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English Pages 926 Year 2008
Comprehensive Remedial Mathematics for B. Pharmacy
"This page is Intentionally Left Blank"
Comprehensive Remedial Mathematics for B. Pharmacy
Dr. Shyam Patkar M.Sc. , Ph.D.
Professor & Head
Ramakant Bhardwaj
Sarvesh Agrawal
M.Sc, Ph.D.
M.Se , MPhil.
Truba Institute of Engineering & Information Technology, Bhopal (India)
•
til
..•••• ... _....... . PharmaMed Press ........... -....... :::!!~: An imprint of Pharma Book Syndicate '
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4-4-316, Giriraj Lane, Sultan Bazar, Hyderabad - 500 095 .
Copyright © 2009, by Publisher
All rights reserved. No part of this book or parts thereof may be reproduced, stored in a retrieval system or transmitted in any language or by any means, electronic, mechanical, photocopying, recording or otherwise without the prior written permission of the publishers.
Published by
•
PharmaMed Press •••• ...... .... .. An imprint of Pharma Book Syndicate ....... . · ...... .......... I'II········ .. " ... ... . -~
',
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,
Au {'"print 0/
Ph.,",. Book Syndicate
4-4-316, Giriraj lane, Sultan Bazar, Hyderabad - 500 095. Phone: 040-23445605, 23445688; Fax: 91+40-23445611 E-mail: [email protected] WWIN. pharmamedpress.com/pharmamedpress .net
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ISBN: 978-81-88449-77-6 (HB)
Dedicated to
Our Parents
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Preface Comprehensive Remedial Mathematics for B .. Pharmacy is specially designed for undergraduates.- The authors have evolved this from lecture notes and related material developed while teaching various courses in Remedial Mathematics during the last sixteen years. The authors have given special stress on basic fundamentals, solved examples and oriented problems of various universities in the book. This structure will provide students a platform for building confidence and sharpen their skills in Pharmaceutical Mathematics. The comprehensive edition will surely serve its purpose to help to achieve handsome marks in the examinations. We hope the students and teachers of Mathematics of various universities will appreciate our efforts and receive the book with enthusiasm. We sincerely thank our publishers for their untiring efforts in bringing out this book excellently.
-Authors
(vii)-
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Contents Preface ...................................................................................................... (vii)
Part - A Remedial Mathematics CHAPTER
1
Equations Reducible to Quadratics Equations ................... ..................... 1 CHAPTER
2
Simultaneous Equations ............................... .......................................... 35 CHAPTER
3
Determinants ........... ................................................................................ 51 CHAPTER
4
Matrices ........... ........................................................................................ 89 CHAPTER
5
Mensuration and its Pharmaceutical Applications ................................ 129 CHAPTER
6
Objective and Prerequisite of an Ideal Measure .................................. 147
(ix)
(x)
Contents CHAPTER
7
Trigonometry ......................................................................................... 189 CHAPTER
8
Logarithm .............................................................................................. 226 CHAPTER
9
•
I
Analytical Plane Geometry .................................................................... 251 CHAPTER
10
Calculus ................................................................................................ 287 CHAPTER
11
Differentiation ........................................................................................ 309 CHAPTER
12
Integral Calculus ................................................................................... 372
Part - B Advanced Mathematics CHAPTER
13
Differential Equations of the First Order and First Degree .................. 437 CHAPTER
14
Linear Differential Equations of Higher Order with Constant Coefficients ........................................................................... 501 CHAPTER
15
Simultaneous Linear Differential Equations with Constant Coefficient ............................................................................. 554
(xi)
Contents
CHAPTER
16
Laplace Transforms and its Applications .............................................. 575 CHAPTER
17
Biometrices Errors and Approximations ............................................... 657 CHAPTER
18
Data Organization ................................................................................. 662 CHAPTER
19
Measures of Dispersion ........................................................................ 680 CHAPTER
20
Theory of Probability ............................................................................ 705 CHAPTER
21
Skewness and Kurtosis ........................................................................ 766 CHAPTER
22
Correlation and Regression .................................................................. 779 CHAPTER
23
Method of Least Square ........................................................................ 814 CHAPTER
24
Statistical Inference ............................................................................... 827 CHAPTER
25
Analysis of Variance (Anova) ................................................................ 872 Question Bank .........................................................
L ••• . . . . . . . . . . . . . . . . . . . . . . . . . . . .
885
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Part - A
Remedial Mathematics
"This page is Intentionally Left Blank"
CHAPTER
1 EQUATIONS REDUCIBLE TO QUADRATICS EQUATIONS
Numbers The.numbers 1,2,3 ...
00
are called natural numbers or positive integers.
~ is called afraction where a and b are any two positive integers. b
The number system consisting of positive and negative fractions is called rational
number. The rational number is of the form ~ where a and b are integers and b:;; 0. That b is -4, -2, -1,0, 1,2,3,4 ... are called integers. The number
.fi, .fj,
.J5 ...
which cannot be expressed as a (i.e. ratio of two b integers), are called irrational numbers. The rational numbers, positive and negative, irrational numbers and zero constitute the real number.
Types of Numbers Natural number or N 1,2,3,4, .....
2
Comprehensive Remedial Mathematics for Pharmacy
Real number or R The set of rational and irrational numbers i.e., R = Q numbers.
U
In where Ir denotes the Irrational
Rational number or Q 3
1
1
1
4
2
2
3
..... --,--,0, -, - .....
Primes or P 2,3,5, 7, 11, 13 .....
Composite numbers 4•. 6,8,9,10,12 ..... Even numbers
2, 4, 6, 8, 10, 12 ..... Odd numbers
1,3,5, 7, 9, 11 .....
Complex Numbers The numbers of the form x + iy where i = ~ and a and b are real numbers are called complex numbers.
Useful Formulae
·';(~~·,br = a2iit b~_ . ~ 2~b :' ,~.(a -:>p)2==~t;:~ b2 '~ .2~;:\?':1\J~
';.;1-£a ,i bf + (a'- bi
=' 2a , +'2b , 2
- ' (a + biiT'% (a-'bi = 4ab i , .
=l
81l- 18y + 1 = 0 9y .(9y - 1) - 1 (9y - 1) = 0 (9y - 1) (9y - 1) = 0 9y - 1 = 0 or 9y - 1 = 0
1
1
9
9
y= - ory=-
3~ =.!. 9
3 " Hence·
x
or 3x
= .!. 9
x
= T2 or 3 = T2
x=-2 orx =-2 x';-2
Base same then powerequaf
Equations Reduci~le to Quadratics EquCltions
y- 2 + T~ = 10
Problem 2:
Solve
Solution:
The given equation can be written as 2
Y. Let
21
X
3 + T = 10
by exponent rule
..... (1)
x
3 = y, put in equation (1) y. 3 2 + y-l = 10
or
1
9y + - = 10 Y 9/ - lOy + 1 = 0 9/-9y-y+ 1 =0 9y (y - 1) -1 (y - 1) = 0 (9y-l)(y-l) = 0 9y - 1 = 0 and y - I = 0
1
Y = - and y =- 1 9 3~
= -1 9
and 3x = 1
x=-2 and x= 0 Hence
Problem 3:
x = 0,-2
Solve for x (x+ 1)(x+2)(x+3)(x+4)+ 1 =0
... Type - V
[(x + l)(x + 2)] [(x +.3)(x + 4)] + 1 = 0
Solution:
[x 2 + 2x + x + 2] [x 2 + 4x + 3x + 12] + 1 = 0 (x2 + 3x + 12)(x2 + 7x + 12) + 1 = 0 Which is not similar, so the given equation can be written as [(x + l)(x + 4)] [(x + 2)(x + 3)] + 1 = 0
,
Let
.
,
(x- + 5x + 4) (x- + 5x + 6) + I = 0 x2 + 5x = y, put in (1) ~
./
(y +4)(y+ 6)+ 1 =0
y2 + 4y + 6y + 24 + 1 = 0
y2 + lOy + 25
= 0
..... (1)
22
Comprehensive Remedial Mathematics for Pharmacy
l
+ 5y + 5y + 25 = 0
y (y + 5) + 5 (y + 5) = 0 (y + 5)(y + 5) = 0 (y+ 5/ = 0
.: x2 + 5x = y
Y= - 5 Now
x 2 + 5x = - 5 x2 + 5x + 5 = 0
-5±~25-4(1)(5)
-5±.Js
2 (1)
2
x=--~---
Problem 4:
Solve
Solution:
Suppose
..... (1)
~3x2_4x-6 =y so that 3x2 - 4x - 6 = y2 and so 3x2 - 4x = y2 + 6, putting these values in (1) y+l+6=18 l+y-12=O y2 + 4y - 3y - 12 = 0
Y (y + 4) - 3 (y + 4) = 0 (y - 3)(y + 4) = 0
Y - 3 = 0 and y + 4 = 0 Y = 3 andy=-4
~3X2 -4x-6 =3
and
squaring the both sides 3x2 -4x-6 = 9
and
3x2 - 4x - 15 = 0
and
3x2 - 9x + 5x - 15 = 0
and
3x(x - 3) + 5(x - 3) = 0 and
3x2 - 4x - 6 = 16 3x2 - 4x - 22 = 0 x=
4±~(-4)2 -4(3)(-22) 2(3)
x=
4 ± "'16 + 264 6
Equations Reducible to Quadratics Equations
(x - 3)(3x + 5) = 0
and
-5
x=3 andx=3
x=
x=
4 ± -J280
6 4 ± -J4 x 70 2x3
2±J70 3
. set IS . { 3, -5, 2+J70 , 2-J70} . :. The solutIOn 333
Problem 5:
Solve J(x 2 + 5x + 1) -1 = 2x
Solution:
We have J(x 2 + 5x + 1) = 2x + 1, squaring both the sides.
... Type-VI
x2 + 5x + 1 = 4x2 + 1 + 4x - 3x2 + X = 0 3x2 -x = 0 x(3x-l)=0 x = 0, 3x-1 = 0
1
x= 0 orx=3
Hence the solution set{ 0,
Problem 6:
-J 4 -
Solution:
The given equation can be written as
x +
-J9 + x
k}
-J9 + x
= 5
= 5-
-J 4 -
x , squaring the both sides
9 + x = 25 + 4 - x - 2 (5) -J 4 - x 2x - 20 = -1O-J4- x 2 (x-1O)=-1O-J4-x x - 10 = - 5 2
-J 4 -
x , squaring the both sides
x + 100 - 20x = 25 (4 - x)
23
2-4
Comprehensive Rehiedial Mathernatic:s for Phannacy x2 + 100 -:- 20x = 100 - 25x
x2 + 5x = 0 x (x + 5) = 0
x= 0, x=-5 Hence th:e-solution set {a, - 5}
Problem 7:
x (2x + l)(x - 2)(2x - 3) = 63
Solution:
The given equation can be written as (x+O)
(x+!J(X-2)(x-~1 2 -: 2)
=63 4
Therefore taking together first and fourth and second and third factors, we get {x( x-%J} {(
x+~J(X-2)} =61
(X2 -%x J (X2 -%X-l) Putting
=
61
..... (A)
2 x - %x = y, put in (A) y(y-l)=
463
4y2 - 4y - 63 = 0
41 -18y + 14y~-63 ='0' 2y(2y~,9)+7
(2y-9)=fr .
(2y - 9) Oy + 7)'= 0
9 2
-7 2
y= - ory=-
9 Now, when y = 2 .._ r 2 '3x'~ 9"-' Then x ----
2
2
"
-,
,
' ",
-;~,. ~ ,
{:
,Equations Reducible to Quadratics Equations
25-,
2x1 - 3x- 9 = 0 2Xl - 6x + 3x - 9 = 0 2x (x - 3) + 3 (x - 3) = 0 (x - 3)(2x + 3) = 0 .., x= 3 orx=-J
2
Again, When
-7
y=2 2 3 x - -x
Then
-7
=-
2
2
2x" - 3x + 7 =,0
..... (B)
Its discriminant = b2 - 4ac
=(-3i-4
x
2
x
7
=-47 < 0 :. Equation (B) has no teal roots. Hence real roots the given equation are 3; - 3 2 3 :. solution set {3, -2 }
~5X2
- 6x + 8 - .JSx 2 - 6x -7 = 1
Problem 6:
Solve
Solution:
LetA= .J5x l -6x+8 ,B = .J5x 2 -6x-7 then
A-B=l
.... Oi)
A2 - B2 = 15
..... (iii)
Dividing (iii) by (ii) A + B = 15 then A
... Type VI
=8 . .J5x 2 -6x+.&
=
8
26
Comprehensive Remedial Mathematics for Pharmacy Squaring the both sides
5x2 - 6x + 8 = 64 5x2 - 6x - 56 = 0 5x2 - 20x + 14x - 56 = 0 5x(x - 4) + 14(x - 4) = 0 (x-4)(5x+ 14)=0 -14 x=4 or x=-5 -14) :. Solution set = ( 4, -5-
Problem 1.4 1.
x+2 x-2
x-2 x+2
5 6
-----=-
ADS:
(
2 -5 , 10)
2. 2X4 + 9x3 + 8x2 + 9x +2 = 0 ADS:
(-2+F3,-2-J3)
ADS:
(-.J2,.J2) imaginary
ADS:
(-1, 1)
A DS.. [2 " _! 5+J41 ,5-J41j --2 4 4
Equations Reducible to Quadratics Equations 7.
27
(x+ l)(x+2)(x-5)(x-6)= 144 ADs: (2. 7, -3)
9 16
8. x( x + 1)( x + 2)( x + 3) = -
Ans: 9.
(_~, -3 +
JiO, -JiOj
-3 222
x 2 +6X+2~X2 +6x =24 ADs: (2. -8, -3 + 3.J5 . -3 - 3.J5)
10.
~3X2 +7x-l +~3X2 +7x-l0 =9 ADs: (2,- 1:)
11.
~2y+8 = 20-y ADs: (14)
12.
~4x2+x-2=12x-l ADs:
(~)
13. (2x-l) = ~3X2_2
ADs: (1,3) 14.
.J3x+l0 +.J6-x =6 ADs: (2. 5)
15.
.Jx+5 +.Jx+21 =.J6x+40 ADs: (4)
Solution of Word Problems involving Quadratic Equations We consider such word problems in the examples given below. Example 1:
The product of Ramu's age (in years) five years ago with age 9 years later is 15. Find Ramu's present age.
Solution:
Let Ramu's present age = x His age 5 years ago = x - 5
28
Comprehensive Remedial Mathematics for Pharmacy His age 9 years later = x + 9 According to the problem Therefore (x - 5) (x + 9) = 15 x 2 + 4x - 45 = 15 i.e.,
x 2 + 4x - 60 = ,0
Solving
x 2 + lOx - 6x - 60 = 0 x( x + 10) - 6( x + 10) = 0 (x - 6) (x + 1'0) = 0
x=-10
x= 6 or
Since x is the present age of Ramu, it cannot be negative. Therefore, we reject the solution x = -10. Thus Ramu's present age is 6 years (check - Ramu's age 5 years ago
= 6 - 5 = 1 year
Ramu's age 9 years later = 15 years Their product = 15; as ~equired in the problem
Example 2:
Find two natural numbers which differ by 3 and whose squares' have the sum 117. ', ;
Solution:
Let the larger of the two numbers be x Then the other number''''' 5c - 3 Sum of their squares = 117 x-, + (x - 3y = ,117
"
2x" - 6x - 108 ~
~
~.
"r"'"
Divlding both sides 'by -2, ' ,
•
'.
,
r
=0 '
x 2 -3x-54=0 x 2 - 9x + 6x - 54 x(x - 9) + 6(x -
=0 9) = 0
(x - 9)(x + 6) = 0
The solution of this quadratic are x = 9 or x =--6
Equations Reducible to Quadratics Equations
29
Since x must be natural number. it cannot be negative and so we reject the solution x = -6 Therefore x = 9 Therefore. the larger number = 9 The other number = x - 3 = 6 ,
,
,
'
Therefore, the numbers required are 6 and 9.
Check: Sum of their squares = 36 + 81 = 117 as required and they differ bY,3 ...
Example 3:
The product of tWo successive mUltiples of 5 multipliers. .
Solution:
Let the two required numbers be 5x and 5(x + I)
IS
300. Determine the
According to the problem Sx
x
S(x + 1) = 300
x(x + I) = 12
x2 + x -12 = 0 (x-3)(x+4)=0 x-3=0
x=3
x+4=0
x = -4 which is rejected as -4
Thus, the numbers are S x 3. 5(3
+1)
i.e., 15,20.
Example 4:
Divide 16 into two parts su\:h that twice the square of the larger part exceeds the square of the smaller part by 164.
Solution:
Let the larger part be x So the smaller part
is
0< x < 16
16 - x
According to the problem
2(xi = (16 -
X)2
+ 164
2X2 = 25~ - 32x + x 2 + 164
x2 + 32x - 420 = 0 x 2 + 42x - lOx - 420 = 0 (x + 42)(x - 10) = 0 x=-42
or
x = 10
30
Comprehensive Remedial Mathematics for Pharmacy But x = -42 does not satisfy 0 < x < 16 so it is rejected . .". X =
10, which is the largest part
.". smaller part = 16 - 10 = 6
Example 5:
A fast ~rain 3 hours less than a slow train for a journey of 600 km. If the speed of the slow train is 10 kmlhr less than that of the fast train, find the speed of two trains.
Solution:
Let the speed of fast train = x kmlhr Then the speed of slow train = (x - 10) kmlhr Time taken for journey of 600 km by fast train = -600 h ours
(T· distance) .: lme =-speed
x
And time taken for journey of 600 km by slow train 600
= - - hours
x-10 Since the fast train takes 3 hours less than the slow train 600 x
=
600 -3 x-l0
600(x - 10) = 600x - 3x(x -10) 600x - 6000 3x x
2
2 -
-
(Multiplying by x(x - 3)
2
= 600x - 3x + 30x
30x - 6000 lOx - 2000
=0
=0
(x - 50) (x + 40) = 0 x = 50 or
x = -40
Rejecting x = -40, as the speed of train cannot be negative . .". speed of fast train = x = 50 kmlhr Speed of slow train
= x-I 0 = 40 kmlhr
Example 6:
A motor-boat whose speed is 15 km/hr in still water goes 30 km downstream and comes back in a total of 4 hours 30 minutes. Determine the speed of water.
Solution:
Let x km/hr be the speed of water. The speed of motor boat in still water is 15 kmlhr
Equations Reducible to Quadratics Equations
----------------------------~
31
Therefore, its speed downstream is (IS + x) kmlhr and the speed upstream is (IS - x) kmlhr Time taken for going 30 km downstream = Time taken for going 30 km upstream =
~ IS + x
~ IS - x
hours
hours
Since the total time is given to be 4 hours 30 minutes i.e.,
.2. 2
hours
30 30 9 - - + - - = - hours IS+x IS-x 2 30(lS-x)+30(IS+x) 9 = (1S + x)(IS - x) 2
900
9
22S-X2
2
1800 = 9 (22S - x2) 200 = 22S - x2 x2 = 2S x = S or x =-S
[.,' X
:t= -S as x > 0]
x=S Hence the speed of water = S kmlhr. Example 7:
The hypotenuse of a right triangle is 1m less than twice the shortest side. If the third side is 1 m more than the shortest side, find the sides of the triangle.
Solution:
Let x m be the shortest side of the right triangle
= (2x - l)m and third side = (x + l)m.
then hypotenuse
using pythagorus theorem
(2x - Ii = x2 + (x + 1)2 4x2 - 4x + 1 = x2 + x2 + 2x + 1 2X2 - 6x = 0 2x (x- 3) = 0
,32
CQmprehensiveRemedial Mathematics for Pharmacy x = 0 or x := 3 but x ~ 0 m is in inadmissible as x is the length of a side. Thus x = 3 m is the length of the shortest side of the triangle . ... Length of hypotenuse = 2x - 1 =2x3-1=5riJ. Length of third side
=x+l=4m , ,
ExampleS:
The sides (in cm) of a right triangle containing the right angle are 5x and 3x - 1. If the area of the triangle IS 60 C1112 , find 'the sides' of the triangle.
