d) We know that, I µ a2 or So,
a µ I or
æI ö a1 = ç 1÷ è I2 ø a2
I max (a1 + a2 )2 = I min (a1 - a2 )2 =
74 (c) As, average of I max and I min is given as I max + I min (a1 + a2 )2 + (a1 - a2 )2 = 2 2 2(a12 + a22 ) = = a12 + a22 2 Þ = I1 + I2 Hence, during phenomenon of interference, energy is conserved, but it is redistributed.
75 (a) The position of 30th bright fringe 30lD d Now, position shift to central fringe is 30lD y0 = d But we know that, D y0 = (m - 1) t d 30lD D = (m - 1) t d d 30l (m - 1) = Þ t Given, l = 6000 Å = 6000 ´ 10-10 m, y30 =
t = 3.6 ´ 10-3 cm
(1 + b )2 (1 - b )2
Applying componendo and dividendo, we get I max + I min (1 + b )2 + (1 - b )2 = I max - I min (1 + b )2 - (1 - b )2 2 + 2b = 4 b or
Hence, at point O the path difference between two wavelets is zero, then at O there is always a bright fringe. This is called the central fringe.
I max - I min 2 b = I max + I min 1 + b
= 3.6 ´ 10-5 m (m - 1) =
m = 1.5
Þ
76 (d) I 1 = I 2 = 1 Wm -2 So, resultant intensity at third vertex I = ( I1 +
I 2 )2
= ( 1 + 1)2 2
= (1 + 1) = 4 Wm
73 (c) In Young’s double slit experiment, for maximum intensity (bright fringe) Dl … (i) x=m d where, m is the path difference, D is the distance between screen and coherent sources, d is the distance between coherent sources and l is the wavelength. Putting m = 0 in Eq. (i) we get the position of the central bright fringe (which is called zero order fringe).
30 ´ 6000 ´ 10-10 = 0.5 3.6 ´ 10-5
(given) -2
77 (a) As, Df = phase difference and D x = path difference. 2p \ Df = [ Dx ] l æ l ö Þ Dx = ç ÷ Df è 2p ø
78 (a) Given, f=
p , a1 = 4 and a2 = 3 3
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Given, m = 1.5, t = 0.06 mm = 6 ´ 10-5m
Amplitude, A=
a12
+
a22
+ 2a1a2 cos f
æpö = 4 2 + 32 + 2 ´ 4 ´ 3 ´ cosç ÷ è 3ø ~7 = 6.7 -
79 (b) When a thin glass plate of thickness t is placed over one of the slits, then lateral displacement is given by (m - 1)tD x= d
and
D = 2 m, d = 1 mm = 1 ´ 10-3 m
Putting the values in the above relation, we get (15 . - 1) ´ 6 ´ 10-5 ´ 2 x= 1 ´ 10-3 = 0.5 ´ 12 ´ 10-2 = 6 cm
80 (c) Distance between two adjacent bright (or dark) fringes is called the fringe width. It is denoted by b, thus, Dl b= d where, D is the distance between the slit source and screen and d is the separation of slits. Since D and d are increased to same extent, so fringe width (b ) will remain unchanged.
Topic 3 Diffraction of Light 2019 1 Angular width of the central maxima in the Fraunhoffer diffraction for l = 6000 Å is q 0 . When the same slit is illuminated by another monochromatic light, the angular width decreases by 30%. The wavelength of this light is [NEET (Odisha)]
(a) 1800 Å
(b) 4200 Å
(c) 6000 Å
(d) 420 Å
2016 2 In a diffraction pattern due to a single slit of width a, the first minimum is observed at an angle 30°, when light of wavelength 5000 Å is incident on the slit. The first secondary maximum is observed at an angle of [NEET] -1 æ 2 ö -1 æ 1 ö -1 æ 3 ö -1 æ 1 ö (a) sin ç ÷ (b) sin ç ÷ (c) sin ç ÷ (d) sin ç ÷ è 3ø è 2ø è 4ø è 4ø 3 A linear aperture whose width is 0.02 cm is placed immediately infront of a lens of focal length 60 cm. The aperture is illuminated normally by a parallel beam of wavelength 5 ´ 10 -5 cm. The distance of the first dark band of the diffraction pattern from the centre of the screen is [NEET] (a) 0.10 cm (b) 0.25 cm (c) 0.20 cm (d) 0.15 cm
2015 4 For a parallel beam of monochromatic light of wavelength l diffraction is produced by a single slit whose width a is of the order of the wavelength of the light. If D is the distance of the screen from the slit, then the width of the central maxima will be [NEET] 2Dl Dl Da 2Da (a) (d) (b) (c) a a l l
5 In a double slit experiment, the two slits are 1 mm apart and the screen is placed 1 m away. A monochromatic light of wavelength 500 nm is used. What will be the width of each slit for obtaining ten maxima of double slit within the central maxima of single slit pattern? [NEET] (a) 0.2 mm (b) 0.1 mm (c) 0.5 mm (d) 0.02 mm 2013 6 In single slit diffraction pattern, [UP CPMT] (a) central fringe has negligible width than others (b) all fringes are of same width (c) central fringes do not exist (d) None of the above 2012 7 A parallel beam of monochromatic light is incident normally on a narrow slit. A diffraction pattern is formed on a screen placed perpendicular to the direction of the incident beam. At the first minimum of the diffraction pattern, the phase difference between the rays coming from the two edges of the slit is [AMU] (a) zero (b) p/ 2 (c) p (d) 2p 8 For a wavelength of light l and scattering object of size a, all wavelengths are scattered nearly equally, if [DUMET] (a) a = l (b) a > > l (c) a < < l (d) a ³ l 9 If two sources have a randomly varying phase difference [DUMET] f ( t ), the resultant intensity will be given by (a) 1/ 2 I 0 (b) I 0 / 2 (c) 2 I 0 (d) I 0 / 2 10 For an aperture of size a illuminated by a parallel beam of light having wavelength l , the Fresnel distance is [DUMET] (a) » a/ l (b) » a 2 / l (c) » a 2 l (d) » a / l2
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2011 11 Assertion The clouds in sky generally appear to be whitish. Reason Diffraction due to clouds is efficient in equal measure at all wavelengths. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are correct.
12 In a single slit diffraction of light of wavelengths by a slit of width e, the size of the central maxima on a screen at a distance b is [MP PMT] 2bl 2bl 2bl (c) (a) 2bl + e (b) + e (d) -e e e e 13 A parallel beam of monochromatic light of wavelength 5000 Å is incident normally on a single narrow slit of width 0.001 mm. The light is focussed by a convex lens on a screen placed on the focal plane. The first minima will be formed for the angle of diffraction equal to [Manipal] (a) 0° (b) 15° (c) 30° (d) 60° 14 A grating which would be most suitable for constructing a spectrometer for the visible and ultraviolet region, should have [Haryana PMT, CG PMT] (a) 100 lines cm -1 (b) 1000 lines cm -1 (c) 10000 lines cm -1 (d) 1000000 lines cm -1 15 In a single slit diffraction experiment, the width of the slit is made double its original width. Then, the central maxima on the diffraction pattern will become [BCECE, J&K CET] (a) narrower and fainter (b) narrower and brighter (c) broader and fainter (d) broader and brighter 16 The slit width, when a light of wavelength 6500 Å is incident on a slit, if first minima for red light is at 30°, is (a) 1 ´ 10-6 m (b) 5.2 ´ 10-6 m [DUMET] -6 (c) 1. 3 ´ 10 m (d) 2.6 ´ 10-6 m
2010 17 Red light of wavelength 625 nm is incident normally on an
optical diffraction grating with 2 ´ 105 lines m -1 . Including central principal maxima, how many maximas may be observed on a screen which is far from the grating? (a) 15 (b) 17 (c) 8 (d) 16 [KCET]
18 A parallel monochromatic beam of light is incident normally on a narrow slit. A diffraction pattern is formed on a screen placed perpendicular to the direction of incident beam. At the first maxima of the diffraction pattern, the phase difference between the rays coming from the edges of the slit is [JCECE] p (a) 0 (b) (c) p (d) 2p 2
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19 The angular width of the central maxima of the diffraction pattern in a single slit (off width a) experiment, with l as the wavelength of light, is [JCECE] 3l l 2l l (b) (c) (d) (a) 2a 2a a a 20 In a single slit diffraction pattern, the distance between the first minima on the left and the first minima on the right is 5 mm.The screen on which the diffraction pattern is displayed is at a distance of 80 cm from the slit. The wavelength is 6000 Å. The slit width (in mm) is about [MGIMS] (a) 0.576 (b) 0.348 (c) 0.192 (d) 0.096 2008 21 The width of the diffraction band varies [AFMC] (a) inversely as the wavelength (b) directly as the width of the slit (c) directly as the distance between the slit and the screen (d) inversely as the size of the source from which the slit is illuminated 22 The source is at some distance from an obstacle. Distance between obstacle and the point of observation is b and wavelength of light is l. Then, the average distance of nth Fresnel zone will be at a distance (from the point of observation) [Punjab PMET] bn l nl nl (b) b (c) b + (d) b - nl (a) 2 2 2 2007 23 A single slit Fraunhofer diffraction pattern is formed with white light. For what wavelength of light, the third secondary maxima in the diffraction pattern coincides with the second secondary maxima in the pattern for red light of wavelength 6500 Å? [KCET] (a) 4400 Å (b) 4100 Å (c) 4642.8 Å (d) 9100 Å 2006 24 In a Fraunhofer diffraction at a single slit of width d with incident light of wavelength 5500 Å, the first minima is observed, at an angle 30°. The first secondary maxima is observed at an angle q equals [Kerala CEE] -1 æ 1 ö -1 æ 1 ö (a) sin ç ÷ (b) sin ç ÷ è 4ø è 2ø 3 3 æ ö æ 3ö (e) sin -1 ç ÷ (d) sin -1 (c) sin -1 ç ÷ è 4ø è 8ø 2
2005 25 A single slit of width d is illuminated by violet light of wavelength 400 nm and the width of the diffraction pattern is measured as y. When half of the slit width is covered and illuminated by yellow light of wavelength 600 nm, the width of the diffraction pattern is [KCET] (a) the pattern vanishes and the width is zero y (c) 3 y (d) None of these (b) 3
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Answers 1 (b) 11 (a) 21 (c)
2 (c) 12 (c) 22 (c)
3 (d) 13 (c) 23 (c)
4 (a) 14 (d) 24 (c)
5 (a) 15 (a) 25 (c)
6 (d) 16 (c)
7 (c) 17 (b)
8 (b) 18 (d)
9 (d) 19 (c)
10 (b) 20 (c)
Explanations 1 (b) The angular width of central maxima is given by 2l …(i) 2q = a where, l = wavelength of light used and a = width of the slit. Angular width, 2 q = q0 (given) 2l So, …(ii) q0 = 1 a [from Eq. (i)] For another light of wavelength l 2 (says), the angular width decreases by 30%, so æ 100 - 30 ö 2q = ç ÷q è 100 ø 0 70 2q = q0 = 0.7q0 100 2l \ Angular width, 0.7q0 = 2 …(iii) a As slit width is constant, so on dividing Eq. (ii) by Eq. (iii), we get q0 l = 1 0.7q0 l 2 Þ
l 2 = l 1 ´ 0.7
sin q1 =
Þ
3 4
\
æ 3ö q1 = sin -1 ç ÷ è4ø
Þ
band of the diffraction pattern from the centre of the screen is given by the position of first minima. i.e. Y = lD / a where, l = wavelength of parallel beams, D = focal length and a = width of linear aperture. Given, l = 5 ´ 10-5 cm, D = 60 cm = 0.6 m and a = 0.02 cm = 0.02 ´ 10-2 m
6
l/d 0 – l/d Single slit
(5 ´ 10-5 ) (0.6) 0.02 ´ 10-2 Y = 0.15 cm
Þ
– 2 l/d Intensity pattern
As, it is clear from above diagram, in single slit diffraction, the central fringe has maximum intensity and has width double than other fringes.
4 (a) For the condition of maxima,
7 (c) The phase difference (f ) between the wavelength from the top edge and bottom edge of the slit is 2p f= (d sin q) l where, d is the width from minima of the diffractions pattern. l At l = l / 2, sin q = 2d 2p æ lö Þ f= çd ´ ÷=p l è 2d ø
y a
θ
= 6000 ´ 0.7 = 4200 Å
2 (c) As, the first minimum is observed at an angle of 30° in a diffraction pattern due to a single slit of width a. i.e. n = 1and q = 30°. Q According to Bragg’s law of diffraction, a sin q = nl (n = 1) Þ asin 30° = (1)l 1ü ì Þ a = 2l …(i) íQ sin 30° = ý 2þ î For first secondary maxima, 3l Þ asin q1 = 2 3l …(ii) sin q1 = Þ 2a Substitute value of a from Eq. (i) to Eq. (ii), we get 3l sin q1 = 4l
a=
2 l/d
Y=
Þ
d 10-3 = 5 5 = 0.2 ´ 10-3 m a = 0.2 mm (d) The following diagram shows a single slit diffraction pattern
Þ
3 (d) For the distance of the first dark
2Dl æ lD ö = 10 ç ÷ è d ø a
D
l sin q = a From the geometry, Y (for small angle) sin q = q = D Y l So = D a lD Þ Y= a Hence, width of central maxima 2lD = 2Y = a
5 (a) Given, d = 1 mm = 1 ´ 10-3m, and
D = 1m l = 500 nm = 5 ´ 10-7 m
As, width of central maxima = width of 10 maxima
8 (b) All the wavelengths are scattered nearly equally, if a > > l.
9 (d) If two sources have a randomly
10
varying phase difference f (t), then the I resultant intensity will be 0 . 2 (b) In this case, the Fresnel distance is equivalent to a2 / l.
11 (a) As, the water droplets in cloud is responsible for diffraction of light and is efficient in equal measure at all wavelength and hence cloud look whitish.
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WAVE OPTICS
12 (c) The direction in which the first
13
minima occurs is q (say). The e sin q = l l or eq = l or q = e (Q q = sin q, when q is small) Width of the central maxima 2bl = 2bq + e = +e e (c) For the first minima, d sin q = l l Þ sin q = d Given, l = 5000 Å = 5000 ´ 10-10 m and d = 0.001 mm = 0.001 ´ 103 m. é 5000 ´ 10 - 10 ù Þ q = sin - 1 ê -3 ú ë 0.001 ´ 10 û = sin -1 (0.5) = 30°
14 (d) Grating with 106 lines/cm is suitable for constructing spectrometer for visible and ultraviolet region because this corresponds to the wavelength equivalent to the wavelengths of visible and ultraviolet region.
N = 2 ´ 105 line/m and q = 90° 1 1 = =8 Þn= -7 lN 6.25 ´ 10 ´ 2 ´ 105 \ Number of maxima = 2n + 1 = 2 ´ 8 + 1 = 17
18 (d) The phase difference (f ) between the wavelets from the top edges and the bottom edges of the slit is 2p f= (d sin q) l where, d is the slit width. The first minima of the diffraction l pattern occurs at sin q = d 2p æ lö So, f= ç d ´ ÷ = 2p dø l è
19 (c) The central maxima lies between the first minima on both sides. The angular width of central maxima 2l = 2q = a +λ/a
15 (a) Width of central maxima, b=
2Dl d
b As, we increase d to 2d, b becomes . 2 So, it becomes narrower and fainter.
16 (c) When rays of monochromatic light of wavelength l are incident on a diffraction grating in which slit separation is d, then for angle of diffraction q, the following relation holds true. d sin q = nl where, n is called the spectrum order. Given, n = 1, l = 6500 Å
and Þ
= 6500 ´ 10-10 m 1 sin 30° = 2 nl 6500 ´ 10-10 d= = sin 30° (1 / 2)
Þ
θ θ
d = 1.3 ´ 10-6 m
17 (b) For principal maxima in grating spectra, sin q = nl N where, n = (1, 2, 3...) is the order of principal maximum and q is the angle of diffraction. Given, l = 625 nm = 6.25 ´ 10-7 m,
O –λ/a
2Dl b Given, D = 80 cm = 80 ´ 10- 2 m,
20 (c) Slit width, d =
l = 6000 Å = 6000 ´ 10- 10 m b = 5 mm = 5 ´ 10- 3 m
and
80 cm
5 mm
80 ´ 10- 2 ´ 6000 ´ 10- 10 ´ 2 5 ´ 10- 3 mm = 0192 .
\d=
21 (c) Width of the diffraction band is given by
lD d where, D = distance between slit and the screen, l = wavelength of light used and d = width of slit. b=
Hence, width of the diffraction band varies directly as the distance between the slit and the screen.
22 (c) The average distance of nth Fresnel
23
zone from observation point will be at nl a distance is b + . 2 (c) We know that, position of nth maximum where, n =1, 2,... corresponds to central maxima. (4 + 1) D For red light, x = ´ 6500 2a [Q for 2nd maxima, n = 2] For unknown wavelength of light, (6 + 1)D x= ´l 2a [Q for 3rd maxima, n = 3] Accordingly, equating the equations \ 5 ´ 6500 = 7 ´ l 5 Þ l = ´ 6500 = 4642.8 Å 7
24 (c) Condition for nth secondary minima is that path difference = a sin qn = nl For n th secondary maxima is path l difference = a sin qn = (2n + 1) 2 For 1st minima, l = 5500 Å, qn = 30° …(i) asin 30° = l For 2nd maxima, path difference l …(ii) = a sin qn = (2 + 1) 2 Dividing Eq. (i) by Eq. (ii) , we get 1 2 = 2 Þ sin q = 3 n 4 sin qn 3 3 æ ö qn = sin -1 ç ÷ Þ è4ø
25 (c) In single slit diffraction experiment, width of central maxima, 2lD y= d where d = slit of width. Given, l1 = 4000 Å d and l 2 = 6000Å, when d = . 2 2 ´ 4000 8000 D Case I y = = d d Case II 24000D 2 ´ 6000 ´ D y¢= = d d 2 From Eqs. (i) and (ii), we get y¢= 3 y
…(i)
…(ii)
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Topic 4 Polarisation of Light 2019 1 Assertion Incoming light reflected by earth is partially polarised. Reason Atmospheric particle polarise the light. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2018 2 Unpolarised light is incident from air on a plane surface of a material of refractive index m. At a particular angle of incidence i, it is found that the reflected and refracted rays are perpendicular to each other. Which of the following options is correct for this situation? [NEET] æ 1ö (a) i = sin -1 ç ÷ èm ø (b) Reflected light is polarised with its electric vector perpendicular to the plane of incidence (c) Reflected light is polarised with its electric vector parallel to the plane of incidence æ 1ö (d) i = tan -1 ç ÷ èm ø
2017 3 Two polaroids P1 and P2 are placed with their axis perpendicular to each other. Unpolarised light I 0 is incident on P1 . A third polaroid P3 is kept in between P1 and P2 such that its axis makes an angle 45° with that of P1 . The intensity [NEET] of transmitted light through P2 is I0 I0 (b) (a) 2 4 I0 I0 (d) (c) 8 16
2014 4 The angle of incidence at which reflected light is totally polarised for refraction from air to glass (refractive indexm) is [UK PMT] (a) sin - 1 m (b) sin - 1 (1/ m ) (c) tan - 1 (1/ m ) (d) tan - 1 (m )
5 A polarised light of intensity I 0 is passed through another polariser whose pass axis makes an angle of 60° with the pass axis of the former. What is the intensity of emergent polarised light from second polariser? [KCET] (b) I = I 0 / 6 (a) I = I 0 (c) I = I 0 / 5 (d) I 0 / 4
2013 6 An unpolarised beam of intensity I 0 is incident on a pair of nicols making an angle of 60° with each other. The intensity of light emerging from the pair is [AFMC] (b) I 0 / 4 (c) I 0 / 2 (d) I 0 / 8 (a) I 0
7 The Brewster angle for the glass-air interface is 54.74°. If a ray of light going from air to glass strikes at an angle of incidence 45°, then the angle of refraction is (given, tan 54.74° = 2) [Manipal] (a) 60° (b) 30° (c) 25° (d) 54.74°
2011 æ 3ö 8 The critical angle of a certain medium is sin -1 ç ÷. The è 5ø polarising angle of the medium is [KCET] -1 æ 4 ö -1 æ 5 ö (a) sin ç ÷ (b) tan ç ÷ è 5ø è 3ø æ 3ö æ 4ö (c) tan -1 ç ÷ (d) tan -1 ç ÷ è 4ø è 3ø 2010
9 Critical angle for certain medium is sin -1 ( 0.6). The polarising angle of that medium is [KCET] (a) tan -1 (1.5) (b) sin -1 (0.8) (c) tan -1 (1.6667) (d) tan -1 (0.6667) 10 When the angle of incidence on a material is 60°, the reflected light is completely polarised. The velocity of the refracted ray inside the material is (in ms -1 ) [JCECE] é 3 ù 8 8 (a) 3 ´ 10 (b) ê ú ´ 10 ë 2û (d) 0.5 ´ 108 (c) 3 ´ 108 11 Which of the following phenomena is not common to sound and light waves? [CG PMT] (a) Interference (b) Diffraction (c) Polarisation (d) Reflection
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2009 12 Specific rotation of sugar solution is 0.01 SI units.
200 kg m -3 of impure sugar solution is taken in a polarimeter tube of length 0.25 m and an optical rotation of 0.4 rad is observed. The percentage of purity of sugar in the sample is [AIIMS] (a) 11% (b) 20% (c) 80% (d) 89%
13 The graph showing the dependence of intensity of transmitted light on the angle between polariser and analyser, is [AIIMS] (a)
I0
(b)
I
I0
I 45° 90° 135°180° θ
(c)
45° 90° 135°180° θ
(d) I
45° 90° 135°180° θ
14 Two nicols are oriented with, then principal planes making an angle of 60°. The percentage of incident unpolarised light which passes through the system is [Manipal] (a) 50% (b) 100% (c) 12.5% (d) 37.5% 15 In case of linearly polarised light, the magnitude of the electric field vector [Manipal] (a) does not change with time (b) varies periodically with time (c) increases and decreases linearly with time (d) is parallel to the direction of propagation 16 Transverse nature of the light was confirmed by the phenomenon of [J&K CET] (a) refraction of light (b) diffraction of light (c) dispersion of light (d) polarisation of light
2008 17 When an unpolarised light of intensity I 0 is incident on a
polarising sheet, the intensity of the light which does not get transmitted is [MHT CET] 1 1 (a) I 0 (b) I 0 (c) zero (d) I 0 2 4
18 Light is incident on a glass surface at polarising angle of 57.5°. Then, the angle between the incident ray and the refracted ray is [Kerala CEE] (a) 57.5° (b) 115° (c) 65° (d) 145° (e) None of these
20 An unpolarised beam of intensity I 0 falls on a polaroid. The intensity of the emergent light is [KCET] I0 (a) (b) I 0 2 I (d) zero (c) 0 4 21 Which of the following is a dichroic crystal? (a) Quartz (b) Tourmaline (c) Mica (d) Selenite
[KCET]
2007 22 Brewster’s angle in terms of refractive index (m ) of the
I 45° 90° 135°180° θ
19 The angle of incidence of light is equal to Brewster’s angle, then [J&K CET] I. reflected ray is perpendicular to refracted ray II. refracted ray is parallel to reflected ray III. reflected light is polarised having its electric vector in plane of incidence IV. refracted light is polarised (a) I and IV are correct (b) I and II are correct (c) I and III are correct (d) II and III are correct
medium (a) tan -1 m (c) sin -1 m
[AFMC]
(b) sin -1 m (d) tan -1 m
23 Sound wave in air cannot be polarised because (a) their speed is small (b) they require medium (c) these are longitudinal (d) their speed is temperature dependent
[J&K CET]
2006 24 Which one of the following statements is true? [CBSE AIPMT]
(a) Both light and sound waves in air are transverse. (b) The sound waves in air are longitudinal while the light waves are transverse. (c) Both light and sound waves in air are longitudinal. (d) Both light and sound waves can travel in vacuum.
25 Which of the following diagrams represent the variation of electric field vector with time for a circularly polarised light? [AIIMS]
(a)
(b)
E
E t
t
(c)
(d)
E t
E
t
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26 In the propagation of light waves, the angle between the direction of vibration and plane of polarisation is [UP CPMT] (a) 0° (b) 90° (c) 45° (d) 80° 27 Two polaroids are oriented with their planes perpendicular to incident light and transmission axis making an angle of 30° with each other. What fraction of incident unpolarised light is transmitted? [KCET] 1 3 (a) (b) 2 4 7 3 (c) (d) 8 8
2005 28 For the study of the helical structure of nucleic acids, the property of electromagnetic radiation, generally used is (a) reflection (b) interference [EAMCET] (c) diffraction (d) polarisation
29 When unpolarised light beam is incident from air onto glass ( n = 1.5) at the polarising angle [KCET] (a) reflected beam is polarised 100% (b) reflected and refracted beams are partially polarised (c) the reason for option (a) is that almost all the light is reflected (d) All of the above
Answers 1 (b) 11 (c) 21 (b)
2 (b) 12 (c) 22 (d)
3 (c) 13 (b) 23 (c)
4 (d) 14 (c) 24 (b)
5 (d) 15 (b) 25 (a)
6 (d) 16 (d) 26 (a)
7 (b) 17 (a) 27 (d)
8 (b) 18 (e) 28 (d)
9 (c) 19 (c) 29 (a)
10 (c) 20 (a)
Explanations z
1 (b) When unpolarised light coming from sun, enters into atmosphere of earth, then it scatters due to presence of atmospheric particles. The scattered light seen in a direction perpendicular to the direction of incidence is found to be plane polarised. When the light from the sun incident on reflecting surface of earth at an angle of polarisation, then reflecting light is polarised. Little amount of light is incident on polarising direction, hence reflected light is partially polarised. Hence, Assertion and Reason both are correct but Reason is not the correct explanation of Assertion.
If reflected and refracted light are perpendicular to each other, then the reflected light is completely plane polarised at a certain angle of incidence. This means, the reflected light has electric vector perpendicular to incidence plane.
3 (c) According to the question, P1 I0
P3 I1
Þ Þ
when unpolarised light is incident at polarising angle, the reflected component alongOB and refracted component along OC can be shown in the given figure as follows
I3
90°
N
45°
A
2 (b) The figure shown below represents the course of path an unpolarised light follows, when it is incident from air on plane surface of material of refractive index m. Incident unpolarised light
Medium (µ)
(Normal) Plane polarised reflected light
Partially polarised refracted light
2
4 (d) Suppose, ip is the Brewster’s angle, P2
I2
I0 æ 1 ö ´ç ÷ 4 è 2ø 1 I I3 = 0 ´ 4 2 I I3 = 0 8
I3 =
Þ
Given, q = 45° From the above diagram, intensity transmitted through P3, I I 2 = 0 cos2 45° 2 2 I æ 1 ö I2 = 0 ´ ç Þ ÷ 2 è 2ø I0 Þ I2 = 4 Similarly, intensity transmitted through P2, I I 3 = 0 cos2 45° 4
Incident wave
air X
Glass
Normal to interface B Plane polarised light
ip ip Reflected wave w 1 Y O Refracted r wave w2 w1 is perpendicular C to w 2 N′
Now,
ÐBOY + ÐYOC = 90° (90° - ip ) + (90° - r) = 90°
Here, r is the angle of refraction. i.e.
90° - ip = r
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According to Snell’s law, sin i m= sin r When, i = ip , r = 90° - ip sin ip sin ip Then, m = = sin (90° - ip ) cos ip
\
ip = tan
Þ or
(m )
where, ip is polarised angle.
5 (d) By law of Malus, I = I 0 cos2 q where, I = intensity of emergent polarised light and I 0 = intensity passed through polariser.
C = sin - 1 (0.6) sin C = 0.6 1 1 m= = sin C 0.6 Polarising angle, ip = tan - 1 (m ) æ 1 ö = tan - 1 ç ÷ è 0.6 ø
Given, q = 60° , I = ? I = I 0 ´ cos2 60°
6 (d) Since the incident light beam is unpolarised, the intensity of light, on being transmitted through first nicol polaroid, will become I ...(i) I = 0 2 Then, the intensity of light on passing through the second nicol is given by, 1ö æ I ¢= I cos2 60 çQ cos 60° = ÷ è 2ø 2
I0 æ 1ö I ç ÷ = 0 2 è 2ø 8
7 (b) Refractive index, m = tan q = 2 and i = 45° Now according to Snell’s law,
Þ
sin i ù é êëQm = sin r úû
8 (b) Polarising angle, m = tan i and
1 sinC 1 tan i = sin C m=
where, C = critical angle.
I = I 0 cos2 q
…(i)
where, I 0 = intensity of the light from polariser. From Eq. (i), we note that if the transmission axes of polariser and analyser are parallel (i.e. q = 0°or 180°), then I = I 0. It means that intensity of transmitted light is maximum. When the transmission axis of polariser and analyser are perpendicular (i.e. q = 90°), then I = I 0 cos2 90° = 0. It means the intensity of transmitted light is minimum. On plotting a graph between I and q as given by relation (i), we get the curve as shown in figure
10 (c) From Brewster’s law, m = tan ip Þ
sin 45° 2= sin r 1 sin r = 2 2 sin r = 0.5 r = 30°
and
= tan - 1 (1.6667)
2
I æ 1ö = I0 ´ ç ÷ = 0 è 2ø 4
=
æ æ 3ö ö cot i = sin ç sin - 1 ç ÷ ÷ è 5ø ø è 3 5 or tan i = cot i = 5 3 5 æ ö i = tan - 1 ç ÷ è 3ø
9 (c) Critical angle,
= tan ip -1
\
Þ
c = tan 60° = 3 v c 3 ´ 108 v= = 3 3 = 3 ´ 108 ms-1
11 (c) Polarisation is not shown by sound waves because sound waves are longitudinal waves.
12 (c) Given, q = 0.4 rad, l = 0.25 m and a = 0.01. Specific rotation of sugar solution, Angle of rotation a= Length of tube ´ Concentration q = l ´C 0.4 q C = = \ la 0.25 ´ 0.01 = 160 kg m -3 Thus, purity of sugar solution 160 = ´ 100 = 80% 200
13 (b) According to law of Malus, when a beam of completely plane polarised light is incident on an analyser, the resultant intensity of light (I ) transmitted from the analyser varies directly as the square of the cosine of the angle (q) between planes of transmission of analyser and polariser. I µ cos2 q
I 0
90º 180º 270º 360º θ
14 (c) Intensity of polarised light from 100 = 50 2 2 I = I 0 cos q = 50 cos2 60° 50 = = 12.5% 4
first polariser =
15 (b) The magnitude of electric field vector varies periodically with time, because it is a form of electromagnetic wave.
16 (d) Transverse nature of light was confirmed by the polarisation of light.
17 (a) According to law of Malus, I = I 0 cos2 q
I0 2 1 [Q average value of cos q = ] 2 \ Intensity of untransmitted light I I = I0 - 0 = 0 2 2 Intensity of polarised light =
18 (e) When light ray incident at polarising angle, then angle of incidence (i ) and angle of reflection (r) are equal. Also, angle between reflected and refracted ray is 90°.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Thus, angle between incident ray and refracted ray
ed
ra
y
= 57.5° + 57.5° + 90° = 205°
57.5º
57.5º 90º
23 (c) Sound waves are longitudinal and cannot be polarised.
fra Re
nature. Light waves are transverse in nature. Sound waves need medium to travel. So, they cannot move in space.
ed ct
25 (a) When two plane polarised waves
ra y
19 (c) By Brewster’s law, reflected ray is perpendicular to refracted ray. The reflected ray so obtained is plane polarised having its electric vector in the plane of incidence.
20 (a) If an unpolarised light is converted into plane polarised light by passing through a polaroid its intensity becomes half.
21 (b) Some crystals such as tourmaline and sheets of iodosulphate of quinine have the property of strongly absorbing the light with vibrations perpendicular to a specific direction (called transmission axis) transmitting the light with vibration parallel to it. This selective absorption of light is called dichroism.
22 (d) Refractive index of a medium, m = tan ip
is perpendicular to the direction of propagation and also perpendicular to the plane of polarisation.
24 (b) Sound waves are longitudinal in
Re f le ct
Incident ray
where, ip = Brewster’s angle. Þ ip = tan -1 m
are superimposed, then under certain conditions, the resultant light vector rotates with a constant magnitude in a plane perpendicular to the direction of propagation. The tip of the vector traces a circle and the light is said to be circularly polarised. To form circularly polarised light, Ex = E0 sin wt Þ E y = E0 cos wt pö æ = E0 sin ç wt + ÷ è 2ø where, E0 is amplitude. Resultant amplitude, E = Ex + E y | E |2 = E0 + E0 + 2E0 × E0 cos | E |2 = E0 2 = constant
Therefore, angle between plane of polarisation and direction of propagation is 0°.
27 (d) Suppose, intensity of unpolarised light = I 0 \ Intensity of polarised light =
I0 2
Intensity of emergent light, I I = 0 cos2 30° 2 =
I0 æ 3 ö ×ç ÷ 2 è 2 ø
2
3I 0 8 I 3 = I0 8 I =
\ Fraction of incident unpolarised light of transmitted I 3 = = I0 8
28 (d) For the study of the helical p 2
26 (a) Plane containing the direction of vibration and wave motion is called plane of polarisation. Plane of vibration
structure of nucleic acids, polarisation property of electromagnetic radiation is generally used.
29 (a) If unpolarised light is incident at polarising angle, then reflected light is completely, i.e. 100% polarised.
25 Dual Nature of Matter and Radiation Quick Review • This suitable or minimum frequency of radiation
Electron Emission • It is the phenomenon of emission of electrons from
the surface of the metal.
• The minimum energy required for the electron
emission from the metal’s surface can be supplied to the free electrons by the following processes given in tabular form below Physical Processes
Definitions
(i) Thermionic emission
Emission of electrons (thermions) due to heating the metals.
(ii) Field emission
Emission of electrons from a metal surface by applying strong electric field (» 108 V/m ).
(iii) Secondary emission Emission of electrons from a metal surface by bombardment of high speed electrons or other particles. (iv) Photoelectric emission
Emission of electrons from metal surface when light radiations of suitable frequency fall on it.
Photoelectric Effect • It is the phenomenon of emission of photoelectrons
from the surface of metal when radiation of suitable frequency fall on it.
which can emit photoelectrons from the material is called threshold frequency (n 0 ).
• Also, the minimum energy required for this
emission of electron is known as work function. It is mathematically expressed as f 0 = hn 0 , where h is Planck’s constant. Work function depends on the properties of the metal and nature of its surface. It decreases with the increase in temperature. • The maximum wavelength of light which can eject photoelectrons from a metal surface is called threshold wavelength (l max ) of that metal. • For a particular frequency of incident radiation,
the minimum negative (retarding) potentialV0 for which photoelectric current becomes zero is known as cut-off potential or stopping potential. • Relation between work function, threshold frequency and threshold wavelength is hc f = hn 0 = l max
Laws of Photoelectric Effect (i) For a given material and a given frequency of incident radiation, the photoelectric current or number of photoelectrons ejected per second is directly proportional to the intensity of the incident light.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
(ii) For a given material and frequency of incident radiation, saturation current is found to be proportional to the intensity of incident radiation, whereas the stopping potential is independent of its intensity. (iii) For a given material, there exists a certain minimum frequency of the incident radiation below which no emission of photoelectrons takes place. This frequency is called threshold frequency. Above the threshold frequency, the maximum kinetic energy of the emitted photoelectrons or equivalent stopping potential is independent of the intensity of the incident light but depends upon only the frequency (or wavelength) of the incident light. (iv) The photoelectric emission is an instantaneous process. The time lag between the incidence of radiations and emission of photoelectrons is very small, less than even 10-9 s.
V
V0
h n0 e
O
h q Slope = tan q= e n n0
of packet of energy.
behaves as it made up of particles (or packets of energy) known as photons. Following are the different characteristics properties of the photons (i) It travels with the speed of light (c), i.e. 3 ´ 108 m/s. (ii) It cannot exist at rest, i.e. its mass is zero. (iii) Irrespective of the intensity of radiation, all the photons of particular frequency (n), wavelength (l) hc ö æ have same energy E ç = hn = ÷ and momentum è lø æ hn h ö pç = = ÷. è c lø
Graphs Related to Photoelectric Effect Given below are few graphs related to this effect Nature of Graph i
(iv) It is not deflected by electric and magnetic fields, thus it is electrically neutral.
O
(v) Intensity associated with a photon, nhn , where A is the area of normal incident light I= A and n is the number of photons.
I i
V0
n1 –V03 –V02 –V01 0
• Thus, in interaction of radiation with matter, radiation
where, l is the wavelength of incident photon.
(ii) Photoelectric current (i) versus retarding potential (V) for different intensities but constant frequency.
Saturation current
n3 n2
• Photoelectric effect had given evidence that light consists
1 2 mv max = K max = h( n - n 0 ) = hn - f 0 2 where, n is the frequency and K max is the maximum kinetic energy of the incident photon, respectively. • In terms of threshold wavelength ( l 0 ) above equation can be written as æ1 1 ö eV0 = hc ç ÷ èl l0 ø
Photoelectric current (i) versus intensity (I)
(iv) Stopping potential (V0 ) versus frequency (n ) of incident radiation.
n 3 > n 2 > n1
(Particle Nature of Light : Photon)
• Einstein’s photoelectric equation is given as
(i)
(iii) Photoelectric current (i) versus retarding potential (V) for different frequencies but constant intensity.
Nature of Graph
Planck’s Quantum Theory
Einstein’s Photoelectric Equation
Name of the graph
Name of the graph
i 1>i 2 > i 3 I1 I2 I3 Saturation current
O Stopping potential
V
(vi) Pressure exerted by N photons on a perfectly 2I reflecting surface is . However, pressure exerted by c I these photons on a perfectly absorbing surface is . c Note Photocell is a device which converts light energy into electrical energy. It is used in burglar alarms, fire alarms, etc.
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DUAL NATURE OF MATTER AND RADIATION
Dual Nature of Radiation
Heisenberg’s Uncertainty Principle • According to this principle, it is impossible to measure
With the experimental verification, it was proved that light has dual nature, in some phenomena, it behaves like wave and in some phenomena, it behaves like particle depending upon the dimensions of object with which the particle interacts.
position and momentum of the microscopic particle simultaneously. h h • According to this principle, Dx × Dp > , where h = 2 2p i.e. if Dx = 0, then Dp = ¥ and if Dp = 0, then Dx = ¥. This principle is also applicable to energy and time, • angular momentum and angular displacement by the h h relation DE × Dt ³ = h and DL × Dq ³ . 2p 2p • Probability of finding the electron inside the nucleus is Dx = 2r (r = radius of nucleus) and uncertainty in momentum, h Dp = . 4p
In 1924, French physicist Lewis de-Broglie suggested like radiation, matter too should have dual nature, i.e. the particles like electrons, protons, neutrons, etc., can have particle as well as wave nature.
Matter Waves : de-Broglie Waves • These are the waves associated with moving particle. Its
wavelength is expressed as h h l= = mv p
[Q p = mv]
• For charged particles accelerated through a potential,
h
l=
Davisson and Germer Experiment • This experiment predicted the wave nature of material
2meV Following table represents the de-Broglie wavelength associated with various particles Name of the Particle
de-Broglie Wavelength
Charged Particle (i)
12.27 Å V 0.286 Å l= V 0.202 l= Å V 0101 . Å l= V
For electrons
l=
(ii) For protons (iii) For deuterons (iv) For a-particles
(i)
Uncharged Particle For photons
(ii) For neutrons (iii) For thermal neutrons
h Å mc 0.286 l= Å E (in eV)
particle as predicted by de-Broglie by studying the scattering of electrons from a solid. • de-Broglie wavelength of moving electron at V = 54V is 1. 67Å which is in close agreement with 1. 67Å from Bragg’s equation of diffraction. • Davisson-Germer electron diffraction arrangement alongwith intensity versus voltage graph is shown below
C
θ
Incident beam Electric gun +
φ
θ
–
Bragg’s plane
Scattered beam
l=
2517 . l= Å 7
Nickel single crystal
A
Detector
• Intensity of scattered beam of electrons was found to be
maximum when angle of scattering is 50° and accelerating potential is 54 V.
Topical Practice Questions All the exam questions of this chapter have been divided into 3 topics as listed below Topic 1
—
CATHODE RAYS AND POSITIVE RAYS
732–734
Topic 2
—
PHOTOELECTRIC EFFECT
734–747
Topic 3
—
DUAL NATURE OF MATTER : DE-BROGLIE WAVES
747–755
Topic 1 Cathode Rays and Positive Rays 2010 1 A beam of cathode rays is subjected to crossed electric field (E) and magnetic field (B). The fields are adjusted such that the beam is not deflected. The specific charge of the cathode rays is given by [CBSE AIPMT] 2VB 2 2VE 2 B2 E2 (c) (d) (a) (b) E2 B2 2VE 2 2VB 2
2 Assertion The specific charge for positive rays is a characteristic constant. Reason The specific charge depends on charge and mass of positive ions present in positive rays. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion and Reason are incorrect. 3 Canal rays consist of (a) electrons (b) neutrons (c) positive ions (d) electromagnetic waves
[UP CPMT]
2009 4 Gases begin to conduct electricity at low pressure because [UP CPMT] (a) at low pressure, gases turn into plasma (b) colliding electrons can acquire higher kinetic energy due to increased mean free path leading to ionisation of atoms (c) atom breaks up into electrons and protons (d) the electrons in atoms can move freely at low pressure
5 Positive rays are very identical to [MP PMT] (a) a-rays (b) b-rays (c) g-rays (d) None of these 6 In Millikan’s oil drop experiment, a charged oil drop of mass 3.2 ´ 10-14 kg is held stationary between two parallel plates 6 mm apart, by applying a potential difference of 1200 V between them. How many electrons does the oil drop carry? ( Take, g = 10 ms -2 ) [EAMCET] (a) 7 (b) 8 (c) 9 (d) 10
7 In Millikan’s oil drop experiment, an oil drop is observed to move vertically upwards. The upward motion of the drop is due to [BCECE] (a) gravity (b) viscosity (c) buoyancy (d) electric field 8 JJ Thomson’s cathode ray tube experiment demonstrated that [JIPMER] (a) cathode rays are streams of negatively charged ions (b) all the mass of an atom is essentially in the nucleus (c) the e / m of electrons is much greater than the e / m of protons (d) the e / m ratio of the cathode ray particles changes when a different gas is placed in the discharged tube
2008 9 In the phenomenon of electric discharge through gases at low pressure, the coloured glow in the tube appears as a result of [CBSE AIPMT] (a) excitation of electrons in the atoms (b) collision between the atoms of the gas (c) collisions between the charged particles emitted from the cathode and the atoms of the gas (d) collision between different electrons of the atoms of the gas
10 The specific charge of a proton is 9. 6 ´ 107 C kg -1 . The specific charge of an alpha particle will be [AFMC] (a) 9. 6 ´ 107 C kg - 1 (b) 19. 2 ´ 107 C kg - 1 (c) 4 . 8 ´ 107 C kg - 1 (d) 2.4 ´ 107 C kg - 1 11 The material used for making thermionic cathode in discharge-tube experiment must have [MHT CET] (a) low work function and low melting point (b) low work function and high melting point (c) high work function and high melting point (d) high work function and low melting point 12 In a discharge tube, ionisation of enclosed gas is produced due to collisions between [Haryana PMT] (a) positive ions and neutral atoms/molecules (b) negative electrons and neutral atoms/molecules (c) photons and neutral atoms/molecules (d) neutral gas atoms/molecules 13 The resistance of a discharge tube is (a) zero (b) ohmic (c) non-ohmic (d) infinity
[J&K CET]
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DUAL NATURE OF MATTER AND RADIATION
14 What is e/ m ratio of electron? (a) 2.76 ´ 1010 (b) 2.76 ´ 1011 (c) 1.76 ´ 1010 (d) 1.76 ´ 1011
[DUMET]
2007 15 Three particles having charges in the ratio of 2 : 3 : 5, produce the effect at the same point on the photographic film in Thomson experiment. Their masses are in the ratio of (a) 2 : 3 : 5 (b) 5 : 3 : 2 [Manipal] (c) 15 : 10 : 6 (d) 3 : 5 : 2
16 In a Thomson set up, E = 30 Vcm –1 and B = 6 G. Then, speed of the electron that goes undeflected in the common region of the two fields will be [CET (J&K) 2002] (a) 1´ 106 m/s (b) 5 ´ 106 m/s (c) 15 (d) 25 ´ 106 m/s . ´ 106 m/s 17 Cathode rays of velocity106 ms -1 describe an approximate circular path of radius 1 m in an electric field 300 Vcm -1 . If the velocity of the cathode rays are doubled, the value of electric field, so that the rays describe the same circular path, will be [BCECE] (a) 2400 V cm -1 (b) 600 V cm -1 (c) 1200 V cm -1 (d) 12000 V cm -1
Answers 1 (d) 11 (b)
2 (a) 12 (b)
3 (c) 13 (c)
4 (d) 14 (d)
5 (a) 15 (a)
6 (d) 16 (b)
7 (d) 17 (c)
8 (c)
9 (c)
10 (c)
Explanations 1 (d) As the electron beam is not
3 (c) Canal rays/Anode rays/Positive ray
deflected, then Fm = Fe Bev = Ee …(i) v =E/ B Since, as the electron moves from cathode to anode, its potential energy at the cathode appears as its kinetic energy at the anode. If V is the potential difference between the anode and cathode, then potential energy of the electron at cathode = eV . Also, kinetic energy of the electron at 1 anode = mv 2. 2
or or
According to law of conservation of energy, 2eV 1 …(ii) mv 2 = eV or v = m 2 From Eqs. (i) and (ii), we have 2eV E = m B
or
e E2 = m 2 VB 2
2 (a) A positive ray consists of positive ions, whose specific charge depends on charge and mass of ion and is given by e Specific charge = m For a specific positive ray, the charge and mass are constant and thus specific charge is a constant characteristic of positive rays.
4
are beam of positive ions that is created by a certain type of gas-discharge tubes. (d) When a subatomic particle like an electron moves through the gas, it undergoes lots of collisions with the gas molecules in it and thereby losing energy and sometimes even failing to reach the other end of the tube. If the gas is at low pressure, molecules are quite apart and when an electron travels, the number of collisions are reduced and more number of electrons are able to reach the other end and that is why we say gases at low pressure conduct electricity better.
5 (a) Charges of positive rays and a-ray, i.e. helium atom are same. Moreover the mass of helium atom = 2 ´ mass of proton + 2 ´ mass of neutron. Therefore, it can be concluded that positive rays are very identical to a-rays.
6 (d) According to figure, it is
E
clear that electrical force is balanced by weight of body, i.e. V qE = mg or ne = mg l 1200 \ n ´ 1.6 ´ 10-19 ´ 6 ´ 10-3 = 3.2 ´ 10-14 ´ 10 Þ
n=
7 (d) In Millikan’s oil drop experiment, the electric field is applied between the plates, where the negatively charged oil drop carrying a charge (q) will experience electrostatic force of attraction. If the magnitude of electrostatic force is greater than that of gravitational force, the oil drop will start moving in upward direction.
8 (c) JJ Thomson’s cathode ray tube experiment demonstrated the relation for e/ m of charged particles. The relation is e E2 = m 2 B 2V Thus, knowing E , B and V , the value e of for electrons and for protons can m be calculated. It was then found that e the of electrons is much greater than m e the of protons. m
9 (c) In discharge tube, collisions between the charged particles emitted from the cathode and the atoms of the gas results to the coloured glow in the tube. This coloured glow appears as the result of excitations of electrons in the atoms.
mg
3.2 ´ 10-13 ´ 6 ´ 10-3 = 10 1.6 ´ 10-19 ´ 1200
10 (c) Specific charge of proton æ eö = ç ÷ = 9.6 ´ 107 C kg -1 è møp
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Specific charge of a-particle 2e 1 æ e ö æ qö =ç ÷ = = ç ÷ è m ø a 4m 2 è m ø p =
1 ´ 9.6 ´ 107 = 4.8 ´ 107 C kg -1 2
11 (b) A cathode should have following
13
properties: (i) Low Work Function The substance selected as cathode should have low work function, so that electron emission takes place by applying small amount of heat energy, i.e. at low temperature. (ii) High Melting Point As electron emission takes place at very high temperatures (> 1500° C), therefore the substance used as a cathode should have high melting point.
14
or » 176 . ´ 1011 C kg -1
15 (a) As we know, particles having same
12 (b) In a discharge tube, the electron in the gas tube after being accelerated through a high potential difference, strike the atom with huge kinetic energy. This collision liberates electrons from the atom. These free electrons can further liberate electrons from gas molecules through collisions. This results in the formation of positive ions.
These positive ions are then attracted towards the cathode and negatively electrons move towards anode. Thus, ionisation of gas results due to collision between neutral atom or molecules and negative electrons. (c) In discharge tube, the current is due to flow of positions ions and electrons. Moreover, secondary emission of electrons is also possible. So, V -I curve is non-linear, hence its resistance is non-ohmic. e for electron (d) The accurate value of m 11 is found to be 1.7589 ´ 10 C kg-1
16
e ratio are deflected to the same extent m in the Thomson experiment. e So, = constant Þ e µ m m So, their masses are in the ratio of 2 : 3 : 5. E (b) v = B Given, E = 30 V/cm = 30 ´ 102 V/m
B = 6 G = 6 ´ 10– 4 Wb/m 2 \
v=
30 ´ 102 = 5 ´ 106 m/s. 6 ´ 10–4
17. (c) Cathode rays are composed of electrons, when they move in electric field, a force, …(i) F = eE acts on them, this provides the necessary centripetal force to the particles. …(ii) \ F = mv 2 / r From Eqs. (i) and (ii), we get mv 2 eE = r mv 2 m (106)2 …(iii) Þ r= = eE e(300) When velocity is doubled same circular path is followed, hence radius is same m(2 ´ 106 )2 …(iv) r= eE Equating Eqs. (iii) and (iv), we get m ´ (106)2 m ´ (2 ´ 106 )2 = 300 e eE Þ
E = 300 ´ 4 = 1200 V cm -1
Topic 2 Photoelectric Effect 2019 1 The work function of a photosensitive material is 4.0 eV. This longest wavelength of light that can cause photon emission from the substance is (approximately) (a) 3100 nm (b) 966 nm [NEET (Odisha)] (c) 31 nm (d) 310 nm
2 If frequency of a photon is 6 ´ 1014 Hz, then find its wavelength. [Take, speed of light, c = 3 ´ 108 m/s] (a) 500 Å
(b) 500 nm
(c) 200 Å
[JIPMER]
(d) 200 nm
2018 3 When the light of frequency 2n 0 (where, n 0 is threshold frequency), is incident on a metal plate, the maximum velocity of electrons emitted is v1 . When the frequency of the incident radiation is increased to 5n 0 , the maximum velocity of electrons emitted from the same plate is v 2 . The ratio of v1 : v 2 is [NEET] (a) 4 : 1 (b) 1 : 4 (c) 1 : 2 (d) 2 : 1
2017 4 The photoelectric threshold wavelength of silver is
3250 ´ 10-10 m . The velocity of the electron ejected from a silver surface by ultraviolet light of wavelength 2536 ´ 10-10 m is (Take, h = 4.14 ´ 10-15 eV-s and c = 3 ´ 108 ms -1 ) [NEET] (a) » 6 ´ 105 ms -1 (b) » 0.6 ´ 106 ms -1 (d) » 0.3 ´ 106 ms -1 (c) » 61 ´ 103 ms -1
5 Assertion Photoelectric effect can take place only with an electron bound in the atom. [AIIMS] Reason Electron is a fermion, whereas proton is a boson. (a) Both Assertion and Reason are true and Reason is the correct explanation of Assertion (b) Both Assertion and Reason are true but Reason is not the correct explanation of Assertion (c) Assertion is true but Reason is false. (d) Both Assertion and Reason are false.
735
DUAL NATURE OF MATTER AND RADIATION
2016 6 When a metallic surface is illuminated with radiation of wavelength l, the stopping potential is V. If the same surface is illuminated with radiation of wavelength 2l, the V stopping potential is . The threshold wavelength for the 4 metallic surface is [NEET] 5 (a) 5l (b) l (c) 3l (d) 4l 2
2015 7 A
certain metallic surface is illuminated with monochromatic light of wavelength l. The stopping potential for photoelectric current for this light is 3V0 . If the same surface is illuminated with light of wavelength 2l, the stopping potential isV0 . The threshold wavelength for this surface for photoelectric effect is [CBSE AIPMT] (a) 6l (b) 4l l l (c) (d) 4 6
2014 8 When the energy of the incident radiation is increased by 20%, the kinetic energy of the photoelectrons emitted from a metal surface increased from 0.5 eV to 0.8 eV. The work function of the metal is [UP CPMT] (a) 0.65 eV (b) 1 eV (c) 1.3 eV (d) 1.5 eV
9 Light of wavelengths l A and l B fall on two identical metal plates A and B, respectively. The maximum kinetic energy of photoelectrons is K A and K B respectively, then which one of the following relations is true? ( l A = 2l B ) K (b) 2K A = K B (a) K A < B 2 [MHT CET] (c) K A = 2K B (d) K A > 2K B 10 If the wavelength of incident light falling on a photosensitive material decreases, then [Kerala CEE] (a) photoelectric current increases (b) stopping potential decreases (c) stopping potential remains constant (d) stopping potential increases (e) photoelectric current remains constant 11 Find the correct statement(s) about photoelectric effect. [WB JEE]
(a) There is no significant time delay between the absorption of a suitable radiation and the emission of electrons (b) Einstein analysis gives a threshold frequency above which no electron can be emitted (c) The maximum kinetic energy of the emitted photoelectrons is proportional to the frequency of incident radiation (d) The maximum kinetic energy of electrons does not depend on the intensity of radiation
12 When monochromatic light falls on a photosensitive material, the number of photoelectron emitted per second is n and their maximum kinetic energy is K max . If the intensity of incident light is doubled, then [EAMCET] (a) n is doubled but K max remains same (b) K max is double but n remains same (c) Both n and K max are doubled (d) Both n and K max are halved 13 The maximum kinetic energy of the photoelectrons depends only on [KCET] (a) charge (b) frequency (c) incident angle (d) pressure 14 For photoelectric emission from certain metal, the cut-off frequency is n. If radiation of frequency 2n impinges on the metal plate, the maximum possible velocity of the emitted electron will be (m is the electron mass) [NEET] hn hn hn 2hn (b) (c) (d) 2 (a) m ( 2m ) m m 15 A light of wavelength 5000 Å falls on a sensitive plate with photoelectric work function 1.90 eV. Kinetic energy of the emitted photoelectrons will be (Take, h = 6.62 ´10- 34 J-s) [UP CPMT] (a) 0.1 eV (b) 2 eV (c) 0.58 eV (d) 1.581 eV
2013 16 The number of photons of wavelength 660 nm emitted per second by an electric bulb of 60 W is (Take, h = 6. 6 ´ 10-34 J-s) (a) 3 ´ 1020
[Guj CET]
(b) 1.5 ´ 1020 (c) 2 ´ 10-20 (d) 2 ´ 1020
2012 17 Light from a hydrogen discharge tube is made incident on the cathode of a photoelectric cell. The work function of the cathode surface is 3.1 eV. In order to reduce the photoelectric current to zero value, the minimum potential applied to anode with respect to cathode should be [DCE] (a) – 3. 1 V (b) – 10.5 V (c) + 10.5 V (d) – 16.7 V
18 A 200 W sodium street lamp emits yellow light of wavelength 0.6 mm. Assuming it to be 25% efficient in converting electrical energy to light, the number of photon of yellow light, it emits per second is [CBSE AIPMT] (a) 1.5 ´ 1020 (b) 6 ´ 1018 (c) 6.2 ´ 2020 (d) 3 ´ 1019 19 Photoelectric emission is observed from a metallic surface for frequencies n1 and n 2 of the incident light ( n1 > n 2 ). If the maximum values of kinetic energy of the photoelectrons emitted in the two cases are in the ratio 1: n, then the threshold frequency of the metallic surface is (n - n 2 ) ( nn 1 - n 2 ) (b) (a) 1 ( n - 1) ( n - 1) [AFMC] ( nn 2 - n 1 ) ( n1 - n 2 ) (d) (c) ( n - 1) n
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
20 When a certain metal surface is illuminated with light of frequency n, the stopping potential for photoelectric current is V0 . When the same surface is illuminated by V n light of frequency , the stopping potential is 0 . The 2 4 threshold frequency for photoelectric emission is [WB JEE] n n 2n 4n (a) (b) (c) (d) 6 3 3 3 21 The threshold frequency for a certain photosensitive metal is n 0 . When it is illuminated by light of frequency n = 2 n 0 , the maximum velocity of photoelectrons is v 0 . What will be the maximum velocity of the photoelectrons when the same metal is illuminated by light of frequency [AMU] n = 5 v0 ? (a) 2 v 0 (b) 2 v 0 (c) 2 2 v 0 (d) 4 v 0
2011 22 Photoelectric emission occurs only, when the incident light has more than a certain minimum (a) wavelength (b) intensity (c) frequency (d) power
[CBSE AIPMT]
23 The work functions for metals A , B and C are respectively, 1.92 eV, 2 eV and 5 eV. According to Einstein’s equation, the metal(s) which will emit photoelectrons for a radiation of wavelength 4100 Å is/are [AIIMS] (a) Only A (b) A and B (c) All of these (d) None of these 24 Work function of nickel is 5.01 eV. When ultraviolet radiation of wavelength 2000 Å is incident on it, electrons are emitted. What will be the maximum velocity of emitted electrons? [AIIMS] (a) 3 ´ 108 ms -1 (b) 6.46 ´ 105 ms -1 (c) 10.36 ´ 105 ms -1 (d) 8.54 ´ 106 ms -1 25 If 5% of the energy supplied to a bulb is irradiated as visible light, how many quanta are emitted per second by a 100 W lamp? (Assume, wavelength of visible light as [AIIMS] 5.6 ´ 10-5 cm) 19 3 -19 (a) 1.4 ´ 10 (b) 3 ´ 10 (c) 1.4 ´ 10 (d) 3 ´ 104 26 The threshold frequency for a metallic surface corresponds to an energy of 6.2 eV and the stopping potential for a radiation incident on this surface is 5 V. The incident radiation lies in [AFMC] (a) ultraviolet region (b) infrared region (c) visible region (d) X-ray region 27 When 1 cm thick surface is illuminated with light of wavelength l , the stopping potential isV.When the same surface is illuminated by light of wavelength 2l , the stopping potential is V/3. Threshold wavelength for metallic surface is [BHU] (a) 4 l /3 (b) 4 l (c) 6 l (d) 8 l /3
28 The momentum of a photon in an X-ray beam of 10-10 m wavelength is [UP CPMT] (b) 6.6 ´ 10-24 kg-ms -1 (a) 1.5 ´ 10-23 kg-ms -1 (d) 2.2 ´ 10-52 kg-ms -1 (c) 6.6 ´ 10-44 kg-ms -1 29 The frequency of a photon having energy 100 eV is (Take, h = 6.62 ´ 10-34 J-s, 1 eV = 1.6 ´ 10-19 J) [J&K CET] (b) 2.417 ´ 1016 Hz (a) 2.417 ´ 10-16 Hz 17 (c) 2.417 ´ 10 Hz (d) 10.54 ´ 1017 Hz 30 A photosensitive metallic surface has work function f. If photon of energy 3 f fall on this surface, the electron comes out with a maximum velocity of 6 ´ 106 ms -1 . When the photon energy is increased to 9 f, then maximum velocity of photoelectron will be [J&K CET] (a) 12 ´ 106 ms -1 (b) 6 ´ 106 ms -1 (c) 3 ´ 106 ms -1 (d) 24 ´ 106 ms -1 31 Monochromatic light of wavelength 667 nm is produced by a helium neon laser. The power emitted is 9 mW. The number of photons arriving per second on the average at a target irradiated by this beam is [CBSE AIPMT] (a) 9 ´ 1017 (b) 3 ´ 1016 (c) 9 ´ 1015 (d) 3 ´ 1019 32 The figure shows a plot of photocurrent versus anode potential for a photosensitive surface for three different radiations. Which one of the following is a correct statement? Photoelectric current b c Retarding potential
a
Anode potential
[CBSE AIPMT]
(a) Curves a and b represent incident radiations of different frequencies and different intensities (b) Curves a and b represent incident radiations of same frequency but of different intensities (c) Curves b and c represent incident radiations of different frequencies and different intensities (d) Curves b and c represent incident radiations of same frequency having same intensity
33 Light of two different frequencies whose photons have energies 1 eV and 2.5 eV respectively, illuminate a metallic surface whose work function is 0.5 eV, successively. Ratio of maximum speeds of emitted electrons will be [CBSE AIPMT] (a) 1 : 2 (b) 1 : 1 (c) 1 : 5 (d) 1 : 4 34 In photoelectric emission process from a metal of work function 1.8 eV, the kinetic energy of most energetic electrons is 0.5 eV. The corresponding stopping potential is (a) 1.3 V (b) 0.5 V [CBSE AIPMT] (c) 2.3 V (d) 1.8 V
737
DUAL NATURE OF MATTER AND RADIATION
2010 35 When ultraviolet light of wavelength 100 nm is incident upon silver plate, a potential of 7.7 V is required to stop the photoelectrons from reaching the collector plate. How much potential will be required to stop the photoelectrons when light of wavelength 200 nm is incident upon silver? (a) 1.5 V (b) 3.85 V [Manipal] (c) 2.35 V (d) 15.4 V
36 Radiations of two photon of energies twice and five times the work function of metal are incident successively on the metal surface. The ratio of the maximum velocity of the photoelectrons emitted in the two cases will be [Manipal] (a) 1 : 1 (b) 1 : 2 (c) 1 : 3 (d) 1 : 4 37 Photoelectric effect experiments are performed using three different metal plates p, q and r having work functions fp = 2.0 eV, f q = 2.5 eV and f r = 3.0 eV, respectively. A light beam containing wavelengths of 550 nm, 450 nm and 350 nm with equal intensities illuminates each of the plates. The correct I-V graph for the experiment is [Main (IIT) JEE] I
I p q r
(a)
(b)
p
q
V I
(c)
r
V
I r q p V
q
p
V
38 Calcium plate has maximum possible radiation of wavelength l of 400 nm to eject electrons. Its work function is [Manipal] (a) 2.3 eV (b) 3.1 eV (c) 4.5 eV (d) None of these 39 Momentum of photon is hn hn (b) 3 (a) 2 c c
43 According to Einstein’s photoelectric equation, the graph of kinectic energy of the photoelectron emitted from the metal versus the frequency of the incident radiation gives a straight line graph, whose slope [KCET] (a) depends on the intensity of the incident radiation (b) depends on the nature of the metal and also on the intensity of incident radiation (c) is same for all metals and independent of the intensity of the incident radiation (d) depends on the nature of the metal 44 Light of wavelength l , strikes a photoelectric surface and electrons are ejected with an energy E. If E is to be increased to exactly twice its original value, the wavelength changes to l¢, where [BCECE] (a) l¢ is less than l/ 2 (b) l¢ is greater than l/ 2 (c) l¢ is greater than l/ 2 but less than l (d) l¢ is exactly equal to l/ 2 45 The work function for aluminium surface is 4.2 eV. The cut-off wavelength for the photoelectric effect is [CG PMT] (a) 2955 Å (b) 4200 Å (c) 2000 Å (d) 1000 Å
(d) r
42 The threshold frequency of the metal of the cathode in a photoelectric cell is 1 ´ 1015 Hz. When a certain beam of light is incident on the cathode, it is found that a stopping potential 4.144 V is required to reduce the current to zero. The frequency of the incident radiation is [EAMCET] (b) 2 ´ 1015 Hz (a) 2.5 ´ 1015 Hz (c) 4.144 ´ 1015 Hz (d) 3 ´ 1016 Hz
46 The energy of a photon corresponding to the visible light of maximum wavelength is approximately [MGIMS] (a) 1 eV (b) 1.6 eV (c) 3.2 eV (d) 7 eV 47 A radio transmitter radiates 1 kW power at a wavelength 198.6 m. How many photons does it emit per second?
