IB Prepared IB Diploma Programme Mathematics: Applications and Interpretation [1 ed.] 1382007310, 9781382007313, 9781382007283
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O X
F O
R
D
I B
P
R
E
P A
R
E
D
MATHEMATICS:
APPLIC ATIONS
AND
INTERPRETATION
I B
D I P L O M A
P R O G R A M M E
Peter Gray
David Harris
/
O X
F O
R
D
I B
P
R
E
P A
R
E
D
MATHEMATICS:
APPLIC ATIONS
AND
INTERPRETATIONS
I B
D I P L O M A
P R O G R A M M E
Peter Gray
David Harris
/
Acknowledgements
Cover
3 Great
Clarendon
Oxford
and
of
Street,
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furthers
the
Oxford
Oxford,
Press
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trace
been
errors
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contact
possible
or
in
all
all
omissions
copyright
cases.
at
the
If
earliest
opportunity.
Links
to
third
information
contained
in
party
only.
any
websites
Oxford
third
are
provided
disclaims
party
any
website
by
Oxford
in
responsibility
referenced
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good
for
this
faith
the
and
for
materials
work.
/
C ontents
Intr oduc tion
iv
4 Sta tis tic s and pr obability
4.1
Probability
149
4.2
Probability distributions
160
4.3
Transformations and combinations
1 Number and algebr a
1.1
Real numbers
2
1.2
Sequences and series
1.3
Algebra (AHL)
20
1.4
Complex numbers (AHL)
24
1.5
Systems of equations
31
1.6
Matrices and matrix algebra (AHL)
33
End-of-chapter practice questions
8
39
of random variables (AHL)
170
4.4
Poisson distribution (AHL)
176
4.5
Descriptive statistics
179
4.6
Correlation and regression
187
4.7
Statistical tests
191
4.8
Sampling (AHL)
197
4.9
Non-linear regression (AHL)
199
4.10
Condence intervals and
2 Func tions
hypothesis testing (AHL) 2.1
Lines and functions
2.2
Composite functions and
201
46
4.11
Transition matrices and
Markov chains (AHL) inverse functions (AHL)
53
2.3
Graphs and features of models
55
2.4
Graphs and features of models (AHL)
211
End-of-chapter practice questions
215
74
5 C alculus End-of-chapter practice questions
91
3 Geome tr y and trigonome tr y
3.1
Working with triangles
3.2
Sectors of a circle; volumes and
5.1
Dierentiation
224
5.2
Integration
228
5.3
Dierentiation (AHL)
231
5.4
Integration (AHL)
235
Solutions of dierential equations (AHL)
240
102
surface areas
107
5.5
3.3
Voronoi diagrams
110
End-of-chapter practice questions
3.4
Trigonometric functions (AHL)
113
3.5
Matrix transformations (AHL)
116
3.6
Vectors
120
3.7
Graphs
End-of-chapter practice questions
248
Internal assessment: an exploration
256
P r ac tice exam paper s
263
Index
277
130
139
Worked solutions to end-of-chapter practice questions and exam papers in this
book can be found on your suppor t website. Access the suppor t website here:
w w w.oxfordsecondary.com / ib-prepared-suppor t
iii
/
Introduction
This
book
(first
in
provides
examination
Mathematics:
for
both
Higher
full
in
coverage
2021)
IB
and
the
diploma
Applications
Level
of
and
Full
new
papers
syllabus
Level.
the
two
Oxford
University
companions
Mathematics:
with
Applications
HL
and
SL,
ISBN
978-0-19-842698-1.
exam
guide
for
the
and
Approaches
two
Oxford
There
new
is
which
a
sister
IB
Press
Analysis
and
978-0-19-842716-2
book
offers
support
to
their
examinations.
It
study
concepts,
material,
strengthen
and
improve
The
book
exam
learn
course
is
tips
your
that
the
with
HL
and
common
annotated
informed
errors.
help
you
essential
to
IB
worked
example
by
past
All
best
may
be
or
succeed
a
questions
examination
to
check
papers
your
confidence
and
a
terms
practices
are
and
Interpretations
the
formula
booklet,
to
set
further
and
the
terms
and
your
own
in
the
examination,
you
will
broad
range
of
resources,
many
online.
The
authors
you
through
making
your
hope
this
that
critical
preparation
and
more
and
this
and
part
for
the
standard
level
students
must
explain
of
IB-style
and
two
The
take
(SL)
and
complete
(SL)
or
assessment.
of
your
to
each
internal
combined
your
overall
studies.
higher
level
the
internal
assessment
three
(HL)
papers
for
Papers
1
and
2
are
and
as
DP
other
and
Paper
external
shown
in
3
a
day
assessment
the
Mathematics
—
table
grade,
or
marks
below
from
1
to
2,
3,
4,
give
your
(lowest)
to
weight
marks
20%
weight
20
20%
5
80
40%
110
30%
for
HL
80
40%
110
30%
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–
55
20%
required
response, syllabus
questions.
AHL
required
score
is
calculated
subjects
with
to
by
up
to
three
Theory
of
knowledge
carry
and
to
from
are
AHL
Especially
six
later.
questions.
All
Technology
two
questions.
problem-solving
points
sat
HL
20
3
additional
usually
required
Extended
for
their
7(highest).
topics Technology
grades
(HL)
T opics
2
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less
why
Including
diploma
exam
by
1,
IB
your
warn
Exploration
Extended-response
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of
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boost
progress
Mathematical
Technology
The
book
Interpretations assessment
opportunities
skills,
Short-response
Paper
are
DP Mathematics: Applications and
Description
Two
which
skills
1
Paper
to
efficient.
marks
Paper
list,
notes.
need
of
SL Assessment
Internal
notation
and
illustrated
which
complete
provide
monitor
the
missed.
knowledge
and
Applications
command
navigate
close
Practice
markschemes,
revise
examples
answers
examinations,
scored
textbooks,
and
of
external marks
as
SL,
examinations.
topics
student
such
papers
glossary
All against
intended
preparing
problem-solving
demonstrate
not
companions
students
approach
packed
is
978-0-19-842710-0.
will
your
book
the
stressful the
this
materials,
specimen
including
studies, for
course
syllabus
will This
guide,
Analysis
complements
Approaches,
and
your
papers,
available ISBN
study
Mathematics:
use Mathematics:
www.oxfordsecondary.
Prepared
To University
at
examination
978-0-19-842704-9
Mathematics:
course,
any
replace
IB and
online
and
and past
Interpretations,
given
questions
Press to
course
all
It As
complements
are
to
com/ib-prepared-support.
Interpretations
Standard
solutions
out
and
present
satisfy
explains
your
the
how
Exploration
marking
criteria
to
in
select
a
and
a
topic
suitable
achieve
format
the
and
highestgrade.
Extended
essay
components.
The
Over view of the book structure
book
is
divided
into
sections
that
cover
3
for
assessment,
standard
level
(SL)
higher
level
(AHL)
material
in
HL,
will
five
a
set
of
and
a
The
Internal
questions
complete
set
of
at
the
end
practice
assessment
of
each
written
and
2
for
SL,
exclusively
and
for
Papers
this
book.
1,
2
These
give
you
an
opportunity
to
test
yourself
the
actual
exam
and
at
the
same
time
provide
practice
questions
for
every
topic.
chapter,
examination
section
1
practice
chapters additional
with
Papers
IB-style
and before
additional
contains
the papers
internal
section
examination
and The
final
outlines
papers.
the
The
answers
and
and
examination
solutions
papers
to
are
all
practice
given
online
questions
at
nature www.oxfordsecondary.com/ib-prepared-support.
of
the
Mathematical
Exploration
that
you
will
have
iv
/
INTRODUCTION
Command terms
Command
term
terms
specifies
are
the
pre-defined
type
and
words
depth
of
and
the
phrases
response
used
in
expected
all
IB
from
Mathematics
you
in
a
questions.
particular
Each
command
question.
Command term
Denition
Calculate
Obtain a numerical answer, showing the relevant stages in the working.
Comment
Give a judgment based on a given statement or result of a calculation.
Compare
Give an account of the similarities between two (or more) items or situations, referring to both (all) of
them throughout.
Compare and contrast
Give an account of similarities and dierences between two (or more) items or situations, referring to
both (all) of them throughout.
Construct
Display information in a diagrammatic or logical form.
Contrast
Give an account of the dierences between two (or more) items or situations, referring to both (all) of
them throughout.
Deduce
Reach a conclusion from the information given.
Demonstrate
Make clear by reasoning or evidence, illustrating with examples or practical application.
Describe
Give a detailed account.
Determine
Obtain the only possible answer.
Dierentiate
Obtain the derivative of a function.
Distinguish
Make clear the dierences between two or more concepts or items.
Draw
Represent by means of a labelled, accurate diagram or graph, using a pencil. A ruler (straight edge)
should be used for straight lines. Diagrams should be drawn to scale. Graphs should have points
correctly plotted (if appropriate) and joined in a straight line or smooth curve.
