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These workbooks have been developed for the children of South
Africa under the leadership of the Minister of Basic Education,
Mrs Angie Motshekga, and the Deputy Minister of Basic Education,
Mr Enver Surty.
The Rainbow Workbooks form part of the Department of
Basic Education’s range of interventions aimed at improving the
performance of South African learners in the first six grades.
As one of the priorities of the Government’s Plan of Action, this
project has been made possible by the generous funding of the
National Treasury. This has enabled the Department to make these
workbooks, in all the official languages, available at no cost.
We hope that teachers will find these workbooks useful in their
everyday teaching and in ensuring that their learners cover the
curriculum. We have taken care to guide the teacher through each
of the activities by the inclusion of icons that indicate what it is
that the learner should do.We sincerely hope that children will enjoy working through the book
as they grow and learn, and that you, the teacher, will share their
pleasure.
We wish you and your learners every success in using these
workbooks.
Mrs Angie Motshekga,
Minister of Basic
Education
Mr Enver Surty,
Deputy Minister
of Basic Education
Term 3&4 M A T H E M A
T I C S i n E N G L I S H
Name:I S B N 9 7 8 -1 -4 3 1 5 - 0 2 2 8 - 8
Class:
M A T H E M A T I C S i nE N G
L I S H -G ra d e9 B o o k 2
Grade9
MATHEMATICS IN ENGLISH
GRADE 9 - TERMS 3&4
SBN 978-1-4315-0228-8
THIS BOOK MAYNOT BE SOLD.
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Published by the Department of Basic Education222 Struben StreetPretoriaSouth Africa
© Department of Basic Education
First published in 2011
ISBN
The Department of Basic Education has made every effort to trace copyright
holders but if any have been inadvertently overlooked the Department will be
pleased to make the necessary arrangements at the first opportunity.
This book may not be sold.
978-1-4315-0228-8
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
2 4 6 8 10 12 14 16 18 20 22 24 26 28 30 32 34 36 38 4 0
3 6 9 12 15 18 21 24 27 30 33 36 39 42 45 48 51 54 57 60
4 8 12 16 20 24 28 32 36 40 44 48 52 56 60 64 68 72 76 80
5 10 15 20 25 30 35 40 45 50 55 60 65 70 75 80 85 90 95 100
6 12 18 24 30 36 42 48 54 60 66 72 78 84 90 96 102 1 08 114 120
7 14 21 28 35 42 49 56 63 70 77 84 91 98 105 112 119 126 133 140
8 16 24 32 40 48 56 64 72 80 88 96 104 112 120 128 136 144 152 160
9 18 27 36 45 54 63 72 81 90 99 108 117 126 135 144 153 162 171 180
10 20 30 40 50 60 70 80 90 100 110 120 130 140 150 160 170 180 190 200
11 22 33 44 55 66 77 88 99 110 121 132 143 154 165 176 187 198 209 220
12 24 36 48 60 72 84 96 108 120 132 144 156 168 180 192 204 216 228 240
13 26 39 52 65 78 91 104 117 130 143 156 169 182 195 208 221 234 2 47 2 60
14 28 42 56 70 84 98 112 126 140 154 168 182 196 210 224 2 38 252 2 66 280
15 30 45 60 75 90 105 120 135 150 165 180 195 210 225 2 40 2 55 270 2 85 3 00
16 32 48 64 80 96 112 128 144 160 176 192 208 2 24 2 40 2 56 272 288 3 04 3 20
17 34 51 68 85 102 119 136 153 170 187 204 221 238 255 272 289 3 06 3 23 340
18 36 54 72 90 108 126 144 162 180 198 216 234 252 270 288 3 06 324 342 360
19 38 57 76 95 114 133 152 171 190 2 09 228 247 266 2 85 3 04 3 23 342 361 380
20 40 60 80 100 120 140 160 180 200 220 240 260 280 300 320 340 360 380 400
3 x 4=12 Multiplication table
9
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Grade
9M
a t h e m a t
i c
s
1
E
N G L I S
H
Book
2
in ENGLISH
Name:
12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 35
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Give a rule to describe the constant difference between consecutive terms inorder to extend the pattern.
-1; -1,5; -2; -2,5; …
81 Number patterns
Term3
Week1
1. Describe the pattern by giving the rule and then extend it with three terms.
a. 36, 43, 50, 57 b. 29, 17, 5, -7
Describe the pattern that has neither a constant difference nor a constant ratio.
1, 0, -2, -5, -9, -14
Give a rule to describe the constant ratio between consecutive terms.
2; -1; 0,5; -0,25; 0,125; …
“adding -0,5”
“adding -0,5 to the
previous number inthe pattern.”
“counting in -0,5”
“multiplying the previous
number by -0,5.”
“subtracting by one
more than what wassubtracted to get the
previous term.”
Using this rule, thenext three terms will
be -20, -27, -35.
c. 63, 45, 27, 9 d. 59, 60, 62, 63
e. 18, 43, 68, 93 f. 48, 61, 74, 87
g. 1, 8, 27, 64 h. 1, 4, 16, 25
i. 36, 19, 2, -15 j. 22, -16, -54, -92
2. Describe the pattern by giving the rule and then extend it with three terms.
a. 6, -12, 24, -48 b. -17, -102, -612, -3 672
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Problem solving
Create your own sequences as follows:
• Constant difference between the consecutive terms
• Constant ratio between the consecutive terms
• Neither a constant difference nor a constant ratio
c. 16, 112, 784, 5 488 d. 28, 140, 700, 3 500
e. 25, 75, 225, 675 f. 52, -208, 832, -3 328
g. 37, 333, 2 997, 8 991 h. -39, -156, -624, -2 496
i. 43, -129, 387, -1 161 j. 49, 294, 1 764, 10 584
3. Describe the pattern by giving the rule and then extend it with three terms.
a. 66, 58, 51, 45 b. 32, 38, 31, 39
c. 25, 34, 46, 61 d. 72, 55, 37, 18
e. 14, 28, 84, 336 f. 16, 32, 128, 1 024
g. 21, 23, 19, 25 h. 87, -3, 77, 7, 67
i. 27, 38, 50, 63 j. 44, 66, 132, 330
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82 Number sequences
Term3
Week1
Look at the example: Determine the 10th term.
The difference
between the
terms is -4.
Number sentences:
First term: -4(1) + 1 = -3
Second term: -4(2) + 1 = -7
Third term: -4(3) + 1 = -11
Fourth term: -4(4) + 1 = - 14
Tenth term: -4(10) + 1 = -39
nth term: -4(n) + 1
n (Position in sequence) 1 2 3 4 10 n
Term -3 -7 -11 -14 -39
‘n’ is any
number.
1. Determine the tenth and nth terms using a table and number sentence.
a. nth term is:
n (Position in sequence) 1 2 3 4 10 n
Term 13 23 33 43
b. nth term is:
n (Position in sequence) 1 2 3 4 10 n
Term 11 17 23 29
c. nth term is:
n (Position in sequence) 1 2 3 4 10 n
Term 17 20 23 26
d. nth term is:
n (Position in sequence) 1 2 3 4 10 n
Term -16 -23 -30 -37
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e. nth term is:
n (Position in sequence) 1 2 3 4 10 n
Term -3 6 15 24
f. nth term is:
n (Position in sequence) 1 2 3 4 10 n
Term 13 17 21 25
g. nth term is:
n (Position in sequence) 1 2 3 4 10 n
Term -6 10 26 42
2. Make notes on how you solved the sequences.
Problem solving
Determine the tenth and nth terms using a table and a number sentence.
n (Position in sequence) 3 6 9 10 12 n
Term 13 40 85 ? 148 ?
nth
term is:
n (Position in sequence) 18 12 10 6 n
Term 5 815 11 711 ? 199 ?
nth term is:
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83 More number sequences
T e r m 3 - W e e k 1
Example:
The bottom row of terms for each position in sequence (n) is obtained by using the formula or rule:
square the position number (n) in the top row and add 1 = n2 + 1.
First term: 2 = (1)2 + 1
Second term: 5 = (2)2 + 1
Third term: 10 = (3)2 + 1
Fourth term: 17 = (4)2 + 1
Tenth term: 101 = (10)2 + 1
nth term : = n2 + 1
Give the next three terms:
22; 32; 42; 52; ...
4; 9; 16; 25; ...
23; 33; 43; 53; ...
3 8; 3 27; 3 64; 3 125; ...
√ √ √ √
√ √ √ √
1. Complete the tables.
n (Position in sequence) 1 2 3 4 10 n
Term 2 5 10 17 ? ?
a. n (Position in sequence) 3 4 5 6 10 n
Term 7 14 23 34 ? ?
Third term: 7 = ________________________________
Fourth term: 14 = ________________________________
Fifth term: 23 = ________________________________
Sixth term: 34 = ________________________________
Tenth term: ____ = ________________________________
nth
term: ____ = ________________________________
Make notes on how you solved the sequences
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b.
Third term: 11 = ________________________________
Fourth term: 67 = ________________________________
Fifth term: 219 = ________________________________
Sixth term: 515 = ________________________________
Tenth term: ____ = ________________________________
nth term: ____ = ________________________________
c.
Third term: -10 12 = ________________________________
Fourth term: 12 = ________________________________
Fifth term: ____ = ________________________________ Sixth term: 19 1
2 = ________________________________
Tenth term: 29 12 = ________________________________
nth term: ____ = ________________________________
d.
Third term: 8 = ________________________________
Fourth term: ____ = ________________________________
Fifth term: 216 = ________________________________ Sixth term: 512 = ________________________________
Tenth term: ____ = ________________________________
nth term: ____ = ________________________________
e.
Third term: 2 = ________________________________
Fourth term: 5 = ________________________________
Fifth term: 17 = ________________________________
Sixth term: 65 = ________________________________
Tenth term: ____ = ________________________________
nth term: ____ = ________________________________
Sharing
Share your answers with a friend. Do you have the same rules for the nth terms?
n (Position in sequence) 2 4 6 8 10 n
Term 11 67 219 515 ? ?
n (Position in sequence) -5 0 5 10 15 n
Term -10 12
12
? 19 12 29 1
2 ?
n (Position in sequence) 2 4 6 8 10 n
Term 8 ? 216 512 ? ?
n (Position in sequence) 1 2 4 8 10 n
Term 2 5 17 65 ? ?