[MP PMT]
hn (c) c
h (d) c
40 If the work function of the photoelectric surface is 3.3 eV, then the value of threshold frequency is [MP PMT] (a) 8 ´ 1014 Hz (b) 5 ´ 1016 Hz (c) 4 ´ 1011 Hz (d) 8 ´ 1010 Hz 41 Minimum light intensity that can be perceived by normal human eye is about 10-10 Wb m -2 . What is the minimum number of photons of wavelength 660 nm that must enter the pupil in 1 s for one to see the object? Area of cross-section of the pupil is 10-4 m 2 . [Punjab PMET] (a) 3.3 ´ 102 (b) 3.3 ´ 103 (c) 3.3 ´ 104 (d) 3.3 ´ 105
[VMMC] 10
(a) 10
(b) 10
20
(c) 10
30
(d) 10
40
48 If the distance of 100 W lamp is increased from a photocell, the saturation current i in the photocell varies with the distance d as [VMMC] 2 (b) i µ d (a) i µ d 1 1 (c) i µ (d) i µ 2 d d 2009 49 Let K 1 be the maximum kinetic energy of photoelectrons emitted by light of wavelength l 1 and K2 corresponding to wavelength l 2 . If l 1 = 2l 2 , then [AIIMS] (a) 2K1 = K 2 (b) K1 = 2K 2 (c) K1 < K2 /2 (d) K1 > 2K 2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
50 The curve drawn between velocity and frequency of photon in vacuum will be a [AIIMS] (a) straight line parallel to frequency axis (b) straight line parallel to velocity axis (c) straight line passing through origin and making an angle of 45° with frequency axis (d) hyperbola 51 The work function of a substance is 4 eV. The longest wavelength of light that can cause photoelectron emission from this substance is approximately [AFMC] (a) 540 nm (b) 400 nm (c) 310 nm (d) 220 nm 52 Sodium and copper have work functions 2.3 eV and 4.5 eV, respectively. Then, the ratio of their threshold wavelengths is nearest to [UP CPMT] (a) 1 : 2 (b) 2 : 1 (c) 1 : 4 (d) 4 : 1 53 The energy of photon of light is 3 eV. Then, the wavelength of photon must be [UP CPMT] (a) 4125 nm (b) 412.5 nm (c) 41.250 nm (d) 4 nm 54 Choose the correct statement. [BVP] (a) Photoelectric effect can take place from bound electrons. (b) Photoelectric effect can take place from free electrons. (c) Photoelectric effect can take place from bounded or free electrons. (d) None of the above 55 Monochromatic light of frequency f is incident on emitter having threshold frequency f 0 . The kinetic energy of ejected electron will be [OJEE] (a) hf (b) h ( f - f 0 ) (c) hf 0 (d) h ( f + f 0 ) 56 The photons in a radio wave of wavelength 3 ´ 104 cm have energy [Haryana PMT] -10 -24 (a) 6.62 ´ 10 J (b) 19. 86 ´ 10 J (c) 6.62 ´ 10-28 J (d) 2.2 ´ 10-35 J 57 In a photoelectric experiment, the relation between applied potential difference between cathode and anode V and the photoelectric current I was found to be shown in graph below. If Planck’s constant h = 6.6 ´ 10-34 Js -1 and work function is 4 eV, then the frequency of incident radiation would be nearly (in second -1 ) [Haryana PMT, CG PMT] I
_ 3.2 18
(a) 0.436 ´ 10 (c) 1.939 ´ 1014
O
V(in volt)
(b) 1.436 ´ 1017 (d) 0.775 ´ 1016
58 If the photoelectric work function for a metallic surface is 4.125eV, the cut-off wavelength for photoelectric phenomenon for the surface is [J&K CET] (a) 4500 Å (b) 1700 Å (c) 2800 Å (d) 3000 Å 59 In photoelectric effect, if the intensity of light is doubled, then maximum kinetic energy of photoelectrons will become [MHT CET] (a) double (b) half (c) four times (d) no change 60 Light of wavelength 330 nm falling on a piece of metal ejects electrons with sufficient energy which requires voltage V0 to prevent them from reaching a collector. In the same set up, light of wavelength 220 nm, ejects electrons which require twice the voltageV0 to stop them in reaching a collector. The numerical value of voltageV0 is [AIIMS] 16 15 15 8 (b) V (c) V (d) V (a) V 15 16 8 15
2008 61 When light of wavelength 300 nm falls on a photoelectric emitter, photoelectrons are liberated. For another emitter, light of wavelength 600 nm is sufficient for liberating photoelectrons. The ratio of the work function of the two emitters is [AFMC] (a) 1: 2 (b) 2 : 1 (c) 4 : 1 (d) 1: 4
62 When photons of energy hn fall on an aluminium plate (of work function E 0 ), photoelectrons of maximum kinetic energy K are ejected. If the frequency of the radiation is doubled, the maximum kinetic energy of the ejected photoelectrons will be [Haryana PMT] (c) K (d) K + hn (a) K + E 0 (b) 2K 63 The velocity of the most energetic electrons emitted from a metallic surface is doubled when the frequency n of the incident radiation is doubled. The work function of this metal is [Punjab PMET] 2 hn hn hn hn (b) (c) (d) (a) 4 3 2 3 64 The threshold frequency for a certain metal is n 0 . When a certain radiation of frequency 2 n 0 is incident on this metal surface, the maximum velocity of the photoelectrons emitted is 2 ´ 106 ms -1 . If a radiation of frequency 3 n 0 is incident on the same metal surface, the maximum velocity of the photoelectrons emitted(in ms -1 ) is [EAMCET] (a) 2 ´ 106 (b) 2 2 ´ 106 (d) 4 3 ´ 106 (c) 4 2 ´ 106 65 Calculate the linear momentum of a 3 MeV photon. (a) 0.01 eV-s/m (b) 0.02 eV-s/m [AMU] (c) 0.03 eV-s/m (d) 0.04 eV-s/m
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DUAL NATURE OF MATTER AND RADIATION
66 A photon of energy 8 eV is incident on a metal surface of threshold frequency 1. 6 ´ 1015 Hz. The maximum kinetic energy of photoelectrons emitted is [Guj CET] (take, h = 6.6 ´ 10-34 J-s, 1eV = 1.6 ´10-19 J) (a) 1.4 eV
(b) 0.8 eV
(c) 4.2 eV
73 Which one of the following graph represents the variation of maximum kinetic energy ( E K ) of the emitted electrons with frequency (n) in photoelectric effect correctly? [KCET] EK
EK
(d) 2.8 eV
67 Ultraviolet light of wavelength 200 nm is incident on polished surface of Fe (iron). Work function of the surface is 4.71 eV. What will be its stopping potential? (Take, h = 6.626 ´ 10-34 J-s, 1 eV = 1.6 ´ 10-19 J and c = 3 ´ 108 ms -1 ) [Guj CET] (a) 0.5 V (b) 2.5 V (c) 1.5 V (d) None of these
(a)
(b) ν EK
EK
(c)
(d)
2007 68 A 5 W source emits monochromatic light of wavelength 5000 Å. When placed 0.5 m away, it liberates photoelectrons from a photosensitive metallic surface. When the source is moved to a distance of 1 m, the number of photoelectrons liberated will be reduced by a factor of (a) 4 (b) 8 [CBSE AIPMT] (c) 16 (d) 2
69 Energy from the sun is received on earth at the rate of 2 cal cm -2 min -1 . If average wavelength of solar light be taken as 5500 Å, then how many photons are received on the earth (cm -2 min -1 )? (Take, h = 6. 6 ´ 10-34 J-s, 1 cal = 4.2 J) [AIIMS] (b) 2.9 ´ 1013 (a) 1.5 ´ 1013 (d) 1.75 ´ 1019 (c) 2.3 ´ 1019 70 An X-ray pulse of wavelength 4.9 Å is sent through a section of Wilson cloud chamber containing a super saturated gas and tracks of photoelectron ejected from the gaseous atoms are observed. Two groups of tracks of lengths 1.40 cm and 2.02 cm are noted. If the range-energy relation for cloud chamber is given by R = a E with a = 1cm keV -1 , obtain the binding energies of the two levels from which electrons are emitted. (Take, h = 6.63 ´ 10-34 J-s, 1eV = 1.6 ´ 10-19 J) [AIIMS] (a) 0.52 keV (b) 0.75 eV (c) 0.52 eV (d) 0.75 keV 71 In a p-n junction photocell, the value of the photo-electromotive force produced by monochromatic light is proportional to [AFMC] (a) the barrier voltage at the p-n junction (b) this intensity of the light falling on the cell (c) the frequency of the light falling on the cell (d) the voltage applied at the p-n junction 72 A light of wavelength 5000 Å falls on a sensitive plate with photoelectric work function 1.90 eV. Kinetic energy of the emitted photoelectrons will be (Take, h = 6. 62 ´ 10-34 J-s) [RPMT] (a) 0.1 eV (b) 2 eV (c) 0.58 eV (d) 1.581 eV
ν
ν
ν
74 A and B are two metals with threshold frequencies 1. 8 ´ 1014 Hz and 2.2 ´ 1014 Hz. Two identical photons of energy 0.825 eV each are incident on them. Then, photoelectrons are emitted by (Take, h = 6. 6 ´ 10-34 J-s) (a) Only B (b) Only A [KCET] (c) Neither A nor B (d) Both A and B 75 The electromagnetic theory of light failed to explain (a) photoelectric effect (b) polarisation [KCET] (c) diffraction (d) interference 76 Light of wavelength 0.6 mm from a sodium lamp falls on a photocell and causes the emission of photoelectrons for which the stopping potential is 0.5 V. With light of wavelength 0.4 mm from a sodium lamp, the stopping potential is 1.5 V, with this data, the value of h / e is [Punjab PMET] -19
(a) 4 ´ 10 V-s (c) 4 ´ 10-15 V-s
-15
(b) 0.25 ´ 10 V-s (d) 4 ´ 10-8 V-s
77 A metal surface is illuminated by light of two different wavelengths 248 nm and 310 nm. The maximum speeds of the photoelectrons corresponding to these wavelengths are u1 and u 2 , respectively. If the ratio u1 : u 2 = 2 : 1 and hc = 1240 eV nm, then the work function of the metal is nearly [EAM CET] (a) 3.7 eV (b) 3.2 eV (c) 2.8 eV (d) 2.5 eV 78 A photosensitive surface is receiving light of wavelength 5000 Å at the rate of 10-7 J-s. The number of photons ejected per second is [AMU] (b) 2.5 ´ 1011 (a) 2.5 ´ 1012 (d) 2.5 ´ 109 (c) 2.5 ´ 1010 79 The threshold wavelength for a metal having work function W0 is l 0 . What is the threshold wavelength for a metal whose work function is W0 / 2 ? [Guj CET] l0 l0 (a) 4l 0 (b) 2l 0 (c) (d) 2 4
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2006 80 A photocell employs photoelectric effect to convert [CBSE AIPMT]
(a) change in the frequency of light into a change in electric voltage (b) change in the intensity of illumination into a change in photoelectric current (c) change in the intensity of illumination into a change in the work function of the photocathode (d) change in the frequency of light into a change in the electric current
81 Assertion Photoelectric emission is an instantaneous process. Reason (R) There is no time lag between incidence of light and emission of photoelectron. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion (c) Assertion is correct but Reason is incorrect (d) Both Assertion and Reason are incorrect 82 The threshold frequency for certain metal is 3.3 ´ 1014 Hz. If light of frequency 8.2 ´ 1014 Hz is incident on the metal, then the cut-off voltage of the photoelectric current will be (a) 4.9 V (b) 3 V [BHU] (c) 2 V (d) 1 V 83 For photoelectric emission, tungsten requires light of wavelength 2300 Å. If light of 1800 Å wavelength is incident, then emission (a) takes place [Punjab PMET] (b) does not take place (c) may or may not take place (d) depends on frequency 84 Light of frequency n falls on material of threshold frequency n 0 . Maximum kinetic energy of emitted electron is proportional to [DUMET] (b) n (a) n - n 0 (c) n - n 0 (d) n 0 85 Maximum velocity of the photoelectrons emitted by a metal surface is 1.2 ´ 106 ms -1 . Assuming the specific charge of an electron to be 1. 8 ´ 1011 C kg-1 , the value of the stopping potential (in volt) will be [KCET] (a) 2 (b) 3 (c) 4 (d) 6 86 Monochromatic light frequency f1 incident on a photocell and the stopping potential is found to be V1 . What is the new stopping potential of the cell, if it is radiated by [Guj CET] monochromatic light of frequency f 2 ? h h (a) V1 - ( f 2 - f1 ) (b) V1 + ( f1 + f 2 ) e e h h (c) V1 - ( f1 + f 2 ) (d) V1 + ( f 2 - f1 ) e e
2005 87 A photosensitive metallic surface has work function hn 0 . If
photons of energy 2hn 0 fall on this surface, the electrons come out with a maximum velocity of 4 ´ 106 ms -1 . When the photon energy is increased to 5hn 0 , then maximum velocity of photoelectrons will be [CBSE AIPMT] (a) 2 ´ 106 ms -1 (b) 2 ´ 107 ms -1 (c) 8 ´ 105 ms -1 (d) 8 ´ 106 ms -1
æ1 ö KE ç mv 2max ÷ of ejected è2 ø photoelectrons and the frequency (n) of incident radiation for a material exhibiting photoelectric effect is shown in the figure. The work function of the material is
88 The
graph
between
eV KE
740
2 1 0
ν
–1 –2
[AFMC]
(a) 1.5 eV
(b) 1 eV
(c) 3 eV
(d) 2 eV
89 The light rays having photons of energy 1.8 eV are falling on a metal surface having a work function 1.2 eV. What is the stopping potential to be applied to stop the emitting electrons? [BHU] (a) 3 eV (b) 1.2 eV (c) 0.6 V (d) 1.4 V 90 The correct curve between the stopping potential (Vs ) and intensity ( I ) of incident light is [Haryana PMT] Vs
Vs
(a)
(b) I
I
Vs
Vs
(c)
(d) I
I
91 From the figure describing photoelectric effect, we may infer correctly that [KCET] V (Stopping potential)
Na
(Frequency)
Al
ν
(a) Na and Al both have the same threshold frequency (b) maximum kinetic energy for both the metals depend linearly on the frequency (c) the stopping potentials are different for Na and Al for the same change in frequency (d) Al is a better photosensitive material than Na
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DUAL NATURE OF MATTER AND RADIATION
Answers 1 11 21 31 41 51 61 71 81 91
(d) (a,c,d) (b) (b) (c) (c) (b) (b) (a) (b)
2 12 22 32 42 52 62 72 82
(b) (a) (c) (b) (b) (b) (d) (c) (c)
3 13 23 33 43 53 63 73 83
(c) (b) (b) (a) (c) (b) (d) (d) (a)
4 14 24 34 44 54 64 74 84
(a) (c) (b) (b) (c) (b) (b) (b) (a)
5 15 25 35 45 55 65 75 85
(c) (c) (a) (a) (a) (b) (a) (a) (c)
6 16 26 36 46 56 66 76 86
(c) (d) (a) (b) (b) (c) (a) (c) (d)
7 17 27 37 47 57 67 77 87
(b) (a) (b) (a) (c) (c) (c) (a) (d)
8 18 28 38 48 58 68 78 88
(b) (a) (b) (b) (d) (d) (a) (b) (a)
9 19 29 39 49 59 69 79 89
(a) (b) (b) (c) (c) (d) (c) (b) (c)
10 20 30 40 50 60 70 80 90
(d) (b) (a) (a) (a) (c) (a) (b) (b)
Explanations
n = 6 ´ 1014 Hz
n = 2 n0 Substituting the value of n in Eq. (i), we get 1 2 m v1 = h(2 n 0 ) - hn 0 2 = 2hn 0 - hn 0 = hn 0 …(ii) If incident frequency of radiation, n = 5 n0 Substituting the value of n in Eq. (i), we get 1 2 mv2 = h(5n 0 ) - hn 0 2 = 5hn 0 - hn 0 …(iii) = 4 hn 0 On dividing Eq. (ii) by Eq (iii), we get 1 2 mv1 hn 0 2 = 1 2 4 hn 0 mv2 2 v12 1 v1 1 or = = Þ v2 2 v22 4
Speed of light, c = 3 ´ 108 m/s
\
1 (d) The work function of material is given by
f = hn hc f= l
cù é …(i) êQ n = ú lû ë
where, h = Planck’s constant = 6.63 ´ 10-34 J-s, c = speed of light = 3 ´ 108 ms -1 and l = wavelength of light. Here, f = 4 eV = 4 ´ 16 . ´ 10-19 J Substituting the given values in Eq. (i), we get 6.63 ´ 10-34 ´ 3 ´ 108 4 ´ 16 . ´ 10-19 = l -34 6.63 ´ 10 ´ 3 ´ 108 Þ l= . ´ 10-19 4 ´ 16 = 3108 . ´ 10-7 m -~ 310 nm
2 (b) Given, frequency of photon,
\Wavelength of photon, c l= n 3 ´ 108 = 0.5 ´ 10-6 = 6 ´ 1014 = 500 ´ 10-9 = 500 nm
3 (c) According to the Einstein’s photoelectric equation, 1 2 K max = mvmax = hn - f 0 2 …(i) = hn - hn 0 where, K max is the maximum kinetic energy of photoelectrons having maximum velocity vmax . When incident frequency of light,
v1 : v2 = 1 : 2
4 (a) Given, threshold wavelength, l 0 = 3250 ´ 10-10 m Wavelength of ultraviolet light, l = 2536 ´ 10-10 m Let velocity of ejected electron be v. Now, applying Einstein’s photoelectric equation, we have E = K + f0 1 ⇒ hn = mev 2 + hn 0 2 æ1 1 1ö ⇒ mev 2 = hn - hn 0 = hc ç - ÷ è l l0 ø 2 ⇒ Velocity of electron, v=
2hc æ 1 1ö ç - ÷ me è l l 0 ø
2 ´ 4.14 ´ 10-15 ´ 1.6 ´ 10-19 ´ 3 ´ 108 æ 3250 - 2536 ö = ÷ ç 9.1 ´ 10-31 ´ 10-20 è 3250 ´ 2536 ø » 0.6 ´ 106 ms -1 » 6 ´ 105 ms -1
5 (c) The photoelectric effect is the emission of electrons (called photoelectrons) when light strikes a metal surface. Hence, photoelectric effect can take place only with an electron bound in the atom. However, electron is a lepton, whereas proton is fermion.
6 (c) Case I When a metallic surface is illuminated with radiation of wavelength l, the stopping potential is V . So, photoelectric equation can be written as hc hc …(i) eV = l l0 Case II When the same surface is illuminated with radiation of wavelength 2l, the stopping potential V is . So, photoelectric equation can be 4 written as eV hc hc = 4 2l l 0 4 hc 4 hc …(ii) eV = Þ 2l l0 From Eqs. (i) and (ii), we get hc hc 4 hc 4 hc Þ = l l0 l0 2l 1 1 2 4 = Þ l 0 = 3l Þ l l0 l l0
7 (b) From photoelectric equation, hn = W + eV0 (where, W = work function)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
So firstly,
hc = W + 3eV0 l
…(i)
hc Also, = W + eV0 2l hc …(ii) = 2W + 2eV0 Þ l Subtracting Eq. (i) from Eq. (ii), we get 0 = W - eV0 Þ W = eV0 From Eq. (i), we get hc = eV0 + 3eV0 = 4 eV0 l Threshold wavelength is given by hc 4 eV0l l th = = = 4l W eV0
8 (b) From Einstein’s photoelectric equation, (KE) max = hn – f 0 For first condition, …(i) 0.5 = E – f 0 For second condition, E ´ 20 ö æ 0.8 = ç E + ÷ – f0 è 100 ø …(ii) Þ 0.8 = 1.2 E – f 0 From Eqs. (i) and (ii), we get 3 0.3 = 0.2 E Þ E = = 1.5 eV 2 From Eq. (i), we get f 0 = E – 0.5 = 1.5 - 0.5 = 1 eV
9 (a) Accroding to Einstein photoelectric equation,
10 (d) The stopping potential is given as
Þ V0 µ
Thus, if the wavelength of incident light falling on a photosensitive material decreases, then stopping potential increases.
11 (a, c d) There is no significant time delay between the absorption of a
1 l
l = 660 nm = 660 ´ 10-9 m Energy of photons, E = nh n But E=P´t \ P ´ t = nh n nhc [Q v = c / l] Þ P´t= l -34 n ´ 6. 6 ´ 10 ´ 3 ´ 108 \60 ´ 1 = 660 ´ 10-9 n ´ 6. 6 ´ 3 ´ 10-19 Þ 60 = 6.6 60 Þ = 2 ´ 1020 photons n= 3 ´ 10-19
K max = eV0
where, e is the charge of the electron. Since, at the stopping potential, the photoelectric current cannot be obtained by increasing the intensity of the incident. So, light, it is clear that the stopping potential or the maximum kinetic energy of the photoelectrons, does not depend upon the intensity of the incident light. However, if the intensity of light be doubled, then the number of photoelectrons emitted per second is doubled. So, nis doubled but K max remains same.
13 (b) Above the threshold frequency, the maximum kinetic energy of the emitted photoelectrons depends on the frequency of the incident light, but is independent of the intensity of the incident light.
14 (c) As, (KE )max = hn – f 0 = h(n – n 0 )
15 (c) From photoelectric equation,
Þ K A < K B /2
Þ
12 (a) We know that,
Here,
Wavelength of metal B is half of metal A, therefore 2hc - f Þ 2K A + f = K B KB = lA
16 (d) Given, wavelength of photons,
So, (a), (c) and (d) are the correct options. However, Einstein analysis gives a threshold frequency below which no electron can be emitted.
1 2 mvmax = h[ 2n - n ] = hn 2 [Q n 0 = n ] 2hn 2hn 2 = Þ vmax = Þ vmax m m
hc -f KA = lA 2hc - 2f 2K A = Þ lA 2hc or 2K A + f = -f lA
h V0 = (v - v0 ) e hæ c c ö V0 = ç - ÷ e è l l0 ø
suitable radiation and the emission of electrons and the maximum kinetic energy of electrons does not depend on the intensity of radiation. Also, the maximum kinetic energy of emitted photoelectrons is proportional to frequency of incident radiation.
EK = E - W where, EK is kinetic energy of emitted photoelectrons, W is the work function and E is the energy supplied. hc E = hn = l where, h is Planck’s constant, c is the speed of light in vacuum and l is the wavelength. 6.6 ´ 10- 34 ´ 3 ´ 108 E= \ 5000 ´ 10-10 = 3.96 ´ 10- 19 J Also, 1 eV = 1.6 ´ 10- 19 J 3.96 ´ 10- 19 = 2.48 eV 1.6 ´ 10- 19 Hence, EK = 2.48 - 1.90 = 0.58 eV
\
E=
17 (a) As, EK = eVs Þ
18
Vs =
EK 31 . ´ 16 . ´ 10-19 = e . ´ 10-19 C 16
Vs = 31 . V The stopping potential should be negative, so that it can stop the electrons to reach the anode. (a) Efficient power, N hc P= ´ = 200 ´ 0.25 = 50 l t Eù é êëQ P = t úû N l = 50 ´ t hc N 50 ´ 0.6 ´ 10- 6 Þ = t 6.6 ´ 10- 34 ´ 3 ´ 108 = 1.5 ´ 1020
19 (b) By using equation, hn - hn 0 = K max , we have h (n 1 - n 0 ) = K 1 and h (n 2 - n 0 ) = K 2 n - n0 K 1 1 \ 1 = = n2 - n0 K 2 n (nn 1 - n 2 ) or n0 = (n - 1) 20 (b) We know that, eV0 = hn - f 0 where, V0 = stopping potential and n = frequency of light. Case I eV0 = hn - f 0 …(i) eV0 hn Case II = - f0 4 2 …(ii) Þ eV0 = 2hn - 4 f 0 From Eqs. (i) and (ii), we get hn - f 0 = 2hn - 4 f 0 Þ hn = 3f 0 (Q f 0 = hn 0) Þ hn = 3hn 0 hn n Þ n0 = n0 = Þ 3h 3
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DUAL NATURE OF MATTER AND RADIATION
21 (b) Maximum velocity of a photoelectron, 2h(n - n 0 ) vmax = m 2h(2n 0 - n 0 ) \ vmax = v0 = m (given, n = 2n 0) 2hn 0 …(i) v0 = m Again, n = 5n 0 2h(5n 0 - n 0 ) \ vmax = n =
2h4n 0 = 2v0 m
Let n be the number of photons emitted per second. Then, nhn = E = 5 5l 5 ´ 5.6 ´ 10-7 \ n= = hc (6.62 ´ 10-34 ) (3 ´ 108 ) hc ù é êëQ E = l úû = 1.4 ´ 1019 equation, hn = hn 0 + eV0 = 6.2 + 5 = 11.2 eV hc hc Þ = 11.2 eV or l = 112 . eV l =
22 (c) For a given material, there exists a
This incident radiation lies in ultraviolet region.
or
12375 12375 eV = 6.2 eV = l(in Å) 2000
or
Maximum kinetic energy K = hn - hn 0 Þ K = E -W K max = (6.2 - 5.01) eV= 1.19 eV 1 2 Now, K max = mvmax 2 1.19 ´ 1.6 ´ 10-19 2 = 1 / 2 ´ 91 . ´ 10-31 ´ vmax 2 vmax =
-19
1.19 ´ 1.6 ´ 10 ´ 2 9.1 ´ 10-31 12
= 0.418 ´ 10 = 41.8 ´ 10 or
vmax = 6.46 ´ 105 ms -1
25 (a) Energy radiated as visible light =
5 ´ 100 = 5 Js -1 100
Now, E =
…(i)
19.8 ´ 10- 17 = 3 ´ 10- 19 667 Now, number of photons 9 ´ 10-3 Pù é = Qn= ú - 19 ê Eû 3 ´ 10 ë
…(ii)
3 1 3 1 - = 2l l l 0 l 0 1 2 = 2l l 0
= 3 ´ 1016
32 (b) Here, curves a and b represent incident radiations of same frequency because they are having same retarding potential, but of different intensities. However, curves b and c represent incident radiations of same intensity but of different frequencies.
33 (a) Kinetic energy, KE = f - f 0 Here,
Threshold wavelength for metallic surface, l 0 = 4 l.
28 (b) Momentum of photon,
\
h 6.6 ´ 10-34 p= = l 10-10 = 6.6 ´ 10-24 kg-ms -1
29 (b) Given, E = 100 eV
or
and
h = 6.62 ´ 10-34 J-s
Þ
E = hn E 100 ´ 1.6 ´ 10-19 n= = h 6.62 ´ 10-34
or
= 0.2417 ´ 1017 = 2.417 ´ 1016 Hz
KE 1 = 1 - 0.5 = 0.5 eV KE 2 = 2.5 - 0.5 = 2 eV KE 1 0.5 1 v2 1 = = or 12 = KE 2 2 4 v2 4 v1 1 1 = = v2 4 2
34 (b) We know that, eV0 = hn - f 0
= 100 ´ 1.6 ´ 10-19 J 10
hc 6.6 ´ 10- 34 ´ 3 ´ 108 = l 667 ´ 10- 9
=
æ 1 1 ö æ1 1ö or 3 ç - ÷=ç - ÷ è 2l l 0 ø è l l 0 ø
24 (b) Energy corresponding to 2000 Å
or
P = 9 mW = 9 mJs -1
Dividing Eq. (i) by Eq. (ii), we get æ1 1ö ç - ÷ è l l0 ø 3= æ 1 1ö - ÷ ç è 2l l 0 ø
Now, we have W A = 1.92 eV, W B = 2 eV and WC = 5 eV Since, W A < E and W B < E Hence, A and B will emit photoelectrons.
Hence, maximum velocity = 12 ´ 10 6 ms–1
31 (b) Given, l = 667 nm = 667 ´ 10- 9 m,
æ1 1ö eV = hc ç - ÷ è l l0 ø æ 1 1ö eV = hc ç - ÷ è 2l l 0 ø 3
v2 = 2v1 = 2 ´ 6 ´ 106 ms–1
Þ
27 (b) According to the question,
and
4.8 ´ 10-19 eV = 3 eV = 1.6 ´ 10-19
E=
6.6 ´ 10-34 ´ 3.0 ´ 108 . ´ 16 . ´ 10-19 112
= 1.1049 ´ 10-7 = 1104.9 Å
23 (b) Energy incident by the radiation of wavelength 4100 Å is hc 6.67 ´ 10-34 ´ 3 ´ 108 E= = l 4100 ´ 10-10 = 4.8 ´ 10-19 J
From Einstein's photoelectric equation, Ei = f + ( KE )max , where Ei = energy of incident photon Case I 3f = f + K1 1 …(i) Þ 2 f = K1 = mp (v1 )2 2 Case II 9f = f + K 2 1 Þ 8f = K 2 = mp (v2 )2 …(ii) 2 From Eqs. (i) and (ii), we get 1 K 1 (v1 )2 = = 4 K 2 (v2 )2
26 (a) From Einstein’s photoelectric
[by Eq. (i)]
certain minimum frequency of the incident radiations below which no emission of photoelectrons takes place. This frequency is also known as threshold frequency.
30 (a) Work function of metal = f
35
Also , K max = hn - f 0 Þ eV0 = K max = 0.5 eV (given) 0.5 eV Þ V0 = = 0.5 V e 12375 (a) l 1 = Å E1 (eV) 12375 12375 = Þ E1 = l 1 (Å) 1000
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
E1 = 12.375 eV 12375 Similarly, E2 = eV l 2 (Å) 12375 eV = = 61875 . 2000 Now, E1 - W 0 = eVs1 and E2 - W 0 = eVs 2 Hence, 12.375 - W 0 = 7.7 e and . - W 0 = eVs 2 61875 Solving, we get Vs 2 = 1.5 V
\
39 (c) Momentum of photon, p=m´c=
Case II 5W 0 - W 0 = (1/ 2)
mv22
Þ Þ
41 (c) Intensity, I = 10-10 Wbm -2
…(ii)
Therefore, from Eqs. (i) and (ii), we get v 1 2W 0 - W 0 v12 = Þ 1= v2 2 5W 0 - W 0 v22 1240 = 2.25 eV, 550 1240 E2 = = 2.75 eV 450 1240 E3 = = 3.54 eV 350 E1 cannot emit photoelectrons from q and r plates. E2 cannot emit photoelectrons from r. Thus, the stopping potential and saturation current is minimum for plate r. Further, work function of p is least and it can emit photoelectrons from all three wavelengths. Hence, magnitude of its stopping potential and saturation current both will be maximum. This is correctly shown in graph (a).
38 (b) The minimum energy required for the emission of photoelectron from a metal is called the work function W of that metal. If n 0 is threshold frequency, then W = hn 0 velocity (c) But frequency (n 0 ) = wavelength (l ) hc W = \ l Given, h = 6.6 ´ 10-34 J-s, c = 3 ´ 108 m/s, l = 400 nm -9
= 400 ´ 10
m
-34
\
W =
6.6 ´ 10 ´ 3 ´ 10 400 ´ 10-9
8
= 4.95 ´ 10-19 J Þ
W =
4.95 ´ 10-19 = 31 . eV . ´ 10-19 16
3.3 ´ 16 . ´ 10-19 = 6.6 ´ 10-34 ´ n . ´ 10-19 3.3 ´ 16 n= 6.6 ´ 10-34 = 0.8 ´ 1015 = 8 ´ 1014 Hz
…(i)
37 (a) E1 =
work function hc hc f0 = Þ l0 = l0 f0
40 (a)Q E = hn
36 (b) E - W 0 = (1/ 2) mv 2 Case I 2W 0 - W 0 = (1/ 2) mv12
45 (a) If l0 is threshold wavelength, then
E hn = c c
42
= 10-10 Js -1m - 2 Let the number of photons required be n. nhn Then, -4 = 10-10 10 10–10 ´ 10–4 10–14 ´ l Hence, n = = hn hc 10-14 ´ 660 ´ 10-9 = 3.3 ´ 104 = 6.6 ´ 10-34 ´ 3 ´ 108 h (b) V0 = (n - n 0 ) e V0 ´ e or (n - n 0 ) = h . ´ 10-19 4.144 ´ 16 = 6.63 ´ 10-34 Þ
n - 1 ´ 1015 = 1015 n = 1015 + 1 ´ 1015 = 2 ´ 1015 Hz
43
(c) According to KEmax Einstein’s photoelectric equation, KE max = hn - f 0 Comparing with the equation of straight line, y = mx + c We get, slope of graph = h
ν
So, the slope is a constant and same for all metals and independent of the intensity of the incident radiation.
44 (c) Energy of photoelectrons, hc hc …(i) -W Þ =E+W l l where, W is the work function for the metal surface (constant). hc hc = 2E + W …(ii) 2E = -W Þ l¢ l¢ Dividing Eq. (i) by Eq. (ii), we get (E + W ) l¢ E + W l¢ = = Þ Wö æ l 2E + W l 2 çE + ÷ è 2ø l¢ 1 l l or l ¢ > Þ l > l ¢ > \ > 2 2 l 2
6.6 ´ 10-34 ´ 3 ´ 108 » 2955 Å . ´ 10-19 4.2 ´ 16 12375 (b) Energy of photon, E = eV l (in Å) =
46
For red light, the wavelength is maximum. Q l R = 7900 Å 12375 ~ 1.6 eV eV = 156 . eV \ E= 7900 47 (c) Number of photons, P P Pl n= = = E hn hc 1000 ´ 198.6 » 1030 = 6.6 ´ 10-34 ´ 3 ´ 108
48 (d) Photoelectric current depends on the intensity of incident radiation, i.e. i µI But, intensity of radiation, I µ 1/d 2 \
49 (c) Here, and
i µ 1/ d 2 hc K1 = -W l1 hc K2 = -W l2
…(i) …(ii)
Substituting l 1 = 2l 2 in Eq. (i), we get hc K1 = -W 2l 2 1 1 æ hc ö Þ K 1 = ç ÷ - W = (K 2 + W ) - W 2 è l2 ø 2 K2 W K K1 = Þ K1 < 2 2 2 2 50 (a) The curve drawn between velocity and frequency of photon in vacuum will be a straight line parallel to frequency axis as velocity of photon in a vacuum is constant and it is independent of frequency.
E=
v (Velocity) ν (Frequency)
51 (c) Given, work function, f = 4 eV Longest wavelength of light = l m hc =f \ lm hc (6.63 ´ 10- 34 ´ 3 ´ 108 ) \ lm = = f 4.0 ´1.6 ´ 10- 19 = 310 nm
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DUAL NATURE OF MATTER AND RADIATION
52 (b) We know that, work function =
hc l
W Na hc/ l Na hc l = = ´ Cu W Cu hc/ l Cu l Na hc l Cu 2.3 1 = » l Na 4.5 2
Þ
\ l Na : l Cu = 2 : 1
hc –W 330 ´ 10-9 hc and e(2V0 ) = –W 220 ´ 10–9 Solving these two equations, we get 109 ´ h ´ c V0 = 110 ´ e ´ 6 eV0 =
53 (b) Given, E = 3 eV = 3 ´ 1.6 ´ 10- 19 J We know that, E = hc/l Þ l = hc/ E 6.6 ´ 10- 34 ´ 3 ´ 108 19.8 ´ 10–26 = = 3 ´ 1.6 ´ 10- 19 4.8 ´ 10–19 -7
54 55
56
-9
= 4.125 ´ 10 = 412.5 ´ 10 m = 412.5 nm (b) Photoelectric effect can take place from free electrons. (b) Given, frequency, n = f Threshold frequency, n 0 = f0 We know that, Maximum kinetic energy, K max = hn - f 0 = hn - hn 0 = hf - hf0 = h ( f - f0 ) (c) Given, wavelength, l = 3 ´ 104 cm = 3 ´ 104 ´ 10- 2 m = 3 ´ 102 m We know that, energy, hc 6.62 ´ 10- 34 ´ 3 ´ 108 E= = l 3 ´ 102 = 6.62 ´ 10- 28 J
57 (c) Given, V0 = - 3.2V,
h = 6.6 ´ 10- 34 Js -1 and f 0 = 4 eV We know that, eV0 = hn - f 0 n = eV0 + f 0 / h . ´ 10-19 ´ 3.2 + 4 ´ 16 . ´ 10-19 16 =-34 6.6 ´ 10 = 1939 . ´ 1014 s -1
58 (d) Given, work function, f = 4.125 eV hc We know that, work function, f = l hc 6.6 ´ 10- 34 ´ 3 ´ 108 = Þl = f 4.125 ´ 1.6 ´ 10- 19 19.8 ´ 10- 7 = 3 ´ 10- 7 6.6 = 3000 ´ 10- 10 = 3000 Å
=
61 (b) Given, l1 = 300 nm and l 2 = 600 nm We know that, work function, f = hc / l So, to find ratio between them, f 1 hc l 2 l 2 600 = ´ = = = 2:1 f 2 l 1 hc l 1 300
62 (d) According to Einstein’s photoelectric effect, Energy of photon = KE of photoelectron + work function of metal or hn = K max + E0 …(i) Now, we have given, n ¢ = 2n Therefore, K ¢max = 2hn - E0 …(ii) From Eqs. (i) and (ii), we have K ¢max = 2(K max + E0 ) - E0 = 2K max + E0 = K max + (K max + E0 ) = K max + hn Putting K max = K \ K ¢max = K + hn
63 (d) We have, 1 2 mv hn - f 2 = 1 m(2v )2 h(2n ) - f 2 1 2ù é êëQ K max = hn – f = 2 mv úû 2hn 1 hn - f or or f = = 3 4 2hn - f
64 (b) Kinetic energy (KE ),
=
59 (d) The maximum kinetic energy of emitted photoelectrons depends on the radiation source and nature of material of plate but is independent of the intensity. So, it will remain unchanged.
60 (c) Let W be the work function of metal, then
109 ´ 6.6 ´ 10–34 ´ 3 ´ 108 15 V = 8 . ´ 10–19 ´ 6 110 ´ 16
and \
1 2 mv1 = 2hn 0 - hn 0 = hn 0 2 1 2 mv2 = 3hn 0 - hn 0 = 2hn 0 2 1 ù é1 mv22 = 2 ê mv12 ú 2 û ë2
Þ
v22 = 2v12
or
v2 = 2v1 = 2 ´ 2 ´ 106
Þ
v2 = 2 2 ´ 106 ms-1
65 (a) Momentum, p = =
E 3 MeV = c 3 ´ 108 m / s
3 ´ 106 eV = 0.01eV-s/m 3 ´ 108 m / s
66 (a) Given, energy of photon, E = hn = 8 eV Threshold frequency, n 0 = 1. 6 ´ 1015 Hz From Einstein’s photoelectric equation, KE max = hn - hn 0 Þ KE max = 8 -
6. 6 ´ 10-34 ´ 1. 6 ´ 1015 1. 6 ´ 10-19
= 8 - 6. 6 = 1. 4 eV
67 (c) Given, the wavelength of incident light, l = 200 nm = 200 ´ 10-9 m Work function, f = 4.71 eV From Einstein’s photoelectric equation, …(i)
KE max = hn - f But KE max = eV0 So, eV0 = hn - f where, V0 = stopping potential. hc or -f eV0 = l \ 1. 6 ´ 10-19 V0 =
Þ V0 =
…(ii)
6. 6 ´ 10-34 ´ 3 ´ 108 200 ´ 10-9 - 4 .71 ´ 1. 6 ´ 10-19 6. 6 ´ 10-34 ´ 3 ´ 108 2 ´ 10-7 ´ 1. 6 ´ 10-19 -
. ´ 10-19 4.71 ´ 16 . ´ 10-19 16
Þ V0 = (6.19 - 4.71) = 1. 48 » 1. 5 V
68 (a) Intensity of light is inversely proportional to square of distance. I (r )2 1 i.e. I µ 2 or 2 = 1 2 I 1 (r2 ) r Given, r1 = 0. 5 m , r2 = 1. 0 m Therefore,
I 2 (0. 5)2 1 = = I1 4 (1)2
Now, since number of photoelectrons emitted per second is directly proportional to intensity, so number of electrons emitted would decrease by factor of 4.
69 (c) Energy received from the sun = 2 cal cm -2 min -1 = 8.4 J-cm -2 min -1
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Energy of one photon received fromsun, hc 6. 6 ´ 10-34 ´ 3 ´ 108 E= = l 5500 ´ 10-10 -19 = 3.6 ´ 10 J \ Number of photons reaching the earth per cm 2 per minute will be Energy received from sun n= Energy of one photon 8 .4 n= = 2.3 ´ 1019 3.6 ´ 10-19 hc 70 (a) Binding energy, W = - E l Here, l = 4.9 ´ 10-10 m, R1 = 1. 40 cm , R2 = 2. 02 cm, a = 1cm keV -1 For cloud chamber, the range-energy relation is R R = aE or E = a 140 . R …(i) \ E1 = 1 = = 1.40 keV a 1 2.02 R and E2 = 2 = = 2. 02 keV …(ii) a 1 Energy of the incident photon, hc 6. 63 ´ 10-34 ´ 3 ´ 108 J hn = = l 4 . 9 ´ 10-10 6.63 ´ 3 ´ 10-16 eV = . ´ 10-19 4.9 ´ 16 …(iii) = 2.54 keV From Einstein’s photoelectric equation, hn = W + E \ Binding energy, W = hn - E From Eqs. (i), (ii) and (iii), we get W 1 = 2.54 - 140 . = 1.14 keV and W 2 = 2.54 - 2.02 = 0.52 keV
71 (b) In a photoconductive cell, when monochromatic light is incident on the transparent metallic film, a force produced called the photoelectromotive, stimulates the emission of an electric current when photovoltaic action creates a potential difference between two points. The magnitude of this current depends upon the intensity of incident light. Hence, photo-electromotive force produced by monochromatic light is proportional to the intensity of the light falling on the cell. 72 (c) From photoelectric equation, hc E = hn = l 6.6 ´ 10-34 ´ 3 ´ 108 \ E= 5000 ´ 10-10 = 3.96 ´ 10-19 J
3. 96 ´ 10-19 = 2.48 eV 1. 6 ´ 10-19
Hence, EK = 2.48 - 190 . = 0.58 eV
Þ 16 - 4W = 5 - W ⇒ 11 = 3W 11 ~ 3.7 eV Þ W = = 3.67 eV = 3
73 (d) According to photoelectric equation,
78 (b) According to Planck’s quantisation
or
E=
…(i) EK = hn - hn 0 If the energy of photon (hn ) is less than the work function (hn 0 ) of metallic surface, then electrons will never be ejected from surface regardless of intensity of incident light. Also, from Eq. (i), we get When n = n 0 , Ek = 0 and for n > n 0 , Ek µ n \Graph (d) represents variation of EK with n.
74 (b) Threshold energy of A is EA = hn A = 6.6 ´ 10-34 ´ 1.8 ´ 1014 = 11.88 ´ 10-20 J =
11. 88 ´ 10-20 eV = 0.74 eV 1. 6 ´ 10-19
Similarly, EB = hn B / e = 0.91eV Since, the incident photons have energy greater than EA but less than EB . So, photoelectrons will be emitted from metal A only.
75 (a) The electromagnetic theory of light failed to explain photoelectric effect.
76 (c) According to photoelectric equation, hc - W0 l hc 0.5 e = - W0 Þ 6 ´ 10-7 h c W Þ 0.5 = ´ - 0 …(i) e 6 ´ 10-7 e Similarly, h c W 1.5 = ´ - 0 …(ii) -7 e 4 ´ 10 e eV =
From Eqs. (i) and (ii), we get h c æ 1 1ö 1 = ´ -7 ç - ÷ e 10 è 4 6 ø Þ
h 12 ´ 10-7 = 4 ´ 10-15 V-s = e 3 ´ 108
77 (a) Energy corresponding to 248 nm 1240 eV = 5 eV 248 Energy corresponding to 310 nm 1240 wavelength = eV = 4 eV 310 (KE )1 u12 4 5 eV - W Þ = = (KE )2 u22 1 4 eV - W wavelength =
law,
æ hc ö E = nhn = n ç ÷ èlø E æ n ö æ hc ö =ç ÷ç ÷ Þ t ètø è lø -34 8 æ n ö 6. 626 ´ 10 ´ 3 ´ 10 Þ10-7 = ç ÷ -10 ètø 5000 ´ 10
Þ
5000 ´ 10-10 ´ 10-7 n = t 6. 626 ´ 10-34 ´ 3 ´ 108 = 2.5 ´ 1011 s -1
79 (b) Work function of a metal is given by W = hn 0 = hc/ l 0 where, l 0 is the threshold wavelength. 1 or W 0 µ l0 W0 W0 l¢ l¢ = 0 or = 0 \ W ¢0 l 0 æ W0 ö l0 ç ÷ è 2 ø Þ l ¢0 = 2l 0
80 (b) A photocell employs photoelectric effect to convert change in the intensity of illumination into a change in photoelectric current. In other words, it converts light energy into electrical energy.
81 (a) There is no time lag between the instant, the photon of light falls on the metal surface and the instant a photoelectron is emitted from the metal surface. Hence, the photoelectric emission is an instantaneous process.
82 (c) In photoelectric effect, Einstein’s equation is given by Photon energy = KE of electron + work function i.e. hn = eVs + hn 0 where, Vs is stopping potential and n 0 is the threshold frequency. h …(i) \ Vs = (n - n 0 ) e Given, n 0 = 3. 3 ´ 1014 Hz, n = 8. 2 ´ 1014 Hz, h = 6. 6 ´ 10-34 J-s and e = 1. 6 ´ 10-19 C Substituting the values in Eq. (i), we get 6.6 ´ 10-34 ´ (8. 2 ´ 1014 - 3. 3 ´ 1014 ) Vs = 1. 6 ´ 10-19 » 2V
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DUAL NATURE OF MATTER AND RADIATION
83 (a) If kinetic energy of photoelectrons emitted from metal surface is EK and W is the minimum energy required to eject photoelectrons from the metal, then from Einstein’s photoelectric equation EK = hn - W hc Also, E = l where, h is Planck’s constant and c is speed of light and l is wavelength. Since, wavelength is reduced from 2300 Å to 1800 Å, energy increases, hence emission takes place.
84 (a) When light falls on a metallic surface, then it results ejection of photoelectron. In this process, conservation of energy hold. Thus, from law of conservation of energy, energy imparted by the photon = maximum kinetic energy of the emitted electron + work function of the metal or hn = (KE )max + f But f = hn 0 where, n 0 being threshold frequency. or (KE )max = hn - hn 0 Þ (KE )max µ n - n 0
85 (c) Specific charge of an electron, e = 1. 8 ´ 1011 C kg-1 m Maximum kinetic energy of 1 2 photoelectron, mvmax = eVs 2
where, Vs is the stopping potential. 2 mvmax v2 Þ Vs = = max 2e 2(e/m) =
88 (a) As per Einstein’s photoelectric equation, hn = f 0 + 1/ 2 mv 2
(1.2 ´ 106 )2 = 0.4 ´ 10 = 4 V 2 ´ 18 . ´ 1011
The intercept of KE-n graph on KE axis gives the value of work function. Hence, work function, W = 1. 5 eV
86 (d) Einstein’s photoelectric equation can be written as hf = k + f But, k = eVs , Vs being stopping potential …(i) \ hf = eVs + f So, hf1 = eV1 + f …(ii) and hf2 = eV2 + f …(iii) Subtracting Eq. (ii) from Eq. (iii), we get h( f1 - f2 ) = e(V1 - V2 ) or eV2 = eV1 - h( f1 - f2 ) h or V2 = V1 + ( f2 - f1 ) e 87 (d) Einstein’s photoelectric equation 1 can be written as mv 2 = hn - f 2 1 6 2 Þ m ´ (4 ´ 10 ) = 2hn 0 - hn 0 …(i) 2 1 and m ´ v 2 = 5hn 0 - hn 0…(ii) 2 Dividing Eq. (ii) by Eq. (i), we get v2 4 hn 0 = 6 2 hn 0 (4 ´ 10 ) Þ
v 2 = 4 ´ 16 ´ 1012
Þ
v 2 = 64 ´ 1012 v = 8 ´ 106 ms-1
89 (c) From Einstein’s photoelectric equation, we have EK = hn - W where, hn is energy of photon absorbed by the electron in the metal, W is the work function of the metal. Also, the potential at which the photoelectric current becomes zero, is called stopping potential or cut-off potential. Given, hn = 1. 8 eV, W = 1.2 eV \ EK = 1. 8 - 1.2 = 0.6 eV Thus, stopping potential, E 0. 6 ´ 1. 6 ´ 10-19 = 0.6 V V0 = K = e 1. 6 ´ 10-19
90 (b) The magnitude of the stopping potential is independent of the intensity of the incident radiation, irrespective of the change in the frequency of the incident radiation. Hence, V versus I curve is constant and correctly shown by graph (b).
91 (b) The graph between stopping potential and frequency is a straight line, so stopping potential and hence maximum kinetic energy of photoelectrons depends linearly on the frequency.
Topic 3 Dual Nature of Matter : de-Broglie Waves 2019 1 An electron is accelerated through a potential difference of 10000 V. Its de-Broglie wavelength is (nearly) ( Take, me = 9 ´ 10-31 kg ) [NEET (National)] (a) 12.2 ´ 10-12 m (c) 12.2 nm
(b) 12.2 ´ 10-14 m (d) 12.2 ´ 10-13 m
2 A proton and an a-particle are accelerated from rest to the same energy. The de-Broglie wavelengths l p and l a are in the ratio [NEET (Odisha)] (a) 2 : 1 (b) 1: 1 (c) 2 : 1 (d) 4 : 1
2018 3 The graph between the energy log E of an electron and its de-Broglie wavelength log l will be (a)
(b)
log λ
log λ
log E
(c)
log E
(d)
log λ
log E
[AIIMS]
log λ
log E
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2017 4 The de-Broglie wavelength of a neutron in thermal equilibrium with heavy water at a temperature T (kelvin) and mass m is [NEET] h h 2h 2h (a) (b) (c) (d) mkT 3mkT 3mkT mkT
5 The wavelength l of a photon and the de-Broglie wavelength of an electron have the same value. Find the ratio of energy of photon to the kinetic energy of electron in terms of mass m, speed of light c and Planck’s constant (h). [JIPMER]
(a) lmc / h
(b) hmc/ l
(c) 2hmc/ l
(d) 2lmc / h
2016 6 Electrons of mass m with de-Broglie wavelength l fall on the target in an X-ray tube. The cut-off wavelength [NEET] (l 0 ) of the emitted X-ray is 2h 2mcl2 (b) l 0 = (a) l 0 = mc h 2m2 c 2 l3 (d) l 0 = l (c) l 0 = h2
7 An electron of mass m and a photon have same energy E. The ratio of de-Broglie wavelengths associated with them is [NEET] 1/ 2 E æ ö (b) c( 2mE )1/ 2 (a) ç ÷ è 2m ø (c)
1 æ 2m ö ç ÷ cè E ø
1/ 2
(d)
1æ E ö ç ÷ c è 2m ø
1/ 2
2015 8 Which of the following figures represent the variation of particle momentum and the associated de-Broglie wavelength? [AIPMT] (a)
p
(b)
p
λ
λ p
(c)
(d) λ
p
λ
2014 9 If the kinetic energy of the particle is increased to 16 times its previous value, the percentage change in the de-Broglie wavelength of the particle is [CBSE AIPMT] (a) 25 (b) 75 (c) 60 (d) 50
10 Nuclear radii may be measured by scattering high energy electrons from nuclei. What is the de-Broglie wavelength for 200 MeV electrons? [BVP] (a) 8.28 Fm (b) 7.98 Fm (c) 6.45 Fm (d) 6.20 Fm
11 The de-Broglie wavelength of an electron is the same as that of a 50 keV X-ray photon. The ratio of the energy of the photon to the kinetic energy of the electron is (the energy equivalent of electron mass is 0.5 MeV) (a) 1 : 50 (b) 1 : 20 [WB JEE] (c) 20 : 1 (d) 50 : 1 12 What is the de-Broglie wavelength of the electron accelerated through a potential difference of 100 V? [KCET] (a) 12.27 Å (b) 1.227 Å (c) 0.1227 Å (d) 0.001227 Å 2012 13 If the momentum of an electron is changed by p, then the de-Broglie wavelength associated with it changes by 0.5%. The initial momentum of electron will be [CBSE AIPMT] (a) 200 p (b) 400 p (c) p/ 200 (d) 100 p 14 Photon and electron are given same energy (10- 20 J ) . Wavelength associated with photon and electron are l p [AIIMS] and l e , the correct statement will be le (a) l p > l e (b) l p < l e (c) l p = l e (d) =c lp 15 The de-Broglie wavelength of an electron moving with a velocity 1.5 ´ 108 ms -1 is equal to that of a photon. The ratio of the kinetic energy of the electron to the energy of the photon is [J&K CET] 1 1 (b) (c) 2 (d) 4 (a) 4 2 2011 16 Electrons used in an electron microscope are accelerated by a voltage of 25 kV. If the voltage is increased to 100 kV, then the de-Broglie wavelength associated with the electrons would [CBSE AIPMT] (a) decrease by 2 times (b) decrease by 4 times (c) increase by 4 times (d) increase by 2 times 17 If a proton and an electron have the same de-Broglie wavelength, then [Kerala CEE] (a) kinetic energy of electron < kinetic energy of proton (b) kinetic energy of electron = kinetic energy of proton (c) momentum of electron > momentum of proton (d) momentum of electron = momentum of proton (e) momentum of electron < momentum of proton 18 If the particles listed below all have the same kinetic energy, which one would possess the shortest de-Broglie wavelength? [J&K CET] (a) Deuteron (b) a-particle (c) Proton (d) Electron 19 The de-Broglie wavelength l of an electron accelerated through a potentialV (in volt) is [J&K CET] 1.227 0.1227 (a) nm (b) nm V V 0.01227 01227 . (c) nm (d) Å V V
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DUAL NATURE OF MATTER AND RADIATION
20 An electron and a proton are moving in the same direction with same kinetic energy. The ratio of the de-Broglie wavelength associated with these particles is [J&K CET] mp me (b) (a) (c) m p / me (d) m p me mp me
28 l e , l p and l a are the de-Broglie wavelength of electron, proton and a-particle. If all are accelerated by same potential, then [Kerala CEE] (a) l e < l p < l a (b) l e < l p > l a (c) l e > l p < l a (d) l e = l p > l a (e) l e > l p > l a
21 An electron of mass me and a proton of mass m p are moving with the same speed. The ratio of their de-Broglie wavelengths l e / l p is [KCET] 1 (a) 1 (b) 1836 (c) (d) 918 1836
29 The de-Broglie wavelength of a ball of mass 120 g, moving at a speed of 20 m/s is [Haryana PMT] (b) 2.8 ´ 10- 34 m (a) 3.5 ´ 10- 34 m (c) 1.2 ´ 10- 34 m (d) 2.1´ 10- 34 m
22 In Davisson and Germer experiment, the velocity of electrons emitted from the electron gun can be increased by (a) increasing the filament current [CBSE AIPMT] (b) decreasing the filament current (c) decreasing the potential difference between the anode and filament (d) increasing the potential difference between the anode and filament
30 The masses of two particles having same kinetic energies are in the ratio 1 : 2. Then, their de-Broglie wavelengths are in the ratio [J&K CET] (d) 3 : 1 (a) 2 : 1 (b) 1 : 2 (c) 2 : 1
2010 23 If K be the kinetic energy and m be the mass of a moving particle, then the de-Broglie wavelength of the particle is h 2h (a) l = (b) l = [Manipal] mK mK h h (d) l = (c) l = 2 mK 2mK
24 The de-Broglie wavelength of neutrons in thermal equilibrium is [Manipal] 30.8 3.08 (a) Å (b) Å T T 0.308 0.0308 Å (d) Å (c) T T 25 An electron and a photon possess the same de-Broglie wavelength. If E e and E p are the energies of electron and photon respectively and v and c are their respective E velocities, then e is equal to Ep [Manipal] v v v v (a) (b) (c) (d) c 2c 3c 4c 26 The idea of matter waves was given by (a) Davisson and Germer (b) de-Broglie (c) Einstein (d) Planck
[J & KCET]
27 An electron of mass m when accelerated through a potential differenceV has de-Broglie wavelength l. The de-Broglie wavelength associated with a proton of mass M accelerated through the same potential difference will be [AIIMS] m m M M (b) l (c) l (d) l (a) l M M m m
2009 31 Calculate the momentum and de-Broglie wavelength of electrons accelerated through a potential difference of 56 V. [BVP] (a) l = 0164 (b) . nm l = 1nm (c) l = 0.5 nm (d) l = 5 mm
32 Which of these particles (having the same kinetic energy) has the largest de-Broglie wavelength? [DUMET] (a) Electron (b) a-particle (c) Proton (d) Neutron 33 The de-Broglie wavelength of an electron having 80 eV of energy is nearly (1 eV = 1.6 ´ 10-19 J, mass of electron = 91 . ´ 10-31 kg, Planck’s constant = 6.6 ´ 10-34 J-s) (a) 150 Å (b) 0.15 Å [MGIMS] (c) 15 Å (d) 1.5 Å 34 The de-Broglie wavelength of a neutron at 927° C is l . What will be its wavelength at 27° C ? [BCECE] (a) l/ a (b) l (c) 2l (d) 4l
2008 35 A particle of mass 1 mg has the same wavelength as an
electron moving with a velocity of 3 ´ 106 ms -1 . The velocity of the particle is [CBSE AIPMT] (Take, mass of electron = 9.1 ´ 1031 kg) (a) 2.7 ´ 10-18 ms -1 (b) 9 ´ 10-2 ms -1 -31 -1 (c) 3 ´ 10 (d) 2.7 ´ 10-21 ms -1 ms
36 A proton accelerated through a potential V has de-Broglie wavelength l . Then, the de-Broglie wavelength of an a-particle, when accelerated through the same potentialV is [Kerala CEE]
l (a) 2 l (c) 2 2 l (e) 4
(b)
l
l (d) 8
2
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
37 The de-Broglie wavelength associated with a particle moving with momentum ( p ) and mass ( m ) is [J&K CET] 2 h h h h (a) (b) (c) 2 (d) 2 p mp p p 38 What should be the velocity of an electron, so that its momentum becomes equal to that of a photon of wavelength 5200 Å? [AMU] (b) 1000 ms -1 (a) 700 ms -1 (d) 2800 ms -1 (c) 1400 ms -1 39 If an electron and a proton have the same de-Broglie wavelength, then the kinetic energy of the electron is (a) zero [KCET] (b) less than that of a proton (c) more than that of a proton (d) equal to that of a proton 40 The wavelength l e of an electron and l p of a photon of same energy E are related by [NEET] (a) l2e µ l p (b) l e µ l p (d) 1/ l e µ l p (c) l e µ l p 41 An a-particle and a deuteron are moving with velocities v and 2v, respectively. What will be the ratio of their de-Broglie wavelengths? [Guj CET] (a) 1: 1 (b) 2 : 1 (c) 1: 2 (d) 2 : 1
2007 42 The uncertainty in the momentum of a particle is 10-30 kg - ms -1 . The minimum uncertainty in its position will be [UP CPMT] (a) 10-8 m (b) 10-12 m (c) 10-16 m (d) 10-4 m
43 We wish to see inside an atom. Assuming the atom to have a diameter of 100 pm, this means that one must be able to resolve a width of say 10 pm. If an electron microscope is used, the minimum electron energy required is about (a) 1.5 keV (b) 15 keV [UP CPMT] (c) 150 keV (d) 1.5 MeV 44 An electron and a proton are possessing same amount of kinetic energies. The de-Broglie wavelength is greater for (a) electron (b) proton [RPMT] (c) Both (a) and (b) (d) None of these 45 Davisson-Germer’s electron diffraction arrangement is as shown [AIIMS] Nickel target A LT
B Movable collector D
θ C
Vacuum chamber
Correct labelling is (a) A-electron source, B-metal crystal, C-reflector, D-detector (b) A-electron source, B-hollow tube, C-wall, D-reflector (c) A-electron gun, B-electron accelerator, C-detector, D- counter (d) A-electron gun, B-collimating and accelerating tube, C-metal target, D -movable collector
46 An electron, accelerated by a potential difference V, has de-Broglie wavelength l. If the electron is accelerated by a potential difference 4 V, its de-Broglie wavelength will be [AMU] l l (a) 2l (b) 4l (c) (d) 2 4 47 A material particle with a rest mass m0 is moving with speed of light c. The de-Broglie wavelength associated is given by [AMU] (b) m0 c / h (c) zero (d) infinite (a) h / m0 c 48 The de-Broglie wavelength of a proton (charge = 1. 6 ´ 10-19 C, mass = 1. 6 ´ 10-27 kg) accelerated through a potential difference of 1 kV is [KCET] -12 (a) 600 Å (b) 0. 9 ´ 10 m (c) 7 Å (d) 0. 9 nm 49 Which of the following has the longest de-Broglie wavelength, if they are moving with same velocity? (a) Neutron (b) Proton [Guj CET] (c) a-particle (d) b- particle
2006 50 If alpha, beta and gamma rays carry same momentum, which has the longest wavelength? (a) Alpha rays (b) Beta rays (c) Gamma rays (d) All have same wavelength
[AFMC]
51 The de-Broglie wavelengths of an electron, a-particle and a proton all having the same kinetic energy is respectively given as l e , l a and l p . Then, which of the following is true? [BHU] (a) l e < l p (b) l p < l a (c) l e > l a (d) l a < l p > l e 52 A particle of mass M at rest decays into two particles of masses m1 and m2 having non-zero velocities. The ratio of the de-Broglie wavelengths of the particles l 1 / l 2 is (a) m1 / m2 (b) m2 / m1 [AIIMS] (c) 1 (d) m2 / m1 53 The de-Broglie wavelength of an electron and the wavelength of a photon are the same. The ratio between the energy of that photon and the momentum of that electron is ( c = velocity of light, h = Planck’s constant) [EAMCET] (a) h (b) c (c) 1/ h (d) 1/ c
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DUAL NATURE OF MATTER AND RADIATION
2005 54 Assertion The energy ( E ) and momentum ( p ) of a photon are related by p = E / c. Reason The photon behaves like a particle. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
55 In Davisson-Germer experiment, the wavelength associated with nickel crystal is [J&K CET] (a) 1.66 Å
(b) 2Å
(c) 2.3 Å
(d) 3.86 Å
56 The dual nature of light is exhibited by [Punjab PMET] (a) diffraction (b) diffraction and reflection (c) refraction and interference (d) photoelectric effect 57 The energy that should be added to an electron to reduce its de-Broglie wavelength from 1 nm to 0.5 nm is [KCET] (a) four times the initial energy (b) equal to the initial energy (c) twice the initial energy (d) thrice the initial energy
Answers 1 11 21 31 41 51
(a) (c) (b) (a) (a) (c)
(a) (b) (d) (a) (d) (c)
2 12 22 32 42 52
3 13 23 33 43 53
(c) (a) (d) (a) (b) (b)
4 14 24 34 44 54
(b) (a) (a) (c) (a) (a)
5 15 25 35 45 55
(d) (a) (b) (a) (d) (a)
6 16 26 36 46 56
(a) (a) (b) (c) (c) (d)
7 17 27 37 47 57
(d) (d) (b) (a) (c) (d)
8 18 28 38 48
(b) (b) (e) (c) (b)
9 19 29 39 49
(b) (a) (b) (c) (d)
10 20 30 40 50
(d) (c) (c) (a) (d)
Explanations 1 (a) Given, potential difference, V = 10000 V If electron is accelerated through a potential of V volt, then the wavelength associated with it is given by h … (i) l= 2eVme
h 2mKE For proton and a-particle, the wavelengths are respectively given as h h and l a = lp = 2maKE a 2mpKE p l=
Þ
lp
=
2maKE a
…(i)
where, h = Planck’s constant = 6.63 ´ 10-34 J-s,
\
e = electronic charge = 16 . ´ 10-19 C
Here, KE a = KE p and ma = 4 mp Substituting these above mentioned relations in Eq. (i), we get lp 4 mp 2 = or l p : l a = 2 : 1 Þ = 1 la mp
and me = mass of electron = 9 ´ 10-31 kg Substituting these values in Eq. (i), we get 12.27 12.27 Å= l= ´ 10-10 V 10000 -10
=
12.27 ´ 10 100
la
3 (c) As we know that, wavelength of a particle,
associated with a charged particle is given by h l= p where, h = planck’s constant and p = momentum = 2mKE (here, KE is the kinetic energy of the charged particle).
h h 1 = × 2 mE 2m E æ h 1 ö ÷ log l = logç × è 2m E ø h 1 log l = log + log 1/ 2 2m E l=
= 12.2 ´ 10-12 m
2 (a) The de-Broglie wavelength
2mpKE p
Þ Þ
Þ Þ
æ h ö 1 ÷ - log E log l = log ç è 2m ø 2 1 h log l = - log E + log 2 2m
Comparing the above equation with the equation of straight line, i.e. y = mx + c. We can conclude that, logl varies linearly with logE, with slope -1/ 2. It is correctly shown in graph (c).