Estimate
Obtain an approximate value.
Explain
Give a detailed account, including reasons or causes.
Find
Obtain an answer showing relevant stages in the working.
Hence
Use the preceding work to obtain the required result.
Hence or otherwise
It is suggested that the preceding work is used, but other methods could also receive credit.
Identify
Provide an answer from a number of possibilities.
Integrate
Obtain the integral of a function.
Interpret
Use knowledge and understanding to recognize trends and draw conclusions from given information.
Investigate
Observe, study, or make a detailed and systematic examination, in order to establish facts and reach
new conclusions.
Justify
Give valid reasons or evidence to suppor t an answer or conclusion.
Label
Add labels to a diagram.
List
Give a sequence of brief answers with no explanation.
Plot
Mark the position of points on a diagram.
Predict
Give an expected result.
Prove
Use a sequence of logical steps to obtain the required result in a formal way.
Show
Give the steps in a calculation or derivation.
Show that
Obtain the required result (possibly using information given) without the formality of proof.
“Show that” questions do not generally require the use of a calculator.
Sketch
Represent by means of a diagram or graph (labelled as appropriate). The sketch should give a general
idea of the required shape or relationship, and should include relevant features.
Solve
Obtain the answer(s) using algebraic and/or numerical and/or graphical methods.
State
Give a specic name, value or other brief answer without explanation or calculation.
Suggest
Propose a solution, hypothesis or other possible answer.
Verify
Provide evidence that validates the result.
Write down
Obtain the answer(s), usually by extracting information. Little or no calculation is required.
Working does not need to be shown.
v
/
INTRODUCTION
Preparation and exam strategies
In
addition
to
the
above
suggestions,
there
are
compulsory:
the
questions.
simple
rules
you
should
study
and
the
follow
during
exam
Use
Get
ready
for
study .
Have
plenty
of
water
enough
and
this
thinking
and
sleep,
eat
exam
sleep
reduce
physical
day ,
is
particularly
it
can
as
your
stress
Organize
your
exercises.
important
significantly
comfortable
place
temperature
possible
study
and
distractions.
computer
files
adequate
ventilation.
Keep
organized.
Papers
before
offline
Find
your
Plan
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arrange
into
Bookmark
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them
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HL
2
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fully
Make
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paper
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online 2
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Make
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importance.
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response
you
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each
the
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reasoning
booklets
Create
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task
sustained
provided.
tasks
3
consists
of
two
extended
response
make problem-solving
sure
approach
material.
studies.
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where
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hour
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your
a
all
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Calculators
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questions
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in
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answer
booklets
provided.
deadline.
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4.
Use
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book
as
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exam
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your
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identify
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Read
actively .
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•
Make
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key
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practice
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points
Try
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for
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looking
7.
at
Optimize
carefully ,
reference.
terms.
as 6.
Get
ready
for
the
Practise
time
Learn
a
good
should
that
for
be
you
the
display
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to
each
guide
spent
have
exam:
by
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part
to
on
all
examiner.
of
how
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the
pens,
calculator
exam
paying
Keep
possible.
answering
exam-style
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a
many
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equipment
pencils,
ruler,
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approach.
extra
your
Read
attention
answers
Double-check
as
to
short
all
all
questions
command
and
clear
numerical
values
units.
Label
axes
in
graphs
and
annotate
under Use
the
exam
tips
from
this
book.
Use
constraint. the
•
not
allocated
are
your
diagrams.
a
will
exams.
and
•
the
definitions
solve
problem
notes
on
than
graphic memorizing.
written
textbook
required 5.
anything
where
minutes improvement
3,
understanding
question Spend
and
systematically
The and
2
reference.
how
booklet
to
use
(allowed
the
in
Mathematics
all
exams)
correct
Ifyou
formula
notation
introduce
a
e.g.
put
variable
arrows
explain
on
vectors.
what
it
standsfor.
quickly
andefficiently . 8.
•
Solve
you
as
can.
exam,
Your
but
papers
paper
many
at
you
the
will
questions
school
can
end
from
should
create
of
involve.
this
All
past
give
another
book.
papers
you
using
Know
questions
a
in
trial
not
each
papers
panic.
concentrate
realistic
these
the
what
all
as
Do
on
goals
goals.
improve
a
positive
things
and
Be
performance
to
Take
you
work
prepared
and
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learn
future
attitude
can
and
improve.
systematically
to
reflect
from
your
on
Set
to
achieve
your
errors
in
order
results.
vi
/
INTRODUCTION
Key features of the book
Each
chapter
checklists.
typically
Chapters
covers
contain
one
the
topic,
and
following
starts
with You
should
know
and
You
should
be
able
to
features:
Example
Note
Examples
offer
solutions
to
typical
questions
and
demonstrate
Provide quick hints and
common
problem-solving
techniques.
explanations to help you better
understand a concept.
Sample
student
Definitions to rules and concepts
questions
are given in a grey box like this one,
In
and explained in the text.
response
each
answers
(many
of
response,
answer
is
which
positive
given
will
show
in
always
the
be
are
taken
and
green
given.
typical
student
from
negative
and
An
red
past
responses
examination
feedback
pull-out
example
is
to
on
the
boxes.
shown
IB-style
papers).
student’s
The
correct
below.
S AMPLE STUDENT ANS WER
This feature assists in answering
par ticular questions, warns
Consider
against common errors and shows
=
c
+
id,
the
distinct
where
a,
b,
complex
c,
d ∈
how to maximize your score when
answering par ticular questions.
▼
+
Find
real
part
a
+
ib,
w
+
w
of z
Although
w
z
w (b)
found
=
w
z
is
the
z
R
z (a) z
numbers
Find
the
value
of
the
real
part
+
w
of
correctly
z
w
when|z|=|w| in
terms
the
of
a
student
recall
the
and
does
b,
not
method
of
+ division
of
+
bi
(c
+
di)
complex
× numbers.
The
approach
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correct a
to
+
a
both
and
the
c
a
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+
c
+
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+
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a
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+
d)
multiply d)
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denominator
+
c
i(b
+
c
i(b
d)
+ by
the
(a
c)
conjugate
+
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of
2
+
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+
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a
2
a in
student
part
2
+
b
2
=
c
+
d)
×
to
part
awarded
the
i
i(b
i
d)
+
2
+
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(a),
moves
(b)
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Despite
difculties
i(b
1
2
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a
the
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2
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knowledge
C
is
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and
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1
+
d)
× understanding
he/she
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c (b i
demonstrates
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the
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paper
of
c
a
number.
Questions
Links provide a reference
d)
×
about
not
similar
to
past
IB
examinations
will
not
have
the
exam
icon.
to relevant material, within Practice
questions
are
given
at
the
end
of
each
chapter.
The
questions
are
another par t of this book or the headed
SL (standard
level)
and AHL (additional
higher
level).
Students
IB Mathematics: Applications and following
the
higher
level
course
should
attempt
all
the
questions.
Interpretations syllabus, that
relates to the text in question.
The
paper
questions
at
a
level
Students
only
in
1
questions
are
of
set
at
level
further
of
1–3,
divided
group
2
into
at
a
groups.
level
of
Group
4–5
and
1
group
3
6–7.
following
the
a
are
higher
the
level
SL course
course.
need
These
to
be
aware
sections
will
that
be
some
sections
indicated
by
are
(HL).
vii
/
NUMBER
1 1 . 1
R E A L
the
meaning
decimal
of
You should be able to:
signicant
gures
and
of
✔
approximate
places
decimal
nearest ✔
that
in
the
an
exact
interval
value
A LG E B R A
N U M B E R S
You should know:
✔
AND
of
centred
a
measurement
on
its
rounded
a
number
places,
to
a
signicant
given
number
gures
or
to
of
the
unit
lies
value
✔
apply
the
laws
of
exponents
to
simplify
anexpression ✔
the
laws
of
exponents
✔
the
denition
✔ of
a
nd
the
upper
and
lower
bounds
of
a
logarithm roundedvalue
✔
the
standard
scientic
form
of
notation,
represent
very
a
number,
gives
large
and
a
also
known
convenient
very
small
way
as ✔
apply
the
formula
numbers
✔
apply
the
denition
an ✔
computer
and
GDC
notation
for
is
not
appropriate
for
you
percentage
error
exponential
of
logarithms
expression
and
to
rearrange
solve
equations
standard with
form
for
to
to
write
technology
in
anyassessment.
✔
calculate
form
✔
by
write
GDC
with
hand
down
in
numbers
and
with
numbers
appropriate
written
in
standard
technology
given
by
a
calculator
or
notation.