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84 Geometric patterns
T e r m 3 - W e e k 1
What will the nextpattern be?
The rule: add onesection to each side.
First term: 6(1) = 6
Second term: 6(2) = 12Third term: 6(3) = 18
Fourth term: 6(4) = 24
Fifth term: 6(5) = 30
Tenth term: 6(10) = 60
nth term: 6(n) = 6n
n (Position in sequence) 1 2 3 4 5 10 n
Term 6 12 18 24 30 60 ?
How will youdetermine the next
pattern?
(1 × 6)
(2 × 6)
1. Do the following:
i. Draw the first four terms in each of the following geometric patterns.
ii. Write it in a table determining the first, second, third, fourth, tenth and nth
terms.iii. Write number sentences for each table.
a. Heptagon
i.
ii.
iii.
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Sharing
Do the same with an icosekaipentagon.
b. Pentadecagon
i.
ii.
c. Icosagon
i.
ii.
iii.
iii.
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85 Number sequences and equations
T e r m 3 - W e e k 1
Look at the example. Discuss. What will the 10th term be?
y = 3x + 14
x -2 -1 0 1 2 5 10
y -5 34 -2 3
4
14 3 1
4 6 14 15 1
4
y = 3(-2) + 14
y = -6 + 14
y = -5 34
y = 3(-1) + 14
y = -3 + 14
y = -2 34
y = 3(0) + 14
y = 0 + 14
y = 14
y = 3(2) + 14
y = 6 + 14
y = 6 14
y = 3(1) + 14
y = 3 + 14
y = 3 14
y = 3(5) + 14
y = 15 + 14
y = 15 14
1. Complete the tables using the equations.
a.x -2 -1 0 1 2 5 10
y y = 2x + 12
b.
y = x 2 - 1
x -2 -1 0 1 2 10 50
y
c.
y = x 3 - 2
x -3 -2 -1 0 1 13 25
y
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11
How did you solve for m?
In your own words describe how you solved for m.
d.x 0 2 3 50 75 100
y y = 12 x + 4
e.x 1 3 5 7 27 47
y y = -4x - 3
2. Complete the tables.
a.x -2 -1 0 1 2 5 n
y m
y = x 2 - 1
4
c.x -3 5 13 21 29 37 n
y m
y = 2x 2 + 14
b.x 1 2 3 4 n 6 7
y m
y = -x -4
d.x 3 6 9 n 15 21 24
y m
y = x
3 + 1
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86 Algebraic expression
T e r m 3 - W e e k 2
Variables: a number that can have
different values as compared to a
constant that has a fixed value.
Algebraic expression: a collectionof quantities made up of constants
and variables joined by the fourfundamental operations
Term: parts of an algebraic
expression linked to each other bythe + or - symbols.
Coefficient: a constant attached to
the front of a variable or group ofvariables. The variable is multiplied
by the coefficient.
b, x, p, z, y and c are
variables and all others
are constants, as their
values do not change.
Here are some
examples of
algebraic
expressions.
Expressions
with one
term.
Expressions
with two
terms. Expressions
with three
terms.
Here are
examples of a
coefficient.
- 4 p
13z 4c
y√
7b
x 4
2x + 3 y
x + 4
3z + 6
z4
y - 3
3x
x 3
3x + y
4x 2
+ 3
x - 3 y + 3
In 4x + 3 y there are two terms, 4x and 3 y, and the coefficient of x in
4x is 4 and coefficient of y in 3 y is 3.
Monomial: analgebraic expression
that has only one termis called a monomial,
for example: 4x
Binomial: an algebraicexpression that has
two terms is called abinomial, for example:
Trinomial: an algebraicexpression that has
three terms is called atrinomial, for example:
4x - 3 2x - 3 y + z
1. Identify variables and constants in the following.
a. 5x 2 = b. 2x 2 + 4x =
c. x 2
4 d. x 2
4x 4
e. 9x 2 + 5 = f. xy2 + x =
g. 100xy + x = h. 4x 2 + 2x + 3 =
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i. j. 6x 2 + 4x + 32x 2
2. Write down the terms and coefficients of the variables in the terms in the followingalgebraic expressions.
a. 3x 2 - 4 y = b. 23 x + y =
3. Write down the like terms in the following algebraic expressions:
a. 3x 2 - 4xy + 5x 2 - 9 = b. xyz - 5xy + 6zx + 15xyz - 1 =
c. x 3 + y3 - 3xy + 6 yx - 4 y3 = d. abc + bcd + cda =
9x 2 + 47x
c. 3x + 4 y - 52 y =
d. x 2 + 2xy + y2 = e. x 7 - 8
y =
Monomial
4. Give five examples of each.
Binomial Trinomial
Problem Solving
Create an algebraic expression with variables and constants and using all the fundamental operations.
Solve it.
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87 Operations of algebraic expressions
T e r m 3 - W e e k 2
Like terms are monomials that contain the same
variables and are raised tothe same powers. They canbe combined to form asingle term.
Revise4a2b and 10a2b are like terms.
In the expression:3x 2 + 2xy - 5 y3 - 4xy + 9, the liketerms are 2xy and -4xy.
Example:
1. Add up the following pairs of algebraic expressions
a. 32 x
2 + x + 1 and 37 x
2 + 14 x + 5
Add -3x + 4 and 2x 2 - 7x - 2
(- 3x + 4) + (2x 2 - 7x - 2)
= 2x 2 + (-3x - 7x ) + (4 - 2)
= 2x 2 - 10x + 2
b.7
5 x 3
- x 2
+ 1 and 2x 2
+ x - 3
c. xy + z y + zx and 3xy - z
y
d. 3 yxz +
x 2 y + z and - 4 y
xz +3x 2 y - z
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Example:
2. Subtract the following pairs of algebraic expressions.
a. 7x 3 - 3x 2 + 2 from x 2 - 5x + 2
Subtract -3x + 4 and 2x 2 - 7x - 2
(- 3x + 4) - (2x 2 - 7x - 2)
= 2x 2 + [-3x - (-7x )] + [(4 - (-2)]
= 2x 2 + (-3x + 7x ) + (4 + 2)
= 2x 2 + 4x + 6
b. x y + y
z - 3 from 3x y - 2 y
z + 7 + x 2
c. ax 2 + 2hxy +by2 from cx 2 + 2 gxy + dy2
Problem Solving
Create an algebraic expression with variables and constants and using all the fundamental operations.
Solve it.
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88 The product of a monomial and
polynomial
T e r m 3 - W e e k 2
Monomials multiplied by polynomials
a(b + c)
= a × b + a × c
= ab + ac
3(a + b)
= (3 × a) + (3 × b)
= 3a + 3b
x (2 + 4)
= (x × 2) + (x × 4)
= 2x + 4x
= 6x
2a (3a2 - 4a + 5)
= 6a1+2 - 8a1+1 + 10a
= 6a3 - 8a2 + 10a or (2a × 3a2) - (2a ×4a) + (2a × 5)
- 2a(3a2 - 4a + 5)
= - 6a3 + 8a2 - 10a
= (-2a × 3a2) + (-2a × -4a) + (-2a + 5)
= -6a1+2 + 8a1+1 - 10a
= -6a3 + 8a2 - 10a
ab acacb
3a 3b3
ba
2x 4x x
42
6a3 -8a2 10a2a
-4a3a2 5
-6a3 8a2 -10a-2a
-4a23a2 5
or
or
or
or
or
Example:
1. Revision: calculate:
2(3 + 4)
= 2 × 3 + 2 × 4
= (2 × 3) + (2 × 4)
= 6 + 8
= 14
} Both ways are correct.
Sometimes it is easier to
write it in brackets.
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17
continued☛
a. 3(6 + 9) b. 8(3 + 7) c. 5(2 + 1)
Example:
2. Revision: calculate:
a(b + c)
= a × b + a × c
= ab + ac
a. b(c + d) b. s(r + p) c. z(e + c)
Example:
3. Revision: calculate:
3(a + b)
= (3 × a) + (3 × b)
= 3a + 3b
a. 7(b + c) b. 8(p + q) c. 4(x + y)
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88b The product of a monomial and
polynomial continued
T e r m 3 - W e e k 2
Example:
4. Revision: calculate:
x (2 + 4)
= (x × 2) + (x × 4)
= 2x + 4x
= 6x
a. x(6 + 3) b. m(9 + 2) c. y(5 + 7)
Example:
5. Calculate:
2x (3x 2 -4x + 5)
= 6x 1+2 - 8x 1+1 + 10x
= 3x 3 - 8x 2 + 10
a. 2x (x2 - 11x + 12) b. 2x (x2 - x + 12) c. 4x (3x2 - 9x + 15)
Example:
6. Calculate:
2x (3x 2 -4x + 5)
= 6x 3 + 8x 2 - 10x
or
= (-2x .3x 2) + (-2x -4x ) + (-2x + 5)
= 6x 1+2 - 8x 1+1 + 10x
= 6x 3 + 8x 2 - 10x
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Problem Solving
The a × can be “distributed” across the 2 + 4 into a × 2 plus a × 4. What did the original sum look like?
Determine the value of x 2 - 3 of x = -3
2
Create your own monomial multiplied by a trinomial and solve it.
Create your own monomial multiplied by a trinomial and solve it through substitution.