4 (b) de-Broglie wavelength associated with a moving particle can be given as h l= p At thermal equilibrium, temperature of neutron and heavy water will be same. This common temperature is given as, T. Also, we know that, kinetic energy of a particle, p2 KE = 2m where, p = momentum of the particle and m = mass of the particle. Kinetic energy of the neutron at T is 3 KE = kT 2 \de-Broglie wavelength of the neutron, h h l= = p 2m(KE ) h h = = 3mkT 2m ´ 3 / 2 kT
5 (d) The de-Broglie wavelength of an electron, l=
h h Þ v= mv ml
…(i)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Energy of photon, hc (since, l is same) … (ii) Ep = l Kinetic energy of photon to kinetic energy of electron hc Ep 2hc l = = = Ee æ 1 ö 2 lmv 2 ç ÷ mv è 2ø
Now, dividing Eq. (iii) by Eq. (iv), we get le h E = × lp 2mE hc Þ
by l=
(h / l)2 =
h2 = 2m 2ml 2 Now, maximum energy of photon can be given by hc h2 = E= l 0 2ml 2
l1 = l2 =
pl = h
7 (d) Since, it is given that electron has mass m.
…(i)
where, h = Planck’s constant and p = linear momentum of electron. As kinetic energy of electron, p2 …(ii) Þ p = 2mE 2m From Eqs. (i) and (ii), we get h …(iii) le = 2mE Energy of a photon can be given as hc E = hn Þ E = lp hc …(iv) Þ lp = E Here, l p = de-Broglie’s wavelength of photon.
h = p
h 2mK
given to photon h ; le = 2M eE E = energy given to electron lp 2M e =c > 1 Þ lp > le Þ le E 1 2
15 (a) We know that, K e = mv 2 Also,
10 (d) de-Broglie wavelength, hc 1240 = = 6.20 ´ 10- 6 nm E 200 ´ 106 = 6.20 Fm h (c) de-Broglie wavelength, l = 2mK The kinetic energy of the electron, h2 ...(i) K electron = 2m × l2
\
l=
where, h = Planck’s constant and l = wavelength. The photon energy, Ephoton = ch/l ...(ii) From Eqs. (i) and (ii), we get Ephoton ch/ l hc × l2 2m = 2 = 2 K electron h / 2m × l h2 × l 2mlc = h 5 where, E = m = 0.5 MeV = 5 ´ 10 eV h = 50 ´ 103 eV cl Ep 2 ´ 5 ´ 105 2E = 20 = = K e h / lc 50 ´ 103
12 (b) de-Broglie wavelength of an electron is given by h h 12.27 l= = = Å mv 2meV V where, h = Planck’s constant, m = mass of electron, e = electronic charge
100 p Þ pi = 200 p 0.5
14 (a) We have, lp = hc/ E ; E = energy
…(i)
l h h = = 1 …(ii) 4 4 2mk 2m 16K
= 20 : 1
0.5 p Dl Dp = Þ = 100 pi l p pi =
l 2 = 25% of l 1 There is 75% change in the wavelength.
11
hc ´ 2l 2 . m 2mcl 2 = h h2
Here,
9 (b) For de-Broglie wavelength,
incoming electron losses its complete energy in collision. This energy appears in the form of X-rays. Given, mass of electrons = m de-Broglie wavelength = l So, kinetic energy of electron = p2 / 2m
E=
h Þ p
This equation is in the form of yx = c, which is the equation of a rectangular hyperbola. Hence, the graph given in option (b) is the correct one.
6 (a) Cut-off wavelength occurs, when
de-Broglie’s wavelength for an electron will be given as h le = p
13
8 (b) The de-Broglie wavelength is given
Substituting the value of v from Eq. (i), we get Ep 2hc 2lmc = = 2 Ee h æ h ö lm ç ÷ è ml ø
Þ l0 =
E le 1 = × l p c 2m
and V = potential difference with which electron is accelerated. 12.27 12.27 l= = = 1.227 Å 10 100 h (a) We know that, l = p
h h m= Þ mv lv 1 æ h ö 2 vh Ke = ç ÷ × v = 2 è lv ø 2l l=
Similarly, K p = hc / l 1.5 ´ 108 1 Ke v = = = \ 8 4 K p 2c 2 ´ 3 ´ 10
16 (a) We have,
l=
12.27 Å V
\
l1 V2 = l2 V1
Þ
l2 = l1
V1 V2
Þ
l2 = l1
25 100
Þ
l2 = l1
1 l1 = 4 2
17 (d) If a proton and electron have the
18
same de-Broglie wavelength, then momentum of electron equals to momentum of proton as, de-Broglie wavelength µ1/momentum. 1 (b) KE = mv 2 (same for all particles) 2 The de-Broglie wavelength, h h l= = p 2m (KE ) Þ l µ1/ m Here, mass of a-particle is highest, hence it has lowest wavelength.
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DUAL NATURE OF MATTER AND RADIATION
19 (a) The de-Broglie wavelength of an electron accelerated through potential V is h 1227 . nm l= = 2meVe V 12.27 Å = V
20 (c) de-Broglie wavelength, le = Þ
le = lp
h and l p = 2meE
h 2mp E
mp
3.08 30.8 Å ´ 10-9 = T T
25 (b) de-Broglie wavelength, l=
h For electron, l e = mev h For photon, l p = mp v
h mv
1 2E But Ee = mv 2 or m = 2e 2 v From Eq. (i), we get 2 Ep2 4 Ee2 Ep é 2E ù = 2 2 ê 2e ú Ee = 2 or 2 v c c ë v û
h 2mE l 1 lµ Þ 1= l2 m l=
23 (d) Given, K = kinetic energy, m = mass 1 Then, …(i) K = mv 2 2 h …(ii) But we know that, l = mv 2K Now, from Eq. (i), v 2 = m Þ v = 2K / m Putting this in Eq. (ii), we get h = 2mK
24 (a) de-Broglie wavelength, h 3mkT where, T = temperature and k = Boltzmann constant 6.62 ´ 10-34 = 3 ´ 1.67 ´ 10-27 ´ 1.38 ´ 10-23 T
m2 m1
M m
So,
l = l2
\
æ mö l2 = l ç ÷ èMø
= 0.1836 ´ 10 = 1836 experiment, the velocity of electron emitted from the electron gun can be increased by increasing the potential difference between the anode and filament.
Ee v = Ep 2c
de-Broglie.
4
22 (d) In the Davisson and Germer
or
26 (b) Idea of matter waves was given by
Þ
mp l e h/ mev l = Þ e = l p h/ mp v l p me
v1 v2 = l1 l2
Þ
l 1 v1 2 = 2 :1 = = 1 l 2 v2
31 (a) Given, potential difference, V = 56 V de-Broglie wavelength of electron, 12.27 12.27 Å= l= = 0.164 ´ 10- 9 m V 56 = 0.164 nm
32 (a) de-Broglie wavelength, h 2mE 1 E is same for all, so l µ m l=
Hence, de-Broglie wavelength will be maximum for particle with lesser mass. Mass of the given particles in increasing order are given as me < mp < mn < ma Thus, de-Broglie wavelength will be maximum for electron.
h = p
Now, de-Broglie wavelength h hc l= = mv E 6.6 ´ 10- 34 ´ 3 ´ 108 = 80 ´ 1.6 ´ 10- 19 19.82 ´ 10- 7 » 0.15 ´ 10- 7 128 = 150 ´ 10- 10 = 150 Å =
Since, qe me < qp mp < qa ma So, l e > l p > l a h 6.6 ´ 10- 34 = mv 120 ´ 10- 3 ´ 20
Þ
= 2.8 ´ 10- 34 m 1 2
l1 l T = 2Þ 1= l2 l2 T1 =
30 (c) Given, (KE)1 = (KE)2 = mv 2 …(i) Þ
m1v12 = m2v22
Þ
m1 æ v2 ö =ç ÷ m2 è v1 ø
Þ
v1 = v2
2
m2 v1 , = 2 m1 v2
h h Þ mv = l mv Putting this in Eq. (i), we get 1 h 1 h v1 = v2 2 l1 2 l2
We know that, l =
1 T 273 + 27 273 + 927
34 (c) de-Broglie wavelength, l µ
29 (b) de-Broglie wavelength, l=
h = mv
= 80 ´ 1.6 ´ 10- 19 J = hc / l
h h = 2mk 2mqV0 Here, K = qV0, where q = charge of particle and V0 = potential. 1 Þ lµ qm l=
Þ
33 (a) Given, E = 80 eV
28 (e) de-Broglie wavelength for particle,
l=
6.62 ´ 10-34 2.15 ´ 10-25 T
Ee2 v2 = 2 2 Ep 4 c
27 (b) As,
l e 1.67 ´ 10-27 = lp 9.1 ´ 10-31
=
Ep2 h hc or 2mEe = 2 …(i) = 2mEe Ep c
or
me
21 (b) de-Broglie wavelength, l =
Þ
=
300 1 or l 2 = 2l = 1200 2
35 (a) Wavelength of an electron is given by le =
h , where h is Planck’s constant. pe
But l = l e So, p = pe or mv = meve mv or v= e e m Putting the under given data, me = 91 . ´ 10-31 kg, ve = 3 ´ 106 ms-1,
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
v=
\
Þ l2e =
. ´ 10-31 ´ 3 ´ 106 91 1 ´ 10-6
given by h = l (given) 2mqV
=
h 2(4 m) (2q)V
h l = 8 (2mqV ) 2 2
37 (a) de-Broglie wavelength associated with a moving particle, h h or l = l= mv p where, p is momentum of the particle. h 38 (c) Momentum, p = mv = l h v= Þ ml 6.62 ´ 10-34 \ v= 9.1 ´ 10-31 ´ 5.2 ´ 10-7 6.62 ´ 104 9.1 ´ 5.2
v=
Þ
v = 1.4 ´ 103 ms-1
Þ
v = 1400 ms-1
h h = mv 2mK h2 Þ K = 2ml2 As, l is same for both electron and proton. 1 So, K µ m Hence, kinetic energy will be maximum for particle with lesser mass, i.e. electron.
(Q mD = 2mP ) On dividing Eq. (ii) by Eq. (iii), we get h 4 vm 1 la p = = h 1 lD 4 vmp
h 2mE
…(i)
and photon, …(ii)
Putting the value of E in Eq. (i), we get Þ le
2
Q
\ hc hc or E = E lp 2
2
44 (a) According to de-Broglie hypothesis, wavelength, l = h / p where, h is Planck’s constant. h p2 Also, Þ l= E= 2m 2mE
2
h lp h h = = = 2mE 2m(hc/ l p ) (2m hc)
l µ 1/ m
Þ
Mass of electron is 91 . ´ 10-31 kg and of -27 proton is 1. 6 ´ 10 kg, hence mass of electron is less than that of proton, so electron will have greater wavelength.
45 (d)
_
+
HT
Collimating and accelerating tube Nickel target, i.e. metal target
la : lD = 1 : 1
the simultaneous measurement of position and momentum, energy and time, angular momentum and angular displacement is of the order of h (or h). h where, h= 2p \ Dp × Dx ³ h where, Dp is uncertainty in the measurement of momentum of particle. The minimum uncertainty in position of particle will be Dx = h / Dp
40 (a) Wavelength of electron,
lp =
= 15 keV
42 (d) The product of uncertainties in
39 (c) Given, l =
le =
= 7.25 ´ 107 ms-1 1 Energy of electron, E = mv 2 2 . ´10-31 ´ (7.25´107 )2 1 91 = ´ 2 1.6 ´ 10-19
(Q ma = 4 mp ) where, mp is the mass of proton and the de-Broglie wavelength for deuteron, h …(iii) lD = 2mp ´ 2 v
Þ
Þ
\
The velocity of the deuteron (1 D2 ) = 2v We know that, the de-Broglie wavelength, …(i) l = h/ mv So, the de-Broglie wavelength for a-particle h …(ii) la = 4 mp ´ v
h = 6. 6 ´ 10-34 J-s 6. 6 ´ 10-34 v = h / ml = . ´ 10-31 ´ 10-11 91
and
[nucleus of 2 He4] = v
36 (c) de-Broglie wavelength of proton
So, for a-particle, h la = = 2ma qaV
2mc
m = 91 . ´ 10-31 kg,
Þ l2e µ l p
41 (a) Given, the velocity of a-particle
= 2.7 ´ 10-18 ms-1
lp =
hl p
A
F
Electron beam θ
Electron gun
LT
Diffracted electron beam
Movable collector To galvanometer
46 (c) From the relation, h 2meV So, when V becomes 4V , then h l¢ = 2me (4V ) l=
Dp = 10-30 kg-ms -1,
Þ
l¢ =
h = 1.03 ´ 10–34 1. 034 ´ 10-34 » 10-4 m Dx = 10-30
h 2 2 meV
Þ
l¢ =
l 2
47 (c) l =
h mv
43 (b) From de-Broglie equation, we have l=
h h = p mv
Given, l = 10 pm = 10-11 m,
Vacuum chamber
m = 1 mg = 1 ´ 10-6 kg
where, m = As
m0 1 - v 2 / c2
v = c, then
,
…(i)
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DUAL NATURE OF MATTER AND RADIATION
Þ
m0
m=
= 2
c 1- 2 c Þ m = ¥, h Hence, l = = 0 ¥
1 m 1 Therefore, l e µ me 1 la µ ma 1 and lp µ mp
m0 m = 0 0 1-1
or
48 (b) According to de-Broglie hypothesis, h l= = p
h = 2mE
\
6. 6 ´ 10-34
l=
h 2mqV
As we know that, me < mp < ma \ le > lp > la or le > la or lp > la or le > lp
-27
2 ´ (1. 6 ´ 10 ) (1. 6 ´ 10-19 ) ´ 1000 -34
=
6. 6 ´ 10 = 0. 9 ´ 10-12 m 7.16 ´ 10-22
52 (c) From law of conservation of momentum, p1 = p2 ( in opposite directions) Now, de-Broglie wavelength is given by h l = , where h = Planck’s constant. p
49 (d) According to de-Broglie hypothesis, the wavelength of the wave associated with particle moving with velocity v is given by l = h / mv Since, v remains the same, therefore 1 lµ m As ma > mn > mp > m b \ l a < l n < l p < lb Therefore, b- particle has longest wavelength. Since, it has minimum mass.
50 (d) We know that, l = h / p Given, pa = pb = pg So, all have same wavelength. h mv
Since, magnitude of momentum (p) of both the particles is equal, therefore l1 = l2 or l 1/ l 2 = 1
53
55 (a) For the nickel crystal, the interatomic separation is d = 0.91 Å According to Bragg’s law, for first order diffraction maxima (n = 1) , we have 2 d sin q = 1 ´ l \ l = 2 ´ 0.91 ´ sin 65° = 165 . Å
56 (d) The dual nature of light, i.e. both particle and wave nature is exhibited by photoelectric effect.
57 (d) de-Broglie wavelength, l=
h 2mE
\
l1 = l2
E2 E1
Given, l e = l p h hc = Þ mv Ep
Þ
1 ´ 10-9 = 0.5 ´ 10-9
E2 E1
Þ
2=
\
E2 = 4 E1
or …(i)
de-Broglie, …(i) i.e. p = h/ l But photon moves in the form of energy packet called quanta and behaves as a particle whose energy is given by h E hc …(ii) or = E= l c l Thus, p = E / c [from Eqs. (i) and (ii)]
hc h (b) l e = and l p = Ep mv
Þ
51 (c) We know that, l=
54 (a) Momentum of photon, according to
lµ
h hc = pe Ep Ep / pe = c
[Q pe = mv]
E2 E Þ 2 =4 E1 E1
\ Energy to be added = E2 - E1 = 4 E1 - E1 = 3E1
26 Atoms and Nuclei Quick Review Dalton’s Atomic Theory All elements are consists of very small invisible particles, called atoms. Atoms of same elements are exactly same and atoms of different elements are different.
Thomson’s Atomic Model Every atom is uniformly positive charged sphere of radius of the order of 10-10 m, in which entire mass is uniformly distributed and negative charged electrons are embedded randomly. The atom as a whole is neutral.
Rutherford a-particle Scattering Experiment According to this experiment, following observations and conclusions were made (i) Most a-particles passes straight without deflection, while a few deflected at small angles and a very few return back. (ii) Number of a-particles scattered through an æq ö angle q varies inversely as sin 4 ç ÷. è 2ø (iii) The positively charged nucleus concentrated at centre has size of order of 10-15 m and is about 10-12 of the total volume of atom. (iv) The minimum distance from the nucleus upto which the a-particles approaches, i.e.
distance of closest approach of a-particle is 4kZe 2 expressed as r0 = mv 2 where, m and v is the mass and velocity of 1 = 9 ´ 109 Nm 2 C-2 , a-particle and k = 4pe 0 respectively. (v) Perpendicular distance of the velocity vector of a-particle from the central line of the nucleus of atom, i.e. the impact parameter is given mathematically as æq ö kZe 2 cot ç ÷ è 2ø b= KE Note
Smaller the impact parameter (b ), greater the scattering angle ( q) and kinetic energy (KE) of a-particle.
(vi) Force between a-particle and nucleus is given by 1 2Ze 2 F= 4 pe 0 r 2
Limitations of Rutherford ’s Atomic Model (i) About the Stability of Atom According to Maxwell’s electromagnetic wave theory, electron should emit energy in the form of electromagnetic wave during its orbital motion. Therefore, orbit radius of electron will decrease gradually and ultimately it will fall in the nucleus. (ii) About the Line Spectrum Rutherford atomic model cannot explain atomic line spectrum.
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ATOMS AND NUCLEI
• When an electron of an atom jumps from some ground state
Bohr’s model of atom was based on the following three postulates (i) Electrons move around nucleus in certain circular stable orbits. (ii) Electrons can revolve around in only those orbits in which their angular momentum ( mvr ) is an h integral multiple of . 2p nh Thus, mvr = 2p where, h = Planck’s constant and n = principal quantum number (1, 2, 3, …). (iii) When atom receives some energy from outside, then one or more of its outer electron leaves its orbit and move to higher orbit, i.e. it is in excited state. Note
When electron returns back to its initial state from higher orbit, it radiates energy in form of electromagnetic wave of frequency is given by E - E1 n= 2 h
( n i ) to its excited state ( n f ), then the energy of photon emitted is given by 1ù hc Z 2 me 4 é 1 DE = = ê 2 - 2ú 2 2 l 8e 0 h êë n f n i úû • The wave number, i.e. reciprocal of wavelength is expressed as é 1 1 ù 1 n = = RZ 2 ê 2 - 2 ú l êë n f n i úû • In case of hydrogen, the emission spectrum obtained for
different energy level contains five series as shown below n=∞ n=7 n=6
0 – 0.28 – 0.38
Pfund
– 0.54
E (eV)
Bohr’s Atomic Model
Brackett
– 0.85
Paschen
–1.51 Balmer
Lyman
–13.60
Orbital radius Orbital speed
Time period Kinetic energy Potential energy Total energy Ionisation energy
Ionisation potential
n2h2e 0 rn = pmZe2
For Hydrogen Like Atom
Ze2 1 × 2ne 0 n
vn = 2.2 ´ 106
Tn =
4 e 30n3h3 mZ 2e4
Tn = 1.52 ´ 10-6
RhcZ 2 (KE)n = n2 (PE)n = En =
-2RhcZ 2 n2
- RhcZ 2 n2
Eion = E¥ - En RhcZ 2 = n2 Vion =
RhcZ 2 en2
Note Rhc = 1Rydberg = 13.6 eV.
Hydrogen Spectrum
Z ms-1 n n3 s Z2
13.6Z 2 (KE)n = eV n2 (PE)n = En =
n=1 Ultraviolet
• The wavelength or wave number of lines of these series is
n2 rn = 0.53 Å Z
vn =
n=2
Visible light
Bohr’s atomic model as given in the table below Formula
n=3
Infrared
–3.40
• There are some characteristics associated with
Characteristics
n=5 n=4
-13.6Z 2 eV n2
-13.6Z 2 eV n2
Eion =
13.6Z 2 eV n2
Vion =
13.6Z 2 V n2
obtained as (i) For Lyman series, n f = 1 and n i = 2,3,4…… . (ii) For Balmer series, n f = 2 and n i = 3,4,5…… . (iii) For Paschen series, n f = 3 and n i = 4,5,6…… . (iv) For Brackett series, n f = 4 and n i = 5,6,7…… . (v) For Pfund series, n f = 5 and n i = 6,7,8…… .
Note To calculate the series limit of a series, we use n i = ¥.
The lines of Balmer series are found in the visible part of the spectrum and other series in invisible parts. Lyman series is found in ultraviolet region and Paschen, Brackett and Pfund series in infrared region.
Limitations of Bohr’s Model The limitations of Bohr’s model are as follows (i) This model is applicable only to a simple atom like hydrogen having Z = 1. This theory fails, if Z > 1. (ii) It does not explain the fine structure of spectral lines in H-atom. (iii) This model does not explain why orbits of electrons are taken as circular whereas elliptical orbits are also possible.
Nucleus
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The entire positive charge and nearly the entire mass of atom is concentrate in a very small space called nucleus of an atom. • Nucleus is composed of two type of particles; positively charged particle protons and neutral particle neutrons. • Radius of a nucleus is expressed as R = R 0 A 1/ 3 ,where A is mass number and R 0 = 12 . ´ 10-15 m (range of nuclear size).
This binding energy is expressed in joule, if Dm is measured in kg. If Dm is measured in amu, then binding energy E b = Dm amu = [{Zm p + ( A - Z )mn } - m N ] amu E b = Dm ´ 931MeV
Binding Energy Curve It is the graph between binding energy per nucleon and total number of nucleons (i.e. mass number A).
present inside while the atomic mass is equal to the total number of neutrons and protons. • Isotopes are the nuclei having same atomic number but different mass number, e.g. 1 H1 , 1 H2 and 1 H3 . • Isobars are the nuclei having same mass number but
different atomic number, e.g. 1 H3 and 2 He 3 .
• Isotones are nuclei having different atomic number and
masses but same number of neutrons, e.g. 1 H3 and 2 He
4
.
Nuclear Density Density of nucleus is constant and independent of A for all nuclei. It is given by 3m ~ r= - 2.3 ´ 1017 kgm -3 4pR 03
Mass Defect Difference between the sum of the masses of the nucleons constituting a nucleus and the rest mass of nucleus is called mass defect ( Dm ). It is expressed as Dm = Zm proton + ( A - Z )m neutrons - m nucleus 1 atomic mass unit (amu) = 931.5 MeV m- A , where m is actual • Packing fraction is given as A isotopic mass.
Einstein’s Mass-Energy Relation According to Einstein’s mass-energy relation, the equation is expressed as E = Dmc 2 where, c = speed of light.
Binding Energy The binding energy of a nucleus may be defined as the energy equivalent to the mass defect of the nucleus. If Dm is mass defect, then according to Einstein’s mass-energy relation Binding energy = Dmc 2 = [{Zm p + ( A - Z )mn } - m N ] × c 2
Binding energy per nucleon (MeV) (Eb)
• Atomic number is equal to the number of protons
10 8
16O 32S 12C
4He
6
56Fe
100Mo
127I
184W
197Au
238U
18O 14N
6Li
4 3H
2
2H
0
0
50
100 150 Mass number (A)
200
250
Some features of this curve are given below (i) The curve has almost a flat maximum roughly from A = 50 to A = 80 corresponding to an average BE/nucleon of about 8.5 MeV. So, the nuclei having mass number between 50 to 80 are most stable. Iron (Fe 56 , i.e. A = 56), having a BE/nucleon of about 8.8 MeV has maximum stability. (ii) For nuclei having mass number more than 80, the average binding energy per nucleon decreases slowly and drop to about 7.6 MeV for Uranium ( A = 238). The lower value of binding energy per nucleon fails to overcome the repulsion among protons in nuclei having large number of protons, i.e. the nuclei of heavier atoms beyond 83 Bi 209 are radioactive. (iii) For nuclei having mass number below 20, it decreases sharply, e.g. for heavy hydrogen ( 1 H 2 ), it is only about 1.1 MeV. This shows that the nuclei having mass number below 20 are comparatively less stable. (iv) Below A = 50, the curve does not fall continuously, but has subsidiary peaks at 8 O16 , 6 C12 and 2 He 4 . This shows that these (even-even) nuclei are more stable than their immediate neighbours.
Nuclear Force and Nuclear Stability
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ATOMS AND NUCLEI
Nuclear Force The forces that holds the nucleons together inside the nucleus of an atom are called nuclear forces. Some important properties of nuclear forces are given below (i) Nuclear forces are charge independent. (ii) Nuclear forces are short range forces. These do not exist at large distances greater than 10-15 m. (iii) These are attractive force and cause stability of the nucleus. (iv) Nuclear forces are non-central force. (v) Nuclear forces are the strongest forces in nature. (vi) Nuclear forces depends on the direction of the spins of the nucleons. The force is stronger, if the spin of nucleons is parallel and is weak, if it is anti-parallel. (vii) Electrical and gravitational forces follows inverse square law (i.e. F µ 1/ r 2 ), but nuclear forces are complicated in nature and does not follow it.
Nuclear Stability
Number of neutrons (N)
The stability of a nucleus is determined by the value of its binding energy per nucleon. Higher the binding energy of nucleon, nucleus is more stable. The stability of nucleus is also determined by its neutron to proton ratio. A plot of number of neutrons and number of protons is shown in the figure below. In the figure, the solid line shows the nuclei with equal number of protons and neutrons ( N = Z ). Only light nuclei are on this line, i.e. they are stable if they contain approximately same number of protons and neutrons. 140 130 120 110 100 90 80 70 60 50 40 30 20 10 0
N=Z Valley of stability
Radioactivity • It is the phenomenon of spontaneous emission of
radiations by nucleus of some elements. Generally, three types of emission are emitted namely a , b and g-radiations. Few properties of these radiations are listed below in the tabular form below S.No.
a-particle
Property
b-particle
g-rays
(i)
Nature
Helium nucleus Fast moving electrons
Electromagnetic waves
(ii)
Charge
+ 2e
zero
(iii)
Rest mass
–e
6.67 ´ 10
-27
kg
7
9.1 ´ 10
-31
kg
zero
(iv)
Speed
1.4 ´ 10 to 2.2 ´ 107 ms -1
1 to 99% of c
c = 3 ´ 108 ms -1
(v)
Ionising power
104
102
1
(vi)
Penetrating 1 power
102
104
• Radioactive nucleus decays into another nucleus by
emission of these particles known as radioactive decay. The reaction of the three types of decays are as follows (i) a-decay A nucleus emitting an alpha particle loses two protons and two neutrons. Therefore, the atomic number Z decreases by 2, the mass number A decreases by 4 and the neutron number N decreases by 2. The decay can be written as A = Z - 2Y A - 4 + 2 He 4 Z X (ii) b-decay Beta decay involves the emission of electrons or positron. A positron is a form of anti-matter, which has a charge equal to +e and a mass equal to that of electron. The electrons and positrons emitted in b-decay do not exist inside the nucleus. They are created at the time of emission. It is further of three types which are as follows • b -decay A parent nucleus with atomic number Z
0 10 20 30 40 50 60 70 80 90 Number of protons (Z)
Heavy nuclei are stable only when they have more neutrons than protons. The long narrow region shown in the figure, which contains the cluster of short lines representing stable nuclei is referred to as the valley of stability.
and mass number A decays by b – emission into a daughter nuclei with atomic number Z + 1and the same mass number A. bZ
X
A
¾®
Z +1 Y
A
+ e- + n
+ + • b -decay Positron ( e ) emission from a nucleus
decreases the atomic number Z by 1 while keeping the same mass number A.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
b+ Z
X
A
¾®
Z - 1Y
A
+ e+ + n
• Electron Capture This occurs when a parent
nucleus captures one of its own orbital electrons and emits a neutrino. X A + e –1 ¾® Z - 1Y A + n Z
where, n = neutrino and n = anti-neutrino. (iii) g-decay These rays are emitted when a nucleus in excited state by radioactive transformation decays to ground state.
Law of Radioactive Decay • According to the law of radioactive decay, the number of
nuclei present after time t is given by N = N 0 e - lt , where N 0 = number of nuclei present at t = 0 and l = decay constant. • Number of decayed nuclei after time t, N 0 - N = N 0 (1 - e - lt )
Rate of decay of radioactive substance is called activity of the substance. It is given as R = - dN / dt = R 0 e - lt Unit of activity, 1 Bq = 1 decay/s, 1 Ci = 3.7 ´ 1010 Bq and 1 Rd = 106 Bq.
Half-Life and Mean Life • Half-life The time interval in which the mass of a
radioactive substance or the number of its atom, is reduced to half its initial value is called half-life of that substance. 0.6931 T1/ 2 = l • After n half-life, the number of nuclei left undecayed is given as t = nT1/ 2 , n
æ 1ö æ 1ö N = N 0 ç ÷ and R = R 0 ç ÷ . è 2ø è 2ø • Mean life The average of the lives of all the nuclei in a
radioactive substance is called the mean life or average life of that substance. It is denoted by t. T t = 1/ 2 = 1443 T1/ 2 . 0.6931
Nuclear Reaction
X
+
a
¾®
c
¾®
(parent nucleus) (incident particle)
(compound nucleus)
Y
+
(product nucleus)
b
+ Q
(daughter nucleus)
(energy)
All nuclear reactions obeys basic conservation laws that includes conservation of mass number, electric charge, linear & angular momentum and total energy. Q-value means the difference between the rest mass energy of the initial constituents and that of the final constituents of a nuclear reaction.
Nuclear Energy Nuclear energy is the energy released during a nuclear reaction and can be obtained through nuclear fission and fusion.
Nuclear Fission
Activity of Radioactive Substance
n
The process by which the identity of a nucleus is changed when it is bombarded by an energetic particle is called nuclear reaction. Its general expression is
• It is the process of splitting of heavy nucleus into lighter
nucleus of comparable masses with liberation of energy. It can lead to chain reactions under favourable conditions. • Reproduction factor ( R ) of chain reaction is given as Rate of production of neutrons R= Rate of loss of neutrons If R = 1, the reaction is steady, R > 1, the reaction grows faster and R < 1, the reaction comes to halt. • Nuclear reactor is a device which uses nuclear fission in sustained and controlled manner to generated energy. Following are the few important terms related to it (i) Fissionable material or fuel commonly used in a reactor are uranium isotope ( U235 ), thorium isotope ( Th 232 ) and plutonium isotopes ( Pu 239 , Pu 240 and Pu 241 ). (ii) Moderator which is used to slow down the fast moving neutrons, e.g. graphite and heavy water. (iii) Control rods (cadmium rods) are inserted to absorb the neutrons. (iv) Coolant is used to remove heat from the core of the reactor, e.g. ordinary water under high pressure. Atom bomb has an increasing uncontrolled chain • reaction occuring for a short time.
Nuclear Fusion
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ATOMS AND NUCLEI
• It is the process of combining of two light nuclei to form a
heavy nuclei. • In this process, mass of single nucleus so formed is less than the sum of the masses of parent nuclei and this difference in mass, result in release of tremendous amount of energy. • It is also known as thermonuclear reaction as it is only carried at high pressure and temperature of order 107 K to 108 K. • Hydrogen bomb is based on the fusion process.
Moseley’s Law According to Moseley’s law, the frequency of characteristic X-ray emitted is given by n = a( Z - b ) where, a = proportionality constant and b = screening constant.
ν
X-rays
Kβ
• These are the electromagnetic waves of high penetration
Kα
power with wavelength range of 0.1 Å to 100 Å.
b
• X-rays are classified as : continuous and characteristics,
while the former depends on the accelerating voltage only and the latter depends on the target used. • The minimum wavelength of emitted X-ray, when an electron incident through a potential V on the target is given by 12375 hc 1240 Å. nm or l min = = V eV V Note
Atomic number (Z)
Bragg’s Law According to Bragg’s law of X-ray diffraction, the path difference between the diffracted rays from a crystal is given as 2d sin q = nl, where d is the interatomic distance.
X-rays of high frequency are known as hard X-rays while X-rays of low frequency are known as soft X-rays.
• Intensity of X-rays beam emerging from a material after
some absorption of these rays into it, is given as I = I 0 e -mt , where I 0 is the intensity of incident X-rays, t is the thickness of material and m is absorption coefficient of material.
θ
θ
d
Topical Practice Questions All the exam questions of this chapter have been divided into 5 topics as listed below Topic 1
—
RUTHERFORD a-PARTICLE SCATTERING EXPERIMENT AND ATOMIC MODEL
762–763
Topic 2
—
BOHR MODEL AND HYDROGEN SPECTRUM
763–776
Topic 3
—
NUCLEUS AND RADIOACTIVITY
777–793
Topic 4
—
NUCLEAR FISSION & FUSION AND BINDING ENERGY
794–801
Topic 5
—
X-RAYS
801–804
Topic 1 Rutherford α-Particle Scattering Experiment and Atomic Model 2018 1 Assertion If electron in an atom were stationary, then they would fall into the nucleus. Reason Electrostatic force of attraction acts between negatively charged electrons and positive nucleus. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
2013 2 The existence of a positively charged nucleus in an atom
5 Rutherford’s atomic model could account for (a) stability of atoms (b) origin of spectra (c) the positive charged central core of an atom (d) concept of stationary orbits
2010 6 In Rutherford scattering experiment, what will be the correct angle for a scattering for an impact parameter b = 0 ? [JCECE] (a) 90° (b) 270° (c) 0° (d) 180°
2009 7 If an a-particle of mass m, charge q and velocity v is incident on a nucleus charge Q and mass m, then the distance of closest approach is [BVP] 2 Qq Qq Qq mv Qq (a) (b) (c) (d) 2 4 pe 0 m2 2 pe 0 mv 2 mv 2
was first suggested by the experiment of [WB JEE] (a) J J Thomson (b) E Rutherford (c) Chadwick (d) Hahn and Strassman
2011 3 In a Rutherford scattering experiment, when a projectile of charge Z1 and mass M 1 approaches a target nucleus of charge Z 2 and mass M 2 , the distance of closest approach is [CBSE PMT] r0 . The energy of the projectile is (a) directly proportional to M 1 ´ M 2 (b) directly proportional to Z1 Z 2 (c) inversely proportional to Z1 (d) directly proportional to mass M 1 B´ 4 A beam of fast moving alpha particles were directed towards B a thin film of gold. The parts A A ¢ , B ¢ and C¢ of the transmitted C A´ and reflected beams C´ corresponding to the incident parts A, B andC of the beam are shown in the adjoining diagram. The number of alpha particles in [RPET] (a) B¢ will be minimum and in C¢ maximum (b) A¢ will be maximum and in B¢ minimum (c) A¢ will be minimum and in B¢ maximum (d) C¢ will be minimum and in B¢ maximum
[KCET]
8 In Rutherford’s a-particle experiment with thin gold foil, 8100 scintillations per minute are observed at an angle of 60°. The number of scintillations per minute at an angle of 120° will be [BCECE] (a) 900 (b) 2025 (c) 32400 (d) 4050 1 9 An alpha nucleus of energy mv 2 bombards a heavy 2 nuclear target of charge Ze. Then, the distance of closest approach for the alpha nucleus will be proportional to 1 (a) v 2 (b) m [JIPMER] 1 1 (c) 4 (d) Ze v 10 According to classical theory of Rutherford’s model, the path of electron will be [AFMC] (a) parabolic (b) hyperbolic (c) circular (d) elliptical 11 An a-particle of energy 5 MeV is scattered through 180° by a fixed uranium nucleus. The distance of the closest approach is of the order of [MP PMT] (a) 1 Å (b) 10-10 cm (c) 10-12 cm (d) 10-15 cm
Answers 1 (a) 11 (c)
2 (b)
3 (b)
4 (b)
5 (c)
6 (d)
7 (b)
8 (a)
9 (b)
10 (d)
ATOMS AND NUCLEI
Explanations 1 (a) In an atom, electron revolves around nucleus, for this required centripetal forces is provided by electrostatic force of attraction between electron and nucleus. If electrons were stationary, then due to this force they would fall into the nucleus.
2 (b) A positively charged nucleus in an atom was first suggested by E Rutherford through its gold foil experiment.
3 (b) The energy of the projectile will be equivalent to potential energy of the charge system, 1 (Z1e) (Z2e) E= r0 4 pe 0 Þ
7 (b) According to the question, for the distance of closest approach kinetic energy will totally be converted to potential energy. 1 1 Qq Hence, mv 2 = 2 4 pe 0 r0 Qq Þ r0 = 2pe 0 mv 2
8 (a) Number of a-particles scattered through at an angle q, N µ
Þ
E µ Z1Z2
4 (b) A¢ will be maximum and minimum in B¢ because atom is hollow and whole mass of atom is concentrated in a small centre called nucleus.
5 (c) Rutherford’s atomic model could account for the positive charged central core of an atom.
6 (d) We know that, impact parameter,
æ 4 ç sin N1 è = N2 æ 4 ç sin è
q2 ö ÷ 2ø q1 ö ÷ 2ø
Given, N 1 = 8100, q1 = 60° and q2 = 120° æ 4 120 ° ö ç sin ÷ 8100 è 2 ø = Þ N2 æ 4 60 ° ö ç sin ÷ è 2 ø Þ
q q b µ cot Þ b = K cot 2 2 where, K is a constant. Given, b = 0, hence q = 180°.
1 æ qö sin ç ÷ è 2ø 4
Þ
9 (b) For the distance of closest approach, we can write, 1 2 K ´ (Ze) 2e mv = 2 r0 1 Þ r0 µ m
10 (d) According to classical theory of Rutherford model, the path of electron will be elliptical.
11 (c) According to law of conservation of energy, kinetic energy of a-particle = potential energy of a-particle at distance of closest approach 1 2 1 q1q2 i.e. mv = 2 4 pe 0 r \
5 MeV =
9 ´ 109 ´ (2e) ´ (92e) r ö æ 1 2 çQ mv = 5 MeV÷ ø è 2
Þ r=
8100 sin 4 60° = N2 sin 4 30° 1 8100 ´ 16 = 900 N2 = 9 16
\
9 ´ 109 ´ 2 ´ 92 ´ (1.6 ´ 10-19 )2 5 ´ 106 ´ 1.6 ´ 10-19 r = 5.3 ´ 10-14 m = 5.3 ´ 10-12 cm
Topic 2 Bohr Model and Hydrogen Spectrum 2019 1 The total energy of an electron in an atom in an orbit is -3.4 eV. Its kinetic and potential energies are, respectively (a) -3.4 eV, -6.8 eV (b) 3.4 eV, -6.8 eV (c) 3.4 eV, 3.4 eV (d) -3.4 eV, -3.4 eV
[NEET]
2 The radius of the first permitted Bohr orbit for the electron, in a hydrogen atom equals 0.51 Å and its ground state energy equals - 13.6 eV. If the electron in the hydrogen atom is replaced by muon ( m -1 ) [Charge same as electron and mass 207 me ], the first Bohr radius and ground state energy will be [NEET (Odisha)]
(a) 0.53 ´ 10-13 m, - 3.6 eV (b) 25.6 ´ 10-13 m, - 2.8 eV (c) 2.56 ´ 10-13 m, - 2.8 keV (d) 2.56 ´ 10-13 m, - 13.6 eV
3 15 eV is given to electron in 4th orbit, then find its final energy when it comes out of H-atom. [AIIMS] (a) 14.15 eV (b) 13.6 eV (c) 12.08 eV (d) 15.85 eV
2018 4 The ratio of kinetic energy to the total energy of an electron in a Bohr orbit of the hydrogen atom is [NEET] (a) 2, -1 (b) 1, -1 (c) 1, 1 (d) 1, -2
2017 5 The ratio of wavelength of the last line of Balmer series and the last line of Lyman series is (a) 2 (b) 1 (c) 4
[NEET]
(d) 0.5
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2016 6 If an electron in a hydrogen atom jumps from the 3rd orbit to the 2nd orbit, then it emits a photon of wavelength l. When it jumps from the 4th orbit to the 3rd orbit, then the corresponding wavelength will be [NEET] 16 9 (a) (b) l l 25 16 20 20 (d) (c) l l 7 13
2015 7 Consider 3rd orbit of helium using non-relativistic approach the speed of electron in this order will be (take, k = 9 ´ 109 constant, Z = 2 and h = Planck’s constant [CBSE] = 6.64 ´ 10-34 J-s) (a) 2.92 ´ 106 ms -1 (b) 1.46 ´ 106 ms -1 (c) 0.73 ´ 106 ms -1 (d) 3 ´ 106 ms -1
2014 8 Hydrogen
atom in ground state is excited by a monochromatic radiation of l = 975 Å. Number of spectral lines in the resulting spectrum emitted will be (a) 3 (b) 2 [CBSE AIPMT] (c) 6 (d) 10
9 If an electron in hydrogen atom jumps from an orbit of level n = 3 to an orbit of level n = 2 , emitted radiation has a frequency (R = Rydberg’s constant, c = velocity of light) [MHT CET]
3Rc (a) 27 8Rc (c) 9
Rc (b) 25 5Rc (d) 36
14 According to Bohr’s theory (assuming infinite mass of the nucleus), the frequency of the second line of the Balmer series is [UP CPMT] (a) 6.16 ´ 1014 Hz (b) 6.16 ´ 1013 Hz (c) 6.16 ´ 1010 Hz (d) 6.16 ´ 1016 Hz 15 In the lowest energy level of hydrogen atom, the electron has the angular momentum [WB JEE] p h h 2p (a) (b) (c) (d) h p 2p h 16 Band spectrum is also called [KCET] (a) molecular spectrum (b) atomic spectrum (c) flash spectrum (d) line absorption spectrum
2012 17 The transition from the state n = 3to n = 1in a hydrogen like atom results in ultraviolet radiation. Infrared radiation will be obtained in the transition from [CBSE AIPMT] (a) 2 ® 1 (b) 3 ® 2 (c) 4 ® 2 (d) 4 ® 3
18 An electron of a stationary hydrogen atom passes from the 5th energy level to the ground level. The velocity that the atom acquired a result of photon emission will be
10 The ionisation energy of hydrogen is 13.6 eV. The energy of the photon released when an electron jumps from the first excited state ( n = 2) to the ground state of hydrogen atom is [WB JEE] (a) 3.4 eV (b) 4.53 eV (c) 10.2 eV (d) 13.6 eV
2013 11 The energy E of a hydrogen atom with principal quantum number n is given by 13.6 E = 2 eV n The energy of a photon ejected when the electron jumps from n = 3 state to n = 2 state of hydrogen is approximately [AIIMS] (a) 1.5 eV (b) 0.85 eV (c) 3.3 eV (d) 1.9 eV
12 Outside a nucleus, (a) neutron is stable (b) neutron is unstable (c) proton and neutron both are stable (d) proton and neutron both are unstable
13 Assertion Balmer series lies in the visible region of electromagnetic spectrum. 1 1ö æ 1 Reason = R ç 2 - 2 ÷ , where, n = 3, 4, 5¼ ¥ è l n ø 2 (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. [AIIMS] (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
[AIIMS]
[CBSE AIPMT]
24hR (a) 25m 25m (c) 24hR
25hR (b) 24m 24m (d) 25hR
19 Electron in hydrogen atom first jumps from third excited state to second excited state and then from second excited to the first excited state. The ratio of the wavelengths [CBSE AIPMT] l 1 : l 2 emitted in the two cases is (a) 7 : 5 (b) 27 : 20 (c) 27 : 5 (d) 20 : 7 20 Which state of triply ionised Beryllium (Be 3+ ) has the same orbital radius as that of the ground state of hydrogen? [CBSE AIPMT]
(a) n = 3
(b) n = 4
(c) n = 1
(d) n = 2
21 For a hydrogen atom, in which of the following transitions will the wavelength of emitted photon be minimum? [MP PET]
(a) n = 5 to n = 4 (c) n = 3 to n = 2
(b) n = 4 to n = 3 (d) n = 2 to n = 1
765
ATOMS AND NUCLEI
22 The radius of the smallest electron orbit in hydrogen like ion is (0.51 ´ 10- 10 / 4) m, then it is [Manipal] (a) hydrogen atom (b) He + (d) Be 3+ (c) Li 2+ 23 The electron of a hydrogen atom revolves around the proton in a circular nth orbit of radius e2 . rn = e 0 n 2 h 2 / pme 2 with speed v n = 2e 0 nh The current due to the circulating charge is proportional to (a) n 2 (b) n 3 (c) n - 3 (d) n - 2 [AMU]
2011 24 The wavelength of the first line of Lyman series for H- atom is equal to that of the second line of Balmer series for a H-like ion. The atomic number Z of H-like ion is [CBSE AIPMT]
(a) 4
(b) 1
(c) 2
(d) 3
25 The energy of a hydrogen atom in the ground state is -13.6eV. The energy of a He + ion in the first excited state will be [CBSE AIPMT] (a) - 13.6eV (b) - 27.2eV (c) - 54.4 eV (d) - 6.8eV 26 The first emission of hydrogen atomic spectrum in Lyman series appears at a wavelength of [Odisha JEE] 3R 4 7R 400 -1 -1 (a) (b) (c) cm cm cm (d) cm 4 3R 144 9R 27 When an electron in hydrogen atom is excited from its 4th to 5th stationary orbit, the change in angular momentum of electron is (Planck’s constant, h = 6.6 ´ 10- 34 J-s) - 34
(a) 4.16 ´ 10 J-s - 34 (c) 1.05 ´ 10 J-s
- 34
31 Which of the following postulates of the Bohr model led to the quantisation of energy of the hydrogen atom? [J & K CET]
(a) The electron goes around the nucleus in circular orbits. (b) The angular momentum of the electron can only be an integral multiple of h / 2p. (c) The magnitude of the linear momentum of the electron is quantised. (d) Quantisation of energy is itself a postulate of the Bohr model.
2010 32 The ionisation energy of the electron in the hydrogen atom in its ground state is 13.6 eV. The atoms are excited to higher energy levels to emits radiations of 6 wavelengths. Maximum wavelength of emitted radiation corresponds to the transition between [CBSE AIPMT] (a) n = 3 and n = 2 states (b) n = 3 and n = 1state (c) n = 2 and n = 1state (d) n = 4 and n = 3 states
33 An electron jumps from 4th orbit to 2nd orbit of the hydrogen atom. Given, Rydberg’s constant R = 105 cm -1 , the frequency in hertz of emitted radiation will be [AFMC] 3 3 9 3 (a) ´ 105 (b) ´ 1015 (c) ´ 1015 (d) ´ 1015 16 16 16 4 34 In figure the energy levels of the hydrogen atom have been shown along with some transitions marking A , B , C. The transitions A, B and C respectively represents [AFMC] 0 eV
[CBSE AIPMT]
(b) 3.32 ´ 10 J-s (d) None of these
28 When an electron jumps from the orbit n = 2 to n = 4, then wavelength of the radiations absorbed will be (where, R is Rydberg’s constant) [KCET, CBSE AIPMT] 16 16 5R 3R (a) (b) (c) (d) 3R 5R 16 16 29 In an inelastic collision, an electron excites a hydrogen atom from its ground state to a M-shell state. A second electron collides instantaneously with the excited hydrogen atom in the M-shell state and ionizes it. At last how much energy the second electron transfers to the atom in the M-shell state? [WB JEE] (a) + 3.4 eV (b) + 1.51 eV (c) - 3.4 eV (d) - 1.51 eV 30 According to the Bohr’s atomic model, the relation between principal quantum number ( n ) and radius of orbit [J&K CET] ( r ) is 1 1 2 (a) r µ n (b) r µ 2 (d) r µ n (c) r µ n n
n=5 n=4 n=3 n=2 n=1
C B A
–0.54 eV –0.85 eV –1.51 eV –3.40 eV –13.60 eV
(a) the first member of the Lyman series, third member of Balmer series and second member of Paschen series (b) the ionisation potential of H, second member of Balmer series and third member of Paschen series (c) the series limit of Lyman series, second member of Balmer series and second member of Paschen series (d) the series limit of Lyman series, third member of Balmer series and second member of Paschen series
35 A hydrogen-like atom emits radiations of frequency 2.7 ´ 1015 Hz, when it makes a transition from n = 2 to n = 1. The frequency emitted in a transition from n = 3 to [BHU] n = 1will be 15 15 (a) 1.8 ´ 10 Hz (b) 3.2 ´ 10 Hz (c) 4.7 ´ 105 Hz (d) 6.9 ´ 1015 Hz
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
36 The minimum energy to ionise an atom is the energy required to [BHU] (a) add one electron to the gaseous state of atom (b) excite the atom from its ground state to its first excited state (c) remove one outermost electron from the gaseous state of atom (d) remove one innermost electron from the gaseous state of atom 37 In the following atoms, the molecules for the transition from n = 2 to n = 1, the spectral line of minimum wavelength will be produced by [UP CPMT] (a) hydrogen atom (b) deuterium atom (c) uni-ionised helium (d) di-ionised lithium 38 The orbital frequency of an electron in the hydrogen atom is proportional to [MHT CET] (a) n 3 (b) n - 3 (c) n (d) n 0 39 A hydrogen atom emits a photon corresponding to an electron transition from n = 5 to n = 1. The recoil speed of hydrogen atom is almost (mass of proton » 1.6 ´ 10- 27 kg) [Haryana PMT]
(a) 10 ms - 1 (c) 4 ms - 1
(b) 2 ´ 10- 2 ms - 1 (d) 8 ´ 102 ms - 1
4E 40 The following diagram indicates 7 the energy levels of a certain E 3 atom when the system moves E from 4E level to E. A photon of wavelength l 1 is emitted. The wavelength of photon produced during its transition from (7/ 3) E level to E is l 2 . The ratio l 1 / l 2 will be [Punjab PMET] 9 4 3 7 (a) (b) (c) (d) 4 9 2 3 41 If n1 is the frequency of the series limit of Lyman series, n 2 is the frequency of the first line of Lyman series and n 3 is the frequency of the series limit of the Balmer series. Then, [KCET] (a) n1 - n 2 = n 3 (b) n1 = n 2 - n 3 1 1 1 1 1 1 (d) (c) = + = + n 2 n1 n 3 n1 n 2 n 3
42 An electron is moving in an orbit of a hydrogen atom from which there can be a maximum of six transitions. An electron is moving in an orbit of another hydrogen atom from which there can be a maximum of three transitions. The ratio of the velocities of the electron in these two orbits is [KCET] 1 2 5 3 (b) (c) (d) (a) 2 1 4 4 43 The spectrum of an oil flame is an example for [KCET] (a) line emission spectrum (b) continuous emission spectrum (c) line absorption spectrum (d) band emission spectrum
44 An electron jumps from the first excited state to the ground state of hydrogen atom. What will be the percentage change in the speed of electron? [BCECE] (a) 25 (b) 50 (c) 100 (d) 200 45 If the potential energy of the electron in the hydrogen atom - Ke 2 [CG PMT] , its kinetic energy is is r - Ke 2 - Ke 2 Ke 2 Ke 2 (c) (a) (b) (d) 2r r 2r r 46 The ground state energy of hydrogen atom is - 13.6 eV. The kinetic energy of the electron in this state is [MGIMS] (a) 27.2 eV (b) 13.6 eV (c) 6.8 eV (d) 3.4 eV 47 If the radius of the 1st Bohr orbit of the hydrogen atom is 5.29 ´ 10-11 m, the radius of the 2nd orbit will be [MGIMS] (a) 21.16 ´ 10- 11 m (b) 15.87 ´ 10- 11 m - 11 (c) 10.58 ´ 10 m (d) 2.64 ´ 10- 11 m
2009 48 In the Bohr’s model of a hydrogen atom, the centripetal force is furnished by the Coulomb attraction between the proton and the electron. If a 0 is the radius of the ground state orbit, m is the mass, e is the charge on electron and e 0 is the permittivity of free space, the speed of the electron is e (a) (b) zero [AIIMS] e 0 a0 m 4 e 0 a0 m e (c) (d) e 4pe 0 a 0 m
49 A hydrogen atom is in excited state of principal quantum number n. It emits a photon of wavelength l, when returns to ground state. The value of n is [AIIMS] lR - 1 (a) lR ( lR - 1) (b) lR lR (d) l ( R - 1) (c) lR - 1 50 The energy of hydrogen atom in ground state is 13.6 eV. The ionisation energy of singly ionised helium He 2 + will be [AIIMS] (a) 13.6 eV (b) 3.4 eV (c) 27.2 eV (d) 54.4 eV 51 Assertion It is essential that all the lines available in the emission spectrum will also be available in the absorption spectrum. Reason The spectrum of hydrogen atom is only absorption spectrum. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
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ATOMS AND NUCLEI
52 If elements with principal quantum number n > 4 were not allowed in nature, then the number of possible elements would be [AFMC] (a) 32 (b) 60 (c) 18 (d) 4 53 The shortest wavelength of the Brackett series of hydrogen like atom (atomic number = Z ) is the same as the shortest wavelength of the Balmer series of hydrogen atom. The value of Z is [UP CPMT] (a) 3 (b) 4 (c) 5 (d) 2 54 If an electron is revolving around the hydrogen nucleus at a distance of 0.1 nm, what should be its speed? [MHT CET] (a) 2.188 ´ 106 ms - 1 (b) 1.094 ´ 106 ms - 1 6 -1 (c) 4.376 ´ 10 ms (d) 1.60 ´ 106 ms - 1 55 The spectral series of the hydrogen atom that lies in the visible region of the electromagnetic spectrum [MHT CET] (a) Paschen (b) Balmer (c) Lyman (d) Brackett 56 In a hydrogen like atom, electron make transition from at energy level with quantum number n to another with quantum number ( n - 1). If n >> 1, the frequency of radiation emitted is proportional to [JEE (Main)] 1 1 1 1 (b) 2 (d) 3 (a) (c) 3 n n /2 n n 57 The radius of hydrogen atom in its ground state is 5.3 ´ 10- 11 m. After collision with an electron, it is found to have a radius of 21.2 ´ 10- 11 m. What is the principal quantum number n of the final state of atom? [MHT CET] (a) n = 4 (b) n = 2 (c) n = 16 (d) n = 3 58 The energy of an electron in excited hydrogen atom is - 3.4 eV. Then, according to Bohr’s theory, the angular momentum of the electron is [Manipal] (a) 2.1 ´ 10- 34 J-s (b) 3 ´ 10- 34 J-s (c) 2 ´ 10- 34 J-s (d) 0.5 ´ 10- 34 J-s 59 The shortest wavelength which can be obtained in hydrogen spectrum is ( R = 107 m - 1 ) [Haryana PMT, CG PMT] (a) 1000 Å (b) 800 Å (c) 1300 Å (d) 2100 Å 60 According to Bohr’s theory of hydrogen atom, for the electron in the nth allowed orbit the I. II. III. IV.
linear momentum is proportional to 1/n. radius is proportional to n. kinetic energy is proportional to 1/n 2 . angular momentum is proportional to n.
Choose the correct option from the codes given below [Haryana PMT, CG PMT]
(a) I, III and IV (c) I and II
(b) only I (d) only III
61 The radius of an electron orbit in a hydrogen atom is of the order of [DUMET] (a) 10- 8 m (b) 10 - 9 m (c) 10 - 11 m (d) 10 - 10 m
62 Maximum energy is evolved during which of the following transitions? [MGIMS] (a) n = 1to n = 2 (b) n = 2 to n = 6 (c) n = 2 to n = 1 (d) n = 6 to n = 2 2008 63 The ground state energy of hydrogen atom is - 13.6 eV. When its electron is in the first excited state, its excitation energy is [CBSE AIPMT] (a) 3.4 eV (b) 6.8 eV (c) 10.2 eV (d) zero 64 White light is passed through a dilute solution of potassium permanganate. The spectrum produced by the emergent light is [AFMC] (a) band emission spectrum (b) line emission spectrum (c) band absorption spectrum (d) line absorption spectrum 65 If l 1 and l 2 are the wavelengths of the first members of the Lyman and Paschen series respectively, then l 1 : l 2 is (a) 1 : 3 (b) 1 : 30 [AFMC] (c) 7 : 50 (d) 7 : 108 66 If the series limit wavelength of the Lyman series for hydrogen atom is 912 Å, then the series limit wavelength for the Balmer series for the hydrogen atom is [BHU] 912 Å (a) 912 Å (b) 912 ´ 2 Å (c) 912 ´ 4 Å (d) 2 67 Ionisation potential of hydrogen atom is 13.6eV. Hydrogen atoms in the ground state are excited by monochromatic radiation of photon energy is 12.1 eV. According to Bohr’s theory, the spectral lines emitted by hydrogen will be (a) two (b) three [Haryana PMT] (c) four (d) one 68 The angular momentum ( L ) of an electron moving in a stable orbit around nucleus is [J&K CET] h (a) half integral multiple of 2p (b) integral multiple of h h (c) integral multiple of 2p (d) half integral multiple of h 69 Solar spectrum is an example for [KCET] (a) line emission spectrum (b) continuous emission spectrum (c) band absorption spectrum (d) line absorption spectrum 70 The ratio of minimum wavelengths of Lyman and Balmer series will be [KCET] (a) 1.25 (b) 0.25 (c) 5 (d) 10 71 The wavelength of the first spectral line in the Balmer series of hydrogen atom is 6561Å. The wavelength of the second spectral line in the Balmer series of single ionised helium atom is [IIT-JEE] (a) 1215 Å (b) 1640 Å (c) 2430 Å (d) 4687 Å
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72 What will be the angular momentum in 4th orbit, if L is the angular momentum of the electron in the 2nd orbit of hydrogen atom? [Guj CET] 3 2 L (c) L (d) (a) 2L (b) L 2 3 2 73 The diagram shows the energy levels for an electron in a certain atom. Which transition shown represents the emission of a photon with the most energy? [JCECE] n=4 n=3 n=2 I
(a) III
II
(b) IV
III
IV
n=1
(c) I
(d) II
2007 74 The total energy of electron in the ground state of hydrogen atom is - 13.6 eV. The kinetic energy of an electron in the first excited state is [CBSE AIPMT] (a) 3.4 eV (b) 6.8 eV (c) 13.6 eV (d) 1.7 eV
75 The shortest wavelength in hydrogen spectrum of Lyman series, when R H = 109678cm - 1 is [Kerala PET] (a) 1002.7 Å (b) 1215.67 Å (c) 1127.30 Å (d) 911.7 Å (e) 1234.7 Å 76 If the energy of hydrogen atom in nth orbit is E n , then energy in the nth orbit of a singly ionised helium atom will be [AFMC] (d) E n / 2 (b) E n / 4 (c) 2 E n (a) 4E n 77 In which of the following systems will the radius of the first orbit ( n = 1) be minimum? [AFMC] (a) Deuterium atom (b) Hydrogen atom (c) Doubly ionised lithium (d) Singly ionised helium 78 The wavelength of K a -line in copper is 1.54 Å. The ionisation energy of K-electron in copper in joule is (b) 12.9 ´ 10-16 [UP CPMT] (a) 11.2 ´ 10-17 -15 (d) 10 ´ 10-16 (c) 1.7 ´ 10 79 The Bohr model of atoms [Manipal] (a) assumes that the angular momentum of electrons is quantised (b) uses Einstein’s photoelectric equation (c) predicts continuous emission spectra for atoms (d) predicts the same emission spectra for all types of atoms 80 The ionisation energy of Li 2+ is equal to (a) 9hcR (b) 6hcR (c) 2hcR
[KCET]
(d) hcR
81 The state of the triply ionised beryllium ( Be 3+ ) has the same orbital radius as that of the ground state of hydrogen is [WB JEE] (a) 4 (b) 1 (c) 2 (d) 3 82 The ratio of areas between the electron orbits for the first excited state to the ground state for the hydrogen atom is (a) 2 : 1 (b) 4 : 1 [AMU] (c) 8 : 1 (d) 16 : 1 83 The ionisation energy of 10 times ionised sodium atom is 13.6 13.6 [RPMT] (a) (b) eV eV 11 (11) 2 (c) 13.6 ´ (11) 2 eV (d) 13.6 eV 84 An electron with kinetic energy 5 eV is incident on an H-atom in its ground state. The collision [RPMT] (a) must be elastic (b) may be partially elastic (c) may be completely elastic (d) may be completely inelastic 85 The wavelength of the first spectral line of sodium 5896 Å. The first excitation potential of sodium atom will be (Planck’s constant, h = 6.63 ´ 10-34 J-s) [BCECE] (a) 4.2 V (b) 3.5 V (c) 2.1 V (d) None of these 86 At the time of total solar eclipse, the spectrum of solar radiation will have [MP PMT] (a) a large number of dark Fraunhoffer lines (b) a smaller number of dark Fraunhoffer lines (c) no lines at all (d) all Fraunhoffer lines changed into bright coloured lines 87 Mercury vapour lamp gives [J&K CET] (a) continuous spectrum (b) line spectrum (c) band spectrum (d) absorption spectrum 88 The first member of the Balmer’s series of the hydrogen has a wavelength l , the wavelength of the second member of its series is [J&K CET] 27 20 (b) (a) l l 20 27 27 (d) None of these (c) l 10 89 The shortest wavelength in Lyman series is 91.2 nm. The longest wavelength of the series is [J&K CET] (a) 121.6 nm (b) 182.4 nm (c) 243.4 nm (d) 364.8 nm 1 1 90 The values + and - of spin quantum number show 2 2 [RPMT] (a) rotation of electron clockwise and anti-clockwise directions, respectively (b) rotation of electron anti-clockwise and clockwise directions, respectively (c) rotation in any direction according to convention (d) None of the above
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91 As the quantum number increases, the difference of energy between consecutive energy levels [Guj CET] (a) decreases (b) increases (c) first decreases and then increases (d) remains the same 92 Emission of light stops as the incident light is cut-off in (a) phosphorescence (b) fluorescence [Guj CET] (c) luminescence (d) efflorescence
2006 93 In terms of Rydberg constant R, the waves number of the first Balmer line is (a) R
[AMU]
(b) 3R
(c)
5R 36
(d)
8R 9
2005 94 Energy levels A , B and C of a certain atom correspond to increasing values of energy, i.e. E A < E B < EC . If l 1 , l 2 and l 3 are wavelengths of radiations corresponding to transitions C to B, B to A and C to A respectively, which of the following relations is correct? [CBSE AIPMT] l1 l 2 (a) l 3 = l 1 + l 2 (b) l 3 = l1 + l 2 (d) l23 = l21 + l22
(c) l 1 + l 2 + l 3 = 0
95 The ground state energy of hydrogen atom is - 13.6 eV. What is the potential energy of the electron in this state? (a) 0 eV (b) - 27.2 eV [AIIMS] (c) 1 eV (d) 2 eV 96 Calculate the highest frequency of the emitted photon in the Paschen series of spectral lines of the hydrogen atom. (a) 3.7 ´ 1014 Hz [AMU (Engg.)] 15 (b) 91 . ´ 10 Hz (c) 10.23 ´ 1014 Hz (d) 29.7 ´ 1015 Hz 97 The electron in a hydrogen atom makes a transition from n = n1 to n = n 2 state. The time period of the electron in the initial state ( n1 ) is eight times that in the final state ( n 2 ). [KCET] The possible values of n1 and n 2 are (a) n1 = 8, n 2 = 1 (b) n1 = 4, n 2 = 2 (c) n1 = 2, n 2 = 4 (d) n1 = 1, n 2 = 8 98 Bohr’s atom model assumes [KCET] (a) the nucleus is of infinite mass and is at rest (b) electrons in a quantised orbit will not radiate energy (c) mass of electron remains constant (d) All the above conditions
Answers 1 11 21 31 41 51 61 71 81 91
(b) (d) (d) (b) (a) (d) (c) (a) (c) (a)
2 12 22 32 42 52 62 72 82 92
(c) (b) (d) (d) (d) (b) (c) (a) (d) (b)
3 13 23 33 43 53 63 73 83 93
(a) (a) (c) (c) (b) (d) (c) (a) (c) (c)
4 14 24 34 44 54 64 74 84 94
(b) (a) (c) (d) (b) (d) (c) (a) (a) (b)
5 15 25 35 45 55 65 75 85 95
(c) (c) (a) (b) (c) (b) (d) (d) (c) (b)
6 16 26 36 46 56 66 76 86 96
(c) (a) (b) (b) (b) (d) (c) (a) (d) (a)
7 17 27 37 47 57 67 77 87 97
(b) (d) (c) (d) (a) (b) (b) (c) (b) (b)
8 18 28 38 48 58 68 78 88 98
(a) (a) (a) (b) (c) (a) (c) (c) (b) (b)
9 19 29 39 49 59 69 79 89
(d) (d) (d) (c) (c) (a) (d) (a) (a)
10 20 30 40 50 60 70 80 90
(c) (d) (d) (b) (d) (a) (b) (a) (a)
Explanations 1 (b) According to Bohr’s model, the kinetic energy of electron in term of Rydberg constant R is given by Rhc … (i) KE = 2 n where, h = Planck’s constant, c = speed of light and n = principal quantum number. Similarly, potential energy is given by 2Rhc … (ii) PE = - 2 n \ Total energy, E = PE + KE
Rhc n2 [from Eqs. (i) and (ii) Þ KE = - E and PE = 2E Given, E = - 3.4 eV \ KE = - (- 3.4 ) = 3.4 eV and PE = 2 (- 3.4 ) = - 6.8 eV =-
2 (c) Given, radius of first orbit for electron, r1 = 0.51 Å, Ground state energy E1 = - 13.6 eV, Mass of electron = me
of electron,
Mass of muon, mm = 207me and Mass of nucleus, M = 1836 me When electron in hydrogen atom is replaced by muon, the reduced mass of muon is mm M …(i) mm ¢ = mm + M Substituting the given values in Eq. (i), we get 207me ´ 1836me mm¢ = 207me + 1836me » 186 me
…(ii)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
The radius of first orbit in hydrogen atom for electron is given by h2e 0 …(iii) r1 = pmee2
4 (b) kinetic energy of an electron in a Bohr orbit of a hydrogen atom is given as Rhc ...(i) (KE )n = 2 n Total energy of an electron in a Bohr orbit of a hydrogen atom is given as - Rhc ...(ii) (TE )n = 2 n Dividing Eq. (i) by Eq. (ii), we get (KE )n (Rhc / n2 ) = (TE )n (- Rhc / n2 ) So, (KE )n :(TE )n = 1 : - 1
The radius of first orbit for muon is given by h2e 0 r1 ¢ = pmm¢ e2 [Q charge of m = charge of e- ] =
h2e 0 p ´ 186mee2
[from Eq. (ii)]
æ h2e 0 ö 1 r =ç = 1 ÷ 2 186 186 è pmee ø
5 (c) Wavelength of spectral lines are given by
[from Eq. (iii)] 0.51 Å [Q r1 = 0.51Å ] 186 = 2.74 ´ 10-13 m
=
For last line of Balmer series, n1 = 2 and n2 = ¥ 1 1 ö R æ 1 Þ = Z 2R ç 2 - 2 ÷ = è2 ¥ ø 4 lB
[Q 1 Å = 10-10 m] The total energy of electron is given by - mZ 2e4 æ 1 ö En = ç ÷ 8e 20h2 è n2 ø Þ En µ m For electron in first orbit of hydrogen atom, …(iv) E1 = kme e4 where, k = 2 2 = constant. 8e 0h For muon in first orbit E1 ¢ = kmm ¢ = k ´ 186me [from Eq. (i)] = 186kme [from Eq. (iv)] = 186E1 = 186(-13.6) eV(given) = - 2529.6 eV = - 2.5 keV
Similarly, for last line of Lyman series, n1 = 1 and n2 = ¥ 1 1 ö æ1 = Z 2R ç 2 - 2 ÷ = R Þ è1 ¥ ø lL lL 1 l = Þ B =4 lB 4 lL
Þ
6 (c) Excess energy of electron appears as photon. Given, n1 = 2 and n2 = 3 From Rydberg’s formula, æ 1 1 1ö æ 1 1 ö 5R = Rç 2 - 2 ÷ = R ç 2 - 2 ÷ = ç ÷ è 2 3 ø 36 l n è n2 1ø and n1 = 3 and n2 = 4 1 1 ö 7R æ 1 = R ç 2 - 2÷ = Þ è 3 4 ø 144 l¢
\ The values are closest to that of option (c).