Approximation, errors and estimation
The
are
processes
fundamental
Artem
carries
number
of
ranging
from
mean
as
of
of
close
in
out
sweets
all
as
counting,
737
the
Note
a
an
in
to
possible
value
of
spreadsheet
went
application
experiment
a
large
8378
guesses
1581.083 969 465 6
exact
the
to
and
1627.
took
Ar tem applied the idea of “ The
Artem
on
wisdom of the crowd”, in which
twosignificant
to
measuring,
Artem
far
less
express
figures
Artem
reflected
time
his
by
to
asks
each
read
these
For
make
that
this
all
a
the
rounding
guess
the
estimate,
the
number
the
was
the
an
to
finding
calculated
that
example,
students
averaging
by
approximating
estimate
counting
estimate
applying
He
find
that
than
has
good
number.
amazed
he
students
a
and
mathematics.
which
provide
exact
was
in
131
sweets.
can
the
jar.
of
estimating
mean
close
131
to
as
the
numbers
on
sweets!
it
correct
to
rules:
estimates of a quantity made by
each member of a large group
Significant figures:
are collected and the average 1,2,3,4,5,6,7,8 and 9 are always significant.
found. The theory is that the 0 is significant if it is between two significant figures or at the end of the overestimates and underestimates number after the decimal point. balance out when the average is
Rounding to a given number of decimal places or significant figures: taken, leaving a good estimate of
the size of the quantity.
5,6,7,8,9 round up, whereas 0,1,2,3,4 round down
2
/
1 .1
To
express
third
to
his
estimate
significant
write
Hence
1600.
the
correct
to
to
figure
in
Similarly ,
estimate
two
and
two
figures,
1581.083 969 465 6,
for
1627
the
significant
significant
he
exact
which
rounded
values
Artem
2
were
is
down
the
8,
examined
and
to
0
same
get
when
NumbERs
the
rounded
to
RE Al
up
1600.
expressed
figures.
Eape 1.1.1
(a)
Write
(b)
(c)
0.041 792
Write
Write
67.0812°
8307.59
m
correct
correct
km
to:
to:
correct
to:
(i)
two
decimal
(ii)
two
significant
(i)
the
(ii)
three
(i)
the
(ii)
three
nearest
places
figures
degree
significant
nearest
figures
km
significant
figures
Solution
(a)
(i)
0.041 792
0.04
m
m
to
2
rounds
Examine
to
place.
dp
Since
second
(ii)
0.041 792
0.042
m
m
to
rounds
2
to
figure.
(i)
67.0812°
to
the
rounds
nearest
to
Since
degree
digit
(ii)
67.0812°
67.1°
to
rounds
3
to
(i)
8307.59
8308
km
to
7.
figure.
km
to
rounds
the
nearest
digit
(ii)
8307.59
km
rounds
to
1,
round
place
third
it
is
the
it
is
to
8.
Examine
5,
is
the
8,
to
2.
place.
units
significant
round
figure
first
4.
the
decimal
to
the
1.
decimal
round
the
round
fourth
it
to
figure
round
the
to
the
significant
7,
first
significant
Since
km
0,
Since
Examine
to
the
is
third
(c)
the
it
Examine
sf
is
decimal
significant
Examine
67°
it
Since
second
(b)
third
decimal
Examine
sf
the
the
fourth
place.
units
significant
Avoid premature rounding by
8310
km
to
3
sf
figure.
Since
it
is
7,
round
the
using the unrounded answers on
third
significant
figure
to
1.
your GDC. By doing this you avoid
accumulation of errors.
Valentina
that
his
sweets,
an
repeats
method
Artem’s
could
Valentina
estimate
of
asks
experiment
work.
154
With
a
she
different
students,
2303.980 519 480 5.
since
jar
averages
Artem
says
finds
hard
containing
their
his
it
guesses
estimate
is
to
imagine
2210
and
finds
better
since
Unless otherwise stated in the it
is
closer
to
the
exact
value:
the
difference
between
his
estimate
and
question, all final numerical the
exact
value
is
1627
−
1581.083 969 465 6
=
45.916 030 534 4
whereas
for
answers must be given exactly or Valentina
it
is
2269.435 064 935 1
−
2210
=
59.435 064 935 1.
correct to three significant figures.
But
of
in
the
fact,
Valentina’s
exact
value.
v
ε
You
find
is
less
the
when
expressed
percentage
error
ε
as
by
a
percentage
applying
the
v A
formula
error
E
=
×
100%
,
where
v
is
the
exact
value
and
v
E
is
the
A
v E
approximate
value
of
v
Artem:
Valentina:
45.916 030 534 4
59.435 064 935 1
× 2210
100%
=
2.69%
×
100%
=
2.82%
1627
3
/
1
Whenever a measurement is approximated to the nearest unit u as v
,
A
u
lies in an interval: v
the exact value v E
u
−
≤
A
v
n
200
>
(n
1)
>
40,
(n
1)
d
to
write
the
inequality
needed.
41
day
than
⇒
+
1
42
of
250
training,
Adrian
will
first
It
swim
is
a
good
Adrian
lengths.
255
idea
swims
lengths,
to
250
hence
check
your
lengths.
42
is
On
answer:
day
42
On
he
day
41,
swims
correct.
n
(b)
(2(50)
+
5(n
1))
>
5000
⇒
You
must
apply
this
formula
to
write
the
2
inequality n
>
because
n
is
not
known.
36.219 25...
Hence
after
37
swum
more
days
than
training
5000
Adrian
will
Use
have
your
solve
lengths.
the
GDC
to
create
inequality .
a
graph
Notice
that
or
S
a
table
=
4950
to
and
36
S
=
5180.
The
final
answer
must
be
an
integer
37
and,
in
satisfy
A geometric
consecutive
For
sequence
terms
example,
the
is
is
one
in
constant.
common
which
You
ratio
of
call
the
the
ratio
this
r
between
quantity
sequence
4,
any
this
the
9,
13.5,
…
the
nearest
integer
does
not
inequality .
two
the common
6,
case,
is
ratio.
1.5
u n
+
1
because
=
1.5.
Informally ,
you
can
say ,
“Each
term
of
the
sequence
u n
is
1.5
times
terms
The
of
larger
the
sequence
general
term
u
and
than
formula
common
the
will
for
previous
term”.
If
r
>
1,
then
the
size
of
the
increase.
the
ratio
r
nth
can
term
be
of
a
geometric
found
by
sequence
investigating
the
with
first
terms
of
1
this
sequence:
n
1
u
2
u
n
3
u
1
4
u
2
5
u
3
u
4
u
=
u
1
n
(r)
u
1
(r)(r)
1
u
(r)(r)(r)
=
u
1
pattern
gives
you
the
general
formula
u
=
n
r
5
u
1
n
The
u
–
…
6
4
u
r
1
…
u
5
3
u
6
r
…
1
1
r
1
Eape 1.2.4
For
(i)
each
the
of
first
these
term
geometric
u
sequences,
(ii)
find:
the
common
ratio
r
(iii)
1
(a)
5,
10,
20,
40,
…
u 7
(b)
24,
12,
6,
3,
…
(c)
1.5,
3,
6,
12,
…
11
/
1
Solution
(a)
u n
The
(i)
u
=
common
ratio
is
equal
to
r
+
1
=
,
so
you
have
a
choice
of
u
5
n
1
how
to
find
r:
10
(ii)
r
=
=
2
5
20
40
10
,
or
are
equivalent
ways
to
find
r
=
2.
6
(iii)
u
=
5(2)
=
24
=
320
10
20
5
7
(b)
(i)
u
It
is
important
to
remember
that
the
7th
term
means
the
common
1
7
ratio 12
(ii)
r
=
is
raised
to
the
6th
power,
since
u
7
= 24
=
u
1
n
an
2
application
of
the
formula
u
=
u
n
–
–
1
6
r
=
u
1
r
.
This
is
1
1
r
1
6
⎛
(iii)
u
=
7
1
24 ⎜ ⎝
⎞ ⎟
2
=
0.375
⎠
(c)
(i)
u
=
1.5
1
3
=
(ii)
−2
1.5
6
(iii)
u
=
1.5(
2)
=
96
7
n
u
(r
1)
1
The
formula
for
the
sum
of
n
terms
of
this
sequence
is
S
=
.
n
r
If
r
By
is
greater
than
multiplying
1,
the
you
may
find
numerator
this
and
form
more
denominator
convenient
of
this
1
to
formula
use.
by
1,
n
u
(1
r
)
1
you
can
also
write
the
equivalent
form
S
=
,
which
is
more
n
1
convenient
You
can
and
then
to
use
solve
if
0
0,
find
p
in
terms
of
q.