Solution:
Given that area of right triangle ABC = 60 cm2 A ~
0,
r x
r')
L -_ _ _ _ _ _ _ _ _ _ _ _
~~
B x+a+b+c
b
x+a+b+c
=0
Taking (x + a + b + c) common from CI
1
b
c
=>(x+a+b+c) 1 x+b 1 by
R2~
b
c
=0
x+c
Rz-R I andR3 ~ R3-RI
b c =>(x+a+b+c) 0 x
o
0 =0
0 x
on expanding, (x + a + b + c) x 2 = 0 Z X =
Hence
0
x=0
or
x + a + b + c=0
or
x = -(a + b + c)
Applications of Determinants 1. Area of Triangle: If the vertices of a triangle are (Xl, YI) (xz, yz) and (X3, Y3) respectively. Then area of ~ is 1
=-
2
In determinant form
~ = 1. 2
[Xl (yz -Y3) + X/Y3 - YI) + X3(YI - yz)] Xl X2
YI Yz 1
X3
Y3
1
Detenninants
65
Condition for collinearty: Three points A(x\, YI), B(X2' Y2) and C(X3, Y3) are collinear if area of MBC = 0 XI YI i.e. X2 Y2 X3
I 1=0
Y3
2. Crammer's rule: Consider three linear simultaneous equations are alx + bly + CIZ = d l
..... (1)
a2X+ b2y+ C2Z= d2
..... (2)
a3x+ b3Y+C3Z=d3
..... (3)
al If
L\= a 2
bl
ci
dl
b2 c2
III = d 2
a 3 b3 al L\2 = a 2 a3
c3
dl
CI d 2 c2 d 3 c3
bl
ci
b 2 c2
d3
b3
c3
al
bl
dl
L\3 = a 2 b 2 a 3 b3
d2 d3
Then by Crammer's rule, we have L\ L\ L\ x= _I y= _2 Z= _3 (L\;t:O) L\' L\' ,1'
Case I
If L\ ;t: 0, then, in this case the given system of equations is called consistent and has unique solution.
Case II
If L\ = 0 and any of L\\, L\2, L\3 is non zero, then, the given system of equation is inconsistent i.e., it has no solution.
Caselli
If L\ = 0 and all of L\\, L\2, L\3 are zero. Then given system of equation is consistent and has infinite number of solutions.
Case IV
In case of linear equation of two variables i.e., alx + bly = CI and a2X + b2y = C2. Then
bll
b
2
I
66
Comprehensive Remedial Mathematics for Phannacy
Example 14: Find the area of the triangle with vertices (-2, -3), (3, 2), (-1, -8)
Solution:
Area of
~=
Xl Yl 1 - X2 Y2 2 X3 Y3 -2
1 -2 =
-3 2 1
3 -1
1
-8
2. [-2 (2 + 8) + 3 (3 + 1) +1(-24 + 2)] 2
1 [-20+12-22] 2
=-
1 =2
x
(-30) = -15 = 15
Example 15: Show that the following points are collinear: A(b, c + a), B(c, a + b), C(a,b+c) Solution:
b 1 Area of MBC = - c 2 a By
C2
~
~=
c+a
1
a+b 1 b+c
1
C2 +Cl
b c+a+b 1 1 - c a+b+c 1 2 a a+b+c 1
Taking (a + b + c) common from C2 b 1 1 1 ~=-(a+b+c)c 1 1 2 all ~
=0
(by identical property)
Since area of MBC is zero, then points are collinear.
Detenninants
Example 16: Solve the following equation with the help of detenninants. x-3y+ z= 2 3x+y+z= 6 5x +y+ 3z= 3
-3 Solution:
Let
~=
3
1
5
3
= 1(3 - 1) + 3 (9 - 5) + 1(3 - 5) = 2 + 12 - 2 = 12 ~I
2 -3 1 = 6 1 1 313 = 2(3 - 1) + 3 (18 - 3) + 1(6 - 3) = 4 + 45 + 3 = 52 2
~2
=
3 6 1 533
= 1(18 - 3) -2(9 - 5) + 1(9 - 30) =15-8-21 =-14
1 -3 2 ~3 = 3 6
5
3
= 1(3 - 6) +3(9 - 30) +2(3 - 5)
= -3 -63 -4 = -70 ~
52 13 =- =~ 12 3 ~ -14 -7 y=_2=_=_ ~ 12 6 ~ -70 -35 z= _3 = _ = _ ~ 12 6
By Crammer's rule, x =
_I
67
68
Comprehensive Remedial Mathematics for Pharmacy
Example 17: Solve the system of equations using Cramer's rule 2x + y-z= 3 x + 2y + 2z=4 x+y+z=2
2 Solution:
Let
~=
1 -1 2
2
=2(2-2)-1 (1-2)-1(1-2) =0+1+1=2
3 ~l
-1
= 4 2
2
2 = 3(2 - 2) -1(4 - 4) -1(4 - 4) =0-0-0=0
2 3 -1 ~2
=
1 4
2
1 2
1
=2(4-4)-3(1-2)-1(2-4) =0+3+2=5
2 ~3
=
1 3 2 4
112 =2(4-4)-1(2-4)+3 (1-2) =0+2-3=-1
x=~=O ~
y=
~
_2
~
z = ~3 ~
5 =_ 2
=.::.! 2
Detenninants
69
Example 18: Solve 2x ~ 3y + z = 1, x + Y + Z = 2, 3x - 4z -17 = 0 by using Crammer's rule. Solution:
Given equations are 2x- 3y + Z = 1 x+y+z=2 3x- 4z = 17
2 -3 ~
= 1 3
1
1
0-4
= 2(-4) +3(-4 -3) + 1(-3) =-8-21-3 =-32 1 -3 1 ~l
= 2 17
0
-4
= 1(-4) + 3 (-8 - 17) + 1(-1 7) = -4 -75 -17 = -96 ~2 =
2
1
1
1
2
1
3 17 -4 = 2(-8 -17) -1(-4 -3) +1(17 - 6)
= -50 + 7 + 11 = -32 2 -3 Ll3
= 1 3
1
1 2 0 17
= 2(17) +3(17 - 6) + 1(-3) = 34 + 33 - 3 = 64 x= ~= -96 =3 ~ -32
y=~2=-32=1 ~
-32
~3 64 z=-=-=-2 ~ -32
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Comprehensive Remedial Mathematics for Pharmacy
Example 19: Solve the equation using Crammer's rule' x+y+z=1 2x-y + z= 2 x + 2y+ 2z=3 1
Solution:
d= 2 -1
1
1
2 2
= 1(-2 -2) -1(4 - 1) + 1(4 + 1) =-4-3 + 5 =-2 1
dl
= 2 -1 1 3
2 2
= 1(-2 -2) -1 (4 - 3) + 1(4 +3) =-4-1+7=2 1 1 d2
=
2
2
132 = 1 (4-3)-1 (4-1)+1 (6-2) =1-3+4=2
1 d3
=
1
2 -1 2 123
= 1(-3 -4) -1(6 -2) + 1(4 + 1) =-7-4+5=-6 x=
~=~=-1 d
y= d 2
d
-2
=~=-1 -2
z= d 3 = -6 =3
d
-2
Detenninants
Example 20: Solve the system of equations using Cramer's rule 2y-3z= 0 x + 3y=-4 3x +4y= 3 Solution:
Let
0 2 -3 A= 1 3 0 3 4 0 =0-2(0)-3(4-9)
= 15
o Al
2 -3
= -4 3
0 340
= 0 -2(0) -3(-16 - 9) = 75
o
0-3
A2 = 1 -4
0
3
0
3
= 0-0-3 (3 + 12) =-45 020 A3 = 1 3 -4 3 4 3 = 0 - 2 (3 + 12) + 0 = -30 x= ~= 75 =5 A 15 y=
-45 =-=-3 A 15
A
_2
z= A3 = -30 =-2 A 15
71
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Comprehensive Remedial Mathematics for Pharmacy
Some Practice Questions
Example 1:
Evaluate
Solution:
By
265 240 219 240 225 198 219 198 181
~=
=
25 21 219 15 27 198 21 17 1.81
4 21 9 -12 27 -72 4
by
R2~
17
11
R2 + 3R1 and R3~ R3-Rl
21 9 0 90 -45 o -4 2 4
=
=4190 -
-4
45
1
2
= 4(90 x 2 - 45 x 4) = 4(180 - 180) = 0
Example 2:
Evaluate
I: ::: - : :
Solution:
Let
u
A
~:I
--Ia - ib - c + idl c+id a+ ib
= (a - ib) (a + ib) - (-c + id) (c + id) = a2 _ i2 b2 _ (i2 d2 _ c2) = a2 + b2 _ (--d2 _ c2) = a2 + b2 + c2 + d 2
(": i2 = -1)
Determinants
73
!I
I~
Example 3:
Find all the co-factors of
Solution:
Co-factor Cll = (_1)1+1,4 = 4 Cl2 = (_1)1+2, 1 =-1 C21 = (_1)2+1,2 =-2
= (-li+ 2, 3 = 3
Cn
Example 4:
60
12
8
Show that 35
21
4 =0
9
2
17
= 60(21
Solution:
x
2-9
x
4)-12(35
x
2-17
x
4)+8 (35
x
9-21
= 60 x (42 - 36) -12 (70 - 68) +8 (315 - 357) = 60
6 - 12
x
2+8
x
x
(-42)
= 360 - 24 - 336 = 360 - 360 = 0
Example 5:
Prove that w
w Solution:
By
CI
w2
= 0, where w is a cube root of unity,
2
w
~
CI + C2 + C3
1+W+W2 d= 1+w+w2 l+w +w2 W w2 = 0 w2 1 0
0 d=O
1
w
W w2 w2 1 1
w
x
17)
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Comprehensive Remedial Mathematics for Pharmacy
Example 6:
Solution:
Evaluate
a-b
b-c
c-a
b- c
c- a
a- b
c-a
a-b
b-c
Apply
000 ~=
b-c
c-a
a-b
c-a a-b
b-c
~=O
Example 7:
Solution:
"b+c
a
a
b
c+a
b
c
c
a+b
Prove that
Applying Rl
~
Rl - R2 - R3, we get
o ~=
=4abc
-2c
-2b
b c+a
b
c
c a+b
b I-2bIb c+al = 2c b c c Ic a+b
On expanding
= 2c[b(a + b) -bc] -2b [bc - c(c + a)] = 2c[ab + b2- bc] -2b [bc - c2 -ac] = 2abc + 2b2c - 2bc2 -2b2c + 2bc2 + 2abc =4abc
Example 8:
x+A. Show that x x
Solution:
Applying Cl
~
x x+A.
x x
x
x+A.
Cl + C2 + C3
3x+A. ~=
= A.2(3x + A.)
x
3x+A. x+A. 3x+A.
x
x x x+A.
Determinants Taking (3x + A) common from c], we get x
x
= (3x + A) 1 x + A
x
x
1
X+A
x· x
= (3x + A) 0 A 0
o
0 A
11~
~I
On expanding, we get d = (3x + A).
= (3x + A) A2 4
4
Example 9:
Solve the equation 1 -2
=0
x2
1 2x
Solution: 1
o
=>1
-6
o -3 =0 2 x -4
2x-4
on expanding, we get, -6(x2 - 4) +3(2x - 4) = 0 - 6x2 + 24 + 6x - 12 = 0 6x2 - 6x -12 = 0 6(x2 - x -2) = 0 x2-x-2 = 0 x2 -2x + x -2
=0
x(x-2)+I(x-2)=0 (x - 2)(x + 1) = 0 x-2=0
or
x+l=O
x=+2
or
x=-1
75
76
Comprehensive Remedial Mathematics for Pharmacy
1 bc a(b + c) Example 10: Prove the following results 1 ca b( c + a) = 0 1 ab c(a+b)
Solution:
Applying
C2
~ C2
+ C3, we get
1 bc + ab + ac a(b + c) ~ = 1 ca + bc + ba b( c + a) 1 ab+ca+cb c(a+ b) Taking (ab + bc + ca) common from C2, we get 1 1 a(b + c) = (ab + bc + ca) 1 1 b(c+a) 1 1 c(a + b) ( ... by property of identical column) = (ab + bc + ca) x 0 =0
Example 11: Solve the following system of equations x + 3y + 3z = 1,
Solution:
x + 4y + 3z = 0,
From the given equations 1 3 3 ~= 1 4 3 1 3 4 = 1(16 - 9) -3(4 - 3) +3 (3 - 4) =7-3-3=1 ~l
133 = 0 4 3 234 = 1(16 - 9) -3(0 - 6) +3(0 - 8) = 7 + 18 - 24= 1 1 1 3
~2
=
1 0 3 1 2 4
= 1(0 - 6) -1(4 - 3) +3(2 - 0) =-6-1+6=-1
x+ 3y +4z=2
Determinants 1 3 ~3
=
77
1
1 4 0
3 2 = 1(8-0)-3(2-0)+1(3-4) =8-6-1=1 using Crammer's rule ~l
1 1
x=-=~
y=
~ _2 ~
x=1
-1 =_
y=-1
1
~3 1 z=-=~ 1
z=1
Example 12: The total sale (s) in lakhs of rupees of a firm selling two drugs p and q is given by the relationship. s = ap + bq + c Data for the sales of first three months is given:
Months
Total sale
P
q
2
12
2
3
2
13
6
2
3
IS
S
3
U sing determinant method, determine the sales in next months when it sells 4 units of p and S units of q.
Solution:
Given the equation s = ap + bq + c For the one month, s = 12, p= 2, q = 3 ..
2a+3b+c=12
..... (1)
For the second month, s = 13, P = 6, q = 2 6a + 2b + c = 13
..... (2)
For the third month, s = IS, p = S, q = 3 Sa+3b+c=IS
..... (3)
78
Comprehensive Remedial Mathematics for Pharmacy From the given equations, ~=
2 3 6 2 1
5 3 = 2(2 - 3) -3(6 - 5) + 1(18 - 10) =-2-3 + 8 = 3 12 3 1 ~l
=
13 2 1 15 3 1
= 12(2 - 3) -3(13 - 15) + 1(39 - 30) =-12+6+9=3 2 12 1 ~2
= 6 13 1 5 15 1 = 2(13 - 15) -12(6 - 5) + 1(90 - 65)
= -4 -12 2 3 ~3 = 6 2 5 3
+ 25 = 9 12 13 15
= 2(30 - 39) -3(90 - 65) +12(18 - 10) =-18-75 +96=3 Using Cramer's rule
a=
~=l=1
b=
~=2=3
c=
~=l=1
~
~
~
3
3
3
Now, for the next month, if p = 4, q = 5
Determinants Then total sale, s = ap + bq +
79
C
=lx4+3x5+1 =4+15+1 S = 20 lakhs
Example 13: Show that the following system of equations is inconsistent 2x +y = 3, Solution:
4x+2y= 5.
From the given equations d= dl =
I! ~I
=
4 - 4 =0
I~ ~I = 6 - 5 = 1
Here d = 0 but dl *- 0 :. The given system is inconsistent Hence, it has no solutions
Example 14: Solve the system of equations x + 2y = 3 and 4x + 8y
12 using
determinants. Solution:
From given system of equations
d=
I~
!I
=8 - 8 =0
3 dl = 1 12
21 = 24 - 24 = 0 8
d2= 11
31=12-12=0
4 12
Here
d = d 1 = d2 = 0
Therefore, the system is consistent and has infinite number of solutions.
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Comprehensive Remedial Mathematics for Pharmacy
Example 15: Show that the points (8 -1), (4, 7) and (6,3) are collinear Xl YI I Solution:
1 we have, Area of ~ = - x 2 2
Y2
1
X3
Y3
1
8
-1
4
7
1
2 6
3
1
1
==
~
[8(7-3)+1 (4-6)+1(12-42)] 2 1 = - [8 x 4-2-30] 2
1
= - [32 - 32] = 0
2
.
Since, area of triangle is zero, hence the given points are collinear
Example based on the Pharmaceutical Applications of Determinants Example 1:
A mixture is to be made of milk, water and sugar. The three materials contains quantities P, Q, R as shown in table. How to form a mixture which will have 8 gms of P, 5 gms of Q and 7 gms of sugar.
Material
P
Q
R
Milk
1
3
4
Water
2
Sugar
5
2 1
Solve by using Crammer's rule.
Solution:
Let milk is x, water is Y and sugar is z in a mixture. Then we have the equation x + 3y + 4z= 8 2x+y + 2z= 5 5x+y+z= 7
Determinants By using Cramer's rule
134 ~=
2
1 2
5
1 1
= 1(1 =
2) -3(2 - 10) +4(2 - 5)
-1 + 24 -12 = 11 834
~l
== 5 1 2 711
= 8(1 - 2) -3(5 - 14) +4(5 -7) = -8
+ 27 - 8 = 11
184 ~2
= 2 5 2 571
= 1(5 - 14) -8(2 - 10) + 4(14 -25) = -9 + 64 - 44 = 11
1 3 8 ~3
= 2 1 5 5 1 7
= 1(7 - 5) -3(14 - 25) +8(2 - 5)
= 2 + 33 -
24 = 11
x=
~=.!..!.=1
y=
~ _2 ~
~
11
11 =-=1 11
~3 11 z= -=-=1 ~ 11
81
82
Comprehensive Remedial Mathematics for Pharmacy
Example 2:
The monthly expenditure in an Industry for 3 months is given below according to the staff employed ..
Month
Employees
Total monthly Salary
Clerks
Typists
Peons
April
4
2
3
4900
March
3
3
2
4500
Feb
4
3
4
5800
Calculate the salary for each type of staff by using determinant Solution: ,
Let the salary of clerks, typists and peons are a, b, c respectively. Then
4a + 2b + 3c = 4900 3a + 3b + 2c = 4500 4a + 3b + 4c = 5800
By using Cramer's rule 423 il= 3 3
2
434 = 4(12 - 6) -2(12 - 8) +3(9 - 12) = 7 4900 2 3 ill = 4500
3 2
5800 3 4 = 4900(12 - 6) -2(18000 - 11600) +3 (13500 - 17400) =4900 4
4900 3
il2 = 3
4500 2
4
5800 4
= 4(18000 - 11600) -4900(12 - 8)+3 (17400 - 18000) =4200
Determinants 4 ~3
= 3 4
2
4900
3 4500 3
5800
= 4(17400 -13500) -2(17400 - 18000) + 4900(9 - 12) = 2100 a= ~= 4900 =700 ~ 7 b= ~= 4200 =600 ~ 7 c = ~= 2100 =300 ~ 7 :. Salary of clerks, typists and peons are Rs 700, Rs 600, and Rs 300
Exercise 3.1 1
5
1
1. Evaluate 5 2 0 3 0 6
2. Evaluate each of the following determinants. (i)
x+l
x2
2
x-I
..