Create your own trinomial and divide it with a monomial which is a factor of all three terms in the
trinomial.
a. 2x (4x2 + 5x + 6) b. 4x (x2 - 3x + 2) c. 5x (x2 + 12x + 20)
a. 5x2 + 6x + 7 b. 9x2 + 6x + 5 c. 2x2 + 7x + 6
a. -2x (2x2 - x + 4) b. -4x (x2 - x + 12) c. -2x (x2 - 6x + 8)
8. Simplify and then substitute x = -2: 2x (6x2 + 3x + 5)
7. If x = -3, then: 4x2 + 3x + 2 =
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89 The product of two binomials
T e r m 3 - W e e k 2
(3 + 4)(3 + 5)
= (3 × 3) + (3 × 5) + (4 × 3)+(4 × 5)
= 9 + 15 + 12 + 20
= 56
or (3 + 4)(3 + 5)
= 7 × 8= 56
9 15
12 20
3
53
4
or
Remember:
positive number × positive number = positive number
negative number × negative number = positive number
positive number × negative number = negative number
Example:
1. Multiply:
(x + 2)(x + 3)
= (x + 2)(x +3)
= (x + x ) + (x + 3) + (2 × x ) + (2 × 3)
= x 1+1 + 3x + 2x + 6
= x 2 + 3x + 2x + 6
= x 2 + 5x + 6
x 2 3x
2x 6
x
3x
2
a. (x + 2)(x + 2) b. (x + 3)(x + 4) c. (x + 1)(x + 1)
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Example:
2. Multiply:
(x - 2)(x - 3)
= (x - 2) + (x - 3)
= (x × x ) + (x × -3) + (-2 × x ) + (-2 × -3)
= x 1+1 - 3x - 2x + 6
= x 2 - 5x + 6
x 2 -3x
-2x 6
x
-3x
-2
a. (x - 3)(x - 4) b. (x - 5)(x - 7) c. (x - 2)(x - 4)
Example:
3. Multiply:
(x + 2)(x - 3)
= (x + 2) + (x - 3)
= (x × x ) + (x × -3) + (-2 × x ) + (-2 × -3)
= x 1+1 - 3x + 2x - 6
= x 2 - x - 6
x 2 -3x
-2x 6
x
-3x
-2
continued☛
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89b The product of two binomials continued
Example:
4. Multiply:
(x - 2)(x + 3)
= (x - 2) + (x + 3)
= (x × x ) + (x × 3) + (-2 × x ) + (-2 × 3)
= x 1+1 + 3x - 2x - 6
= x 2 x
-6
x 2 3x
-2x -6
x
+3x
-2
a. (x - 4)(x + 5) b. (x - 2)(x + 8) c. (x - 5)(x + 4)
a. (x + 5)(x - 5) b. (x + 2)(x - 8) c. (x + 7)(x - 8)
T e r m 3 - W e e k 2
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Example:
5. Multiply:
(x ± 2)2
= (x + 2)(x + 2) and (x - 2)(x - 2)
= x 2 + 2x + 2x + 4 and x
2 - 2x - 2x + 4
= x 2 + 4x + 4 and x 2 - 4x + 4
= x 2 ± 4x + 4
x 2 2x
2x 4
x
2x
2
a. (x ± 3)2 b. (x ± 4)2 c. (x ± 6)2
x 2 -2x
-2x 4
x
-2x
-2
Example:
6. Simplify:
2(x - 3)2
= 2[(x - 3)(x - 3)]
= 2[x 2 -3x -3x + 9]
= 2[x 2 -6x + 9]
= 2x 2 -12x + 18
continued☛
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89c The product of two binomials continued
a. 2(x - 6)2 b. 6(x - 7)2 c. 3(x - 2)2
Example: see previous worksheet for example.
7. Revision: simplify:
a. 2(x + 3)2 b. 6(x + 2)2 c. 3(x + 3)2
T e r m 3 - W e e k 2
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continued☛
Example:
8. Simplify:
(x + 1)(2x - 5)
= 2x 2 - 5x + 2x - 5
= 2x 2 - 3x - 5
a. (x + 2)(x - 3) b. (x + 2)(x - 4) c. (x + 1)(x - 5)
Example:
9. Simplify:
3(x + 1)(2x - 5)
= (3x + 3)(2x - 5)
= (3x × 2x ) + (3x × - 5) + (3 × 2x ) + (3x - 5)
= 6x 2 - 15x + 6x - 15
= 6x 2 - 9x - 15
a. 3(x + 2)(3x – 1) b. 2(2x – 5)(3x + 1) c. 5(2x + 7)(3x – 5)
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89d The product of two binomials continued
10. Simplify:
a. 2(x + 1)2 + 4(x + 2)(x - 3) = b. 3(a - 2)2 + (2a - 3)(a - 4) =
Multiplying algebraic expressions together
In order to multiply two algebraic expressions, each of the terms of one algebraicexpression is multiplied by each term of the other algebraic expression and the
result simplified by adding the like terms
Example:
11. Multiply these algebraic expressions together:
Multiply 2n + 3 by n2 - 3n + 4
(2n + 3)(n2 - 3n + 4)
= 2n (n2 - 3n + 4) + 3 (n2 - 3n = 4)
= 2n × n2 + 2n (3n) + 2n × 4 + 3 × n
2 + 3 (-3n) + 3 × 4
= 2n3 - 6n2 + 8n + 3n2 - 9n + 12
= 2n3 - 3n2 - n + 12
(2n + 3)(n2 - 3n + 4) = 2n3 - 3n2 - n + 12
a. (2x + 1)(x 2 - 2x + 1) =
T e r m 3 - W e e k 2
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b. (b + 6)(b2 - 12b + 2) =
12. Multiply:
Example: Multiply 2x 2 - 3x - 9x by -x + 7
x
Solution: (2x 2 - 3x - 9x )(-x +
7x ) = 2x 2 (-x + 7
x ) - 3x (-x +7x ) -
9x (-x + 7
x )
= 2x 2 × (-x ) + 2x 2 ×7x - 3x × (-x ) - 3x ×
7x -
9x × (-x) -
7x ×
9x
= 2x 3 + 14x + 3x 2 - 21 + 9 -63x 2
= -2x 3 + 3x 2 + 14x - 12 -63x 2
(2x 2 - 3x - 9x )(-x +
7x ) = 2x 3 + 3x 2 + 14x - 12 - 63
x 2
a. c2 + 7c - 14 by - c + 7c b. 2b2 - 5b - 5
b by - b + 2b
Problem Solving
Create and solve two binomials multiplied together. Use integers.
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90 Divide a trinomial and polynomialby a monomial
T e r m 3 - W e e k 2
Compare the examples.
4x 4 - 2x
3
2x 2
=4x
4
2x 2 -
2x 3
2x 2
= 2x 4-2 - x
3-2
= 2x 2 - x
Example 1:
x 3
x 2
=x.x.x
x.x
= x
Example 2:
6x 3 - 8x
2
2x
=6x
3
2x -
8x 2
2x
= 3x 3-1 - 4x
2-1
= 3x 2 - 4x
Example 3:
1. Revision: simplify using examples 1 and 2 above to guide you:
a. 2x 2 - 2x
2x b. 3x 2 - 6x
3x c. 10x 2 - 10x
5x
2. Simplify:
Example: 6x 3 - 8x
2 + 2x + 10
2x
=6x
3
2x -
8x 2
2x +
2x
2x +
10
2x
= 3x 3-1 - 4x
2-1 + 1 +5
x
= 3x 2 - 4x + 1 +
5
x
a.6x
3 + 2x 2 + 2x
2x b.
12x 3 + 6x
2 + 6x
3x c.15x
3 + 10x 2 + 30x
5x
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d. 6x 3 + 8x
2 + 2x + 82x
e. 12x 3 + 6x
2 + 9x + 93x f. 20x
3 + 16x 2 - 8x - 8
4x
3. Calculate and test:
Example: (2x 2 + 5x + 3) ÷ (2x + 3)
x + 1
a. 3x 2 + 7x + 4 ÷ 3x + 4 =
Test(2x + 3) (x + 1)
= 2x 2 + 3x + 2x + 3= 2x
2 + 5x + 3
Problem Solving
Create a polynomial divided by a monomial.
Find the remainder when x 2 - x + 1 is divided by x + 1
Find the quotient and remainder when x 4 + 2x
3 + 23 x - 1
3 is divided by x 2 + 1
3
b. 5x
2
+ 21x + 12 ÷ 5x + 6 =
c. 2x 2 + 20x + 16 ÷ x + 2 =
2x + 3 2x 2 + 5x + 3
2x 2 + 3x
2x + 32x + 3
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Look at this example:
91 Algebraic expressions and substitution
Term3
Week3
We can evaluate any algebraic expression for
given values(s) of the variable(s) occurring in it.Let us understand the steps
involved by evaluating3x 2 - x + 2 for x = 2
Substitute the given variable(s)
with the given value(s), i.e.3 × 22 - 2 + 2
Simplify the numerical resultobtained in the first step.
3 × 22 - 2 + 2 = 3 × 4 - 2 + 2
= 12 - 2 + 2
= 12
or
3x - x + 2 = 12 when x = 2
Take two other examples:(3x 2 - 3x + 1)(x - 1) for x = 3Substitute x with 3 (3x 2 - 3x + 1)(x - 1) andwe get
= (3 × 32 - 3 × 3 + 1)(3 - 1)= (3 × 9 - 9 + 1)(2)= 2(19) = 38
(3x 2 - 1) + (4x 3 - 4x - 3) for x = -1
Substitute with x - 1 (3x 2
- 1) + (4x 3
- 4x - 3)and we get
= (3x 2 - 1) + (4x 3 - 4x - 3)
= 3 × (-1)2 - 1 + [4(-1)3 -4 (-1) -3]= 3 - 1 + [4 + 4 - 3]
= 2 - 3= -1
Example:
1. Evaluate each of the following algebraic expressions for the indicated value of the
variable: x = 4
x 2
+ 3x
- 5(4)2 + 3(4) - 5
= 16 + 12 - 5
= 28 - 5
= 23
a. x 2 + 2x - 8 b. x
2 + 3x - 5 c. x 2 - 3x - 8
d. x 2 - 4x + 2 e. x
2 + 2x - 4 f. x 2 - 5x - 10
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91b Algebraic expressions and substitutioncontinued
Term3
Week3
a. 45 x +
15 x -
16 b. 1
4 x -17 x -
15 c. 1
8 x -34 x -
45
Example:
4. Evaluate each of the following algebraic expressions for the indicated values of
the variables: x = 2 and x = 2 and y = 1
x = 2 and y = 1=
x 2
y + 3xy - 11
= 22
1 + (2)(1) - 11
= ( 41 ) + 2 - 11
= 4 + 2 - 11
= -5
a. x 2
y + 2xy + 5 = b. x 2
y + 3xy + 11 = c. x 2
y2 - 3xy - 7 =
d. x 2
y2 - 2xy - 3 = e. x
2
y + 4xy + 10 = f. x 3
y3 + 4xy + 2 =
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Problem solving
Explain in your own words what it means to evaluate an algebraic expression for the indicated values.You can make use of an example to explain it.