10
2
1
(p
[
+
2q)
=
]
log
(pq)
10
2
2
1
log
(log
=
⎠
1
log
1
⎞
log
(p
[
+
2q)
=
]
log
(pq)
10
▲ The
student
correctly
applies
2
1
(p
[
+
2q)
=
]
1
pq
+
laws
the
working
gaining
2
(p
the
2q)
=
of
2
logarithms,
setting
methodically
out
and
marks.
pq
8
1
2
(p
2
+
4pq
+
4q
)
=
pq
8
2
p
2
+
4pq
+
4q
2
p
+
4q
=
8pq
2
=
4pq
2
2
4q
2
p
=
4q
p
= ▼ The
student
complicated
and
manipulations
2
−
4q
=
4q
spends
valuable
unsuccessful
because
the
time
on
algebraic
wrong
2
4pq
=
approach
p
has
factorization
2
p
been
chosen.
(which
is
Applying
prior
learning)
to
2
–
4pq
+
4q
quickly
leads
to
the
answer.
infnte eetrc ere
You
know
that
the
formula
for
the
sum
of
n
terms
of
a
geometric
series
n
u
(1
r
)
1
is
=
S n
1
r
n
When
|r|
0
⇒
open
profit.
variale
t
>
2.11
for
3
hours
Hene
h
=
hours.
in
is
time.
Erin
order
will
ontext.
Being
open
for
2
hours
would
mean
making
a
loss.
to
3.
53
/
2
To
find
For
the
inverse
example,
the
of
a
funtion,
graph
you
first
examine
its
graph.
of 1.6
1.7
letters
1.8
RAD
2
f (x)
=
(x
2)
+
3
shows
that
y 2
f7(x)=(x–2)
when
refleted
in
y
=
x
+3
the
f8(x)=x
graph
is
that
of
a
relation:
x
In
order
to
find
the
inverse 1.6
funtion,
the
domain
of
1.7
f
letters
1.8
RAD
y
f8(x)=x
muste
restricted
so
that
it
is 2
f7(x)={(x–2)
+3,x≥2
one-to-one.
For
example,
domain
see
the
of
f
if
to
you
x
graphs
≥
of
restrit
2,
you
two
the
now
funtions:
−1
f
and
(The
f
restrition
have
The
x
the
same
final
step
x
≤
2
would
effet)
is
to
find
the
−1
equation
To
find
of
the
f
inverse
of
a
funtion:
2
(a)
Write
y
=
down
the
equation
y
=
(x
2)
x
=
(y
2)
+
3
+
3
f (x)
2
()
Transpose
x
for
y
aee 2
()
Solve
the
equation
for
y
x
3
=
(y
2)
You can transpose x for y at the x
3
=
y
x
3
+
2
2
star t of the process or at the end
and still be awarded full marks.
=
y
−1
(d)
Hene
write
down
the
f
(x)
=
x
3
+
2
−1
equation
Note
that
if
f
(x)
the
=
y
restrition
x
≤
2
was
made,
you
would
take
the
negative
(f
f
−1
root
is
and
find
f
−1
(x)
=
−
x
+
3
2.
In
oth
ases,
the
identity
)(x)
=
x
°
true.
For
example,
−1
( f
f
2
)(x)
=
f (
x
°
3
+
2)
=
(
x
3
+
=
(
x
3 )
=
x
2
2)
2
−1
−1
( f
f )(x)
=
f
3
+
3
+
3
=
x
2
2
((x
2)
+
3)
=
(x
2)
=
(x
2)
+ 3
3
+
2
°
2
=
This
is
onsistent
Although
funtion
it
is
is
with
not
useful
the
x
+
2
definition
mentioned
here:
2
i(x)
=
in
x.
the
This
+
=
of
2
x
an
inverse
syllaus,
the
funtion
has
funtion.
onept
no
of
effet
the
at
all
−1
the
value
of
x.
Note
that
identity
on
−1
(f
f)(x)
=
i(x)
reflets
the
fat
that
f
must
°
reverse
or
“undo”
the
effet
of
f:
hene
the
omposition
has
no
effet.
54
/
2.3
Gr a p H s
and
f E at u r E s
of
modEL s
s ampLE studEnt ans WEr
T wo
funtions,
f
and
g,
are
x
2
f (x)
6
g(x)
(a)
Write
()
Find
down
the
defined
in
value
3
3
1
(g
tale.
6
2
5
2
value
of
following
1
7
the
the
9
of f (1)
f)(1) °
▲ Beause
the
student
orretly
−1
()
Find
the
value
of
(
g
2) applies
the
funtions,
notation
the
value
of
of
omposite
(g
f)(1)
an
°
(a)
f(1)
=
(b)
g(f(x))
e
3
=
g(f(1))
=
found
easily
g(x)
g(1)
=
the
tale.
5 ▲ Knowledge
(c)
from
=
−2
is
that
solving
equivalent
to
nding
2 1
g
(
2)
is
applied
orretly .
1
hence:
g
2 . 3
(
2)
=
1
G R A P H S
A N D
F E AT U R E S
Y hl kw:
✔
the
differene
“draw”
✔
the
minimum
funtions
horizontal
✔
the
etween
of
the
the
key
roots
features:
terms
✔
maximum
interepts,
of
equations
linear,quadrati,
✔
ommand
vertex,
tehnology
equations;
and
vertial
features
exponential,
use
✔
determine
✔
transfer
✔
reate
diret
and
given,
and
✔
and
nd
up
inversevariation
the
a
the
formulae
for
diret
and
for
inverse
a
the
stages
of
the
modelling
asked
to
“Draw”
the
funtions
inluding
points
of
intersetion
features
of
a
graph
of
laelling
idea
and
of
from
a
or
a
y
and
to
from
key
paper
information
features
to
give
a
shape
parameters
solving
sreen
graph
axes
the
a
of
a
system
model
of
y
setting
equations
sustitution
of
using
points
into
a
variation funtion
proess. ✔
When
nd
key
sketh
the
given
✔
to
graph
tehnology ✔
graph
differenes
tehnology
general
etween
to
and
of
ui
sums
✔
models
differene
use
zeros
asymptotes
names,
sinusoidal
the
their
values,
or
M O D E LS
Y hl be ble :
“sketh”
meaning
and
of
and
O F
graph
of
a
funtion,
to
gain
apply
the
stages
of
the
modelling
proess.
maximum
aee marks
you
plotted
must
and
represent
joined
in
a
the
graph
straight
line
aurately ,
or
smooth
with
urve.
points
Axes
orretly
must
e
Using the scales given in the laelled
to
show
the
sales
and
independent
and
dependent
variales.
question is essential so that the Axes
and
straight
lines
should
e
drawn
with
a
ruler.
You
draw
the
graph fits on the graph paper. graph
on
graph
paper.
55
/
2
When
asked
general
idea
maximum
to
sketch
of
the
or
shape
minimum
e
approximately
in
e
given.
not
however
features
There
you
in
the
is
their
of
same
take
are
of
a
funtion,
relationship.
asymptotes
orret
the
orret
the
points,
the
should
graph
loation.
An
make
the
represent
Relevant
and
requirement
to
you
axes
features
of
auray
sketh
suh
interepts
indiation
of
the
sale
as
shows
as
should
must
in draw
relevant
plaes.
Exle 2.3.1
Two
paths
Path
A is
are
planned
modelled
y
in
a
the
forest.
equation
y
=
0,
running
east
from
the
0.1d
point
0
≤
d
≤
from
The
0)
8.
(0,
to
path
(8,
0).
Distanes
Path
are
B
is
modelled
measured
in
y
km
f (d)
and
d
=
−e
is
sin
the
(90d),
distane
east
0).
planners
point
(a)
(0,
where
of
the
the
garden
paths
want
ross
and
to
at
install
eah
a
water
point
fountain
where
the
at
eah
seond
turns.
Sketh
the
graphs
of
y
=
0
and
y
=
f (d)
for
0
≤
d
≤
8,
showing
all
aee the
maximum
points,
minimum
points
and
zeros
of f
Use the domain and range given ()
Hene
find
the
numer
of
water
fountains
planned
and
the
in the question to determine the oordinates
of
the
water
fountain
that
is
furthest
from
path
A.
viewing window on your GDC.
Solution
Use
(a)
the
given
maximum
f(d)(km)
values.
domain
and
Adjust
for
minimum
the
the
d
maximum
–0.1d
f(d)=e
1
sin(90d)
and
(2.96, 0.742)
minimum
values
on
the
(6.96, 0.498)
aee (0, 0)
(2, 0)
(6, 0)
(8, 0)
(4, 0)
d(km)
y-axis
so
graph
in
that
you
an
see
the
detail.
10
Show
the
relevant
points
in
You can display the graph with a
their
grid background in order to make
orret
plaes
and
inlude
(4.96, –0.608)
–1
points
(0.96, –0.907)
at
eah
end
of
the
transferring the graph from your
domain
if
they
are
relevant
to
GDC screen to paper easier.
the
question.
sale
()
Hene
the
furthest
numer
from
path
of
fountains
A has
on
planned
oordinates
the
is
(0.96,
Give
a
sense
of
axes.
9.
The
fountain
0.907).