(n)
Icosecx cotx I (iii) cotx cosecx
31 37 92
3. Evaluate 31
58
71
31
55
74
22 32 4. Evaluate 22 3 2 4 2 3 2 4 2 52 12
I~
_wwl
83
84
Comprehensive Remedial Mathematics for Pharmacy w3 5.
w2
Show that w 3
w x
w
2
-6
= 3, w is the cube root of unity
w 1
6. If = 2x
- 3 3
o
2
= 0, find the value of x. seca
0
7. Show that tan a
-:-seca
tan a
= sec 2a
0
8. If 4
-3
2
-1
2
5 2
3
find the cofactor of elements 1, -3,2 and also find the value of determinant. 9. Find the ratio of the cofactor and minor of 4 in determinant
-8
0 -1
0
4
2
-1
0 ab 2
0
ac 2
10. Show that a 2 b 0 a 2c cb 2 bc
ll. Show that ca ab
12. Prove that
a 1 b 1 c
3 bc 2 = 2a b 3c"
0
,
a2
a3
b b2 = 1 b 2 c c2 c2
b3
a
a-
a
2
bc
b
2
ca =0
c
2
ab
c3
Detenninants b 2 +c 2
ac
ab
bc
13. Prove that
ac
bc
=
a2 + b2
1 a
bc
14. Without expanding, prove that 1 b
ca
1 c
ab
[Hint: multiply RJ, R2, R3 by a, b, c and x
3
7
15. Solve 2
x
2
7
6
x
4a2b2c2
11 a
a
2
b b2
=1
1 c divi~e
c2
by abc]
=0
[Hint: R\ ~ R\ + R2 + R3]
-6
x
-1
16. Show that x = 8 is a root of the equation 2 -3x x-3 and solve it. -3 2x x+2 17.
Solve the following for x. (i)
x+7
3x
3x
x+7
3x
3x
3x 3x =0 x+7
x (ii) 1 b 1 c
x3 b 3 =0 c3
18. Find the value ofx so that the points A(3, -2), B(x, 2) and C(8, 8) lie on a line.
19. Find k so that the points are collinear (3, -2) (k, 2) and (8, 8). 20.
If points (a, 0), (0, b) and (p, q) are collinear, prove that £. + 1 = 1 . a b
21. Solve the following system of linear equations using Cramer's rule: x + 2y + 3z = 6, 2x + 4y + Z = 7 and 3x + 2y + 9z = 14
85
86
Comprehensive Remedial Mathematics for Pharmacy
22. Solve the following system of equations using Cramer's rule: 5x -7y + z = 11, 6x - 8y - z = 15 and 3x + 2y - 6z = 7. 23. Does the following system of equations have a unique solution? x-y+z=-1 3x-y+ 2z= 1 2x + z= 3 24. Find the value of k for which the following system is consistent 2x - y + 3 = 0, kx - y + 1 = 0, 5x - y - 3 =
°
[Hint: solving equations (i) and (ii), we get x = 2, Y = 7 by Cramer's rule and substitute in equation (iii) we get k = 3] 25. (i) Can we add two determinants of order (2 x 3) and (3 x 2) (ii) what about the value of determinant when row and columns are interchanged. 26. By Cramer's rule solve the following system of equations. (i) 3x + y = 19, 3x - y = 23 (ii) x-2y=4,
-3x+5y=-7
27. By Cramer's rule solve the system of equations x + Y = 5, y + z = 3, z + x = 4 28. Solve the following equations using Cramer's rule 4 5 6 8 - - + - - = 3 and - - + - - = 5 x+2 y-l x+2 y-l [Hint Let _1_=a, _1_=b then4a+5b=3,6a+8b=5] x+2 y-l 29. Solve the equations using Cramer's rule 1 3 3 4 -+-=5 and ---=2 x y x y
Determinants a2
(b + C)2
a-J
b2 c-0
(c+a)2
a2
bc
, c- +ac
b2
ac
30. Prove that
= 2abc(a + b + C)3 b2 (a+b)2
c-J
31. Prove that a 2 +ab
b 2 + bc
ab
C
= 4a2b 2c2
J
b+c
c+a
a+b
a
b
c
32.' Prove that q+r
r+p
p+q =2p
q
r
y+z
z+x
x+y
x
y
z
p
33. If a
'#
p, b
'#
b c
q, C '# r, and a
q
c
a
b
r
=0
p q r evaluate - - + - - + - p-a q-b r-c [Hint: by Rl ~ Rl - R2 and R2 ~ R2 - R3 and expanding after divide by (p -q) (q - b) (r- c) we get _p_+_q_+_r_ = 2] p-a q-b r-c
34. If x, y and z are distinct and X
x2
~ = Y y2
1+x3 1 + y3 = 0, then prove that xyz =-1.
abc 35.
Prove that b
c
a
cab
= 3abc -
a 3 - b 3 - c3
87
Comprehensive Remedial Mathematics for Pharmacy
88
Answers 1.
24
2.
(i) -(1 +X2)
3.
0
(ii) 1
(iii) 1
4. -8 6.
0
8.
Cll
9.
1 :-1
= -12, Cl2 = -2,
C\3
= 23, L1 = 40
15.
x = 2, x = 7, x =-9
16.
5/3, 1,2
17.
(i)-1
18.
x=5
19.
5
21.
x=y=z=1
22.
x= l,y=-l,z=-1
23.
No
25.
(i) No
26.
(i) x = 7, Y = -2 (ii) x = -6, y =-5
27.
x = 3, y = 2, z = 1
28.
x=-4, y=2
29.
1 x="2,y=l
2. 2.
, 2' 2
(ii) 0, -1, -12
(ii) same or equal
CHAPTER
4 MATRICES
The theory of matrices came into existence in the nineteenth century as a result of the 'works of mathematician Arthen Cayley. To defme the matrix, we define the following terms. (i) Row:
A horizontal line is called a row. for example a, b, c,
)
(ii) Column: A vertical line is called a column.
Ia,
-l-~ (iii) Array:
A collection of numbers arranged in rows and columns forms an array.
Matrix A collection of mn numbers arranged in the form of an ordered set of m rows and n columns in a rectangular array is called an m x n matrix. Generally we denote the matrix by rectangular [ ] or square brackets ( ), but another way to represent it by IIII
Example: (i) Matrix of order m
A=
x
all a 2l
n. a l2 a 22
a l3 a 23
a ln a 2n
90
Comprehensive Remedial Mathematics for Pharmacy (ii)
Matrix of order 2 B
(iii)
=
x
3
[~ ~ ~l
Matrix of order 3 x 2
It is clear that order of matrix can be written by m number of rows and n is number of columns.
x
n, where m is
Types of Matrices 1.
Row Matrix: It contains one row Example:
2.
A = [1 23]1'3
B = [1, 2, 3, - - - n]lxn
Column Matrix: It contains one column
Example:
A=
r~]
l3
2 B= 3 3xl
n
3.
Zero Matrix or Null Matrix: A matrix whose all elements are zero is called zero matrix. The order of zero matrix can be made as we can. Example:
4.
nxl
A=
r~l lolxI
Square Matrix: A matrix is called square matrix if it has number of rows are equal to number of columns. Example:
A=
fl
L2
1
2 4
J 1
_x~
B= la, bl c
i
a2
3
b2
ab 3 ]
c2
c3
3x3
Matrices Generally we write square matrix of order n, at the place of n
x
91
n square matrix.
Example: square matrix of order 4 is
I~
A~ l~
2 3 4 3
4
5
6
7
8
0
1 2
Note: In every square matrix there are two diagonals. The diagonal which starts from the left hand top comer to end at the right hand bottom comer is called the principal diagonal or 'leading diagonal' i.e. A=
all a 2l
a l2 a 22
a3 a 23
a 3l
In short elements where i =j are formed principal diagonal of square matrix. 5.
Diagonal Matrix: If all the elements of a square matrix are zero except those in the principal diagonal is called a diagonal matrix.
Example
[~ ~J.[~ r ~j
are diagonal matrices. They can also denoted as diagonal (1,2), diagonal (2, 1,5) 6.
Scalar Matrix: A diagonal matrix whose diagonal elements are all equal, is called a scalar matrix.
Example:
7.
2 0 0OJ [o 0 2
A= 0 2
3x3
Unit Matrix: A diagonal matrix is called unit matrix if its principal diagonal elements are 1. It is denoted by In, where n is order of square matrix.
(a)
(b)
12 =
[o1 0] 1
2x2
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Comprehensive Remedial Mathematics for Pharmacy
(c)
[, =
l~
0
1 0
1 0 0 0
~L
(d)
14
1 0 0 0 0 1 0 0
=
0
0
0
1
4x4
Note: For unit matrix in general we can define A = [alJ] = 1 if i = j
o if 8.
i;t: j
Triangular Matrix: If in a square matrix all the elements are above or bellow the principal diagonal are zero, is called a triangular matrix. There are two types of triangular matrix; (b) Lower triangular
( a) upper triangular
(a) Upper triangular: A square matrix having all elements below principal diagonal are zero is called upper triangular matrix.
A=
all 0
a l2
a 13
a 22
a 23
aln a 2n
0
0
a 33
a 3n
0
0
0
ann
it is clear that A = [alJ] = 0 for i > j then A is upper triangular (b) Lower triangular: A square matrix having all the elements above the principal diagonal is zero is called lower triangular matrix.
A=
all
0
0
0
a 2l
a 22
0
0
a 3l
a 32
a 33
0
ann an! a n2 A = [alJ] = 0 for i < j is lower triangular Example of upper and lower triangular matrices. I 2 3 4 1 0 A=
0
3 4
5
0
0
2
3
0
0
0
5
Upper triangular
B=
0
0
2
3 0
0
4
5 6
0
7
8 9 10
Lower triangular
Matrices
9.
93
Equal Matrix: Two matrices A and B are said to be equal matrix if (i)
Their order are exactly same.
(ii) Their corresponding elements are equal.
Example:
A
=
[~
!]
B=[:
:]
A=Bif a=l, b=2, c=3,d=4
10.
Singular Matrix: A square matrix is said to be singular matrix if its corresponding determinant is zero, that is IAI = 0 Example:
[~
!]
(i)
A=
(ii)
A~ r~ :J 2
5
8
11.
Non-singular or Regular or Investigable Matrix: A square matrix is said to be non-singular if its corresponding determinant is not zero i.e. IAI::j:. 0
Example:
A
=
[~
!]
B~r; : :J
Addition and Subtraction of Matrices Two matrices A and B can be added or subtracted if their order are same. If order of matrix A is m x n, order of matrix B is m x n, then order of A ± B is also m x n.
Example:
94
Comprehensive Remedial Mathematics for Pharmacy
Properties of Addition of Matrices If, three matrices A, B, C are given of same order then (i)
A + B = B + A (commutative law)
(ii)
A + (B + C) = (A + B) + C (Associative law)
(iii)
Cancellation law
(iv)
(a) A + B = A + C
~
B = C (left cancellation)
(b) B + A = C + A
~
B = C (Right cancellation)
Additive inverse: For every matrix A, there exists a matrix - A such that A+(-A)=O where A = [a'J]mxn, and -A = [-a'J]mxn then -A is called additive inverse of A.
(v)
Distributive law: IfK is any number then K (A + B) = KA + KB
Multiplication of Two Matrices Two matrices A and B can be multiplied if number of columns in A are equal to number ofrows in B. i.e. [A]myn [B]n
X2 .... Xn respectively. Then the weighted arithmetic mean are W.A.M.= wlxl+w2x2+·····+wnxo =1:wx WI +W2 + ..... +wo 1:w
Objective and Prerequisite of an Ideal Measure
157
Example 7:
The arithmetic mean of 3 sets are 25, 10 and 15 whose corresponding number of observations are 200, 250 and 300. Find the combined mean.
Solution:
Let
XI
= 25,
fl
= 200, f2 = 250, f3 = 300
x2
=10,
X3
=15
· d ant .h · mean = fix i +f2x1- +f3 x 3 metIc T hen com b me fl + f2 + f3 200x 25 + 250x 10+ 300x 15 =
200+ 250+300 5000 + 2500 + 4500
=-------
750
= 12000 =16 750
Example 8:
There are 45 students in a class, of which 15 are girls. The average weight of 15 girls is 45 kg, 30 boys is 52 kg. Find the mean weight in kg, of the entire class.
Solution:
Here
= 15, X2 = 30 WI = 45, W2 = 52
XI
. Mean weight
= w IXI +w 2X2 XI +X2 15 x 45 +30x 52 = 15 +30 = 2235 = 49.67 kg
45
Example 9:
In an industry there are 10 officers, 60 clerks and 400 workers. Their average salaries are Rs. 627, Rs. 230 and Rs.120 respectively. Find the salary of all employees of the industry taken together.
Solution:
Here
= 10, W2 = 60, W3 = 400 XI = 627, X2 = 230, X3 = 120
WI -
W
WIX I +W 2X2 +W3 X3 = ----'---.:.....--=--=--=---=--
=
WI +W 2 +W 3 10x627+60x230+400xI20 10+60+400
= 6270 + 13800 + 48000 = 68070 =144.8 470
470
Rs.
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Comprehensive Remedial Mathematics for Pharmacy
Example 10: Find the average marks of students from the following table. Marks
No. of students
Marks
No. of students
Above 0
80
Above 60
28
Above 10
77
Above 70
16
Above 20
72
Above 80
10
Above 30
65
Above 90
8
Above 40
55
Above 100
0
Above 50
43
Solution: The given data is in the form of more than type cumulative frequency distribution. Let us arrange the marks in groups which may be 0-10, 10-20 .... etc. Now, number of students getting marks above 0 is 80 and above 10 is 77. Hence, number of students getting marks between 0 - 10 is 80 - 77 = 3 and so on. Marks
Mid-value x
f
x-a u=--
x-a
h
fu
0-10
5
80-77 = 3
-50
-5
-15
10-20
15
77-72=5
--40
--4
-20
20 -30
25
72-65 =7
-30
-3
-21
30-40
35
65 - 55 = 10
-20
-2
-20
40-50
45
55-43=12
-10
-1
-12
50-60
55
43 -28 = 15
0
0
0
60-70
65
28 - 16 = 12
10
1
12
70-80
75
16-10=6
20
2
12
80-90
85
10-8=2
30
3
6
90-100
95
8-0=8
40
4
32
Total
N=80
Lfu
Mean=a+h. Here
N
a = 55, h = 10 Mean = 55+ 10x(-26) 80 = 55 -3.25
= 51.75
Eru =-26
Objective and Prerequisite of an Ideal Measure
159
Merits, Demerits and uses of Arithmetic Mean Merits 1. 2. 3. 4. 5. 6. 7.
The arithmetic mean is rigidly defined. It is based on all the observations made. It is easily calculated from the given data. It is determinate i.e., it is not indefinite. It is least affected by fluctuations of sampling. It lends itselfto algebraic treatment. Its general nature is readily comprehensive.
Demerits I. The arithmetic average may not be represented in the actual data. 2. It gives greater importance to bigger items of a given series. 3. It can hardly be located by inspection, mode and median can be. 4. It can ignore any single item only at the risk of losing its accuracy. 5. It may sometimes give fallacious conclusions. 6. It cannot be calculated if the extreme class is open e.g. below 5 or above 70. Uses 1. Arithmetic mean is preferred when the frequency distribution symmetrical. 2. The use of arithmetic mean is recommended when we want a measure of central tendency that have greatest stability. ~ 3. When other constants such as standard deviation, coefficient of correlation are to be computed later on, we use arithmetic mean. 4. It used in case of average output, average imports or exports, average cost of production etc. arithmetic mean is the suitable average.
Geometric Mean (G.M.): Ifx" X2 ...... Xn be the n values of the variate X, none of them being zero, then the geometric mean, G is defined by I
G = (XI , x 2 .... ··x n )-;;log G
•
1
= - (log XI + log X2 + ..... + log xn) n
1 n log G =- Llogx 1 n
G
1=1
= Antilog r..!.. IIOgX Ln
1=1
I ]
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Comprehensive Remedial Mathematics for Pharmacy
If X\, X2 ..... Xn occurs f\, f2 ........ fn times respectively and N is the total frequency then G = Antilog
[~N t
fl log XI]
1=1
Example 11:
Find geometric mean of 4,8, 16 I
Solution:
G = (4x 8x 16)3 I
= (22 X 2 3 X 24 )3 I
= (29)3 =23 = 8
Example 12:
Find geometric mean for the following data 85,70,15,75,500,8,45,250,40,36.
Solution: log x
x
1.9294
85 70
1.8451
15
1.1761
75
1.8751
500
2.6990
8
0.9031
45
1.6532
250
2.3979
40
1.6021 1.5563
36
:Elogx = 17.6373 I
Geometric mean G = (XI x 2....xn)~ 1 log G = -Llogx n 17.6373 Iog G = 10 G
= Antilog (1.76373)
= 58.03
Objective and Prerequisite of an Ideal Measure
Example 13:
161
Find the geometric mean of the following distribution: Marks
0-10
10-20
20- 30
30-40
5
8
3
4
No. of students
Solution: Class
Mid value x
f
log x
0-10
5
5
0.6990
flog x 3.4950
10-20
15
8
1.1761
9.4088
20-30
25
3
1.3979
4.1937
30-40
35
4
1.5541
6.2164
N=20
Total
kflogx = 23.3139
Geometric mean log G = ~Lflogx N 23.3139
=
20
log G = 1.1657 G = Anti log (1.1657)
= 14.64
Merits, Demerits and uses of Geometric Mean Merits 1. 2. 3. 4.
The geometric mean is based on all the observations of a series. It is not much affected by fluctuations of sampling. It lends itself to algebraical treatment. It is the most appropriate average when dealing with ratio.
Demerits 1. 2. 3. 4.
It is not simple to understand. It is comparatively difficult to calculate. It does not give equal weight to every item. It can not be calculated if the number of negative value is odd.
Uses 1. Geometric mean is used to find the relative changes, such as the average rate of population growth, average rate of depreciation of machines etc. 2. It is used in the construction of index numbers.
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Comprehensive Remedial Mathematics for Pharmacy
Harmonic Mean (H.M) : The harmonic mean is the reciprocal of the arithmetic mean of their reciprocals. (i)
For Individual series: Let XI, X2 .... Xn be the n values of variate x. The Harmonic mean denoted by H is given by
n
n
H= 1 1 1 --1 - + - + .... + - LXI x 2 xn X (ii)
For Discrete Series: If XI, X2 ..... Xn have the frequencies flo f2 ..... fn respectively, then Harmonic mean is given by N H=-y, whereN=H
LX
(iii) For Grouped Series: The mid-value are taken as XI, X2 .... Xn with the corresponding frequencies flo f2 .... fn. Then harmonic mean is given by
H=~
Li X
Example 14:
Calculate the harmonic mean of the following: 4,8, 16
Solution:
H.M.
n =-----
1 1 1 -+-+XI x 2 X3
=
3 = 3 =3xI6=48=6.855 1 1 1 4+2+1 7 7 -+-+-
4
Example 15:
8
16
16
Find the harmonic mean of the following frequency distribution: Class Frequency
2-4 20
4-6 40
6-8 30
8-10 10
Objective and Prerequisite of an Ideal Measure
163
Solution: Class
x
f x
1
f
-
-
X
2-4
3
20
0.3333
6.666
4-6
5
40
0.2000
8.000
6-8
7
30
0.1428
4.284
8 -10
9
10
0.1111
1.111
Total
N= 100
L.!:. = 20.061 X
Harmonic mean H =
N f
L-X
=
100 20.061
= 4.985
Merits, Demerits and uses of Harmonic Mean Merits 1. It is based on all the value of observations. 2. It is capable of further algebraic treatment. 3. It is the most appropriate average when calculating the average speed of train, the speed is expressed in kilometers per hour etc. Demerits 1. It is difficult to calculate. 2. It is difficult to understand. 3. It gives a very high weightage to small values. Uses 1. When the frequency distribution highly positively skewed. 2. When we have to find average rates and ratios under certain condition e.g. average price, average speed etc.
Median When the observations are arranged in ascending or descending order of magnitude, then the middle value is called median of these observations. In other words, median is that value of the variable which divides a series into two equal parts so that orie-half or more of the items are equal to or less than it. It is denoted by Md.
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Comprehensive Remedial Mathematics for Pharmacy
Computation of Median 1. Median in Individual Series: Let Xl,
X2 .••. Xn
be the n values of a variate
X
written
in ascending order of magnitude. Then median is given by Median = Value of middle term (a) When n is odd, then median
= n + I th value. 2
(b) When n is even, then median
= ~ {;
th value + (; + 1}h value}
Example 16:
Find the median of the following data 15,35, 18, 19,26,25,20,29,27.
Solution:
Arranging the data in ascending order, we get 15,18,19,20,25,26,27,29,35 Here n = 9, which is an odd number n+ · =me d Ian -1th va Iue 2 9+ 1 = - - th value 2 th = 5 value
Example 17: According to the census of 1981, following are the population figures in thousand, of 10 cities: 2000, 1180, 1785, 1500, 560, 782, 1200,385, 1123,222 Find the median.
Solution:
Arranging the data in ascending order, we get 222,385,560,782, 1123,1180,1200,1500, 1785,2000 Here n = 10, the even number ..
Median =
~[~ th value + (; + 1}h value]
~~[ I~ th VaIUe+e~ +I)" value]
Objective and Prerequisite of an Ideal Measure
165
1
= -. [5 th value + 6th value] 2
=!
[1123 + 1180]
2
2303
.
= - - = 1151.5 thousand
2
2. Median in Discrete Series: Let x\, X2 ...... Xn be the observations in ascending order with corresponding frequencies f\, f2 .... fn respectively. We first find cumulative frequencies. Median is given by the value of n + 1 th term.