1 l
3 (a) Given, total energy given to e- in 4th orbit, E = 15 eV Energy of nth orbit of H-atom, 13.6 E¢ = - 2 n So, energy of 4th orbit of H-atom, -13.6 E¢ = = - 0.85 eV 42 \Ionisation energy of 4th orbit = - E ¢ = (- 0.85 eV) = 0.85 eV \ Final energy of electron, when it comes out of H-atom, E = Total energy given to electron-Ionsiation energy of 4th orbit. = 15 - 0.85 = 14.15 eV
æ 1 1 1 ö = Z 2R ç 2 - 2 ÷ l è n1 n 2 ø
7
1 5R 7R Þ = l¢ 36 144 l ¢ 20 Þ = l 7 20 l ¢= l Þ 7 (b) Energy of electron in the 3rd orbit of He, Z2 E3 = -13.6 ´ 2 eV n 4 . ´ 10-19 J (given) = -13.6 ´ ´ 16 9 From Bohr’s model, 1 E3 = - KE 3 = - mev 2 2 1 = ´ 91 . ´ 10-31 ´ v 2 2
4 ´ 16 ´ 10-19 9 (Q me = 91 . ´ 10-31 kg) 13.6 ´ 16 ´ 4 ´ 2 ´ 10-11 Þ v2 = 9 ´ 91 v = 146 . ´ 106 ms -1 = -13.6 ´
8 (a) Given, l = 975 Å = 975 ´ 10-10 m Energy provided to the ground state electron hc 6.6 ´ 10- 34 ´ 3 ´ 108 = = l 975 ´ 10- 10 (Q c = 3 ´ 108 ms -1 and h = 6.6 ´ 10-34 Js-) 6.6 ´ 3 ´ 10- 16 975 = 0.020 ´ 10- 16 = 2 ´ 10- 18 J 20 20 ´ 10- 19 = 12.5 eV eV = = 1.6 1.6 ´ 10- 19 It means the electron jumps to n = 3 from n = 1. The number of possible spectral lines from n = 3 to n = 1is 3. i.e. (n = 3) ¾® (n = 1) (n = 3) ¾® (n = 2) and (n = 2) ¾® (n = 1) =
9 (d) When an electron jumps from orbit ni to orbit nf (ni > nf ), the frequency of emitted photon is given by æ 1 1ö æ 1 1ö n = cR çç 2 - 2 ÷÷ Þ n = cR ç 2 - 2 ÷ è2 3 ø n n è f i ø (given) 5Rc æ 5ö n = cR ç ÷ Þ n = è 36 ø 36
10 (c) The energy of the photon 1ö æ1 = Rhc ç 2 - 2 ÷ è1 n ø æ1 1ö = 13.6 ç - ÷ è1 4 ø
(Q n = 2)
æ 4 - 1ö = 13.6 ç ÷ è 4 ø 3 40.8 = 13.6 ´ = = 10.2 eV 4 4
11 (d) The energy of ejected photon, æ 1 1ö E = Rhc ç 2 - 2 ÷ è n1 n2 ø where, transition takes place from n1 to n2. æ 1 1ö = 13.6 ç 2 - 2 ÷ è2 3 ø 5 = 13.6 ´ = 1.9 eV 36
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ATOMS AND NUCLEI
12 (b) Outside a nucleus, neutron is unstable.
13 (a) The wavelength in Balmer series is
But,
given by
1 æ 1 1ö =R ç 2 - 2÷ è2 n ø l where, n = 3, 4 , 5... ¥
19 (d) Here, for wavelength l1, n1 = 4 and
1 1ö æ 1 = R ç 2 - 2÷ è2 l max 3 ø 36 36 l max = = = 6563 Å 5R 5 ´ 1.097 ´ 107 1 1 ö æ 1 and = R ç 2 - 2÷ è2 l min ¥ ø Þ
l min =
4 4 = = 3646 Å R 1.097 ´ 107
The wavelength 6563 Å and 3646 Å lies in visible region. Therefore, Balmer series lies in visible region.
14 (a) Wavelength of the Balmer series is given by æ 1 1 1ö = R ç 2 - 2÷ l è n1 n2 ø Þ
æ 1 n 1ö = R ç 2 - 2÷ c è n1 n2 ø
Þ
æ 1 1ö n = cR ç 2 - 2 ÷ è n1 n2 ø
(Qc = nl)
15 (c) Angular momentum of electron in nh nth orbit is given by mvrn = . 2p In the lowest energy level, n = 1, then æ h ö h mvr1 = 1 ç ÷ = è 2p ø 2p
16 (a) Band spectrum is also called as
18
n2 = 3 and for wavelength l 2 , n1 = 3 and n2 = 2 æ 1 hc 1ö We know that, = - 13.6 ç 2 - 2 ÷ l è n2 n1 ø So, for wavelength l 1 é 1 hc 1 ù Þ = - 13.6 ê 2 ú l1 4 3 ( ) ( )2 û ë hc æ 7 ö …(i) = 13.6 ç ÷ è 144 ø l1 Similarly, for wavelength l 2 é 1 hc 1 ù Þ = - 13.6 ê 2 ú l2 3 2 ( ) ( )2 û ë hc æ 5ö …(ii) = 13.6 ç ÷ Þ è 36 ø l2 Þ
Hence, from Eqs. (i) and (ii), we get l 1 20 = Þ l 1 : l 2 = 20 : 7 l2 7
20 (d) Radius of orbit of electron in nth
For second line of Balmer series, n1 = 2, n2 = 4 1ö æ 1 \ v = 3 ´ 108 ´ 10967800 ç 2 - 2 ÷ è2 4 ø = 6.16 ´ 1014 Hz
17
24 1 R= l 25 h h 24 hR p= Þ v= = l ml 25 m
molecular spectrum. They are produced by molecules radiating their rotational or vibrational energies or both simultaneously. (d) Infrared radiation found in Paschen, Brackett and Pfund series and it is obtained when electron transition high energy level to minimum third level. hc (a) Given, E5 - E1 = and l Rhc hc - Rhc = 25 l
excited state of hydrogen, e h2n2 n2 …(i) r= 0 2 Þ rµ Z pmZe r1 n12 Z2 \ = ´ r2 n22 Z1 Z So, n22 = n12 ´ 2 (Q r1 = r2) Z1 Here, n1 = 1 (ground state of hydrogen) Z1 = 1 (atomic number of hydrogen) Z2 = 4 (atomic number of beryllium) 4 \ n22 = (1)2 ´ or n22 = 4 or n2 = 2 1
21 (d) According to Bohr’s theory, the wavelength of the radiation emitted from hydrogen atom is given by é 1 1ù 1 = R ê 2 - 2ú l ë n1 n2 û Then, l is minimum for minimum value of n1 and n2, hence n = 2 to n = 1.
22 (d) For hydrogen like atom the radius n2 of nth orbit, rn2 = a0 Z Given, a0 = 0.51 ´ 10-10 m ,
0.51 ´ 10-10 m 4 In the ground state, n = 1 0.51 ´ 10-10 12 \ = ´ 0.51 ´ 10-10 4 Z rn2 =
\ Z=4 So, the atom is triply ionised beryllium (Be 3+ ).
23 (c) Time period of electron, 2p ´ e 0n2h2 2pr 4 e 2n3h3 pme2 T = = = 0 4 2 v e me 2e 0nh æ e2 ö e n2h2 çQ r = 0 2 and v = ÷ 2e 0nh ø pme è Now current, e e me5 = 2 3 3 i= = 2 3 3 T 4 e 0n h 4 e 0n h me4 æ m ö ç 2 3 3 = constant for a particular atom ÷ è 4 e 0n h ø i µ n- 3
Thus,
24 (c) Lyman series of H-atom, we can write hc 1ö æ1 = Rhc ç 2 - 2 ÷ è1 l 2 ø where, symbols have their usual meaning and for second line of Balmer series of H-like ion hc 1ö æ 1 = Z 2Rhc ç 2 - 2 ÷ . è2 l 4 ø 1ö æ1 1ö æ1 Therefore ç 2 - 2 ÷ = Z 2 ç - ÷ è 4 16 ø è1 2 ø 1ö æ 1ö 2 æ1 ç1 - ÷ = Z ç - ÷ è 4 16 ø è 4ø Þ Z = 2.19 –~ 2
25 (a) Energy E of an atom with principal quantum number n is given by - 13.6 2 E= Z n2 For first excited state n = 2 and for He+ , Z = 2 Þ E=
- 13.6 ´ (2)2 = - 13.6 eV (2)2
26 (b) We know that, Þ Þ
æ 1 1ö 1 = Rç 2 – 2 ÷ l è n1 n2 ø
æ 1 1 ö 3R 1 = Rç 2 – 2 ÷ = l 4 è 11 2 ø 4 cm l= 3R
27 (c) Change in the angular momentum, n2h n1h 2p 2p h 6.6 ´ 10- 34 DL = (n2 - n1 )= (5 - 4) 2p 2 ´ 3.14 DL = L2 - L1 =
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= 1.05 ´ 10- 34 J-s
1ö æ 1 = 3 ´ 108 ´ 107 ç 2 - 2 ÷ è2 4 ø 9 = ´ 1015 Hz 16
28 (a) Wavelength is given by æ 1 1 1ö = R ç 2 - 2÷ l è n1 n2 ø Þ
é 1 1 1 ù =Rê 2 ú l (4 )2 û ë (2)
Þ
1 =R l
æ1 1ö ç - ÷ è 4 16 ø
Þ
1 =R l
æ 4 - 1ö ÷ ç è 16 ø
Þ
16 1 3R = Þ l= 3R l 16
34 (d) The transition mark, A represents series limit of Lyman series, B represents third member of Balmer series and C represents second member of Paschen series.
35 (b) According to Bohr’s theory, the wavelength of the radiation æ 1 1 1ö = Z 2R ç 2 - 2 ÷ l è n1 n2 ø
29 (d) The ground state of hydrogen
Þ
(n = 1) is represented by K, the first excited state (n = 2) is represented by L, the second excited state (n = 3) is represent by M. So, the energy transferred by the second electron can be given by æ 1 1ö E = - 13.6 ç 2 - 2 ÷ è n1 n2 ø
æ 1 1ö n = cZ 2R ç 2 - 2 ÷ è n1 n2 ø Case I 1ö æ1 2.7 ´ 1015 = cZ 2R ç 2 - 2 ÷ è1 2 ø 4 Þ cZ 2R = ´ 2.7 ´ 1015 3 1ö æ1 Case II n = cZ 2R ç 2 - 2 ÷ è1 3 ø 32 n= ´ 2.7 ´ 1015 Þ 27 = 3.2 ´ 1015 Hz Þ
1 ö æ 1 = - 13.6 ç 2 - 2 ÷ è3 ¥ ø ~ - 1.51 eV -
30 (d) Electron angular momentum (mvr) about the nucleus is an integer multiple h of , where h is Planck’s constant. 2p Thus, angular momentum, nh Iw = mvr = 2p Hence, r µn
36 (b) The minimum energy to ionise an atom is the energy required to excite an electron in the atom from its ground state corresponding to n = 1, to its ionisation level corresponding to n = ¥. If the atom is given an amount of energy equal to the ionisation energy, the electron is just able to become a free electron and the atom is about to be ionised.
31 (b) Bohr's quantisation condition of angular momentum, h led to the quantisation of i.e. L = n 2p energy.
32 (d) We know that, the wavelength of emitted radiation is given by æ 1 1 1ö = R ç 2 - 2÷ = R ´ K l è n1 n2 ø 1 1 where, K = 2 - 2 n1 n2 For l max , K should be minimum which corresponds to n1 = 3, n2 = 4. So, transition takes place between n = 4 and n = 3 states.
33 (c) We know that, frequency, n=
æ 1 c 1ö = c× R ç 2 - 2 ÷ l è n1 n2 ø
æ 1 n 1ö = Z 2R ç 2 - 2 ÷ c è n1 n2 ø
37
When this occurs, one outermost electron from the atom is just to be removed from the atom. Much higher energy is necessary to free an innermost electron from the atom because this will occur only after the outermost electrons are all removed. 1 1ö æ1 (d) As, = RZ 2 ç 2 - 2 ÷ è1 l 2 ø 1 µZ 2 l 1 lµ 2 Þ Z For di-ionised lithium, the value of Z is maximum. Hence, l is minimum.
38 (b) Time period for orbital motion of electron, T = Þ Þ Þ
4 e 20n3h3 mZ 2e4
T µ n3 1 µ n3 Frequency ( f ) f µ n- 3
39 (c) The hydrogen atom before the transition was at rest. Therefore, from conservation of momentum E So, pH- atom = pphoton = radiated c æ 1 1ö 13.6 ç 2 - 2 ÷ eV è n1 n2 ø = c - 27 Þ 1.6 ´ 10 ´v 1ö æ1 13.6 ç 2 - 2 ÷ ´ 1.6 ´ 10- 19 è1 5 ø = 3 ´ 108 ~ 4 ms-1 \ v = 4.352 ms-1 -
40 (b) For transition from 4E to E, (4 E - E ) =
hc l1
hc 3E 7 For transition from E to E, 3 ö hc æ7 ç E - E÷ = ø l2 è3
Þ
l1 =
Þ
l2 =
3hc 4E
…(i)
…(ii)
From Eqs. (i) and (ii), we get l1 4 = l2 9
41 (a) We know that, frequency, æ 1 1ö n = Rc ç 2 - 2 ÷ è n1 n2 ø
…(i)
n 1 is frequency of the series limit of Lyman series, hence put n1 = 1 and n2 = ¥ in Eq. (i), this gives 1ö æ n 1 = Rc ç1 - ÷ = Rc è ¥ø Similarly, for first line of Lyman series, put n1 = 1 and n2 = 2 in Eq. (i), this gives 1ö 3 æ n 2 = Rc ç1 - ÷ = Rc è 4ø 4
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ATOMS AND NUCLEI
Similarly, for n 3, put n1 = 2 and n2 = ¥ in Eq. (i), this gives æ 1 1 ö Rc n 3 = Rc ç - ÷ = è 4 ¥ø 4 Þ n1 - n2 = n3
42 (d) Number of spectral lines obtained due to transition of electrons from nth orbit to lower orbit is given by n (n - 1) N = 2 n1 (n1 - 1) Case I 6= 2 Þ n12 - n1 - 12 = 0 Þ (n1 - 4 )(n1 + 3) = 0 Þ n1 = 4 Because n1 cannot be negative, i.e. - 3. n (n - 1) Case II 3 = 2 2 2 Þ n22 - n2 - 6 = 0 Þ (n2 + 2)(n2 - 3) = 0 n2 = 3 Because n2 cannot be negative, i.e. - 2. Velocity of electron in hydrogen atom in nth orbit, 1 v n v 3 vn µ Þ n= 2 Þ 6 = n vn¢ n1 v3 4
43 (b) Since, spectrum of an oil flame
44
consists of continuously varying wavelength in a definite wavelength range, it is an example for continuous emission spectrum. (b) Velocity of electron in nth shell can be related as 1 vn µ n v v2 1 So, = Þ v2 = 1 2 v1 2 v1 Þ Dv = v1 - v2 = 2 Hence, percentage change in the speed of electron = 50
45 (c) The kinetic energy is equal to half of magnitude of potential energy. 1 Ke2 Ke2 So, KE = = 2r 2 r
46 (b) Since, we know KE = -E0 = - (-13.6 eV) = 13.6 eV The kinetic energy of the electron in this state is 13.6 eV.
47 (a) Radius of Bohr’s orbit, r µ n2 Þ
Þ
r1 æ n1 ö =ç ÷ r2 è n2 ø 5.29 ´ 10- 11 æ 1 ö =ç ÷ è 2ø r2
2
2
Þ
r2 = 5.29 ´ 10- 11 ´ 4 = 21.16 ´ 10
- 11
m
48 (c) We can write the expression for the circular motion of electron around the nucleus Felectrostatic = Fcentripetal Þ Þ Þ
1 e2 mv 2 = 4 pe 0 a02 a0
(l shortest ) Brackett = (l shortest ) Balmer 1 1 Þ = (l shortest ) (l shortest ) æ 1ö æ 1ö Z 2R ç 2 ÷ = R ç ÷ Þ è4ø è4 ø Z2 = 4 Þ Z = 2
Þ
54 (d) Given, radius, r = 0.1 nm 2
e 1 4 pe 0 ma0 e v= 4 pe 0a0m
v2 =
53 (d) According to the question,
49 (c) Energy of photon can be given by 1ö æ E = Rhc ç1 - 2 ÷ è n ø hc 1ö æ = Rch ç1 - 2 ÷ è l n ø 1 1ö æ Þ = R ç1 - 2 ÷ è l n ø 1 1 1 1 =1- 2 Þ 2 =1Þ lR lR n n 1 (lR - 1) lR Þ n= Þ 2= lR (lR - 1) n
Þ
50 (d) Energy of the ionised He2+ , E = (E0 ) Z 2 = (13.6) (4) = 54.4 eV
51 (d) Assertion It is not essential that all the lines available in the emission spectrum will also be available in the absorption spectrum. Reason The spectrum of hydrogen atom may not be absorption spectrum.
52 (b) If all the elements having n > 4 are removed the number of elements that will be present in the periodic table are calculated as (i) n = 1, represents K shell and the number of elements having K shell = 2 [ in accordance with 2n2 ] (ii) n = 2, represents L shell and the number of elements having L shell =8 (iii) n = 3, represents M shell and the number of elements having M shell = 18 (iv) n = 4, represents N shell and the number of elements having N shell = 32 So, the total number of elements having n < 5 are 2 + 8 + 18 + 32 = 60
n2 r0 Z r n= r0
We know that, rn = \
We know, By putting the values, c Z 3 ´ 108 vn = 0 × = 137 137 n =
3 ´ 108 137
(QZ = 1)
r0 r
53 ´ 10-12 = 160 . ´ 106 m/s . ´ 10- 9 01
55 (b) The electromagnetic spectrum in this case lies in Balmer series.
56 (d)
DE = hn é 1 1ù DE n= = kê - 2ú 2 h ( ) n 1 n ë û (2n - 1) k × 2n (\n >> 1) = =k 2 n (n - 1)2 n2 × n2 2k » 3 n 1 Þ vµ 3 n
n2 r0 Z According to the question, rn = 21.2 ´ 10-11
57 (b) We know that, rn =
n2 ´ 5.3 ´ 10-11 1 21.2 n2 = Þ n=2 5.3
Þ 21.2 ´ 10-11 = Þ
58 (a) According to the question, energy, E = - 3.4 eV This corresponds to n = 2. So, the angular momentum of the nh 2 ´ 6.626 ´ 10-34 electron, mvr = = 2p 2 ´ 3.14 6.626 ´ 10-34 = 3.14 = 2.1 ´ 10-34 J-s
59 (a) The wavelength can be given as æ 1 1 1ö = Z 2R ç 2 - 2 ÷ l è n1 n2 ø
…(i)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
æ 1 1ö For l to be shortest, if ç 2 - 2 ÷ should è n1 n2 ø be maximum So, n2 = ¥ and n1 = 1 Now, from Eq. (i) 1 æ 1ö =Rç ÷ è 1ø l 1 1 ~ 1000 Å Þ l= = 7mR 10
60 (a) According to Bohr’s theory of
13.6 eV (2)2 Therefore, excitation energy, 13.6 - (-13.6) DE = E2 - E1 = 4 = - 3.4 + 13.6 = 10.2 eV E2 = -
64 (c) The spectrum produced by emergent light is band absorption spectrum.
65 (d) For first line of Lyman series, n1 = 1 and n2 = 2
hydrogen atom, we know that, nh Angular momentum, mvr = 2p nh Þ mv = 2pr nh Linear momentum, p = mv = 2pr n pµ Þ r As, r µ n2 1 Hence, p µ n We know that, kinetic energy 1 and r µ n2 KE µ r 1 Hence, KE µ 2 n
1 1ö æ1 = R ç 2 - 2÷ è l1 1 2 ø 1 ö 3R æ = R ç1 - ÷ = è 4ø 4 For first line of Paschen series, n1 = 3 and n2 = 4
\
1 1ö æ 1 = Rç 2 - 2 ÷ è l2 3 4 ø æ 1 1 ö 7R = Rç - ÷ = è 9 16 ø 144 l 1 7R 4 7 \ = ´ = l 2 144 3R 108
\
l 1 : l 2 = 7 : 108
66 (c) Since, we know, limiting 2
n Å Z Here, n = 1and for hydrogen atom, Z = 1 (1)2 \ r1 = 0.53 Å = 0.53 ´ 10- 10 m 1 = 5.3 ´ 10–11 m
61 (c) Radius of nth orbit, rn = 0.53
wavelength of the Lyman series, 1 l = = 912Å R For series limit of Balmer series, we can write, n2 = 2, n1 = ¥ æ 1 1 1ö Þ = Rç 2 - 2÷ l è n2 n1 ø
62 (c) When transition is from upper state to lower state, the energy is evolved. Therefore, options (c) and (d) are practicable. In option (c), 1ö 3 æ1 E = - Rch ç 2 - 2 ÷ = - Rch è1 4 2 ø 1ö æ 1 In option (d), E = - Rch ç 2 - 2 ÷ è2 6 ø 2 = - Rch 9 Thus, maximum energy is evolved in option (c), when transition takes place between n = 2 to n = 1.
63 (c) Given, ground state energy of hydrogen atom, E1 = -13.6 eV Energy of electron in first excited state, i.e. n = 2
\
é 1 1 ù R =Rê 2 ú= ¥ 2 ( ) ( )2 û 4 ë 4 l = = 4 ´ 912 ´ 10-10 m R = 912 ´ 4Å
67 (b) Ionisation energy corresponding to ionisation potential = - 13.6 eV Photon energy incident = 12.1 eV So, the energy of electron in excited state = -13.6 + 12.1 = –1.5 eV 13.6 i.e. En = - 2 eV n -13.6 -1. 5 = n2 13.6 Þ n2 = =9 -1.5 Þ n=3
i.e. the energy of electron in excited state corresponds to third orbit. The possible spectral lines are when electron jumps from orbit 3rd to 2nd, 3rd to 1st and 2nd to 1st. Thus, three spectral lines are emitted.
68 (c) For an electron to remain orbiting around the nucleus, the angular momentum (L) should be an integral h . multiple of 2p nh i.e. mvr = 2p where, n = principal quantum number for electron (1, 2 ¼) and h = Planck’s constant.
69 (d) Solar spectrum is an example for line absorption spectrum.
70 (b) The series end of Lyman series corresponds to transition from ni = ¥ to nf = 1, corresponding to the wavelength, 1 æ1 1 ö = Rç - ÷ = R è1 ¥ø (l min )L 1 …(i) Þ (l min )L = = 912 Å R For last line of Balmer series, é 1 1 1 ù R = Rê 2 ú= (l min )B 2 ( ) ( ¥ )2 û 4 ë 4 …(ii) Þ (l min )B = = 3636 Å R Dividing Eq. (i) by Eq. (ii), we get (l min )L = 0.25 (l min )B
71 (a)
1 lH 2
é 5ù é 1 1ù = RZH2 ê - ú = R(1)2 ê ú ë 36 û ë 4 9û
1 1ù é 3ù 2 é1 = RZHe êë 4 - 16 úû = R(4 )êë 16 úû l He l He 1 é 16 5 ù 5 = ´ = l H 2 4 êë 3 36 úû 27 Þ l He =
5 ´ 6561 = 1215Å 27
72 (a) We know that, the angular momentum of the electron of hydrogen atom, nh …(i) Ln = 2p But according to question, the angular momentum in 2nd orbit is L. 2h h …(ii) So, L= = 2p p Hence, the angular momentum in 4th orbit is
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ATOMS AND NUCLEI
L4¢ =
4 h 2h = = 2L p 2p
73 (a) Energy of emitted radiation, æ 1 1ö E = Rhc ç 2 - 2 ÷ è n1 n2 ø 1ö æ 1 Þ R(4 ® 3) = Rhc ç 2 - 2 ÷ è3 4 ø æ 7 ö = Rhc ç ÷ = 0.05 Rhc è 9 ´ 16 ø 1ö æ 1 E(4 ® 2) = Rhc ç 2 - 2 ÷ è2 4 ø æ 3ö = Rhc ç ÷ = 0. 2Rhc è 16 ø é 1 1 ù E(2 ® 1) = Rhc ê 2 ú (2 )2 û ë (1) æ 3ö = Rhc ç ÷ = 0.75Rhc è4ø é 1 1 ù and E(1 ® 4) = Rhc ê 2 - 2 ú (1) û ë (4 ) 8 = - Rhc = - 0.9Rhc 9 Thus, transition III gives largest amount of energy.
74 (a) The energy of hydrogen atom when the electron revolves in nth orbit is - 13.6 E= eV n2 In the ground state, n = 1 - 13.6 E= = -13.6 eV \ 12 -13.6 For n = 2, E = = - 3.4 eV 22 So, kinetic energy of electron in the first excited state, i.e. for n = 2 is K = - E = - (- 3.4) = 3.4 eV
75 (d) The wavelength of different spectral lines of Lyman series is given by 1 é1 1ù = RH ê 2 - 2 ú , where n = 2, 3, 4 ,..... . l ë1 n û For shortest wavelength , n = ¥ 1 RH \ = l 1 1 1 or l = = RH 109678 cm - 1 = 9117 . ´ 10- 6 cm = 9117 . ´ 10- 8 m = 9117 . ´ 10- 10 m = 9117 . Å
76 (a) Since, we know, the energy of an electron in H-like atom in nth orbit , -13.6 2 En = Z n2 For hydrogen atom, -13.6 (Z = 1)...(i) En1 = n2 + For He ion, -13.6(2)2 ...(ii) En2 = n2 From Eqs. (i) and (ii), we get En2 = (2)2 En1 En2 = 4 En1
Þ
77 (c) Radius of nth Bohr’s orbit of hydrogen like atom, n2 rn µ Z where, Z is the atomic number. For first orbit. n=1 1 \ rn µ Z Now, for radius of 1st orbit to be minimum, its atomic number must be greater. Here, in the problem, atomic number Z is greater for double ionised lithium, i.e. Z = 3. Hence, for the radius of 1st orbit will be minimum.
78 (c) For K a -line, we can write, 1 1ö æ1 = R (Z - 1)2 ç 2 - 2 ÷ è la 1 2 ø 1 3 = R (Z - 1)2 ´ la 4 4 Þ R (Z - 1)2 = 3l a Ionisation energy is given by æ 1 1ö E = Rhc (Z - 1)2 ç 2 - ÷ è1 ¥ø 4 = hc 3l a -34
=
8
6.6 ´ 10 ´ 3 ´ 10 ´ 4 3 ´ 1.54 ´ 10-10 -15
= 1.7 ´ 10
J
79 (a) According to Bohr’s hypothesis, electron can revolve only in those orbits in which its angular momentum h , where h is an integral multiple of 2p being the Planck’s constant. In these orbits, angular momentum of electron can have magnitude as
h 2h 3h ,…, etc, but can never have 2p ¢ 2p ¢ 2p 15 . h 2.5h 3.5h , …, etc. magnitude as , , 2p ¢ 2p ¢ 2p This is called the quantisation of angular momentum.
80 (a) As, ionisation energy = hcRZ 2 For Li 2+ , Z = 3 \ Ionisation energy = (3)2 hcR = 9hcR
81 (c) Since, radius of nth orbit is given by rn µ
n2 Z
æ n2 ö æ n2 ö =ç ÷ ç ÷ è Z ø for Be3 + è Z ø for H n2 12 = Þn = 2 4 1
82 (d) We know that, radius of nth orbit, rn µ n2 Hence, area, An µ n4 Hence,
A2 n24 ( 2 )4 = = A1 n14 (1)4
Þ
A2 16 = A1 1 A2 : A1 = 16 : 1
83 (c) The Bohr model of hydrogen atom can be extended to hydrogen like atoms. Energy of such an atom is given by Z2 En = - 13.6 2 n Here, Z = 11for Na-atom, 10 electrons are removed already, so it is 10 times ionised. For the last electron to be removed, 13.6(11)2 eV En = \ (1)2 Þ
En = - 13.6 ´ (11)2 eV
Hence, ionisation energy is 13.6 ´ (11)2 eV.
84 (a) In H-atom, E2 - E1 = 10.2 eV. Since, energy difference is 10.2 eV which is greater than kinetic energy 5 eV, thus the electron excites the hydrogen atom. Hence, collision must be elastic.
85 (c) The energy of first excitation of sodium is E = hn =
hc l
776
\
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
E=
6.63 ´ 10-34 ´ 3 ´ 108 J 5896 ´ 10-10
E = 3.37 ´ 10-19 J Also, since 1.6 ´ 10-19 J = 1 eV 3.37 ´ 10-19 E= \ 1.6 ´ 10-19 Þ E = 2.1 eV Hence, corresponding first excitation potential is 2.1 V.
86 (d) At the time of solar eclipse, all Fraunhoffer lines changed into bright coloured lines.
87 (b) When an electric discharge is passed through mercury vapour lamp, eight to ten lines from red to violet are seen in its spectrum. In some line spectrum there are only a few lines, while in many of them there are hundereds of them. Hence, mercury vapour lamp gives line spectrum.
On dividing Eq. (ii) by Eq. (i), we get lL 4 = lS 3
According to question, æ 1 1 1ö = Z 2R ç 2 - 2 ÷ l1 è nC nB ø
Given, l S = 91.2 nm 4 l L = 91.2 ´ Þ 3 = 121.6 nm
æ 1 1 1ö = Z 2R ç 2 - 2 ÷ l2 è nB nA ø
…(ii)
æ 1 1 1ö = Z 2R ç 2 - 2 ÷ l3 è nC nA ø
…(iii)
90 (a) The clockwise rotation is assigned 1 while the anti-clockwise 2 1 rotation is assigned by - . 2 by +
91 (a) Total energy in nth Bohr’s orbit, 13.6 eV n2 where, n is the principal quantum number. æ 1 1 ö E2 - E1 = - 13.6 ç ÷ è (2 )2 ( 1)2 ø En = -
æ 1 1ö 13.6 ´ 3 = - 13.6 ç - ÷ = è 4 1ø 4
88 (b) The wavelength of Balmer’s series for n is given by 1 1ö æ 1 = R ç 2 - 2÷ è2 l n ø where, R is Rydberg’s constant. For Balmer series, n = 3 gives the first member of series and n = 4 gives the second member of series. Hence, 1 1ö æ 1 æ 5ö = R ç 2 - 2 ÷ = R ç ÷ …(i) è2 è 36 ø l1 3 ø Þ
Þ
1 1ö æ 1 = R ç 2 - 2÷ è2 l2 4 ø æ 12 ö 3R =Rç ÷= è 16 ´ 4 ø 16
= 0.75 ´ 13.6 eV æ 1 1ö E3 - E2 = - 13.6 ç 2 - 2 ÷ è3 2 ø æ 1 1ö = - 13.6 ç - ÷ è9 4ø 5 = 13.6 ´ 36 = 0.14 ´ 13.6 eV Therefore, the energy difference between consecutive energy levels decreases with increase in quantum number.
92 (b) In fluorescence, emission of light …(ii)
l 2 16 5 20 = ´ = l1 3 36 27
Given, l 1 = l 20 l2 = l Þ 27
89 (a) The wavelength (l) of lines is given by 1 1ö æ1 = R ç 2 - 2÷ è1 l n ø For Lyman series, the shortest wavelength is for n = ¥ and longest is for n = 2. 1 æ 1ö …(i) = R ç 2÷ \ è1 ø lS 1 1ö 3 æ1 = R ç 2 - 2 ÷ = R …(ii) è1 lL 2 ø 4
stops as soon as incidence of light stops.
93 (c) Wave number is given by n=
Adding Eqs. (i) and (ii), we have, æ 1 æ 1 1 1 1ö 1ö + = Z 2R ç 2 - 2 ÷ + Z 2R ç 2 - 2 ÷ l1 l2 è nC nB ø è nB nA ø Þ
é 1 1 1 1ù l2 + l1 = Z 2R ê 2 - 2 + 2 - 2 ú l 1l 2 ë nC nB nB nA û
é 1 l1 + l2 1ù = Z 2R ê 2 - 2 ú l 1l 2 n n ë C Aû l1 + l2 1 [from Eq. (iii)] = l 1l 2 l3 ll l3 = 1 2 Þ l1 + l2 Þ
95 (b) Potential energy of electron in ground state = 2 ´ total energy in this state = 2 ´ (- 13.6 eV) = - 27.2 eV
96 (a) The frequencies of the emitted photon in the Paschen series are given by, æ 1 1ö v = Rc ç 2 - 2 ÷ , where n = 4 , 5, 6, ..... è3 n ø The highest frequency corresponds to n = ¥. Rc 1097 ´ 107 ´ 3 ´ 108 . \ n highest = = 9 9 = 0.37 ´ 1015 s-1 = 3.7 ´ 1014 s-1 = 3.7 ´ 1014 Hz
97 (b) In a hydrogen atom, the time period
æ 1 1 1ö = Rç 2 - 2÷ l è n1 n2 ø
is given by T µ n3 T1 æ n1 ö =ç ÷ T2 è n2 ø
Given n1 = 2, n2 = 3 æ 1 1ö n =Rç 2 - 2÷ Þ è2 3 ø 5R \ n= 36
Þ
94 (b) From the energy level diagram as shown below C E1
…(i)
E3 B E2 A
Þ
8 æ n1 ö =ç ÷ 1 è n2 ø n1 2 = n2 1
3
3
The values in the given option (b) gives this ratio for n1 and n2, hence it is correct.
98 (b) Bohr’s atom model assumes that electron is in a quantised orbit will not radiate energy.
Topic 3 Nucleus and Radioactivity 2019 1 a-particle consists of
[NEET]
(a) 2 electrons, 2 protons and 2 neutrons (b) 2 electrons and 4 protons only (c) 2 protons only (d) 2 protons and 2 neutrons only
2 The rate of radioactive disintegration at an instant for a radioactive sample of half-life 2. 2 ´ 109 s is 1010 s -1 . The number of radioactive atoms in that sample at that instant is (a) 317 (b) 317 . ´ 1020 . ´ 1017 [NEET (Odisha)] (c) 317 (d) 317 . ´ 1018 . ´ 1019 3 Ba-122 has half-life of 2 min. Experiment has to be done using Ba-122 and it takes 10 min to set up the experiment. If initially 80 g of Ba-122 was taken, how much Ba was left when experiment was started? [JIPMER] (a) 2.5 g (b) 5 g (c) 10 g (d) 20 g 4 In which radiation atomic number and mass number are not affected? [JIPMER] (a) a-radiation (b) g-radiation (c) b- radiation (d) None of these 5 If half-life of an element is 69.3 h, then how much of its per cent will decay in 10th to 11th h? (Initial activity = 50 mCi) [AIIMS]
(a) 1%
(b) 2%
(c) 3%
(d) 4%
6 Assertion In both radioactivity and photoelectric effect, electrons may be ejected. Reason In photoelectric effect and radioactivity emission occurs only of unstable elements. [JIPMER] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 7 Assertion For an element generally N ³ Z (N = number of neutrons, Z = atomic number). Reason Neutrons always experience attractive nuclear force. [JIPMER] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct, but Reason is not the correct explanation of Assertion. (c) Assertion is true but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2018 8 For a radioactive material, half-life is 10 minutes. If initially there are 600 number of nuclei, the time taken for disintegration of 450 nuclei is [NEET] (a) 30 (b) 10 (c) 20 (d) 15 9 The half-life a radioactive substance is 20 min. The approximate time interval ( t 2 - t 1 ) between the time t 2 , 2 1 when of it has decayed and time t 1 , when of it had 3 3 decayed is [AIIMS] (a) 14 min (b) 20 min (c) 28 min (d) 7 min
10 Assertion Radioactive nuclei emits b-particles. Reason Electron exist inside the nucleus. [AIIMS] (a) Both Assertion and Reason are correct and Reason is correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct. 2017 11 Radioactive material (A) has decay constant 8 l and material (B) has decay constant l. Initially, they have same number of nuclei. After what time, the ratio of number of nuclei of material B to that A will be I / e ? [NEET] 1 1 1 1 (b) (c) (d) (a) l 7l 8l 9l 12 Assertion In a-decay, atomic number of daughter nucleus reduces by a unit from the parents nucleus. Reason An a-particle carriers four units of mass. [AIIMS] (a) Both Assertion and Reason are correct and Reason is correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct. 13 When the radioactive isotope 85 Ra 225 decays in a series by emission of three alpha (a) and a beta (b) particle, the isotope X which remains undecay is [JIPMER] (a) 80 X 213 (b) 84 X 218 (c) 84 X 225 (d) 83 X 223 14 Radioactive decay will occur as follows 220 ¾® 84 Po 216 + 2 He4 , half-life = 55 s 86 Rn 84 Po
216
¾® 82 Pb 212 + 2 He4 , half-life = 0.66 s
82 Pb
212
¾® 82 B212 + l° e , half-life = 10.6 h
778
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
If a certain mass of radon (Rn = 220) is allowed to decay, then after 5 min the element with greater mass will be (a) radon (b) lead [JIPMER] (c) polonium (d) bismuth
15 The half-life period of a radioactive element X is same as the mean life of another radioactive element Y. Initially, both of them have same number of atoms, then [JIPMER] (a) X and Y have same decay rate initially (b) X and Y have same decay rate always (c) Y will decay faster (d) X will decay faster
2016 16 The half-life a radioactive substance is 30 min, the time taken between 40% decay and 85% decay is [NEET] (a) 15 (b) 30 (c) 45 (d) 60
2015 17 If radius of the 13 Al 27 nucleus is taken to be R Al , then the radius of æ 53 ö (a) ç ÷ è 13 ø
53 Te 1/ 3
125
R Al
is nearly
5 3 (b) R Al (c) R Al 3 5
[CBSE]
æ 13 ö (d) ç ÷ R Al è 53 ø
2014 18 A radio isotope X with a half-life 1.4 ´ 109 yr decays of Y which is stable. A sample of the rock from a cave was found to contain X and Y in the ratio 1 : 7. The age of the rock is [CBSE AIPMT] (a) 1.96 ´ 109 yr (b) 3.92 ´ 109 yr (c) 4.20 ´ 109 yr (d) 8.40 ´ 109 yr
19 After 300 days, the activity of a radioactive sample is 5000 dps (disintegration per second). The activity becomes 2500 dps after another 150 days. The initial activity of the sample (in dps) is [Kerala CEE] (a) 20000 (b) 10000 (c) 7000 (d) 25000 (e) 15000 20 For the radioactive nuclei that undergo either a or b decay, which one of the following cannot occur? [WB JEE] (a) Isobar of original nucleus is produced (b) Isotope of the original nucleus is produced (c) Nuclei with higher atomic number than that of the original nucleus is produced (d) Nuclei with lower atomic number than that of the original nucleus is produced 21 In a given reaction, A ® Z + 1Y A ® Z X
A-4 ® Z - 1K
A-4 Z - 1K
The radioactive radiations are emitted in the sequence of (a) a , b , g (b) g , a , b [UK PMT] (c) b , a , g (d) g , b , a
2013 22 The mother and daughter elements, with emission of g-rays are (a) isotopes (c) isomers
[AIIMS]
(b) isobars (d) isodiapheres
23 The half-life of a radioactive isotope X is 20 yr. It decays to another elementY which is stable. The two elements X and Y were found to be in the ratio 1 : 7 in a sample of a given rock. The age of the rock is estimated to be [NEET] (a) 40 yr (b) 60 yr (c) 80 yr (d) 100 yr 24 The half-value period of a radioactive nuclide is 3 h. In 9 h, its activity will be reduced by a factor of [UP CPMT] 1 1 1 1 (a) (b) (c) (d) 9 27 6 8 25 A radioactive element has half-life period of 600 yr, what amount will remain in 3000 yr? [UP CPMT, KCET] 1 1 (a) (b) 2 16 1 1 (d) (c) 8 32 26 In a sample of radioactive material, what percentage of the initial number of active nuclei will decay during one mean life? [KCET] (a) 37% (b) 50% (c) 63% (d) 69.3%
2012 27 A mixture consists of two radioactive materials A1 and A 2
with half lives of 20 s and 10 s respectively. Initially, the mixture has 40 g of A1 and 160 g of A 2 . The amount of the two in the mixture will become equal after [CBSE AIPMT] (a) 60 s (b) 80 s (c) 20 s (d) 40 s
28 Two radioactive samples A and B have decay constant 6l and 2l, respectively. If initially they have the same number of nuclei, then the ratio of the number nuclei A to that of B 1 will be after a time e [MP PMT] 1 1 1 1 (a) (b) (c) (d) l 4l 2l 3l 29 A count rate metre shows a count of 240/min from a given radioactive source. One hour later, the metre shows a count rate of 30/min. The half-life of the source is [Manipal] (a) 80 min (b) 120 min (c) 20 min (d) 30 min 30 Two radioactive substances A and B have decay constants 5l and l respectively. At t = 0, they have the same number of nuclei. The ratio of number of nuclei of A to that of B will be (1/ e ) 2 after a time interval of [WB JEE] 1 1 1 1 (b) (c) (d) (a) l 2l 3l 4l
779
ATOMS AND NUCLEI
2011 31 In the nuclear reaction the X will be (b) 11 H (a) 0-1 e
14 7 N
+ X ¾®
14 1 1 6 C + 1 C + 1 H,
[WB JEE]
(c) 12 H
(d) 10 n
32 Which of the following quantities for a nucleus is independent of its mass number? [J&K CET] (a) Density (b) Volume (c) Mass (d) Radius 33 A radioactive nucleus of mass M emits a photon of frequency n and the nucleus recoils. The recoil energy will be [CBSE AIPMT] (a) h 2 n 2 / 2Mc 2 (b) zero (c) hn (d) Mc 2 - hn 34 The radioactivity of a sample is I 1 at a time t1 and I 2 at a time t 2 . If the half-life of the sample is T1/ 2 , then the number of nuclei that have disintegrated in the time t 2 - t 1 is proportional to [J&K CET] (a) I 1 t 2 - I 2 t 1 (b) I 1 - I 2 I - I2 (c) 1 (d) ( I 1 - I 2 )T1/ 2 T1/ 2 35 A radioactive nucleus of mass number A, initially at rest, emits an a-particle with a speed v. The recoil speed of the daughter nucleus will be [J&K CET] 2v 2v 4v 4v (a) (b) (c) (d) A-4 A+4 A-4 A+4 36 The fraction of the initial number of radioactive which remain undecayed after half of a half-life radioactive sample is 1 1 1 1 (a) (b) (d) (c) 4 2 2 2 2 37 1 curie represents (a) 3.7 ´ 107 dps (b) 3.7 ´ 1010 dps (c) 106 dps (d) 1 dps m n
nuclei of the [KCET]
[KCET]
-
38 A nucleus X emits one a-particle and two b -particles. The resulting nucleus is [CBSE AIPMT] m-6 m-4 m-4 (a) n Z (b) n X (c) n - 2 Y (d) n - 4 Z m - 6 39 In beta minus decay, a neutron transforms with the nucleus according to [J&K CET] (a) p ® n + e + + n (b) n ® p + e - + n (d) n ® p + e - + n (c) n ® p + e + + n 40 Following process is known as hn ¾® e + + e - [BVP] (a) pair production (b) photoelectric effect (c) Compton effect (d) Zeeman effect 41 Particles that are exchanged in weak interaction are (a) mesons (b) photons [Manipal] (c) bosons (d) gravitons 42 If the radius of a nucleus of mass number 3 is R, then the radius of a nucleus of mass number 81 is [Manipal] (a) 3 R (b) 9 R (c) ( 27 )1/ 2 R (d) 27 R
43 A luminous body radiates energy at a rate 3.6 ´ 1028 J / s, then loss of the mass of the body per second is [OJEE] (a) 2 ´ 103 kg /s (b) 3 ´ 104 kg /s (c) 4 ´ 1011 kg / s (d) 5 ´ 105 kg /s 44 The nucleus which has radius one-third of the radius of [Kerala CEE] Os 189 is (d) C12 (c) F19 (b) Li 7 (a) Be 9 (e) O 16 45 The density of a nucleus of mass number A is proportional to [DUMET] (a) A 3 (b) A 1/ 3 (c) A (d) A 0 46 The radius of a copper nucleus is of the order of [DUMET] (a) 10- 16 m (b) 10- 14 m - 12 -9 (c) 10 m (d) 10 m 47 Radius of 2 He 4 nucleus is 3 Fm. The radius of nucleus will be (a) 5 Fm (b) 6 Fm (c) 11.16 Fm (d) 8 Fm
82 Pb
206
[JCECE]
48 The element 92 U 238 on absorbing a neutron goes over to 239 . The nucleus emits an electron to go over to 92 U neptunium which on further emitting an electron goes over to plutonium. The resulting plutonium can be expressed as [MGIMS] (b) 92 Pb 219 (a) 94 Pb 239 240 240 (d) 92 Pb (c) 93 Pb 49 The disintegration rate of a certain radioactive sample at any instant is 5400 disintegrations per minute. 5 min later, the rate becomes 600 disintegrations per minute. Half-life of sample is [EAMCET] ln 3 ln 3 ln 32 ln 9 (a) (b) (c) (d) ln 2 ln 5 ln 9 ln 32
2010 50 The activity of a radioactive sample is measured as N 0 counts per minute at t = 0 and N/e counts per minute at t = 5 min. The time (in minute) at which the activity reduces to half its value is [CBSE AIPMT] 5 (c) 5 log 10 2 (d) 5 log e 2 (a) log e 2/ 5 (b) log e 2
51 Assertion The mass of b -particles when they are emitted is higher than the mass of electrons obtained by other means. Reason b -particle and electron, both are similar particles. }[AIIMS]
(a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
780
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
52 The half-life of radioactive radon is 3.8 days. The time at the end of which (1/20) th of the radon sample will remain undecayed is (given, log 10 e = - 0.4343). [AFMC] (a) 13.8 days (b) 16.5 days (c) 33 days (d) 76 days 53 A uranium nucleus 92 U 238 emits an a-particle and a b - particle in succession. The atomic number and mass number of the final nucleus will be [Kerala CEE] (a) 90, 233 (b) 90, 238 (c) 91, 234 (d) 93, 238 54 In a reaction 92 Be 234 ¾® 88 Y218 , the number of a and [Manipal] b -particles emitted respectively, are (a) 4, 4 (b) 1, 6 (c) 4, 8 (d) 4, 2 55 The fraction of a sample of radioactive nuclei that remains undecayed after one mean-life is [Manipal] 1 1 1 1 (a) (c) 2 (b) 1 (d) 1 - 2 e e e e 56 If 20% of a radioactive substance decay in 10 days. The amount of the original material left after 30 days is [Manipal] (a) 51.2% (b) 62.6% (c) 15% (d) 21.2% 57 1 mg gold undergoes decay with 2.7 days half-life period, amount left after 8.1 days is [Manipal] (a) 0.125 mg (b) 0.5 mg (c) 0.25 mg (d) 0.91 mg 58 Pick out the incorrect statement from the following. [Kerala CEE]
(a) b - emission from the nucleus is always accompanied with a neutrino. (b) The energy of the a-particle emitted from a given nucleus is always constant. (c) g-rays emission makes the nucleus more stable (d) Nuclear force is charge independent. (e) Fusion is the main process by which energy is released from a star.
63 The ratio of molecular masses of two radioactive substances is 3/2 and the ratio of their decay constants is 4/3. Then, the ratio of their initial activities per mole will be [BCECE] (a) 2 (b) 4/3 (c) 8/9 (d) 9/8 64 A radioactive isotope has a half-life of T yr. How long will it take the activity to reduce to 1% of its original value? (a) 3.2 T yr (b) 4.6 T yr [DUMET] (c) 6.6 T yr (d) 9.2 T yr 65 A radioactive material decays by simultaneous emission of two particles with half-lives 1620 yr and 810 yr respectively. The time in year after which one-fourth of the material remains is [JCECE] (a) 4860 yr (b) 3240 yr (c) 2340 yr (d) 1080 yr 66 The half-life of the isotope 11 Na 24 , is 15 h. How much time does it take for ( 7 / 8) th of a sample of this isotope to decay? [CG PMT] (a) 75 h (b) 65 h (c) 55 h (d) 45 h 67 If 92 U 238 emits 8 a-particles and 6 b -particles, then the resulting nucleus is [JIPMER] (b) 82 Pb 206 (a) 82 X 206 (d) 82 Z 214 (c) 82 X 210 68 Number of nuclei of a radioactive substance at time t = 0 are 2000 and 1800 at time t = 2 s. Number of nuclei left after t = 6 s is [MGIMS] (a) 1442 (b) 1554 (c) 1652 (d) 1458
2009 69 A sample of radioactive elements contains 3 ´ 109 nuclei.
59 Half-life of a radioactive substance is 20 min. The time between 20% and 80% decay will be [WB JEE] (a) 20 min (b) 30 min (c) 40 min (d) 25 min
If half-life time of element is 20 days, then the number of decayed nuclei after 60 days is [KCET] 9 9 (a) 2.6 ´ 10 (b) 2 ´ 10 (c) 7.5 ´ 108 (d) 3.6 ´ 108
60 When a neutron is disintegrated to give a b -particle, (a) a anti-neutrino alone is emitted [KCET] (b) a proton and neutrino are emitted (c) a proton alone is emitted (d) a proton and an anti-neutrino are emitted
70 A nucleus at rest breaks into two nuclear parts which have their velocities ratio equal to 2 : 1. What will be the ratio of their radii of the nuclei? [AIIMS] (a) 21/ 3 : 1 (b) 1: 21/ 3 (c) 23/ 2 : 1 (d) 1: 23/ 2
61 A radioactive sample, S 1 having the activity A1 has twice the number of nuclei as another sample S 2 of activity A 2 . If, A 2 = 2A1 , then the ratio of half-life of S 1 to the half-life [KCET] of S 2 is (a) 4 (b) 2 (c) 0.25 (d) 0.75 62 The activity of a radioactive sample is measured as 9750 count/min at t = 0 and 975 count/min at t = 5 min. The decay constant is nearly [BCECE] (a) 0.922 min - 1 (b) 0.691 min - 1 (c) 0.461 min - 1 (d) 0.230 min - 1
71 Assertion Electron capture occurs more than positron emission in a heavy nucleus. Reason In a heavy nucleus, electrons are relatively close to nucleus. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
781
ATOMS AND NUCLEI
72 The mass defect in a particular nuclear reaction is 0.3 g. The amount of energy liberated (in kWh) is (velocity of light = 3 ´ 108 m/s) [Manipal] (b) 2.5 ´ 106 (a) 1.5 ´ 106 (d) 7.5 ´ 106 (c) 3 ´ 106 73 Number of neutrons in C12 and C14 are (a) 8 and 6 (b) 6 and 8 (c) 6 and 6 (d) 8 and 8
[OJEE]
74 The amount of energy released when one microgram of matter is annihilated is [KCET] 10 (a) 25 J (b) 9 ´ 10 J (c) 3 ´ 1010 J (d) 0. 5 ´ 105 J 75 The nuclear force (a) is purely an electrostatic force (b) obeys inverse square law of distance (c) is equal in strength to gravitational force (d) is short range force
[J&K CET]
76 The number of beta particles emitted by a radioactive substance is twice the number of alpha particles emitted by it. The resulting daughter is an [CBSE AIPMT] (a) isobar of parent (b) isomer of parent (c) isotone of parent (d) isotope of parent 77 The electron emitted in beta radiation originates from (a) inner orbits of atoms [AFMC] (b) free electron existing in nuclei (c) decay of neutron in the nucleus (d) photon escaping from the nucleus 78 A radioactive element x converts into another stable element y. Half-life of x is 2 h, initially only x is present. After time t, the ratio of atoms of x and y is found to be 1: 4, then t (in hour) is [UP CPMT] (a) 2 (b) 4 (c) between 4 and 6 (d) 6 79 A radioactive isotope A with a half-life of 1.25 ´ 1010 yr decays into B which is stable. A sample of rock from a planet is found to contain both A and B present in the ratio 1 : 15. The age of the rock (in years) [J&K CET] 10 10 (a) 9.6 ´ 10 (b) 4.2 ´ 10 10 (d) 1.95 ´ 1010 (c) 5 ´ 10 80 A free neutron decays spontaneously into [JCECE] (a) a proton, an electron and anti-neutrino (b) a proton, an electron and a neutrino (c) a proton and electron (d) a proton, an electron, a neutrino and an anti-neutrino 81 One Becquerel is defined as [Haryana PMT, CG PMT] (a) 1 dps (b) 106 dps (c) 3.7 ´ 1010 dps (d) 103 dps
82 In radioactive decay process, the negatively charged emitted b -particles are [JIPMER] (a) the electrons present inside the nucleus (b) the electrons produced as a result of the decay of neutrons inside the nucleus (c) the electrons produced as a result of collisions between atoms (d) the electrons orbiting around the nucleus 83 In gamma ray emission from a nucleus [JIPMER] (a) both the neutron number and the proton number change (b) there is no change in the proton number and the neutron number (c) only the neutron number changes (d) only the proton number changes
2008 84 Two nuclei have their mass numbers in the ratio of 1 : 3. The ratio of their nuclear densities would be (a) 1 : 3 (b) 3 : 1 [CBSE AIPMT] (c) ( 3)1/ 3 : 1 (d) 1 : 1
85 What is the size of gold nuclei? (a) 3R 0 (b) 4R 0 (c) 5R 0
[DUMET]
(d) 5.8R 0
86 Which one of the following is a possible nuclear reaction? 4 13 1 (a) 10 [BCECE] 5 B + 2 He ¾® 7 N + 1 H 23 20 (b) 11 Na + 11 H ¾® 10 Ne + 42 He 239 (c) 239 93 Np ¾® 94 Pu + b + n 1 12 (d) 11 7 N + 1 H ¾® 6 C + b + n 87 Activity of a radioactive sample decreases to (1/3)rd of its original value in 3 days, then in 9 days its activity will become (a) (1/27) of the original value [AFMC] (b) (1/9) of the original value (c) (1/18) of the original value (d) (1/3) of the original value 88 A radioactive sample with a half-life of 1 month has the label activity = 2mCi on 1-8-1991. What was its activity two months earlier? [Manipal] (a) 1 mCi (b) 0.5 mCi (c) 4 mCi (d) 8 mCi 89 The masses of two radioactive substances are same and their half-lives are 1 yr and 2 yr, respectively. The ratio of their activities after 4 yr will be [KCET] (a) 1 : 4 (b) 1 : 2 (c) 1 : 3 (d) 1 : 6 90 If l is decay constant and N is the number of radioactive nuclei of an element, then the decay rate R of that element is [J&K CET] l 2 2 (d) l N (a) lN (b) lN (c) N
782
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
T 91 The ratio of half-life times of two elements A and B is A . TB l The ratio of respective decay constants A is [J&K CET] lB TB TA T A + TB T A - TB (b) (c) (d) (a) TA TB TA TA
92 For a nucleus to be in critical condition, the value of neutron multiplication factor (k) must be [J&K CET] (a) k > 1 (b) k < 1 (c) k = 1 (d) k = 0 93 Which of the following cannot be emitted by radioactive substances during their decay? [RPMT] (a) Protons (b) Neutrons (c) Helium nuclei (d) Electrons 94 A nucleus with Z = 92 emits the following in a sequence : a , a ,b - , b - ,a , a , a , a ; b - , b - , a , b + , b + , a . The Z of the resulting nucleus is [RPMT] (a) 76 (b) 78 (c) 82 (d) 74 95 A radioactive sample at any instant has its disintegration rate 5000 disintegrations per min. After 5 min, the rate is 1250 disintegrations per min. Then, the decay constant (per minute) is [RPMT] (a) 0.4 ln 2 (b) 0.2 ln 2 (c) 0.1 ln 2 (d) 0.8 ln 2
2007 96 The number of electrons, neutrons and protons in a species are equal to 10, 8 and 8 respectively. The proper symbol of the species is [Kerala PET] (a) 16 O8 (b) 18 O8 (c) 18 Ne10 (d) 16 O-8 (e) 16 O28 27 97 If the nucleus 13 Al has a nuclear radius of about 3.6 Fm, 125 then 52 Te would have its radius approximately as (a) 6 Fm (b) 9.6 Fm [CBSE AIPMT] (c) 12 Fm (d) 4.8 Fm
98 When a sample of solid lithium is placed in a flask of hydrogen gas, then following reaction happened 1 7 4 4 1 H + 3 Li ¾® 2 He + 2 He This statement is (a) true (b) false (c) May be true at a particular pressure (d) None of the above
[AFMC]
101 The volume of a nucleus is directly proportional to (where, A = mass number of the nucleus) [KCET] 3 (a) A (b) A (d) A 1/ 3 (c) A 102 The nucleus 6 C12 absorbs an energetic neutron and emits a beta particle (b ). The resulting nucleus is [Kerala CEE] (d) 6 C13 (c) 5 B13 (b) 7 N13 (a) 7 N14 (e) 5 B12 103 Select the true statement from the following. Nuclear force is [Kerala CEE] (a) strong, short range and charge independent force. (b) charge independent, attractive and long range force. (c) strong, charge dependent and short range attractive force. (d) long range, charge dependent and attractive force. (e) charge independent, short range and strong repulsive force. 104 The masses of proton and neutron are m p and mn , respectively. An element M of Z protons and N neutrons, then [MHT CET] (a) M > ( Zm p + Nmn ) (b) M = ( Zm p + Nmn ) (c) M < ( Zm p + Nmn ) (d) M may be greater than less than or equal to Zm p + Nmn , depending on nature of element 105 The radius of germanium (Ge) nuclide is measured to be twice the radius of 94 Be. The number of nucleons in Ge are (a) 73 (b) 74 [MP PMT] (c) 75 (d) 72 106 All nucleus in an atom are held by [J&K CET] (a) nuclear forces (b) van der Waals’ forces (c) tensor forces (d) Coulomb’s forces 107 The nucleus, 7 N14 is bombarded with 2 He 4 . The resulting nucleus is 8 O17 with the emission of [BCECE] (a) neutrino (b) anti-neutrino (c) proton (d) neutron 108 The energy spectrum of b -particles [number N ( E ) as a function of b -energy E] emitted from a radioactive source is [AIIMS] (a)
99 The volume occupied by an atom is greater than the volume of the nucleus by factor of about [BHU] (d) 105 (c) 101 (b) 1015 (a) 1010 100 A nucleus represented by the symbol (a) Z neutrons and A - Z protons (b) Z protons and A - Z neutrons (c) Z protons and A neutrons (d) A protons and Z - A neutrons
A Z
X has
[Manipal]
0
(c)
(b)
N(E)
E0
0
0
E
(d)
N(E)
E0 E
N(E)
E0 E
N(E) 0
E0 E
783
ATOMS AND NUCLEI
109 We have seen that a gamma-ray dose of 3 Gy is lethal to half the people exposed to it. If the equivalent energy were absorbed as heat, what rise in body temperature would result? [AIIMS] (a) 300 mK (b) 700 mK (c) 455 mK (d) 390 mK
119 In nuclear reaction, A 4 ¾® Z + 2 Y A + 3 + Z M A 2 He + Z X M denotes [AMU] (a) electron (b) positron (c) proton (d) neutron
110 Mass spectrometric analysis of potassium and argon atoms in a moon rock sample shows that the ratio of the number of (stable) 40 Ar atoms present to the number of (radioactive) 40 K atoms is 10.3. Assume that all the argon atoms were produced by the decay of potassium atoms, with a half-life of 1.25 ´ 109 yr. How old is the rock? (a) 2.95 ´ 1011 yr (b) 2.95 ´ 109 yr [AIIMS] 9 (c) 4.37 ´ 10 yr (d) 4.37 ´ 1011 yr
[DUMET]
111 A sample of radioactive element has a mass of 10 g at an instant t = 0. The approximate mass of this element in the sample after two mean lives is [BHU] (a) 3.70 g (b) 6.30 g (c) 1.35 g (d) 2.50 g 112 In a radioactive material, the activity at time t1 is R1 and at a later time t 2 , it is R 2 . If the decay constant of the material is l, then [MHT CET] - l(t 1 - t 2) l(t 1 - t 2) (a) R1 = R 2 e (b) R1 = R 2 e (c) R1 = R 2 ( t 2 / t 1 ) (d) R1 = R 2 113 A radioactive element forms its own isotope after 3 consecutive disintegrations. The particles emitted are (a) 3 b -particles [KCET] (b) 2 b -particles and 1 a-particle (c) 2 b -particles and 1 g-particle (d) 2 a -particles and 1 b-particle 114 A radioactive substance has half-life of 60 min. During 3 h, the fraction of the substance that has to be decayed, will be (a) 87.5% (b) 52.5% [BCECE] (c) 25.5% (d) 8.5% 115 Half-lives of two radioactive substances A and B are respectively 20 min and 40 min. Initially, the samples of A and B have equal number of nuclei. After 80 min, the ratio of remaining number of A and B nuclei is [JCECE] (a) 1 : 16 (b) 4 : 1 (c) 1 : 4 (d) 1 : 1 116 If the half-life of any sample of radioactive substance is 4 days, then the fraction of sample will remain undecayed after 2 days, will be [RPMT] 2-1 1 1 (a) 2 (b) (d) (c) 2 2 2
2006 117 Electrons in the atom are held to the nucleus by
[J&K CET]
(a) Coulomb’s forces (b) nuclear forces (c) van der Waals’ forces (d) gravitational forces 118 Mass of the nucleons together in a heavy nucleus is (a) greater than mass of nucleus [J&K CET] (b) equal to mass of nucleus (c) less than mass of nucleus (d) None of the above
120 The g-rays are originated from (a) nucleus (b) outermost shell of atom (c) innermost shell of atom (d) None of the above
121 The mass number of nucleus is [MHT CET] (a) sometimes equal to its atomic number (b) sometimes less than and sometimes more than its atomic number (c) always less than its atomic number (d) always more than its atomic number 122 M p and M n are masses of proton and neutron, respectively at rest. If they combine to form deuterium nucleus. The mass of the nucleus will be [RPMT] (a) less than M p (b) less than ( M p + M n ) (c) less than ( M p + 2M n ) (d) greater than ( M p + 2M n ) 123 The nucleus 238 92 U has 92 protons and 238 nucleons. It decays by emitting an a -particle and becomes [AIIMS] (a)
234 92 U
(b)
234 90 Th
(c)
235 92 U
(d)
237 93 Np
é 1ù 124 The fossil bone has a 14 C : 12 Cratio, which is ê ú of that ë 16 û in a living animal bone. If the half-life of 14 C is 5730 yr, then the age of the fossil bone is [AIIMS] (a) 11460 yr (b) 17190 yr (c) 22920 yr (d) 45840 yr
125 Assertion Cobalt-60 is useful in cancer therapy. Reason Cobalt-60 is source of g-radiations capable of killing cancerous cell. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 126 What is the disintegration constant of radon, if the number of its atoms diminishes by 18% in 24 h? [BHU] (b) 2.1 ´ 10-4 s -1 (a) 2.1 ´ 10-3 s -1 (d) 2.1 ´ 10-6 s -1 (c) 2.1 ´ 10-5 s -1 127 n a-particles per second are being emitted by N atoms of a radioactive element. The half-life of element will be (a) ( n / N ) s (b) ( N / n ) s [UP CPMT] 0.693N 0.693 n (c) (d) s s n N
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
128 The half-life of thorium X is 3.64 days. After how many days will 0.1 of the mass of a sample of the substance remain undecayed? [Kerala CEE] (a) 12.1 days (b) 24 days (c) 60 days (d) 4 days (e) 14 days 129 The radioactivity of a sample is x at time t1 and is y at time t 2 . If the mean-life of the specimen is t, the number of atoms that have disintegrated in the time interval [Guj CET] ( t 2 - t 1 ) is (a) x - y (b) ( x - y ) / t (c) ( x - y )t (d) xt 1 - yt 2
2005 130 The nuclei of which one of the following pairs of nuclei are isotones? (a) 34 Se 74 , 31 Ga 71 (c) 38 Sr 84 , 38 Sr 86
[CBSE AIPMT]
(b) (d)
92 92 42 Mo , 40 Zr 40 32 20 Ca , 16 S
131 Which of the following is most unstable? (a) Electron (b) Proton (c) Neutron (d) a-particle
[AFMC]
132 The particle A is converted into C via following reaction, A ¾® B + 2 He 4 , B ¾® C + 2e Then, [J&K CET] (a) A and C are isobars (b) A and C are isotopes (c) A and B are isobars (d) A and B are isotopes 133 In a nuclear reaction
C11 6
¾®
B11 5
135 Mean life of a radioactive sample is 100 s, then its half-life (in min) is [KCET] -4 (d) 1.155 (a) 0.693 (b) 1 (c) 10 136 Consider two nuclei of the same radioactive nucleid. One of the nuclei was created in a supernova explosion 5 billion years ago. The other was created in a nuclear reactor 5 min ago. The probability of decay during the next time is (a) different for each nuclei [KCET] (b) nuclei created in explosion decays first (c) nuclei created in the reactor decays first (d) independent of the time of creation 137 Two radioactive materials A and B have decay constants 10 l and l respectively. If initially they have the same number of nuclei, then the ratio of the number of nuclei of A to that of B will be 1/e after a time [Haryana PMT] 1 1 11 1 (b) (c) (d) (a) 10 l 11 l 10 l 9l 138 At a specific instant, emission of a radioactive compound is not deflected in a magnetic field. The compound can emit [Haryana PMT]
(a) electrons (b) protons
(c) neutrons (d) deuterons
139 In the nuclear reaction, -g
-a -a X 180 ¾® Y ¾® Z ¾® A ¾® P -b
72
+
+b + X , [Haryana PMT]
the atomic mass and atomic number of P are respectively (a) 170, 69 (b) 172, 69 [DUMET] (c) 172, 70 (d) 170, 70 (e) 91, 234
134 The phenomenon of radioactivity is [BHU] (a) exothermic change which increases or decreases with temperature (b) increases on applied pressure (c) nuclear process does not depend on external factors (d) None of the above
140 A nuclide X with mass number A and charge number Z, disintegrates into one a-particle and one b -particle. The resulting nuclide R has atomic mass and atomic number, equal to [RPMT] (a) ( A - Z ) and ( Z - 1) (b) ( A - Z ) and ( Z - 2) (c) ( A - 4 ) and ( A - 2) (d) ( A - 4 ) and ( Z - 1)
what does X stand for? (a) An electron (c) A neutron
(b) A proton (d) A neutrino
Answers 1 11 21 31 41 51 61 71 81 91 101 111 121 131
(d) (b) (c) (c) (c) (b) (a) (d) (a) (a) (a) (c) (a) (c)
2 12 22 32 42 52 62 72 82 92 102 112 122 132
(d) (d) (c) (a) (a) (b) (c) (d) (b) (c) (b) (a) (b) (b)
3 13 23 33 43 53 63 73 83 93 103 113 123 133
(a) (a) (b) (a) (c) (c) (b) (b) (b) (a) (a) (b) (b) (d)
4 14 24 34 44 54 64 74 84 94 104 114 124 134
(b) (b) (d) (d) (b) (a) (c) (b) (d) (b) (c) (a) (c) (c)
5 15 25 35 45 55 65 75 85 95 105 115 125 135
(a) (c) (d) (c) (d) (b) (d) (d) (d) (a) (d) (c) (a) (d)
6 16 26 36 46 56 66 76 86 96 106 116 126 136
(c) (d) (c) (d) (b) (a) (d) (d) (c) (e) (a) (b) (d) (d)
7 17 27 37 47 57 67 77 87 97 107 117 127 137
(d) (b) (d) (b) (c) (a) (b) (c) (a) (a) (c) (a) (c) (d)
8 18 28 38 48 58 68 78 88 98 108 118 128 138
(c) (c) (b) (b) (a) (a) (d) (b) (d) (a) (c) (a) (a) (c)
9 19 29 39 49 59 69 79 89 99 109 119 129 139
(b) (a) (c) (d) (c) (c) (a) (c) (a) (b) (b) (d) (c) (b)
10 20 30 40 50 60 70 80 90 100 110 120 130 140
(c) (b) (b) (a) (d) (a) (b) (a) (b) (b) (c) (a) (a) (d)
ATOMS AND NUCLEI
Explanations 1 (d) a-particles are doubly ionised 2+
helium nucleus (He ) which are emitted in any radioactive process. So, they have 2 protons, 2 neutrons in its nucleus and no electron.