56
/
2.3
There
are
other
tehnology
Feature
as
of
key
features
of
a
graph
the
graph
of
y
=
f (x)
How
V ertex,
to
Find
x-interept(s),
of
the
you
determine
and
f E at u r E s
of
modEL s
with
follows:
y-interept
roots
that
Gr a p H s
zeros
of
equation
maximum
f (x),
f (x)
and
f (0)
Solve
=
0
minimum
points
determine
f (x)
=
0
or
use
graphing
app.
Use
GDC’s
or
your
apply
your
your
GDC’s
graphing
knowledge
understanding
of
app
and
alulus.
a +
Asymptotes:
Funtions
of
the
form
f (x)
,
=
n
∈
Z
have
a
vertial
n
x
asymptote
domain
with
of
f (x)
is
The
horizontal
You
represent
part
of
1.1
the
equation
x
≠
x
is
asymptotes
of
0.
This
is
a
onsequene
of
the
fat
that
the
0.
asymptote
graph
=
the
y
=
with
0
eause
dashed
funtion
y
=
the
lines
range
eause
f (x)
they
is
y
are
≠
0.
not
f (x).
DEG
1.2
of
1.1
DEG
1.2
y
y
1 f1(x)= x=0
1
2
x
f1(x)= x x
x
y=0
y=0 x=0
A horizontal
also
known
asymptote
as
the
ehaviour
an
y
exploration
further
e
limit
shows
of
y
=
suggested
with
the
f (x)
y
long-term
as
the
your
x
ehaviour
inreases
shape
GDC
as
of
a
in
size.
graph,
shown
in
of
the
funtion,
Asymptoti
and
determined
Example
2.3.2
Exle 2.3.2
The
temperature
in
a
house
t
hours
after
an
eletrial
heating
unit
1.3t
turns
(a)
on
is
Sketh
of
the
modelled
the
graph
y
of
y-interept,
the
y
=
the
funtion
c(t)
for
0
≤
maximum
c(t)
t
=
≤
23te
4,
point
+19
showing
and
the
the
oordinates
horizontal
asymptote.
()
Hene
four
()
The
desrie
hours
after
heating
24ºC
when
ut
the
how
unit
the
the
temperature
heating
swithes
ontinues
heating
to
unit
unit
off
emit
turns
when
heat
swithes
in
as
house
hanges
in
the
on.
the
it
the
temperature
ools.
Find
the
reahes
value
of t
off.
57
/
2
Solution
You
(a)
of
–1.3t
c (ºC)
c(t)=23te
+
an
the
explore
funtion
the
ehaviour
outside
the
19
given
30
domain
with
a
tale
or
y
(0.769, 25.5)
widening
Both
(0, 19)
y
=
the
viewing
perspetives
window.
show
that
the
19
limiting
value
equation
y
=
of
is
the
19,
hene
asymptote
the
is
19.
4
t
1.2
(hours)
30.69
1.3
*damped
1.4
DEG
y
f4(x):=
X
f4( (0.769, 25.5)
()
At
t
=
19ºC
on.
0,
the
and
The
until
the
heater
temperature
0.769
reahing
25.5ºC
temperature
hours
a
it
23*xe^(-.
swithes
6.
19.0565...
7.
19.0179...
8.
19.0055...
9.
19.0017...
10.
19.0005...
inreases
have
maximum
efore
is
passed,
of
starts
to
x
derease,
loser
to
getting
gradually
–0.44
0.5
19.0005198757
3.56
19ºC.
Give
aee
a
detailed
aount
of
the
() hanges
30.7
in
temperature,
using
y
–1.3·x
Don’t limit your view of the
f4(x)=23·
x·
e
your
+19
answer
to
(a).
function to only what your GDC
f9(x)=24
(0.337, 24)
first shows you: exploration of the
Use
behaviour of the function outside
your
GDC
intersetion
the viewing window can give you
After
valuable insights.
unit
0.337
hours,
swithes
the
of
to
y
find
=
c(t)
the
and
y
=
24.
heating
off.
aee
When sketching or drawing asymptotic behaviour, take care to show the
shape correctly. The graph must be seen to get gradually closer to an
asymptote. It should not veer away from nor cross the asymptote.
One
sum
the
you
of
have
the
entered
funtions,
equations
again,
two
or
as
funtions
their
into
differene,
shown
in
your
GDC,
without
Example
you
it
an
graph
having
to
the
type
in
2.3.3
Exle 2.3.3
Xtar
Jewellery
edition
models
earrings
revenue
earned
with
y
the
the
ost
in
£
funtion
selling
the
x
of
making
c(x)
pairs
=
of
3500
x
+
pairs
of
26.5x,
earrings
with
limited
and
the
the
funtion
2
r(x)
(a)
=
77.6x
Find
the
order
()
By
0.08x
least
for
Xtar
numer
to
onsidering
find
the
make
the
numer
of
of
pairs
a
profit.
graph
of
earrings
of
earrings
p(x)
=
r(x)
that
will
that
c(x)
must
or
maximize
e
sold
in
otherwise,
Xtar ’s
profit.
58
/
2.3
Gr a p H s
and
f E at u r E s
of
modEL s
Solution
(a)
The
least
earrings
numer
Xtar
of
must
pairs
sell
is
In
of
order
revenue
79.
ost. ()
Sine
319.4
is
not
an
profit
for
319
and
e
The
=
e
profit,
greater
graphs
revenue
show
than
that
are
equal
Xtar
y
of
will
ost
at
=
78.02
y
4660.02
2
r(x)=77.6
p(320)
the
found:
20000
p(319)
must
a
320 x
must
make
integer, and
the
to
=
x–0.08
x
4600.00
make
making
and
the
most
selling
profit
319
c(x)=3500+26.5
x
pairs
earrings.
aee
(78.02, 5568)
(319.4, 4660)
x P(x)=r(x)–c(x) 0
1000
1000
In order to find the ver tex of
a quadratic function, you can
Sine
you
funtions
have
already ,
expression
the
p(x)
alulator
graph
entered
=
you
apply the formula for the axis
the
type
the
c(x)
and
r(x)
provides
required.
the
of symmetry, use calculus or
technology. In the context of
the problem, choose the most
efficient method.
s ampLE studEnt ans WEr
0.5x
Let
(a)
f (x)
For
the
=
e
−
graph
(i)
write
(ii)
find
(iii)
write
2,
of
down
the
for
4
≤
x
≤
4
f:
the
y-interept
x-interept
down
the
equation
of
the
horizontal
asymptote. ▲ The student expresses the
interepts
()
Sketh
the
graph
of
and
asymptote
and
(a)(i)
y
=
1
equation
of
the
f
the
y-intercept
is
(0,
to
the
with
level
the
of
orret
auray
notation
required.
1)
0.5x
(ii)
f(x)
=
0
=
e
2
f(x)
1.386
▲ The
∴
x-intercept
is
(1.39,
sketh
features
domain
(iii)
y
=
shows
the
main
0) of
the
graph
given,
and
on
the
the
asymptoti
2
y
ehaviour
is
full
are
marks
skethed
well,
hene
awarded.
(b)
6 f(x)
5
4
3
2
1
(1.39, 0) x
–3
–2
–1
3
4
(0, –1)
–2
y=
–2
–3
59
/
2
tye el
You
have
used
to
seen
in
previous
represent
models.
There
summarized
real-world
are
in
setions
several
the
tale
ontexts
examples
of
One
example
of
mathematis
appliation
models
you
of
shape
of
mathematial
must
One sketches
of
know,
distinguishing
examples
application
feature of
shape
Straight
line
Constant
Linear
f (x)
=
mx
+
Simple
c
eing
and
of
Equation model
y
of
here.
Name Name
examples
interest
gradient
y
y
2
m
1
= x
x
2
1
Paraola
Axis
of
symmetry
2
Quadratic
f (x)
=
ax
+
bx
+
Projetile
c
motion b
x
= 2a
Exponential
growth/
deay
x
f (x)
=
ka
+
c Compound Horizontal
asymptote
x
Exponential
f (x)
=
ka
+
interest,
c
y
=
c
depreiation rx
f (x)
=
ke
+
c
In
siene,
for
Direct
As n
f (x)
=
ax
,
x
inreases,
f (x)
+
n
∈
example
Z
Charles’
variation
inreases law
In
n
f (x)
Inverse
=
siene,
for
ax
As example
x
inreases,
f (x)
Boyle’s
variation
dereases where
n
∈
Z,
n
0) is equivalent
n
to stating that y varies inversely as x
Inverse
variation
Information
given:
To
determine
the
parameters:
n
y
The
inverse
variation
model
has
equation
i(x)
=
ax
where
n
∈
Z,
n
0,
graph
the
same
same
+
and
represented
of
of
of
x.
y.
y:
order
means
(x
p.
value
value
→
in
of
x-axis.
a)
to
fator
The
the
given
“input”
y.
p:
x-axis
represented
the
f (x)
is
of
f E at u r E s
are!
transformed
the
f (qx)
e
fator
x-axis
transformed
the
a
invariant:
where
py)
f
transformed
and
y:
→
een
f (x
+
transformation
an
transformations
f (x
x
f ((x
of
is
f
→
a),
sine
translation
(x,
f
onsidered
+
py)
x-axis
point
of
graph
remain
You
Hene
(x,
refletion
x
graph
the
the
graph
also
f (x)
pf (x)
point
on
eah
the
is
on
eah
×
→
streth
zero,
0
=
y)
Points
If
y
(x,
p
Gr a p H s
a,
to
to
that
y).
the
give
the
This
left
y
as
point
is
if
y
a
a
the
(x,
y)
horizontal
1,
q ⎛
eah
⎞
x
, y
point ⎜ ⎝
is
q
times
0
χ calc
crit
then the observed values are too far from the expected values so
minus 1.
the null hypothesis is rejected.