2
Example 18: The marks obtained by students of a class are following: Marks
25
24
23
22
21
20
No. of Students
3
5
4
7
3
1- -
Find the median
Solution: Marks
f
Cumulative frequency (c)
25
3
3
24
5
8
23
4
12
22
7
19
21
3
22
20
1
23
Lf=23 ml'd
vaIue =n-+-1 2 23+1
--2
= 12
166
Comprehensive Remedial Mathematics for Pharmacy Median == The value of item against cumulative frequency 12 = 23 Md =23
3. Median in Grouped Series: Median
=
value of N th item, where N is total 2 N frequency. The lowest class for which the cumulative frequency exceeds is 2 called the median class.
Where I = lowest limit of median class f = The frequency of the median class i = width of the median class F = cumulative frequency preceeding the median class N = Total frequency
Example 19:
Find the median for the following distribution:
Wages in Rs
0- \0
10-20
20-30
30-40
40- 50
22
38
46
35
20
No. of workers
Solution: Wages in Rs.
No. of workers f
0- \0
22
Cumulative Frequency (F)
22
10-20
38
60
20- 30
46
\06
30-40
35
141
40-50
20
161
N = 161
Here
N = 161 Median = size of (N; .
1)
item
th th
161+1. . Item = 81 th Items
= size of ( --2- )
Objective and Prerequisite of an Ideal Measure
167
The 81 th item lies in 20 - 30 group. Hence 20 - 30 is the middle class. Then 1= 20, N = 161, F = 60, f = 46, i = 10 N --F Md=/+ _2_-xi f
~-60 =20+-=2_- x10 46 20+ 205 48 = 20 + 4.46 = 24.46
=
Merits, Demerits and uses of Median Merits 1. It is easily understood. 2.
It is very readily calculated and can exactly be located.
3. It is not affected by abnormally large or small values of the variable. 4. It is rigidly defined. 5. It can be determined by mere inspection in a frequency graph. 6. It can be calculated for distribution with open end classes.
Demerits 1. The median does not lend itself to algebraic treatment. 2. It may not be represented by the actual data. 3. In a discrete series it may become indefinite. 4. In case of even number of observations it can not be determined exactly. 5. It does not depend on all the items. Uses Median is suitable in the following situations: 1. When there is an open class at one or both ends of the frequency distribution, provided that the median does not fall in one of those open classes. 2.
When the characteristics like intelligence, honesty etc., cannot be measured numerically but the individual can be ranked in order.
3. When there is suspected heterogeneity. 4.
When the data is concerned with wealth etc.
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Comprehensive Remedial Mathematics for Pharmacy
Mode
The mode is defined to be the size at the variable which occurs most frequently or the point of maximum frequency. In other words, the mode of the distribution is that value of the variable for which frequency is maximum. It is represented by Mo. Method for computing Mode (i)
For Individual series: Mode is found out by observations of the value which occurs mo.st.
Example 20:
Find the mode of the following data. 0, 1,6, 7,2,3, 7, 6, 6,2,6,0,5,6,
Solution: (ii)
°
Since 6 occurs 5 times and no other item occurs 5 or more than 5 times, hence mode is 6.
For Discrete series: Value with the highest frequency is called mode.
Example 21:
Calculate the mode from the following distribution Marks No. of students
Solution:
Here, highest frequency is 40 and therefore mode is 60.
(iii) For grouped series: If there is a single class with maximum frequency, we call this class as mode class and within this class mode is obtained by the formula f-C 1 Xl• M 0-/ - + 2f -C1 -fl Where f = frequency of the mode-class I = lower limit of the mode-class
LI = frequency of pre mode-class fl = frequency of post mode-class i = width of the class interval
Example 22:
Find the mode of the following distribution:
ubjective and Prerequisite of an Ideal Measure
Solution:
169
Here, the greatest frequency 72 lies in the class 21 - 28. Hence, this is the mode-class. Then 1= 21, f= 72, L[ = 36, f[ = 51, i = 7. mode
Mo = I +
f - C[ 2f -L[ -f[
=21+
X
i
72-36 144-36-51
x7
= 21 + 84 19 =
21 + 4.4
= 25.4
Merits, Demerits and Uses of Mode Merits 1. It is easily understood. 2. It can be determined with considerable accuracy from the well selected sample data. 3. It can be very easily determined from the graph. 4. It can be easily located by mere inspection in certain cases. 5. The extreme items have no effect provided they are not in the mode-class. Demerits 1. It is ill-defined. 2. A clearly defined mode does not always exist. 3. It is not based on all the observations of a series. 4. It is not capable of further mathematical treatment. Uses The use of mode is recommended:1. When a quick and approximate measure of central tendency is desired. 2. When frequency distribution is skew. 3. When a typical average size is required in case of readymade garments, shoes etc. Relationship between Mean, Median and Mode 1. In case of a symmetrical distribution, the mean, median and mode coincide with each other. 2. In case of moderately asymmetrical distribution, we use the formula (an empirical relationship) (ii) Mode = 3 Median - 2 Mean (i) Mean - mode = 3 (Mean - Median)
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Comprehensive Remedial Mathematics for Pharmacy
Note
(i)
When the frequencies are higher for the lower classes and smaller for the upper classes. Then relationship is Mean> Median> Mode
(ii)
When the frequencies are smaller for the lower classes and higher for the upper classes then relationship is Mean < Median < Mode
Mean
Median
Mode
Example 23:
For a moderately asymmetrical distribution, the median and mean are 30.2 and 32.4 respectively. Calculate mode.
Solution:
Using empirical formula, Mode = 3 Median - 2 Mean
Example 24:
=
3 x 30.2 - 2 x 32.4
=
90.6-64.8
=
25.8
Find out the Mean, Median and Mode from the following:
I Rs. Less than I No.ofReceivers
10 15
20 35
30 60
40 84
50 96
60 127
70 198
80 250
Objective and Prerequisite of an Ideal Measure
Solution: Class
0-10 10-20 20- 30 30-40 40- 50 50- 60 60-70 70 -80
Mid-value x
f
5 15
15 20
25 35 45
25 24
55 65 75
Total
Cumulative f
12 31 71 52 N=250
15 35 60 84 96 127 198 250
d=x-a
x-a u=-h
--40
--4
-60
-30 -20 -10 0 10 20 30
-3 -2
-{ill
-1 0 1 2 3
Let assumed mean a = 45, h = 10 Lfu Mean =a+ - x h N = 45 + 135 x 10 250 = 45 + 5.4 = 50 .4 N
--c
Median Here N
= I + _2__ x h f
= 250 =125, hence median class is 50 -
2 2 Thus 1= 50, f= 31, c = 96 Median
= 50+ 125-96 x10 31 = 50+ 290
31 = 50 + 9.35 = 59.35 Now, by empirical fonnula, Mode
= 3 Median - 2 Mean = 3 x 59.35 - 2 x 50.4 = 178.05 - 100.8
= 77.25
fu
60.
-50 -24 0 31 142 156 Lfu = 135
171
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Comprehensive Remedial Mathematics for Pharmacy
Example 25:
Find the mean wages of labourers in a pharmaceutical factory for the following distribution. No.of Labourers
Wages in (Rs) 20-30
3
30-40
5
40-50
20
50-60
10
60-70
5
Solution: Wages in Rs
Number of Labourers
Mid point x
fx
20-30
3
25
75
30-40
5
35
175
40-50
20
45
900
50-60
10
55
550
60-70
5
65
325
Total
N=43
Lfx = 2025
~fx
Mean x = N
= 2025 = Rs. 47.09 43
Example 26:
Find out the arithmetic mean for the following Table: Class
Frequency
0-10
8
10-20
16
20-30
25
30-40
30
40-50
15
50-60
6
Objective and Prerequisite of an Ideal Measure Solution:
Class
Mid value (x)
f
d = x -25
x - 25 u=--
0-10
5
8
-20
-2
-16
10 -20
15
16
-10
-I
-16
20 - 30
25 - a
25
0
0
0
30-40
35
30
10
I
30
40-50
45
15
20
2
30
50- 60
55
6
30
3
18
Here
fu
Hu=46
N= 100
Total
i
a = 25, i = 10 Lfu mean x = a + i N 25 + 10 x 46 100 == 25 + 4.6
=
=
Example 27:
29.6
Find the median from the following data of manufacturing company. Mid value
Frequency
115
5
125
26
135
48
145
70
155
118
165
60
175
38
185
22
195
3
173
174
Comprehensive Remedial Mathematics for Pharmacy
Solution:
The cumulative frequency Table is Mid value
Frequency
Cumulative Frequency
115 125 135 145 155 165 175 185 195
5 26 48 70 118 60 38 22 3 N=390
5 31 79 149 267 327 365 387 390
Mid value = N + 1 = 390+ 1 = 391 =195.5 2 2 2 Which comes against the cumulative frequency 267 Median (Md) = 155
Example 28:
50 persons were examined through X-rays and observations are noted as under. Diameter of heart (in mm)
Number of persons
120 121 122 123 124
5 9 14 8 5 9
125
Find the median
Solution:
Making the cumulative frequency Table Diameter of heart (in mm)
Number of persons
Cumulative frequency
120 121 122 123 124
5
5 14
125
9 14 8 5 9 N=50
28
36 41 50
Objective and Prerequisite of an Ideal Measure . Here mid value ,
N +1
50 + 1
175
51
= -2- = -2- = -2 = 25.5
Which comes against the cumulative frequency 28 Median = 122
Example 29:
Solution:
Calculate mean, median and mode of the following data relating to weight of 120 articles. Weight (tn kg)
Number of articles
0-10
14
10-20
17
20-30
22
30-40
26
40-50
23
50-60
18
Mean Weight in kg
Number of articles (1)
Mid point x
fx
0-10
14
5
70
10-20
17
15
255
20-30
22
25
550
30-40
26
35
910
40-50
23
45
1035
18
55
50-60
990
N = 120
Mean x
2:fx N
Hx=3810
3810
= -=-=
120
31.75
Median Weight (in kg) 0-10
Number of articles (1)
Cumulative frequency
14
14
10-20
17
31
20-30
22
53
30-40
26
79
40-50
23
102
50-60
18
120
N= 120
176
Comprehensive Remedial Mathematics for Pharmacy . N 120 MId value = -=-=60
2
2
Which comes against cumulative frequency 79. The median class will be 30 - 40 Here! = 30, i = 10, f= 26, F = 53
!'£ - F Median (Md) = 1+ _2__ x i f -'"'0 - -' + 60-53 x 10 26 = 30 + 70 26 = 30 + 2.69 = 32.69 Mode In the given table the interval 30 - 40 has the maximum frequency :. The mode class is 30 - 40 Here 1= 30, i = 10, f= 26, Ll = 22, fl = 23 f-f Mode (Mo) = I + -1 X i 2f -C 1 -fl 26-22 =30+ x 10 52-22-23 =30+ 40 7 = 30 + 5.71 = 35.71
Example 30:
Find the mean, median and mode of the following data. Students (x)
1 4 7 10 13
16 19 22 25 28
Frequency (0 7
46 165 195 189 89 28 19 9 3
Objective and Prerequisite of an Ideal Measure
Solution: Mean ~ = Lfx = 8436 750 N = 1l.24 Students (x)
1 4 7 10 13 16 19 22 25 28
Fn~guency
fx
Cumulative frequen~
7 184 1155 1950 2457 1424 532 418 225 84 Hx =8436
7 53 218 413 602 691 719 738 747 750
(I)
7 46 165 195 189 89 28 19 9 3 N=750
Median . N 750 MId value = -=-=375
2
2
Which comes against the cumulative frequency 413 :. Median = 10 Mode Mode
Frequency
Students (x)
First two
Leave first
First three
First leave
First two leave
(iv)
(v)
(vi)
(vii)
211
218
(i)
(ii)
(iii)
1 4 7
7 46 165 195 189 89 28 19
53
10
13 16 19 22 25 28
9 3
406
360 384 278
549 473
117 47
56 28
12
306 136 31
177
178
Comprehensive Remedial Mathematics for Pharmacy
Analysis Table
(i)
10
(ii)
7, 10
(iii)
10, l3
(iv)
10, l3, 16
(v)
4, 7, 10
(vi)
7, 10, l3
(vii) 7, 10, l3, 16 It is clear that the class 10 occur maximum number of times. Hence mode is 10. Example 31:
Calculate Mean, Median and Mode of the following distribution Marks
Frequency
10-25
6
25-40
20
40-55
44
55-70
26
70-85
3
85-100
1
Solution: Marks
Frequency (I)
Mid point (x)
fx
Cumulative frequency
10-25
6
17.5
105
6
25-40
20
32.5
650
26
40-55
44
47.5
2090
70
55-70
26
62.5
1625
96
70-85
3
77.5
232.5
99
1
92.5
92.5
100
85-100
N= 100
Lfx = 4795
Mean
~ = rfx = 4795 = 47.95 N
100
Median Mid value
= 100 = 50 2
Objective and Prerequisite of an Ideal Measure Which comes against cumulative frequency 70 :. The median class is 40 - 55
1= 40, i = 15, F = 26, f= 44
Here
N -F Median (Md) = 1+ _2__ x i f
=40+ 50-26 x15 44 =40+8.18=48.18 Mode In the Table, the interval 40 - 55 has maximum frequency.
I = 40, f = 44, LI = 20, fl = 26, i = 15
Here
Mode = I +
f-f
-I
2f -C1 -fl
=40+
X
i
44-20. x15 88-20-26
= 40 + 8.57 = 48.57 Example 32:
Calculate-the mode of the following distribution Class
Frequency
4-8
10
8-12
12
12-16
16
16-20
14
20-24
10
24-28
8
28-32
17
32-36
5
36-40
4
Solution: The interval 28 - 32 has the maximum frequency 17. Here
1= 28, i = 4, f= 17,f-1 = 8, fl = 5
179
180
Comprehensive Remedial Mathematics for Pharmacy Mode = 1+
f - LI 2f -C1 -fl
= 28+
X
i
17 -8 x4 34-8-5
36 =28+·21
= 28 + 1.71 = 29.71 Example 33:
Solution:
Find the mode of the following data Class
FreQuencv
0-5
25
5 -10
15
10 - 15
8
15 -20
3
20-25
2
maximum frequency 25 in class interval 0-5. Here
1= 0, f = 25, LI = 0, fl = 15, i = 5 Mode =
f - LI 2f-L1 -fl
=0+
X1
25-0 x5 50-0-15
= 25x5 = 3.57 35
Example 34: Find the mean of the following distribution Marks obtained
Number of Students
0-10
7
10-20
9
20-30
12
30-40
8
40-50
4
Objective and Prerequisite of an Ideal Measure Solution: Marks obtained
Mid value (x)
Number of students
fx
(I)
0-10 10-20 20-30 30-40 40-50
5 15 25 35 45
7 9 12 8 4 N=40
35 -135 300 280 180 Lfx = 930
Mean = Lfx = 930 = 2325 N 40 Example 35:
Find the arithmetic mean for the following table: Class 0-20 20-40 40-60 60-80 80 -100
Frequency 2 7 10 3 3
Solution: Class 0-20 20-40 40-60 60-80 80-100
Mid value (x) 10 30 50 70 90
-
Lfx
Frequency (I) 2 7 10 3 3 N=25
fx 20 210 500 210 270 Lfx = 1210
1210
Mean X = - = - - =48.4 N 25 Example 36:
Calculate the median from the table given below. Value 7 8 10 9 11 12 13
Frequency 2 1 4 5 6 1 3
181
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Comprehensive Remedial Mathematics for Pharmacy
Solution: Value
Frequency
Cumulative frequency
7
2
2
8
1
3
10
4
7
9
5
12
11
6
18
12
1
19
3
22
13
N=22
Mid value = N = 22 =11 2 2 which comes against cumulative frequency 12 Median =9
Example 37:
Calculate the median for the following data. Wages (Rs.)
Number of workers
10-15
4
15-20
6
20-25
8
25-30
5
30-35
3
35-40
2
Solution: Wages (Rs)
Number of Workers
Cumulative frequency
10-15
4
4 10
15-20
6
20-25
8
18
25-30
5
23
30-35
3
26
2
28
35-40
N=28
Objective and Prerequisite of an Ideal Measure Mid Value = N=28=14 . 2 2 Which comes against cumulative frequency 18 :. median class is 20 - 25 Here
i=20,i=5,f=8,F=10 N -F Median = i + _2__ x i f
=20+ 14-10 x5 8 20 =20+- = 20 + 2.5 = 22.5 8
Example 38:
Solution:
Find the mode from the following Table. Class interval
Frequency
0-15
2
15-30
3
30-45
5
45-60
10
60-75
7
The interval 45 - 60 has maximum frequency 10 Here
i=45,i=15,f=10,f_I=5,fl=7 Mode = i +
f-f -I 2f -C1 -fl
=45+
X
i
10-5 x15 20-5 -7
= 45 + 75 8 =45+9.37 = 54.37
183
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Comprehensive Remedial Mathematics for Pharmacy
Exercises 1. Marks obtained by 9 students in Maths are given below. 52,
75,
40,
70,
43,
40,
65,
35,
48
Calculate the arithmetic mean. 2. Calculate the mean of the following. Height in em
65
66
67
68
69
70
71
72
73
Number of Plants
1
4
5
7
11
10
6
4
2
3. Find the mean for the following distribution. Class
0-7
7 -14
14 - 21
21-28
28-35
35-42
42-49
Frequency
19
25
36
72
51
43
28
4. Find the mean from the following data. Marks
No.of students
Marks
No. ofstudents
Below 10
5
Below 60
60
Below 20
9
Below 70
70
Below 30
17
Below 80
78
Below 40
29
Below 90
83
Below 50
45
Below 100
85
5. If the arithmetic mean of the following frequency distribution is 39.25. Find the missing term : Daily wages (Rs)
25
'30
35
50
60
75
Number of Labourers
10
?
13
8
. 5
4
6. The mean wage of 500 workers in a factory running two shifts of 360 and 140 workers respectively is Rs. 70. The mean wage of 360 workers working in day shift is Rs. 75. Find the mean wage of 140 workers working in the night shift.
Objective and Prerequisite of an Ideal Measure 7. Calculate the mean from the following data: Class Intervals
Frequency
Class intervals
Frequency
35-40
7
60-65
42
40-45
8
65-70
42
45-50
12
70-75
15
50-55
26
75-80
17
55-60
32
80-85
9
8. Find the median of the following 20,
18,
22,
25,
27,
15
12,
9. Find the median from the following Table: Marks
No. of Students
Marks
No. of Students
0-10
2
50-60
20
10-20
18
60-70
6
20-30
30
70-80
3
30-40
45
40-50
35
10. Find the median for the following frequency distribution. Class Frequency
0-6
6-12
12-18
18-22
22-24
24-30
30-36
36-42
5
11
25
20
15
18
12
6
11. Determine the mode from the following figures. 25,
15,
23,
40,
27,
25,
25,
23,
12. Compute the mode of the following:
13. Find the mode from the following Table: Marks
No. of Students
Marks
No. of Students
0-10
2
50-60
20
10-20
18
60-70
6
20-30
30
70-80
3
30-40
45
40-50
25
20
185
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Comprehensive Remedial Mathematics for Pharmacy
14. Find the mode of the following. Marks
1-5
6-10
11-15
16-20
21-25
26-30
31-35
36-40
41-45
No. of Candidates
7
10
16
32
24
18
10
5
1
15. For the following frequency distribution the mode is 47.5. Find the missing frequency. Class
0-10
10-20
20-30
30-40
40-50
50-60
60-70
70-80
Frequency
7
8
10
-
40
35
10
7
16. Find out the mean, median and mode of the following distribution. Marks
Frequency
10-25
6
25-40
20
40-45
44
55 -70
26
70- 85
3
85 -100
1
17. Compute mean, median and mode for the following data. Marks less than
5
10
15
20
25
30
35
40
Frequency
2
4
14
27
48
64
72
75
18. Calculate mean, median and mode for the data given below. Age less than
25
30
35
40
45
50
55
601
No. of Persons
5
12
22
40
55
67
74
79 1
19. Find the Geometric mean of6, 12,24. 20. The marks obtained by seven students are 5, 10, 15,20,25,30 and 35. Find the Geometric mean and harmonic mean. 21. Calculate Geometric mean and harmonic mean for the data given below.