Example:
5. Evaluate each of the following algebraic expressions for the indicated values of
the variables: x = 2, y = 1 x = 2 and z = -3
x = 2, y = 1, z = -3
= xyz - x 3 - y3 + z3
= (2)(1)(-3) - (2)2 - (1)3 + (-3)3
= -6 - 4 - 1 - 27
= -39
a. xyz + x 2 + y2 + 23 = b. xyz + x
3 - y2 - 23 = c. xyz - x 3 - y3 + 22 =
d. x 2 yz
3 - x 2 + y2 - 22 = e. xyz + x
3 + y3 - 23 = f. xyz - x 2 - y2 + 22 =
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92 Factorise algebraic expressions
Term3
Week3
Factorising is the reverse of
expanding an expression
through multiplication.
Expand: 2x (x + 3) = 2x 2 + 6x
Factorise: 2x 2 + 6x = 2x (x + 3)
Factorise: a - 4b = 1 (a - 4b)
Factorise: 4b - a = -1 (a - 4b)
Note that 1 and -1 are
common factors of every
expression.
2x 2 6x 2x
3x
Example:
1. Multiply a monomial with a binomial and factorise your answer
Expand: 2x (x + 3)
= 2x 2 + 6x
a. 2(x - 3)
Factorise: 2x + 6x
= 2x (x + 3)
b. 4x (x - 1)
i. 2 p( p - pq) j. 2 y( y - 2)
c. x ( y + 1) d. p(q + 3)
e. 2a(a + 1) f. m(n - 6)
g. b(b - 1) h. abc(ab - abc)
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Example:
2. Write the following (Always start by looking for a common factor, do not forget
1 or -1). Write in alphabetical order.
Factorise: a - 4b
= 1(a - 4b)
a. y - x 2 =
Factorise: 4b - a
= -1(a - 4b)
b. 2x 2 - c =
i. m - n = j. c - 2b2
c. -x 2 + 1 = d. p2q2 - n =
e. p - 3q = f. 3q - p =
g. x
2
- y = h. n - m =
Problem solving
Expand the following and prove your answer by factorising. 2( p3 + 8 p2 - 5 p)
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93 Factorise algebraic expressions
Term3
Week3
Remember: Factorise is the reverse of expand.
Revise how to factorise:
Look for the largest number that will divide into all terms andlook for any common letters.12x + 20xy
= 4x (3 + 5 y)
Check by expanding your answer
4x (3 - 5 y)= 12x + 20xy
To factorise, rewrite
the expression as
factors multiplied
together.
This is because 4x is the largest
factor of both 12x and 20xy.
Example: 6a4 - 4a2
2a2 (3a2 - 2)
1. Factorise.
a. 8 y4 - 4 y2 b. 10a4 - 6a2
c. 18x 4 - 36x 2 d. 12m4 - 15m2
Example: ax - bx + 2a - 2b
= x (a - b) + 2(a - b)
=(a - b)(x + 2)
2. Factorise.
a. bx - cx + 3b - 3c = b. cd - ce + 2d - 2e =
c. cy - dy + 2c - 2d = d. mx - my + 5x - 5 y =
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Factorise:
am - bm + 2a - 2b k(2k - 4m) + (7k - 14m) 4x 4 - 16 y2 =
mn - pn + 2m - 2 p 4 p(c - d) - 7(-d + c)
Example: 2x (a - b) - 3(a - b)
= (a - b)(2x - 3)
3. Factorise.
a. 3x (m - n) - 2(-n + m) = b. 3q(d - e) - 1(-e + d) =
c. 2a(x - y) - 5(- y + x ) = d. 2d(a - c) - 3(-c + a) =
Example: 2x (a - b) - 3(b - a)
= 2x (a - b) - 3(-a + b)
= 2x (a - b) + 3(a - b) = (a - b)(2x + 3)
4. Factorise. (Remember to look for a common factor first.)
a. 5d2 + 20d = b. 3a2bc - 4abc =
c. 6b4 - 2b2 = d. 3m( p - q) - 3(-q + p) =
Example: (a + b)2 - 5(a + b)
(a + b)(a + b) - 5(a + b)
(a + b)[(a + b)2 - 5]
5. Factorise.
a. 7(x 2 - xy) + ( y + x ) = b. ab2 - ac2 =
c. 121b2 + 11b = d. 9(a2 - ab) - 6(a - b) =
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94 Factorise more algebraic expressions
Term3
Week3
Look at the examples. Describe what happens in them
Example 1:
25a2 - 1
= (5a - 1)(5a + 1)
Example 3:
9(a + b)2 - 1
= [3(a + b) - 1] [3(a + b) + 1]
Example 2:
a4 - b4
= (a2 - b2)(a2 - b2)
Example 4: 3x 2 - 27
= 3(x 2 - 9)
= 3(x + 3)(x - 3)
Example: See example 1 above
1. Factorise.
a. 36x 2 - 1 b. 16 y2 - 1
c. 64 p2 - 1 d. 49m2 - 1
e. 100a2 - 1 f. 9q2 - 1
Example: See example 2 above
2. Factorise.
a. d4 - g 4 = b. x 16 - y16 =
c. m9 - m9 = d. p4 - q4 =
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Problem solving
Is 12 a factor of 48? Is 3 p2 a factor of 6 p4?
Is 12x 3 y2z5 a factor of 24x 4 y5z6? How do you know?
If -x 3 + 5x 2 -4x + 5 is a polynomial, what is the common factor?
Example: See example 3 on previous page.
3. Factorise.
a. 36(x + y)2 - 4 = b. 4(m + n)2 - 49 =
c. 16(d + e)2 - 81 = d. 25(o + p)2 - 81 =
e. 49(v + w)2 - 16 = f. (q + r)2 - 16 =
Example: See example 4 on previous page.
4. Factorise.
a. 4x 2
- 64 b. 2x 2
- 2
c. 3x 2 - 39 d. 7x 2 - 56
e. 6x 2 - 42 f. 9x 2 - 90
e. v4 - w4 = f. s9 - t9 =
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95 Factorise more algebraic expressions
Term3
Week3
Look at the examples. Discuss them.
2x + 6 yx + 3 y
= 2(x + 3 y)(x + 3 y)
= 2
Example 1: Example 2: Example 3:3x - 3 y6x - 6 y
= 3(x - y)6(x - y)
= 12
9a2 - 13a + 1
= (3a - 1)(3a + 1)3a + 1
= 3a - 1
a. 3x + 6 yx + 2 y b. 2x + 8 y
x + 4 y c. 2x + 12 yx + 6 y
d. 3x + 9 yx + 3 y e. 2x + 10 y
x + 5 y f. 5x + 10 yx + 2 y
a. 2x - 2 y5x - 5 y b. 3x - 3 y
9x - 9 y c. 5x - 5 y10x - 10 y
Example: See example 2 above
2. Factorise.
1. Factorise.
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Problem solving
Factorise:
a. b. c. d. e.
f. g. h. i. j.
d. 4x - 4 y8x - 8 y
e. 2x - 2 y6x - 6 y
f. 4x - 4 y12x - 12 y
a. 81a2 - 19a + 1 b. 36a2 - 1
6a + 1 c. 16a2 - 14a + 1
Example: See example 3 on previous page.
3. Factorise.
d. 121a2 - 111a + 1 e. 25a2 - 1 y
5a + 1 f. 100a2 - 110a + 1
25x + 25 y30x + 30 y
7a - 7b14a - 14b
4x + 28 yx + 7 y
265a2 - 116a + 1
27x - 27 y81x - 81 y
12x - 108 yx - 9 y
225a2 - 115a + 1
169a2 + 113a + 1
8x + 56 yx + 7 y
16x - 16 y42x - 42 y
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96 Factorise even more algebraicexpressions
Term3
Week4
[
]
x 2
3x
2x 6
x
+2
(x + 3)
[
]
Revise:
Example:
1. Factorise:
x 2 + 5x + 6
= x 2 + 5x + 6
= x 2 + 5x + 6
= (x + 3)(x + 2)
x 2 + 5x + 6
= x 2 + 5x + 6
= x 2 + 5x + 6
= (x + 3)(x + 2)
Both operations
are positive
3 × 2 = 6
3 + 2 = 5
x 2 - 5x + 6
(x - 3)(x - 2)
x 2 - x - 6
(x - 3)(x + 2)
x 2 -2x
2
-3x 6
(x - 2)
x
-3
x 2 2x
-3x -6
x
-3
(x + 2)
[
]
x 2 3x
2x 6
x
+2
(x + 3)
[
]
a. x 2 + 3x + 2 b. x 2 + 4x + 3
c. x 2 + 6x + 5 d. x
2 + 7x + 12
e. x 2 + 4x + 4 f. x
2 + 12x + 20
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Problem solving
Factorise x 2 + 15x + 56 x
2 - 2x - 45
x 2 + 14x + 48 x
2 - x + 132
x 2 + 13x + 42 x
2 - 16x + 63
x 2 + 13x + 42 x
2 - 10x - 24
x 2 + 13x + 40 x
2 - x - 72
Example:
2. Factorise:
x 2 - 5x + 6
= (x - 3)(x - 2)x
2 -2x
-3x 6
x
-3
(x - 3)
[
]
a. x 2 - 6x + 9 b. x 2 - 3x + 3 c. x 2 - 6x + 8
d. x 2 - 9x + 8 e. x
2 - 12x + 20 f. x 2 - 7x + 6
Example:
3. Factorise:
x 2 - x - 6
= (x - 3)(x + 2)x
2 2x
-3x -6
x
-3
(x + 2)
[
]
a. x 2 - x - 12 b. x
2 - 3x - 10 c. x 2 - x - 2
d. x 2 - 2x - 24 e. x
2 - 2x - 15 f. x 2 - 2x - 8
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97 More algebraic equations
Term3
Week4
Look at the examples. Discuss.
-2x = 8
-2x
-2 =8
-2
x = -4
Example 1: Example 2:3x + 1 = 7
3x + 1 - 1 = 7 - 1
3x = 6
3x
3 =6
3
x = 2
Example:
1. Solve for x:x - 3 = 4
x - 3 + 3 = 4 + 3
x = 7
a. x - 4 = 7 b. x - 4 = 9 c. x - 4 = 15
d. x - 3 = 8 e. x - 2 = 12 f. x - 5 = 9
Example:
2. Solve for x:
-6x = -12
=-6x
-6 =-12x
-6
x = 2
a. -4x = -16 b. -x = -15 c. -7x = -28
d. -3x = -9 e. -3x = -21 f. -9x = -90
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Problem Solving
Gugu is 9 years older than Sam. In 3 years’ time Gugu will be twice as old as Sam. How old is Gugu now?