193
/
4
The
assessmen p
most
common
method
though
is
to
consider
the p-value
for
the
test.
The p-ue for a test is the probability of obtaining the results in the sample
(or more extreme ones) when the null hypothesis is true. The null hypothesis
Remember the null hypothesis is
is rejected if the p-value is less than the significance level of the test.
2
rejected if
χ calc
is gee hn the
critical value (the observed values
Exmpe 4.7 .2
are too far from the expected)
or if the p-value is ess hn the
significance level (the probability
of the observed values occurring
A six-sided
die
in
below.
the
there
table
is
is
evidence
rolled
Test
that
60
at
times
the
the
die
and
5%
is
the
outcomes
significance
level
are
recorded
whether
or
not
biased.
by chance is even smaller than the Number
1
2
3
4
5
6
Frequency
8
9
7
10
6
20
significance level).
For
five
degrees
of
freedom
the
5%
critical
value
is
11.07
Ne
Solution
It is 5 degrees of freedom because :
H
The
die
is
not
biased
The
die
is
biased
The
The
when a die is rolled.
hypotheses
must
always
be
stated.
0
there are 6 possible outcomes
H
:
null
hypothesis
is
that
the
distribution
1
is
Expected
values
if
the
equal
The
die
to
the
observed
one
and
being
tested.
expected
values
are
2
60
is
fair
are
all
=
entered
10
into
a
GDC
and
a
χ
goodness
6
assessmen p
of
fit
test
is
performed.
2
χ
=
13
> 11.07
calc
You must always give a reason
for your conclusion by comparing
There
is
sufficient
evidence
The
alternative
The
p-value
The
conclusion
reasoning
would
be:
2
to
χ calc
reject
H
with the critical value or the
at
the
5%
level,
0
so
we
conclude
the
die
=
0.0234
10
13
25
37
43
26
6
Frequency
2
In
order
to
of
pebbles
perform
in
distribution.
each
His
Length, x (cm)
State
the
(c)
Use
(d)
Perform
the
results
he
classes
are
calculates
if
their
shown
in
the
expected
lengths
the
table
did
number
follow
this
below.
2 < x ≤ 4
4 < x ≤ 6
6 < x ≤ 8
8 < x ≤ 10
x > 10
6.0
21.0
43.1
46.0
a
b
null
your
of
test,
x ≤ 2.0
Expected value
(b)
χ
a
and
answer
alternative
to
part
(a)
hypotheses.
to
find
the
values
of a
and
b
2
is
a
χ
sufficient
degrees
of
test
at
the
evidence
freedom
5%
to
for
significance
reject
the
the
null
level
to
see
hypothesis.
if
there
State
the
test.
194
/
4 .7
(i)
P(8
10
=
0.05667... ≈
are
calculated
at
the 2
start (ii)
t E S tS
assessmen p
Solution
(a)
S tat i S t i c a l
of
the
question
but
will
0.0567 be
used
In a
χ
test all the expected
frequencies need to be greater
later.
than 5. In the Standard Level exam (b)
H
:
The
lengths
of
pebbles
can
0
this will always be the case.
2
be
modelled
by
a
N(6.2,
2.4
)
distribution.
H
:
They
cannot
be
modelled
by
1
this
(c)
distribution.
a
=
150 × 0.170 ≈
b
=
150 × 0.0567
The
25.5
expected
probability ≈
degrees
of
freedom
=
6
1 =
sure
values
5
found p-value
So
to
=
there
0.0569 >
is
reject
:
The
sample
size.
for
in
you
the
part
use
the
full
probability
(a)
0.05
insufficient
H
=
8.50 Make
(d)
×
value
evidence
lengths
of
0
pebbles
can
be
modelled
by
a
2
N(6.2,
the
2.4
)
distribution.
es f ndependene
Ne
2
A special
type
of
χ
test
is
to
test
whether
or
not
two
variables
are
Most GDCs will have a different 2
independent
of
each
other.
For
example,
you
might
want
to
test
function for the
whether
the
type
of
music
people
like
is
independent
of
their
χ
test for
age.
independence.
2
This
type
of
frequencies
test
are
is
called
the
normally
χ
test
given
in
a
for
independence
contingency
and
the
observed
table.
assessmen p
S aMPlE StUDENt aNS WEr
There are several ways to write
In
a
school,
preferred
obtained
students
drink.
are
The
in
grades
choices
organized
Grade 9
in
9
to
were
the
12
were
milk,
following
asked
juice
and
to
select
water.
their
The
data
table.
your conclusion to the test.
The following is an example of
acceptable phrasing:
Milk
Juice
Water
t
25
34
15
74
‘ There is sufficient evidence to
reject H
’ or ‘ There is insufficient
0
Grade 10
31
x
13
74
Grade 11
18
35
17
70
evidence to reject H
’.
0
You should avoid ‘Accept H
’ if the
0
Grade 12
t
9
36
26
71
83
135
71
289
result of the test is not significant.
2
χ
A
H
:
test
is
carried
out
at
the
5%
significance
the
preferred
drink
is
independent
the
preferred
drink
is
not
of
the
level
with
hypotheses:
grade
0
H
:
independent
of
the
grade
1
assessmen p 2
The
χ
critical
value
for
this
test
is
12.6
An exam question might ask you (a)
Write
down
the
value
of
x
for the degrees of freedom of the
(b)
Write
(c)
Use
down
the
number
of
degrees
of
freedom
for
this
test.
test. This can normally be read off
2
your
graphic
display
calculator
to
find
the
χ
the GDC but otherwise it can be statistic
for
calculated for an n × m table as this
test.
(m − 1)(n − 1).
(d)
State
the
conclusion
for
this
test.
Give
a
reason
for
your
answer.
195
/
4
▲ Correct,
calculated
many
▼ It
3
of
picked
sf.
is
An
will
actually
no
lead
to
been
rst
also
freedom
to
answer
imply
have
but
state
so
the
(a)
30
(b)
6
(c)
18.9
(d)
Reject
the
error
can
up.
With
could
might
incorrectly
GDCs
degrees
be
it
18.96
method
a
loss
this
the
so
2
was
that
performed
12.6.
T hey
are
not
independent.
the
t-test
is
used
to
see
if
two
samples
both
coming
from
populations
correctly .
the and
>
the -es
might
distributed
▲ Conclusion
18.9
marks.
The method
because
0
this
though
examiner
H
to
shown
of
close
19.0
same
normally
mean.
For
and
with
example,
the
if
same
you
standard
want
to
test
deviation
whether
could
have
students
in
reason
Germany
bothgiven.
you
score
could
scores
of
take
each
as
a
highly
in
random
Mathematics
sample
of
each
exams
and
as
students
compare
the
in
France,
average
sample.
Ne
The null hypothesis for a t-test is: H
: the means are equal. The alternative
0
It is not sufficient to say that if might be that the means are not equal (two-tailed test) , or it might be that one the average score of one sample is greater than or less than the other (a one-tailed test). Your GDC will ask you is greater than the other then to choose. that must be true for the whole
population, but if one is a long way The
t-test
should
be
used
only
if
the
background
population
is
normally
above the other then that could distributed.
One
way
to
check
this
is
to
look
at
a
box
and
whisker
plot.
be quite strong evidence for a If
it
is
fairly
symmetrical
and
the
inter-quartile
range
is
less
than
half
the
difference in the population means. range
then
it
is
likely
to
be
close
to
a
normal
distribution.
Exmpe 4.7 .4
A teacher
wants
to
helpful
offer
is
volunteer
course.
to
All
to
stay
the
see
to
if
his
a
revision
students.
behind
students
after
are
course
Half
school
then
his
to
given
he
plans
Perform
class
attend
a
(a)
test
to
the
see
course
scores
for
the
two
groups
are
recorded
in
the
table
there
at
is
the
any
improved
10%
significance
evidence
the
average
that
the
level
revision
scores.
may
assume
that
the
scores
come
from
and normal
listed
t-test
and You
the
if
a
distributions
with
the
same
standard
below. deviation.