I ; I 2~
7 11 5
11~
0 118
I~
11:
I
Objective and Prerequisite of an Ideal Measure
187
22. Find geometric mean for the following frequency distribution. Class
Frequency
0-10
10-20
20-30
30-40
40-50
1
2
6
6
5
23. Find the harmonic mean for the following frequency distribution. Class
Frequency
40-50
50-60
60-70
70-80
80-90
90-100
19
25
36
72
51
43
24. If the mean of the following distribution is 6. Find the value of A.
25. The mean of 15 observations is 10. If2 is subtracted from each observation, Find the new mean. . - :Ex l 120 [Hmt: :Ex = 15 x 10 = 150, New sum :Ex l = 150 - 15 x 2 = 120 :. x = == 8] n 15 26. If the mean of6, 8, 5, 7, x and 4 is 7. Find x. 27. The mean of a set of 67 values is 35. If each of the value is multiplied by 4. What will be mean of the set of new values. 28. The mean of 40 observations was 160. It was detected on rechecking that the value of 165 was wrongly copied as 125 for computation of mean. Find the correct mean. 29. The arithmetic mean of a set of 40 values is 65. If each of the 40 values is increased by 5. What will be the mean of set of new values. 30. The sum of deviation of a set of n values xl. X2 •••.• Xn measured from 50 is -10 and the sum of deviations of the values from 46 is 70. Find the value ofn and the mean. 10 70 [Hint: x=50- and x =46+n n 10 70 :. 50-- = 46+- => n = 20 and x
n
n
= 49.5]
31. A car owner buys petrol at Rs. 7.50, Rs. 8.00 and Rs. 8.50 per litre for the three successive years. Compute the average cost per litre of petrol when he spends Rs. 4000 each year. 32. Number 50, 42, 41, 2x + 10, 2x -8, 12, 11, 8,6 and if their median is 25. Find x.
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Comprehensive Remedial Mathematics for Pharmacy
33. Find the median of the following data. 41,43,127,99,71,92,71,58,57 If 58 is replaced by 85. What will be the new median. 34. Out of 10 observations arranged in descending order the fifth and sixth observations are 13 and 11 respectively. What is the median value of all the ten observation? 35. Explain mode with example. Explain where mode is better suited in comparision to other measures of central values.
Answers
57~
1. 52
2. 69.19
3. 26.5
4. 48.41
5. 6
6.
7. 61.84
8. 20
9. 36.56
10. 21
11. 25
12. 6
13. 36
14. 18.66
15. 25
16. 47.95,48.18,48.57
7
17.21.9,22.6,23.1
18. 37.59,39.86,38.64
19. 12
20. G.M = 16.9, H.M = 13.5
21. F.M=7.604,H.M=7.401
22.28.08
23. 71.46
24.7
26. 12
27. 140
31. Rs.7.98
32. 12
33. 61, 71
34. 12
28. 161
29.70
CHAPTER
7 TRIGONOMETRY
Introduction Trigonometry is the science of measuring triangles. It is a branch of mathematics which deals with the measurement of angles and the problems applied with angles. System of Measurement ofAngles: There are three system of measurement of angles.
1. Sexagesimal system (Degree System): In this system, an angle is measured in degree, minutes and seconds. A complete rotation describes 360°. We represent the degree, minutes and seconds by the symbols 0,'," respectively. :. 1 right angle = 90° 1 degree (10) = 60' (60 minutes) 1 minute (1')
= 60"
(60 seconds)
2. Centesimal System (Grade System): In this system, right angle is divided into 100 equal parts, each part is called a grade. Each grade is subdivided into 100 equal parts, called minutes and each minutes are divided into 100 equal parts, called seconds. 1 right angle = 100g 1 grade (1 g)= 100' 1 minute
(I')
=
100"
3. Circular system (Radian System): In this system an angle is measured in radians. A radian is an angle subtended at the centre of a circle by an arc whose length is equal to the radius ofthe circle. 1 radian = 1c.
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Comprehensive Remedial Mathematics for Pharmacy
Relation between degree and radians: Let r be the radius of circle and I be the length of arc (I) length of arc. Then angle (8) = . radians.
(bp
radIUS (r)
1t radian = 180°
here
180° 1 radian =- - , 1°= ~ radian 180 ' 1t 22
where 1t =
-
1t radian = 200g = 180°
U
7
Example 1: Express the following angles in radian measure: (i) 45° (ii) 18°20' Solution:
we know that 180° = 1t radians (i)
45° = ~ 180
(ii)
18020'
x
45
= .!: radians 4
= 18 20 degree = (55)°
60 .: 180° = 1t radians 55)° = ~ ( 3 180
Example 2:
~ = 1I1t 3
radians
108
Find the degree measure corresponding to the following radian measure: (i)
Solution:
x
3 •
(:
r
(ii)
we know that 1tc = 180° (i)
(ii)
(-2t= 180 x{-2) degree 1t - -
180x2x 7 d 22 egree
= - 114.54° =-144° 32'24"
0 .. (°.54 = 54 x 60' = 32.40'] 0.40' = 0.40 x 60 = 24"
Trigonometry
191
Example 3: Change 80g to degree Solution:
we know that 1g
=( -90 )0 100
80g = 90 x 80 = 72° 100 Example 4:
Find the radius of a circle in which a central angle of 45° intercepts an arc of 187 cm.
Solution:
Let r be the radius of circle. Let I = 187
~x45 =~ radian 180
Now
4
I r= - => r= 187x4 => r= 187x4x7 =238cm a 1t 22
Example 5:
A train is traveling on a curve 700 m radius at 14 kmIhr. Through what angle will it return in one minute.
Solution:
Given, radius = 700 m Speed of train = 14 km/h · · :. d Istance covered·In 1mInute = 14 x 1000 m
60
1= 700 m 3
I Now, we know that a = -
r
. =-700 x - 1 radians 3 700
a = .!.. 3
radian
Trigonometrical ratio or Trigonometrical Functions In a MBC, BC = Perpendicular (p) AB = base (B), AC = Hypotenuse (H)
. a = -P SIn H' B cos = H' P
a
tana= -
B'
cosec a =H P H sec = B B cot a = P
a
LJP
1\
B
B
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Comprehensive Remedial Mathematics for Pharmacy
Fundamental Identities 1. sin8
=
1 cosec9 1 2. cos 8 = - sec8 1 3. tan 8 = - cot8
4. sin2 8 + cos2 8 = 1
5. sin2 8 = 1 ~OS2 8 6. cos2 8 = 1- sin2 8
7. 1 + tan2 8 = sec2 8 8. sec2 8 -tan2 8 = 1 9. 1 + cor 8 = cosec2 8 2
10. cosec 8 - cor 8
=1
Example 6: (i) if sin 8
= ~, fmd the value of cos 8 and tan 8.
(ii) If tan A =
5
~,find the value of3 sin A + 4 cos A 4
Solution: (i)
3 cos281 = 5' 2 -8 cos 8 = ± .J'-1--si-n.8 = sm
-
=±FG) =±~1- :5 =±~=±~ 3
tan 8 = sin 8 cos8
= "5 = ~ 4
5
4
.28 sm
Trigonometry 3 tan A =-,
(ii)
tJ3 C
4
AC 2 = AB2 + BC2
= (4)2 + (3i
= 16 + 9 = 25 AC=5
Pi.
. A =3 cos A =4 S10
5'
5
3 sin A + 4 cos A
=3 x ~ + 4 x .i '5
5
=~+~=5
Example 7:
Solution:
5 5 1- cosA sin A =--Prove that sinA l+cosA L.H.S. = l-cosA = l-cosA x 1+ cosA sin A sin A 1+ cosA 2 l-cos A =----sinA(1 + cosA)
sin 2 A - sin A(1 + cos A) sin A
= l+cosA Example 8:
Solution:
Prove that
=R.H.S
1+cosA - - = cosec A + cot A l-cosA
L.H.S
=
193
---=
=
l+cosA l+cosA x--1 - cos A 1 + cos A
(I +COSA)2 l-cos 2 A
(l+cosAf sin 2 A l+cosA =--sin A 1 cosA =--+-sinA sinA
=
= cosec A + cot A = R.H.S
4
B
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Comprehensive Remedial Mathematics for Pharmacy
Example 9: If tan 8 + sin 8 = m and tan 8 - sin 8 = n, then prove that Solution:
m2 _n2 = 4.jrnn. L.H.S = m2- n2 = (tan 8 + sin
8i - (tan 8 - sin 8i
= tan2 8 + sin2 8 + 2 tan 8 sin 8 - (tan2 8 + sin2 8 -2 tan 8 sin 8) = 4 tan 8 sin 8 R.H.S = 4& =4~(tan8+sin8)(tan8-sin8) = 4~tan2 8 -sin 2 8
--4
. 28 cos 28
Sill - - S i l. l 28
2 =4 sin 8(-1--1) cos 2 8
=4 sin b ~sec28-1 = 4sin8~tan2 8 = 4 sin 8 tan 8
L.B.S = R.B.S
Example 10: If cos 8 + sin 8 = .fi cos 8, Prove that cos 8 - sin8 = .fi sin 8 Solution:
Given cos 8 + sin 8 = .fi cos 8 Squaring on both the sides (cos 8 + sin 8i = (.fi cos 8i cos2 8 + sin2 8 + 2 sin 8 cos 8 = 2 cos2 8 2 sin 8 cos 8 = 2 cos2 8 - cos2 8 - sin2 8 2 sin 8 cos 8 = cos2 8 - sin2 8 2 sin 8 cos 8 = (cos 8 - sin 8) (cos 8 + sin 8) 2 sin 8 cos 8 = (cos 8 - sin 8) .fi cos 8
(.: cos8 + sin8 = .fi cos9) cos 8 -
. 8
Sill
2sin8cos8 = ----c=---
.ficos8 cos 8 - sin8 = .fi sin 8
195
Trigonometry
. tan8+see8-1 1+sin8 Exampl e 11 : Sa Ive - - - - tan 8 - see8 + 1 eos8 tan 8 + see8-1 L.H.S =- - - - Solution: tan 8 - see8 + 1
= =
(tan 8 + see8) - (see 2 8 - tan 2 8)
(": see 2 8 - tan 2 8 = 1)
tan 8 - see 8 + 1 (tan 8 + see8) - (see8 - tan 8)(see8 + tan 8)
tan 8 -see8 + 1 (tan 8 + see 8)(1- see 8 + tan 8) =~---~----~ (tan 8 - see8 + 1)
= tan 8 + see 8 sin8 1 =--+-eos8 eos8
= 1 + sinO = R.H.S cosO
Trigonometric Table
~
00
sin 8
0
T-ratio
eos 8
1
0 30 (
%)
1 2
.J2
J3
1
-
tan 8
eat 8
see 8
0
00
1 00
1
60
0 (; )
J3
-
900(~) 1
2
1
-
0
2
.J2
1
1
00
J3 J3
J3
1
1
0
2
.J2
2
00
.J2
2
1
J3 eosee 8
45°(~)
2
2
J3
J3
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Comprehensive Remedial Mathematics for Pharmacy
Example 12: .Find the value of sin2 45° + cos2 45° + tan2 30°
,in'45' + 00,'45' + tan' 30'
Solution:
~ C~
r Jzr r +(
111 =-+-+2 2 3 3+3+2 =--6
8
4
·6
3
=-=-
Example 13: If
tan2 9 + sec 9 = 5. Find cos 9.
Solution:
tan2 9 + sec 9 = 5
Given
sec2 9 - 1 + sec 9 = 5 sec2 9 + sec 9 - 6 = 0 sec2 9 + 3 sec 9 - 2 sec 9 - 6 = 0 sec 9 (sec 9 + 3) -2(sec 9 + 3) = 0 (sec 9 + 3) (sec 9 - 2) = 0 sec9+3=0 or
sec9-2=0
sec 9 =-3
or
1 cos 9 = - 3
or
sec9=2 1 cos 9 = 2
Example 14: If A = 30°, verify that cos 3A = 4 cos 3 A - 3 cos A. Solution:
Given A = 30° L.H.S = cos 3 A = cos 3 x 30° = cos 90° =0
+(
~
Trigonometry R.H.S.
197
= 4 cos3 A - 3 cos A = 4 cos3 '30° - 3 cos 30°
=4( ~J -3X~ =4x
3J3 _3J3 8
2
3J3 3J3 2
2
=0 L.H.S = R.H.S
Trigonometric Functions of angles II quadrant I quadrant Station All i.e. sin and cosec i.e. all positive are positive III quadrant Ticket i.e. tan and cot are positive
IV quadrant Collector i.e. cos and sec are posItive
Note: To memories the signs ofT-ratios in different quadrant. "All stations Ticket Collector" . 1. In pt quadrant, all the trigonometric functions are positive with angle (90 - 8) and (360 + 8) 2. In lind quadrant, only sin 8 and cosec 8 are positive with angle (90 + 8) and (180 - 8). 3. In IIIrd quadrant, only tan 8 and cot 8 are positive with angle (180 + 8) and (270 -8). 4. In IV th quadrant, only cos 8 and sec 8 are positive with angle (270 + 8) and (360 - 8). (i)
In case of 90° and 270°, the trigonometric functions will be changed i.e., sin 8 ~ cos 8, tan 8 ~ cot 8, cosec 8 ~ sec 8.
(ii)
In case of 180° and 360°, the trigonometric functions will not be changed i.e., sin 8 ~ sin 8, cos 8 ~ cos 8, tan 8 ~ tan 8 etc.
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Comprehensive Remedial Mathematics for Pharmacy
~ -e
sin
cos
tan
cot
cosec
sec
--cot 8 tan 8 -tan 8 --cot 8 cot 8 tan 8 -tan 8 --cot 8 cot 8
--cosec 8 sec 8 sec 8 cosec 8 --cosec 8 -sec 8 -sec 8 --cosec 8 cosec 8
sec 8 cosec 8 --cosec 8 -sec 8 -sec 8 --cosec 8 cosec 8 sec 8 sec 8
Anele
90° -8 90° + 8 180° - 8 180° + 8 270° -8 270° + 8 360° - 8 360° + 8
-sin 8 cos 8 cos 8 sin 8 -sin 8 --cos 8 --cos 8 -sin 8 sin 8
cos 8 -tan 8 sin 8 cot 8 - sin 8 -cot8 -cos 8 -tan 8 --cos 8 . tan 8 -sin 8 cot 8 sin 8 --cot 8 -tan 8 cos 8 cos 8 tan 8
Example 15: Find the following (i) sin (1920°) (ii) tan (765°) (iii) cosec (870°) Solution:
(i)
sin (1920°) = sin(3600
x
5 + 120°)
= sin 120° = sin(900 + 30°)
ofi
=cos30 = 2 tan (765°) = tan (360°
(ii)
x
2 + 45°)
= tan 45° = 1 (iii)
cosec (870°) = cosec (360°
x
2 + 150°)
= cosec 150° = cosec (90° + 60°)
= sec 60° = 2 Example 16: Prove that sin(2700 - 8) sin (90° - 8) - cos(2700 - 8) cos (90° + 8) + 1 = 0 Solution:
L.H.S = sin(2700 - 8) sin (90° - 8) - cos(2700 - 8) cos (90° + 8) +1 = --cos 8. cos 8 - (-sin 8) (-sin 8) + 1 = --cos2 8 - sin2 8 + 1 = -(cos2 8 + sin2 8) + 1 =-1 + 1
=0
Trigonometry
Example 17: Prove that sin 60° cos 30° - cos 150° sin 120° = Solution:
~
2
L.H.S = sin 60° cos 30° - cos 150° sin 120° =
sin 60° cos 30° - cos (90° + 60°) sin (90° + 30°)
=
sin 60° cos 30° - (-sin 60°) cos 30°
fjfjfjfj
=-x-+-x-
2
2
2
=~+~=~ 4
Example 18: Prove that
Solution:
4
2
=R.H.S
2
tan(3600 + 8) + cot(900 - 8) = 2 sin 8 cos 8 l+tan(l800 -8)cot(2700 +8) L.H.S = tan(3600 + 8) + cot(900 - 8) 1 + tan(1800 - 8)cot(2700 + 8) tan 8 + tan 8 1+ (-tan8)(-tan8)
=-------
2tan8
=---=-2
l+tan 8
=
2tan8 sec 2 8
2sin8 _ cos8 --1cos 2 8
= 2 sin 8 cos 8 =
R.H.S
Trigonometric ratios of sum and difference of angles
1. sin(A + B) = sin A cos B + cos A sin B 2. sin (A - B) = sin A cos B - cos A sin B 3. cos (A + B) = cos A cos B - sin A sin B 4. cos (A - B) = cos A cos B + sin A sin B
199
200
Comprehensive Remedial Mathematics for Pharmacy 5. tan (A + B)
= tan A + tanB I-tanAtanB
6. tan(A-B) = tanA-tanB 1+ tan A tanB 7. cot (A + B) = cotAcotB -1 cot A + cotB 8. cot(A-B)= cotAcotB+l cotA-cotB 9. sin(A + B) . sin (A - B) = sin2 A - sin2 B = cos2B - cos2A 10. cos(A + B) . cos(A - B) = cos2A - sin2B = cos2B - sin2A 11. tan(A + B + C) = tan A + tan B + tan C - tan A tan B tan C I-tan A tan B-tan Btan C -tan C tan A
Example 19: Obtain the values of sin 15°, cos 15°, sin 75°, cos 75°. Solution:
(i)
sin 15° = sine45° - 30°)
= sin 45° cos 30° 1
.J3
1
cos 45° sin 30°
1
.J3-1 2J2
=-x---x-=-2 2
J2
(ii)
J2
cosl5° = cos(45° - 30°)
= cos 45° cos 30° + sin 45° sin 30° 1
.J3 2
1
1 2
.J3+1 2J2
=-x-+-x-=--
J2
(iii)
J2
sin 75° = sine45° + 30°)
= sin 45° cos 30° + cos 45° sin 30° 1
.J3
1
.J3+1 2J2
1
=-x-+-x-=-2 2
J2
(iv)
J2
cos 75° = cos( 45° + 30°)
= cos 45° cos 30° 1
.J3
1
sin 45° sin 30° 1
.J3-1
=-x---x-=-2 2
J2
J2
2J2
Trigonometry
201
Example 20: Prove that sin 105° + cos 105° = cos 45° Solution:
L.H.S = sin 105° + cos 105°
= sin (60° + 45°) + cos (60° + 45°) =
sin 60° cos 45° + cos 60° sin 45° + cos 60° cos 45° - sin 60° sin 45°
Jj 1 1 1 1 1 Jj 1 =--x--+-x--+-x-----x--
212212212 212
1 1 2 =--+--=--
212 212 212 1
= J2 = cos 45° =
R.H.S
Example 21: If A + B = 45°, Prove that (1 + tan A) (1 + tan B) = 2 Solution:
Given A + B = 45° ~
tan(A + B) = tan 45° tanA+tanB =1 I-tanAtanB tanA+tanB= I-tanAtanB 1 +tanA+tanB+tanAtanB=2 (1 + tan A) + tan B( 1 + tan A) = 2 (1
+ tan A) (1 + tan B) = 2
Example 22: Prove that sin(A + B) sin (A - B) = sin2 A - sin2B = cos2B Solution:
C~S2 A
L.H.S = sin(A + B) sin(A - B) = (sin A cos B + cos A sin B) (sin A cos B - cos A sin B) =
sin2 A cos 2 B - cos2 A sin2 B
= sin2 A(1- sin2 B) -
(1 - sin2 A) sin2 B
= sin2 A - sin2 A sin2 B - sin2 B + sin2 A sin2 B =
sin2 A - sin2 B
= (1 - cos 2 A) - (1 - cos2 B)
= cos2 B -
cos2 A
= R.H.S
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Comprehensive Remedial Mathematics for Pharmacy
Example 23: Prove that tan 58 - tan 38 - tan 28
tan 58 = tan (38 + 28)
Let
Solution:
= tan 58 tan 38 tan 28.
tan 58
=
tan 38 + tan 28 1- tan 38. tan 28
tan S8 - tan 58 tan 38 tan 28 = tan 38 + tan 28 tan 58 - tan 38 - tan28 = tan 58 tan 38 tan 28
Formulae to transform the product into sum or difference 1. 2 sin A cos B = sin (A + B) + sin (A - B) 2. 2 cos A sin B = sin (A + B) - sin(A - B) 3. 2 cos A cos B = cos(A + B) + cos (A - B) 4. 2 sin A sin B = cos(A - B) - cos(A + B) Transforming of sums and difference into product C+D C-D . C + Sill . D = 2 Sill . - cos - 2 2
1·
Sill
2·
Sill
. C
. D
- Sill
=
2
C+D. C-D cos - - Sill - -
2
2
C+D C-D 3. cos C + cos D = 2 cos - - cos - 2 2 . C+D . D-C 4 · cos C -cos D = 2 Sill - - S I l l - 2 2 Example 24: Solution:
Pr~ve that sin 20° sin 40° sin 60° sin 80° = ~ 16
L.R.S = sin 20° sin 40° sin 60° sin 80°
= sin 20° sin 40° x
J3 2
x
sin 80°
=J3 sin 20° x! (2 sin 40° sin 80°) 2
=J3 sin 20° 4
2
[cos (80° - 40°) - cos(800 + 40°)]
Trigonometry
= J3 sin 20°
[cos 40° - cos 120°]
4
=
~ sin20
= J3
cos 40° +
(
~)
[sin 60° - sin 20° + sin 20°]
8
=
0
J3
sin 600 =
8
J3 x J3 = ~ = R.H.S 8
2
16
Example 25: Prove that sin 51t - cos 41t = J3 sin ~ 18
Solution:
9
9
"51t 41t L.H.S = Stn--cos18 9
[": cos 8 = sin "51t "1t =Stn--Stn18 18
51t
1t
-+-
= 2 cos 18
1t
18 sin 18
2 =
51t
--18
2
1t" 1t 2 cos - Stn-
6
9
= 2 x J3 sin 1t = J3sin 1t = R.H.S 2
9
9
(~ - 8 ) ]
203
204
Comprehensive Remedial Mathematics for Pharmacy
Example 26: Prove that
sin A + sin3A cosA+cos3A
L.H.S.