2 (d) Given, half-life, T1/ 2 = 2.2 ´ 109 s Rate of disintegration, R = 1010 s -1 If N be the number of nuclei present, then the rate of disintegration is dN = lN (l = decay constant) dt R …(i) Þ R = lN or N = l Also, the half-life is given by 0.693 T1/ 2 = l 0.693 …(ii) Þ l= T1/ 2 From Eqs (i) and (ii), we get R N = ´ T1/ 2 0.693 1010 ´ 2.2 ´ 109 = 0.693 = 317 . ´ 1019
3 (a) As, T1/ 2 = 2 min Þ 10 min = 5 half-lives We know,
N æ 1ö =ç ÷ N 0 è 2ø
n
where,
N = remaining of nuclei, N 0 = initial number of nuclei and n = number of half-lives. N 0 80 80 = 2 .5 g Þ N = n = 5 = 32 2 2
4 (b) In g-radiation, no change occurs in mass number and atomic number because its rest mass is zero and it is neutral for electric and magnetic fields. In a-radiation, atomic number is decreased by 2 units and atomic mass is decreased by 4 units. In b -radiation, no change occurs in atomic mass but atomic number increases by 1 unit.
5 (a) Given, half-life of an element, T1/ 2 = 69.3 h Let initial amount (at t = 0) of radioactive element is N 0 Active nuclei at t = 10 h, N 1 = N 0 e-10 l
Active nuclei at t = 11h, N 2 = N 0e-11l % decay in 10th to 11th hours N -N 2 = 1 ´ 100 N1 =
N 0e-10 l - N 0e-11 l ´ 100 N 0 e-10 l
= (1 - e- l ) ´ 100 - 0693 . ù é = ê1 - e 69. 3 ú ´ 100 úû êë é 0.693 ù êQ where, l = ú T1/ 2 û ë
= [ 1 - e- 0. 01 ] ´ 100 = [1 - 0.99 ] ´ 100 = 0.01 ´ 100 = 1%
6 (c) In radioactivity, electrons are
emitted in the form of b (-1 e0 ) particles. It is also called negative b-decay, where an unstable nucleus emits an energetic electron and an anti-neutrino and a neutron in the nucleus becomes a proton that remains in the product nucleus. In photoelectric effect, when light rays of frequency greater than or equal to threshold frequency incident on metal surface, then electrons are emitted from metal surface. This phenomenon is called photoelectric effect. For photoelectric emission it is not necessary that element is unstable but for radioactivity, it is necessary that elements are unstable.
7 (d) For an element, it is not always true that number of neutrons (N) are greater than or equal to atomic number (Z). For example, in hydrogen atom, there is no neutron but it has one proton. Therefore, atomic number of hydrogen atom is greater than number of neutrons. i.e., Z > N for hydrogen atom. The force between neutrons in the nucleus is attractive only upto the range of 1 fm. But this attractive force become highly repulsive when neutrons came nearer to about 0.6 to 0.7 fm. Therefore, neutrons do not always experience attractive nuclear force. Hence, both Assertion and Reason are incorrect.
8 (c) After n half-life, the number of nuclei left undecayed is given as N = N 0 (1/ 2)n t where, n= T1/ 2 Here, intially number of nuclei, N 0 = 600. Disintegrated number of nuclei in time t = N ¢ = 450 Q Number of nuclei left undecayed, N = N0 - N ¢ N = 600 - 450 = 150 As, we know, t/T N æ 1 ö 1/ 2 =ç ÷ N 0 è 2ø Substituting the given values, we get t/T t/T 150 æ 1 ö 1/ 2 1 æ 1 ö 1/ 2 or = ç ÷ =ç ÷ 600 è 2 ø 4 è 2ø 2
or Þ
t/ 10
æ 1ö æ 1ö Þ ç ÷ =ç ÷ è 2ø è 2ø t = 20 min 1 3
2=
t 10
2 3
9 (b) N 1 = N 0 - N 0 = N 0 and Q
2 1 N0 = N0 3 3 t / T1/ 2 N 2 1 æ 1ö = =ç ÷ Þ t / T1/ 2 = 1 N 1 2 è 2ø N2 = N0 -
Þ t = 20 where t = t2 - t1 Therefore, the time interval (t2 - t1 ) = 20 min
10 (c) For a b-decay, 10 n ¾® 11 p + -0 1e where, -1 e0 is a positron having mass equal to an electron. But electron does not exist inside the nucleus.
11 (b) Let initial number of nuclei in A and B is N 0. Number of nuclei of A after time t is …(i) N A = N 0e-8lt Similarly, number of nuclei of B after time t is …(ii) N B = N 0e- lt NA 1 It is given that = (Q N B > N A ) NB e e-8 lt 1 Now, from Eqs. (i) and (ii), - lt = e e Rearranging, we get e-1 = e-7lt 1 Time, t= . 7l
Þ 7lt = 1
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
12 (d) We know that, a-particle carries two units of positive charge and four units of mass. In a-decays, charge or atomic number of parent nucleus decreased by two units. Also, mass number reduces by four units.
13 (a) Due to emission of 3a-particles, the mass number is reduced by 12, while atomic number is decreased by 6. Due to emission of b-particle, the atomic number is increased by one while there is no change in mass number. Now, resulting mass will be decreased by 12 and atomic number is decreased by 5, so isotopes X is 80 X 213.
æ 1ö =ç ÷ è 2ø or
æ 1ö =ç ÷ è 2ø
455
44 M0 ® 0 ´ 55 This means that Po -216 formed will soon decay to lead. Hence, lead will æ 44 ö have maximum mass nearly ç ÷ M 0. è 45 ø
15 (c) Half-life of X = Mean life of Y. Let l X and lY be decay constants of X and Y, then condition (1) implies 0.693 1 l = Þ lY = X lX lY 0.693 Þ lY > l X Hence, Y will decay faster.
16 (d) The number of nuclei left undecayed is given as t/T æ 1 ö 1/ 2 N = N 0ç ÷ . è 2ø
…(i)
(Q 40% decay) Given, N 1 = 0.6 N 0 and N 2 = 015 . N 0 (Q 85% decay) t2
N From Eq. (i), 2 = N1
æ 1öT N 0 ç ÷ 1/ 2 è 2ø t1
æ 1öT N 0 ç ÷ 1/ 2 è 2ø
t 2 - t1 T1/ 2
=
20 (b) In radioactive, a or b-decay, the mass number and atomic number changes and one nucleus decays into another nucleus. But isotopes are the nuclei of same atom having same atomic number and different mass number. Hence, it will not be produced in radioactive decay.
N1 N2
Taking log on both sides, we get N (t - t ) Þ 2 1 log10 2 = log10 1 T1/ 2 N2 N Þ t2 - t1 = T1/ 2 log2 1 N2 N t2 - t1 = 30 ´ log2 1 Þ N2
21 (c) Suppose a given nucleus is Z X A. In a-decay, the mass number of the product nucleus is four less than that of decaying nucleus while the atomic number decreases by two. a- decay
æ 0.6 N 0 ö = 30 log2 ç × ÷ è 015 N0ø .
14 (b) Let M 0 be initial mass of Rn - 220. Number of half-lives of Rn in 5 min, 5 min 5 ´ 60 = = = 5.5 55 s 55 Q Mass of Rn - 220 (left) 5. 5 M æ 1ö = ç ÷ M0 = 0 è 2ø 45 Q The mass converted is Po = 216 is (44 / 45)M 0. The number of half-lives of Po-216 in 5 min 5 min 300 = = = 455 0.66 0.66 Q Mass of Po = 216 (left)
2
t 2 - t1 T1/ 2
ZX
A
= 30 ´ 2 = 60 min
Þ
Þ RµA
RAl ( AAl )1/ 3 æ 27 ö = =ç ÷ RTe ( ATe )1/ 3 è 125 ø 5 RTe = RA1 3
¾¾®
A Z + 1Y
+
b - decay
3 = 5
X : Y is 1 : 7 mx 1 Þ = Þ 7mx = m y my 7 Let the initial total mass is m. Þ mx + m y = m my + my = m Þ 7 8m y Þ =m 7 7 Þ my = m 8 æ 1ö Only ç ÷ th part remains left è 8ø undisintegrated. Number of half-lives involve are three as T1/ 2 1 T1/ 2 1 T1/ 2 1 1 ¾® ¾® ¾® 2 4 8 1 So, time taken to become unstable part 8 = 3 ´ T1/ 2 = 3 ´ 1.4 ´ 109 = 4.2 ´ 109 yr
19 (a) As, activity droped from 5000 dps
= 20000 dps
+ 2He 4 (a )
0 - 1e
+v
0 + 1e
+v
+
18 (c) According to the question, ratio of
to 2500 dps in 150 day means T1/ 2 = 150 day 300 day = 2T1/ 2 Þ So, initial activity = 5000 ´ (2)2
A ZX
1/ 3
1/ 3
A-4
b - - decay
17 (b) Radius of the nucleus is given by R = R0 A
Z - 2X
In b-decay, the mass number of product nucleus remains same but atomic number increases or decreases by one.
= 30 log2 22
+1/ 3
¾¾®
or
A ZX
¾¾®
A Z - 1Y
+
Gamma decay is the phenomenon of emission of gamma rays or photon from a radioactive nucleus. A ¾® Z X A + g ZX Hence, the given reaction will have sequence as follows b - - emission
A ¾¾¾¾® ZX Z - 1K
A-4
a- emission Z + 1Y
¾¾¾¾®
g- emission
¾¾¾¾®
Z - 1K
A-4
22 (c) The mother and daughter elements after the emission g-rays are called isomers having same atomic number and mass number. Isotopes have same atomic number but different atomic mass and isobars have same mass number but different atomic number,
23 (b) Ratio of X and Y = 1 : 7, let the initial total mass = m mX 1 = mY 7 mY = 7mX mX + mY = m mY + mY = m 7 8mY 7 = m Þ mY = m 7 8 æ 1ö Only ç ÷ th part remains è 8ø undisintegrated, number of half lives involved are T1/ 2 1 T1/ 2 1 T1/ 2 1 1 ——® ——® ——® 2 4 8 Þ
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ATOMS AND NUCLEI
So, total time taken to become
1 8
Given,
unstable part will be 3 ´ T1/ 2 = 3 ´ 20 = 60yr N æ 1ö =ç ÷ N 0 è 2ø
24 (d) As,
\
t / T1/ 2
Given, T1/ 2 = 3 h and t = 9 h 9/ 3 3 N æ 1ö æ 1ö \ =ç ÷ =ç ÷ è 2ø N 0 è 2ø N 1 = Þ N0 8 - dN Activity = = Nl dt A Nl N 1 Þ = = = A0 N 0l N 0 8
Þ
35 (c) The initial momentum of the
1 e- l1t = e e- l 2 t e-1 = e- (l1 - l 2 ) t 1 = (l 1 - l 2 )t 1 1 1 t= = = l 1 - l 2 6l - 2l 4l
29 (c) The number of counts left after time t, æ 1ö N = N0 ç ÷ è 2ø
t / T1/ 2
nucleus would be equal to 4uH v, where, uH is the unit mass of hydrogen. Since, the mass of hydrogen is 1, so the initial momentum can be given by 4v. The final momentum of the nucleus would be equal to ( A - 4 )V , where V is the final velocity. Thus, we get from the conservation of momentum 4v . ( A - 4 )V = 4 v, so V = (A - 4)
36 (d) As, we know æ 1ö N = N 0ç ÷ è 2ø
60/ T1/ 2
\
t T Given, t = 3000 yr and T = 600 yr 3000 Þ n= =5 600 n 5 N 1 æ 1ö æ 1ö Then, =ç ÷ =ç ÷ = è 2ø N 0 è 2ø 32
30 æ 1 ö æ 1ö æ 1ö Þç ÷ =ç ÷ =ç ÷ è 2ø è 3ø 240 è 2 ø On comparing the powers, we get 60 60 = 3 Þ T1/ 2 = = 20 min T1/ 2 3
60/ T1/ 2
30 (b) We know that, N = N 0e- lt For A,
N A = N 0e-5lt
N B = N 0e- lt NA 1 Given, …(i) = N B e2 NA 1 and …(ii) = N B e4lt From Eqs. (i) and (ii), we get 1 t= 2l (c) Given reaction is 14 14 1 1 7 N + X ® 6 C + 1H+1 C For B,
N = N 0e- lt
= 63%
3
Given, \
31
Clearly, X is 21 H.
32 (a) Nuclear density is given by m 4 pR03 3 which is independent of mass number A. hn 33 (a) Momentum of a photon, p = c Hence, recoil energy, 2 æ hn ö ç ÷ 2 è cø p h2n 2 E= = = 2M 2M 2Mc2 0.693 34 (d) Half-life, T1/ 2 = l Activity, I 1 = N 1l and I 2 = N 2l where, l is disintegration constant. 0.693 (I 1 - I 2 ) = (N 1 - N 2 ) \ T1/ 2 or (N 1 - N 2 ) µ (I 1 - I 2 ) T1/ 2
T1/ 2 / 2 T1/ 2
20 s
20 s
40 g ¾¾® 20 g ¾® 10 g half -life
For 160 g amount, 10 s
10 s
10 s
160 g ¾® 80g ¾® 40g ¾® 10 s
20 g ¾® 10 g So after 40 s, A1 and A2 become equal.
28 (b) If N be the number of radioactive nuclei at time t, then N = N 0e- lt [where, N 0 = initial amount] N 1 e- l1t = N 2 e- l 2 t
æ 1ö = N 0ç ÷ è 2ø
1/ 2
=
N0 2
37 (b) 1 Curie = 3.7 ´ 1010 disintegration s-1 i.e. 1 Curie = 3.7 ´ 1010 dps
38 (b) The nuclear reaction can be given as m n X
a
¾®
n - 2X
m-4
2b
¾®
nX
m-4
39 (d) A beta minus particle ( b- ) is like an electron. Emission of b - involves transformation of a neutron into a proton, an electron and third particle called an anti-neutrino. n = p + - jb 0 + n n ® p + e- + n
or
40 (a) Pair production refers to the creation of an elementary particle and its anti-particle usually from a photon (or another neutral boson). This is allowed, provided there is enough energy available to create the pair.
r=
27 (d) For 40 g amount,
t / T1/ 2
t = T1/ 2 / 2
æ 1ö N = N 0ç ÷ è 2ø
Þ
26 (c) From Rutherford-Soddy law, where, N 0 is the initial number of atoms present, l is the decay constant and t is the mean life-time. 1 Using t = , we have l N N = N 0e- lt = N 0e- 1 = 0 e Percentage of active nuclei decayed N -N = 0 ´ 100 N0 (N 0 - N 0 / e) = ´ 100 N0
æ 1ö 30 = 240 ç ÷ è 2ø (Q t = 1 h = 60 min) 60/ T1/ 2
25 (d) We know that, n =
\
N1 1 = N2 e
Electron (e) Nucleus
θ
Photon Positron (e)
41 (c) The particles those are involved in the weak interaction are bosons.
42 (a) Nuclear radius is proportional to
A 1/ 3, where A is the mass number of nucleus. i.e. R µ A 1/ 3 1/ 3 R1 æ A1 ö Þ =ç ÷ R2 è A2 ø
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
R1 æ 3 ö =ç ÷ R2 è 81ø
Þ
1/ 3
49 (c) From the relation, [where, R = activity of sample]
R1 / R2 = 1/ 3
Þ
R2 = 3R1 = 3R
\
(QR1 = R)
43 (c) Energy and mass are related by the relation, E = mc2
Differentiating, we get dE dm = m ´ [ 0 ] + c2 dt dt dm Þ 3.6 ´ 1028 = 9 ´ 1016 dt dm = 4 ´ 1011 kg/s Þ dt
44 (b) The radius of a nucleus is given by the relation, r = r0 ( A )1/ 3 (key concept) where, r0 = constant. For Os 189 , A1 = 189 and r1 = r (say) r Thus, using r2 = , we know that, 3 r1 æ A1 ö =ç ÷ r2 è A2 ø
1/ 3
1/ 3
æ 189 ö 3=ç ÷ è A2 ø 189 27 = Þ A2
Þ Þ
A2 = 7
Thus, the answer is Li 7.
45 (d) Radius of nucleus is given by R = R0 A 1/ 3
So, the volume of the nucleus is given by V µ R 3, V µ R03 A Hence, the density is given by 1 A r= 3 µ 3 kR0 A R0 æ 1ö Þ r µ A0 çQ A µ 3 ÷ è R0 ø Here, k = constant
46 (b) Copper nucleus has a radius of the order of 10-14 m.
47 (c) We have, r µ A 1/ 3 r2 æ A2 ö =ç ÷ r1 è A1 ø
Þ
1/ 3
æ 206 ö r2 = 3 ç ÷ è 4 ø
\
æ 206 ö =ç ÷ è 4 ø
1/ 3
238
+ 0n1 ¾® ¾®
1/ 3
¾®
92U
Given, R0 = 5400 dis/min R = 600 dis/min t = 5 min 600 = 5400 e-5l ln 9 1 = e-5l Þ l = 5 9 \Half-life of the sample ln 2 5 ln 2 ln 25 ln 32 T1/ 2 = = = = ln 9 ln 9 ln 9 ln 9 5 and \
50 (d) Fraction remains after n half-lives, n
t/T
N æ 1ö æ 1ö =ç ÷ =ç ÷ è 2ø N 0 è 2ø N0 Given, N = e 5/ T 5/ T N 0 æ 1ö 1 æ 1ö Þ = ç ÷ or = ç ÷ eN 0 è 2 ø e è 2ø
= 11.16 Fm
239
239 + -1 e0 93Ne 239 + - 1e0 94Pb
So, Þ
51 (b) As, b-particles are emitted with very high velocity (upto 0.99 c, where c is the speed of the light in air). So, according to Einstein’s theory of relativity, the mass of a b-particle is much higher compared to its rest mass (m0 ). The velocity of electrons obtained by other means is very small compared to c (velocity of the light). So, its mass remains nearly m0. Also, b-particle and electrons are similar particles. t / T1/ 2
è 2ø
1 N æ 1ö , which give n = 4.3 = ç ÷ = è 2ø N 0 20 ~ 16.5days t = nT = 4.3 ´ 3.8 1/ 2
-a
-b
¾¾® 90U 234 ¾¾®
91 Y
Now, disintegrated fraction N 1 =1=1N0 e
56 (a) Fraction left, f = 1 Hence, Now,
20 8 = 100 10
8 N 0 , t = 10 days 10 N = N 0- lt N =
8 N 0 = N 0e-lt 10 10 Þ elt = 8 loge (10 / 8) 2.303 log (10 / 8) = \ l= 10 10 l = 0.022 If T1/ 2 is half-life period, 0.693 0.693 T1/ 2 = = l 0.022 T1/ 2 = 31.5 days æ 1ö Again, N = N 0 ç ÷ è 2ø ~ - 51.2%
n
æ 1ö = N0 ç ÷ è 2ø
31.5/ 30
57 (a) 8.1 days are equivalent to three half days. Hence, amount left after three half days æ 1ö æ 1ö = ç ÷ (1 mg) = ç ÷ (1mg) è 8ø è 2ø
equation 238
1 l N = N 0 e- l ´ 1/ l = N 0e- 1 N 1 = e- 1 = N0 e
3
53 (c) Simply, we can analyse from the 92U
Number of a-particles 234 - 218 16 = = =4 4 4 Decreases in atomic number = 4 ´ 2 = 8 From atomic number 88, number of b-particles emitted 88 - 84 = =4 1 Hence, 4a and 4b-particles are emitted.
life-time, t =
Taking log on both sides, we get 5 1 log 1 - log e = log T 2 5 - 1 = (- log 2) T Þ T = 5 loge 2 Now, let t ¢ be the time after which activity reduces to half t ¢ / 5 log e 2 æ 1ö æ 1ö Þ t ¢ = 5 loge 2 ç ÷=ç ÷ è 2ø è 2ø
1 52 (b) By formula, N = N 0 æç ö÷
mass number decreases by 4 units and atomic number decreases by 2 units and for b-particle, atomic number is increased by 1 and mass number remains the same. Given reaction is 234 ¾® 88 Y218 92 Be
55 (b) By using, N = N 0e- lt and average
n
48 (a) The reaction can be shown as 92U
54 (a) When a-particles are emitted, the
R = R0e- lt
234
= 0.125 mg
789
ATOMS AND NUCLEI
58 (a) In a radioactive emission, the emission of a b -particle is accompanied with the emission of an anti-neutrino. It is represented as n n ¾® p + e- +
electron
anti-neutrino
59 (c) Given that the half-life of a radioactive substance is 20 min. So, T1/ 2 = 20 min. For 20% decay, we have 80% of the substance left, hence 80N 0 …(i) = N 0e- l t20 100 where, N 0 = initial undecayed substance and t20 is the time taken for 20% decay. For 80% decay, we have 20% of the substance left, hence 20N 0 …(ii) = N 0e- l t80 100 On dividing Eq. (i) and Eq. (ii), we get
2.303 9750 2.303 = log log 10 l 975 l 2.303 ~ - 0.461min -1 (Qlog10 = 1) \ l= 5 - dN 63 (b) Activity, A = = lN dt As, the number of nuclei (N) per mole are equal for both the substances, irrespective of their molecular mass, therefore A µl A1 l 1 4 = = A2 l 2 3
t =2 540 Þ t = 2 ´ 540 = 1080 yr 7 1 66 (d) Undecayed isotope = 1 - = 8 8 t/T N æ 1ö \ =ç ÷ N 0 è 2ø
64 (c) From the question,
67 (b) After one a-emission, the daughter
Þ 5=
and So, \
4 = el(t80 - t20 ) Taking log on both sides, we get ln 4 = l (t80 - t20 ) Þ 0.693 2 ln 2 = Þ (t80 - t20 ) T1/ 2 Þ
t80 - t20 = 2 ´ T `1/ 2 = 40 min
60 (a) When a neutron is disintegrated to give b-particle following reaction involves v n ¾® p + e- + neutron
proton
electron or b-
anti -neutrino
In this decay, a neutron is converted into a proton with the emission of an anti-neutrino only. 0.693 61 (a) Activity, A = lN = N , where t1/ 2 T1/ 2 is the half-life of a radioactive sample. A1 N 1 t \ = ´ 2 A2 t1 N2 t A N 2 A1 2N 2 4 Þ 1= 2´ 1= ´ = t2 A1 N 2 A1 N2 1
62 (c) As we know that, Þ Þ
A = lN A µN A1 N 1 = A2 N 2
Now, for a radioactive disintegration N 2.303 t= log o Nt l
N0 100 T1/ 2 = T yr 0.693 l= T 2.303 éN ù t= log ê 0 ú l ëN û 2.303T = log 100 0.693 = 6.65 T N =
Þ
t/ 15
Þ Þ
nucleus reduces in mass number by 4 unit and in atomic number by 2 units. In b-emission the atomic number of daughter nucleus increases by 1 unit. The reaction can be written as 92 U
Relation between effective disintegration constant (l ) and half-life (T ) is ln 2 l= T ln 2 ln 2 + \ l1 + l2 = T1 T2 Effective half-life, 1 1 1 1 1 = + = + T T1 T2 1620 810 1 1+ 2 Þ = T 1620 Þ T = 540 yr t n= \ 540 t / 540 æ 1ö \ N = N0 ç ÷ è 2ø 2
Þ
N æ 1ö æ 1ö =ç ÷ =ç ÷ è 2ø N 0 è 2ø
t / 540
238
- 8a
¾®
76 X
206
- 6b
¾®
206 82Y 206
, i.e.
Thus, the resulting nucleus is 82Y 206 . 82Pb
68 (d) From, N = N 0 e- lt 1800 = 2000 e- l ´ 2
65 (d) From Rutherford-Soddy law, the number of atoms left after n half-lives is given by n æ 1ö N = N0 ç ÷ è 2ø where, N 0 is the original number of atoms. The number of half-life, Time of decay n= Effective half -life
1 æ 1ö =ç ÷ 8 è 2ø t =3 15 t = 45h
Þ
9 æ 9ö = e- 2l Þ e- l = ç ÷ è 10 ø 10 Number of nuclei left after 6 s, N = N 0e- lt ¢ = 2000 e- l ´ 6
1/ 2
Þ
é æ 9 ö 1/ 2 ù = 2000(e- l )6 = 2000 ê ç ÷ ú êë è 10 ø úû
6
3
729 æ 9ö = 2000 ´ ç ÷ = 2000 ´ = 1458 è 10 ø 1000
69 (a) Number of half-lives, n=
t T1/ 2
=
60 =3 20
Initial amount, N 0 = 3 ´ 109 Number of undecayed nuclei is N , then n
æ 1ö æ 1ö N = N 0 ç ÷ = 3 ´ 109 ç ÷ è 2ø è 2ø
3
3 ´ 109 8 Thus, number of nuclei decayed after 60 days 3 = N 0 - N = 3 ´ 109 - ´ 109 8 21 1 æ ö = 3 ´ 109 ç1 - ÷ = ´ 109 è 8ø 8 N =
= 2.625 ´ 109 -~ 2.6 ´ 109
790
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
77 (c) The electron emitted by beta
70 (b) According to the law of conservation linear momentum, m1v1 = m2v2 m1 v2 1 æ v çgiven, 1 = 2 ö÷ \ = = ø è m2 v1 2 v2
78
Since, we know R = R × ( A )1/ 3 A»m R1 æ m1 ö =ç ÷ R2 è m2 ø
Thus, \
1/ 3
æ 1ö =ç ÷ è 2ø
1/ 3
Hence, number of half-lives are 2. \ t = 2 ´ t1/ 2 = 2 ´ 2 = 4 h
79 (c) According to Rutherford and Soddy
R1 : R2 = 1: 21/ 3
law for radioactive decay, Number of atoms remained undecayed after time t are
71 (d) Electron capture generally occurs for small atoms and positron emission occur for heavy nucleus. This is because as in heavy nucleus, the electrons are loosely bound to nucleus and at a distance from it.
or and
equivalence, E = Dmc2 0.3 = ´ (3 ´ 108 )2 = 2.7 ´ 1013 J 1000 2.7 ´ 1013 = 7.5 ´ 106 kWh = 3.6 ´ 106
73 (b) These are isotopes having same atomic number, i.e., 6. Number of neutrons = Atomic mass – Atomic number For C12, = 12 - 6 = 6 For C14, = 14 - 6 = 8
74 (b) The amount of energy released,
2.303 ´ 1.25 ´ 1010 16 t= log 0.693 1 = 5 ´ 1010 yr
80 (a) A free neutron decays into a 81
75 (d) Nuclear forces are short range -15
forces having range upto 10 m. These are charge independent, hence they are not electrostatic in nature. These are the strongest forces in nature. They are complicated in nature and so does not follow inverse square 1ö æ law ç i.e.F µ 2 ÷ . è r ø
A
83
¾®Z- 2 Y A- 4 a
In emission of b-particle, Z - 2Y
A- 4
2b
¾®Z Z A- 4
(given, a = 2b) Thus, the resulting daughter nuclei by two process is the isotopes (having same atomic number but different mass) of parent nuclei.
proton, an electron and anti-neutrino. (a) The becquerel is taken as SI unit of radioactive disintegration which means 1 dps.
82 (b) Beta decay can involve the emission
= 9 ´ 1010 J
process involves
2.303 N …(i) log 0 t N 0.693 0.693 …(ii) l= = T1/ 2 1.25 ´ 1010
l=
From Eqs. (i) and (ii), we get
E = Dmc2 = (1 ´ 10- 6 ) ( 3 ´ 108 )2
76 (d) In emission of a-particle, following
86 (c) In any nuclear reaction, mass number and atomic number should remain conserved. Reaction (c) satisfies this condition. Also, for 239 93 Np, neutron to proton ratio is greater than 1.52, which makes it unstable.
87 (a) Activity, R = R0e-lt
of either electrons or positrons. The electrons or positrons emitted in a b-decay do not exist inside the nucleus. They are only created at the time of emission, just as photons are created when an atom makes a transition from higher to a lower energy state. In negative b-decay a neutron in the nucleus is transformed into a proton, an electron and an anti-neutrino. Hence, in radioactive decay process, the negatively charged emitted b-particles are the electrons produced as a result of the decay of neutrons present inside the nucleus. (b) A excited nucleus attains ground state by emitting g-rays. g-rays does not change nucleus atomic number or its mass number.
84 (d) Nuclear density is independent of 85
mass number and have the ratio r1 : r2 = 1 : 1 (d) Nuclear radius of gold (79 Au 198 ), 1/ 3
1/ 3
RAu = R0 ( A ) = R0 (198) = 5. 8 R0 where, R0 = 1.2 ´ 10-15 m = 1.2 Fm
æ 1ö -l ´ 3 = e-3l ç ÷=e è 3ø
Þ Again,
…(i)
R¢ = e- l ´ 9 = e-9 l = (e-3l )3 R0 [from Eq. (i)] 3
1 R æ 1ö =ç ÷ = Þ R¢ = 0 è 3 ø 27 27
N = N 0e- lt
72 (d) According to mass energy
ZX
radiation originates from decay of neutron in the nucleus. (b) Consider the radioactive conversion is x ® y (half-life) y1/ 2 = 2h æ N x ö 1 æ 1ö 2 ÷÷ = = ç ÷ Given, çç è N y ø 4 è 2ø
Hence, in 9 days activity will become æ 1ö ç ÷ of the original value. è 27 ø
88 (d) Two months mean 2 half-life periods. Two months earlier, the activity = 2 ´ 22 = 8 mCi
89 (a) Let initial activity of both substances are same. n t/T æ 1ö æ 1 ö 11/ 2 R = R0 ç ÷ = R0 ç ÷ \ è 2ø è 2ø
Þ
æ 1ö ç ÷ è 2ø
4/ 1
æ 1ö ç ÷ è 2ø
4 2
1 R1 æ 1ö =ç ÷ = = = 4 R2 æ 1 ö 4/ 2 æ 1 ö 2 è 2 ø ç ÷ ç ÷ è 2ø è 2ø
90 (b) At any instant the rate of decay of radioactive atoms is proportional to the number of atoms present at that instant, i.e. dN dN µ N or = R = lN dt dt where, l is decay constant.
91 (a) Half-life of a radioactive element, 0.693 1 or T µ l l l A TB = l B TA T =
\
92 (c) In critical condition, k = 1. The chain reaction will be steady. The size of the fissionable material used is said to be the critical size and its mass the critical mass.
93 (a) Protons cannot be emitted by radioactive substances during their decay.
791
ATOMS AND NUCLEI
94 (b) Since, 8a-particles 4b--particles and 2b + -particles are emitted, so, new atomic number Z¢ = Z - 8 ´ 2 + 4 ´ 1 - 2 ´ 1 = 92 - 16 + 4 - 2 = 92 - 14 = 78
95 (a) Given, N 0l = 5000, Nl = 1250 N = N 0e- lt = N 0e-5l where, l is decay constant per minute. N l = N 0le-5l Þ \ Þ \
1250 = 5000e-5l 5000 e5l = = 4 Þ e5l = 4 1250 5l = 2 loge 2 l = 0.4 ln 2
96 (e) Number of electrons = 8 + 2 = 10 Number of protons = 8 Number of neutrons, N = 8 Atomic number, Z = number of protons = 8 Mass number, A = Z + N = 8 + 8 = 16 The proper symbol of the species is 16
O28- .
97 (a) If R is the radius of the nucleus, the 4 corresponding volume pR 3 has been 3 found to the proportional to A. This relationship is expressed in inverse form as R = R0 A 1/ 3 The value of R0 is 1.2 ´ 10-15 m, i.e. 1.2 Fm. R R ( A )1/ 3 Therefore, Al = 0 Al 1/ 3 RTe R0 ( ATe ) 3 RAl ( AAl )1/ 3 (27)1/ 3 = = = 1/ 3 1/ 3 5 RTe ( ATe ) (125) 5 5 Þ RTe = ´ RAl = ´ 3.6 = 6 Fm 3 3 (given, RA1 = 3.6 Fm)
98 (a) The given reaction is a nuclear reaction, which can take place only if a proton (a hydrogen nucleus) comes into contact with a lithium nucleus. If the hydrogen is in the atomic form, the interaction between its electron cloud and the electron cloud of a lithium atom keeps the two nuclei close to each other. Even, if isolated protons are used, they must be fired at the Li-atom with enough kinetic energy to overcome the electric repulsion between the proton and Li-atom. Hence, given statement is true.
99 (b) Radius of atom -~ 10-10 m and
~ 10 m radius of nucleus Volume of atom \ Required ratio = Volume of nucleus 4 3 pr1 æ -10 ö 3 10 = 3 =ç ÷ = 1015 4 3 è 10-15 ø pr2 3
Þ Hence,
100 (b) The nucleus, Z X has number of 106
101 (a) Radius of nucleus, R = R0 A 1/ 3 where, R0 = 1.2 ´ 10-15 m Volume of nucleus, (V ) 4 4 = pR 3 = p[ R0 A 1/ 3 ]3 3 3 4 3 = pR0 A 3 \ V µA 102 (b) The nuclear reaction can be given by 6C
12
+
1 0n
0 -1 e
¾® 7N13 +
(Neutron)
(Beta particle)
+
n (Anti -neutrino)
On equating atomic numbers and atomic masses, for resulting nucleus is 7 and 13, which is for nitrogen nucleus.
103 (a) Nuclear force has the following properties (i) Nuclear force is a short range force whose range is of the order of 2 to 3 femtometre. (ii) Nuclear force is the strongest force in nature. (iii) Nuclear force is an attractive force acting between nucleons, which is charge independent. Therefore, nuclear force is strong, short range and charge independent force.
104 (c) When a nucleus is formed, then the mass of nucleus is slightly less than the sum of the mass of Z protons and N neutrons. i.e. M < (Zmp + Nmn )
105 (d) Let radius of 94 Be nucleus be r. Then, radius of germanium (Ge) nucleus will be 2r. Radius of a nucleus is given by R = R0 A 1/ 3
r æ 9ö =ç ÷ 2r è A2 ø 3 9 æ 1ö ç ÷ = è 2ø A2
Þ
A
protons = Z and number of neutrons = A - Z, where A is the total number of protons and neutrons, i.e. A = Z + N.
R1 æ A1 ö =ç ÷ R2 è A2 ø
\
-15
107
1/ 3
1/ 3
( Q A1 = 9)
A2 = 9 ´ (2)3
= 9 ´ 8 = 72 Thus, in germanium (Ge) nucleus number of nucleons is 72. (a) Nuclear forces are the strong attractive forces between nucleons in the atomic nucleus that hold the nucleons together. (c) The nuclear reaction is as follows 7N
14
+ 2 He4 ¾® 8 O17 + q X p
Conservation of mass number gives, p = 14 + 4 - 17 = 1 Conservation of atomic number give, Z = 7+ 2- 8=1 Hence, particle is a proton, i.e. 1 H1.
108 (c) Energy spectrum of emitted b -particles from a radioactive source is drawn as N(E)
E0
E
109 (b) We can relate an absorbed energy Q and the resulting temperature increase DT with relation Q = cm DT . In this equation, m is the mass of the material absorbing the energy and c is the specific heat of that material. An absorbed dose of 3 Gy corresponds to an absorbed energy per unit mass of 3 J kg-1. Let us assume that c is the specific heat of human body, is the same as that of water, 4180 J kg -1 K -1. Then, we find that Q /m 3 DT = = c 4180 ~ 700 mK = 7.2 ´ 10– 4 K Obviously, the damage done by ionising radiation has nothing to do with thermal heating. The harmful effects arises, because the radiation damages DNA and thus interferes with the normal functioning of tissues in which it is absorbed.
792
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
110 (c) If N 0 potassium atoms were present
113 (b) To form its own isotope, atomic
at the time of the rock was formed by solidification from a molten form, the number of potassium atoms remaining at the time of analysis is …(i) N K = N 0e- lt
number (Z ) should remain same. So, the emission of one a-particle and two b-particles will maintain the Z same. where, a-particle = 2He4 and b-particle = -1b 0
in which t is the age of the rock. For every potassium atom that decays, an argon atom is produced. Thus, the number of argon atoms present at the time of the analysis is …(ii) N Ar = N 0 - N K We cannot measure N 0 , so let’s eliminate it from Eqs. (i) and (ii), we get æ N ö lt = ln ç1 + Ar ÷ , è NK ø
114 (a) From Rutherford and Soddy law, the
in which N Ar / N K can be measured. Solving for t, we get T ln (1 + N Ar / N K ) t = 1/ 2 ln 2 ( 1.25 ´ 109 )[ln( 1 + 10.3)] ln 2 = 4.37 ´ 109 yr
=
111 (c) As, mean life, t =
1 where l being l
decay constant. 1 2 = l l Thus, mass remained after time t,
Also, time, t = 2t = 2 ´
-l ´
M = M 0e- lt = 10e -2
= 10e
2 l
(Q M 0 = 10 g)
10 = 2 = 1.35 g e
material is the number of decays per second. From radioactive decay law, dN dN µ N or = lN dt dt dN Thus, R = Þ R = lN dt …(i) Þ R = lN 0e- lt where, R0 = lN 0 is the activity of the radioactive material at time t = 0. At time t1 ,
R1 = R0e-lt1
…(ii)
At time t2 ,
R2 = R0e-lt2
…(iii)
On dividing Eq. (ii) by Eq. (iii), we have R1 e- lt1 = = e- l(t1 - t2 ) R2 e- lt2 R1 = R2e- l(t1 - t2 )
where, N 0 is original number of atoms and n is the number of half-lives. t 180 n= = =3 T1/ 2 60 3
n
N 1 æ 1ö æ 1ö =ç ÷ =ç ÷ = è 2ø N 0 è 2ø 8 N0 Þ N = = 0.125N 0 8 = 12.5% \Amount decayed = 100 - 12.5 = 87.5% \
115 (c) Given, total time = 80 min Number of half-lives of A, 80 nA = =4 20 Number of half-lives of B, nB =
112 (a) The decay rate R of a radioactive
or
rate of decay of a radioactive substance is proportional to number of atoms left at that instant, using this we can arrive at n æ 1ö N = N 0ç ÷ è 2ø
80 =2 40
Number of nuclei remains undecayed, n æ 1ö N = N 0ç ÷ è 2ø where, N 0 is initial number of nuclei. n 4 æ 1ö A æ 1ö æ 1ö ç ÷ ç ÷ ç ÷ è 2ø è 16 ø 1 N A è 2ø = = = = \ N B æ 1 ö nB æ 1 ö 2 æ 1 ö 4 ç ÷ ç ÷ ç ÷ è4ø è 2ø è 2ø
116 (b) From Rutherford-Soddy law, the fraction left after n half-lives is n
æ 1ö N = N 0ç ÷ è 2ø
where, n is number of half-lives. time (t ) 2 1 n= = = half -life (T1/ 2 ) 4 2 Þ
N æ 1ö =ç ÷ N 0 è 2ø
1/ 2
=
1 2
117 (a) Atom with positively charged nucleus has electrons revolving around it in stationary orbits. The Coulomb’s forces provides the necessary
centripetal force of attraction to keep the electrons in orbits. N +
e–
118 (a) When nuclear masses are measured, the mass is always found to be less than the sum of the masses of the individual nucleons bound in the nucleus. This difference between the nuclear mass and the sum of individual masses is known as mass defect. Mass of nucleons = Isotopic mass + Mass defect Hence, mass of nucleons together in a heavy nucleus is greater than the mass of nucleus.
119 (d) Applying charge and mass conservation, 4 + A = A + 3 + A ¢ Þ A¢ = 1 2 + Z = Z + 2 + Z¢ Þ Z¢ = 0 Hence, M is neutron.
120 (a) When an alpha or a beta decay takes place, the daughter nucleus is generally formed in one of its excited states eventually comes to its ground state by emitting a photon or electromagnetic radiation. The process of a nucleus coming down to a lower energy level by emitting a photon is called gamma decay. Hence, g-rays are originated from excited nucleus.
121 (a) Mass number of an element is the total number of protons and neutrons present inside the atomic nucleus of the element. It is represented by A with A is different for different elements. Mass number of a nucleus is sometimes equal to its atomic number, e.g. in case of hydrogen, number of neutrons = 0. So, mass number = atomic number.
122 (b) On combination, some energy is released, which is obtained from mass energy conversion of particles, so the mass of nucleus is less than the sum of mass of protons and neutrons.
123 (b) Let the daughter nucleus be , so reaction can be shown as 238 92 U
¾® AZ X + 42He
From conservation of atomic mass 238 = A + 4 Þ A = 234 From conservation of atomic number 92 = Z + 2 Þ Z = 90 So, the resultant nucleus is 234 90 X , i.e.
234 90 Th.
793
ATOMS AND NUCLEI
124 (c) After n half-lives (i.e. at t = nT ), the number of nuclides left undecayed, N = N 0 (1/ 2) N 1 Given, = N 0 16
n
n
n
125 (a) Radiotherapy is exposing tumours/ cancer cells to radiations, from radioactive elements like, Cobalt-60, Radon-120 and I-131. Cobalt-60 is a source of g-radiations. These radiations kill cancer cells much rapidly. However, healthy cells in vicinity of cancer cells are also damaged.
126 (d) The percentage of radioactive substance left behind after time t, N = (100 - 18)% = 82% N0 N Also, = e-lt N0 82 Þ = e- (l ´ 24 ´ 60 ´ 60 ) 100 æ 82 ö Þ (24 ´ 60 ´ 60 ´ l ) = log ç ÷ è 100 ø l = 2.1 ´ 10-6 s-1
127 (c) The decay rate R of a radioactive element is the number of decays per second. n = R = lN where, l = decay constant. 0.693 0.693 = = half -life T 0.693 n= N \ T 0.693 N or T = s n
128 (a) Decay constant, 0.693 0.693 = = 0.1904 per day T 3.64 Also, N = N 0e- lt N Given, = 0.1 = 10-1 N0 l=
10-1 = e- lt
Þ
elt = 10
Þ
lt = loge 10 = 2.3026 ´ log1010 = 2.3026 ´ 1
4
1 æ 1ö æ 1ö æ 1ö Þ = ç ÷ or ç ÷ = ç ÷ ø è 2ø è ø è 16 2 2 Equating the powers, we obtain, n = 4 t i.e. =4 T Þ t = 4T \ t = 4 ´ 5730 = 22920 yr (Q T = 5730 yr )
Þ
Þ
2.3026 ´ 1 l 2.3026 ´ 1 = 0.1904 = 12.1 days dN (c) The activity, = - lN dt As per question, x = - lN t1 , y = - lN t2 x y N t1 = - , N t2 = Þ l l The number of atoms disintegrated in time interval, y æ xö N t2 - N t1 = - - ç - ÷ l è lø x- y = = (x - y)t l where, t = mean life of the sample.
\
129
t=
130 (a) The nuclei which have same number of neutrons but different atomic number and mass number are known as isotones. In choice (a) nuclei of 34 Se74 and 31 Ga 71 are isotones as A - Z = 74 - 34 = 71 - 31 = 40 131 (c) (i) Electron revolves around the nucleus of an atom. It is a stable particle. (ii) Proton has positive charge and its mass is 1836 times the electronic mass. In free state, the proton is a stable particle. (iii) Neutron carries no charge. Its mass is 1839 times the electronic mass (1.675 ´ 10-27 kg). In free state, the neutron is unstable (its mean life is about 17 min), but it constitutes a stable nucleus along with proton. (iv) a-particle stable is helium nucleus whose atomic number is 2 and mass number is 4. Hence, out of the given four options neutron is most unstable.
132 (b) Let x be the mass number of A and y the atomic number. Then, since atomic number and mass number remain conserved, we have
yA y- 2 B
x
¾®
x- 4
y- 2 B
x- 4
+ 2He4
¾® yC x- 4 + 2-1 e0
Hence, we observed that A and C are isotopes as their atomic numbers are same but mass numbers are different.
133 (d) X is neutrino because mass number and atomic number of neutrino is zero.
134 (c) The radioactivity does not depend on external factors.
135 (d) Mean life, t = 1.44T1/ 2 \ T1/ 2 =
100 1.44
= 69.44 s =
69.44 ~ - 1.155 min 60
136 (d) Radioactive decay does not depend upon the time of creation.
137 (d) Number of nuclei remain undecayed, N A = N 0e-10lt and Þ or
N B = N 0e- lt NA 1 = = e(-10l + l) t NB e 9lt = 1 t=
Þ
1 9l
138 (c) The compound can emit neutrons. This is because neutrons are neutral particles, i.e. they do not have any charge on them, so do not deflected in a magnetic field.
139 (b) When an atom emits an a-particle its mass number decreases by 4 and atomic number by 2. When it emits a b-particle its atomic number increases by 1, while there is no change in mass number and atomic number in g-rays emission. 72 X 71 Z
180
176
-b
-a 176 ¾® ¾® 70Y -g
-a 172 ¾® ¾® 69 P 172 69 A
140 (d) When an a-particle is emitted, mass number of nuclide X is reduced by 4, and its charge number reduced by 2. But when a b-particle is emitted, mass number of nuclide remains the same and its charge number is increased by 1. Hence, the resulting nuclide has atomic mass A - 4 and atomic number Z - 1.
Topic 4 Nuclear Fission & Fusion and Binding Energy 2019 1 Assertion Heavy water is used to slow neutron in nuclear reactor. Reason It does not react with slow neutron and mass of
deuterium is comparable to the neutron. [JIPMER] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2018 2 An atomic power nuclear reactor can deliver 300 MW. The energy released due to fission of each nucleus of uranium atoms fissioned per hour will be [JIPMER] 25 25 22 (a) 30 ´ 10 (b) 10 ´ 10 (c) 4 ´ 10 (d) 5 ´ 1015
3 In the fusion reaction, the masses of deuteron, helium and neutron expressed in amu are 2.015, 3.017 and 1.009, respectively . If 1 kg of deuterium undergoes complete fusion, then find the amount of total energy released. [JIPMER] (1 amu = 931.5 MeV) (a) 9 ´ 1013 J (b) 20 ´ 105 J (c) 4 ´ 1022 (d) 5 ´ 1015
2017 4 A nucleus
Z
X
A
has mass represented by m ( A , Z ). If m p
and mn denote the mass of proton and neutron respectively and BE the binding energy (in MeV), then [JIPMER] (a) BE = [ m( A , Z ) - Zm p - ( A - Z ) m p ] c 2 (b) BE= [ Zm p + ( A - Z )mn - m( A , Z )] c 2 (d) BE = m( A , Z ) - Zm p - ( A - Z ) mn
5 A nuclear explosive is designed to deliver 1MW power in the form of heat energy. If the explosion is designed with nuclear fuel consisting of U235 to run a reactor at this power level for one year, then the amount of fuel needed is (take, energy per fission is 200 MeV) [AIIMS] (a) 1 kg (b) 0.01 kg (c) 3.84 kg (d) 0.384 kg
2014 6 The binding energy per nucleon of 73 Li and 42 He nuclei are respectively. In the nuclear 4 2 He + Q, the value of energy [CBSE AIPMT]
(b) - 2.4 MeV (d) 17.3 MeV
9 The control rods used in a nuclear reactor can be made up of [Kerala CEE] (a) graphite (b) cadmium (c) uranium (d) barium (e) lead 10 The fusion reaction in the sun is a multi-step process in which the [Kerala CEE] (a) helium is burned into deuterons (b) helium is burned into hydrogen (c) deuteron is burned into hydrogen (d) hydrogen is burned into helium (e) helium is burned into neutrons 11 The nuclear fusion reaction between deuterium and tritium takes place [EAMCET] (a) at low temperature and low pressure (b) at very high temperature and very high pressure (c) when the temperature is near absolute zero (d) at ordinary temperature and pressure
2011 12 The element with maximum value of binding energy per
(c) BE = [ Zm p + Am p - m( A , Z )]c 2
5.60 MeV and 7.06 MeV reaction 73 Li + 11H ® 42He + Q released is (a) 19.6 MeV (c) 8.4 MeV
7 For the stability of any nucleus, [KCET] (a) binding energy per nucleon will be more (b) binding energy per nucleon will be less (c) number of electrons will be more (d) None of the above 8 The total binding energy of 1 H2 , 2 He 4 , 28 Fe 56 and 235 nuclei are 2.22, 28.3, 492 and 786 MeV 92 U respectively. Identify the most stable nucleus of the following. [UP CPMT] (b) 1 H 2 (a) 28 Fe 56 (d) 2 He 4 (c) 92 U 238
nucleon is (a) iron
[J&K CET]
(b) aluminium (c) uranium (d) hydrogen
13 When two nuclei (with A = 8) join to form a heavier nucleus, the Binding Energy (BE) per nucleon of the heavier nuclei is [DUMET] (a) more than the BE per nucleon of the lighter nuclei (b) same as the BE per nucleon of the lighter nuclei (c) less than the BE per nucleon of the lighter nuclei (d) double the BE per nucleon of the lighter nuclei 14 Fusion reaction takes place at high temperature, because (a) atoms get ionised at high temperature [CBSE AIPMT] (b) kinetic energy is high enough to overcome the coulomb repulsion between nuclei (c) molecules break up at high temperature (d) nuclei break up at high temperature
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ATOMS AND NUCLEI
15 Which one of the following cannot be used as a moderator in a nuclear reactor? [Manipal] (a) Water (b) Heavy water (c) Molten sodium (d) Graphite 16 Pick out the correct statement from the following. [KCET] (a) Energy released per unit mass of the reactant is less in case of fusion reaction. (b) Packing fraction may be positive or may be negative. (c) Pu 239 is not suitable for a fission reaction. (d) For stable nucleus, the specific binding energy is high.