Took revision course
23
45
78
82
56
90
65
72
(b)
State
why
the
result
of
the
test
might
not
be
Did not take 44
32
45
79
48
69
50
valid
35
when
deciding
if
the
revision
course
revision course
improves
scores.
Solution
(a)
H
:
The
revision
course
does
not
improve
the
An
alternative
general
statement
which
will
0
scores
in
the
always
test.
be
the
populations H
:
The
revision
course
does
improve
the
same
have
for
the
a
t-test
same
is:
The
two
mean.
score
1
p-value
There
is
=
0.0893
6.04
x
=
6.5
lies
in
the
critical
region,
so
H
is
rejected.
0
(b)
x
=
6.5
> 6.04
and
hence
we
reject
H
:
μ
=
5
0
This
(c)
p-value
=
0.008 85
0
:
µ
mean
difference
of
T
0.2
0.05
reject
camp
the
has
not
so
0.1
0.5
particular
insufficient
null
be
The
hypothesis
improved
that
the
value,
differences
same
way
as
mean
normally
are
for
difference
other
equal
to
a
0.
entered
any
is
into
the
GDC
in
the
t-test.
the
times.
cnfdene ne s assessmen p
Often
A p% confidence interval is often
to
instead
give
an
of
testing
interval
or
data
range
against
within
a
particular
which
the
mean
mean
is
it
is
more
likely
to
useful
lie.
thought of as ‘there is a p% chance
that the mean is in this interval’.
Though useful, this is not the
correct definition, and so should
not be quoted in an exam.
A p% confidence interval is such that if a sample was collected many times
then the population mean μ would fall within the confidence interval p% of
the time.
Confidence
If
the
intervals
population
distribution
degrees
of
is
are
normally
standard
used;
if
not,
obtained
deviation
then
the
is
directly
known
then
t-distribution
is
from
the
the
GDC.
normal
used,
with
(Z)
n
1
freedom.
tes f he en effen
It
is
possible
to
test
whether
or
not
two
categories
are
independent
by
2
using
the
χ
correlation
will
is
be
test.
a
done
linear
alternative
coefficient
important
for
An
when
to
between
values,
remember
is
the
rather
that
to
test
two
than
the
to
see
if
variables
the
is
frequencies,
correlation
product
equal
are
to
zero.
given
coefficient
is
moment
This
though
only
it
looking
relationship.
206
/
4 . 10
coNFiDENcE
iN t E r va l S
aND
H Y P ot H E S i S
tE StiNG
(aHl)
A necessary assumption for the test of the correlation coefficient is that both
variables are normally distributed.
assessmen p The
statistic
Inthe
same
imply
r
≠
0
the
the
What
way
in
this
that
can
say
evidence
variables
a
population
correlation
we
strong
used
are
is
is
sample
mean
is
the
that
if
it
not
ρ
the
is
is
sample
mean
coefficient
that
not
test
0,
for
not
we
the
being
not
equal
cannot
whole
sufficiently
also
correlation
to
0
that
from
to
0,
0,
does
just
population
far
equal
say
coefficient, r.
and
is
performed using the inbuilt
not0.
there
hence
In exams, this test will be
because
(ρ )
then
not
the
function on the GDC and the
is
data will always be given in
two
the question.
independent.
Exmpe 4.10.6
Ne
A teacher
is
convinced
that
time
spent
playing
games
on
a
Make sure you know where to find computer
affects
the
marks
obtained
in
class
assessments.
To
test
this test on your GDC. It is likely to this,
he
selects
8
students
and
asks
them
how
much
time
each
week
be in a menu for regression tests they
spend
gaming
and
compares
this
with
the
scores
obtained
in
or Linear regression tests. the
next
assessment.
The
responses
are
shown
in
the
table.
Student
A
B
C
D
E
F
G
H
Time on computer (hours)
12
0
15
8
9
4
0
8
Score in assessment
34
61
55
38
78
65
46
82
Perform
a
evidence
between
You
test
to
the
reject
time
may
at
10%
the
spent
assume
significance
hypothesis
on
that
a
that
computer
the
variables
level
to
there
and
are
see
is
no
score
in
if
there
is
any
correlation
the
normally
assessment.
distributed.
Solution
H
:
ρ
=
0
H
0
ρ
:
≠
Even
0
though
probably
p-value
=
0.836
>
0.1
there
teacher
is
looking
evidence
to
the
10%
a
negative
the
question
is
only
reject asking
at
for
is correlation
insufficient
H
the
1
significance
whether
or
not
ρ
=
0
level.
0
tes f he men f Pssn dsun
2
It
is
possible
Poisson
it
the
use
it
being
is
not
distribution
population
Assume
X
is
if
but
a
it
see
if
particular
is
with
Poisson
to
due
a
to
a
mean.
the
different
then
it
is
sample
But
reject
H
Po(μ).
if
if
a
distribution
mean.
easy
to
come
from
significant
not
being
However,
construct
If
we
wish
to
test
H
µ
:
µ
=
a
if
it
test
the
value
of
X
obtained
against
H
0
0
we
could
is
a
result
is
Poisson
known
for
the
(μ).
mean
~
test
with
clear
Poisson
χ
the
distribution
obtained
or
to
in
our
:
µ
>
µ
test
is
very
then 0
1
unlikely
if
the
0
mean
were
µ 0
So
for
a
test
with
H
:
µ
>
µ
hypothesis
P(X
≥
a) ≤
is
rejected
0.05
if
µ
at
a
5%
significance
level,
the
null
0
1
=
if
X
≥
a
where
a
is
the
smallest
value
such
that
µ 0
In
the
diagram,
probabilities
There
are
critical
the
critical
coloured
two
region
blue
approaches
or
by
region
will
to
is
be
coloured
less
than
performing
calculating
P(X
≥
x)
blue.
The
sum
of
the
0.05
the
test,
where
x
either
is
the
by
finding
the
observedvalue.
a
207
/
4
Exmpe 4.10.7
Over
a
long
number
of
period
of
time
imperfections
it
in
is
known
printed
that
(a)
the
a
Poisson
distribution
with
the
critical
region
for
this
test.
material It
follows
Find
a
is
given
that
19
imperfections
are
found
in
mean thesample.
of
1.2
every
After
print
10
improvements
the
material
imperfections
To
m.
test
this
sample
of
it
is
occur
belief
at
length
on
the
felt
will
the
200
that
be
5%
m
is
machine
the
used
rate
at
(b)
State
(c)
Find
the
which
the
gives
reduced.
significance
conclusion
of
the
test.
to
level
p-value
the
same
for
the
result
test
as
in
and
part
confirm
this
(b)
a
checked.
Solution
(a)
Under
the
H
distribution
is
Po(24)
The
mean
is
1.2 × 20
=
24
0
H
:
µ
=
24
H
0
µ
:
0.05
It
is
more
p-value Hence
there
is
insufficient
evidence
to
reject
usual
rather
to
perform
than
the
finding
test
the
by
finding
critical
the
region.
H 0
tes f ppun pp n usng he
nm dsun
Exmpe 4.10.8
assessmen p
A company
about
its
employed
popularity
by
in
a
a
political
town.
party
They
is
know
gathering
that
evidence
nationally
the
party
The tests for binomial and Poisson is
supported
by
55%
of
the
population
but
suspect
it
might
be
less
will always be one-tailed in in
this
town.
the exam.
They
say
to
select
they
a
randomly
support
believe
the
support
in
chosen
party .
the
Is
sample
this
town
is
of
25
sufficient
less
than
people
and
evidence
at
find
the
that
5%
11
level
55%?
Solution
H
:
p
=
0.55
H
0
:
p
is
(25,
0.55),
those
in
the
sample
were
randomly
and
independent.)
the
numbers
in
our
sample
supporting
the
party
0.05 were
There
be
party .
If P(X
would
sample chosen
who
distribution
0
1
insufficient
evidence
to
reject
H
at
the
too
to
accept
In
fact
small
the
then
this
alternative
would
be
strong
evidence
hypothesis.
0
5%
significance
level.
means
the
11
probability
is
not
in
the
is
greater
critical
than
0.05
which
region.
208
/
4 . 10
coNFiDENcE
iN t E r va l S
aND
H Y P ot H E S i S
tE StiNG
(aHl)
type i nd ype ii es
The are two possible errors when performing a hypothesis test.
Type I error: Rejecting H
when H
0
is true
0
Type II error: Failing to reject H
when H
0
If
we
let
region,
C
be
and
the
so
event
H
is
of
is not true.
0
our
rejected,
sample
we
will
statistic
write
falling
the
in
the
probability
critical
of
a
type
I
0
error
as
P(C|H
).