Peter has five computer games. Sarah has twice as many as Peter. Thoko has two more than Sarah andPeter together. How many games does Thoko have?
Thapelo has six sweets more than Palesa.. In total they have 24 sweets. How many sweets does Palesahave?
g. -3x = -18 h. -2x = -30 i. -5x = -25
Example:
3. Solve for x:
4x - 3 = 9
4x - 3 + 3 = 9 + 3
4x = 124x
4 = 124
x = 3
a. 4x - 4 = 4 b. 2x - 15 = 1 c. 8x - 8 = 8
Write an equation for each and solve it.
Melissa starts to save money in her piggy bank. She starts with R5 in January and saves double the amountin each consecutive month. How much money did she save after 6 months?
d. 2x - 15 = 1 e. 5x - 10 = 10 f. 12x - 9 = 27
g. 6x - 15 = 15 h. 7x - 5 = 9 i. 2x - 3 = 3
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98 Even more algebraic equations
Term3
Week4
Look at the example. Discuss.
Solve for x:
x 2 - 3x = 0
x (x - 3) = 0 (factorise left hand side)
x = 0 or x - 3 = 0 (at least one factor = 0)
Therefore x = 0 or x = 3 (add 3 to both sides of the equation)
Example:
1. Solve for x:
x 2 + 4x = 0
x (x + 4) = 0
x = 0 or x + 4 = 0
x = 0 or x = -4
a. a2 + 8a = 0 b. t2 + 9t = 0 c. x 2 + 7x = 0
d. x 2
+ 5x = 0 e. q2
+ 12q = 0 f. q2
+ 10 p = 0
g. b2 + 6b = 0 h. m + 2m = 0 i. 52 + 4s = 0
j. y2 + 2 y = 0
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Example:
2. Solve for x:
2x 2 + 4x = 0
2x (x + 2) = 0
2x = 0 or x + 2 = 02x
2
= 0
2x = 0 or x = -2
a. 5x 2 + 10x = 0 b. 2a2 + 2a = 0 c. 12 p2 + 24 p = 0
d. 6a2 + 12a = 0 e. 8b2 + 8b = 0 f. 7x 2 + 28x = 0
g. 3x 2 + 9x = 0 h. 4x 2 + 12x = 0 i. 9b2 + 27b = 0
j. 2x 2 + 8x = 0
How fast can you solve for x?
a. 9x 2 + 15x = 0 f. x 2 - 4 = 0
b. x 3 + x 2 = 0 g. x 2 - 11x = 0
c. x 2x 2 - 121 = 0 h. 4a2 + 100x = 0
d. 12x 2 + 9x = 0 i. 7x 2 + 49x = 0
e. 3x 2 - 27x = 0 j. 5x 2 - 225x = 0
Do the inverse operation.
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99 More and more algebraic equations
Term3
Week4
Look at the example. Discuss.
Solve for x if x
2
- 25 = 0
At least one factor = 0
(x + 5)(x - 5) = 0
x + 5 = 0 or x - 5 = 0
Therefore x = - 5 or x = 5
[Factorise the difference of two squares onthe left hand side.]
Example:
1. Solve for x:
Solve for x if x 2 - 16 = 0
(x + 4)(x - 4) = 0x = -4 or x = 4
a. x 2 - 9 = 0 b. x
2 - 36 = 0 c. x 2 - 25 = 0
d. x
2
- 169 = 0 e. x
2
- 4 = 0 f. x
2
- 100 = 0
g. x 2 - 64 = 0 h. x
2 - 144 = 0 i. x 2 - 16 = 0
j. x 2 - 225 = 0
Add -5 to both sides of the equation
Add 5 to both sides of the equation
2. Solve for x: x2 - 6,25 = 0
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Example:
3. Calculate:
(x + 4)(x - 4) = 0
x 2 - 16 = 0
a. (x + 2)(x - 2) = 0 b. (x + 7)(x - 7) = 0 c. (x + 5)(x - 5) = 0
d. (x + 9)(x - 9) = 0 e. (x + 3)(x - 3) = 0 f. (x + 8)(x - 8) = 0
g. (x + 11)(x - 11) = 0 h. (x + 12)(x - 12) = 0 i. (x + 10)(x - 10) = 0
j. (x + 14)(x - 14) = 0 4. Calculate: (x + 1,2)(x - 1,2) = 0
How fast can you solve this?
x 2 - 1 = 0
x 2 - 400 = 0
x 2 - 256 = 0
Solve for x if x 2 - 16 = 0
x 2 - 16 = 0
x 2 - 81 = 0
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100 Algebraic equations and volume
Term3
Week4
1. Find the volume of these prisms by using the formula.
a. l = 4x cm b = 4x cm h = 5x cm
b. l = 3x cm b = x + 3cm h = x + 1cm
c. l = 2x + 2cm b = x + 3cm h = x cm
Look at the example. Discuss.
A rectangular prism with the following measurements.
Breadth = (x - 1) cm
Length = (2x ) cm
Height = (2x + 2) cm
Volume = length × breadth × height
l × b × h
= (2x )cm × (x - 1)cm × (2x + 2)cm
= (2x )(x - 1) × (2x + 2)cm3
= 4x 3 + 4x 2 - 4x 2 - 4x cm3
= 4x 3 + 4x cm3
d. l = 4x cm b = x + 2cm h = 3x + 1cm
e. l = 4x cm b = x + c
h = x + 2cm
f. l = 2x cm b = 2x + 3cm h = 3x + 1cm
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g. l = 8x cm b = 5x cm h = 10x cm
h. l = 3x + 2cm b = 4x + 1cm h = 5x cm
i. l = 3x + 4cm b = 2x + 3cm h = 5x cm
2. Calculate the volume of these prisms.
a.b.
c. d.
5 x +
1
2x
3 x + 2
2x + 1
2 x + 1
3x
4 x +
1
2 x + 1
2 x + 1
3 x
3x + 1
4 x + 5
Problem solving
Look around the classroom or your home and create your own problems by measuring items such asboxes and rectangular prism containers (tissue box, lunch tins, pencil cases, etc.)
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Look at the examples. Discuss.
101 Algebraic equations: Substitution
Term3
Week5
y = 2x 2 + 4x + 3. Calculate y if x = -2:
Example:
1. Calculate y using both methods:
y = 3x 2 + 6x + 2
If x = -1
y = 3(-1)2 + 6 (-1) + 2
= 3 - 6 + 2
= -1
a. y = 2x 2 + 8x + 3
y = 2(-2)2 + 4 (-2) + 3
or
= 8 - 8 + 3
= 3
y = 2x (x + 2) + 3
= 2(-2)(-2 + 2) + 3
= 2 (-2)(0) + 3
= 0 + 3
= 3
y = 3x (x + 2) + 2= 3(-1)(-1 + 2) + 2
= 3(-1)(1) + 2
= -3 + 2
= -1
or
Substitute: If x = -1
b. y = 7x 2 + 14x + 1
c. y = 2b2 + 4b + 5 b. y = 3x 2 + 9x + 5
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e. y = 3x 2 + 6x + 5 f. y = 6x 2 + 12x + 4
g. y = 5x 2 + 10x + 2 h. y = 4a2 + 8a + 2
i. y = 3n2 + 6x + 3 j. y = 2x 2 + 6x + 5
Problem solving
y = x 2 + 5x + 3; x = -2
Substitute with the given value for the variable.
y = 2x 2 + 7x - 14; x = 3
y = 5x 2 + 6x + 12; x = -6
y = 4x 2 + 10x + 15; x = 3
y = x 2 + 9x - 7; x = 4
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102 Algebraic expressions
Term3
Week5
1. Write an equation for each of these and solve them.
Read and discuss before solving the problems.
Try to understand and not just memorise. Yes, sometimes we need to memorise formulae and methods, but then make sureyou can explain it to yourself and to other learners how they work.
If you get stuck when trying to solve an equation, try to approach the problem froma different point of view. Is there another way of looking at the problem. Is thereanother way of doing it? Can you solve part of the problem first?
For example, if you need to show whether an expression is positive or negative, andyou cannot do it algebraically, a graphical method might help
a. 331 students went on a field trip. Six buses were filled and 7 students traveled in cars.How many students were in each bus?
b. Bongiwe had R24 to spend on 7 pencils. After buying them she had R10 left. Howmuch did each pencil cost?
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continued☛
c. The sum of three consecutive numbers is 72. What is the smallest of thesenumbers?
d. The sum of three consecutive even numbers is 48. What is the smallest of these
numbers?
e. You bought a magazine for R5 and 4 erasers. You spent a total of R25. How muchdid each eraser cost?
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102b
Term3
Week5
Algebraic expressions continued
f. Suzanne had many boxes. She bought 7 more. A week later half of all her boxeswere damaged. There were only 22 whole boxes left. How many boxes did she startoff with?
g. Riana spent half of her monthly allowance on cell phone airtime. To help her earnmore money, her parents let her wash and vacuum their car for R40. What is hermonthly allowance if she ended with R120?
h. Rebecca had some sweets to give to her 4 friends. She first took 10 sweets for herselfand then divided the rest evenly amongst her friends. Each friend received 2 sweets.With how many sweets did she start?
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i. How old am I if 400 reduced by 2 times my age is 244?
j. Mpho sold half of her books and then bought 16 more. She now has 36 books. Withhow many did she begin?
k. For a field trip, 4 learners rode in cars and the rest filled 9 buses. How many learnerswere in each bus if 472 students were on the trip?
Problem solving
Write five of your own problems and solve them. Write down the rule that solves them.
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103 Some more algebraic expressions
Term3
Week5
Look at the example. Discuss.