2010 17 The mass of a 73 Li nucleus is 0.042u less than the sum of the masses of all its nucleons. The binding energy per nucleon of 73 Li nucleus is nearly [CBSE AIPMT] (a) 46 MeV (b) 5.6 MeV (c) 3.9 MeV (d) 23 MeV
18 Binding energy of nucleus is defined as [Punjab PMET] (a) the energy released, when the nucleus has been separated into its constituent particle (b) the energy required, to separate the nucleus from the constituent particles (c) the energy required to form the nucleus from its constituent particle (d) None of the above 19 The energy released by the fission of one uranium atom is 200 MeV. The number of fission per second required to produce 3.2 W of power is (take, 1 eV = 1.6 ´ 10- 19 J) (a) 107 (b) 1010 [WB JEE] 15 (c) 10 (d) 1011 20 If 200 MeV of energy is released in the fission of 1 nucleus of 92 U235 , then the number of nuclei that undergo fission to produce energy of 10 kWh in 1 s, is [EAMCET] (a) 11.25 ´ 1018 (b) 22.5 ´ 1017 (c) 11.25 ´ 1017 (d) 22.5 ´ 1018
2009 21 Atomic mass of 13 6 C is 13.00335 amu and its mass number is 13. If, 1 amu = 931MeV, binding energy of the neutrons presents in the nucleus is [EAMCET] (a) 0.24 MeV (b) 1.44 MeV (c) 1.68 MeV (d) 3.12 MeV
22 Fusion reaction is initiated with the help of [Manipal] (a) low temperature (b) high temperature (c) neutrons (d) any particle 23 If the speed of light was 2/3 of its present value, then the energy released in a given atomic explosion would [KCET] (a) decrease by a factor 2/3 (b) decrease by a factor 4/9 (c) decrease by a factor 5/9 (d) decrease by a factor 5 / 9
24 Pick out the unmatched pair. [Kerala CEE] (a) Moderator-heavy water (b) Nuclear fuel - 92 U235 (c) Pressurised water reactor-Water as the heat exchange system (d) Safety rods-Carbon (e) Reactor is critical-Multiplication factor is unity 25 Enriched uranium is used in nuclear reactors, because it contains greater proportion of [J&K CET] (a) U238 (b) U235 (c) U239 (d) U233
2008 26 If M ( A , Z ), M p and M n denote the masses of the nucleus ZA X , proton and neutron respectively in units of u (1 u = 931.5 MeV/ c 2 ) and BE represents its binding energy in MeV, then [CBSE AIPMT] 2 (a) M ( A , Z ) = ZM p + (A - Z)M n - BE / c (b) M ( A , Z ) = ZM p + ( A - Z )M n + BE (c) M ( A , Z ) = ZM p + ( A - Z )M n - BE (d) M ( A , Z ) = ZM p + ( A - Z )M n + BE /c 2
27 The binding energies of the atoms of elements A and B are E a and E b , respectively. Three atoms of the element B fuse to give one atom of element A. This fusion process is accompanied by release of energy e. Then, E a , E b and e are related to each other as [Manipal] (a) E a + e = 3E b (b) E a = 3E b (c) E a - e = 3E b (d) E a + 3E b + e = 0 28 If M o is the mass of an oxygen isotope 8 O 17 , M p and M n are the masses of a proton and a neutron respectively, the nuclear binding energy of the isotope is [UP CPMT] 2 (a) ( M o - 8M p ) c (b)( M o - 8M p - 9M n ) c 2 (d) ( M o - 17M n ) c 2 (c) M o c 2 29 The binding energy of deuteron is 2.2 MeV and that of 42 He is 28 MeV. If two deuterons are fused to form one 42 He, then the energy released is [Haryana PMT] (a) 25.8 MeV (b) 23.6 MeV (c) 19.2 MeV (d) 30.2 MeV 30 Assuming that about 20 MeV of energy is released per fusion reaction 2 3 1 4 1 H + 1 H ® 0 n + 2 He , 2 then the mass of 1 H consumed per day in a fusion reactor of power 1 MW will approximately be [BHU] (a) 0.001 g (b) 0.1 g (c) 10.0 g (d) 1000 g 31 On bombarding U235 by slow neutron, 200 MeV energy is released. If the power output of atomic reactor is 1.6 MW, then the rate of fission will be [KCET] (a) 5 ´ 1022 s -1 (b) 5 ´ 1016 s -1 (c) 8 ´ 1016 s -1 (d) 20 ´ 1016 s -1
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
32 If 200 MeV energy is released in the fission of a single nucleus of 92 U235 , then how many fissions must occur per second to produce a power of 1 kW? [BCECE] (a) 3.12 ´ 1013 (b) 3.12 ´ 103 (c) 3.1 ´ 1017 (d)3.12 ´ 1019
2007 33 The mass of proton is 1.0073 u and that of neutron is 1.0087 u (u = atomic mass unit). The binding energy of 4 [BHU] 2 He is (a) 28.4 MeV (b) 0.061 u (c) 0.0305 J (d) 0.0305 erg
34 What is the Q-value of the reaction p + 7 Li ¾® 4 He + 4 He The atomic masses of 1 H, 4 He and 7 Li are 1.007825 u, 4.002603 u and 7.016004 u respectively [UP CPMT] (a) 17.35 MeV (b) 18.06 MeV (c) 177.35 MeV (d) 170.35 MeV
35 Binding energy per nucleon relation with mass number ~ 4.0015 u) [UP CPMT] (given, mass of helium nucleus (a) first decreases then increases (b) first increases then decreases (c) increases (d) decreases 36 The fission of 235 U can be triggered by the absorption of a slow neutron by a nucleus. Similarly a slow proton can also be used. This statement is [AFMC] (a) correct (b) incorrect (c) information is insufficient (d) None of the above 37 Solar energy is mainly caused due to [BHU] (a) fusion of protons during synthesis of heavier elements (b) gravitational contraction (c) burning of hydrogen in the oxygen (d) fission of uranium present in the sun 38 If in a nuclear fusion process, the masses of the fusing nuclei be m1 and m2 and the mass of the resultant nucleus be m3 , then [Manipal] (a) m3 = m1 + m2 (b) m3 = | m1 - m2 | (c) m3 < ( m1 + m2 ) (d) m3 > ( m1 + m2 ) 39 Nuclear fission can be explained based on (a) Millikan’s oil drop method (b) Liquid drop model (c) Shell model (d) Bohr’s model
[J&K CET]
2006 40 Assertion The binding energy per nucleon, for nuclei with atomic mass number A > 100, decreases with A. Reason The nuclear forces are weak for heavier nuclei. [AIIMS]
(a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
41 Hydrogen bomb is based upon (a) fission (b) fusion (c) chemical reaction (d) transmutation
[AFMC]
42 Nuclear fusion is common to the pair [Manipal] (a) thermonuclear reactor, uranium based nuclear reactor (b) energy production in the sun, uranium based nuclear reactor (c) energy production in the sun, hydrogen bomb (d) disintegration of heavy nuclei, hydrogen bomb 43 Which is nuclear fusion reaction? (a) Hydrogen to helium (b) Uranium to krypton (c) Hydrogen to water (d) Neutron to proton
[JCECE]
44 Two nucleons are at a separation of 1 Fm. The net force between them is F1 , if both are neutrons, F2 , if both are protons and F3 , if one is a proton and the other is a neutron, then [MHT CET] (a) F1 > F2 > F3 (b) F2 > F1 > F3 (c) F1 = F3 = F2 (d) F1 = F2 > F3 45 Assertion Nuclear forces arise from strong interactions between protons and neutrons. Reason Nuclear forces are independent of the charge of the nucleons. [EAMCET] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2005 46 In the reaction
2 3 4 1 1 H + 1 H ® 2 He + 0 n, if the binding 4 3 1 H and 2 He are respectively a , b and c
energies of 12 H, (in MeV), then the energy (in MeV) released in this reaction is [CBSE AIPMT] (a) c + a - b (b) c - a - b (c) a + b + c (d) a + b - c
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ATOMS AND NUCLEI
47 If the binding energies of a deuteron and an a-particle are 1.125 MeV and 7.2 MeV, respectively, then the more stable of the two is [J&K CET] (a) deuteron (b) a-particle (c) Both (a) and (b) (d) sometimes deuteron and sometimes alpha-particle 48 The curve of binding energy per nucleon as a function of atomic mass number has a sharp peak for helium nucleus. This implies that helium [UP CPMT] (a) can easily be broken up (b) is very stable (c) can be used as fissionable material (d) is radioactive 49 Fission of nuclei is possible, because the binding energy per nucleon in them [CBSE AIPMT] (a) increases with mass number at high mass numbers (b) decreases with mass number at high mass numbers (c) increases with mass number at low mass numbers (d) decreases with mass number at low mass numbers mass of fission products 50 In any fission process, the ratio mass of parent nucleus is [CBSE AIPMT] (a) less than 1 (b) greater than 1 (c) equal to 1 (d) depend on the mass of parent nucleus 51 The fusion process is possible at high temperatures, because at higher temperatures [J&K CET] (a) the nucleus disintegrates (b) the molecules disintegrates (c) atoms become ionised (d) the nucleus get sufficient energy to overcome the strong forces of repulsion 52 For maintaining sustained chain reaction, the following is required [J&K CET] (a) protons (b) electrons (c) neutrons (d) positrons
53 Atomic reactor is based on (a) controlled chain reaction (b) uncontrolled chain reaction (c) nuclear fission (d) nuclear fusion
[J&K CET]
54 A chain reaction in fission of uranium is possible, because [RPMT]
(a) two intermediate sized nuclear fragments are formed (b) three neutrons are given out in each fission (c) fragments in fission are radioactive (d) large amount of energy is released
55 The functions of moderators in nuclear reactor is to (a) decrease the speed of neutrons [RPMT] (b) increase the speed of neutrons (c) decrease the speed of electrons (d) increase the speed of electrons 56 The nuclear energy produced in nuclear reactor is used to run [Punjab PMET] (a) AC motor (b) induction generator (c) electric generator (d) DC motor 57 When helium nuclei bombard Beryllium nuclei, then (a) electrons are emitted [DUMET, CBSE AIPMT] (b) protons are emitted (c) neutrons are emitted (d) protons and neutrons are emitted 58 The thermonuclear reaction of hydrogen inside the stars is taking place by a cycle of operations. The particular element which acts as a catalyst is [KCET] (a) nitrogen (b) oxygen (c) helium (d) carbon 59 A neutron breaks into a proton, an electron (b-particle) and anti-neutrino ( 0 n1 ¾® 1H1 + 1b 0 + n ). The energy released in the process in MeV is [AIIMS] (a) 731 MeV (b) 7.31 MeV (c) 0.731 MeV (d) 1.17 MeV
Answers 1 11 21 31 41 51
(a) (b) (d) (b) (b) (d)
2 12 22 32 42 52
(c) (a) (b) (a) (c) (c)
3 13 23 33 43 53
(a) (a) (c) (a) (a) (a)
4 14 24 34 44 54
(b) (b) (d) (a) (c) (b)
5 15 25 35 45 55
(d) (a) (b) (b) (b) (a)
6 16 26 36 46 56
(d) (d) (a) (b) (b) (c)
7 17 27 37 47 57
(a) (b) (a) (a) (b) (c)
8 18 28 38 48 58
(a) (d) (b) (c) (b) (d)
9 19 29 39 49 59
(b) (d) (b) (d) (b) (c)
10 20 30 40 50
(d) (c) (b) (c) (a)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (a) Heavy water (D 2O) is used to slow
2
down fast moving neutrons in nuclear reactor, hence it is called moderator. It does remove neutrons from the system by absorbing them. When fast moving neutrons are passed through heavy water (D 2O ), then they make elastic collisions with protons or deuterium having mass comparable to neutrons, which have comparatively much smaller than velocities. In few interactions, the velocities of neutrons get interchanged with those of protons. Heavy water does not react with slow moving neutrons, i.e. it slow down-fast moving neutrons. Hence, Assertion and Reason both are correct and Reason is the correct explanation of Assertion. Energy (c) Power = Time = 300 ´ 106 W 8
= 3 ´ 10 J/s Energy released due to fission = 170 MeV = 170 ´ 106 ´ 16 . ´ 10-19 = 27.2 ´ 10-12 J Number of atoms fissioned per second, 3 ´ 108 3 ´ 1020 = -12 27.2 27.2 ´ 10 Number of atoms fissioned per hour 3 ´ 1020 ´ 3600 = 27.2 = 4 ´ 1022 m
3 (a) Dm = 2(2.015) - (3.017 + 1009 . ) = 0.004 amu Q Energy released = (0.004 ´ 9315 . ) MeV = 3.726MeV Energy released per deuterium, 3.726 MeV = = 1863 . 2 Number of deuterons in 1 kg 6.02 ´ 1026 = 2 = 3.01 ´ 1026. Q Energy released per kg of deuterium fusion = (3.01 ´ 1026 ´ 1863 . ) = 5.6 ´ 102 MeV = 9 ´ 1013 J
4 (b) According to mass defect, if the
From the above discussion, the Dm is given by Dm = Zmp - Nmn - m( A , Z ) where, m ( A , Z ) is the mass of the atom of mass number A and atomic number Z. Hence, the BE of nucleus is BE = (Zmp + Nmn - m( A , Z )]c2 2
BE = [ Zmp + ( A - Z )mn - m ( A , Z )]c
5 (d) Energy released per fission, E = 200 Mev = 200 ´ 16 . ´ 10-13. -11
J
= 3.2 ´ 10
Total energy required to run a 1 MW reaction for one year = 106 J s-1 ´ (365 ´ 24 ´ 60 ´ 60) 13
= 315 . ´ 10 J Since, 1 fission (atom of U235) produces 3.2 ´ 10-11 J of energy. So, total number of U235 atoms required . ´ 1013 315 is = 9.84 ´ 1023. 3.2 ´ 10-11 Q Mass of U235 containing 9.84 ´ 1023 atom, 235 M = = 9.84 ´ 1023 6.02 ´ 1023 = 384 g = 0.384 kg
6 (d) The binding energy for 1H1 is around zero and also not given in the question, so we can ignore it Q = 2 (4 ´ 7.06) - 7 ´ (5.60) = (8 ´ 7.06) - ( 7 ´ 5.60) = 56.48 - 39.2 = 17.28 MeV ~ 17.3 MeV -
7 (a) The binding energy of a nucleus is the energy required to take its nucleons away from one another. It is generally expressed as binding energy per nucleon. It is a measure of the stability of the nucleus. Higher the binding energy per nucleon, more stable is the nucleus.
8 (a) Binding energy per nucleon For 1H2,
E1 =
2.22 = 1.11 MeV 2
28.3 = 7.08 MeV 4 492 For 28 Fe 56 , E3 = = 8.80 MeV 56 786 For 92U 235 , E4 = = 3.35 MeV 235 Hence, it is obvious that 28 Fe 56 is most For 1He 4 ,
quantity of mass disappearing is Dm, then the binding energy is BE = Dmc2
E2 =
stable as its binding energy per nucleon is highest.
9 (b) The control rods used in a nuclear reactor can be made up of cadmium, because control rods have to absorb fast moving neutrons.
10 (d) The fusion reaction in the sun is a multi-step process in which the hydrogen is burned into helium. Because in fusion, lighter nuclei combine to form heavier nucleus.
11 (b) In practical, the nuclear fusion is a very difficult process. Since, the nuclei to be fused are positively charged, they would repel one another strongly. Hence, they must be brought very close together not only by high pressure, but also with high kinetic ~ 0.1 MeV ). energy ( For this, a temperature of the other of 108 K is required. So, the nuclear fusion reaction between deuterium and tritium takes place at very high temperature and very high pressure.
12 (a) We have to consider binding energy per nucleon curve, where we can find that iron (Fe) is having maximum binding energy per nucleon.
13 (a) When two nuclei join to form a heavier nucleus the binding energy (BE) per nucleon of the heavier nuclei is more than the BE per nucleon of the lighter nuclei.
14 (b) Fusion reaction takes place at high temperature because kinetic energy is high enough to overcome the Coulomb repulsion between nuclei.
15 (a) Moderator is used to slow down the fast moving neutrons. Most commonly used moderator are graphite and heavy water ( D2O). Water cannot be used as moderator in a nuclear reactor.
16 (d) For stable nucleus, specific binding energy is high.
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ATOMS AND NUCLEI
17 (b) If m = 1 u , c = 3 ´ 108 ms- 1, then
24 (d) Carbon rods are not used as safety
E = 931 MeV i.e. 1u = 931 MeV Binding energy = 0.042 ´ 931 = 39.10 MeV \Binding energy per nucleon 39.10 = = 5.58 7 ~ 5.6 MeV -
rods. For this, cadmium rods are used because they can absorb the neutrons.
18 (d) The binding energy of nucleus is the energy released in formation of nucleus by combining its constituent particles, i.e. nucleons. In other words, it is that external energy which is required to isolate the nucleons of the nucleus from each other.
19 (d) We have, the energy released by fission of one uranium atom is 200 MeV, so E = 200 ´ 106 ´ 1.6 ´ 10- 19 -11
= 3.2 ´ 10
J
The power required = 3.2 W Thus, the number of fission required is 3.2 equal to = 1011 fissions. 3.2 ´ 10- 11 E 20 (c) As, P = næç ö÷
´ 1.6 ´ 10- 19 (Q t = 1) n=
10 ´ 103 ´ 60 ´ 60 200 ´ 106 ´ 1.6 ´ 10- 19
=
36 ´ 1019 360 ´ 1018 = 200 ´ 1.6 200 ´ 1.6 18
= 1.125 ´ 10 = 11.25 ´ 1017
21 (d) Binding energy of neutron, E = Dm ´ 931 MeV = (13.00335 - 13) ´ 931 MeV = 3.12 MeV
22 (b) Fusion reaction is initiated with the help of high temperature. æ 2ö DE = mc2 - mc2 ´ ç ÷ è 3ø 4ö 5 æ = ç1 - ÷ mc2 = mc2 è 9ø 9
26 (a) Binding energy of a nucleus containing N neutrons and Z protons is BE = [ NM n + ZM p - M ( A , Z )]c2 BE = NM n + ZM p - M ( A , Z ) c2
Þ
Þ BE = ( A - Z )M n + ZM p - M ( A , Z ) c2 (As, N = A - Z ) Þ M ( A , Z ) = ZM p + ( A - Z )M n -BE / c2
27 (a) As, Q = SBr - SBp Here, SBr = 3Eb , SBp = Ea , Q = e \ e = 3Eb - Ea Þ Ea + e = 3Eb
28 (b) Binding energy, BE = (M nucleus - M nucleons )c2 = (M o - 8M p - 9M n )c2 + 1 H2 ¾® 2 He4 + Energy The energy released in the reaction is difference of binding energies of daughter and parent nuclei. Hence, energy released = binding energy of 2 He4 Binding energy of 1 H2 - 2´ = 28 - 2 ´ 2.2 = 23.6 MeV 1H
Þ 10 ´ 103 ´ 60 ´ 60 = n ´ 200 ´ 106
23 (c) Energy released
reactors, because it contains greater proportion of U235.
29 (b) The reaction can be written as
ètø é 200 MeVù Þ 10 kWh = n ê úû t ë
\
25 (b) Enriched uranium is used in nuclear
2
Hence, energy relased decrease by a 5 factor of . 9
2
30 (b) Energy produced, U = Pt = 106 ´ 24 ´ 36 ´ 102 = 24 ´ 36 ´ 108 J Energy released per fusion reaction = 20 MeV = 20 ´ 106 ´ 1.6 ´ 10-19 = 32 ´ 10-13 J Energy released per atom of 1 H2 = 32 ´ 10-13 J Number of 1 H2 atoms used =
24 ´ 36 ´ 108 = 27 ´ 1021 32 ´ 10-13
Mass of 6 ´ 1023 atoms = 2 g \ Mass of 27 ´ 1021 atoms =
2 ´ 27 ´ 1021 = 0.1 g 6 ´ 1023
31 (b) Energy released on bombarding U235 by neutron = 200 MeV Power output of atomic reactor = 1.6 MW \ Rate of fission 1.6 ´ 106 = 200 ´ 106 ´ 1.6 ´ 10-19 = 5 ´ 1016 s–1
32 (a) Total energy/s = 1000 J Energy released/fission = 200 MeV = 200 ´ 1.6 ´ 10-13 = 3.2 ´ 10-11 J \Number of fission/s 1000 = = 3.12 ´ 1013 3.2 ´ 10-11
33 (a) The nucleus of 2 He4 contains 2 neutrons and 2 protons. Mass of 2 protons = 2 ´ 1.0073 = 2.0146 u Mass of 2 neutrons = 2 ´ 1.0087 = 2.0174 u Total mass of 2 protons and 2 neutrons = (2.0146 + 2.0174) = 4.032 u Mass of helium nucleus = 4.0015 u Thus, mass defect is lacking of mass in forming the helium nucleus from 2 protons and 2 neutrons. \ Dm = Mass defect = (4.032 - 4.0015) u = 0.0305 u = 0.0305 amu but 1 amu = 931 MeV Hence, binding energy, DE = (Dm) ´ 931 = 0.0305 ´ 931 = 28.4 MeV
34 (a) The total mass of the initial particles, mi = 1.007825 + 7.016004 = 8.023829 u and the total mass of the final particles, m f = 2 ´ 4.002603 = 8.005206 u Difference between initial and final mass of particles, Dm = mi - m f = 8.023829 - 8.005206 = 0.018623 u The Q-value is given by Q = (Dm)u2 = 0.018623 ´ 931.5 = 17.35 MeV
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
35 (b) The variation of average binding energy per nucleon with mass number A is shown in figure. Average binding energy per nucleon for light nuclei like 1 H1 , 1 H2 , 1 H3 is small. For mass numbers, ranging from 2 to 20, there are sharply defined peaks corresponding to 2 He4 , 6 C12 , 8 O16 etc. The binding energy curve has a broad maximum in the range A = 30 to A = 120 corresponding to average binding energy per nucleon = 8.5 MeV. The peak value of the curve is 8.8 MeV/ nucleon for 26 Fe56. As the mass number increases, the binding energy per nucleon decreases gradually falling to about 7.6 MeV/ nucleon for 92U 238 . 9.0
Binding energy per nucleon (MeV)
16
8.0 C 12
O
Fe
56
12
7.0
F N
6.0
14
Li
5.0
U
238
7
4.0 3.0 2.0 1.0
H
0.0 0
2
40
60
80
100 120 140 160 180 200 220 240
due to nuclear fusion.
43 (a) Hydrogen bomb is also known as nuclear fusion bomb based upon nuclear fusion of hydrogen nuclei to helium. Since, fusion takes place under the extreme conditions of high pressure and high temperature, a fission bomb must be used as ignitor of a fusion bomb.
44 (c) Nuclear forces are the strong forces of attraction which hold together the nucleons (neutrons and protons) in the tiny nucleus of an atom, inspite of strong electrostatics forces of repulsion between protons. Nuclear forces act between a pair of neutrons, a pair of protons and also between a neutron, proton pair with the same strength. This shows that the nuclear forces are independent of charge. Hence, F1 = F3 = F2
36 (b) Because the neutron has no electric charge, it experiences no 235
electric repulsion from a U nucleus. Hence, a slow moving neutron can approach and enter a U235 nucleus, thereby providing the excitation needed to trigger fission. In contrast, a slow moving proton feels a strong repulsion from a U235 nucleus. It never gets close to the nucleus, so it cannot trigger nuclear fission. Hence, given statement is incorrect.
37 (a) In solar energy huge amount is produced due to fusion of 4 protons (hydrogen nuclei) into a heavier element (helium nucleus) according to the reaction 1
1
1
4
(protons and neutrons) within the nucleus. This force does not depend on the charge.
46 (b) Binding energy of (21 H + 31 H) = a + b
Mass number (A)
1H
41 (b) Hydrogen bomb is based on nuclear fusion. 42 (c) The energy released in the sun and hydrogen bomb are
45 (b) The nuclear force is responsible to bind the nucleons 20
1
that nucleus. For heavy nuclei ( A > 100), Coulomb repulsion between the protons inside the nucleus increases. This results in decrease in binding energy per nucleon. Now, nuclear force is the familiar Coulomb force that determines the motion of atomic electrons. Nuclear force is nearly same for all nuclei.
0
+ 1 H + 1 H + 1 H ® 2 He + 2 +1b + g (energy ) + 2n
38 (c) In a nuclear fusion, when two light nuclei of different masses are combined to form a stable nucleus, then some mass is lost and appears in the form of energy, called the mass defect. So, the mass of resultant nucleus is always less than the sum of masses of initial nuclei, i.e. m3 < (m1 + m2 )
39 (d) The nuclear fission can be explained on the basis of Bohr’s model of atom.
40 (c) A better measure of the force between the constituents of the nucleus is the binding energy per nucleon, which is the ratio of the binding energy of a nucleus to the number of the nucleons in
Binding energy of 42 He = c In a nuclear reaction, the resultant nucleus is more stable than the reactants. Hence, binding energy of 42 He will be more than that of (21 H + 31 H). Thus, energy released per nucleon = resultant binding energy = c - (a + b) = c - a - b
47 (b) In order to compare the stability of the nuclei of different atoms, binding energy per nucleon is determined. Higher the binding energy per nucleon more stable is the nucleus. 1.125 \BE per nucleon of deuteron = = 0.5625 MeV 2 7.2 BE per nucleon of alpha particle = = 1.8 MeV 4 Since, binding energy per nucleon of a-particle is more, hence it is more stable.
48 (b) The elements higher on the binding energy versus mass number plot are very tightly bound and hence are stable of the element those are lower on this plot are lightly bond and hence are unstable. Hence, helium having sharp peak is very stable.
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ATOMS AND NUCLEI
49 (b) The binding energy per nucleon for the middle nuclides (from A = 20 to A = 56) is maximum. Hence, these are more stable. As the mass number increases, the binding energy per nucleon gradually decreases and ultimately binding energy per nucleon of heavy nuclides (such as uranium etc.) is comparatively low. Hence, these nuclides are relatively unstable. So, they can be fissioned easily.
50 (a) In fission process, when a parent nucleus breaks into daughter products, then some mass is lost in the form of energy. Thus, mass of fission products < mass of parent nucleus Mass of fission products l 2 > l 3 [UP CPMT] (c) l 1 < l 2 < l 3 (d) l 1 = l 2 > l 3 12 Sharp peak point A represents A B
(a) characteristic X-rays (c) Band spectrum
(b) continuous X-rays (d) discontinuous spectrum
13 The spacing between the principal planes of a crystal is 4 Å. It is found that first order Bragg reflection of a beam of monochromatic X-rays occurs at an angle of 30°. The wavelength of X-rays is [Haryana PMT, CG PMT] (a) 4 Å (b) 2 Å (c) 1 Å (d) 1.5 Å 14 The shortest wavelength of X-rays coming from an X-ray tube depends on the [J&K CET] (a) voltage applied to the tube (b) current in the tube (c) atomic number of target element (d) nature of gas in the tube
a particular characteristic X-ray and the atomic number ( Z ) of the element depend on each other as [J&K CET] h 2 (a) n = kZ (b) n = 2 Z (c) n = kZ (d) n = kZ
17 Hydrogen atom does not emit X-rays, because [KCET] (a) it contains only a single electron (b) energy levels in it are far apart (c) its size is very small (d) energy levels in it are very close to each other
2007 18 A beam of 35.0 keV electrons strikes a molybdenum target and generate the X-rays. What is the cutoff wavelength? (a) 35.5 Å (b) 40.0 Å [AIIMS] (c) 15.95 Å (d) 18.2 Å
19 The distance between two successive atomic planes of a calcite crystal is 0.3 nm. The minimum angle for Bragg scattering of 0.3 Å X-rays will be [RPMT] (a) 1.43° (b) 1.56° (c) 2.86° (d) 30° 20 An X-ray machine is opearated at 40 kV. The short wavelength limit of continuous X-rays will be (take, h = 6.63 ´ 10-34 J-s, c = 3 ´ 108 ms -1 and e = 1.6 ´ 10-19 C) [BCECE] (a) 0.31Å (b) 0.62 Å (c) 0.155 Å (d) 0.62 Å 21 Hard X-rays for the study of fractures in bones should have a minimum wavelength of10-11 m. The accelerating voltage for electrons in X-ray machine should be [JCECE] (a) < 124 kV (b) > 124 kV (c) between 60 kV and 70 kV (d) 100 kV
2006 22 Assertion Standard optical diffraction cannot be used for discriminating between different X-ray wavelengths. Reason The grating spacing is not of the order of X-ray wavelengths. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
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ATOMS AND NUCLEI
2005 26 The X-ray beam coming from an X-ray tube will be
23 X-rays are used in determining the molecular structure of crystalline because [UP CPMT] (a) its energy is high (b) it can penetrate the material (c) its wavelength is comparable to interatomic distance (d) its frequency is low
(a) monochromatic [BHU] (b) having all wavelengths lying between a minimum and a maximum wavelength (c) having all wavelengths larger than a certain minimum wavelength (d) having all wavelengths smaller than a certain maximum wavelength
24 The minimum wavelength of X-rays emitted by X-ray tube is 0.4125 Å. The accelerating voltage is [Manipal] (a) 30 kV (b) 50 kV (c) 80 kV (d) 60 kV
27 Who discovered X-rays? (a) Roentgen (c) Rutherford
25 In X-ray spectrum, transition of an electron from an outer shell to an inner shell gives a characteristics X-ray spectral line. If we consider the spectral line K b , Lb and M a , then (a) K b and Lb have a common inner shell [EAMCET] (b) K b and Lb have a common outer shell (c) Lb and M a have a common outer shell (d) Lb and M a have a common inner shell
[BHU]
(b) Madam Curie (d) All of these
28 The X-ray cannot be diffracted by means of an ordinary grating due to [Punjab PMET] (a) large wavelength (b) high speed (c) short wavelength (d) All of these
Answers 1 (a)
2 (c)
3 (c)
4 (a)
5 (b)
6 (b)
7 (b)
8 (c)
9 (a)
10 (d)
11 (a)
12 (a)
13 (a)
14 (a)
15 (a)
16 (d)
17 (d)
18 (a)
19 (c)
20 (a)
21 (a)
22 (a)
23 (c)
24 (a)
25 (b)
26 (c)
27 (a)
28 (c)
Explanations 1 (a) In crystal, the difference between the atoms of crystal is of the order of wavelength of X-rays. When X-rays fall on a crystal, they are diffracted. The diffraction pattern is helpful in the study of crystal structure.
2 (c) The penetrating power of X-rays depends upon their wavelength, which depends upon frequency. The frequency of X-rays having longer wavelength is lower and so their energy is smaller. Hence, their penetrating power is weaker and they are called soft X-rays. While the penetrating power of X-rays, having shorter wavelength or higher frequency is stronger and they are called hard or highly penetrating X-rays.
3 (c) Moseley’s law is given by v = a (Z - b) For K a line, b = 1 \ v = a (Z - 1) Squaring both sides, we get v = a2 (Z - 1)2 c or = a2 (Z - 1)2 l c or l= 2 a (Z - 1)2
For
We know that,
Z = 43,
c \ Wavelength, l = 2 a (43 - 1)2 c or l= 2 a (42)2
hc eV 6.64 ´ 10- 34 ´3 ´ 108 = 1.6 ´ 10- 19 ´ 24.75 ´ 103 6.64 ´ 3 = ´ 10- 10 1.6 ´ 24.75
Minimum wavelength, l min = …(i)
For Z = 29, \ Wavelength , l ¢ = or
l¢ =
c a2 (29 - 1)2
c a2 (28)2
= 0.50 ´ 10- 10 = 0.5 Å …(ii)
7 (b) Given, vmax = 4 ´ 108 cm/s = 4 ´ 106 m/s
Dividing Eq. (ii) by Eq. (i), we get 2
2
l ¢ æ 42 ö æ 9ö æ 3ö = ç ÷ = ç ÷ Þ l¢ = ç ÷ l ø è ø è è4ø l 28 2
4 (a) Wavelength lk is independent of the accelerating voltage (V ), while the minimum wavelength l c is inversely proportional to V . Therefore, as V increases l k remains unchanged whereas l c decreases as l k - l c will increase.
5 (b) The crystal structure can be studied using X-rays.
\
1 2 mvmax 2 1 = ´ 9 ´ 10-31 ´ (4 ´ 106 )2 2 = 7.2 ´ 10-18 J = 45 eV
K max =
We know that, K max = |V0 | e Hence, stopping potential K 45 eV | V0 | = max = e e = 45 V
8 (c) As, E (K g ) > E (Kb ) > E (K a )
6 (b) Given, V = 24.75 kV = 24.75 ´ 103 V
1ö æ Þ l (K g ) < l (Kb ) < l (K a ) çQ lµ ÷ è Eø
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
produce an X-ray photon, which means a jump of about 100 eV or more. In an hydrogen atom, the largest energy drop is about 10.2 eV. So, hydrogen atom does not emit X-rays due to the fact that energy levels in it are very close to each other.
9 (a) X-rays travel in straight line with speed of light, i.e. 3 ´ 108 m/s. Because this is a part of electromagnetic radiation.
10 (d) Absorption of X-rays is maximum in the material sheets of Pb of same thickness.
corresponds to an electron transferring (approximately) all of its energy to an X-ray photon, thus producing a photon with the greatest possible frequency and least possible wavelength.
lead isotopes Pb 208 , Pb 206 and Pb 204 will be same for all i.e. l 1 = l 2 = l 3, because it does not change on changing mass number it depends only on Z, i.e. atomic number.
From relation hc (4.14 ´ 10-15 ) (3 ´ 108 ) l min = = K0 35.0 ´ 103
12 (a) Sharp peak point A represents characteristic X-rays.
= 3.55 ´ 10-11 m = 35.5 Å
13 (a) We know that, nl = 2d sin q
19 (c) For constructive interference, we have 2d sin q = nl Given, l = 0.3 Å = 0.3 ´ 10- 10 m
Given, q = 30°, d = 4 Å - 10
2d sin q 2 ´ 4 ´ 10 sin 30° = n 1 1 = 2 ´ 4 ´ 10- 10 ´ 2 = 4 ´ 10- 10 m = 4 Å
d = 0.3 nm = 0.3 ´ 10- 9 m sin q =
14 (a) When the electron loses whole of its energy in a single collision with the atoms, an X-ray photon of maximum energy hn max is emitted i.e. 1 mv 2 = eV = hn max = hc / l min 2 Minimum wavelength = cut-off wavelength of X-ray hc 12375 Å l min = = eV V (in volt)
15
Thus, shortest wavelenth of X-rays coming from an X-rays tube depends on the voltage applied to the tube. hc (a) We know that, E = l Given, l = 1 Å = 1 ´ 10- 10 m - 34
Þ
20
6.64 ´ 10 ´ 3 ´ 10 - 10 1 ´ 10 = 6.64 ´ 3 ´ 10- 16
= 19.92 ´ 10- 16 = 2 ´ 10- 15 J
16 (d) According to Moseley’s law of n = k (Z - b) k = proportionality constant b = shielding constant. b=0 n = kZ
17 (d) In order for an atom to emit X-rays, an electron must jump from a high to low energy level. The difference in that energy needs to be large, enough to
nl 1 ´ 0.3 ´ 10-10 = 2d 2 ´ 0.3 ´ 10-9
= 0.05 rad 0.05 ´ 180 = = 2.86° p (a) For the most favourable collision in which the electron loses the whole of its energy in a single collision with the target atom, an X-ray photon of maximum energy hn max emitted. Thus, for an accelerating voltage V , the maximum X-ray photon energy is given by hn max = eV hc Also, l min = eV 6.63 ´ 10-34 ´ 3 ´ 108 = 1.6 ´ 10-19 ´ 40 ´ 103 -10
= 0. 31 ´ 10
8
E=
X-rays, where, and Here, \
radiations whose wavelengths are of the order of 1 Å (= 10-10 m ). A standard optical diffraction grating cannot be used to discriminate between different wavelengths in the X-ray wavelength range. For l = 1 Å (= 0.1 nm ) and d = 3000 nm, for example, the first order maximum occurs at .) æ ml ö -1 (1)(01 q = sin -1 ç ÷ = sin è d ø 3000
18 (a) The cut-off wavelength lmin
11 (a) The wavelength of K a X-rays for
\l=
22 (a) X-rays are electromagnetic
m » 0. 31 Å
21 (a) From conservation of energy, the kinetic energy of electron equals the maximum photon energy (we neglect the work function f because it is normally so small compared to eV0). hc eV0 = \ l min hc \ V0 = el min -10
or
V0 =
12400 ´ 10 10-11
= 124 kV
Hence, accelerating voltage for electrons in X-ray machine should be less than 124 kV.
23
= 0.0019° This is too close to the central maximum to be practical. A grating with d » l is desirable, but, since X-ray wavelengths are about equal to atomic diameter, such gratings cannot be constructed directly. (c) Crystal structure is explored through the diffraction of waves having a wavelength comparable with the interatomic spacing (10-10 m ) in crystals. Radiation of longer wavelength cannot resolve the details of structure, while radiation of much shorter wavelength is diffracted through inconveniently small angles. Usually diffraction of X-ray is employed in the study of crystal structure as X-rays have wavelength comparable to interatomic spacing.
24 (a) From the formula, eV = =
hc Þ l
V =
hc el
6. 6 ´ 10-34 ´ 3 ´ 108 1. 6 ´ 10-19 ´ 0. 4125 ´ 10-10
= 30 ´ 103 V = 30 kV
25 (b) If Kb and Lb have a common outer shell, then in X-rays spectrum, transition of an electron from an outer shell to inner shell gives a characteristics X-rays spectral line.
26 (c) The X-ray spectrum is continuous i.e. we have all wavelengths larger than a certain minimum wavelength hc l min = , eV
where, V = accelerating potential.
27 (a) Roentgen discovered X-rays. 28 (c) For diffraction, the edges of the obstacle should be comparable to the wavelength of radiation. Wavelength of X-rays is very low, so they cannot be diffracted through ordinary grating.
27 Semiconductor Electronics Quick Review Among the various states of matter, electrical conductivity in solids is due to both electrons and holes and this can be understood by the help of energy band theory.
• Some important terms used in energy band theory are
shown in tabular form below Terms
Energy band A group of large number of closely spaced energy levels. Valence The highest energy band occupies by the valence band electrons. Conduction The lowest unoccupied or empty band next to the band valence band. Forbidden The amount of energy needed to release an band electron from valence band to conduction band.
Energy Band Theory • According to Bohr’s theory, each and every
shell and subshell of atoms contains a discrete amount of energy. When atoms are brought together, electrons of outermost shell interact each other. This interaction change the energy level, which give rise to energy band theory.
Definitions
• Classification of solids on the basis of energy band theory
are given in flow chart
Solid
EV Valence band
Conduction band Eg ≈ 0 Valence band
For metals
Insulators Empty conduction band EC
Conduction band
Eg < 3 eV EV
Valence band
Electron energy
Conduction band
Overlapped area
Electron energy E C
Semiconductors
Electron energy
Metals
EC Eg > 3 eV EV
Valence band
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Semiconductors These are the substances like silicon, germanium, etc. that offer resistance that lies in between that, offered by conductors and insulators. Some important properties of semiconductors are given below (i) They have negative temperature coefficient of resistance. (ii) At 0K, these behave as a 100% insulator. (iii) Its conductivity s is (10-5 - 10-6 Sm -1 ) and resistivity r is (10-5 - 106 W-m ) Semiconductors ½ ¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾ ½ ½ ¯ ¯ Extrinsic Semiconductor Intrinsic Semiconductor Semiconductor which It is a pure form of semiconductor have doped impurity. and its conductivity is given by s i = eni(me + m n ) Based on impurity,
it is of two types
½ ¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾¾ ½ ½ ¯ ¯ n-type Semiconductor p-type Semiconductor • In it pentavalent impurity, e.g. P, • In it trivalent impurity, e.g. B, Al, As, Sb is used as a dopant with In, Ga etc., is used as a dopant Si or Ge. with Si or Ge.
• Pentavalent impurity is called
donor impurity because each dopant atom provides one free electron.
(ii) Drift Current ( I dr ) Current flowing from n-side to p-side due to electron-hole pairs (because of thermal collision) created in depletion region. • It is represented by the symbol given below ssrr p ssrr ssrr n Anode ssrr ssrr Metallic contact Metallic contact (a)
Cathode
(b)
• Dynamic resistance ( rd ) offered by junction diode will
depend on applied voltage and is expressed as DV rd = DI
Biasing of Junction Diode • Biasing of junction diode is the method of connecting
external battery or emf source to p-n junction. • Biasing are of two types as given in following flow chart Biasing of junction diodes
• Trivalent impurity is called
Forward biasing
Reverse biasing
Positive terminal of the battery is connected to p-crystal and negative terminal to n-crystal.
Positive terminal of the battery is connected to n-crystal and vice-versa.
Width of effective barrier potential decreases.
Width of effective barrier potential increases.
acceptor impurity because each dopant atom provides a hole.
• In it electrons are majority charge • In it holes are majority charge carriers and the holes are minority charges carries such that, ne × nh = ni2.
p n
carries and electrons are minority charge carriers such that nh × ne = ni2.
• It is electrically neutral and is not • It is electrically neutral and is not positively charged.
Semiconductor diode/p-n Junction diode
Due to diffusion at junction, depletion layer is formed, which stop further diffusion of charges. Depletion layer is made of immobile ions. • Potential Barrier The potential difference developed across the p-n junction due to diffusion of electrons and holes. e.g. Vb for Ge = 0.3 V and for Si = 0.7 V. • Current flowing across a p-n junction are of two types as follows (i) Diffusion Current ( I df ) Current flowing from p-side to n-side due to diffusion of electrons and holes because of concentration difference.
7 Forward current (mA)
It is obtained by joining a small p-type crystal with a small n-type crystal without employing any other binding material in between them.
B
6 5 4
Reverse voltage (V) –10 –8 –6 –4 –2 C
Ge
3 1 O
2 Breakdown voltage
2
4 6
A 0.1 0.2 0.3 0.4 0.5 Forward voltage (V)
0
D
8
Reverse current (µ A)
negatively charged.
Note In forward biasing Idf > Idr, Inet is from p-side to n-side but in reverse bias Idr > Idf or Inet is from n-side to p-side.
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SEMICONDUCTOR ELECTRONICS
V-I Characteristic of Junction Diode
• A large current produced due to high electric field breaking
the covalent bonds and producing large number of carriers in reverse bias is known as zener breakdown. • At high reverse voltage, due to high electric field generating more carriers give rise to high current. This mechanism is knwon as Avalanche breakdown.
CompleteV-I characteristic of a junction diode is shown below which does not obey Ohm’s law. I Zener voltage
Knee voltage V (Forward bias)
Diode as a Rectifier The use of diode to rectify AC voltage and the circuit used for this purpose is known as rectifier. There are two types of it, which are given below in tabular form
(Reverse bias)
Avalanche breakdown
Zener breakdown
Types
Half-Wave Rectifiers
Full Wave Rectifiers
It uses one diode which converts the positive half cycle of the input signal into pulsating DC output as in figure.
It uses two diodes which convert the both half cycles of the input signal into a pulsating DC output, as in figure.
Circuit diagram
Transformer
A
Centre tap transformer
X
Diode 1(D1)
A
AC Primary
R L Output
Secondary
Centre tap
Input B
X
B
Y
RL Output
Diode 2(D2)
Voltage across RL
0
Input AC +
+
π
3π
2π –
4π ωt t
– Output AC
+
+ π
2π
3π
4π
ωt
O
• The ripple factor =
Effective AC component of voltage Effective DC component of voltage V0 I and I DC = 0 p p
ωt
O
π
2π
4π t
(ii)
ωt
Due to Due to Due to Due to D1 D2 D1 D2 π
2π
3π
4π t
ωt
• Ripple factor in full wave rectifier, VAC = 0.48 = 48% VDC
• The average output in one cycle is VDC =
4π t
3π
O
Important Terms
3π
2π
π
0
(i)
Output waveform (across RL)
0
Input Input Waveform at B Waveform at A
Input-Output waveforms
Voltage at A
Y
• The average output in one cycle is VDC = and
I DC =
2 I0 p
2 V0 p
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Special Purpose p-n Junction Diodes There are many types of p-n junction diode based on their purpose, some of them are discussed here Devices Zener diode
Description
Symbols
V-I Characteristics
It is a heavily doped p-n junction diode and operated in reverse bias.
Uses (i) In voltage stabilisers. (ii) For calibrating voltmeters.
I (mA)
Forward bias
Reverse bias VZ
O
V
I (µA)
Solar cell
It is a p-n junction diode that converts solar energy into electrical energy.
+
hν
I
V
O Isc
Short circuit current
–
Photodiode
It is a special type reverse biased p-n junction diode where current carriers are generated by photons.
Anode p n Cathode
Reverse bias
Reverse current I4 > I3 > I2 > I1
It is a forward biased p-n junction which emits light spontaneously.
(i) In light-operated switches (ii) Light-detection systems. (iii) Computer punch cards.
mA
hν
I1 I2 I3 I4
Light Emitting Diode (LED)
In space vehicles.
Open circuit voltage (Voc)
µA
Silicon
30
p n
(i) As bulb. (ii) In optical communication.
I (mA)
hν Anode
volt
Cathode 20 15 10
Cathode
–10V Anode
0.5 0.8 0 1 µA
V (volt)
i
Note Zener diode can be used as a voltage regulator, in which the constant output voltage is taken across a load resistance connected in parallel with it. I Rs Unregulated voltage IZ
IL Load RL
Regulated voltage, VZ
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SEMICONDUCTOR ELECTRONICS
(ii) Base ( B ) Lightly doped, thin and passes charge carriers from emitter to collector.
Junction Transistors • A three terminal device formed by sandwiching a thin wafer of
one type of semiconductors between two layers of another type.
(iii) Collector (C ) Moderately doped, lies between the doping levels of emitter and base. Its size is larger as it collects the charge carriers from base. • Circuit diagrams of n-p-n and p-n-p transistors along with other features are shown below
• Its three terminals and their functions are as follows
(i) Emitter ( E ) Heavily doped, moderate in size and emits the majority charge carriers into the base due to which current flows. Transistors
n-p-n
p
n
E
p-n-p
n
Circuit symbol
C
p
E
B
B E
E
C
C B
B
p-Base n-Emitter Region n-Collector p
E n
n-Base p-Emitter Region p-Collector IE
n C
B
VEB
VCB IB
− + IE
VEB
−
IC
p
n
C B
VEB
IC +
+
VCB
IC
IC
B −
VEB
C
IE
IC
− +
−
VCC
p-n-p E
IE
IB
IC
+
− IE
VEE
C
IE
VCB
IB
n-p-n E
p
E
Action of transistors IE
C
p
n
IC
IE
Biasing
IB
+ −
+
VEB
VCB
IC
B +
− VCB
Note In n-p-n transistor IC > > IB but in p-n-p transistor IC < < IB as emitter current IE = IC + IB .
• Transistor configuration are of three types shown in following flow chart Transistor circuit configuration
Common Base (CB)
Common Emitter (CE) IB Input
C
IE
E
C
IC
IB
B VBE
VBB
IC
Common Collector (CC)
E VCE
Output VCC
VBE
Input VBB
B
E
Output VCB
Input VCC
VBC VBB
IE
B C VCE
Output VCC
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Various Characteristics of Transistor The graphical relations are shown in tabular form below, for common emitter (CE) characteristics of a n- p-n transistor. Characteristics
Diagram
Circuit diagram of n-p-n transistor in CE mode
Parameters
IC IB + µA−
+ VBE VBB −
+ −
Input characteristics of a CE (n-p-n ) transistor (VBE ~ I B ) graph
B
C −mA+ E IE
IB
+ −
VCC
IC
VCE = 4 V
100
+
VCE −
VCE = 10 V
Base current (IB)
80 60
Input resistance, æ DV ö Ri = ç BE ÷ è DI B øVCE = constant
∆IB
40 20
∆VBE
0.2 0.4 0.6 0.8 1.0 1.2 1.4 1.6
Output or collector characteristics (VCE ~ IC ) graph
Collector current (IC) in mA
Base to emitter voltage (VBE) in volts
æ DV ö Output resistance, ro ç CE ÷ è DIC ø IB = constant
Base current (IB)
10
60 mA
8
= Reciprocal of slope of IC ~ VCE curve
50 mA
6
40 mA 30 mA
4
20 mA 10 mA
2 0
2
4
6
8
10 12 14 16
Collector to emitter voltage (VCE) in volt
Transfer characteristics (I B ~ IC ) graph
IC (mA) Transfer 10
VC = 4.5 V
Current amplification factor (b ), æ DI ö b AC = ç C ÷ è DI B ø V = constant CE
(b AC >> 1) 5
0
100
200 IB(µA)
• Current amplification factor (a ) of a transistor in common base mode is
é DI ù a=ê C ú ë DI E û VCB = constant • Current amplification factor (b ) of a transistor in common emitter mode is
é DI ù b=ê C ú ë DI B û VCE = constant Note b a and b = . 1+ b 1- a • a and b are independent of current, if EB junction is forward biased and CB junction is reverse biased.
• Relation between a and b is given as a =
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SEMICONDUCTOR ELECTRONICS
Transistor as an Amplifier
Transistor as a Switch
• Transistor can be used as an amplifier for increasing the
amplitude of input signal. • Circuit diagrams of n- p-n transistor (in CE mode) along with power gains are shown in following table Features
• Transistor can be used as a switch because its I C is
directly controlled by I B . • CE( n - p -n ) transistor along with its characteristic and other parameters are shown in following table
Circuits and gains
Circuit diagram (n-p-n) in CE mode
B
n-p-n E
VBE Input ´ AC Signal
VCE + IC VCC
+ –
b DC
AC current gain
RL
IE
VBB
DC current gain
IC
C
IB
Features Circuit diagram of n-p-n in (CE) mode as a switch
IC
RB
B IB
Vi Input voltage
IC
VBE
VCC
IE
Cut-off V0 region
AV =
Saturation region
DIC Rout ´ DI B Rin
Vi
Input and output voltages
= current gain ´ resistance gain AC power gain
V0 Output voltage
Active region
æ DI ö b AC = ç C ÷ è DI B øVCE = constant
AC voltage gain
RC
Collector supply voltage
Transfer characteristic as a switch
æI ö =ç C÷ è I B øVCE = constant
C n-p-n E
Amplified Output AC Signal
– IB
Parameters
Vi = I B × RB + VBE Vo = VCC - IC RC
AC power gain = b ACAV = b 2AC ´ resistance gain
Note In case of silicon transistor, if Vi < 0.6 V, IB = 0, IC = 0 and transistor will operate in cut off state and V0 = VCC .
Transistor as an Oscillator • Transistor can be used as an oscillator which produces electrical oscillation of constant frequency and amplitude without any
external input signal.
• Block diagram of transistor oscillator along with its several components are shown in following flow chart Input L
C
Transistor amplifier
Output
Feedback circuit
Tank circuit
Transistor amplifier
Feedback circuit Amplifier
It is a parallel combination of an inductance (L) and capacitance (C) with frequency, 1 . f= 2π √LC
receives the oscillations from the tank circuit and amplifies it.
Note An oscillator may be regarded as an amplifier which provides its own input signal.
LC network
Output
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Logic Gates These are the building blocks of digital circuits using diodes and transistors to perform switching function. A logic gate (a digital circuit) has one output but one or more inputs. Three basic gates along with two combination gates with their truth tables and logic symbols are shown in following table Boolean Expressions
Logic Symbols A B
OR Gate Y =A+ B
Y=A+B
Input A 0 0 1 1
AND Gate Y =A×B
A B
NOT Gate Y =A
A
Y=A.B
– Y=A
AND
Combination of Gates
A B
Output
Y =A
0 1
1 0
A
B
Y¢= A×B
Y = AB
0 0 1 1
0 1 0 1
0 0 0 1
1 1 1 0
Input
Output
Input
Y=A + B Y=A+B
Y = A×B 0 0 0 1
A
Y=AB
Y′ = A + B
A B
B 0 1 0 1
Output
Y=AB
Y ′ = A.B A B
Y =A+ B 0 1 1 1
Input
NOT
A B
Output B 0 1 0 1
Input A 0 0 1 1
NAND Gate Y = A × B or Y = AB
NOR Gate Y =A+ B
Truth Tables
Output
A
B
Y¢= A+ B
Y =A+ B
0 0 1 1
0 1 0 1
0 1 1 1
1 0 0 0
Topical Practice Questions All the exam questions of this chapter have been divided into 4 topics as listed below Topic 1
—
ENERGY BANDS THEORY (METALS, SEMICONDUCTORS AND INSULATOR)
813–818
Topic 2
—
p-n JUNCTION DIODE
819–827
Topic 3
—
TRANSISTORS
828–834
Topic 4
—
DIGITAL CIRCUIT
835–843
Topic 1 Energy Bands Theory (Metals, Semiconductors and Insulator) 2019 1 For a p-type semiconductor, which of the following statements is true ? [NEET] (a) Holes are the majority carriers and trivalent atoms are the dopants. (b) Holes are the majority carriers and pentavalent atoms are the dopants. (c) Electrons are the majority carriers and pentavalent atoms are the dopants. (d) Electrons are the majority carriers and trivalent atoms are the dopants.
2017 2 A specimen of silicon is to be made p-type semiconductor, for this one atom of indium, on an average, is doped in 5 × 107 silicon atoms. If the number density of silicon is 5 × 1028 atom/m 3 , then the number of acceptor atoms per cm 3 will be [AIIMS] (a) 2. 5 × 1030 (b) 1.0 × 1013 15 (c) 1.0 × 10 (d) 2.5 × 1036
2014 3 A piece of semiconductor is connected in series in an electric circuit. On increasing the temperature, the current in the circuit will [EAMCET] (a) decrease (b) remain unchanged (c) increase (d) stop flowing
4 In insulators (CB is Conduction Band and VB is Valence Band) [MHT CET] (a) VB is partially filled with electrons (b) CB is partially filled with electrons (c) CB is empty and VB is filled with electrons (d) CB is filled with electrons and VB is empty 5 Identify the wrong statement. [Kerala CEE] (a) In conductors, the valence and conduction bands overlap. (b) Substances with energy gap of the order of 10 eV are insulators. (c) The resistivity of semiconductors is lower than metals. (d) The conductivity of metals is high. (e) The resistivity of a semiconductor is lower than that of an insulator.
6 In the band gap between valence band and conduction band in a material is 5.0 eV, then the material is [WB JEE] (a) semiconductor (b) good conductor (c) superconductor (d) insulator 7 In n-type semiconductor, electrons are majority charge carriers but it does not show any negative charge. The reason is [KCET] (a) electrons are stationary (b) electrons neutralise with holes (c) mobility of electrons is extremely small (d) atom is electrically neutral
2013 8 In a n-type semiconductor, which of the following statement is true? [NEET] (a) Electrons are majority carriers and trivalent atoms are dopants (b) Electrons are minority carriers and pentavalent atoms are dopants (c) Holes are minority carriers and pentavalent atoms are dopants (d) Holes are majority carriers and trivalent atom are dopants
9 The electrical conductivity of semiconductor increases when electromagnetic radiation of wavelength shorter than 2480 nm is incident on it. The band gap (in eV) for the semiconductor is (a) 0.9 (b) 0.7 (c) 0.5 (d) 1.1 [AIIMS]
2012 10 The elements C and Si both have same lattice structure, having 4 bonding electrons in each. However, C is insulator, whereas Si is intrinsic semiconductor. This is because [CBSE AIPMT] (a) in case of C, the valence band is not completely filled at absolute zero temperature (b) in case of C, the conduction band is partly filled even at absolute zero temperature (c) the four bonding electrons in the case of C lie in the second orbit, whereas in the case of Si, they lie in the third orbit (d) the four bonding electrons in the case of C lie in the third orbit, whereas for Si, they lie in the fourth orbit
2011 11 If a small amount of antimony is added to germanium crystal [CBSE AIPMT]
(a) the antimony becomes an acceptor atom (b) there will be more free electrons than holes in the semiconductor (c) its resistance is increased (d) it becomes a p-type semiconductor
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2010 12 Which one of the following statement is false?
[CBSE AIPMT]
(a) Pure Si doped with trivalent impurities gives a p-type semiconductor. (b) Majority carriers in a n-type semiconductor are holes. (c) Minority carriers in a p-type semiconductor are electrons. (d) The resistance of intrinsic semiconductor decreases with increase of temperature.
13 The typical ionisation energy of a donor in silicon is (a) 10.0 eV (b) 1.0 eV [AFMC] (c) 0.1 eV (d) 0.001 eV 14 Based on the energy band description, a solid can be classified as an insulator. The energy gap between the valence band and conduction band is [Manipal] (b) E g > 6 eV (a) 3 eV< E g < 6 eV (c) E g < 3eV (d) E g = 0 15 A p-type semiconductor can be obtained by adding (a) arsenic to pure silicon (b) aluminium to pure silicon (c) antimony to pure germanium (d) phosphorous to pure germanium
[OJEE]
16 The forbidden energy gap in Ge is 0.72 eV. Given, hc = 12400 eV-Å. The maximum wavelength of radiation that will generate electron hole pair is [KCET] (a) 172220 Å (b) 172.2 Å (c) 17222 Å (d) 1722 Å 17 The energy gap between the valence band and the conduction band for a material is 6 eV. The material is (a) an insulator [MGIMS] (b) a metal (c) an intrinsic semiconductor (d) a superconductor 18 Band gap of silicon is E g (Si) of germanium is E g (Ge) and of carbon is E g (C). The correct order of band gap is (a) E g ( Si ) < E g ( Ge ) < E g ( C ) [DUMET] (b) E g ( Si ) > E g ( Ge ) < E g ( C ) (c) E g ( Si ) < E g ( Ge ) > E g ( C ) (d) E g ( Si ) > E g ( Ge ) > E g ( C ) 19 Assertion The resistivity of a semiconductor decreases with temperature. Reason The atoms of a semiconductor vibrate with larger amplitudes at higher temperature there by increasing its resistivity. [NMMC] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
20 An n-type semiconductor is formed [CG PMT] (a) when germanium crystal is doped with an impurity containing 3 valence electrons (b) when germanium crystal is doped with an impurity containing 5 valence electrons (c) from pure germanium (d) from pure silicon 21 The contribution in the total current flowing through a semiconductor due to electrons and holes are 3/4 and 1/4, respectively. If the drift velocity of electrons is 5/2 times that of holes at this temperature, then the ratio of concentration of electrons and holes is [JCECE] (a) 6 : 5 (b) 5 : 6 (c) 3 : 2 (d) 2 : 3 2009 22 Suitable impurities are added to a semiconductor depending on its use. This is done to (a) increase its life (b) enable it to withstand high voltage (c) increase its electrical conductivity (d) increase its electrical resistivity
[AFMC]
23 The energy band gap (distance between the conduction band and valence band) in conductor is [MHT CET] (a) zero (b) 4 Å (c) 10 Å (d) 100 Å 24 A semiconductor has an electron concentration of 8 × 1013 / m 3 and hole concentration of 5.5 × 1012 / m 3 . The semiconductor is [Manipal] (a) n-type (b) p-type (c) intrinsic semiconductor (d) p-n junction 25 In semiconducting material, 1/5th of the total current is carried by the holes and the remaining is carried by the electrons. The drift speed of electrons is twice that of holes at this temperature. The ratio between the number densities of electrons and holes is [J&K CET] (a) 21/6 (b) 5 (c) 3/8 (d) 2 26 The electrical conductivity of semiconductor increases, when electromagnetic radiation of wavelength shorter than 24800 Å is incident on it. The band gap for the semiconductor is [MGIMS] (a) 0.9 eV (b) 0.7 eV (c) 0.5 eV (d) 1.1 eV
2008 27 A pure semiconductor behaves slightly as a conductor at (a) room temperature (c) high temperature
(b) low temperature (d) Both (b) and (c)
28 The process of adding impurities to the pure semiconductor is called (a) biasing (b) cotting (c) doping (d) None of these
[BHU]
[BHU]
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SEMICONDUCTOR ELECTRONICS
29 The charge carriers in a p-type semiconductor are (a) electrons only [MHT CET] (b) holes only (c) holes in larger numbers and electrons in smaller numbers (d) holes and electrons in equal numbers 30 The difference in variation of resistance with temperature in a metal and a semiconductor arises essentially due to the difference in the [RPMT] (a) crystal structure (b) variation of the number of charge carriers with temperature (c) type of bonding (d) variation of scattering mechanism with temperature 31 An intrinsic semiconductor at 0 K temperature behaves like [J&K CET] (a) conductor (b) p-type semiconductor (c) n-type semiconductor (d) insulator 32 If n e and n h represent the number of free electrons and holes respectively in a semiconducting material, then for [J&K CET] n-type semiconducting material (a) n e < < n h (b) n e > > n h (c) n e = n h (d) n e = n h = 0 33 If an intrinsic semiconductor is heated, the ratio of free electrons to holes is [EAMCET] (a) greater than one (b) less than one (c) equal to one (d) decreases and becomes zero 34 A pure Ge specimen is doped with Al. The number density of acceptor atoms is approximately 1021 m −3. If density of electron hole pair in an intrinsic semiconductor is approximately 1019 m − 3 , the number density of electrons in the specimen is [Guj CET] 4 −3 2 −3 (a) 10 m (b) 10 m (c) 1017 m −3 (d) 1015 m −3 35 Pure silicon at 300 K has equal electron ( n e ) and hole ( n h ) concentration of 1.5 × 1016 m − 3 . Doping by indium increases n h to 4.5 × 1022 m − 3 . The n e in doped silicon [AMU] is (in m −3 ) 5 9 (a) 9 × 10 (b) 5 × 10 11 (d) 3 × 1019 (c) 2.25 × 10 36 In intrinsic semiconductor at room temperature, number of electrons and holes are [AMU] (a) equal (b) zero (c) unequal (d) infinite
2007 37 In the energy band diagram of a material shown below, the open circles and filled circles denote holes and electrons, respectively. The material is a/an [CBSE AIPMT] EC
Eg
EV
(a) p-type semiconductor (c) metal
(b) insulator (d) n-type semiconductor
38 Assertion The energy gap between the valence band and conduction band is greater in silicon than in germanium. Reason Thermal energy produces fewer minority carriers in silicon than in germanium. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 39 Would there be any advantage to add n-type or p-type impurities to copper? [AFMC] (a) Yes (b) No (c) May be (d) Information is insufficient 40 In semiconductor, the concentrations of electrons and holes are 8 × 1018 m − 3 and 5 × 1018 m −3 respectively. If the mobilities of electrons and holes are 2.3 m 2 V− 1 s − 1 and 0.01 m 2 V− 1 s − 1 respectively, then semiconductor is (a) n -type and its resistivity is 2.95 Ω - m [AFMC] (b) p -type and its resistivity is 0.034 Ω - m (c) n -type and its resistivity is 0.34 Ω -m (d) p -type and its resistivity is 3.4 Ω -m 41 Choose the only false statement from the following. [Manipal]
(a) Substances with energy gap of the order of 10 eV are insulators. (b) The conductivity of a semiconductor increases with increase in temperature. (c) In conductors, the valence and conduction bands may overlap. (d) The resistivity of a semiconductor increases with increase in temperature.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
42 The temperature of germanium is decreased from room temperature to 100 K. The resistance of germanium (a) decreases [J&K CET] (b) increases (c) remains unaffected (d) depends on external conditions 43 When boron is added as an impurity to silicon, the resulting material is [J&K CET] (a) n-type semiconductor (b) n-type conductor (c) p-type conductor (d) p-type semiconductor 44 In a semiconductor, electron concentration is 7 × 1013 cm − 3 and hole concentration is 5 × 1012 cm − 3 . Then the semiconductor is [DUMET] (a) n-type (b) p-type (c) intrinsic (d) p-n type 45 n-type semiconductor is obtained on doping intrinsic germanium by [Guj CET] (a) gold (b) boron (c) aluminium (d) phosphorus
2006 46 In a semiconducting material, the mobilities of electrons
and holes are µ e and µ h respectively. Which of the following is true? [AIIMS] (a) µ e > µ h (b) µ e < µ h (c) µ e = µ h (d) µ e < 0, µ h > 0 47 Assertion The number of electrons in a p-type silicon semiconductor is less than the number of electrons in a pure silicon semiconductor at room temperature. Reason It is due to the law the of mass - action. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
48 Which of the following statement is true for an n-type [BHU] semiconductor? (a) The donor level lies closely below the bottom of the conduction band. (b) The donor level lies closely above the top of the valence band. (c) The donor level lies at the halfway mark of the forbidden energy gap. (d) None of the above
Answers 1 11 21 31 41
(a) (b) (a) (d) (d)
2 12 22 32 42
(c) (b) (c) (b) (b)
3 13 23 33 43
(c) (c) (a) (c) (d)
4 14 24 34 44
(c) (b) (a) (c) (a)
5 15 25 35 45
(c) (b) (d) (b) (d)
6 16 26 36 46
(d) (c) (c) (a) (a)
7 17 27 37 47
(d) (a) (a) (a) (a)
8 18 28 38 48
(c) (b) (c) (b) (a)
9 19 29 39
(c) (c) (c) (b)
10 20 30 40
(c) (b) (b) (c)
Explanations 1 (a) p-type semiconductors are obtained when a trivalent impurity (e.g. boron, aluminium, gallium or indium) is added to a intrinsic semiconductor (e.g. germanium or silicon). In other words, the dopants in p-type semiconductor is trivalent atom. Thus, this addition creates deficiencies of valence electron which are most commonly known as holes. These are the majority charge carriers in this type of semiconductor. However, in n-type semiconductors, the dopants are pentavalent impurities. Also, the majority charge carriers are electrons.
2 (c) Given, one indium atom to be doped in 5 × 107 silicon atoms. Number density of silicon = 5 × 1028 atom m −3 ≈ 5 × 1022 atom cm −3 Number of acceptor atom cm −3 5 × 1022 = 1 × 1015 cm − 3 = 5 × 107 Hence, number of acceptor atom/cm 3 is 1 × 1015 cm − 3.
3 (c) On increasing the temperature, the current in the circuit will increase because with rise in temperature, resistance of semiconductor decreases.
Hence, overall resistance of the circuit decreases, which in turn increases the current in the circuit.
4 (c) In insulators, conduction band is empty and valence band is filled with electrons.
5 (c) At room temperature in semiconductor, some electrons in the valence band acquire thermal energy greater than energy band gap and jump over to conduction band. Here they are free to move under the influence of even a small electric field thus acquires small conductivity. But their resistivity is not lower than metals.
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SEMICONDUCTOR ELECTRONICS
Because in metals conduction band is partially filled and valence band is partially empty or conduction and valence band overlap, thus large number of electrons are available for conduction.
6 (d) The minimum energy required for shifting electrons from valence to conduction band is band gap. For semiconductor it is less than 3eV, for conductors it is 0 eV. The band gap of 5 eV corresponds to that of an insulator.
7 (d) The n-type semiconductor region has (negative) electrons as majority charge carriers and an equal number of fixed positively charged donor ions. Again, the material as a whole is neutral. That is the reason that atom is electrically neutral. Electron
n-type Donor ion
8 (c) The n-type semiconductor can be
9
produced by doping an impurity atom of valency 5, i.e. pentavalent atoms such as phosphorus. In this, electrons are majority charge carriers and holes are minority charge carriers. hc (c) Band gap, E = λ 6.6 × 10− 34 × 3 × 108 = 2480 × 10− 9 19.8 × 10− 17 = 2480 8 × 10− 20 eV = 8 × 10− 20 J = 1.6 × 10− 19 = 5 × 10
−1
= 0.5 eV
10 (c) The four bonding electrons in the case of C lie in the second orbit, whereas in case of Si they lie in the third orbit. So Si has loosely bounded valence electron as compared to C.
11 (b) When a small amount of antimony is added to germanium crystal, the crystal becomes n-type semiconductor, because antimony is a pentavalent substrate and act as donor atom. So, there will be more free electrons than hole in the semiconductor.
12 (b) A p -type semiconductor is obtained by adding a small amount of trivalent impurity to a pure sample of semiconductor (Ge). In this, majority charge carriers are holes and minority charge carriers are electrons. An n -type semiconductor is obtained by adding a small amount of pentavalent impurity to a pure sample of semiconductor (Ge). In this, majority charge carriers are electrons and minority charge carriers are holes. The resistance of intrinsic semiconductors decreases with increase of temperature.
13 (c) The typical ionisation energy of
19 (c) Resistivity of a semiconductor decreases with rise in the temperature. The atoms of a semiconductor vibrate with larger amplitudes at higher temperature thereby increasing its conductivity not resistivity.
20 (b) Pentavalent impurity atom, i.e. atoms having 5 valence electrons such as antimony (Sb) or arsenic (As), when added to a pure semiconductor (Ge), produce excess of free electrons, i.e. donate electrons to the semiconductor. For this reason, pentavalent impurity atoms are called donor impurity atom. The semiconductor so produced is called n-type extrinsic semiconductor.