0
The
the
probaility
test
such
when
as
the
different
The
if
type
or
error
of
a
of
a
is
by
definition,
continuous.
the
For
distribution
a
they
significance
discrete
might
II
error
value
type
II
to
is
the
error
more
difficult.
parameter
as
P(C′|H
is
),
It
can
known.
with
H
1
alternative
The
1
of
distribution
be
slightly
be
calculated
We
will
standing
denote
for
this
1
value.
process
Find
level
4.10.9)
type
alternative
is,
binomial
Example
probability
I
distribution
Poisson
(see
an
a
the
probability
only
the
of
for
the
calculating
critical
a
region,
type
given
II
error
H
is
is
always
the
same:
true.
0
2
Find
the
probability
of
not
being
in
the
critical
region
given
H
is
1
true,
P(C′|H
),
or
1
P(C|H
1
)
1
Exmpe 4.10.9
The
not
principal
do
so
if
will
a
large
fewer
50students
She
of
to
test
than
find
the
school
20%
data
on
is
of
the
the
hypothesis
H
trying
to
students
proportion
:
p
decide
=
0.2
would
p
of
against
the
(a)
Find
(b)
Write
(c)
If
sample
the
critical
down
the
the
is
region
H
and
for
of
explain
and
the
of
students
what
:
p
0,
can
be
found
from
calculating
use
trapezoidal
value
of
y
when
x
is
0
technology
to
nd
the
area
of
a
region
enclosed
by
a
curve
y
=
f (x),
the
x-axis,
and
the
f ( x) dx
∫
lines
a
the
the
where
b
f (x)
example
f (x),
✔
✔
form
n+ 1
for
✔
general
as
a
n
∫
the
n+ 1
x
=
a
and
x
=
b,
where
f (x)
>
0
rule. ✔
nd
the
an
estimate
trapezoidal
width
when
for
the
rule,
given
value
with
either
of
an
intervals
a
table
of
area
of
using
equal
data
or
a
function.
Antdervatves
Nte An
antiderivative
rate
or
for
or
finding
integral
areas
is
under
useful
a
for
deriving
an
equation
from
a
curve.
This can be written as
a
n
∫
ax
dx
n +
= n +
dy
1
x
+ c
1
a
n
=
If
ax
y
then
n+ 1
=
x n +
dx
+ c,
n ≠
−1
1
Example 5.2.1 This formula can be found in
section SL 5.5 of the formula book .
Notice that it excludes the case
where n =
−1 as the formula in this
The
rate
after
which
heating
the
temperature
element
is
turned
T
on
is
is
changing
given
by
t
minutes
the
equation
dT
=
instance would involve dividing by 0.
a
at
19
2t ,
0
Find
the
≤ t
≤ 10
dt
(a)
When
t
=
0
rate
the
(b)
Find
an
(c)
Find
the
of
change
of
temperature
expression
for
maximum
the
is
when
t
=
4
5 °C
the
value
temperature
temperature
of
T
for
0
≤ t
at
time t
≤ 10
Solution
(a)
When
t
=
The
4
dT
In standard level exams, n will
rate
asking =
19
8
=
of
for
change
the
is
value
another
of
the
of
derivative.
11
dt
dT
always be an integer. Notice 11
way
˚C
per
that
the
units
of
are
˚C
per
dt
minute minute.
(b)
T
=
∫
19
1
=
19t
Note
2t dt
∫
2
2 ×
t
that
derivative
+ c
19 dt
of
19t
=
because
19t
is
the
19.
2
2
=
19t
When
t
t
+ c
=
0,
The
value
of
c
is
found
by
substituting
2
T
=
⇒
c
19
=
×
0
–
0
+
c
=
5
known
values
for
the
variables.
5
2
T
=
19t
t
+ 5
228
/
5.2
(c)
The
maximum
value
t
=
occurs
You
when
9.5
should
to
ensure
at
t
=
0
curve T
=
the
or
it
plot
t
is
=
the
curve
maximum
10.
to
find
your
does
Having
easier
on
not
plotted
the
i N T E g R AT i o N
GDC
occur
the
maximum
95.25 °C directly
from
the
curve
rather
than
dT
=
solving
0
dt
Areas bet ween a cur ve and the x-axs y
Integrals
The
x
=
can
be
notation
b
where
used
for
b
>
the
to
find
area
(shown
a
the
area
between
as
R
in
between
the
the
curve
y
diagram)
a
curve
=
f ( x),
is
given
and
the
the x-axis.
lines
by
the
x
=
a
and
definite
b
integral
written
as
f ( x) dx
∫
a
R
Example 5.2.2 x a
The
side
wall
modelled
by
in
a
a
concert
curve
hall
with
can
b
y
be
equation
2
y
=
2.8 x
0.5 x
horizontal
theunits
(a)
Find
,
0
≤
x
distance
are
the
≤ b
from
measured
value
where
of
the
in
x
is
the
point
O
and
metres.
b 0
x b
(b)
Write
the
down
area
of
an
the
integral
which
represents
wall.
At Higher Level you will need to 2
(c)
It
is
intended
to
repaint
the
wall.
If
one
can
of
paint
covers
4.5 m
know how to work out the value
of
wall,
find
the
minimum
number
of
cans
of
paint
needed.
of the integral you wrote down in
par t (b) using integration (anti-
Solution
(a)
b
=
derivatives) but for Standard
This
5.6
can
be
equation,
found
or
by
directly
factorizing
from
the
Level you will always use the
the
GDC
appropriate function on the
by
5.6 2
(b)
2.8 x
∫
0.5 x
dx
entering
the
equation
and
finding
calculator. You should though
the
0
zero
know how to use the notation
(x-intercept).
correctly. 2
(c)
Area
=
14.6
Number
of
m
Using
cans
The
the
area
integral
is
formula
obtained
for
directly
area.
from
the
GDC.
14.6
required
≈
3.24
4.5
To 4
cans
of
find
the
minimum
number
of
cans
you
paint need
to
round
up.
The trapezdal rule
y
Before
a
the
curve
arrival
and
trapezoids
the
and
particularly
of
GDCs,
x-axis
was
working
when
the
an
approximation
often
out
found
their
equation
by
areas.
defining
for
the
dividing
This
the
is
still
curve
area
the
area
useful
is
between
not
into
y
area
between
the
curve
y
=
f ( x),
the
lines
x
=
a
and
b
can
divided
into
n
trapezoids
each
with
height
h
x
f(x)
today ,
known.
y
The
=
=
b
with
b
>
a,
y 0
y 1
y 2
y 3
y 4
y –1
a
=
,
as
shown.
a
x
x 1
x 2
x 3
x 4
b
x
–1
n
229
/
5
The
area
of
the
trapezoids
can
be
found
using
the
trapezoidal
rule:
b
1
This formula is in section SL 5.8 f ( x) d x
∫
+
y
0
+ 2( y n
+
y
1
+ ... +
y
2
n
1
))
2
a
of the formula book
h( y
≈
The question may ask you if the trapezoidal rule gives an underestimate or an
overestimate of the actual area. This is usually clear from the diagram.
Example 5.2.3
Use
the
trapezoidal
rule
with
4
trapezoids
to
find
an
approximate
value
for
the
area
between
the
curve
6
y
=
,
2 +
the
x-axis
and
the
lines
x
=
1
and
x
=
3
x
Solution
3
h
1
=
b
=
0.5
Using
the
formula
h
4
n
You x
1
1.5
2
2.5
3
y
8
6
5
4.4
4
the
should
enter
required
individually .
1 Area
a
=
should × 0.5 ( (8 +
≈
4) +
values.
For
always
function
into
Alternatively
example,
write
when
down
the
your
they
x
=
1,
GDC
can
y
y-values
=
be
2
to
+
and
read
worked
6
=
obtain
8.
off
out
You
method
4.4) )
2(6 + 5 +
2
=
the
marks
in
case
you
make
an
error
in
your
calculations.
10.7
Example 5.2.4
A nature
reserve
trapezoidal
reserve.
rule
Each
is
bounded
and
unit
the
by
a
river
coordinates
represents
one
of
and
the
a
straight
points
fence,
shown
to
as
shown
find
the
in
the
diagram
approximate
below.
area
of
the
Use
the
nature
kilometre.
(2.5, 4.2) (1, 4)
(1.5, 3.5)
(2, 3.2)
(3, 2)
(3.5, 1.8)
(0.5, 1.8) Nature
reser ve
Fence
Solution
Width
of
trapezoids
=
The
0.5
width
difference
can
easily
between
be
the
found
from
x-values,
but
the
could
1
Area
≈
× 0.5 [ (0 + 0) + 2
10.25
+
4
+
3.5
+
3.2
+
4.2
+
2
+
1.8) ]
4
also
2
=
2(1.8
be
calculated
using
h
0
=
=
0.5
8
km
230
/
5.3
5 . 3
D I F F E R E N T I AT I O N
Yu shuld knw
the
derivatives
where
✔
if
if
that
At
the
0
point
concavity
in
sin
x,
cos
x,
tan
x,
e
n
,
ln
x,
x
✔
use
the
chain
quotient
f ′′( x) >
a
( A H L )
∈
f ′′( x)