Example: Complete the table below for x and y values for the equation: y = 2x 2 - 3
x -2 -1 0 1 2
y 5 -1 -3 -1 5
y = 2(-2)2 - 3
= 2(4) - 3
= 8 - 3
= 5
y = 2(-1)2 - 3
= 2(1) - 3
= 2 - 3
= -1
y = 2(0)2 - 3
= 0 - 3
= - 3
y = 2(1)2 - 3
= 2 - 3
= 2 - 3
= -1
y = 2(2)2 - 3
= 8 - 3
= 5
1. Complete the table below for x and y values for the equation:
a. y = 3x 2 - 4 b. y = 42 - 3 c. y = 2x
2 - 1
x -2 -1 0 1 2
y
x -2 -1 0 1 2
y
x -2 -1 0 1 2
y
d. y = 5x 2 - 7 e. y = 52 - 3 f. y = 2x
2 - 2
x -2 -1 0 1 2
y
x -2 -1 0 1 2
y
x -2 -1 0 1 2
y
g. y = 3x 2 - 6 h. y = 42 - 2 i. y = 2x
2 - 6
x -2 -1 0 1 2
y
x -2 -1 0 1 2
y
x -2 -1 0 1 2
y
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a. y = x 2 - 3 b. y = x
2 - 10 c. y = x 2 - 4
x -5 -3 0
y 1 13
x -4 -2 0
y 15 26
x -7 -5 0
y
d. y = x 2 - 1 e. y = x
2 - 7 f. y = x 2 - 9
x -2 -1 0
y 48 63
x -2 -1 0
y 74 93
x -2 -1 0
y
g. y = x 2 - 5 h. y = x
2 - 8 i. y = x 2 - 6
x -2 -1 0
y -1 4
x -2 -1 0
y -2 8
x -2 -1 0
y
More equations...
y = 3x 2 - 4
Choose your own values for the variable. Draw tables and solve for y.
y = 2x 2 - 6 y = 5 p2 - 10 y = 6x 2 - 5 y = q2 - 1
Example:
2. Complete the table below for x and y values for the equation:
y = x 2 - 2
x -3 -2 0 1 3
y 7 2 -2 -1 7
y = (-3)2 - 2
= 9 - 2
= 7
y = (-2)2 - 2
= 4 - 2
= 2
y = (0)2 - 2
= 0 - 2
= - 2
- 1 = x 2 - 2
x 2 = 1
x = 1
7 = x 2 - 2
x 2 = 1
x = 3
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104 Interpreting graphs
Term3
Week5
1. Answer the following questions.
A linear equation is an equation with one or more variables which can berepresented by a straight line on a graph. The equation is never squared or square
rooted. Example: y = x + 2.
a. What does linear mean?
x y = x + 2 Ordered pair
-2 -2 + 2 = 0 (-2, 0)
-1 -1 + 2 = 1 (-1, 1)
0 0 + 2 = 2 (0, 2)
1 1 + 2 = 3 (1, 3)
2 2 + 2 = 4 (2, 4)
-4 -3 -2 -1 0 1 2 3 4
4
3
2
1
-1
-2
-3
-4
x
y
-4 -3 -2 -1 0 1 2 3 4
4
3
2
1
-1
-2
-3
-4
x
y
Choose some
values for x .
You plot these
chosen points on
the graph.
This is a
discrete function
that consists of
isolated points.
When drawing a line
through all the points
and extending the
line in both directions,
we get a
continuous function
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b. Is y = x + 3 linear or non-linear? Draw it.
c. Is y = x 2 + 2 linear or non-linear? Draw it.
d. Do exponents make an equation linear or non-linear?
continued☛
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104b Interpreting graphs (continued)
Term3
Week5
-4 -3 -2 -1 0 1 2 3 4
4
3
2
1
-1
-2
-3
-4
x
y
-4 -3 -2 -1 0 1 2 3 4
4
3
2
1
-1
-2
-3
-4
x
y
A linear graph
means a straight
line that increases
or decreases.
Example:
Look at the examples. Discuss.
(-3; -3) and (3; 3)Increasing
A < B
(-3; 3) and (3; -4)Decreasing
A > B
-4 -3 -2 -1 0 1 2 3 4
4
3
2
1
-1
-2
-3
-4
maximum point
minimum point
If a graph increases
or decreases in a
curved line it is a
non-linear graph.
A non-linear graph
is not a straight line
graph.
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2. Describe each graph using the words highlighted in green in this worksheet.
a. b. c.
d. e. f.
Problem solving
Draw a graph that includes four of the features learned in this worksheet.
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105 x-intercept and y-intercept
Term3
Week5
Read and discuss.The point at which the line crosses the
y-axis is called the y-interceptThe y-intercept is the point on thegraph where the value of x is zero: y-intercept = (0, y)
-3 -2 -1 0 1 2 3
3
2
1
-1
-2
-3
The x -intercept is the point on thegraph where the value of y is zero:x-intercept = (x, 0)
Example: To find the x and y intercepts of the graph of y = 2x - 7
To find the y-intercept, To find the x -intercept,
substitute x with 0. substitute y with 0.
y = 2(0) - 7 0 = 2x - 7
y = -7 2x = 7 x =
72
The y-intercept is at point (0, -7) and the x -intercept is at point (72 , 0)
Think back:
THENThink back to when you were inprimary school: your worksheetscontained statements like
+ 3 = 4 and you had to fill in
the box.
NOWNow you can say "x + 3 = 4"
Using function notationThese y = equations are functions. f(x ) isthe symbol for a function involving a singlevariable (in this case x ).
Previously we would have said: y = 2x + 5; solve for y if x = -2.
Now you can say:
f(x ) = 2x + 5, find f(-2).
Example: f(x ) = 2x + 5, find f(-2)
f(-2) = 2x + 5
= - 4 + 5
= 1
Let us proceed with x- and y-intercepts. Let x - and y-intercepts of y = f(x ) = x 2 + x -2.
To find the x-intercepts, we solve To find the y-intercept, we solve
f(x ) = x 2 + x - 2 f(x ) = x
2 + x - 2.
0 = x 2 + x - 2 y = 02 + 0 - 2
0 = (x + 2)(x - 1) y = - 2
x = 1 y = -2
So x -intercepts are (1, 0) and y-intercepts are (0, -2)
The point at which the line crosses the
x -axis is called the x-intercept
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Problem solving
If the x -intercept is 4, what could the y-intercept be?
Example: To find the y-intercept, substitute x with 0
y = 2(0) - 7
y = -7
1. Find the x- and y-intercepts.
To find the x -intercept, substitute y with 0
0 = 2x - 7
2x = 7
x = 72 = 3.5
a. y = 2x + 4 b. y = 2x + 7 c. y = 2x - 5
2. Find the x- and y-intercepts.
d. y = 3x - 6 e. y = -4x - 1 f. y = -3x - 2
a. x 2 + 2x + 1 = b. x
2 + 3x - 2 = c. x 2 + 4x - 2 =
d. x 2 + 5x - 4 = e. x
2 - 2x - 1 = f. x 2 - 4x + 3 =
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106 Interpreting graphs: Gradient
Term3
Week6
Change in height.
Gradient:Change in yChange in x
Change in y.
Change in x.
Change in horizontal distance.
Starting from the left with the line going
across to the right is a positive gradient
Look at these examples:
3
3
5
2
2
4
The gradient of theline is 3
3 = 1
52 = 2 1
2 = 2,5The line is steeper
so the gradient islarger.
24 = 1
2 = 0,5The line is less
steep, so thegradient is smaller.
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continued☛
Starting from the right with the line going across to the left is a negative gradient.
-3
3
2
4
The gradient is:-33
= -1
-52
= -2 12
= -2,5
-5
-2
-24
= - 12
= -0,5
Negative gradient:
Remember these terms used of linear and non-linear graphs:
linear
minimum
maximumnon-linear
increasing decreasing
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106b Interpreting graphs: Gradient continued
Term3
Week6
1. What are the positive gradients of these lines?
a. b.
c. d.
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Problem solving
How will you determine the gradient of any object in your home.
2. What are the negative gradients of these lines?
a.
c.
e.
b.
d.
f.
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1. Plot the following on the Cartesian plane. Use some of the above terms to describethe graphs.
107 Use tables of ordered pairs
Term3
Week6
x -4 -3 -2 -1 0 1 2 3 4
y -1 0 1 2 3 4 5 6 7
-10 -9 -8 -7 -6 -5 -4 -3 -2 -1 0 1 2 3 4 5 6 7 8 9 10
10
9
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
-9
-10
a.x -4 -3 -2 -1 0 1 2 3 4
y -3 -2 -1 0 1 2 3 4 5
b.x -4 -3 -2 -1 0 1 2 3 4
y -5 -4 -3 -2 -1 0 1 2 3
Describe the graph using:• Linear or non-linear .• Constant, increasing, decreasing
• Maximum or minimum (or not applicable)• Discrete or continuous
• y-intercept and x -intercept.
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c.x -4 -3 -2 -1 0 1 2 3 4
y 4 3 2 1 2 -1 -2 -3 -4
d.x -4 -3 -2 -1 0 1 2 3 4
y 1 0 1 2 3 4 5 6 7
e.x -4 -3 -2 -1 0 1 2 3 4
y 18 11 6 3 0 3 6 11 18
f.x -4 -3 -2 -1 0 1 2 3 4
y -2 0 2 0 -2 0 2 0 -2
Problem solving
Create your own table with ordered pairs and graph showing a linear graph intercepting the x -axis
and y-axis.
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108 More graphs
Term3
Week6
x 4 4 4 4 4 4 4
y -3 -2 -1 0 1 2 3
x = 4In this equation for all the values of y, x = 4 and it is plotted as a straight verticalline. We can say that the equation is independent from y.
If you write it in a table, it looks like this:
-5 -4 -3 -2 -1 0 1 2 3 4 5
5
4
3
2
1
-1
-2
-3
-4
-5
(-3,4) (-2,4) (-1,4) (1,4) (2,4) (3,4)
(4,3)
(4,2)
(4,1)
(4,0)
(4,-1)
(4,-2)
(4,-3)
x -3 -2 -1 0 1 2 3
y 4 4 4 4 4 4 4
y = 4
This equation is independent from x , so for all values of x , y = 4. It is plotted as astraight horizontal line.
1. Sketch and compare the graphs of:
These are the
ordered pairs.
a. x = 3 y = 3
x
y
x
y
b. x = -2 y = -2
These are the
ordered pairs.
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c. x = 5 y = 5
x
y
x
y
d. x = 7 y = 7
e. x = -6 y = 6
x
y
x
y
f. x = -8 y = 8
Problem solving
Sketch and compare the graphs of y = 2,5 and x = 2,5.