21 (a) As we know, current density, J = nqv
donor in silicon is of the order of 0.1 eV.
⇒ and
14 (b) In insulators, the forbidden energy
⇒
gap is quite large, e.g. the forbidden energy gap for diamond is 6 eV, which means that minimum of 6 eV energy is required to make the electron jump from the completely filled valence band to the conduction band.
15 (b) Trivalent atoms have 3 valence
electrons such as aluminium (Al). Such atom on being added to a pure semiconductor (silicon), instead of producing free electrons, accept electrons from the semiconductor and creates holes. For this reason, trivalent impurity atoms are called acceptor impurity atoms. The semiconductor so produced is called p -type semiconductor.
16 (c) Energy gap, Eg = hc / λ ⇒
hc 12400 λ= = Eg 0.72 = 17222 Å
17 (a) Insulators have large energy gap between valence and conduction bands (about 6 eV), while semiconductors have a smaller one and conductors have the smallest energy gap.
18 (b) Energy band gap at 0 K in eV for silicon and germanium is 1.17 eV and 0.74 eV, respectively. Band gap for carbon is much higher (5.2 eV). Thus, correct sequence is Eg (Si) > Eg (Ge) < Eg (C)
⇒ ⇒ ⇒
J e = neqve J h = nhqvh J e ne ve = × J h nh vh 3 / 4 ne 5 / 2 vh 5 = × Q ve = vh 1/ 4 nh vh 2 3 ne 5 = × 1 nh 2 ne 6 = nh 5
22 (c) Impurities added to semiconductors increase their electrical conductivity by increasing the number of charge carriers, i.e. holes and electrons.
23 (a) Energy band gap in case of conductor is zero. In conductor, the valence and conduction band overlap with each other.
24 (a) As,
ne = 80 × 1012 /m 3 and nh = 5.5 × 1012 / m 3
⇒ ne > nh Hence, it is a n-type semiconductor.
25 (d) As, we know, As,
I = An evd I = Ih + Ie
1 …(i) I 5 4 …(ii) I e = Aneeve = I 5 Given, ve = 2vh Dividing Eq. (i) by Eq. (ii),we get ne =2 ⇒ nh Now, I h = Anhevh =
818 26 (c) As, ⇒
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Eg = hc/λ Eg =
− 34
34 (c) Given, the density of electron-hole 8
6.6 × 10 × 3 × 10 24800 Å
19.8 × 10−20 J 2.48 7.98 × 10−20 = . × 10−19 16 =
= 5 × 10−1 eV ⇒
Eg = 0.5 eV
27 (a) At room temperature, a few electrons in valence band acquire energy greater than the forbidden energy gap and move to conduction band. Hence, at room temperature, a pure semiconductor behaves slightly as a conductor.
pair in an intrinsic semiconductor,
29 (c) In a p -type semiconductor, holes are the majority charge carriers and electrons are minority charge carriers. So, holes are in larger numbers and electrons in smaller numbers.
30 (b) The difference in the variation of resistance with temperature in metal and semiconductor is caused due to the difference in the variation of the number of charge carriers with temperature.
31 (d) At 0 K, there is no free electrons for conduction. Therefore, at 0 K an intrinsic semiconductor behaves as an insulator.
32 (b) In an n-type semiconductor, majority charge carriers are electrons and minority charge carriers are holes. Therefore, ne > > nh.
33 (c) A semiconductor in which electrons and holes are created by thermal excitation across the energy gap is called an intrinsic semiconductor. The electrons reaching conduction band due to thermal excitation leave equal number of vacancies or holes in valence band, i.e. in intrinsic semiconductor concentration of holes and electrons must always be the same. Hence, ratio of free electrons to holes is one.
n-type. Also, conductivity (σ) =
1019 ni = 3 m Density of holes (number of acceptor atom), nh = 1021 /m 3
∴ 1021 × ne = (1019 )2 ⇒
1019 × 1019 1021 17 = 10 m −3
ne =
41 (d) In semiconductor, resistivity decreases with increase in temperature.
42 (b) Germanium is a semiconductor and possesses negative temperature coefficient. Therefore, when temperature of germanium is decreased its resistance increases.
35 (b) In an extrinsic semiconductor, nenh = ni 2 ⇒ ne × 4.5 × 1022 = (1.5 × 1016 )2 ne = ⇒
2.25 × 1032 4.5 × 1022
43 (d) Boron is a trivalent impurity having three valence electrons. When it is introduced to pure silicon, then such type of semiconductors are called p-type or acceptor type semiconductors.
ne = 5 × 109 m −3
36 (a) At room temperature, due to thermal vibrations, the few bonds of intrinsic semiconductor are broken, producing equal number of electrons and holes in the semiconductor.
44 (a) Given,
ne = 7 × 1013 cm −3 = 70 × 1012 cm −3 nh = 5 × 1012 cm −3
ne > nh So, the semiconductor must be n-type.
37 (a) The given figure in question represents a p-type semiconductor as there are majority of holes present in valence band.
45 (d) When a small amount of
38 (b) The energy gap between valence band and conduction band in germanium is 0.76 eV and the energy gap between valence band and conduction band in silicon is 1.1 eV. Also, it is true that thermal energy produces fewer minority carriers in silicon than in germanium.
46
pentavalent impurity is added to intrinsic germanium, it is known as n-type semiconductor. Typical examples of pentavalent impurities are arsenic, antimony, phosphorus etc. (a) Hole is massive than electron, thus mobility of holes is less than that of electrons, i.e. µ h < µ e.
47 (a) According to law of mass-action, ni2 = nenh.
39 (b) Pure Cu is already an excellent conductor, since it has a partially filled conduction band. Further more, Cu forms a metallic crystal as compared to the covalent crystals of silicon or germanium, so the scheme of using an impurity to donate or accept an electron does not work for copper. In fact adding impurities to copper decreases the conductivity, because an impurity tends to scatter electrons, impeding the flow of current. So, there is no advantage of adding n-type or p-type impurities to copper.
1 resistivity (ρ )
σ = e (ne µ e + nh µ h ) = 1.6 × 10−19 × [8 × 1018 × 2.3 + 5 × 1018 × 0.01] = 2.95 Ω-m 1 1 So, ρ = = = 0.34 Ω-m σ 2.95
We know that, nh ⋅ ne = ni2
28 (c) Dopant elements are called impurities, therefore the process of adding impurities to the pure semiconductor is known as doping.
40 (c) As, ne > hh, so semiconductor is
48
For p-type semiconductor, number of electrons is less than the number of electrons in a pure silicon semiconductor as for p-type semiconductor, ne < nh. (a) The donor level is found only in n-type semiconductors. The donor level lies closely below the bottom of the conduction band. Ec Ed
Conduction band
Ev Valence band
Topic 2 p-n Junction Diode 2019 1 An LED is constructed from a p-n junction diode using GaAsP. The energy gap is 1.9 eV. The wavelength of the light emitted will be equal to [NEET (Odisha)] (a) 10.4 × 10−26 m (b) 654 nm (c) 654 Å (d) 654 × 10−11 m
2 If voltage across a zener diode is 6V, then find out the value of maximum resistance in this condition. [AIIMS] 1 kΩ i= 6 mA –
[NEET]
(a)
0V
(b)
–4V
(c)
–2V
(d)
3V
R –2 V R –3 V R +2 V R
5V
2016 7 The given circuit has two ideal diodes connected as
+
shown in the figure below. The current flowing through the resistance R1 will be [NEET]
Vz = 6 V
R
2017 6 Which one of the following represents forward bias diode?
2Ω
30 V
(a) 2 kΩ
(b) 2 kΩ
(c) 5 kΩ
3 Assertion Photodiode and solar cell works on same mechanism. Reason Area is large for solar cell. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2018 4 In a p-n junction diode, change in temperature due to heating (a) does not affect resistance of p-n junction (b) affects only forward resistance (c) affects only reverse resistance (d) affects the overall V-I characteristics of p-n junction
[NEET]
5 The diode used at a constant potential drop of 0.5 V at all currents and maximum power rating of 100 mW. What resistance must be connected in series to diode to so that current in circuit is maximum? [AIIMS]
I
R2
(a) 2.5 A (c) 1.43 A
3Ω
R3
2Ω
(b) 10.0 A (d) 3.13 A
2014 8 The barrier potential of a p-n junction depends on I. type of semiconductor material II. amount of doping III. temperature Which one of the following is correct? [CBSE AIPMT] (a) I and II (b) Only II (c) II and III (d) All of these
9 Identify the incorrect statement with reference to solar cell. [Kerala CEE] (a) It is a p-n junction diode with no external bias. (b) It uses materials of high optical absorption. (c) It uses materials with band gap of 5 eV. (d) It converts light energy into electrical energy. (e) It uses materials such as GaAs, Si.
Vi
1.5 V
(b) 6.67 Ω
D2
D1
10 V
10 In the circuit shown below, assume the diode to be ideal. WhenVi increases from 2 Vto 6 V, the change in the current is (in mA) [WB JEE]
R
(a) 200 Ω
R1
(d) 4 kΩ
(c) 5 Ω
(d) 15 Ω
(a) zero (c) 80/3
150 Ω
+3 V
(b) 20 (d) 40
820
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
11 The given graph representsV-I characteristic for a semiconductor device. Which of the following statements is correct? [CBSE AIPMT]
I
2012 17 Find the current in the circuit.
A
D1
10 Ω
D2
20 Ω
[CBSE AIPMT]
V B
(a) It is V- I characteristic for solar cell, where point A represents open circuit voltage and point B short circuit current. (b) It is for a solar cell and points A and B represent open circuit voltage and current, respectively. (c) It is for a photodiode and points A and B represent open circuit voltage and current, respectively. (d) It is for a LED and points A and B represents open circuit voltage and short circuit current respectively. 12 Zener diode is used for [UK PMT] (a) amplification (b) rectification (c) voltage regulation (d) produce oscillation in an oscillator
2013 13 When two semiconductors of p-type and n-type are brought into contact, they form a p - n junction which acts like a [AIIMS] (a) conductor (b) oscillator (c) amplifier (d) rectifier
14 For the given circuit shown below, to act as full wave rectifier, the AC input should be connected across ... C & ... and the DC output would A appear across ... & ... . [Manipal] (a) B & D, A & C D (b) B & C, A & D (c) A & C, B & D (d) A & D, B & C 15 On increasing the reverse bias to a large value in a p-n junction diode, current [WB JEE] (a) increases slowly (b) remains fixed (c) suddenly increases (d) decreases slowly 16 On applying reverse bias to a junction diode, it [KCET] (a) lowers the potential barrier (b) raises the potential barrier (c) increases the majority carrier current (d) increases the minority carrier current
5V
(a) 0.75 A
(b) Zero
(c) 0.25 A
(d) 0.5 A
18 As shown in figure, the current in the part of circuit is 6V
[OJEE]
150 Ω
(a) 0.03 A (c) 0.04 A
3V
(b) 0.02 A (d) 0.05 A
19 A semiconductor with a band gap of 2.5 eV is used to fabricate a p-n photodiode. It can detect a signal of wavelength [Kerala CEE] (a) 4000 nm (b) 6000 Å (c) 6000 nm (d) 4950 Å (e) 5500 Å 20 In which of the following figures, the p-n diode is forward biased? [J&K CET] + 10 V
(a)
(b)
– 10 V
R R
B
+7V
+7V
(c) +5V
(d) +5V
R
21 The p-n junction which generates an emf when solar radiation falls on it, with no external bias applied, is a (a) light emitting diode [J&K CET] (b) photodiode (c) solar cell (d) zener diode 22 In a reverse biased p-n junction, when the applied bias voltage is equal to the breakdown voltage, then [DUMET] (a) current remains constant while voltage increases sharply (b) voltage remains constant while current increases sharply (c) current and voltage increase (d) current and voltage decrease
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SEMICONDUCTOR ELECTRONICS
23 In forward biasing of the p-n junction, [CBSE AIPMT] (a) the positive terminal of the battery is connected to n -side and the depletion region becomes thin (b) the positive terminal of the battery is connected to n -side and the depletion region becomes thick (c) the positive terminal of the battery is connected to p -side and the depletion region becomes thin (d) the positive terminal of the battery is connected to p -side and the depletion region becomes thick
2011 24 In the case of forward biasing of a p-n junction diode, which one of the following figures correctly depicts the direction of conventional current (indicated by an arrow mark)? [KCET]
(a)
(c)
p – + n – + – +
p – + n – + – +
(b)
(d)
p – + n – + – +
(b)
+ –
A
C
D
30 When the voltage drop across a p-n junction diode is increased from 0.65 V to 0.70 V, the change in the diode current is 5 mA. The dynamic resistance of the diode is (b) 50 Ω
(c) 10 Ω
(d) 80 Ω
31 GaAs (with a band gap = 1.5 eV) as an LED can emit
p – + n – + – +
[Kerala CEE]
(a) blue light (c) X-rays (e) None of these
[AFMC]
(b) ultraviolet rays (d) infrared rays
32 What controls the conduction of p-n junction? [MP PMT] (a) Majority carriers (b) Minorty carriers (c) Holes (d) Both (a) and (b) 33 The value of DC voltage in half-wave rectifier in converting AC voltageV = 100 sin (314 t) into DC is [MP PMT] (a) 100 V (b) 50 V (c) 30.3 V (d) zero
26 Which circuit will not show current in ammeter ? D2
B
[Kerala CEE]
(a) an AC voltage (b) a DC voltage (c) zero (d) a pulsating unidirectional voltage
D1
29 In the figure given below, the input is across the terminals A & C and the output is across B & [OJEE] D. Then, the output is (a) zero (b) same as the input (c) full wave rectified (d) half-wave rectified
(a) 20 Ω (e) 100 Ω
2010 25 The output form of a full wave rectifier is
(a)
28 Which one of the following statement is correct in the case of light emitting diodes? [Manipal] (a) It is a heavily doped p -n junction. (b) It emits light only when it is forward biased. (c) It emits light only when it is reverse biased. (d) The energy of the light emitted is less than the energy of the semiconductor used.
[BVP]
D2
D1
34 If the voltage between the terminals A and B is 17 V and zener breakdown voltage is 9 V, then the potential across [EAMCET] R is A
+ – R
D1
(c) + –
D2
D1
(d) + –
D2
B
(a) 6 V
27 LED is a p-n junction diode which is [MHT CET] (a) forward biased (b) Either forward biased or reverse biased (c) reverse biased (d) Neither forward biased nor reverse biased
(b) 8 V
(c) 9 V
(d) 17 V
35 An AC signal of 50 Hz frequency is input of a full wave rectifier using two diodes. The output frequency after full wave rectification is [MGIMS] (a) 25 Hz (b) 50 Hz (c) 100 Hz (d) 200 Hz
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
36 Avalanche breakdown in a p-n junction diode is due to (a) shift of fermi level [MGIMS] (b) widening of forbidden gap (c) high impurity concentration (d) cummulative effect of conduction band electrons collision 37 For detecting intensity of light, we use (a) photodiode in forward bias (b) photodiode in reverse bias (c) LED in forward bias (d) LED in reverse bias
Then, the output signal across R L will be
[AIIMS]
(a)
r
s
r ρ p
n
(c)
n
(b)
ρ p
r
(d)
r
100 Ω
(b) 10 mA (d) 50 mA
40 When LED is forward biased, then [MGIMS] (a) electrons from the n-type material cross the p- n junction and recombine with holes in the p-type material (b) electrons and holes neutralise each other (c) at junction, electrons and holes remains at rest (d) None of the above
2008 41 A p-n photodiode is made of a material with a band gap of 2.0 eV. The minimum frequency of the radiation that can be absorbed by the material is nearly [CBSE AIPMT] (a) 10 × 1014 Hz (b) 5 × 1014 Hz (c) 1 × 1014 Hz (d) 20 × 1014 Hz
–10 V
(c)
(d)
+5 V
43. Assertion The value of current through p-n junction in the given figure will be 10 mA. +5V
+3
(a) Zero (c) 20 mA
(b)
300 Ω
+2V
n
39 What is the current through an ideal p-n junction diode shown in figure below ? [AFMC] +1
(a)
–5 V
p
n
[AIIMS]
10 V
ρ
r
RL
–5 V
p-n junction, will be p
5V
[VMMC]
2009 38 The curve between charge density (ρ ) and distances near ρ
42. If in a p-n junction diode, a square input signal of 10 V is applied as shown below.
Reason In the above figure, p-side is at higher potential than n-side. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
44 In an unbiased p-n junction, [KCET] (a) potential at p is more than that at n (b) potential at p is less than that at n (c) potential at p is equal to that at n (d) potential at p is positive and that at n is negative 45 In the given circuit, the current through the resistor of [Kerala CEE] 2 kΩ is 1 kΩ
20 V
(a) 2 mA (c) 6 mA (e) 10 mA
+ −
2 kΩ
12 V
(b) 4 mA (d) 1 mA
46 In the middle of the depletion layer of reverse biased [RPMT] p-n junction, the (a) electric field is zero (b) potential is maximum (c) electric field is maximum (d) potential is zero
823
SEMICONDUCTOR ELECTRONICS
47 When a p-n junction diode is connected in forward bias, its barrier potential [J&K CET] (a) decreases and less current flows in the circuit (b) decreases and more current flows in the circuit (c) increases and more current flows in the circuit (d) decreases and no current flows in the circuit 48 The main cause of zener breakdown is [J&K CET] (a) the base semiconductor being germanium (b) production of electron-hole pairs due to thermal excitation (c) low doping (d) high doping 49 The depletion layer in a silicon diode is 1 µm wide and its knee voltage is 0.6 V, then the electric field in the depletion layer will be [J&K CET] −1 4 −1 (a) 0.6 Vm (b) 6 × 10 Vm (c) 6 × 105 Vm −1 (d) zero 50 Zener diode acts as [DUMET] (a) voltage regulator in reverse biasing (b) voltage regulator in forward biasing (c) current regulator in reverse biasing (d) current regulator in forward biasing 51 Assertion Light Emitting Diode (LED) emits spontaneous radiation. Reason LED are forward biased p-n junctions. [AIIMS]
(a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct. 52 Barrier potential of a p-n junction diode does not depend on (a) forward bias (b) doping density [BHU] (c) diode design (d) temperature
53 If a full wave rectifier circuit is operating from 50 Hz mains, the fundamental frequency in the ripple will be (a) 70.7 Hz (b) 100 Hz [MHT CET] (c) 25 Hz (d) 59 Hz 54 In a diode, when there is a saturation current, the plate resistance will be [MHT CET] (a) data insufficient (b) zero (c) finite quantity (d) infinite quantity 55 The peak voltage in the output of a half-wave diode rectifier fed with a sinusoidal signal without filter is 10 V. The DC component of the output voltage is [Manipal] 10 10 (a) (b) V V π 2 20 (c) 10 V (d) V π
56 Of the diodes shown in the following diagrams, which one is reverse biased? [Manipal] – 12 V R
(a)
–5 V
R
(b)
–10 V +5 V
R
(c) +10 V
(d)
R +5 V
57 A Light Emitting Diode (LED) has a voltage drop of 2 V across it and passes a current of 10 mA. When it operates with a 6 V battery through a limiting resistor R, the value of R is [RPMT] (a) 40 kΩ (b) 4 kΩ (c) 200 Ω (d) 400 Ω 58 When a p-n junction diode is reverse biased, then (a) no current flows [RPMT] (b) the depletion region is increased (c) the depletion region is reduced (d) the height of the potential barrier is reduced 59 The potential in depletion layer is due to [J&K CET] (a) electrons (b) holes (c) ions (d) forbidden band 60 In breakdown region, a zener diode behaves as a (a) constant current source [J&K CET] (b) constant voltage source (c) constant resistance source (d) constant power source 61 Two identical capacitors A and B are charged to the same potentialV and are connected in two circuits at t = 0, as shown in figure. The charge on the capacitors at time [Punjab PMET] t = CR are respectively –
+ C
C
R
R
(i)
(a) VC , VC
–
+
(ii)
(b)
VC , VC e
(c) VC ,
VC e
(d)
VC VC , e e
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2006 66 Assertion A p-n junction with reverse bias
62 In a reverse biased diode when the applied voltage changes by 1 V, the current is found to change by 0.5 µA. The reverse bias resistance of the diode is [KCET] (a) 2 × 105 Ω (b) 2 × 106 Ω (c) 200 Ω (d) 2 Ω 63 In the depletion region of an unbiased p-n junction diode, there are [AMU] (a) only electrons (b) only holes (c) both electrons and holes (d) only fixed ions
can be used as a photodiode to measure light intensity. Reason In a reverse bias condition, the current is small but it is more sensitive to change in incident light intensity. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
64 In forward bias, the width of depletion layer is [DUMET] (a) decreases with decrease in potential barrier voltage (b) increases with increase in potential barrier voltage (c) independent of potential barrier voltage (d) None of the above
2005 67 Zener diode is used for
65 Potential drop across forward junction p-n diode is 0.7 V. If a battery of 4 V is applied, calculate the resistance to be put in series, if the maximum current in the circuit is 5 mA. (a) 660 Ω (b) 350 Ω [DUMET] (c) 475 Ω (d) 500 Ω
[CBSE AIPMT]
(a) producing oscillations in an oscillator (b) amplification (c) stabilisation (d) rectification
Answers 1 11 21 31 41 51 61
(b) (a) (c) (d) (b) (a) (b)
2 12 22 32 42 52 62
(d) (c) (b) (d) (d) (c) (b)
3 13 23 33 43 53 63
(b) (d) (c) (c) (a) (b) (d)
4 14 24 34 44 54 64
(d) (c) (d) (b) (b) (d) (a)
(c) (c) (d) (c) (c) (b) (a)
5 15 25 35 45 55 65
6 16 26 36 46 56 66
(a) (b) (a) (d) (a) (c) (a)
7 17 27 37 47 57 67
(a) (d) (a) (b) (b) (d) (c)
8 18 28 38 48 58
(d) (b) (b) (a) (b) (b)
9 19 29 39 49 59
(c) (d) (c) (c) (c) (c)
10 20 30 40 50 60
(b) (c) (c) (a) (a) (b)
Explanations 1 (b) The energy of light of wavelength λ is given by
E = hν = ⇒
λ=
hc λ
hc E
2 (d) Given, voltage across zener diode, VZ = 6 V Since, zener diode provide stabilised supply of 6 V. 1 kΩ
…(i)
Here, h = Planck’s constant = 6.63 × 10−34 J-s c = speed of light = 3 × 108 m/s E = energy gap = 19 . eV = 19 . × 16 . × 10−19 J Substituting the given values in Eq. (i), we get 6.63 × 10−34 × 3 × 108 ⇒ λ= . × 16 . × 10−19 19 −7
= 6.54 × 10
m
≈ 654 nm Thus, the wavelength of light emitted from LED will be 654 nm.
IL – R
+ Vz=6 V IZ
I
30 V
In this case, the value of R should be chosen such that negligible current flows through the zener diode. ∴ I = IZ + IL = 0 + IL 30 I = R + 103 But I = 6 mA = 6 × 10−3 A 30 ∴ 6 × 10−3 = R + 103 ⇒ R = 4 × 103 Ω = 4 kΩ
3 (b) A p-n junction photodiode can be operated under photovoltaic conditions similar to that of a solar cell. The current-voltage characteristics of a photodiode and solar cell under illumination are also similar. When light energy falls on the solar cell, then it converts solar energy into electrical energy. The area of solar cell is larger, so that it could absorbed more amount of sunlight and hence more amount of electrical energy is obtained. Hence, Assertion and Reason both are true but Reason is not the correct explanation of Assertion.
4 (d) Due to increase in temperature because of heating, thermal collision between the electron and holes increases. Thus, net electron-hole pairs increase. This leads to increase in the current in diode and overall
825
SEMICONDUCTOR ELECTRONICS
resistance of the diode changes. This in turn changes both the forward biasing and the reverse biasing. Thus, the overall I-V characteristics of p-n junction diode gets affected.
5 (c) Current passing in the circuit, −3
P 100 × 10 I = = = 0.2 A V 0.5 Value of connected series resistance, 15 . − 0.5 1 R= ⇒ R= 0. 2 0.2 ∴ R=5Ω
6 (a) In the forward biasing of p-n junction, p-side of junction diode is connected to higher potential and n-side of junction diode is connected to lower potential. As 0 V > −2 V, hence option (a) is the correct answer.
7 (a) We know that, a diode only conducts in forward biased condition. In the given circuit, the diode D1 is in reverse bias, so it will block the current and diode D2 is in forward bias, so it will pass the current, V 10 i= = = 2.5A R1 + R3 2 + 2
8 (d) Barrier potential depend on all the three given points, i.e. barrier potential depends on the material used to make p-n junction diode (whether it is Si or Ge). It also depends on amount of doping due to which the number of majority carriers will change. It also depends on temperature due to which number of charge carriers will change.
9 (c) The incorrect statement with reference to a solar cell is that, it uses materials with band gap of 5 eV. Because for solar cell, band gap < 3 eV.
10 (b) The initial current, I in = 0, for Vi = 2 V Vi
[Q D = reverse biased] 150 Ω
D
+3 V
and the final current, 3 If = = 0.02 A 150 So, change in current, ∆ I = I f − I in = 0.02 A = 20 mA
12 (c) When the applied reverse voltage (V ) reaches the breakdown voltage (VZ ) of the zener diode, there is a large change in the current, for almost insignificant change in the reverse bias voltage.
Vi Zener diode
circuit, diode D1 is forward bias and diode D2 is reverse bias. So, current will flow only in diode D1.
Load
VZ
As zener voltage remains constant even though the current through the zener diode varies over a wide range, hence it is used to obtain regulated output voltage as shown in the above diagram.
18
13 (d) A p- n junction acts as a rectifier. 14 (c) The full wave diode bridge rectifier is shown below +
B A
~ AC Signal
C
So, AC input is connected across A & C and DC output would appears across B & D.
16 (b) When positive terminal of battery is connected to n-side and negative to p-side of the junction, it is said to be reverse biased. In this case, both electrons and holes move away from each other. –
V
+p+ +++ +++ +++
20 (c) As in Fig. (c), p-side is connected
21
V+VB
to +7 V which is more than the n-side which is connected to +5V, hence potential at p-side is more than the n-side. Hence, it follows the criteria of forward biasing. (c) The p-n junction which generates an emf when solar radiation falls on it, with no external bias applied is a solar cell. In LED, photodiode and zener diode external bias is applied.
22 (b) In a reverse biased p- n junction,
+
–n– – – – – – – – – –
The current supplied by the battery, 5 i= = 0.5 A 10 (b) From Kirchhoff ’s law, algebraic sum of changes in potential around any closed loop involving resistors and the cells in the loop is zero. i.e. algebraic sum of emf ’s is equal to algebraic sum of products of current and resistances. Hence, 6 − i × 150 − 3 = 0 3 1 ⇒ i= = = 0.02 A 150 50
= 4950 Å
(voltage) to a large value in a p-n junction diode, the junction breaks down. Now, a large reverse current is set up due to minority charge carriers.
5V
= 2. 5 × 16 . × 10− 19 V hc Now, E = λ hc λ= ⇒ E 6.6 × 10− 34 × 3 × 108 = 2.5 × 1.6 × 10− 19
–
15 (c) On increasing the reverse bias
i
19 (d) Given, E = 2. 5 eV
DC Output
D
10 Ω
17 (d) In the given
R
11 (a) V -I characteristics of solar cell is drawn in fourth quadrant of coordinate axes, because a solar cell does not draw current but supplies the same to the load. Hence, options (c) and (d) are incorrect.
Since there is no electron-hole combination, no current flows and junction offers high resistance. Hence, width of the depletion layer is increased because of increased barrier width or potential barrier.
Point A represents the open circuit voltage as current is zero and point B represents short circuit current as voltage is zero at this point.
23
when the applied bias voltage is equal to the breakdown voltage, then voltage remains constant while current increases sharply. (c) In forward biasing of p- n junction, the positive terminal of the battery is connected to p-side and negative terminal to the n-side, thus decreasing the barrier potential. So, the depletion region becomes thin.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Wavelength of radiation emitted, hc 6.6 × 10−34 × 3 × 108 λ= = E 2.4 × 10−19
24 (d) In p-region, direction of
25
conventional current is same as the flow of holes and in n-region direction of conventional current is opposite to the direction of electron’s flow. Hence, option (d) is correct. (d) Output from of a full-wave rectifier is a pulsating unidirectional voltage.
26 (a) As in Fig. (a), diode D1 is reversed
27
28
29
biased, so it will offer infinite resistance. Hence, current will be zero, so there is no deflection in ammeter. (a) When a junction diode is forward biased, energy is released at the junction due to recombination of electrons and holes. In the junction diode made of gallium arsenide or indium phosphide, the energy is released in visible region. Such a junction diode is called a Light Emitting Diode (LED). (b) Light emitting diodes are specially designed diodes which give out light radiations when forward biased. LED’s are made of GaAsP, GaP, etc. (c) The figure shown below has AC input connected to A & C and output is taken across B & D. B
+
D1
D2
A AC Signal
DC Output
D3 −
D
Input
Output
For positive half-cycles D1 and D3 are forward biased and hence give output across BD. For negative half-cycles D2 and D4 are forward biased and hence give output across BD. Therefore, output is obtained for both cycles and we get full-wave rectified output.
30 (c) The dynamic resistance of a diode is defined as
diode that produces a significant current when illuminated. It is reverse biased and it is operated below the breakdown voltage. Energy of radiation = Band gap energy i.e. hν = 2. 0 eV . × 10−19 2.0 × 16 or ν = ≈ 5 × 1014 Hz 6.6 × 10−34
= 8.25 × 10−7 m = 8250 Å This wavelength belongs to infrared rays.
32 (d) Conduction is controlled by both the carriers like electron (majority carriers) in n-side and holes (minority carriers) in p-side.
42 (d) For Vi < 0, (Vi = − 5V), the diode is reverse biased and hence offer infinite resistance and does not conduct.
33 (c) As, V = 100 sin (314 t )
34
Here, V0 = 100 V For half-wave rectifier, V 100 VDC = 0 = = 30.3V π π (b) Here, V = VR + VZ
5V
V = 17 V
⇒
RL
43 (a) In the given figure, p-side of p- n junction is at higher potential than n-side, so p- n junction is forward biased. Taking its resistance to be zero and applying Ohm’s law,we get V 5−2 I = = = 10−2 A R 300 = 10−2 × 103 mA = 10 mA
B
VR = V − VZ = 17 − 9 = 8 V
35 (c) After full wave rectification, the
∆V rd = ∆i 0.70 − 0.65 = 10 Ω = 5 × 10− 3
31 (d) The band gap = 1.5 eV
= 1.5 × 1.6 × 10− 19
E = 2.40 × 10−19 J
36 (d) At a particular value of reverse bias voltage, the covalent bonds near the junction break, so electron-hole pairs get liberated, this process rapidly multiplies and an avalanche of electron-hole pairs is produced. Clearly, avalanche breakdown in p- n diode is cummulative effect of conduction band electrons collision.
44 (b) Graph between potential and distance in a p -n junction diode is given by Potential
p
photodiode is used in reverse bias.
38 (a) The n-side of p-n junction has
∴ Potential at p-side is less than that at n-side.
45 (c) The voltage across 2 kΩ resistor = 12
39 (c) Applying KVL, 1 + 100 i − 3 = 0 2 1000 × 100 1000 = 20 × 10− 3A
i=
= 20 mA
40 (a) When LED is forward biased, then electrons from the n-type material cross the p-n junction and recombine with holes in the p-type material.
n Distance
37 (b) To detect the intensity of light
stationary positive ions and p-side has stationary negative ions. So, the correct graph between charge density and distance near p- n junction is shown in option (a).
V0
For Vi > 0 (Vi = +5 V), the junction diode is forward biased and hence conducts. The amplitude of the input signal is 5 V, hence output obtained is 5 V.
R
VZ = 9 V
RL
–5 V
A VR
Vi
0V
frequency of output is 2 f , i.e. 100 Hz. C
D4
41 (b) An p-n photodiode is a semiconductor
46
V (since applied voltage is more than breakdown voltage for zener diode). Therefore, current passing through 2 kΩ resistor 12 = = 6 × 10−3 2 × 103 A = 6 mA (a) Due to reverse biasing, the width of depletion region increases and current flowing through the diode is almost zero. In this case, electric field is almost zero at the middle of the depletion region.
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SEMICONDUCTOR ELECTRONICS
57 (d) Given, current in the circuit = 10 mA = 10 × 10−3 A
Voltage in the circuit = 6 − 2 = 4 V From Ohm’s law, V = IR V 4 = = 400 Ω ⇒ R= I 10 × 10−3
48 (b) The main cause of zener breakdown 49
is production of electron-hole pairs due to thermal excitation. dV 0.6 (c) Electric field, E = − = dr 10−6 = 6 × 105 Vm −1.
58 (b) In reverse biasing, the applied
50 (a) Zener diode works as a voltage regulator under reverse biasing condition. It is based on the fact that in the breakdown region, for quite large changes in the zener current, the voltage across the diode remains almost constant.
51 (a) When a junction
Light
p diode is forward RL biased as shown in n figure, energy is released at the – + junction due to recombination of electrons and holes. In the junction diode made of gallium arsenide or indium phosphide, the energy is released in visible region. Such a junction diode is called light emitting diode or LED. It is a heavily doped p-n junction diode. So, the radiations emitted are spontaneous in forward biasing.
59
60
52 (c) Barrier potential does not depend on diode design while it depends on temperature, doping density and forward biasing.
53 (b) For full wave rectifier, 54
Ripple frequency = 2 × Input frequency = 2 × 50 = 100 Hz (d) In a diode, in case of saturation current established, the plate resistance will be infinite, i.e. its conductivity is zero.
55 (b) The output DC component =
Peak voltage 10 V = π π
56 (c) In reverse biasing condition, the potential at p-side is lower than that at n-side. In option (c), the p-side is grounded or at zero potential and n-side is at +5 V which is higher. So, it is reverse biased. +5 V R 0V
61
voltage V on the n-side is positive and on the p-side is negative. The applied bias voltage V and the barrier potential VB are in the same direction making the effective junction potential V + VB . As a result, the junction width or depletion region will increase. The higher junction potential restricts the flow of majority carriers to a much greater extent and current flows due to minority carriers. (c) The potential in depletion layer is due to ions. It appears as if some fictitious battery is connected across the junction with its negative pole connected to p-region and positive pole connected to n-region. The potential difference developed across the junction due to migration of majority charge carriers is potential barrier. VZ (b) When the 0 V reverse voltage across a zener diode exceeds the breakdown l voltage VZ, the Reverse current increases characteristic very sharply. In of zener diode this region, the curve is almost vertical. It means voltage across zener diode is constant at VZ even though the current through it changes. Therefore, a zener diode behaves as a constant voltage source. (b) The time, t = CR is known as time constant. It is time in which charge on 1 the capacitor decreases to times of e its initial charge (steady state charge). In Fig. (i), p- n junction diode is in forward bias, so current will flow in the circuit, i.e. charge on the capacitor decrease and in time t0 it becomes, 1 Q = (Q0 ) e CV where, Q0 = CV and Q = e In Fig. (ii), the diode is reverse biased. Hence, the capacitor doesn’t discharged as no current flows in the circuit. So, Q = CV .
62 (b) Reverse bias resistance =
∆V 1 = 2 × 10 6 Ω = ∆I 0.5 × 10−6
63 (d) Depletion layer contains only fixed positive and negative ions. Positive ions are on n-side and negative ions are on p-side.
64 (a) In forward biasing, the forward bias
65
voltage opposes the potential barrier VB . Due to it, the potential barrier is considerably reduced and the depletion region becomes thin. The potential barrier at some forward voltage (0.1 to 0.3 V), is eliminated altogether. (a) The circuit can be drawn as 0.7 V
4V
i = 5 mA
R
Applying KVL, ⇒
−0.7 + 4 − 5 × 10− 3 R = 0 R = 660 Ω
66 (a) At the p- n junction with reverse bias, there exists a junction field which at equilibrium does not permit the flow of charge carriers across the junction. When such a p- n diode is illuminated with light photons having energy, hν > Eg and intensities I 1 , I 2 , I 3, etc, the electron and hole pairs generated in the depletion layer (or near the junction) and made to flow across the junction. This produces current in the circuit depending on light intensity. Thus, a reverse biased p-n junction is used as a photodiode to measure light intensity.
67 (c) Zener diode is a silicon crystal diode having an unusual reverse current characteristic which is particularly suitable for voltage regulating purposes. Due to this characteristic, it is used as voltage stabiliser in many appliances in electronics. Line voltage
biased, more number of charge carriers (electrons in n-side and holes in p-side) moves through the junction. Therefore, in forward biasing barrier potential decreases. Thus, more current flows in the circuit.
Output voltage
47 (b) When p-n junction diode is forward
Input voltage
Topic 3
Transistors 2019 1 The given transistor operates in saturation region, then
what should be the value of VBB ? (R out = 200 Ω, R in = 100 kΩ, VCC = 3 V, VBE = 0.7 V, VCE = 0 V and β = 200) Rin p + VBB –
n n
Rout
IE
2016 6 A n-p-n transistor is connected in common emitter
+ – VCC
[AIIMS]
(a) 4.1 V
(b) 7.5 V
(c) 8.2 V
(d) 6.8 V
2 For CE configuration n-p-n transistor. Which of the following statement is correct? (a) I C = I E + I B (b) I B = I E + I C [JIPMER] (c) I E = I C + I B (d) All of these
2018 3 In the circuit shown in the figure, the input voltageVi is
20 V,VBE = 0 andVCE = 0. The values of I B , I C and β are given by [NEET] 20 V RC 4 kW
Vi
C
RB 500 kW B
E
(a) (b) (c) (d)
IB IB IB IB
= 20 µA, I C = 25 µA, I C = 40 µA, I C = 40 µA, I C
5 In a common emitter transistor amplifier, the audio signal voltage across the collector is 3 V. The resistance of collector is 3 kΩ. If current gain is 100 and the base resistance is 2 kΩ, the voltage and power gain of the amplifier is [NEET] (a) 200 and 1000 (b) 15 and 200 (c) 150 and 15000 (d) 20 and 2000
= 5 mA and β = 250 = 5 mA and β = 200 = 10 mA and β = 250 = 5 mA and β = 125
2017 4 The current gain of a transistor in common emitter mode is 49. The change in collector current and emitter current corresponding to change in base current by 5.0 µA, will be [AIIMS] (a) 245µA and 250 µA (b) 240µA and 235µA (c) 260µA and 255 µA (d) None of these
configuration in a given amplifier. A load resistance of 800 Ω is connected in the collector circuit and the voltage drop across it is 0.8V. If the current amplification factor is 0.96 and the input resistance of the circuits is 192 Ω, the voltage gain and the power gain of the amplifier will respectively be [NEET] (a) 3.69, 3.84 (b) 4, 4 (c) 4, 3.69 (d) 4, 3.84
7 For CE transistor amplifier, the audio signal voltage across the collector resistance of 2 kΩ is 4 V. If the current amplification factor of the transistor is 100 and the base resistance is l kΩ, then the input signal voltage is [NEET] (a) 10 mV (b) 20 mV (c) 30 mV (d) 15 mV
2014 8 In common base circuit of a transistor, current amplification factor is 0.95. Calculate the emitter current, if base current is 0.2 mA. [MHT CET] (a) 2 mA (b) 4 mA (c) 6 mA (d) 8 mA
9 In a transistor output characteristics commonly used in common emitter configuration, the base current I B , the collector current I C and the collector-emitter voltage VCE have values of the following orders of magnitude in the active region [WB JEE] (a) I B and I C both are in µ A and VCE in V (b) I B is in µA, I C is in mA andVCE in V (c) I B is in mA, I C is in µA and VCE in mV (d) I B is in mA, I C is in mA andVCE in mV 10 If α (current gain) of transistor is 0.98. What is the value of β (current gain) of the transistor? [KCET] (a) 0.49 (b) 49 (c) 4.9 (d) 5
829
SEMICONDUCTOR ELECTRONICS
11 For the action of a common base (CB) transistor, (E = emitter, B = base and C = collector) the required CB, EB junction bias conditions are (a) Both EB and CB junction-forward bias [EAMCET] (b) Both EB and CB junction-reverse bias (c) EB junction forward bias, CB junction reverse bias (d) EB junction reverse bias, CB junction forward bias
2013 12 In a common emitter (CE) amplifier having a voltage gain G, the transistor used has transconductance 0.03 mho and current gain 25. If the above transistor is replaced with another one with transconductance 0.02 mho and current gain 20, the voltage gain will be [NEET] 2 (a) G (b) 1.5G 3 1 5 (d) G (c) G 3 4 13 In the case of constants α and β of a transistor (a) αβ = 1 (b) β > 1, α < 1 (c) α = β (d) β < 1, α > 1
18 The transfer characteristics of a base biased transistor has the operations, namely, cut-off, active region and saturation region. For using the transistor as an amplifier, it has to operate in the [J&K CET] (a) active region (b) cut-off region (c) saturation region (d) cut-off and saturation 19 An n- p-n transistor can be consider to be equivalent to two diodes connected. Which of the following figures is the correct one? [KCET] (a) (b) C
E
B
(c)
B C
E
(d)
base current is changed by 40 µA, which results in a change in collector current by 2 mA. This transistor is used as a common emitter amplifier with a load resistance of 4 kΩ. The voltage gain of the amplifier is [CBSE AIPMT] (a) 2000 (b) 3000 (c) 4000 (d) 1000
15 In a CE transistor amplifier, the audio signal voltage across the collector resistance of 2 kΩ is 2V. If the base resistance is 1kΩ and the current amplification of the transistor is 100, the input signal voltage is [CBSE AIPMT] (a) 0.1 V (b) 1.0 V (c) 1 mV (d) 10 mV
2011 16 A transistor is operated in common emitter configuration at
VC = 2 V such that a change in the base current from 100µA to 300 µA produces a change in the collector current from 10 mA to 20 mA. The current gain is (a) 75 (b) 100 [CBSE AIPMT] (c) 25 (d) 50
17 The current gain of a common base transistor circuit is 0.96. On changing the emitter current by 10.0 mA, the change in the collector current will be [J&K CET] (a) 9.6 mA (b) 0.4 mA (c) 19.6 mA (d) 24 mA
C
E
B
B
20 The device that can act as a complete electronic circuit is
[AIIMS]
2012 14 The input resistance of a silicon transistor is 100 Ω. Its
C
E
[CBSE AIPMT]
(a) junction diode (c) junction transistor
(b) integrated circuit (d) zener diode
21 The current gain α of a transistor in common-base mode is 0.995. Its current gain β in the common emitter mode is (a) 200 (b) 90.5 [Manipal] (c) 100 (d) 1.005 22 The current gain in the common-emitter mode of a transistor is 10. The input impedance is 20 kΩ and load of resistance is 100 kΩ. The power gain is [Manipal] (a) 300 (b) 500 (c) 200 (d) 100 23 If β, R L and r are the AC current gain, load resistance and the input resistance of a transistor, respectively in CE configuration, the voltage and the power gains respectively are [Manipal] RL R and β 2 L (a) β r r r r (b) β and β 2 RL RL R R (c) β L and β L r r
2
r r and β (d) β RL RL
2
2010 24 If parameter α = 0.9, then the value of the parameter β is (a) 0.1 (c) 0.9
(b) 1 (d) 9
[OJEE]
830
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
25 In a common emitter configuration, a transistor has β = 50 and input resistance is 1kΩ. If the peak value of AC input is 0.01 V, then the peak value of collector current is (a) 0.01µA (b) 0.25 µA [WB JEE] (c) 100 µA (d) 500 µA 26 In transistor, forward bias is always smaller than the reverse bias. The correct reason is [Haryana PMT] (a) to avoid excessive heating of transistor (b) to maintain a constant base current (c) to produce large voltage gain (d) None of the above 27 In a common base configuration, (transistor circuit) I E = 1mA and I C = 0.95 mA. The value of base current is (a) 1.95 mA (b) 0.05 mA [CG PMT] (c) 1.05 mA (d) 0.95 mA 28 A p-n- p transistor having AC current gain of 50 is used to make an amplifier of a voltage gain of 5. What will be the power gain of the amplifier? [DUMET] (a) 125 (b) 178 (c) 250 (d) 354
2009 29 A transistor is operated in common emitter configuration
atVc = 2 Vsuch that a change in the base current from 100 µA to 200µΑ produces a change in the collector current from 5 mA to 10 mA. The current gain (a) 75 (b) 100 [CBSE AIPMT] (c) 150 (d) 50
30 In a transistor, the collector current is always less than the emitter current, because [AFMC] (a) collector side is reverse biased and the emitter side is forward biased (b) a few electrons are lost in the base and only remaining ones reach the collector (c) collector being reverse biased, attracts less electrons (d) collector side is forward biased and emitter side is reverse biased
2008 31 The voltage gain of an amplifier with 9% negative feedback is 10. The voltage gain without feedback will be [CBSE AIPMT] (a) 90 (b) 10 (c) 1.25 (d) 100
32 The input resistance of a common emitter transistor amplifier, if the output resistance is 500 kΩ, the current gain is α = 0.98 and power gain is 6.0625 × 106 is [AIIMS] (a) 198 Ω (b) 300 Ω (c) 100 Ω (d) 400 Ω
33 A change of 8.0 mA in the emitter current brings a change of 7.9 mA in the collector current. The values of α and β are [MHT CET] (a) 0.99, 90 (b) 0.96, 79 (c) 0.97, 99 (d) 0.99, 79 34 In a common emitter configuration of a transistor, the voltage drop across a 500 Ω resistor in the collector circuit is 0.5 V when the collector supply voltage is 5 V. If the current gain in the common base mode is 0.96, the base current is [Kerala CEE] 1 1 1 1 (a) µA (b) µA (c) mA (d) mA 20 5 20 10 1 mA (e) 24 35 In a transistor circuit, the base current changes from 30 µA to 90 µA. If the current gain of the transistor is 30, the change in the collector current is [Punjab PMET] (a) 4 mA (b) 2 mA (c) 3.6 mA (d) 1.8 mA 36 A common emitter amplifier has a voltage gain of 50, an input impedance of 100 Ω and an output impedance of 200 Ω. The power gain of the amplifier is [JCECE] (a) 500 (b) 1000 (c) 1250 (d) 100
2007 37 In the following common emitter circuit, if
β = 100,VCE = 7 V, VBE = negligible, RC = 2 k Ω, then [Punjab PMET] IB = ? IB
IC RC
RB
15 V C
B
E
(a) 0.01 mA (b) 0.04 mA (c) 0.02 mA (d) 0.03 mA
38 Graph of input characteristics of common emitter amplifier is [DUMET] IB
(a)
0V 20 V
0V
(b)
VBE IB
(c)
VBE IB
0V 20 V
VBE
20 V
IB
(d)
20 V 0V VBE
831
SEMICONDUCTOR ELECTRONICS
39 The minimum potential difference between the base and emitter required to switch a silicon transistor ON is approximately [AIIMS] (a) 1 V (b) 3 V (c) 5 V (d) 4.2 V 40 Assertion In common base configuration, the current gain of the transistor is less than unity. [AIIMS] Reason The collector terminal is reverse biased for amplification. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
2006 41 An amplifier has a voltage gain AV = 1000. The voltage gain in dB is (a) 30 dB (b) 60 dB
[AFMC]
(c) 3 dB
(d) 20 dB
42 In a transistor amplifier, the two AC current gains α and β ∂I ∂I are defined as α = C and β = C . The relation ∂I E ∂I B between α and β is [Guj CET] 1− α 1+ α α α (b) β = (c) β = (d) β = (a) β = α α 1− α 1+ α 43 A p-n- p transistor is said to be in active region of operation, when [EAMCET] (a) both emitter junction and collector junction are forward biased (b) both emitter junction and collector junction are reverse biased (c) emitter junction is forward biased and collector junction is reverse biased (d) emitter junction is reverse biased and collector junction is forward biased
2005 44 The voltage gain of the following amplifier is
[AIIMS]
100 kΩ 1 kΩ
Vi
10 kΩ
(a) 10 (c) 1000
Vo
(b) 100 (d) 9.9
45 Consider an n- p -n transistor amplifier in common emitter configuration. The current gain of the transistor is 100. If the collector current changes by 1 mA, what will be the change in emitter current? [AIIMS] (a) 1.1 mA (b) 1.01 mA (c) 0.01 mA (d) 10 mA 46 In n- p-n transistor, the collector current is 10 mA. If 90% of the electrons emitted reach the collector, then (a) emitter current will be 9 mA [Kerala CEE] (b) emitter current will be 11.1 mA (c) base current will be 0.1 mA (d) base current will be 0.01 mA (e) emitter current will be 11.3 mA 47 Assertion In a common emitter transistor amplifier, the input current is much less than the output current. Reason The common emitter transistor amplifier has very high input impedance. [Manipal] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct.
Answers 1 11 21 31 41
(c) (c) (a) (d) (a)
2 12 22 32 42
(c) (a) (b) (a) (b)
3 13 23 33 43
(d) (b) (a) (d) (c)
4 14 24 34 44
(a) (a) (d) (e) (b)
5 15 25 35 45
(c) (d) (d) (d) (b)
6 16 26 36 46
(d) (d) (a) (c) (b)
7 17 27 37 47
(b) (a) (b) (b) (c)
8 18 28 38
(b) (a) (c) (b)
9 19 29 39
(b) (b) (d) (a)
10 20 30 40
(b) (b) (b) (b)
832
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Explanations 1 (c) Given, R out = 200Ω , 5
Rin = 100 kΩ = 10 Ω VCC = 3 V, VBE = 0.7 V, VCE = 0V , β = 200 Applying KVL at output side, VCE = VCC − IC Rout 0 = 3 − I c × 200 ⇒ IC = 15 mA I 15 × 10−3 = 75 × 10−6 A ∴I B = C = β 200 ∴ I B = 75 µA Again, Applying KVL at input side, VBE = VBB − I B Rin ⇒ VBB = VBE + I B Rin = 0.7 + 75 × 10−6 × 105 = 0.7 + 7.5 = 8.2 V
2 (c) In CE configuration n-p-n transistor, emitter current (I E ) is equal to sum of collector current (IC ) and base current (I B ), i.e I E = IC + I B
3 (d) Given, VBE = 0 V, VCE = 0 V and Vi = 20 V VCC=20 V
RC = 4 kW = 4×103W IC C
Vi
IB B RB=500 kW = 500×103W
VB E
Applying Kirchhoff’s law to the base emitter loop, we get Vi = I B RB + VBE Substituting the values, we get 20 = I B × (500 × 103 ) + 0 20 ⇒ IB = = 0.04 × 10−3 500 × 103 = 40 × 10−6 = 40 µA …(i) Similarly, VCC = IC RC + VCE Substituting the given values, we get 20 = IC × (4 × 103 ) + 0 20 = 5 × 10−3 = 5 mA…(ii) ⇒ IC = 4 × 103 I Current gain is given as β = C IB Substituting the value of I B and IC from Eqs. (i) and (ii), we get 5 × 10−3 . ⇒ β= = 0125 × 103 = 125 40 × 10−6
4 (a) Given, β = 49 and ∆I B = 5µA
Output signal voltage = 4 V Putting all the values in given equation, we get R 2 kΩ A V = β out = 100 × R in 1 kΩ ⇒ A V = 200 (V ) Now, A V = out AC = 200 (Vin )AC
5 (c) Collector current,
⇒ (Vin )AC = 4 / 200 = 20 mV (b) Given, α = 0.95 and I b = 0.2 mA I I − Ib I As, α = c = e =1− b Ie Ie Ie Ib ⇒ = 1 − α = 1 − 0.95 = 0.05 Ie 0.2 I ⇒ ⇒ I e = 4 mA Ie = b = 0.05 0.05
∆I Current gain, β = C , where ∆IC is ∆I B change in collector current and ∆I B is change in base current. ∆IC = β∆I B = 49 × 5 = 245µA ∆I E = ∆I B + ∆IC = (245 + 5) µA = 250 µA iC =
V 3 = = 10−3 A R 3 × 103
Now, base current, i 10−3 iB = C = = 10−5 A β 100 As, voltage, Vin = iB RB ∴ Vin = 10−5 × 2 × 103 = 2 × 10−2 V So, voltage gain, V 3 A V = out = = 150 Vin 2 × 10−2 Power gain = A V × β = 150 × 100 = 15000
6 (d) Given, resistance across load,
RL = 800 Ω Voltage drop across load, VL = 0.8 V Input resistance of circuit, Ri = 192 Ω. Collector current is given by V 0.8 8 IC = L = = = 1 mA RL 800 8000
Q Current amplification Output current IC = = = 0.96 Input current IB 1 mA ⇒ IB = 0.96 V V Q Voltage gain, AV = L = L Vin I B Ri 0.8 × 0.96 = 4 ⇒ AV = 4 = −3 10 × 192 and power gain, 2 I R I 2R AP = C2 L = C . L I B Ri I B Ri = (0.96)2 × 800/192 AP = 3.84
7 (b) Voltage amplification, AV = β
R out (Vout )AC = R in (V in )AC
Given, collector resistance = Rout = 2 kΩ Current amplification factor, β = 100 Base resistance, Rin = 1 kΩ
8
9 (b) In active region values are as I B is 10
in µA, IC is in mA and VCE in V. (b) α and β are the AC current gains of a transistor in the common base configuration and in the common emitter configuration, respectively and are related as α 0.98 β= = [Q α = 0.98 ] 1 − α 1 − 0.98 0.98 98 = = 49 ⇒ = 0.02 2
11 (c) A common base circuit of a p-n-p transistor is shown in figure. The emitter base (p-n) junction on the left is given a small forward bias (fraction of a volt) by an emitter base battery VEB , while the base collector (n-p) junction is given a large reverse bias (a few volt) by another battery VCB . Emitter
p
Base n
p
Collector
E
C
B iE
Forward biased + – VEB
Reverse biased
iB +
ic
– VCB Hole (+) Electron (–)
So, the required solution is emitter-base (EB) junction is forward bias and collector-base (CB) junction is reverse bias.
833
SEMICONDUCTOR ELECTRONICS
12 (a) As voltage gain, β G = RL Ri
β Q gm = R i G = gmRL ⇒ G ∝ gm 0.02 G2 gm2 = ⇒ G2 = ×G G1 gm 1 0.03
⇒ ∴
∴ Voltage gain, G2 =
2 G 3
linear characteristics between input and output voltage.
19 (b) Fig. (b) shows the correct diagram of the circuit. n
p
n
⇒ E
n
p
n
13 (b) In case of transistor, constant α is current gain in common base configuration and constant β is current gain in common emitter configuration. Also, α is always less than 1, while β is always greater than 1.
14 (a) We know that, voltage gain, RL Ri On putting given values, we get AV = β
AV =
2 × 10− 3 4 × 103 ∆I × Qβ = C −6 100 ∆I B 40 × 10
AV = 2000
15 (d) Current amplification factor,
∆ IC …(i) ∆I B Collector current, V 2V ∆ IC = C = = 1× 10− 3 A RC 2 × 103 Ω Base current, V VB ∆I B = B = = VB × 10− 3 A RB 1 × 103 β=
16
Given, β = 100 1 1 × 10− 3 ∴ 100 = ⇒ VB = 100 VB × 10− 3 10 = 10 × 10− 3 V = 10 mV ⇒ VB = 1000 (d) Current gain, ∆I (20 − 10) mA β= C = ∆I B (300 − 100) µA =
10 × 10− 3 = 50 200 × 10− 6
C
B
20 (b) Integrated circuits are miniature electronic circuit produced within a single crystal of a semiconductors such as silicon. They contain a million or so transistors and resistors or capacitors. They are widely used in memory circuits, micro computers, pocket calculators and electronic watches, on account of their low cost and reliability into specific regions of the semiconductor crystals.
21 (a) Given, current gain α of a transistor is in common base mode, α = 0.995 We have to find, current gain in common emitter mode β. We know that, α 0.995 = β= ≈ 200 1– α 1 − 0.995
22 (b) The power gain is defined as the ratio of change in output power to the change in input power. Since, P = Vi Therefore, power gain = current gain × voltage gain R = β × β out Rin R = β 2 out Rin Given, β = 10, Rin = 20 k Ω and Rout = 100 k Ω
17 (a) Current gain for common base ∆I transistor, α = C ∆I E V
C
Given, α = 0.96 and ∆I E = 10.0 mA ∆I 0.96 = C 10.0 ∆IC = 0.96 × 10.0 = 9.6 mA
18 (a) For using the transistor as an amplifier, it has to operate in the active region, because in this region, it shows
by α=
β β ⇒β=9 ⇒ 0.9 = 1+ β 1+ β
25 (d) Given, the current gain of the C
E
24 (d) Relation between α and β is given
100 ∴ Power gain = (10)2 20 = 100 × 5 = 500
23 (a) Transistor as a common emitter amplifier, ∆Vo Voltage gain, AV = ∆Vi R = β AC × Resistance gain = β × L r ∆P Power gain = o ∆Pi R = β 2AC × Resistance gain = β 2 × L r
transistor is β = 50, input resistance = 1 kΩ and input voltage = 0.01 V ∆i Hence, β = C = 50 ⇒ ∆iC = 50 ∆iB ∆iB
Also, the change in base current is Input voltage 0.01 ∆iB = = Input resistance 1 × 103 = 10− 5 A So, ∆iC = 50 × 10− 5 = 500 µA
26 (a) If forward bias is made large, the majority charge carriers would move from the emitter to the collector through the base with high velocity. This would give rise to excessive heat causing damage to transistor.
27 (b) For a common base transistor, I E = I B + IC ⇒ 1 mA = I B + 0.95 mA I B = 0.05 mA
28 (c) For the amplifier, Power gain = Current gain × Voltage gain = 50 × 5 = 250
29 (d) Current gain is given as β= ⇒
∆ IC ∆I B
VCE = constant
−3
5 × 103 (10 − 5) × 10 = = 50 −6 100 (200 − 100) × 10
30 (b) Due to forward bias at the emitter-base junction (in n-p-n), the majority charge carrier (electrons) of emitter get repelled from the negative terminal and move towards base. Some of these electrons combine with the majority charge carrier (holes) present in the base and most of the electrons reach the collector, crossing the collector-base junction. This implies that collector current is always less than the emitter current as a few electrons are lost in the base and only remaining ones reach the collector.
31 (d) The process of injecting a fraction of output energy of some device back to the input is known as feedback. When the feedback energy (voltage or current) is out of phase with the input signal and thus opposes it, is called negative feedback.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Voltage gain with feedback is AV AVf = 1 + βAV
32
where, AV is the voltage gain without feedback andβ is the negative feedback. 9 Given, AVf = 10, β = 9% = 100 AV 10 = ∴ 9 1+ AV 100 9 or 10 + AV = AV 10 or 0.1 AV = 10 or AV = 100 R (a) Voltage gain, AV = β 2 R1 where, R1 = input resistance and R2 = output resistance Also, current gain, α 0.98 β= = = 49 1 − α 1 − 0.98 500 × 103 ∴ AV = (49) R1 ⇒ Power gain = β AV ⇒ 6.0625 × 10 6 500 × 103 = 49 × × 49 R1 R1 = 198 Ω
⇒
36 (c) As, AV is voltage gain and βAC is AC current gain. R AV = β AC × Resistance gain = 0 Ri Given, AV = 50, R0 = 200 Ω, Ri = 100 Ω 200 Hence, 50 = β AC × 100 ∴ β AC = 25 Now, AC power gain = AV × β AC = 50 × 25 = 1250
37 (b) Here, V = VCE + ICRC ⇒ ⇒
15 = 7 + IC × 2 × 103 IC = 4 mA 4 I IB = = 0.04 mA Q β = C 100 IB
38 (b) The input characteristics of common emitter amplifier is the curve between base current, I B and base emitter voltage, VBE at constant collector emitter voltage, VCE . The input characteristics can be determined by the circuit as shown in figure. Keeping VCE constant (say at 0 V), note the base current I B for various values of VBE .
33 (d) Given, change in emitter current, ∆I E = 8 mA and change in collector current, ∆IC = 7.9 mA ∆I 7.9 ~ We know that, α = C = − 0.99 ∆I E 8 Also we know that, 7.9 α 7.9 β= = 8 = 1 − α 1 − 7.9 8 − 7.9 8 7.9 = = 79 0.1 Hence, the required answer is α = 0.99 and β = 79.
34 (e) In common emitter configuration, IC =
∆VC 0.5 = = 1 mA RL 500
α = 0.96 α 0.96 β= = = 24 1 − α 0.04 1 I I mA β = C ⇒ IB = C = β 24 IB
Given, ⇒ Q
35 (d) The current gain, β =
∆ IC ∆I B
∆IC 90 − 30 ∆IC = 30 × 60 = 1800 µA = 1.8 mA
∴ 30 =
IC mA
IE
For amplification, the collector terminal of the transistor is reverse biased.
41 (a) Voltage gain, AV = 1000 In dB, voltage gain, A = 10 log10 1000 dB = (10 × 3) log10 10 dB = 30 dB (Q log10 10 = 1)
42 (b) Given, α =
∂ IC ∂I and β = C , ∂I E ∂I B
We know that, in a transistor amplifier, I E = IC + I B ⇒ ∂ I E = ∂ IC + ∂ I B ∂ IC ∂IC /∂I E ∂I Now, β = C = = ∂I B ∂I E − ∂IC 1− ∂IC /∂I E α β= ∴ 1−α
43 (c) For amplification of a p-n-p transistor, emitter junction is forward biased and collector junction is reverse biased. In this state, p-n-p transistor is said to be in active region of operation.
44 (b) The given circuit is an operational
mA
IB VBE
collector current output is less than emitter current and hence α < 1. ∆I Because, α = C . ∆I E
VCE
amplifier (Op-amp). The voltage gain of this amplifier Rf V 100 kΩ AV = o = = = 100 Vi Ri 1 kΩ
45 (b) Current gain in common emitter Then, plot the readings obtained on the graph, taking I B along Y-axis and VBE along X -axis. Its slope is given by reverse of graph, i.e. ∆VBE ∆I B V = constent CE
= Ri (input resistance) With increasing value of VCE , the slope of graph increases, so correct graph is shown in (b).
39 (a) To switch on the transistor, the emitter-base junction of a transistor is forward biased, while collector-base junction is reverse biased. The cut-off voltage for silicon is 1V. So to switch on a silicon transistor a potential difference of 1V approximately is required between the base and emitter.
40 (b) The input current flowing into emitter is quite large as it is the sum of both the base current and the collector current respectively, therefore the
mode, β = ∆IC / ∆I B But ∆I B = ∆I E − ∆IC ∆ IC ∴ β= ∆ I E − ∆ IC
Here, β = 100 and ∆IC = 1 mA 1 1 or (∆I E − 1) = ∴ 100 = ∆I E − 1 100 ⇒ ∆I E − 1 = 0.01 or ∆I E = 1 + 0.01 = 101 . mA
46 (b) Collector current, IC = 10 mA Given, IC = (90/ 100)I E 100 100 mA = 11.1 mA × 10 = ∴ IE = 90 9 Also, I B = I E − IC = 11.1 − 10 = 1.1 mA
47 (c) The common emitter transistor amplifier has input resistance equal to 1 k Ω (approx.) and output resistance equal to 10 k Ω (approx.). Also, the output current in common emitter amplifier is much larger than the input current because current gain β > 1.