Solution:
= tan 2A
= sin A + sin3A cosA+cos3A A-3A . A+3A cos--2 SIn = 2 2 A+3A A-3A cos--2 cos
2
2
sin2A =- = tan 2A = R.H.S cos2A
Exampl e 27 : Prove that =
cos38 + 2cosS8 + cos78 cosS8 =--cos8 + 2cos38 + cosS8 cos38
L.H.S
Solution:
= cos38+cos78+2cosS8 cosS8 + cos8 + 2cos38 2cos 78 + 38 .cos 78 - 38 + 2cosS8
= __~2~_-=~2~_ ____ S8+8 S8-8 2cos--cos-- + 2cos38
2
2
2cosS8cos28 + 2cosS8
=--------2cos38cos28 + 2cos38 2cosS8(cos 28 + 1) = -----'------.:.. 2 cos 38(cos 28 + 1)
cos 59 - - - = R.H.S cos 39 To express the trigonometrical ratios of angle 2A in terms of trigonometrical ratios of angle A. 1. sin 2A = 2 sin A cos A 2. cos 2A = cos2A - sin2 A
= 2 cos2 A-I = 1-2 sin2 A 3. tan 2A
=
2tanA 2 I-tan A
4. sin 2A
=
2tanA 1+tan 2 A
Trigonometry
5. cos 2A =
I-tan 2 A l+tan 2 A
1- cos2x
6. sin2x
=- - -
7. cos 2x
= 1 + cos2x
2
2
Proof: 1. We know that sin(A + B) = sin A cos B + cos A sin B
Put B = A, we get sin 2A = 2 sin A cos A 2. Let cos(A + B) = cos A cos B - sin A sin B Put B = A, we get cos2A = cos 2A - sin2 A Now again
cos2A = cos2A - (1- cos 2A) 2
cos2A = 2 cos A - 1 again
cos2A
= cos2A =
sin2 A
(1 - sin2 A) - sin 2 A
cos2A = 1 - 2 sin2 A 3. Let
tan (A + B)
Put B = A, we get tan 2A = = 4. Let
= tan A + tanB 1- tan A tanB 2tanA 2
I-tan A sin 2A = 2 sin A cos A 2sinAcosA
= sin 2 A + cos 2 A
dividing by cos 2A, we get 2sinA sin2A =
5. Let
=
cosA 2 sin A + 1 cos 2 A 2tanA . 2A = sm --l+tan 2 A cos2A = cos2A - sin2A =
cos 2 A -sin 2 A sin 2 A+cos 2 A
205
206
Comprehensive Remedial Mathematics for Pharmacy dividing by cos2A, we have 1-tan2 A cos 2A = - - : 1+tan 2 A
Angle 3A in terms of angle A
1. sin 3A = 3 sin A - 4 sin3 A
2. cos 3A = 4 cos3 A - 3 cos A _ 3tanA-tan 3 A 3 . tan 3A 2 1-3tan A Example 28: Find the value of (i) sin 180(ii) cos 18°, (iii) sin 36° (iv) cos n° (v) sin 54° Solution: (i) sin 18°
Let
A = 18° 5A= 90° 2A + 3A= 90° 2A= 90° -3A sin2A = sin(900 - 3A) sin2A = cos 3A 2 sin A cos A = 4 cos3 A - 3 cos A 2 sin A = 4 cos2 A - 3 2 sin A = 4(1 - sin2 A) - 3 2 sin A = 4 - 4sin2A-3 4 sin2 A + 2 sin A-I = 0 . A
Sill
-2±~4+16
=----8
-2±.J20 8 . A
Sill
-1±J5
=--4
since 18° is acute angle, hence sin 18° is not negative ..
sin180 = = J5 -1 4
Trigonometry (ii)
cos 18° Since
cos e = ~1 - sin 2 e cos 18° = ~1 - sin 2 18°
~~ =~1- 5+1-2.Js 16
=~1- 6-2.Js 16
=~10+2.Js 16
.. (iii)
cos 18° = ~~10 + 2.Js 4
cos 36° Let
cos 36° = cos 2 x 18° = 1 - 2 sin2 18°
~ 1-2[ Fs4-1 J 6-2.Js 8 2+2.Js .Js +1 --= 4 8
=1-
..
sin 36° = ~1- cos 2 36° =
1-[FstJ
=~1- 6+2.Js =~~10-2.Js 16 4 (iv)
cos
n° = cos(900 = sin 18° .Js -1 4
---
18°)
207
208
Comprehensive Remedial Mathematics for Pharmacy sin ~4° = sin(900 - 36°)
(v)
cos 36°
=
J5 +1 4 Example 29: Find the value of (i) sin 22f (ii) tan 22f 2 2 Solution:
(i)
45° cos 45° = 1 -2 sin2 2 1 . 2 45° -=1-2sm -
fi
2
2 sin2 45° = 1__1_
fi
2 Sin2 45° =
2
fi -1 2fi
fi fi
x
. 2 45° 2-fi sm - = - -
2
sin 22f
2
4
= J2-fi 4
45° 2tantan 450 = __--=2'---:2 45° I-tan 2
(ii)
=>
2tan': tan A = 22A A [ I-tan 2
1° 2tan221= 2 1° 2 I-tan 222
10
1 - tan 2 22-
2
= 2 tan
10
22-
2
10 1° tan2 22- + 2 tan 22- - 1 = 0 2 2
1
209
Trigonometry
1° 1° 2 tan 22- + 2 tan 22- + 1 = 2 2
1°
2
(tan 22- + 2
Ii = 2
1°
tan 22 - + 1 = 2
1°
(adding 2 on both sides)
fi
fi
tan 22- = -1 2 Example 30: Prove that 4 sin A sin(60 - A) sin(60 + A) = sin 3A
Solution:
L.H.S = 4 sin A sin (60 - A) sin (60 + A) = 4 sin A (sin2 60 - sin2 A) = 4 sin A
(%- - sin 2 A J
= 3 sin A - 4 sin3 A
= sin 3A = R.H.S Example 31: If 0 < x < 2 1t, find sin ~ and cos ~. When tan x = - 4 . x lies in IT quadrant. - 2 2 3 Solution:
-4
Given tan x = -
3
-3
cosx= Now
. x
sm-=
for II quadrant, cos x is negative
5
~1-COSX
2
(':Sin 2 ;
2
=Jl:~
A
=~5~2 =~= Js again,
x ~1 +cosx cos -=
2
2
=
= 1-~OSX J
-~
~ _5 2
=~ 5~2·=H Js =
:/14
~c
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Comprehensive Remedial Mathematics for Pharmacy
~. Find the value of tan A
Example 32: If
sin2A =
Solution:
Given sin2A =
5
2tanA
--::--= 2
~ 5
4
1+ tan A 5 10 tan A = 4 + 4 tan2 A 4 tan2 A-I 0 tan A + 4 = 0 4tan2 A-8tanA-2tanA+4=O 4 tan A(tan A - 2) -2(tanA - 2) = 0 tan A-2 = 0 or
4tanA-2=O
tanA=2
or
r
tanA=2
Example 33: Prove that cos 4x -= 1 - 8sin2 x cos2 x Solution:
L.H.S = cos 4x = cos 2(2x) = 1- 2 sin2 2x = 1 - 2 (2 sin x cos
xi
2
= 1 - 2 (4 sin x cos2 x) = 1 - 8 sin2x cos2 x = R.H.S 1 1 Example 34: If2 cos A = X +- then prove that 2 cos 3A = x 3 +-3 X x Solution: cos 3A = 4 cos3 A - 3 cos A
1 1 3 3 1 =4x-(x+-) --(x+-) 8 x 2 X 1[3 1 1 1] =x +-+3(x +-)-3(x +-) 2 x3 x X (.,' (a+b)3=a3 +b3 +3(a+b» cos 3A
1 -J =21 ( x 3 +~
1 2 cos 3A = x 3 +-3 X
Trigonometry
Example 35: Prove that cos2 48° - sin" 12° Solution:
211
8
L.H.S = cose 48° - sine 12°
1 1 ° .1 ° [.:2COS"A=1+COS2A] = - [2cos- 48 - 2 sm- 12 ] '") 2 sin 2 A = 1- cos 2A
= -1
2
°
°
[cos 96 + cos 24 ]
9_6 _-_2_4 ] = ~[2COS 96 + 24 .cos_ 2
2
2
= cos 60° cos 36° = - . - - = - - = R.H.S 2 4 8 Example 36: Prove that
~2 + .J2 + 2cos48
Solution:
L.H.S =
= 2cos8
~2 +.J2 + 2cos48
= ~2 + ~2 + 2(2cos 2 28 -1)
=~2+~4coS228
=.J2 + 2cos28 = ~2 + 2(2cos 2 8 -1) = ~4COS2 8
= 2 cos 8 = R.H.S Example37: Provethat
cosA sin A . + =smA+cosA 1 - tan A 1- cot A
Solution:
L.H.S. =
cosA + sinA 1 ~ tan A 1- cot A
212
Comprehensive Remedial Mathematics for Pharmacy cosA sin A = 1- sin A + 1 _ cos A cosA sin A sin 2 A
cos 2 A
=
+-----
cosA-sinA sinA-cosA sin 2 A cos 2 A =----cosA -sin A cosA -sinA =----cosA -sinA _ (cos A -sin A)(cosA + sin A)
(cosA-sinA)
= sin A + cos A = R.H.S Example 38: If cot S = Solution:
=~, Find the value of sec 8 and cosec 8. 40
9 BC cot 8 = - = 40 AC In LlABC, AB2 = AC 2 + BC 2
Given
= (40)2
+ (9)2
A
LJ40 B
9
C
= 1600 + 81 = 1681 AB=41 AB 41 seeS = - = BC 9 and
Example 39: If tan Solution:
cosec8
AB
41
AC
40
:=-=-
e ::: ~3 , then find the values of sin 8 + cos 8 and sec 8 + cosec 8.
Given tan e = ~ = AC 3 BC In LlABC, AB2 = AC 2 + BC 2 =4+9
AB=
Jlj
tJ2 A
B
3
C
Trigonometry
.Jl3
. 8 =2,
SIn
sec8= = 3
.Jl3
.Jl3
3 cos8= = -
cosec 8 = = 2
.Jl3'
2 3 sin8+cos8 = - + -
.Jl3.Jl3 5
-.Jl3 and
.Jl3.Jl3 +-
sec 8 + cosec 8 = -
=
3
2
2.Jl3 + 3.Jl3 6
=~JU 6
Example 40: Prove that
cos2A = tan(45° - A) 1+ sin2A cos2A L.H.S = - - 1+ sin2A COS
2 A - sin 2 A
=--~-~~--------
sin 2 A+cos 2 A+2sinAcosA (cosA -sinA)(cosA +sinA) (cosA+sinA)2
=~------~~--~--~
cosA-sinA cosA + sin A
=-----
divide by cos A, we have I-tanA 1+ tan A
=----
=
tan 45° - tan A 1 + tan 45° tan A
= tan( 45° - A) = R.H.S
(': tan 45° = 1)
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Comprehensive Remedial Mathematics for Pharmacy
Example 41: Prove that = Solution:
sin2A = cot A l-cos2A
L.H.S =
sin2A l-cos2A 2sinAcosA = -------::-1-(l-2sin 2 A) 2sinAcosA 2sin 2 A cosA = - - =cotA=R.H.S sinA
Example 42: Prove that cos 20° cos 40° cos 60° cos 80° = ~ 16 Solution:
L.H.S = cos 20° cos 40° cos 60° cos 80° = cos 20° cos 40° . ..!.. . cos 80° 2
°
°
°
= -1 cos 20 (2 cos 80 cos 40 ) 4
1 = - cos 20° [ cos 120° + cos 40°] 4 [.: 2 cos A cos B = cos (A + B) + cos (A - B)] 1 1 = -cos200[-- + cos400]
4
2
°
°
-1 1 = -cos20 + -cos20 cos40
8
4
°
= -=-!. cos 20° +.!. (2 cos 40° cos 20°) 8 8 = -=-!.cos200 + .!.cos600 + .!..cos200
8 1 = -cos600 8
8
8
111 =-x-=8 2 16
= R.H.S
Trigonometry
IOn 8n 3n 5n Example 43: Prove that cos- + cos- + cos- + cos- = 0 13
13
13
13
IOn 8n 3n 5n L.H.S =cos-+cos-+cos-+cos-
Solution:
13
13
13
13
= (cos IOn + cos 3n) +(cos 8n + cos 5n)
13
13
13
13
13n 7n 13n 3n = 2cos-cos-+ 2cos-cos26 26 26 26 [.: cosc + cos
n 2
7n 26
0 C~ 0 C; 0] = 2cos
n 2
cos
3n 26
= 2cos-cos-+ 2cos-cos-
= 0
Example 44: Prove that Solution:
(.: cos~ = 0
+ 0 = 0 = R.H.S
sec A -tanA ? = 1 - 2 sec A tan A + 2 tan- A sec A + tan A L. H. S = sec A - tan A x sec A - tan A sec A + tan A sec A - tan A (sec A - tan A) 2 = sec 2 A - tan 2 A
=
sec 2 A + tan 2 A - 2secA tan A
= 1+ tan 2A + tan 2 A - 2 secA tanA
= 1 + 2 tan 2 A -
2 sec A tan A = R.H.S
Example 45: If tan 8 = 1, find the value of sec 28 and cosec 2 8. . I-tan 2 8 Solution: SInce cos2 8 = ? 1+tan-8 1 + tan 2 8 sec 28 = - -2I-tan 8 Since
tan 8 = 1
Now,
2tan8 . 28 =---=-SIn l+tan 2 8
1+1
2
sec 28 =-- =- =00 1-1 0
215
216
Comprehensive Remedial Mathematics for Pharmacy l+tan 2 8 2tan8
=- - -
cosec 28 since
tan8 = 1 cosec 2 8
1+ 1 2 = 2xl 2
= -
=
1
Example 46: Find the value of each of the following.
(i)cos210 0
(ii)tan lIn 5
(iii) sin 5n 3
Solution: (i)
cos 210° = cos(1800 + 30°)
= - 10g12 1728 = 3 .. ) 2-5 -( II
-1
32
=> IOg2 - 1 = - 5 32
(iii) 10-3 = 0.001 => 10gIO 0.001 =-3
Example 2:
Write the following in exponential form: (i) log2 128 = 7
Solution:
(ii) log9 729 = 3
(i) log2 128 = 7 => 27 = 128 (ii) log9 729 = 3 => 93 = 729
Properties of Logarithms: (i) the logarithm of 1 on any base a (a :t: 0) is zero i.e. aO
= 1=>
loga 1 = 0
(ii) The logarithm of any number to the base it self is always I i.e. a 1 = a => loga a = I (iii) Base will never be 00 or O. (iv) The logarithm ofzero on any base is negatively infinite i.e. a-a:> = 0 => loga 0 =
-00
Fundamental laws of logarithm First Law:
The logarithm of the product of two numbers is equal to the sum of the logarithm of these numbers to the same base. i.e.
Proof:
Let
=>
and
logan = Y
m = a" and n = aY
Again by definition loga (mn) = x + y loga (mn) = loga m + loga n
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Comprehensive Remedial Mathematics for Pharmacy
Second Law: The logarithm of the quotient of two numbers is equal to the difference of the logarithm of the numerator and the logarithm of the denominator to the same base. i.e.
Proof:
Let
logam = x and loga n = y
:. By definition,
10~(:)= x-y 10~(: ) = lo~m -logan Third Law:
The logarithm of a number raised to a power is equal to the product of the index of the power and the logarithm of the number to the same base. i.e lo~
Proof:
Let
(mll) = n
lo~m
loga m = x => m = aX mll = (aXt
:. By definition, lo~ (mll) = nx loga (mll) = n 10ga m Fourth Law: The base of logarithm can be changed. If the logarithm of numbers are given to the base a, then the logarithm of those numbers can be obtained to another base b. i.e. 10gb m = 10ga m Proof:
Let
x
10gb a
10gb m = x, 10ga m = y, 10gb a = z bX= m, aY = m and bZ = a
bX = aY
Logarithm
229
x=yz 10gb m = loga m x 10gb a lo&m=
Fifth Law:
log m b 10g b a
The product of logarithm of number b to base a with logarithm of number a to base b is equal to 1. i.e.
Proof:
10gb a = 1
10& b
x
Let
loga b = x ~ aX = b
~
10gb (aX) = 10gb b
~ X
10gb a= 1
~
or
Example 3:
loga b x 10gb a = I 1 10gba=-loga b
Prove that loga (1 + 2 + 3) = 10& 1 + 10& 2 + 10& 3.
L.R.S. = loga (1 + 2 + 3) = loga 6
Solution:
R.H.S. = loga 1 + 10& 2 + 10& 3 = loga (1
x
2
x
3)
(': 10& (m x n x p) = 10& m + loga n + loga p)
= 10&1 6 L.H.S = R.H.S n
Example 4:
If log (m + n) = log m + log n, show that m = - n-l
Solution:
Given
log (m + n) = log m + log n
~
log (m + n) = log (mn)
~
m+n=mn
~
n=mn-m
~
n=m(n-l)
~
m=--
0
0-1
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Comprehensive Remedial Mathematics for Pharmacy
Example 5:
144 = log2x. Find the value ofx, when log2 log2 12 L.H.S = log} 144 = log2 (12 x 12) log} 12 log 212 log) (12)2
Solution:
log2 12 _ 2log 2 12 =2 log2 12 Thus, we have log2 x = 2
=> x = 22 => x=4 Example 6: Solution:
x+y logx + logy 2 ' then prove that x = y Iflog-- = 2 log x + Y = log x + log ~ Given
2
2
x+y 1 log-2- = "2 log (x.y) 1
x+y log-- = log (xy)2 2 x+y .!. -=(XY)2 2
Example 7: Solution:
=>
(x;yr =xy
=> =>
2 x + 2 x +
=>
(x-yi = 0
=>
x-y=O
=>
x=y
1 + 2xy = 4xy 1- 2xy = 0
) 2 a+b loga+logb If a- + b = 7ab, prove that log - - = --==-----=3 2 2 2 Given a + b = 7ab a 2 + b2 + 2ab = 7ab + 2ab
=> =>
(a+ bi=9ab
Logarithm
2
a+b
log -3(
231
)
=
log (ab)
b)
a+ 210g ( -3= loga + 10gb
=>
Iog (-a +3-b) _- loga +2 10gb
Example 8:
If
log(mn) = log m -log n, show that n = 1.