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109 Yet more graphs
Term3
Week6
x -3 -2 -1 0 1 2 3
y -3 -2 -1 0 1 2 3
x = y
1. Sketch and compare the graphs. Use the graph paper on the next page.
Is this graph
linear or
non-linear?
a. x = y
-4 -3 -2 -1 0 1 2 3 4
4
3
2
1
-1
-2
-3
-4
(-3,-3)
(-1,-1)
(-2,-2)
(1,1)
(3,3)
(2,2)
What are
ordered pairs?Is this graph
constant,
increasing or
decreasing?
What will
the graph
look like if it is
decreasing?
b. x = - y
c. -x = y d. -x = - y
2. Describe each graph.
a. Is the graph linear or non-linear?
b. Is the graph constant, increasing or decreasing?
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Problem solving
Compare the graphs a, b, c and d.
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110 Yet more graphs
Term3
Week6
Sketch and compare graphs: y = 2x; x = 2x + 1; y = 2 y - 1
y = 2x y = 2 y - 1x = 2x + 1
y -3 -2 -1 0 1 2 3
2x -6 -4 -2 0 2 4 6
x -3 -2 -1 0 1 2 3
2x + 1 -5 -3 -1 1 3 5 7
x -3 -2 -1 0 1 2 3
2x - 1 -7 -5 -3 -1 1 3 5
-8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
0
-8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
0
y = 2x y = 2 y - 1
x = 2x + 1
1. Sketch and compare the graphs of
a. y = 3x
y = 3x + 1
y = 3x - 1
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Problem solving
Sketch and compare the graphs of y = 6x , y = 6x + 1 and y = 6x -1
-8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
0
b. y = 5x y = 5x + 1 y = 5x - 1
-8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
0
d. y = 6x y = 6x + 1 y = 6x - 1
-8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
0
c. y = 4x y = 4x + 1
y = 4x - 1
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111 Sketch and compare graphs
Term3
Week7
y = 3x
y = 5x
y = 4x
y -3 -2 -1 0 1 2 3
3x -9 -6 -3 0 3 6 9
y -3 -2 -1 0 1 2 3
4x -12 -8 -4 0 4 8 12
y -3 -2 -1 0 1 2 3
5x -15 -10 -5 0 5 10 15
-8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
0
1. Sketch and compare the graphs.
a. y = 2x
y = 5x
y = 6x
y = 4 x
y = 5 x
y = 3 x
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Problem solving
Compare the graphs in a, b, c and d.
-8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
0
b. y = -2x y = -5x y = -6x
-8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
0
d. y = 3x
y = -x y = -2x
-8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
0
c. y = 3x
y = x
y = 2x
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112 Compare and sketch graphs
Term3
Week7
y = -3x + 2
y -3 -2 -1 0 1 2 3
x 11 8 5 2 -1 -4 -7
y = - 3 x + 2
Plot it on the graph.
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1. Complete the table and sketch the graph.
a. y = 4x + 3
y
continued☛
20
19
18
17
16
15
14
13
12
11
10
9
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
-9
-10
-11
-12
-13
-14
-15
-16
-17
-18
-19
-20
-20 -19 -18 -17 -16 -15 -14 -13 -12 -11 -10 -9 -8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
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112b Compare and sketch graphs continued
Term3
Week7
b. y = 2x + 4
y
20
19
18
17
16
15
14
13
12
11
10
9
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
-9
-10
-11
-12
-13
-14
-15
-16
-17
-18
-19
-20
-20 -19 -18 -17 -16 -15 -14 -13 -12 -11 -10 -9 -8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
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Problem solving
Compare graphs a and b.
c. y = -3x + 1
y
20
19
18
17
16
15
14
13
12
11
10
9
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
-9
-10
-11
-12
-13
-14
-15
-16
-17
-18
-19
-20
-20 -19 -18 -17 -16 -15 -14 -13 -12 -11 -10 -9 -8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
d. y = -2x + 2
y
20
19
18
17
16
15
14
1312
11
10
9
8
7
6
5
4
3
2
1
-1
-2
-3
-4
-5
-6
-7
-8
-9
-10
-11
-12
-13
-14
-15
-16
-17
-18
-19
-20
-20 -19 -18 -17 -16 -15 -14 -13 -12 -11 -10 -9 -8 -7 -6 -5 -4 -3 -2 -1 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
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113 Graphs
Term3
Week7
Equation: y = x + 3
y -4 -3 -2 -1 0 1 2 3 4
x -1 0 1 2 3 4 5 6 7
1. Determine the equation of the straight line passing through points and describe each
graph. If the graph increases or decreases what will you do to make it increase ordecrease?
a.x -3 -2 -1 0 1 2 3
y -13 -8 -3 2 7 12 18 Equation: y = 5x + 2
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Problem solving
Determine the equation of the straight line passing through some points given by you.
e.x -3 -2 -1 0 1 2 3
y 8 5 2 -1 -4 -7 -10
d.x -3 -2 -1 0 1 2 3
y 7 5 3 1 -1 -3 -5
c.x -3 -2 -1 0 1 2 3
y -14 -10 -6 -2 2 6 10
b.x -3 -2 -1 0 1 2 3
y -18 -12 -6 0 6 12 18Equation: y = 6x
Equation: y = 4x - 2
Equation: y = 2x + 1
Equation: y = -3x - 2
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114 More graphs
Term3
Week7
Look at the graph and write the ordered pairs in the tables. We did the first one foryou.
a. y = 4x -3 -2 -1 0 1 2 3
y 4 4 4 4 4 4 4
b. x = 4x
y
c. x = yx
y
d. y = -x x
y
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Problem solving
Determine the equation of a linear graph by drawing your own graph first.
1. Look at the lines on the graphs. What will the ordered pairsand equations be?
x
y
x
y
x
y
x
y
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115 Graphs
Term3
Week7
a. y = 2x y -6 -4 -2 0 2 4 6
x -3 -2 -1 0 1 2 3
b. y = 2x + 1 y -5 -3 -1 1 3 5 7
x -3 -2 -1 0 1 2 3
c. y = 2x - 1 y -7 -5 -3 -1 1 3 5
x -3 -2 -1 0 1 2 3
What is the rule?
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1. Determine the equation.
continued☛
Equation: y
x
y
x
y
x
Equation:
Equation:
a.
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115b Graphs continued
Term3
Week7
Equation: y
x
y
x
y
x
Equation:
Equation:
b.
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Problem solving
Determine the equation of the straight line by drawing three lines on a graph (use this worksheet toguide you).
Equation: y
x
y
x
y
x
Equation:
Equation:
c.
Same as previous page.
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116 Surface area, volume and capacity ofa cube
Term3
Week8
Perimeter of asquare
Area of asquare
The volume ofcube
Surface areaof a cube
Capacity
P = 4l A = l2 V = l3 A = the sum ofthe area of allthe faces.
An objectwith a volumeof 1 cm3 willdisplaceexactly 1 ml ofwater.
• An objectwith a volumeof 1 m3 willdisplaceexactly 1 kl ofwater.
If 1 cm = 10 mm, then 1 cm2 = 100 mm2
If 1 cm = 100 cm, then 1 m2 = 10 000 cm2
If 1 cm = 10 mm, then 1 cm3 = 1 000 mm3
If 1 cm = 100 cm, then 1 cm3 = 1 000 000 cm3 or 106 cm3
Where in real life will we use
the volume and surface
area of a cube?
Example:
Volume Capacity Surface area
V = l3
V = (4 cm)3
V = 64 cm3
Note: An object witha volume of 1 cm3 willdisplace 1 ml of water.
an object that is 64 cm3 will displace 64 ml water or0,064 l.
Net of the cube: howmany faces (surfaces) arethere? Shapes?
Surface area = sum of allthe area of all the faces.
= 6 (area of a face)
= 6a2
= 6 (4 cm)2
= 6 × 16 cm2
= 96 cm2
Volume of a solidis the amount of
space it occupies.
Capacity is the amountof liquid a container
holds when it is full.
The total area ofthe surface of a
geometric solid.
4 cm
Cubic mm Cubic cm Cubic m Litre
1 000 000 000 1 000 000 1 1 000
1 000 000 1 000 0,001 1
1 000 1 0,000001 0,001
4 cm
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1. Calculate the volume, capacity (filled with water) and surface area
of the following cubes. The one side equals ____.
a. 5 cm b. 2,8 cm
c. 4,3 cm d. 5,25 cm
e. 40 cm f. 55 cm
continued☛
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116b Surface area, volume and capacity ofa cube continued
Term3
Week8
g. 8,2 cm h. 3,75 cm
i. 82 cm j. 100 cm
Example:
2. If the surface area is ____, what will the volume of the cube be?
54 cm2
A cube has six faces 54 cm2 ÷ 6 = 9 cm2
The formula for the volume of a cube is l × b × h
3 cm × 3 cm = 9 cm2
The volume is 9 cm2.
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Problem solving
All the sides of this geometric object with six faces are the same. One side equals 3,5 cm. What is theshape of this object.
a. 216 cm2 b. 150 cm2
c. 294 cm2 d. 24 cm2
e. 486 cm2 f. 388 cm2
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117 Surface area, volume and capacity ofa rectangular prism
Term3
Week8
Perimeter ofa rectangle
Area of arectangle
The volume ofa retangular
prism
Surfacearea of arectangularprism
Capacity
P = 2(l + b)or 2l + 2b
A = l × b V = l × b × h A = the sum ofthe area of allthe faces.
An object with avolume of 1 cm3 willdisplace exactly 1ml of water.
• An object with avolume of 1 m3 willdisplace exactly 1 kl of water.
If 1 cm = 10 mm, then 1 cm2 = 100 mm2
If 1 cm = 100 cm, then 1 m2 = 10 000 cm2
If 1 cm = 10 mm, then 1 cm3 = 1 000 mm3
If 1 cm = 100 cm, then 1 cm3 = 1 000 000 cm3 or 106 cm3
Where in real life will we use the volume andsurface area of a rectangular prism?
Example:
Volume Capacity Surface area
V = l × b × h
V = 4 cm × 2 cm × 1,5 cm
V = 12 cm3
Note: An object witha volume of 1 cm3 willdisplace 1 ml of water.
an object that is 12 cm3 will displace 12 ml.
Describe the face (surface).