Topic 4
Digital Circuit 2019 1
2018 5 In the combination of the following gates, the output Y
+6 V
can be written in terms of inputs A and B as
R
0
A B
LED (Y)
A 1
Y
R 0
[NEET]
B 1
The correct boolean operation represented by the circuit diagram drawn is [NEET] (a) OR (b) NAND (c) NOR (d) AND
2 The circuit diagram shown here corresponds to the logic gate [NEET (Odisha)]
(a) A ⋅ B + A ⋅ B
(b) A ⋅ B + A ⋅ B
(c) A ⋅ B
(d) A + B
2017 6 The following circuit represents A Y
0
A
+6V R
B
1
(a) OR gate (c) AND gate
0
B 1
LED (Y)
A
(b) AND (d) NAND
B
3 Following circuit will act as
[JIPMER] C
A′
A
(a) 1 (c) not predictable Y′
B
Y
[NEET]
Y
A B
(a) AND gate (b) OR gate (c) NOR gate (d) NOT gate
(a) NOR gate (b) NAND gate (c) AND gate (d) OR gate
2016 9 To get output 1 for the following circuit, the correct
4 The given combination will work as
(a) NAND gate (c) AND gate
(b) 0 (d) None of these
8 The given electrical network is equivalent to
B′
A B
(b) XOR gate (d) NAND gate
7 A proper combination of 3 NOT and 1 NAND gates is shown in figure. If A = 0, B = 1, C = 1, then the output of this combination is [AIIMS]
R
(a) NOR (c) OR
[JIPMER]
[JIPMER] Y
(b) OR gate (d) NOR gate
choice for the input is A B C
[NEET]
Y
(a) A = 1, B = 0 and C = 0 (b) A = 1, B = 1and C = 0 (c) A = 1, B = 0 and C = 1 (d) A = 0, B = 1and C = 0
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
10 What is the output Y in the following circuit, when all the three inputs A, B, C are first 0 and then 1? [NEET] A
P
B
Q
Y
C
(a) 0, 1
(b) 0, 0
(c) 1, 0
(d) 1, 1
2014 11 The minimum number of NAND gates used to construct an OR gate is (a) 4 (b) 6 (e) 2
[Kerala CEE]
(c) 5
(d) 3
12 The output Y of the logic circuit given below is
[J&K CET]
G3 Inputs
Output
Inputs
Output
A
B
Y
A
B
Y
0 0 1 1
0 1 0 1
1 0 0 0
0 0 1 1
0 1 0 1
1 1 1 0
(a) G1 -OR, G2 -AND, G3 -NOR, G4 -NAND (b) G1 -OR, G2 -NOR, G3 -AND, G4 -NAND (c) G1 -AND, G2 -OR, G3 -NAND, G4 -NOR (d) G1 -OR, G2 -NOR, G3 -NAND, G4 -AND
2013 16 The output (Y ) of the logic circuit shown in figure will be
Y
A
G4
A
X
B
[NEET]
B
(a) A + B
(b) A
(c) ( A + B ) ⋅ A
(d) ( A + B ) ⋅ A
(a) Y = A ⋅ B (c) Y = A ⋅ B
13 For the given digital circuit, identify the logic gate A Y B
[KCET]
(a) OR gate (c) NAND gate
(b) NOR gate (d) AND gate
14 The combination of gates shown below yields
[UK PMT]
A
(b) Y = A ⋅ B (d) Y = A + B
17 Assertion NAND or NOR gates are called digital building blocks. Reason The repeated use of NAND or NOR gates can produce all the basic or complex gates. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Assertion is incorrect but Reason is correct. 2012 18 To get an output, Y = 1in given circuit, which of the following input will be correct? [CBSE AIPMT] A
Y
B B
Y
(a) NAND gate (c) XOR gate
(b) NOR gate (d) OR gate
C
15 The truth tables of logic gates G1 , G2 , G3 and G4 are given here. Identify them correctly. [EAMCET] G1 G2 Inputs
Output
Inputs
Output
A
B
Y
A
B
Y
0 0 1 1
0 1 0 1
0 1 1 1
0 0 1 1
0 1 0 1
0 0 0 1
A (a) 1 (c) 1
B C 0 0 1 0
A (b) 1 (d) 0
19 The figure shows a logic circuit with two inputs A and B and the output C. The voltage waveforms across A , B and C are as given. The logic circuit gate is [CBSE AIPMT] (a) OR gate (b) NOR gate (c) AND gate (d) NAND gate
B 0 1
C 1 0
A B C t1 t2 t3 t4 t5 t6
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SEMICONDUCTOR ELECTRONICS
20 The truth table given below is for (A & B are the inputs and Y is the output) [AFMC]
(a) NOR
A
B
Y
0
0
1
0
1
1
1
0
1
1
1
0
(b) AND
26 The output Y of the circuit shown is
Y B
(d) NAND
21 When the inputs of a two input logic gate are 0 and 0, the output is 1. When the inputs are 1 and 0, the output is 0. The logic gate is of the type [Manipal] (a) AND (b) NAND (c) NOR (d) OR
(a) XOR gate (c) OR gate
Y
0
0
0
1
0
1
0
1
1
1
1
0
B
(b) Y = A ⋅ B (d) Y = A + B
(a) Y = A ⋅ B (c) Y = A + B
27 The output Y of given logic circuit is
[KCET]
A B
22 The given below truth table shows B
A
A
(c) XOR
A
[J&K CET]
Y
C
(a) A ⋅ ( B + C ) (c) ( A + B ) ⋅ ( A + C )
(b) A ⋅ ( B ⋅ C ) (d) A + B + C
28 Given below are four logic gate symbols. Those for OR, NOR and NAND are respectively. [Manipal]
(b) NAND gate (d) AND gate
23 The decimal number equivalent to a binary number 1011001 is [WB JEE] (a) 13 (b) 17 (c) 89 (d) 178
Y (i)
2011 24 Symbolic representation of four logic gates are shown as
Y (ii)
Y (iii)
Y (iv)
[CBSE AIPMT]
(i)
(a) (i), (iv) and (iii) (c) (i), (iii) and (iv)
(ii)
(iii)
(iv)
Pick out which ones are for AND, NAND and NOT gates, respectively. (a) (iii), (ii) and (i) (b) (iii), (ii) and (iv) (c) (ii), (iv) and (iii) (d) (ii), (iii) and (iv)
(b) (iv), (i) and (ii) (d) (ii), (iii) and (iv)
29 If the two inputs of a NAND gate are shorted, the gate is equivalent to [Kerala CEE] (a) XOR (b) OR (c) NOR (d) NOT (e) AND 30 Which logic gate is represented by the following combination of logic gates? [Punjab PMET] A
25 In the circuit given A, B & C are inputs and Y is the output. The output of Y is [Kerala CEE] B
A B Y C
(a) high for all the high inputs (b) high for all the low inputs (c) high when A = 0, B = 0 and C = 1 (d) low when A = 0, B = 0 and C = 1 (e) None of the above
Y
(a) OR
(b) NAND
(c) AND
(d) NOR
2010 31 Identify the logic operation performed by the circuit given here.
(a) OR
[KCET]
(b) NOR
(c) NOT
(d) NAND
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
32 The circuit is equivalent to NOR
[CBSE AIPMT] NAND
NOT
A
Y
B
(a) AND gate (c) NOR gate
(b) NAND gate (d) OR gate
(c)
A
B
Y
0
0
0
1
1 1
(d)
A
B
Y
1
0
0
0
0
0
1
1
0
0
1
0
1
1
0
1
1
1
38 The following configuration of gate is equivalent to
33 The output Y , when all the three inputs are first high and then low, will respectively be [Kerala CEE]
[Punjab PMET] OR A
G1
B
AND
Y
(a) 1, 0 (e) 1, − 1
(b) 1, 1
(c) 0, 0
G3
(d) 0, 1
Y
G2 NAND
34 Identify the true statement for OR gate. [J&K CET] (a) Output Y will be 1 when input A or B or both are 1. (b) Output Y will be 0 when the either of the inputs A or B is 1. (c) Output Y will be 1 only when both the inputs A and B are 1. (d) Output Y will be 1 only when either of the inputs A and B are 1. 35 Which one of the entries given in the truth table is true for the following logic circuit? [Guj CET] A B
(a) 3
Input A 0 0 1 1
(b) 4
Input B 0 1 0 1
39 The output is low when either of the input is high, then this represents which of the following gates? [DUMET]
(a) OR (c) AND
(b) NOR (d) NAND
40 8 bits form (a) 1 byte (c) 1 nibble
[DUMET]
(b) 1 diction (d) 1 binary
2006 42 The following figure shows a logic gate circuit with
Output Y 1 0 1 0
(c) 1
(b) XOR (d) None of these
41 Boolean expression for OR gate is [Guj CET] (a) Y = A ⋅ B (b) Y = A + B (c) Y = A + B (d) Y = A
Y
Entry No. 1. 2. 3. 4.
(a) NAND (c) OR
two inputs A & B and the output C. The voltage waveforms of A , B and C are as shown below. [CBSE AIPMT] A
(d) 2
36 An AND gate is followed by a NOT gate in series. With two inputs A and B, the Boolean expression for the output Y will be
B
Logic gate circuit
C
1
[Guj CET]
(a) A + B
(b) A ⋅ B
(c) A ⋅ B
(d) A + B
A
2007 37 In the following circuit, the output Y for all possible inputs A and B is expressed by the truth table
[CBSE AIPMT]
A
(a)
1 B
C
A
B
Y
0 0 1 1
0 1 0 1
0 0 0 1
(b)
A
B
Y
0 0 1 1
0 1 0 1
1 1 1 0
t
1
Y
B
t
(a) AND gate (b) NAND gate (c) NOR gate (d) OR gate
t
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SEMICONDUCTOR ELECTRONICS
2005 43 Assertion The logic gate NOT can be built using diode.
44 In the following circuit the output Y becomes one for the inputs [Kerala CEE]
Reason The output voltage and the input voltage of the diode have 180° phase difference. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
A B
1 3
C
Y
2
(a) A = 1, B = 0 and C = 0 (b) A = 0, B = 1 and C = 1 (c) A = 0, B = 0 and C = 0 (d) A = 1, B = 1 and C = 0 (e) A = 1, B = 1 and C = 1
Answers 1 (b)
2 (a)
3 (a)
4 (c)
5 (b)
6 (b)
7 (a)
8 (c)
9 (c)
10 (c)
11 (d)
12 (b)
13 (d)
14 (d)
15 (a)
16 (c)
17 (a)
18 (b)
19 (a)
20 (d)
21 (c)
22 (a)
23 (c)
24 (c)
25 (c)
26 (a)
27 (c)
28 (d)
29 (d)
30 (c)
31 (a)
32 (c)
33 (d)
34 (a)
35 (d)
36 (b)
37 (d)
38 (b)
39 (b)
40 (a)
41 (c)
42 (a)
43 (d)
44 (d)
Explanations i.e. both the switches should be open.
1 (b) The LED will glow when the current flows through it, i.e. when the voltage across it is high. The truth table can be formed from this
Y = AB = AB = output of AND gate.
5 (b) According to the question, the
1
Y
figure of combination of gates in terms of inputs and outputs can be given as
Thus, the truth table for the circuit diagram can be formed as
R B
==
LED (Y)
R
0
y=AB=AB
i.e. Output of the combination of gates
0 1
R
AB
A B
1 B
+6V
A
0
A
4 (c) The given combination is written as
+6V R
0
A
B
Y
1
0 0 1 1
0 1 0 1
1 0 0 0
A B
B
Y
0
0
1
0
1
1
1
0
1
The output (Y ) is equivalent to that of NOR gate.
1
1
0
3 (a) The truth table for the circuit is as
2 (a) From the circuit diagram given below, it can be seen that the current will flow to ground if any of the switch is closed. Also, the LED will only glow when current flows through it,
A
B
A′
B′
Y′
Y
1 1 0 0
1 0 1 0
0 0 1 1
0 1 0 1
1 1 1 0
0 0 0 1
The Y-output is of NOR gate.
B A
B A B
A
The output Y is same as that come from NAND gate.
A
C= A ⋅ B C
Y=C+D
D D= A ⋅ B
Thus, Y = A ⋅ B + A ⋅ B
6 (b) Output of upper AND gate = AB Output of lower AND gate = AB Thus, output of OR gate = AB + AB This is the boolean expression for XOR gate.
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
When A = B = C = 0,
7 (a) The simplified circuit is shown in figure below
B
B
Y
If A = 0, B = 1, C = 1 y = 0 ⋅ 1 ⋅ 1 = 1⋅ 0 ⋅ 0 = 0 = 1
8 (c) Truth table for given network is NOR
A B
NOR Y1
Y
B
Y1
Y2
Y
0 1 0 1
0 0 1 1
1 0 0 0
0 1 1 1
1 0 0 0
Output Y of network matches with that of NOR gate.
B
B
Y = A⋅ B = A + B = A+ B So, three NAND gates are required to make an OR gate.
10 (c) Output of the given circuit is given
A
A+A .B
A
Y
AND
A
B
= A ⋅1 = A
13 (d) According to the logical relationship, A + B = A⋅ B = A⋅ B A
A+B
B
14 (d) The combination of three NAND gates are shown in the diagram. Y1 G3 B
G2
Y
0 1 0 1
1 1 1 0
Truth table for given gate combination is Output
A
B
Y =A+ B
0
0
0
0
1
1
1
0
1
1
1
1
Truth table for given gate combination is Inputs
So, it is AND gate.
G1
Y2
0 0 1 1
Similarly, the AND gate also has two inputs and one output and follows Boolean expression A ⋅ B = Y, read as ‘‘A AND B equals Y’’. Y
A
Y1
1 0 1 0
Inputs
or Y = A ⋅ B + A = A ⋅ ( B + 1)
B
B
1 1 0 0
OR A .B
A
A
two (or more) input variables A and B and one output variable Y and follows the Boolean expression, A + B = Y , read as ‘A OR B equals Y ’.
Y = A + A⋅B NOT
Output
15 (a) The OR gate is a device that has
12 (b) By absorption law, output,
9 (c) The resultant boolean expression of the given logic circuit will be Y = ( A + B) ⋅ C Now, let us try with inputs A, B and C given in the options and lets see, which one of them will give output 1 at Y. If A = 1, B = 0 and C = 0 ⇒ Y = (1 + 0) ⋅ 0 ⇒ Y=0 If A = 1, B = 1 and C = 0 ⇒ Y = (1 + 1) ⋅ 0 ⇒ Y = 1⋅ 0 ⇒ Y=0 If A = 1, B = 0 and C = 1 ⇒ Y = (1 + 0) ⋅ 1 ⇒ Y = 1⋅ 1 ⇒ Y =1 If A = 0, B = 1 and C = 0 ⇒ Y = (0 + 1) ⋅ 0 ⇒ Y = 1⋅ 0 ⇒Y=0 So, we have seen that among the given options, only option (c) is the correct choice, i.e., output Y = 1only when inputs A = 1, B = 0 and C = 1.
=A+ B This is OR gate. Alternate Method The combination is equivalent to an OR gate. Truth table for given gate combination is Inputs
Y
A
=A+ B
A
A
NOT Y2
Y2
by y = ( AB ) (C )
Y = Y1 ⋅ Y2 = Y1 + Y2
are joined together, it works as a NOT gate. Now, if the inputs A and B are inverted by using two NOT gates (obtained from two NAND gates) and the resulting output A and B are fed to a third NAND gates, then output is
So, output y = A ⋅ B ⋅ C ∴
= B. B = B Output due to NAND gate 3
11 (d) If the two inputs of a NAND gate
C
C
Y2 = Output due to the NAND gate 2
When A = B = C = 1, Y2 = (1) (1) (1) = 0
A
A
= A⋅ A = A
Y1 = (0) (0) (0) = 0 = 1
Y1 = Output due to NAND gate 1
Y
Outputs
A
B
Y = A⋅ B
0 0 1 1
0 1 0 1
0 0 0 1
The NOR gate is a combination of OR and NOT gates. The boolean expression for the NOR gate is A + B = Y.
841
SEMICONDUCTOR ELECTRONICS
Truth table for given gate combination is Inputs
Output
A
B
Y =A+ B
0 0 1 1
0 1 0 1
1 0 0 0
The NAND gate is a combination of AND and NOT gates. The boolean expression for the NAND gate is A⋅ B = Y Truth table for given gate combination is Inputs
Output
A
B
0 0 1 1
0 1 0 1
Y =A⋅ B 1 1 1 0
So, the required solution is G1 → OR gate, G2 → AND gate, G3 → NOR gate and G4 → NAND gate.
19 (a) From the given waveforms, the Time
Inputs
Output
A
B
C
t1
1
0
1
t2
1
1
1
t3
1
1
1
t4
0
1
1
t5
1
0
1
t6
1
1
1
output of OR gate is made as the input of NOT gate. Boolean expression for NOR gate is Y = A + B. The logic symbol of NOR gate as shown below
i.e. AND gate
18 (b) The boolean expression for output of the given combination is Y = ( A + B) ⋅ C The truth table for the given combination is
Output
B
C
Y = ( A + B) ⋅ C
0 0 1 0 1 1 0 1
0 0 0 1 0 1 1 1
0 0 0 0 0 1 1 1
B
0
0
1
1
0
0
0
1
0
1
1
0
Hence, the logic gate is of NOR type.
Hence, A = 1, B = 0 and C = 1, gives output Y = 1.
23 (c) Given, binary number = 1011001 Its equivalent decimal number = 1 × 20 + 0 × 21 + 0 × 22 + 1 × 23 + 1 × 24 + 0 × 25 + 1 × 26 = 20 + 0 + 0 + 23 + 24 + 0 + 26 = 1 + 8 + 16 + 64 = 89
24 (c) Symbols given in the problem are (i) OR gate (iii) NOT gate
26 (a) The gate circuit is as shown below A
A
Y =A+B =A.B B
B
A+B Y=(A+B) .(A+C)
B A+ C
Y =A+ B
A
high or low, then the output is low, so the truth table shows the XOR gate.
0 1 0 0 1 0 1 1
Hence, output is high, when A = 0, B = 0 and C = 1, then option (c) is correct.
A
22 (a) In XOR gate, if both the inputs are
A
When A = 0, B = 0, C = 1, then Y = (0 + 0) ⋅ 1 = 1⋅ 1 = 1
27 (c) The gate circuit is shown as
Inputs
called universal (digital) building blocks, because using these two types of gates we can produce all the basic gates namely OR , AND, NOT or complex gates.
When A = B = C = 0, then Y = (0 + 0) ⋅ 0 = 1⋅ 0 = 0
The output of the circuit, Y = A ⋅ B
Truth table for given gate combination is
17 (a) The NAND or NOR gates are
Y = ( A + B) ⋅ C Now checking for each option, When A = B = C = 1, then Y = (1 + 1) ⋅ 1 = 0 ⋅ 1 = 0
Y
B
Y=( A + B ) .C
C
20 (d) The output Y = ( A ⋅ B ) is a
21 (c) The NOR gate is obtained when the
AND NOR
Note The logic of the OR gate is, if any of the input is one, then output is one.
combination of AND and NOT gates. Hence, the truth table is for NAND gate.
A+B
A B
This truth table is equivalent to OR gate. So, logic circuit is OR gate.
A
16 (c) As, Y = A ⋅ B = A ⋅ B
25 (c) The output of the circuit is
following truth table can be made
(ii) AND gate (iv) NAND gate
C
For this circuit, output, Y = ( A + B) ⋅ ( A + C )
28 (d) Gate (i) → AND, Gate (ii) → OR, Gate (iii) → NOR and Gate (iv) → NAND
29 (d) The circuit diagram of a NAND gate when its two inputs are shorted is given as NAND = AND + NOT The gate circuit is given as Y
Y A
Truth table for given gate combination is A
Y 0 1
0 1
Y 1 0
842
CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Hence, if the inputs is zero, then output is 1 and when input is 1, then output is zero.
when either or both the inputs A and B are 1. The truth table is shown below
So, the resulting gate is NOT gate.
30 (c) The output,
A 0 0 1 1
Y=A+B = A ⋅ B = A⋅ B This is the boolean expression for AND gate.
31 (a) The given gate circuit is a combination of NOR and NOT gates.
given two inputs A and B. NAND
NOT Y2
Y1
Y=A+ B=A+ B
Y 0 1 1 1
This is the boolean expression for OR gate whose truth table is given below.
shorted, then there are two conditions arise (i) When the input is 0, then the output is 0. (ii) When the input is 1, then the output is 1. Hence, by using these two conditions, the ouptut is 0 for the given logic circuit.
32 (c) The gate circuit can be shown by NOR
B 0 1 0 1
appeared as input of gate-2. The final output is
35 (d) When the inputs of a AND gate are
∴ Y=A+ B=A+ B This is the boolean expression for OR gate.
A
Here, gate-1 and gate-2 are NOR gates. The output ( A + B ) of gate-1 will be
34 (a) In an OR gate, output Y is 1, only
Y
B
0
A
A
B
Y
0
0
0
0
1
1
1
0
1
1
1
1
38 (b) The output, Y = ( A + B ) ⋅ AB The given output equation can also be written as A G1
B
Y' = 0
(A + B)
Output of NOR gate,
G3
Y1 = A + B Y2 = Y1 ⋅ Y1 = A + B ⋅ A + B
Boolean expression for AND gate is Y = A⋅ B Then, the truth table for the above logic circuit is given below
= ( A + B) + ( A + B) =A+ B Output of NOT gate, Y = Y2 = A + B which is the output of NOR gate.
33 (d) Let inputs A , B and C are given to the circuit.
A
B
Y ′= 0
Y ′′= B
Y = A⋅ B
0 1 0 1
0 0 1 1
0 1 0 1
0 0 1 1
0 0 0 1
Therefore, the required entry for the given logic circuit is 2.
A 1 2
Y
Gate-1 is AND gate and Gate-2 is NAND gate. Output,
Y = (A ⋅ B ⋅C )
36 (b) The inputs for AND gate is given by Y′ = A ⋅ B A
∴
= 1⋅ 1 = 1 = 0
= 0⋅ 0 = 0 = 1
Y = Y′
37 (d) We can simplify the gate circuit as A B
1
A+B
Y = ( A + B ) ⋅ AB (De-Morgan’s theorem) = A AB + AB B = A ( A + B) + ( A + B) B = AA + AB + AB + BB = 0 + AB + AB + 0 = AB + AB =A⊕ B which is the output of XOR gate.
39 (b) Figure shows that an N input
(N ≥ 2) OR gate followed by a NOT gate. The operation of this circuit can be described in the following way
A B N
Y= A⋅ B
⇒
2
Y=A+B
A.B
Boolean expression for XOR gate is
A B N
Y′ is the input for NOT gate
Y = (1⋅ 1) ⋅ 1 when, A = 0, B = 0 and C = 0 , then
Y = Y' = A.B
Y' = A .B
B
When, A = 1, B = 1 and C = 1, then
Y = ( 0 ⋅ 0) ⋅ 0
G2 B
Y'' = 1
1
=A+ B+ A+ B
B C
A
Y=0 B
Output of NAND gate,
Y
Y'
Y
Y
This output of the OR gate Y′ can be written as …(i) Y′ = A + B + K + N
843
SEMICONDUCTOR ELECTRONICS
The output of the NOT gate (Y ) can be written using Y = Y′ = A + B + K + N …(ii) The logic operation represented by Eq. (ii) is known as the NOR operation. Logic operation gives the truth table of a 2-input NOR gate. Inputs
Output
A
B
Y
0
0
1
0
1
0
1
0
0
1
1
0
and output are in same phase. Thus, NOT gate cannot be built by a diode.
It indicates that when either of input is high, the output is low.
40 (a) 8 bits form 1 byte. 41 (c) In boolean algebra, addition symbol (+ ) is referred to as OR function. The boolean expression for OR gate is given by A + B = Y, indicates Y equals to A or B.
42 (a) The boolean expression which satisfies the output of this logic gate is C = A ⋅ B, which indicates for AND gate. We can see, output C is zero when either of A or B (inputs) is zero.
43 (d) An NOT gate inverts the signal applied to it. But in diode, the input
44 (d) The output of gate-1, Y1 = A ⋅ B A B
1
Y1= A .B 3
C
2
Y = (AB). C
Y2= C
Output of gate-2, Y2 = C Output of gate-3, Y = Y1 ⋅ Y2 = ( A ⋅ B) ⋅ C Thus, output will be one, if A = 1, B = 1 and C = 0
28 Communication System Quick Review The word communication refers the act of transmission of information in an intelligible form, whereas communication system is the collection of all individual system elements required for the process of transmission.
• Few basic modes of communication system are
given in tabular form below
Systems
Specifications
Examples
Point to point
Link between single transmitter and a receiver.
• Every communication system has three essential elements
Broadcast
(i) Transmitter (ii) Medium/Channel (iii) Receiver • The block diagram of generalised communication system is given below
A large number of TV, Radio receivers corresponding to a single transmitter.
Basic Terminology Used In Electronic Communication System
Elements of Communication System
Noise
Transmitter
Received Transmitted Receiver Channel signal signal
Message signal
Message signal
Information source
User of information
• Sources or devices used in communication system are
shown in following table Sources of Information
Speech, pictures, commands, data.
Transmitter
Oscillators, amplifiers, filters, antenna.
Channel
Wire, links, wireless, optical fibres.
Receiver
Radio, TV, computer.
Telephony
Basic terms used in electronic communication system are listed below (i) Transducer A device that converts one form of energy into another form. (ii) Signal It is the information converted in electric form which is suitable for transmission. (iii) Noise It refers to the unwanted signals that tend to disturb the transmission and processing of information. (iv) Transmitter It processes the incoming message signals so as to make it suitable for transmission through a channel. (v) Receiver It extracts the desired message signals from the received signal at the channel output. (vi) Attenuation Loss of strength of signal while propagating through a medium.
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COMMUNICATION SYSTEM
(vii) Amplification Process of increasing the strength of a signal using an amplifier. (viii) Range The largest distance between a source and a destination upto which the signal is received with sufficient strength. (ix) Bandwidth The frequency range over which an equipment operates or the portion of the spectrum occupied by the signal. i.e.
Df = f 2 - f1
(x) Repeater It picks up the signal from the transmitter, amplifies and retransmits it to the receiver sometimes with a change in carrier frequency. (xi) Message Signals A time varying electrical signal generated by a transducer out of original signal.
Bandwidth of Transmission Medium • Some important bandwidths of transmission medium
along with their allocated services are shown in following table Services
Frequency Bands
Standard AM broadcast
540-1600 kHz
Radio broadcast
FM broadcast
88-108 MHz
Music channel
Television
54-72 MHz
VHF (Very High Frequencies)
76-88 MHz
TV
174-216 MHz
UHF (Ultra High Frequencies)
420-890 MHz
TV
Note Message signals can be voice, picture or computer data.
Bandwidth of Signals
Cellular mobile radio 896-901 MHz
Mobile to base station
840-935 MHz
Base station to mobile
Satellite
5.925-6.425 GHz
Uplink
Communication
3.7-4.2 GHz
Downlink
The bandwidth for different types of signals are shown in following table Types of Signal
Frequency Range
Bandwidth
Speech signal 300-3100 Hz
2800 Hz
Music
20 kHz
20-20000 Hz
Video
––
4.2 MHz
TV
––
6 MHz
• Antenna is an important device which acts as an emitter
of electromagnetic waves and first receiver of energy.
• Types of antenna are shown in following table relating its
length with wavelength
• Bandwidth = Highest frequency - Lowest frequency • A digital signal in the form of a rectangular wave which
can be obtained by the superposition of sine waves ( n 0 ) and their higher harmonics ( 2n 0 , 3n 0 ¼ , mn 0 ). This implies a infinite bandwidth as shown in the following graph
Voltage
1.5
(c) Fundamental (ν0)+ second harmonic (2ν0)
1
(b) Fundamental (ν0) (d) Fundamental (ν0)+ second harmonic (2ν0)+ third harmonic (3ν0)
Types of Antenna
0 0.2
0.4
0.6
0.8
Relation of Length ( l ) with Wavelength ( l )
Hertz antenna Marconi antenna
l = l/2 l = l/4
• Two commonly used antenna are dipole and dish type
antenna.
Propagation of Electromagnetic Waves • Three modes of propagation of electromagnetic waves are
shown pictorially below, which are described as
(a) Rectangular wave
0.5
Remarks
Communication satellite
1 Time
Ionosphere
Space wave
– 0.5 –1
LOS –1.5
• However, bandwidth is limited, so the received waves are
a distorted version of the transmitted one.
LOS Ground wave Earth
Sky wave
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
1. Ground Wave Propagation • Radio waves guided along the earth’s surface, following
curvature of earth. • These waves are limited to frequency of 1.5 MHz (1500 kHz) or wavelength of 200 m. • Used for low or medium frequency band for radio navigation.
2. Sky Wave Propagation • Propagation of AM radio waves signals from one point to
another via reflection from ionosphere. Their frequency range is from 3 to 30 MHz. • The different layers of atmosphere and their interaction with the propagating electromagnetic waves are shown below Name of the Stratum (layers) (Parts of Ionosphere)
Approximate Height over the Earth’s Surface
Exists During
Frequencies most Affected
Troposphere
10 km
Day and night
VHF (upto several GHz)
D (Part of stratosphere)
65-75 km
Day only
Reflects LF, absorbs MF and HF to some degree
E (Part of stratosphere)
100-125 km
Day only
Helps surface waves, reflects HF
F1 (Part of mesosphere)
170-190 km
Day time, Partially absorbs HF merges with waves yet allowing F2 at night them to reach F2
F2 (Part of thermosphere)
300 km at night, Day and night 250-400 km during day time
Efficiently reflects HF waves, particularly at night
• Terms related to sky wave propagation along with their
definitions are shown below Terms
Definitions
(i) Critical Frequency
Maximum frequency of radio waves reflected from ionosphere
(ii) MUF (Maximum Usable Frequency)
The highest radio frequency that can be used for transmission.
(iii) Skip distance
Expressions
nC » 9 (N max )1/ 2 where, N max = maximum electron density of ionosphere. MUF Critical frequency = cos q = nC sec q where, q = angle between normal and the direction of incident wave.
2 Shortest distance from a æn ö transmitter, measured Dskip = 2h ç max ÷ - 1 è nc ø along the earth’s surface at which a sky wave of fixed frequency will be first received after reflection from ionosphere.
3. Space Wave Propagation • The mode of propagation in which the radio waves
emitted from the transmitter antenna reach the receiving antenna through space waves. • Range of frequency of space waves 54 MHz - 4.2 GHz. • Range of a transmitting antenna, called radio horizon, d T = 2RhT where, R = radius of earth and hT = height of transmitting antenna. • Maximum line of sight distance between two antenna (transmitting and receiving) as per diagram, d max = d T + d R = 2RhT + 2RhR where, d T = radio horizon of transmitting antenna, d R = radio horizon of recieving antenna and d max = maximum line of sight distance between two antennas. dM dT
dR Earth
hT
T
R
hR
Modulation The process of superposing a low frequency message signal on a high frequency wave (carrier wave) is called modulation.
Need for Modulation • Size of the antenna should be comparable to the
wavelength of signal (at least l / 4 in size) in order to sends the signal properly. Modulation is essential, so that height of transmitting • antenna is not too high. • For signals of large l, effective power ( P ) radiated by 2 ælö an antenna should be related as P µ ç ÷ . èlø For high power, i.e. for good transmission l should be small or frequency ( n ) should be high. • There can be mixing up of signals from different transmitters, so modulation is essential so that there is no overlapping of signals.
Types of Modulation • A carrier wave is represented by
c( t ) = A c sin ( wc t + f ) where, c( t ) = signal strength of carrier wave, A c = amplitude, wc = angular frequency and f = initial phase of carrier wave.
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COMMUNICATION SYSTEM
• Three types of modulation along with diagrams are shown below Types of Modulation 1 c(t) 0 –1 0 1 m(t) 0 –1 20 cm(t) for AM 0 –2 0
Frequency Modulation (FM)
1
0.5
1.5
2
3
2.5
(b) 0.5
1
1.5
2
2.5
3 (c)
0.5
1
1.5
2
3
2.5
1 cm(t) for FM 0 –1
Phase Modulation (PM)
(a)
(d) 0
0.5
1.5
1
2.5
2
3
1 cm(t) for PM 0 –1
(e) 0
Amplitude Modulation (AM) • It is the process of changing the amplitude (A c ) of a carrier wave linearly in accordance with the amplitude of message signal ( A m ). • The modulated signal can be written as
c m ( t ) = ( A c + A m sin wm t ) sin wc t æ ö A = A c ç1 + m sin wm t ÷ sin wc t Ac è ø mA c = A c sin wc t + cos ( wc - wm ) t 2 mA c cos ( wc + wm ) t 2 A • The ratio m = m is called the modulation index and Ac in practice we maintain m £ 1, so as to avoid distortion. • Modulation Index In terms of amplitude, A A - A min m = m = max Ac A max + A min • In AM modulated wave signal, we have carrier wave
of frequency wc and two side bands of frequencies (wc - wm ) and ( wc + wm ), respectively. Thus, total bandwidth of AM signals is 2wm . AM technique is simpler and cost effective, however it • suffers from noisy reception, low efficiency, small operating range and poor audio quality.
0.5
1
1.5
2.5
2
Time 3
• In AM technique, power dissipated depends on modulation
index (m).
• A plot of amplitude versus wfor an amplitude modulated
signal is represented as Ac
Amplitude
Amplitude Modulation (AM)
Diagrammatic Representation
µAc 2
Lower side (ω c – ω m) ω c (ω c + ω m) Upper side ω (in radians) band band
• Block diagrams of the devices (systems) used for obtaining
AM signals are given below
Systems
Simple modulator
Block Diagrams x(t) Square law device Modulating signal m(t) Carrier wave c(t)
y(t)
Bandpass filter centered at ωc AM wave
Transmitter Modulated wave Message signal m(t)
Amplitude modulator Carrier wave c(t)
Power amplifier
Transmitting antenna
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Systems
Receiver
Block Diagrams Receiving antenna
Received signal
Amplifier
IF stage
Detector
Amplifier
Output
Detector
AM wave
Envelope detector
Rectifier (a)
(b) Time
AM input wave
m(t)
Time Rectified wave
Output
(c)
Time Output (without RF component)
• Demodulation The process of retrival of information from the carrier wave at the receiver is termed as demodulation.
The device used for this is called demodulator.
Internet • It is a global networking of computers which are interconnected networks world wide. • Local area network is known as LAN where networking of computers at small scale is possible, e.g. school and office. • A Wide Area Network (WAN) is the connection between various LANs. Applications of Internet
Social Surfing through E-banking networking internet
E-mail
E-commerce (E-shopping)
E-booking
Topical Practice Questions All the exam questions of this chapter have been divided into 3 topics as listed below Topic 1
—
BASICS OF COMMUNICATION SYSTEM AND OPTICAL FIBRE COMMUNICATION
849–851
Topic 2
—
GROUND, SPACE AND SKY WAVE COMMUNICATION
852–855
Topic 3
—
MODULATION AND DEMODULATION
855–857
Topic 1 Basics of Communication System and Optical Fibre Communication 2014 1 Which of the following is not a transducer? (a) Loudspeaker (c) Microphone
[UK PMT]
(b) Amplifier (d) All of these
2 A transducer, in communication system is a device that (a) is a part of the antenna [Kerala CEE] (b) is a combination of a receiver and a transmitter (c) converts audio signals into video signals (d) converts physical variable into corresponding variations in the electrical signal
2013 3 Assertion Endoscopy involves use of optical fibres to study internal organs. Reason Optical fibres are based on phenomenon of total internal reflection. [WB JEE] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. (e) Assertion is incorrect but Reason is correct.
2011 4 The mobile telephones operate typically in the range of (a) 1-100 MHz (c) 1000-2000 MHz (e) 10-1000 kHz
(b) 100-200 MHz (d) 800-950 MHz
[Kerala CEE]
2010 5 1% of 1012 Hz of a satellite link was used for telephony. Find the number of channels (or subscribers) if each channel is 8 kHz. [BVP] (a) 2.5 ´ 107 (b) 1.25 ´ 107 (c) 2.5 ´ 108 (d) 1.25 ´ 106
6 A radio transmitter radiated 1 kW power at a wavelength 198.6 m. How many photons does it emit per second? [Manipal]
(a) 1010
(b) 1020
(c) 1030
(d) 1040
7 An optical fibre communication system works on a wavelength of 1.3 mm. The number of subscribers it can feed, if a channel requires 20 kHz are [Haryana PMT] (a) 2.3 ´ 1010 (b) 1.15 ´ 1010 (c) 1 ´ 105 (d) None of these
8 In a point to point communication mode, communication takes place over a link between [Manipal] (a) transmitter and channel (b) channel and transmitter (c) transmitter and receiver (d) channel and receiver 9 Pick up the correct statements about optical fibres from the following. [Guj CET] S1 : Optical fibres are used for the transmission of optical signals only. S2 : Optical fibres are used for transmitting and receiving electrical signals. S3 : The intensity of light signals sent through optical fibres suffer very small loss. S4 : Optical fibres effectively employ the principle of multiple total internal reflections. S5 : Optical fibres are glass fibres coated with a thin layer of a material with lower refractive index. (a) S1 and S2 (b) S2 and S3 (c) S3 and S4 (d) S1, S3, S4 and S5 10 Which one of the following is a full duplex transmission system? [Guj CET] (a) TV (b) Radio (c) Telephone (d) Walky-talky (wireless used in the Army) 2009 11 The frequency of audio analog signals lies in the range of [Guj CET]
(a) 20 kHz to 20 MHz (c) 20 Hz to 20 MHz
(b) 12 Hz to 20 MHz (d) 20 Hz to 20 kHz
2008 12 Consider telecommunication through optical fibres. Which of the following statements is not true? [RPMT] (a) Optical fibres can be of graded refractive index. (b) Optical fibres are subjected to electromagnetic interference from outside. (c) Optical fibres have extremely low transmission loss. (d) Optical fibres may have homogeneous core with a suitable cladding.
13 What happen, if the bandwidth is large enough to accommodate a few harmonics? [RPMT] (a) The information is not lost (b) The rectangular signal is more or less recovered (c) Both (a) and (b) (d) None of the above
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
14 Advantages of optical fibre communications over two wire transmission line or coaxial cable transmission are (a) low bandwidth, low transmission loss [Guj CET] (b) high bandwidth, high transmission loss (c) high bandwidth, low transmission loss (d) low bandwidth, high transmission loss
2007 15 Identify the parts X and Y in the block diagram of a generalised communication system.
[J & K CET]
17 The cladding material of optical fibre has refractive index (a) greater than that of core (b) infinity [J&K CET] (c) equal to that of core (d) less than that of core 18 The glass of optical fibre has refractive index 1.55 and is clad with another glass of refractive index 1.51. When the surrounding is air, the numerical aperture will be [Guj CET] (a) 0.625 (b) 0.350 (c) 0.528 (d) 0.704
2006 19 Assertion In optical fibre, the diameter of the core is kept small. Reason This smaller diameter of the core ensures that the fibre should have incident angle more than the critical angle required for total internal reflection. [AIIMS] (a) Both Assertion and Reason are true and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
Communication system Information Message source signal
Transmitted signal
X
Channel Noise
Received signal
Message signal
Y
(a) channel, transmitter (c) receiver, channel
User of information
(b) transmitter, receiver (d) receiver, transmitter
16 Assertion Optical fibre communication has immunity to cross-talk. Reason Optical interference between fibres is zero. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2005 20 What should be the maximum acceptance angle at the air-core interface of an optical fibre, if n1 and n 2 are the refractive indices of the core and the cladding respectively? [AIIMS] (a) sin -1 ( n 2 / n1 ) (b) sin -1 n12 - n 22 é n ù (c) ê tan -1 2 ú n1 û ë
é n ù (d) ê tan -1 1 ú n 2û ë
Answers 1 (b)
2 (d)
3 (a)
4 (d)
5 (d)
6 (c)
7 (b)
8 (c)
9 (d)
10 (c)
11 (d)
12 (b)
13 (c)
14 (c)
15 (b)
16 (a)
17 (d)
18 (b)
19 (a)
20 (b)
Explanations 1 (b) Transducers are devices which are used to convert one form of energy (disturbance) to other form of energy, e.g. loudspeaker converts electrical energy to sound energy (mechanical vibrations). In a microphone, a series of energy conversions occurs in reverse order. One form of energy
Transducer
Another form of energy
Amplifier is a device which increases (amplifies) the amplitude of a signal.
In this, the nature of the signal in output and input remains same. Amplifier Input (electrical)
Output (electrical)
2 (d) Transducer is a device that converts variations in a physical quantity such as pressure or brightness into an electrical signal or vice-versa.
3 (a) Endoscopy is process for viewing internal organs of human body. This device uses optical fibres, which works on the principle of total internal reflection.
4 (d) The mobile telephones operate typically in the range of 800-950 MHz.
5 (d) Given, 1% of 1012 Hz = 1010 Hz Now, number of channels Total bandwidth = Bandwidth per channel Þ Number of channels =
1010 8 ´ 103
= 1.25 ´ 106
(given)
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COMMUNICATION SYSTEM
6 (c) Given, P = 1 kW = 1000 W and l = 198.6 m Number of photons emitted per second P P Pl n= = = E hn hc =
1000 ´ 198.6 = 1030 6.6 ´ 10-34 ´ 3 ´ 108
7 (b) Given, l = 1.3 mm = 1.3 ´ 10-6 m Optical source frequency, 8
f =
c 3 ´ 10 = l 1.3 ´ 10-6
= 2 .3 ´ 1014 Hz \ Number of channels, n=
2.3 ´1014 20 ´ 103
= 1.15 ´ 10
10
8 (c) In a point-to-point communication mode, communication takes place over a link between a transmitter and a receiver. It is also known as peer-to-peer communication.
9 (d) (i) The optical fibres are used to transmit optical signal from one place to another without any practical loss in the intensity of light signal. (ii) Optical fibre is made of a thin glass core surrounded by a layer of material of lower refractive index. (iii) It works on the principle of multiple internal reflection. Hence, statements S1, S3, S4 and S5 are correct.
10 (c) The telephone is a full duplex transmission system, because in it data signal can be transmitted between two stations synchronised in both directions at the same instant of time.
11 (d) We know that, the frequency range of audio analog signals is 20 Hz to 20 kHz.
12 (b) Some of the characteristics of an optical fibre are as follows (i) It work on the principle of total internal reflection. (ii) It consists of core made up of glass/silica/plastic with refractive index n1, which is surrounded by a glass or plastic cladding with refractive index n2 (n1 > n2 ). The refractive index of cladding can be either changing abruptly or gradually changing (graded index fibre). (iii) There is a very little transmission loss through optical fibres. (iv) There is no interference from electric and magnetic fields to the signals through optical fibres. Hence, option (b) is not true.
16 (a) Optical communication is a system by which we transfer the informations over any distance from one location to other through optical range of frequency using optical fibre. The optical interference between fibres is zero. Hence, optical fibre communication has immunity to cross talk.
17 (d) In optical fibre, the core (refractive index m 1 ) is surrounded by cladding (refractive index m 2 ) made up of transparent glass or plastic such that m 2 < m 1.
18 (b) For air, m 0 = 1. Given, m 1 = 155 . and m 2 = 1.51 Numerical aperture =
13 (c) The information is not lost and the rectangular signal is more of less recovered. This is so because the higher the harmonic less is its contribution to the waveform.
14 (c) In optical communication, light is transmitted in the form of light pulses along an optical fibre as transmission medium. Since, wavelength of the light is very small, it provides a very large bandwidth and can carry a huge amount of information. The main merits of optical fibre over two wire transmission line or co-axial cable transmission are that they are quite cheap, very easy to install and less energy loss during transmission. So, the required answer is high bandwidth and low transmission loss.
15 (b) The message signal has to be converted into electrical signal before being sent to the channel. This is done by a transmitter. A transmitter consists of an amplitude modulation, power amplifier and transmitting antenna. Received signal is sent to the receiver which amplifies the signal, detects it and then sends is to the user. So, correct option is (b).
m 21 - m 22 m0
(1.55)2 - (1.51)2 1 = 0.350
=
19 (a) The core diameter of optical fibres is so small (~ 10mm) that the light entering will almost essentially be having incident angle more than the critical angle and will suffer total internal reflection at the core-cladding boundary. The successive total reflections at opposite boundaries will confine the light to the core as shown in figure Light in
fi
Cladding core
Light out
20 (b) The maximum angle of incidence (i) in air for which all the incident light is totally reflected at the interface of a pair of media having refractive indices n1 and n2 is given by i = sin -1 ( n12 - n22 ) This value of the maximum angle of incidence is known as acceptance angle.
Topic 2 Ground, Space and Sky Wave Communication 2019 1 Assertion In ionospheric reflection, phase change does not occur with the radio wave. Reason The ionosphere reflection is similar to the total internal reflection in mirage. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2014 2 The maximum distance upto which TV transmission from a TV tower of height h can be received is proportional to (b) h (a) h1/ 2 [UP CPMT] (d) h 2 (c) h 3/ 2
2011 3 If the TV telecast is to cover a radius of 120 km, then the height of the transmitting antenna is (take, the radius of the earth = 6400 km), [Kerala CEE] (a) 1280 m (b) 1125 m (c) 1560 m (d) 79 m (e) 1050 m
4 What should be minimum length of antenna for efficient transmission of signals of wavelength l? [J&K CET] l l l l (b) (c) (d) (a) 2 3 4 5 5 What fraction of the surface area of the earth can be covered to establish communication by a geo-stationary satellite? [J&K CET] 1 1 1 1 (a) (b) (c) (d) 2 3 4 8 6 A TV tower has a height 150 m. What is the total population covered by the TV tower, if the population density around the TV tower is 103 km -2 ? (Take radius of the earth as 6 .4 ´ 106 m) [J&K CET] (a) 60.288 lakh (b) 40.192 lakh (c) 100 lakh (d) 20.22 lakh 7 A radio wave that travels in a straight line from the transmitting antenna to the receiving antenna is known as (a) sky wave (b) ground wave [J&K CET] (c) space wave (d) ionospheric wave
8 For a radio signal to travel 150 km from the transmitter to a receiving antenna, it takes [DUMET] (a) 5 ´ 10-4 s (b) 4.5 ´ 10-3 s (c) 5 ´ 10-8 s (d) 4.5 ´ 10-6 s
2010 9 The relation between the maximum electron density N max
and the critical frequency f c for the ionosphere can be given as [Guj CET] (a) f c = 9N max (b) f c = 9N max (c) f c = 9 N max
(d) None of these
2008 10 If electron density of the layer of ionosphere is 10 ´ 1011 and k is a constant, then critical frequency for reflection of radio waves is [Kerala CEE] (b) k ´ 1012 Hz (a) k ´ 1018 Hz (d) k ´ 106 Hz (c) k ´ 107 Hz
11 A transmitting antenna of height h and the receiving antenna of height 45 m are separated by a distance of 40 km for satisfactory communication in line-of-sight mode. Then, the value of h is (take, radius of the earth is 6400 km) [Kerala CEE] (a) 15 m (b) 20 m (c) 30 m (d) 25 m (e) 40 m 12 If the critical frequency for sky wave propagation is 12 MHz, then the maximum electron density in the ionosphere is [Kerala CEE] (a) 1.78 ´ 1012 m -3 (b) 0.178 ´ 1010 m -3 (c) 1.12 ´ 1012 m -3 (d) 0.56 ´ 1012 m -3 12 -3 (e) 0.148 ´ 10 m 13 Beyond which frequency, the ionosphere bends any incident electromagnetic radiation but does not reflect it back towards the earth? [AMU] (a) 50 MHz (b) 40 MHz (c) 30 MHz (d) 20 MHz 14 Sky waves are reflected by [DUMET] (a) stratosphere (b) mesosphere (c) ionosphere (d) None of these 15 A TV tower has a height of 75 m. What is the maximum distance upto which this TV transmission can be received? (Take radius of the earth = 6.4 ´ 106 m) (a) 30.98 km (b) 38.98 km [Guj CET] (c) 40.98 km (d) 50.98 km
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COMMUNICATION SYSTEM
16 The sky wave propagation is suitable for radio waves of frequency [Kerala CEE] (a) upto 2 MHz (b) from 2 MHz to 20 MHz (c) from 2 MHz to 30 MHz (d) from 2 MHz to 50 MHz (e) from 2 MHz to 80 MHz
21 The area of the region covered by the TV broadcast by a TV tower of 100 m height is (take, radius of the earth = 6.4 ´ 106 m) [Kerala CEE] (a) 12.8p ´ 108 km 2 (b) 1.28p ´ 103 km 2 (d) 1.28 ´ 103 km 2 (c) 0.644p ´ 103 km 2 (e) 2.56p ´ 103 km 3
17 For sky wave propagation of 10 MHz signal, what should be the maximum electron density in ionosphere? [JCECE] (a) ~ 1.2 ´ 1012 m –3 (b) ~ 106 m -3 (c) ~ 1014 m -3 (d) ~ 1022 m -3
22 Refractive index of ionosphere is [Guj CET] (a) zero (b) more than one (c) less than one (d) one 2005
18 What minimum frequency can be reflected from ionosphere? [JCECE] (a) 2 MHz (b) 6 GHz (c) 5 kHz (d) 500 MHz 2006
23 Audio signal cannot be transmitted, because (a) the signal has more noise [Kerala CEE] (b) the signal cannot be amplified for distance communication (c) the transmitting antenna length is very small to design (d) the transmitting antenna length is very large and impracticable (e) the signal is not a radio signal
19 Assertion Electromagnetic waves with frequencies more than the critical frequency of ionosphere cannot be used for communication using sky wave propagation. Reason The refractive index of the ionosphere becomes very high for frequencies higher than the critical frequency. [AIIMS] (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
24 The region of the atmosphere above troposphere is known as [Punjab PMET] (a) lithosphere (b) upper sphere (c) ionosphere (d) stratosphere 25 If the area to be covered for TV telecast is doubled, then height of transmitting antenna (TV tower) will have to be (a) doubled [J&K CET] (b) halved (c) quadrupled (d) kept unchanged
20 The radio waves which are received after reflection in ionosphere are known as [BHU] (a) surface waves (b) sky waves (c) ground waves (d) space waves
Answers 1 (a) 11 (b) 21 (b)
2 (a) 12 (a) 22 (c)
3 (b) 13 (b) 23 (d)
4 (c) 14 (c) 24 (d)
5 (b) 15 (a) 25 (a)
6 (a) 16 (c)
7 (c) 17 (a)
8 (a) 18 (a)
9 (c) 19 (a)
10 (d) 20 (b)
Explanations 1 (a) The ionosphere reflection is similar to the total internal reflection and also similar to the total internal reflection in mirage. In total internal reflection, there is no phase change after reflection. So, in ionospheric reflection also frequency and phase do not change of the reflected radio wave. Hence, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
2 (a) Consider the diagram, let the receiving antenna is at ground level. Transmitter
h
d Receiver
where, d = maximum distance upto which signals can be received, ht = height of the transmitter, hr = height of the receiver. ~ 6400 km. and R = radius of the earth ~ 0 (for ground level) Let h r
From Eq. (i), we get R
R Earth
The range of an antenna is given by …(i) Þ d = 2R ( ht + hr )
d » 2R ( h ) = 2R (h)1/ 2 Þ
d µh
1/ 2
[Q ht = h ]
(Q 2R = constant)
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
Population covered = 10-3 ´ 2phR
Alternate Method d 2 + R 2 = (R + h)2 (using pythagoras theorem) Þ
2
d + R 2 = R 2 + 2hR + h2 d = h2 + 2hR
Þ
d = h 1+
2R h
~ h 2R = 2hR h d µh
Þ
1/ 2
and R = 6400 km = 6400 ´ 103 m Distance covered by transmitting signal, i.e.
distance radio communication at high frequencies. A radio wave that travels in a straight line from the transmitting antenna to the receiving antenna is known as space wave. -1
v = 3 ´ 10 ms Distance (s) 150 ´ 1000 = \ Time, t = Velocity (v ) 3 ´ 108 -4
= 5 ´ 10
Height of an antenna, i.e. d2 h= 2R
s
We have critical frequency, i.e. fc = k (1012 )1/ 2 = k ´ 106 Hz
11 (b) The situation can be shown as
h
d2 Receiver R
h′
5 (b) We use three geo-stationary satellites placed at the vertices of an equilateral triangle, then the entire surface area of the earth can be covered by the communication network, each satellite covers 1/3 on the globe.
6 (a) Given, height of a tower, i.e. 6
h = 150 m, R = 6.4 ´ 10 m and average population density = 103 km -2 = (103 ) (10–6 ) m -2 = 10-3 m -2 Distance upto which the transmission could be viewed, d = 2hR Total area over which transmission could be viewed = pd 2 = 2phR
Here, total distance travelled by a signal, i.e. d = d1 + d2 = 2hR + 2h¢ R Given, d = 40 km = 40 ´ 103 m \40 ´ 103 = 2 ´ 6400 ´ 103 × ( h + On solving, we get h = 20 m
12 (a) Given, fc = 12 MHz = 12 ´ 106 Hz Critical frequency for sky wave propagation, fc = 9 (N max )1/ 2 \ Maximum electron density, f 2 (12 ´ 106 )2 N max = c = 81 81 12 = 1.78 ´ 10 m -3
and radius of the earth, R = 6.4 ´ 106 m The distance upto which TV transmission can be received,
frequency between 2 MHz to 30 MHz. These waves cannot propagate through the atmosphere but are reflected back by the ionosphere of the earth’s atmosphere. These waves can propagate from transmitter to receiver through sky, therefore their propagation is called sky wave propagation.
By the relation, fc = kN 1/ 2
Transmitter d1
h = 75 m
16 (c) The sky waves are the radio waves of
10 (d) Given, N = 10 ´ 1011 = 1012
= 1125 m 4 (c) For efficient radiation and reception, the height of transmitting and receiving antenna should be comparable to a quarter of wavelength of the signal used. So, for efficient transmission of signals of wavelength l , the minimum length of antenna should be l /4.
which are directed towards the sky and reflected back by the ionosphere towards the desired location on the earth.
= 15 ´ 8 ´ 103 m = 30.98 km
Above fc a wave will penetrate the ionosphere and is not reflected by it.
(120 ´ 1000) 2 ´ 6400 ´ 1000
14 (c) Sky waves are the radio waves
d = 2hR = 2 ´ 75 ´ 6.4 ´ 106
9 (c) If maximum electron density of the fc = 9 (N max )1/ 2.
2
electromagnetic waves of frequency less than 40 MHz but waves does not reflect electromagnetic of frequency more than 40 MHz.
15 (a) Given, height of a TV tower,
8 (a) Velocity of radio wave,
ionosphere is N max per m 3, then
d = 2hR
=
7 (c) Space waves are used for very long
8
3 (b) Given, d = 120 km = 120 ´ 103 m
13 (b) The ionosphere can reflect
= 10-3 ´ 2 ´ 3.14 ´ 150 ´ 6.4 ´ 106 = 60.288 lakh
17 (a) The critical frequency of sky wave undergoing reflection from a layer of atmosphere is fc = 9 (N max )1/ 2 where, N max is electron density (per m 3). fc2 (10 ´ 106 )2 = 81 81 12 = 1.2 ´ 10 m -3
Þ N max =
18 (a) By the ionosphere, the range of 45 )
frequency lying between 2 MHz to 20MHz can be reflected back . The given frequency range waves are the sky waves. So, a minimum of about 2 MHz frequency can be reflected by ionosphere.
19 (a) The sky waves are the radio waves of frequency range between 2 MHz to 20 MHz. The ionosphere reflects these radio waves back to the earth during their propagation through atmosphere.
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COMMUNICATION SYSTEM
The refractive index of ionosphere is less than its free space value, i.e. it behaves as a rarer medium. As we go deep into the ionosphere (electron density N is large), the refractive index keeps on decreasing. If the frequency is too high, then after a certain value, the electron density N may never be so high as to produce enough bending for attainment of critical angle or condition of reflection. This is called critical frequency. For frequencies higher than critical one, the refractive index of the ionosphere becomes very high, so the wave crosses the ionosphere and does not return back to the earth.
20 (b) The radio waves which are received after reflection in ionosphere are called sky waves. Sky waves are used for very long distance radio communication at medium and high frequency (i.e. at medium waves and short waves).
21 (b) Area of broadcast is
A = pd 2 = p (2hR ) Given, h = 100 m and R = 6.4 ´ 106 m Þ A = p (2 ´ 100 ´ 6.4 ´ 106 ) = 1.28p ´ 103 km2
22 (c) Refractive index of ionosphere, m = m0 1 -
24 (d) The stratosphere is the second major layer of the earth’s atmosphere, just above the troposphere and below the mesosphere. It is stratified in temperature, with warmer layers higher up and cooler layers farther down.
25 (a) Area A covered by TV signal is given
80.6N n2
by A = pd 2
where, N is free electron density typically equal to 1011 m -3 and n is frequency of waves in kHz. So, we have m < 1. Hence, refractive index of ionosphere is less than one.
23 (d) Height of antenna is proportional to l / 4, where l is the wavelength of signal. Audio signal have very large wavelength (2-2kHz). So, the height of antenna required would also be very large which is not practicable.
where, d is range given by d = 2Rh where, R is radius of the earth and h is the height of antenna. \ A = p (2Rh) Given, A1 = A , A2 = 2 A \
A1 h1 = A2 h2
Þ
h1 1 = h2 2
Þ h2 = 2h1 Hence, height of transmitting antenna will have to be doubled.
Topic 3 Modulation and Demodulation 2019 1 1 If modulation index m = andVm = 2, thenVC is 2 (a) 4 (b) 2 (c) 6 (d) 8
2011 4 Identify the incorrect statement from the following. [Kerala CEE]
[AIIMS]
2 Assertion Amplitude modulation shows more interference than frequency modulation with noise. [AIIMS] Reason Interference is function of ratio of amplitude of modulation wave with carrier wave. (a) Both Assertion and Reason are correct and Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct, but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
2014 3 If in an amplitude modulated wave, the maximum amplitude is 10 V and the modulation index is (2/3), then the minimum amplitude is (in volt) [EAMCET] (a) 7 (b) 9 (c) 6 (d) 2
(a) AM detection is carried out using a rectifier and an envelope detector. (b) Pulse position denotes the time of rise or fall of the pulse amplitude. (c) Modulation index m is kept ³ 1, to avoid distortion. (d) Facsimile (FAX) scans the contents of the document to create electronic signals. (e) Detection is the process of recovering the modulating signal from the modulated carrier wave.
2009 5 The modulation in which pulse duration varies in accordance with the modulation signal is called (a) PAM (b) PPM (c) PWM (d) PCM (e) PFM
[Kerala CEE]
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CHAPTERWISE & TOPICWISE ~ MEDICAL SOLVED PAPERS
2008 6 A 1000 kHz carrier wave is modulated by an audio signal
For good demodulation of AM signal of carrier frequency f, the value of RC should be 1 1 (a) RC = (b) RC < f f 1 1 (c) RC ³ (d) RC > > f f
of frequency range 100-5000 Hz. Then, the width of the channel in kHz is [Kerala CEE] (a) 10 (b) 20 (c) 30 (d) 40 (e) 50
2007 7 In a detector, output circuit consists of R = 10 kW and C = 100pF. The frequency of carrier signal it can detect is (a) > > 1 MHz (b) 0.1 kHz
[AIIMS]
(d) 103 Hz
(c) > > 1 GHz
8 Assertion A portable AM radio set must be kept horizontal to receive the signals properly. Reason Radio waves are polarised electromagnetic waves. (a) Both Assertion and Reason are correct and [AIIMS] Reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is correct but Reason is incorrect. (d) Both Assertion and Reason are incorrect. 9 Modulation is the process of superimposing [Kerala CEE] (a) low frequency audio signal on high frequency waves (b) low frequency radio signal on low frequency audio waves (c) high frequency radio signal on low frequency audio signal (d) high frequency audio signal on low frequency radio waves (e) low frequency radio signal on high frequency audio waves 2006 10 Given below is a circuit diagram of an AM demodulator.
AM Signal
C
R Output
[AIIMS]
11 Of the following which is preferred modulation scheme for digital communication? [Kerala CEE] (a) Pulse Code Modulation (PCM) (b) Pulse Amplitude Modulation (PAM) (c) Pulse Position Modulation (PPM) (d) Pulse Width Modulation (PWM) (e) Pulse Time Modulation (PTM)
2005 12 In frequency modulation,
[Kerala CEE]
(a) the amplitude of modulated wave varies as frequency of carrier wave (b) the frequency of modulated wave varies as amplitude of modulating wave (c) the amplitude of modulated wave varies as amplitude of carrier wave (d) the frequency of modulated wave varies as frequency of modulating wave (e) the frequency of modulated wave varies as frequency of carrier wave
13 Assertion Transducer in communication system converts electrical signal into a physical quantity. Reason For information signal to be transmitted directly to long distances, modulation is not a necessary process. [AIIMS] (a) Both Assertion and Reason are correct and reason is the correct explanation of Assertion. (b) Both Assertion and Reason are correct but Reason is not the correct explanation of Assertion. (c) Assertion is true but Reason is incorrect. (d) Both Assertion and Reason are incorrect.
Answers 1 (a)
2 (a)
3 (d)
11 (a)
12 (b)
13 (c)
4 (c)
5 (c)
6 (a)
7 (a)
8 (a)
9 (a)
10 (d)
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COMMUNICATION SYSTEM
Explanations 1 2
Amplitude of modulation voltage, Vm = 2 V \ m = m Vc Vm 2 Vc = = =4 \ m 1/2
2 (a) Amplitude modulation has less noise immunity than frequency modulation, hence amplitude modulation shows more interference with noise than frequency modulation. Interference (noise) depends mostly upon ratio of amplitudes of modulation wave and carrier wave and not their frequency ratio. In amplitude modulation, the change in amplitude can actually modulate the signal and be picked up in the AM system. As a result, AM systems are very sensitive to random noise. In FM system, mostly frequency of carrier wave is changed according to the modulating signal, hence noise does not interfere FM signal directly. Therefore, FM systems are far better at rejecting noise than AM systems. Hence, both Assertion and Reason are correct and Reason is the correct explanation of Assertion.
3 (d) Given, modulation index, m = 2/ 3 and Emax = 10 V We know that, E - Emin m = max Emax + Emin Þ Þ Þ or
2 10 - Emin = 3 10 + Emin 20 + 2Emin = 30 - 3Emin 5 Emin = 10 Emin = 10/ 5 = 2 V
4 (c) Modulation index, m cannot be greater than one, i.e. m ³ 1to avoid distortion in a signal is wrong.
5 (c) In Pulse Width Modulation (PWM), the samples of the message signal are used to vary the width or duration of the individual pulse in accordance with the modulating signal.
at the output of the diode as a rectified wave as shown Voltage (V )
6 (a) Given, maximum frequency range, fm(max) = 5000 Hz As we know, width of the channel = 2 fm (max) = 2 ´ 5000 = 10000 Hz = 10 kHz
7 (a) Given, R = 10 kW = 104 W and C = 100 pF = 10-10 F The time constant of the RC circuit, t = RC = 104 ´ 10-10 = 10-6 s For demodulation, 1/ fC > RC 1 or fC >> -6 = 10 6 Hz 10 = 1MHz Therefore, frequency of carrier signal must be much greater than 1 MHz.
8 (a) It is true that the radio waves are polarised electromagnetic waves. The antenna of portable AM radio is sensitive to only magnetic components of electromagnetic waves. On account of this, the set should be put horizontal so that the signals are received properly from radio station.
9 (a) Low frequency audio signal cannot be transmitted as such over long distances. Therefore, to overcome this difficulty, the low frequency audio signal is superposed on a high frequency carrier wave. This process is called modulation.
10 (d) From the modulated signal, we can demodulate or detect the modulating or message signal by using a diode and a suitable capacitor filter. The AM signal given to the input of the circuit appears
Time (t)
For good demodulation of AM signal, the value of RC (which is a time-constant) is chosen such that 1 1 < < RC or RC > > f f where, f is the frequency of the carrier signal or wave
11 (a) Pulse Code Modulation (PCM) is a digital representation of an analog signal where the magnitude of the signal is sampled regularly at uniform intervals, then quantised to a series of symbols in a digital code. 010
100
Voltage (V)
1 (a) Given, modulation index, m =
001 10
Time (t)
12 (b) The phenomenon of superposition of information signal over a high frequency carrier wave such that the frequency of the modulated wave is modified according to amplitude of modulating wave, keeping the amplitude constant is called frequency modulation.
13 (c) In any communication system, information (a physical quantity) is converted into an electrical signal by a device called transducer or vice-versa. Most of the speech or information signal cannot be directly transmitted to long distances. For this, an intermediate step of modulation is necessary in which the information signal is loaded or superimposed on a high frequency wave which acts as a carrier wave.