Solution:
Given
log(mn) = log m -log n
=>
log m + log n = log m - log n
=>
210g n = 0
=>
log n = 0
=>
log n ± log 1
=>
n
Example 9:
Prove that
Solution:
L.H.S. A =
(.: log 1 = 0)
=1
x log y- log z • ylog z -log x • zlog x - log y
=1
x log y -log z . ylog z -log x • zlog x -log y
log A = log [xlog y -
log z • ylog z - log x . zlog x - log Y]
= log x log y - log z + log ylog z -log x + log zlog x - log y = (log y - log
= log x log y
t:) log x + (log z
-
log x)log y + (log x -log y) logz
-log x log z + log Y log z
-
log x log y + log x log z
-
log y log z
10gA= 0
=> log A
=
log 1
(': log 1 =;= 0)
=> A= 1 :. L.H.S = R.H.S
Types of Logarithm 1. Natural Logarithm: The logarithm of a number to the base e is called natural logarithm. It is also called Napieian logarithm. The value of e = 2.7186 (approximate)
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Comprehensive Remedial Mathematics for Pharmacy
2. Common Logarithm: The logarithm of a number to the base lOis called common logarithm. In numerical calculations common logarithms are used. The common logarithm of a number consists of two parts: 1. The integral part of logarithm is called characteristic, and 2. The decimal part is called the mantissa.
To find characteristic of a common logarithm: The following rules are: Rule 1: Number greater than 1. The characteristic of a common logarithm is a positive integer and is one less than the number of digits in the integral part of that number.
Number
Number of digits in the inte2ral part of the number
Characteristic
(i) 2.70827
1
1-1=0
(ii) 56.787
2
2-1=1
(iii) 134.82
3
(iv) 1348.2
4
.
3-1=2 4-1=3
Rule 2: Number less than 1. If the positive number begins with a decimal point, the characteristic of its common logarithm is negative and is numerically one greater than the number of zeros immediately after the decimal point. The negative characteristics are written as a symbol (-) 'bar' over it, i.e. -1, -2, -3 etc., are negative characteristics which are written as 1,2,3 etc., and read as one bar, two bar, three bar etc.
Number
Number of zeros after decimal point in this number (- n)
Adding 1 Charactristic
-
(i) 0.9207
0
0+1=1
-lor 1
(ii) 0.00392
2
2+1=3
-30r3
(iii) 0.0342
1
1+1=2
-2 or 2
(iv) 0.00007027
4
4+1=5
-5 or 5
-
-
-
Logarithm
233
To find mantissa of a common logarithm To find the mantissa of common logarithm of a number, special tables have been formed. These tables are called logarithmic table.
Procedure: (i) Ignore the decimal point, use the digits irrespective of the decimal point. Also ignore zero if it is not a significant figure. In case of more than four significant figures, round off the number up to four significant figures while using the four figure log tables. (ii) The first two digits are used for determining the row of logarithm table. If there is only one digit then we add a zero. (iii) Proceed along that row till that column (in the main body) of third digit is reached. Read offthe figure in that row and column. (iv) Proceed along that row till that common (in the main difference) of fourth digit is reached and read off this figure. (v) Add the two figures obtained in step (iii) and (iv). This is the required mantissa of the common logarithm.
Example 10: Obtain the logarithm of90. Solution:
The given is greater than 1 so characteristic is 2 - 1 = 1
For mantissa: First look down the left column to locate 90, look across the 90 row and locate the entry under column 90 labelled o. Read off this figure 9542. Hence mantissa of 10glO 90 = 0.9542 :. 10glO 90 = characteristic + mantissa =
1 + 0.9542
= 1.9542 !£xample 11: Find the logarithm of 0.0004291 Solution:
characteristic: The given is less than 1 and the number of zeros after the decimal point is 3 hence, the characteristic = - (3 + 1) or - 4 or 4.
Mantissa:
Ignore decimal point consider the number 4291 The figure 42 under 9 in main table
= 6325
The figure 42 under I in main difference adding = 6326 Hence mantissa = 0.6326
234
Comprehensive Remedial Mathematics for Pharmacy :. 10gIO 0.0004291 = characteristic + mantissa =-4 + 0.6326
-
= 4.6326 Antilogarithms: The antilog of a number is that number whose logarithm is the given number. Now to find out antilog of a given number, we start with the digits after the decimal point (mantissa) in the antilog table.
Procedure: 1. In case of negative logarithm, the mantissa must be converted into a positive mantissa before reference to antilog table. 2. The first two digits of mantissa are seen in the first column of the antilog table to locate the relevant row. 3. Read off the figure given before it in the column heading of the third digit. 4. Read off the figure before that row in the mean difference under column heading of the fourth digit. 5. Add the figure obtained in step (3) and (4). The number so obtained is called a desire number. 6. Finally, use the characteristic of the given number for placing the decimal point in result, obtained in step (5). These are three conditions: (a) If characteristic is 0 or positive: In this case the number of digits in the whole part ofthe desire number will be one more than the characteristic. e.g. If characteristic is 2 then adding 1, we get 3. Thus the point of decimal will be after 3 digits to right side in the number obtained from antilog. (b) If characteristic is (-1) or 1: In this case adding 1, we get O. Thus the number will start. from decimal point. (c) If characteristic is negative and more that (-1): In this case the number of zeros just after the decimal point will be one less than the characteristics.
Example 12: Find antilog of (i) - 0.2682 (ii) 3.5386 Solution:
(i) Here, the given number is negative. So, we have to convert the mantissa into positive. This is done by adding and subtracting 1 from this number, thus - 0.2682 = - 0.2682 + 1 - 1 = -1 + (1 - 0.2682) =-1 + 0.7318 -
= 1.7318
Logarithm
235
From antilog table, The figure before. 73 under 1 in main table
= 5383
The figure before .73 under 8 in mean difference Adding
10 = 5393
Thus, desired number = 5393 The characteristic is -1. Therefore, the number must have no digit in the integral part. The number of zeros just after decimal point will (-1 + 1) i.e. O. Hence, antilog (-0.2682) = 0.5393
= 3551
(ii) The figure before .53 under 8 in main table The figure before .53 under 6 in mean difference Adding
5 = 3456
Thus, desired number = 3456 Since the characteristic is 3 or (-3). Then number of zeros just after the decimal point will be (-3 + 1) =-2 -
Hence, antilog (3.5386) = 0.003456. Example 13: Using logarithmic table, find the value of each offollowing
Solution:
(i) 2.38x3.901 (ii)(0.8931)--4 (iii) 4.83 2.38 x 3.901 x=---(i) Let 4.83 2.38x3.901 1ogx= 1o g - - - 4.83
log x = log (2.38
x
0.0148xO.274 0.8735
3.901) -log 4.83
= log 2.38 + log 3.901 -log 4.83 = 0.3766 + 0.5912 - 0.6839 log x = 0.2839 x = Antilog (0.2839) (ii) Let
x= 1.923 x = (0.8931)--4 log x = log (0.8931)--4 = -4 log (0.8931)
236
Comprehensive Remedial Mathematics for Pharmacy = -4 x (-1.9509) = -4 x (-1 + 0.9509) = -4 x - 0.0491 log x = 0.1964 x = Antilog (0.1964) x = 1.571 (iii) Let
0.0148x 0.278 x= / - - - - 0.8735 1 X
10 x=lo (0.OI48 O.278)2 g g 0.8735
=~ 10 (0.0148 X 0.278) 2
g
0.8735
=
2"1 [log (0.0148) + log (0.278) -log (0.8735)]
=
~ 2
(2.1703 +0 1 .4378- 1.9412)
=
~ [(-2 + 0.1703) + (-1 + 0.4378) -
=
2"1 [-2 - 0.3331]
2
= -1.1666 =-1-1 + 1-0.1666 =-2 + 0.8334 log x = 2.8334 -
x = Antilog (2 .8334)
x = 0006814 16 25 81 Example 14: Prove that 7 log2 - + 5 log2 - + 3 log2 - = log22 15 24 80 Solution:
L.H.S
16 25. 81 = 7 log - + 5 log - + 3 Ilog15 24 80
(-1 + 9412)]
Logarithm
=
237
710g[~) + 5 IOg[-+-) + 310 g [-+-) 3x5 2 x3 2 x5 7 [log 24 -log (3 x 5)] + 5 [log 52 -log (2 3x 3)] + 3 [log 34 log (2 4x 5)]
_
7 [4 log 2 -log 3 -log 5)] + 5 [2 log 5 - 3 log 2 -log 3)] + 3 [4 log 3 - 4 log 2 -log 5] = 28 log 2 -7log 3 -7 log 5 + 10 log 5 - 15 log 2 - 5 log 3 + 12 log 3 - 12 log 2 - 3 log 5
= IOg22 = R.H.S Example 15: Find the value of x if 7x + 7x+2 = 250 7x + r+ 2 = 250 Given Solution:
7x + 7' I Does limit exists at x = I lim
Left limit =
Solution:
f(x) =
x~l-
lim
=
h~O
(1- h)
lim x~r-
x2
2
(put x = I-h)
=I Right limit =
=
lim . + f(x) =
x~l
lim h~O
lim x~l
+
[(1 +h)2) + I]
(x 2 + 1) (put x = 1 + h)
=1+1=2 here,
lim x~1
_ f(x)
lim *' x~1 + (fx)
Hence limit off(x) does not exists at x = 1.
Example 2:
I-x lim Let f(x) = -1-,0 :s x:s 1, then evaluate x ~.!.. f(x) if it exists. +x 2
Solution:
Let
f(x)
I-x
=-
l+x
Left limit =
lim 1 - f(x) =
x~-
2
=
lim 1 1- ~ x~l+x
. l-(.!..-h) hm 2
h~OI+(k-h)
2
Calculus
301
1 -+h · 1 = 1m _2_ h~O ~-h 2 1
2 =~
=
3 2
Right limit =
3
lim 1+ f(x) =
x~-
2
lim
lim 1 1+ -
X
x~-I+x
2
1-(k+h)
1+(~+h ) 1-!2 _ 1 - 1+! -3
_
2 Since left limit = Right limit .1 lim Hence 1 f(x) exists and is equal to -. x~3
2
Continuity of a function at a point: A function is continuous at a point a if the left limit and right limit exists and both are equal to the value of function at x = a. i.e.,
lim x~a
Example 3:
_ f(x) =
lim x~a
+ f(x) = f(a)
Test the continuity of the function defined as 2
f(x)
=
{
x -4x+3 x-I
x::/.
x= 1 lim lim x 2 - 4 x + 3 Right limit = +f(x) = +- - - x~1 x~1 x-I -2
Solution:
lim (1+h)2 -4(I+h)+3 (1+h)-1
= h~O
302
Comprehensive Remedial Mathematics for Pharmacy lim h 2 - 2h
=h~O lim
= Left limit =
h~O
lim x~l-
h (h-2) =-2
f(x) =
lim x 2 - 4x + 3 x~1 x-I
lim (l_h)2 -4(l-h)+3
= h~O = = Value f(l) = -2 Since i.e.,
(l-h)-I 2 lim h +2h
h~O
lim h~O
-h -(h+2) =-2
(given)
Left limit = Right limit = value lim x~l
_ f(x) =
lim x~1
+
f(x) = f(l)
f(x) is continuous at x = 1 Example 4:
A function f(x) is defined as
f( x) = ..!. - x when 0 < x < ..!. \ 2 ' 2 1 1 - whenx=2' 2 3 1 = - - x when - < x < 1
2'
2
Prove that f(x) is discontinuous at x = Solution:
..!.
2 .. lim _ lim _ I lefthmlt= 1 f(x)= I (--x) x~x~2 2 2 =
=
hI: o[~-(~-h)] lim h~O
h=O
Calculus
Right limit =
lim\ + f(x) =
lim\ +
x~-
x~-
2
2
= lim
h~O
= lim I-f(xj:;t:
Since
x~-
2
Hence
~( l\.X)
(i _
lim h~O
2
x)
[i-(~+h)l 2 2 (l-h)=l
lim I l+f(x):;t:f(-) x~2
2
. d"IscontInUOUS at x =I IS 2
lim
Ixl does not ~ists
Example 5:
prove that
Solution:
f(x) = Ixl = x (when x > 0) = -x (when x < 0) lim lim left limit = _ f(x) = _ (-x)
x~1
x~1
x~1
lim
= h ~ 0 -(1 - h) =-1
Right limit =
lim x~1
= lim
SInce
x~1
+
lim h~O
f(x) =
lim x~1
(l + h)
_ f(x) :;t:
(x)
=I
lim x~1
+
+
f(x)
The given function does not exists Example 6:
At what point is the following function discontinuous? f(x)=
Solution:
Let
x2 -
,x2+1 x- -3x+2 3x + 2 = x 2 - 2x - x + 2 =x(x-2)-I(x-2) = (x - 2)(x-l)
x= 1,2
303
304
Comprehensive Remedial Mathematics for Pharmacy since f(x) is not defined at x = 1 and x = 2 Hence f(x) is discontinuous at x = 1 and x = 2.
Example 7: Solution:
Prove that the sine function is continuous. lim lim we know that sinx = 0 and cos x = 1 x~O
Then
lim x~a
x~O
sin x =
=
lim h~O
sin(a + h)
lim h~O
= sin a
(sin a cos h + cos a sin h) lim
h~O
cos h + cos a
lim h~O
sin h
sin a x 1 + cos a x 0 sin a sin x is a continuous function = =
Example 8: Solution:
The exponential function is continuous i.e., f(x) = eX. lim we know that eX.= 1 x~O
lim
eX =
x~a
lim
ea+h
h~O
=
lim
a
h~O
= ea.
h
e .e
lim h~O
.e
h
= ea xl
= ea
eX is continuous function.
Exercises 1.
Iff(x) = x2 - 4x + 6, find f(1), f (1) ,find f(2 + h) and f(2+h)-f(2) h
2.
Given f(x) = 3x - 1, if x > 3 = x 2 - 2, if -2 :::;; x :::;; 3 = 2x + 3, if x < -2 Evaluate f(2), f(4), f(-I), f(-3), f(O)
"2
Calculus
305
3.
Determine the domain and range of the following functions. X+7 x 2 -1 (i) -(ii) -(iii).Jx - 3 x-5 x-I 4. Iff(x) = log x, prove that feu v w) = feu) + f(v) + few) 5.
Iff(x)= IOg(I-X),provethatf(a)+f(b)= f(a+b) l+x l+ab
6.
Iff(x) = sin x and F(x) = cos x, prove that [f(x)f + [F(x)f = l.
7.
Determine which of the following are even or odd?
8.
(i)
f(x) = (x4 + 3) ~X6 -3
(ii)
f(x) = x3 (3x + X5)3
(iii)
f(x) = 2x
(iv)
f(x) = 3x - T X
If f(x) = aX, show that f(x) . fey) = f(x + y)
9. If f(x) = 1- x then prove that f(tan 8) = tan l+x 10.
4
Evaluate the limits lim 1 4x 2 -1
(i)
x~2
lim
(iii)
x~O
(ii)
2x-1 ~-~ x
(iv)
x 2 -4x+3 x~I x 2 +2x-3 lim
(v) 11.
(~- 8) lim x~-2
x 3 +8 x+2
x 2 -5x+6 x~2 x 2 -4 lim
(vi)
Evaluate 5
X4 -256
(i) lim
x-4
x~4
(ii)
7
lim x~a
7
x _a x 5 _a 5
(iii)
lim
l-cosx
x~O
Xl
lim x~a
12. Evaluate (i)
lim x~O
OO') ( III
sinpx -.smqx
r1m x~O
. . .Jx-J;.
smx-sma
(ii) .
(lV)
lim
cos ax - cos bx
x~O
x~
1
5
(x + 2)3 - (a + 2)3 x-a
306 13.
Comprehensive Remedial Mathematics for Pharmacy Evaluate lim
0) 14.
1t
lim
1+ cos2x
x-»")
(ii)
(1t-2X)2
Evaluate lim e -e (i) x-»o smx '(
15.
Show that
16.
Evaluate
17.
Evaluate (i) (iii)
-'(
( ii)
1t
I-tanx
x-»4
e smx -1 x-»o x lim
lim Ix-21 - - does not exist. x-»2 x-2 lim
x-»oo
x -I x
4x 2 -5x+7 x-»oo 2x-3 lim
lim x-»O
(ii)
eX cos x
(iv)
lim x-»oo
Discuss the continuity of f(x) = x2+ 1 at x = I x +1
19.
Discuss the continuity of f(x) =
{I-C~SX x-
l
~x) =
x
-::f.
0
x=o
2 Given
~CJx+3-~)
lim x(e" -1) x -» 0 1- cos x
18.
20.
1t
x-4
r:x +cosx
X -::f.
0
x=o Show that f(x) is continuous at x = 0 21.
Show that function is discontinuous at x = 2. f(x) =
x2
307
Calculus
22.
f(x)
If
=
{
l-cos4x . ' x-J
Xi:-
4
x=O
.,
0
Find whether function f(x) is continuous at x = O. 23.
At what points is the following function discontinuous? f(x) =
24.
Find where the following function is discontinuous f( x) =
25.
,x + 1 x- -5x+6
x-I --=-J- - -
x--4x+3
Prove that f(x) defined as below is discontinuous at x = ..!.. 2 f(x) =
if 0 < x O h =
. ../X + h - fx L1 m - - - - h-->O h
=
. ../x+h-fx L 1m h-->O h
x
(~+fx) (../x+h+fx)
x+h-x = Lim --===----==h-->O h(../x+h+fx) = Lim h-->O
--;===-----;=
../X + h + fx
1 - 2fx
Example:
Differentiate sin2 x from first principle
Solution:
Given f(x) = sin 2 x, f(x.+ h) = sin 2 (x + h) by definition dy sin 2 (x+h)-sin 2 x - = Lim - - - - - dx h-->O h . sin (x + h + x) sin (x + h - x) -~--~-~--~ h-->O h
= L 1m
(.: sin 2A - sin 2B = sin (A + B) sin (A - B) . sin (2x + h) sin h = L 1m --'---'--h-->O
=
h
sin-h· (. Sill 2x + h) . L'1 m L 1m h-->O h-->O h
= Lim sin (2x + h) = sin 2x h-->O
Example:
Differentiate eX by first principle
Solution:
Given f(x) = eX, f(x + h) = ex~h
Differentiation by definition d
--.r = dx
ex+h _ex
Lim - - h-->O h '(
x
h
=
. e.e-e LI m - - - h-->O h
=
lim --'---":" h-->O h
eX(eh_l)
h2 ... -1 eX ( l+h+T!+ =
Lim
h
h-->O
~ + ...)
eX .h (I + =
Lim
h
h-->O
=
1
Lim eX h-->O
(I + E.. + ... ) 2!
=
Example:
Differentiate logx by first principle
Solution:
Given f(x) = logx, f(x + h) = log (x + h)
eX
By definition dy = Lim log (x + h) -log x dx h-->O h
= Lim =
h
log ( x + h ) x
Lim
~h
IOg(l
Lim
~h (~_~(~)2 + ... ] x 2 x
h-->O
=
~
h-->O
h-->O
= Lim h-->O
1
x
(.; log m -log n =
+~) x
(~-~~+ x 2 x 2
. .)
109: )
313
314
Comprehensive Remedial Mathematics for Pharmacy
Example:
Differentiate sin x by first principle
Solution:
Given f(x)
= sin x, f (x + h) = sin (x + h) = Lim (sin (x + h) - sin x) h-+O h
2 cos x + h + x . sin _x_+_h_-_x = Lim h-+O
2
[
1
2
h
. h
sm= Lim cos x +.!: . _ _ 2 ( h-+O 2) h 2
=
sin.!: Lim cos ( x +.!: ) . Lim - h 2 h-+O 2 h-+O 2
= cos x
Example:
Differentiate (sec x + cosec x) w.r.t. x
Solution:
Let
y = sec x + cosec x dy d d -=-secx + -cosec x dx dx dx = sec x tan x - cosec x cot x
Formula (i) Differential coefficient of the product of two functions
(product rule)
d d d -[fl (x).f2(x)] = fl (X)-f2(X) + f2(X)-fl (x) dx dx dx (ii) Differential coefficient of the quotient of two functions d d f2 (x) x -dx fl (x) - fl (x) -dx f2 (x) - - - = ----==------=-----'::::..:..-dx f 2 (x) [f2 (X)]2 d fl (x)
(quotient rule)
Differentiation
Example 4:
Differentiate x2 10g x w.r.t. x.
Solution:
d 0 2d do -(x-. logx) = x -log x + log x -xdx dx dx 2
1
= x . - + log x. 2x x = x + 2x log x =x(l + 210g x) Example 5:
Differentiate sin x . log x w.r.t. x.
· o utlOn: Sl
. -de' Sin X. I og) x = Sin dx
X-d
dx
Sin log x + Iog x -d . dx
X
. X. -1 + Iog x. cos x = Sin x
Sin X
= - - + logx. cos x x Example 6:
Differentiate x3 eX sin x w.r.t. x.
Solution:
~(X3. eX. sin x) dx
= x3 ~ (ex. sin x) + eX sin dx
X~X3 dx
~sin x + sin x ~ex] + eX sin x. 3x2 dx
= x [e X dx 3
3
2
= x le x cos x + sin x.e x J + 3x eX sin x = x3 eX cos x + x3 eX sin x + 3x2 eX sin x
Example 7:
Solution:
. . eX Dlfferentlate- w.r.t. x.
x
d X X d x-e -e - x dx dx x2
315
316
Comprehensive Remedial Mathematics for Pharmacy 2
Example 8:
'f:>: . 5x +6x+7 Dl lerentlate 2 w.r.t. x.
Solution:
2 d [5X +6X+7] dx 2X2 +3x+4
2x +3x+4
(2X2 -
+3x+4)~-(5x2 +6x+7)-(5x2 +6x+7}-~(2x2 +3x+4) ~
~x2+3x+4)
=
~
(2X2 + 3x + 4)(5.2x + 6.1 + 0)- (5x 2 + 6x + 7 )(2.2x + 3.1 + 0) (2X2 + 3x + 4)
=
(2x2 +3x+4)(10x+6)-(5x 2 +6x+7)(4x+3) (2X2 +3x+4)
20x 3 +12x2 +30x 2 +18x+40x+24-20x3 - 15x 2 -24x2 -18x-28x-21 (2X2 +3x+4) 3x2+12x+3 (2X2+3x+4)
Example 9:
x dy Ify = - - , then prove that x - = y(1-y). x+5 dx
Solution:
x y=-x+5 d = ---.r dx
(x+5) dy x-x~(x+5) dx dx (X+5)2 (x + 5) .1- x (1 + 0)
(x + 5)2
= (x+5)-x (x + 5)2
dy dx
--
5 (x + 5)2
Differentiation dy 5x x-= 0 dx (x+5)-
x
5 x+5 x+5 =Y(l _ _ X ) x+5 dy x - =y(l-y) dx
Differential Coefficient of a Function of Function Ify = fez), where z = F(x), then by eliminating z, we get y = f {F(x)} . x3,e smx" cos 2x are t he fiunctIOn . 0 f fiunctIon. . e.g. Sill
Again, let
y = f(t), where t = g(x)
Then
dy = dy . ~, this is known as 'chain rule'. dx dt dx
Example 10: Find the differential coefficient of sin x2 w.r.t. x Solution:
Let
.
1
y= Sill xdy d . , -=-SIllXdx dx
Put
x2 = t dy d. - = -Sillt dx dx d. dt = - SIllt.dt dx d 2 = COS t. - x dx
= COS t. 2x = 2x COS x2
317
318
Comprehensive Remedial Mathematics for Pharmacy
Example 11: Differentiate esmx w.r.t. x. Solution:
Let Put
sinx=t y=e t
Now,
dy = dy.~ dx dt dx d
t
d
.
= -e. -smx dt dx = esmx • cos x Example 12: Differentiate log (log sin x) w.r.t. x. Solution:
Let
y = log (log sin x)
Put
log sin x = t Y = logt dy = dy dt dx dt . dx id . = -dogt. - Iogsmx dt dx . =-1 -d Iogsmx t dx
Again, put sin x = u dy 1 d du -=-.-logudx t du dx lId . = -.-.-smx t u dx 1 - - - . - - . cos x log sin x sin x
cotx log sin x
Differentiation
Example 13: Ify = log
l-cosmx dy , then find - . 1+cosmx dx
Solution:
y= log
dy dx
=
1- cos mx 1 + cos mx
""Lsm . ~ -~ mx d 2 -log , mx dx 2 cos- 2
d mx = - log tandx 2
Put
mx tan-=t 2
dy d d mx - = - logt. - tandx dt dx 2 1 d mx = - . - tant dx 2 mx Again put =u 2 dy = ___ . _d_ tan u. _d__ m_x dx tan mx du dx 2 2
___ sec 2 u. m mx 2 tan2
,mx ---.sec-2 mx 2 tan-
m
2
mx cos-
m
2
mx sm-
2
2
m
smmx = m cosec mx
, mx cos-2
319
320
Comprehensive Remedial Mathematics for Pharmacy
Differential coefficient of inverse Trigonometric Functions or Trigonometrical Transformation d . -1 1 - sm x = --:=== dx Jl-x 2
Formula
d
-1
-1
- cos x = ---:=== dx JI-x 2 d -1 1 - tan x = - dx l+x2 d
-1
-1
- cot x = - dx 1+ x 2 d -1 1 - sec x =--=== dx x~ d
-1
-1
- cosec x = --=== dx x~
Differentiation by Trigonometric Transformation
J
. sm . -1 ( --2 2x Example 14: D 1·f-&lerentlate w.r.t. x. l+x
Solution:
Let
. -1 ( 2xy=sm 1+ x 2
Put
X
= tan 8
J
=> 8 = tan- I x
. -I ( 2 tan8 y=sm 1+ tan 28
= sin- I (sin 28) y=28 Y = 2 tan- I x dy = 2~ tan- I x dx dx 2
J (
0: sin 28 = 2 tan 8 ) 1+ tan 28
Differentiation
Example 15: Ify = coe l
(~ + 1], then find dy. x dx
Solution:
Y = cot
_I(~
Put
x
=> 8 = tan- I x
x=tan8 Y = cot
+1]
_1(~I+tan28 +.1] tan 8
= cot-I (sec8.+ 1J 8
tan
--+1 1
= coel co~8 1 [ sm8 cos8 = cot-I
(1 +sincos8 8J 2
= coel
2 cos [ 2 sin
~cos~
-I 8 = cot cot-
2
8 y= 2 1 -I y=-tan x 2
dy 1 d -I - = - - tan x dx 2 dx 1
1
~2
1
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Comprehensive Remedial Mathematics for Pharmacy
Example 16: Ify = sin- I (2xJl-
Xl), then find :~ .
y=sin- I (2xJl-x 2 )
Solution:
Put
~ 8 = sin- I x
x= sin 8
y = sin- I (2sin8Jl- sin 2e) = sin- I (2 sin 8 cos 8) = sin- I sin2 8 y=28 y=2 sin- I x dy dx
-
=
2 -sm d ·-1 x dx 2
=-===
~
Example 17: Differentiate sin-I ( x.Jl-x -fxJl-x2 )w.r.t. x. Solution:
Let
y= sin-I ( x.Jl-x -fxJI-X 2 )
Put
x = sin A, fx = sin B
~
B = sin- I fx
A = sin- I x,
y=sin- l (sinAJl-sin 2 B-sinBJl-sin 2 A) = sin- I (sin A cos B - cos A sin B) = sin- I sin (A - B) y=A-B y = sin- I x - sin- I fx dy d. -I d. -I r -=-sm x--sm '"I/X dx dx dx
=
1
Jl-x 2
d. -I dt --sm t . dt dx
put fx =t
Differentiation 1
.~£
1
~1- t 1
323
2
dx
1
1
~1-x2 - .JI-x . 2£ 2 ~x - x 2
Differentiation of Implicit Functions There may be a relation between x and y when it is not possible to express it in the form ofy = f(x) 'or' to solve an equation for y in terms ofx. We call such a relation as implicit function. For dy by differentiating the given relation w.r.t. x dx
Example 18: Find dy , when x2 + y2 = a 2 dx
Solution:
Given
x 2 + i = a2
differentiating both the sides w.r.t. x, we get d 2 dx
d 2 dx
d 2 dx
-x + -y =-a 2x + 2y dy = 0 dx dy 2y - =-2x dx dy = -2x dx 2y
-x y
Ans
Example 19: Find dy , when ax2 + 2hxy + bi + 2gx + 2fy + c = 0 dx
Solution:
Given
ax2 + 2hxy + bi + 2gx + 2fy + c = 0
324
Comprehensive Remedial Mathematics for Pharmacy differentiating both the sides w.r.t. x, we get d dJ d d d d a-x2 +2h - xy+b-y-+2g-x+2f-y+-c=O dx dx dx dx dx dx 2ax+2h(xdY +y~x) +2by dy +2g+2f dy dx dx dx dx 2ax + 2hx dy + 2yh + 2by dy + 2g + 2f dy = 0 dx dx dx (2ax + 2hy + 2g) + (2hx + 2by +2t) dy = 0 dx 2 (hx + by + t) dy = - 2 (ax + hy + g) dx dy = - (ax + hy + g) dx (hx+by+f)
Example 20: Find dy, when 4x2 + 9/ = 36. dx Solution:
Given
4x2 + 9y2 = 36
differentiating both the sides w.r.t. x, we get d 2 d 2 d 4.-x +9-y = - 36 dx dx dx 4.2x + 9.2y dy = 0 dx 8x + 18y dy = 0 dx 18y dy = - 8x dx dy dx
= -8x 18y -4x 9y
+~=O
Differentiation Example 21: Find dy, when ~ + ~ = l. dx x y Solution:
Given
1
1
x
Y
- +-
=
1
y+x = 1 xy y+x=xy differentiating both the sides w.r.t. x, we get dy d dy d -+-x=x-+y-x dx dx dx dx dy +1 =x dy +y dx dx dy dy --x-=y-l dx dx dy (l-x)=y-l dx dy y-l -=-dx I-x Example 22: Solution:
Find dy, when x3 + Sxy + y3 = 64. dx Given x3 + Sxy + l = 64 Differentiating both the sides w.r.t x, we get d 3 d d 3 d - x +S-xy+-y =-64 dx dx dx dx 3X2+S(xdY +Y)+3 y2dY =0 dx dx 3x 2 +Sx dy +Sy+3 y 2 dy =0 dx dx (3x 2 + Sy) + (Sx + 3l) dy = 0 dx (Sx + 3l) dy = -(3x2 + Sy) dx dy -(3x 2 +Sy) -dx SX+3y2
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Comprehensive Remedial Mathematics for Pharmacy
Logarithmic Differentiation: If the power of a function of x is also a function of x, then it would be convenient for us if we first take logarithms w.r.t the base e and then differentiate both sides w.r.t x. Let us recall the formulae
(i)
log mn = n log m
(ii)
log(mn) = log m + log n
(iii)
log -
m n
=
log m - log n
Example 23:
If Y = xx, then prove that dy = XX (1 + logx) dx
Solution:
Given y = XX Taking log on both the sides, we get log y = log XX log y = x . log x Differentiating both the sides w.r.t x, we get d d d -logy = x-Iogx + logx-x dx dx dx 1 dy 1 - - = x.-+ logx.l Y dx x 1 dy --=1+10gx Y dx
•
dy = y(l + log x) dx
Differentiation of Parametric equation: when variables x and y are expressed in terms of a thir~ variable like t or e, then this third variable is called parameter. e.g. x = get) and y = h(t), these are called parametric equations. Formula
--~
dy = dy I dt dx dx/dt
Example 24:
Ifx = a sec e,
y = b tan e,
Solution:
Given.x~
y=btane
a sec e,
"
find dy. dx
Differentiation dx - = a sec 8 tan 8, d8 dy dy/d8
327
2 dv -" = b sec 8 d8
---=----
asec8tan8 b =-cosec8 a
Example 25:
1 dy Ifx = at-, y = 2at, then find - . dx
Solution:
Given x = at2
y = 2at
dx - =2at dt dy dv,dt
dy =2a dt
-=-"--
dx
dx,dt 2a 2at
=
t
Differentiation of Infinite Series: When the function is given in infinite series. In this case we use the fact that if a term is deleted from an infinite series it remains uneffected. '"
Example: Solution:
dy , find - . dx
here y = xY ~
log Y = Y log x
Differentiating w.r.t x, we have 1 dy d dy - - = y-logx + logxy dx dx dx
=2::. + logx dy x
dx
(~-IOgX] = 2::.x
dy dx y
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Comprehensive Remedial Mathematics for Pharmacy dy dx dy dx
[1- YyIOgX) =.rx 1
yx(l-ylogx)
= -----''----
y=Jsinx+~sinx+Jsinx+ .......oo
Example:
If
Solution:
Here
, Prove that dy = cosx
dx
y=~sinx+y
l
= sinx +y
2ydy =cosx+ dy dx dx dy (2y -1) = cosx dx dy cosx ---dx 2y-l ~rxj")
Example:
If y = (~ I
Solution:
Here
D
x
d
y=(~r logy=y log ~ logy=
r2
log x
Differentiating w.r.t x, we get 1 dy y 1 log x dy --=-.-+--ydx 2 x 2 dx
dY[~_IOg~)=L
dx y
2
2x
I
dy [2 -ylogx =L dx 2y ) 2x dy dx
2
show that ~ = y dx x(2-ylogx)
y2
-=----'---
x(2-ylogx)
2y-l
329
Differentiation
Example:
If y = e He ,~e'~ ~,show that dy = _y_ dx l-y
Solution:
Here y = eX+Y Taking log on both sides (.: loge = 1)
log y = (x + y) log e log y = x + y Differentiating w.r.t x, we get
~ dy =1 + dy y dx
dx
dY(~_I)=1
dx y
dY(I-y) =1 dx y dy dx
y I-y
----
y=Jx+~x+.Jx+ ......oo
Example:
If
Solution:
Here y=~x+y
then prove that dy =_·_1_ dx 2y-1 ..... (1)
Taking log on both sides log y =
1 2
- log(x + y)
Differentiating w.r.t x, we get
~ dy =~._I_(I+ dY) y dx
[
I
2 x+y
1
y- 2(x+y)
1
dx
dy 1 dx = 2(x+y)
From eg. (I) x + Y = / Putting in eg. (2) we get
( ~Y __2y21_) dydx -__2y21_
..... (2)
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Comprehensive Remedial Mathematics for Pharmacy
[
2Y-1)dY _ 1 dx - 2y2
2T
dy dx
2y-1
Successive Differentiation: Differentiating the first derivative of a function we obtain second derivative, differentiating the second derivative, we get the third derivative and so on. This process of finding derivatives of higher order is known as successive differentiation.
Example 27:
Find second derivative ofax3 + bx 2 + cx + d
Solution:
Let y = ax3 + bx2 + cx + d Differentiating w.r. t x, we get dy = 3ax2 + 2bx + c dx Again differentiating, we get
~ (dY) dx dx
= 3a (2x) + 2b + 0
d2 y - 2 =6ax+2b dx
Example 28:
d2 If Y = x + tanx, Prove that cos 2 x - { + 2x = 2y dx
Solution:
Given y
= x + tanx
Differentiating w.r.t x, we get dy = 1 + sec2 x dx Differentiating again, we get
~ (dY ) dx dx
= 0 + 2 sec x . sec x tan x
d 2y
--2 = 2 sec2 x tan x dx
2tanx - cos 2 x
Differentiation
Some Practice Questions First Principle
Example 1:
Differentiate cos x by frrst principle.
Solution:
Let f(x) = cos x, f(x + h) = cos(x + h) Then by frrst principle dy
-dx
lim f(x + h) - f(x) h~O
=
=
h
lim cos(x + h) -cosx h~O
h
. x+h+x . x-x-h lim 2 sm 2 sm 2 h
h
lim 2 sin( x +
=
h~O
%)sin( -2
)
h
. h . ( h) lim sm 2 =sm x+- . -h~O 2 h~O h 2 lim
=-sin x
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Comprehensive Remedial Mathematics for Phannacy
Example 2:
Differentiate tan x by first principle.
Solution:
Let f(x) = tan x,
f(x + h) = tan (x + h)
then by first principle dy dx
--
=
lim f(x + h) - f(x) h~O h lim tan(x + h) - tan x h
h~O
sin(x + h) lim cos(x + h) = h~O h
=
sin x cosx
lim sin(x + h)cosx - cos(x + h)sin x h~0 hcosxcos(x + h) lim
sin(x + h - x)
=h ~ 0 hcosxcos(x + h) =
lim sin h lim 1 h ~ 0 h 'h ~ 0 cosx.cos(x + h)
=lx---cosx.cosx
Example 3:
Differentiate sec x by first principle.
Solution:
Let f(x)
= sec x, f(x + h) = sec(x + h)
Then by first principle dy =lim f(x+h)-f(x) dx h-+O h . sec(x+h)-secx =11m --'----'----h-+O
h
Differentiation
-------
= lim cos(x + h)
cosx
h
h.....O
cos x - cos(x + h) = II' m ------'-h ..... O hcosxcos(x+h)
'( x+h), h ,sm2 sm 2 2 HO h cos x cos( x + h)
= lim
, h
sm2 = lim sin(x +.!:) , lim - - - - - - ,lim -h2
h .....O
h ..... O
cosxcos(x+h)
h ..... O
2 smx
=----xl
cosx,cosx
= sec x, tan x Example 4:
Differentiate .Jsin x by first principle,
Solution:
Let f(x) = .Jsin x ,
f (x + h) = ~sin (x + h)
Then by first principle dy dx
= lim f(x + h) h ..... O
f(x)
h
, ~sin (x + h) - .Jsinx =hhm --'-------.....O h '
= I1m
~sin (x + h) - .Jsin x h
h ..... O
'
sin (x + h) - sinx
= I1m -r========:--r===h ..... O h(~sin
(x + h) + .Jsin x)
2 cos (x + .!:), sin.!:
~sin (x + h) + .Jsin x
x -'-;=====-----r==
' 2 2 = I1m -r=====---'r===HO h(~sin (x + h) + .Jsin x)
~sin (x + h) + .Jsin x
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Comprehensive Remedial Mathematics for Pharmacy
.
cos( x+%)
= hm-r======;--.j'==' h~O ~sin (x + h) + sin x
l' sin% lm-h hO 2
cosx
=-==;----==
.J sinx + .Jsinx
= ExampleS: Solution:
cosx 2 .Jsinx
Differentiate sin-1x by fIrst principle. Let f(x) = Sin-1 x = y, f(x + h) = sin-1 (x + h) = y + k ~
x = sin y
x + h = sin (y + k)
Then by fIrst principle dy = lim f(x + h) - f(x) dx h~O h . sin-l (x+h)-sin-1x = 11m ---'-----''---h
h~O
. Y+ k - y =11m ---=----"h~O
(x + h) - x
k
(ash~O ~ k~O)
=lim-----k~O sin (y + k) - sin y
r
n~
k
= ,'To 2COs(Y+
Sin
k 1
· = 11m
k~O
cos
(
k) y+"2
. l'I m2- -
1 1 =--xl =--
cos Y cos Y 1 =-;==== ~l- sin 2 y 1
=--===
F-7
k
k~O. SlD"2
Differentiation
Example 6:
Differentiate sinFx by first principle.
Solution:
Let f(x) = sinFx ,
335
f (x + h) = sin.Jx + h
Then by fi~st principle dy
dx
= lim f(x + h) - f(x) h
h->O
.
sin ~(x + h) - sinfx
= 11m - - - ' - - - - - - -
h
h->O
2
cos( ~ +~)Sin( ~ -~:
= lim--~--------'------'------'h
h->O
(rx+h +fx)
2
=lim
cos
2'
h
h->O
= lim
2 c