Surface area:
A = 2bl + 2lh + 2hb
= 2 (1,5 cm × 4 cm) + 2 (4 cm × 2 cm) + 2(2 cm × 1,5 cm)
= 12 cm2 + 16 cm2 + 6cm2
= 34 cm2
4 cm
Cubic mm Cubic cm Cubic m Litre
1 000 000 000 1 000 000 1 1 000
1 000 000 1 000 0,001 1
1 000 1 0,000001 0,001
1,5 cm
2 cm
4 cm
1,5 cm
2 cm
1. Calculate the volume, capacity (filled with water) and surface area of thefollowing rectangular prisms.
length breadth height
a. 2 cm 1 cm 8 cm
b. 3,4 cm 2,2 cm 4 cm
c. 8 cm 4,3 cm 5 cm
d. 7,2 cm 6,5 cm 3,7 cm
e. 5,5 cm 3,5 cm 6 cm
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Example:
2. If the surface area is ____, what will the volume of the rectangular prism be?
52 cm2
A rectangular prism has six faces
The formula for the volume of a rectangular prism is l × b × h
4 cm × 3 cm × 2 cm = 24 cm3
The volume is 24 cm3.
Problem solving
The length, breadth and height of this geometric object with six faces are 6 cm, 3 cm and 8 cm. Whatshape is the object? Draw it.
a. b.
c. d. e.
a. 104 cm2 b. 118 cm2 c. 122 cm2
d. 214 cm2 e. 220 cm2
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118 Surface area, volume and capacity ofa hexagonal prism
Term3
Week8
Perimeter ofa hexagon
Area of ahexagon
The volumeof hexagonalprisms
Surfacearea of ahexagonalprism
Capacity
P = 6r See below V = 3 ash
a = apothemlength
s = side
h = height
A = the sum ofthe area of allthe faces.
An object witha volume of 1cm3 will displaceexactly 1 ml ofwater.
• An object witha volume of 1m3 will displaceexactly 1 kl ofwater.
Where in real life will we use
the volume and surface
area of a hexagonal prism?
Investigate the volume and surface area of a hexagonal prism.
Information given
Regular hexagon
We can find the area of a regular hexagon by splitting it into six equilateral triangles.
L is the length. H is the height of each triangle.
Use Pythagoras theorem for a right-angled triangle:
l2 = (12 L)2 + H2
So:
H = l2 - ( 12 L)2 = 3
2 L√ √
Now, look at one of the equilateral triangles:
Area of triangle = 12 × base × height = 1
2 × L × H = 12 × L ×
√32 L =
√34 l
2
and:
Area of regular hexagon = ngle =√34 l
2 × 6 =√3 34 l2
In approximate numeric terms, the area of a regular hexagon is 2,598 times the square of its side
length.
L
L 12 L
H
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1. Calculate the volume of a hexagon.
Problem solving
Summarise your investigation into the surface area of a hexagon.
2. Calculate the surface area of a hexagon.
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119 Surface area, volume and capacity ofa triangular prism
Term3
Week8
Perimeter ofa rectangle
Area of arectangle
The volumeof rectangle
Surface area ofa rectangularprism
Capacity
P = 2b + 2h A = 12 b × h V = b × h A = the sum of
the area of allthe faces.
An object with avolume of 1 cm3 willdisplace exactly1 ml of water.
An object with avolume of 1 m3 willdisplace exactly1 kl of water.
If 1 cm = 10 mm, then 1 cm2 = 100 mm2
If 1 cm = 100 cm, then 1 m2 = 10 000 cm2
If 1 cm = 10 mm, then 1 cm3 = 1 000 mm3
If 1 cm = 100 cm, then 1 cm3 = 1 000 000 cm3 or 106 cm3
Do not confuse this with
litres (l )
height (h)
base (b)
length (l)
Where in everyday l life will we
use the volume and surface
area of a triangular prism?
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Example:
continued☛
Note that the two triangles
are identical, but the three
rectangles are different in size.
√
Volume
Capacity Note: An object with a volume of 1 cm3 will displace 1 ml of water.
an object that is 15 cm3 will displace 15 ml of water.
Surface area
V = b × h × l
V = 12 (5 cm) × 3 cm × 2 cm
V = 2,5 cm × 3 cm × 2 cm
V = 15 cm3
3 cm
5 cm2 cm
To find the length of two of
the rectangles we need touse Pythagoras’ theorem..
The two triangles will be thesame size.
A = 2 (area of triangle) + (area of the three rectangles)
Area of triangles: = 2 ( 12 (5 cm) x 3 cm) = 15 cm2
Area of middle rectangle = b x 1 = 5 cm x 2 cm = 10 cm2
Area of the other two rectangles = (length x side of triangle) x 2
= (2 cm x 32 + 2,52) x 2 = (2 cm x 3,9 cm) x 2 = 7,8 cm2 x 2 = 15,6 cm2
A = 15 cm2 + 10 cm2 + 15,6 cm2 = 40,6 cm2
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119b Surface area, volume and capacity ofa triangular prism continued
Term3
Week8
a. Base = 2 cm, Height = 1 cm and Length = 3 cm3
b. Base = 10 cm, Height = 3 cm and Volume = 30 cm3
1. Calculate the volume, capacity and the surface area of the following triangularprisms.
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103
2. If the surface area is ____, what will the volume of the triangular prism be?
a. 110 cm2 and length = 4 cm b. 66 cm2 and length = 5 cm
c. 177 cm2 and l = 2 cm d. 228 cm2 and l = 3 cm
Problem solving
The geometric object has two triangular faces and three rectangular faces. The area of the triangle is12 cm2, the height of each triangle is 4 cm and the length of the prism is 4cm.
What will the surface area be?
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120 Surface area, volume and capacity ofa cylinder
Term3
Week8
If 1 cm = 10 mm, then 1 cm2 = 100 mm2
If 1 cm = 100 cm, then 1 m2 = 10 000 cm2
Example:
Volume Capacity Surface area
V = π × r2 × h
diameter = 4 radius = 2
= π × (2)2 × 4
= π × 4 × 4
= 16π cm3
= 50,265 cm3
Note: An object with
a volume of 1 cm3 will
displace 1 ml of water.
an object that is 12 cm3
will displace 12 ml of water.
A = 2 × π r × (r + h)
Surface area of one end
= π × r2
Surface area of side = C × h
= 2 × π × r × h
diameter = 4
radius = 2
= 2 × π × r × (r + h)
= 2 × π × 2 × (2 + 4)
= 2 × π × 2 × (6)
= 24π
= 75,398 cm2
Circumference of a circle
C = π d or 2 π rArea of a circle
A = π r2
The volume of a cylinder
V = π r2 hSurface area of a cylinder
A = sum of the area of all the faces.
4 cm
4 cm
4 cm
4 cm
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1. Calculate the volume, capacity (if filled with water) and surface area ofthe cylinder.
continued☛
a.
8 cm
6 cm
b.
5 cm
10 cm
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120b
Term3
Week8
Surface area, volume and capacity ofa cylinder continued
c. Diameter: 4 cm
Height: 10 cm
d. Diameter: 12 cm
Height: 14 cm
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Problem solving
The diameter of the circle is 7 cm. The height of the object is 5,5 cm. Identify the geometric object.
e. Diameter: 9 cm
Height: 13 cm
f. Diameter: 7 cm
Height: 11 cm
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108
Look at the figures and describe each one. Make use of words such as mirror,shape, original shape, line of reflection and vertical.
121 Reflecting over axes
Term4
Week1
1. Describe each reflection using the guidelines below each graph. Remember to
label the figures before you describe it.
-6 -5 -4 -3 -2 -1 0 1 2 3 4 5 6
12
11
10
9
8
7
6
5
4
3
2
1
C
E
D
BA
F
C'
B'
F'
A'
E'
D'
1 2 3 4 5 6 7 8 9 10 11 12
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
-6
C
E
D
BA
F
C'
B'
F'
A'
E'
D'
The co-ordinates of each figure are:
ABCDEF: (-5,6); (-3,6); (-3,9); (-1,9); (-1,4); (-5,4)A'B'C'D'E'F': (5,6); (3,6); (3,9); (1,9); (1,4); (5,4)
What do you notice? If a figure reflects over the y-axis the y-coordinates stay the same and thex -coordinates change to their opposite integers.
The co-ordinates of each figure are:
ABCDEF: (5,6); (7,6); (7,3); (9,3); (9,1); (5,1)A'B'C'D'E'F': (5,-6); (7,-6); (7,-3); (9,-3); (9,-1); (5,-1)
What do you notice? If a figure reflects over the y-axis the y-coordinates stay the same and thex -coordinates change to their opposite integers.
When a shape is reflected over a mirror line,
the reflection is the same distance from the
line of reflection as is the original shape.
a.
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
CB
A
C'B'
A'
b.
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
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i. Write down the co-ordinates forboth figures:
___________________________________
___________________________________
ii. Reflects over ____ axis.
iii. Compare x - and y-coordinates. ___________________________________
___________________________________
___________________________________
___________________________________
i. Write down the co-ordinates for both figures: ___________________________________
___________________________________
ii. Reflects over ____ axis.
iii. Compare x - and y-coordinates. ___________________________________
___________________________________
___________________________________
___________________________________
c.
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
d.
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
i. Write down the co-ordinates forboth figures:
___________________________________
___________________________________
ii. Reflects over ____ axis.
iii. Compare x - and y-coordinates.
___________________________________ ___________________________________
___________________________________
___________________________________
i. Write down the co-ordinates for both figures: ___________________________________
___________________________________
ii. Reflects over ____ axis.
iii. Compare x - and y-coordinates.
___________________________________ ___________________________________
___________________________________
___________________________________
Problem solving
What will the co-ordinates of the reflected figure ABC [(-3,4); (-1,1); (-5,1)], over the: • x -axis
• y-axis.
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What do you notice about the line of reflection?x = - y
E.g. (1, -1); (2, -2)
The co-ordinates for ABCDEF are:(-6, 0); (-1, 0); (-1, -4); (-3, -4); (-3, -2); (-6, -2)
The co-ordinates for A'B'C'D'E'F' are:(0, 6); (1, 0); (1, 4); (4, 3); (2, 3); (2, 6)
When you reflect a point across a line x = - y,
the x -coordinate and the y-coordinate change
places and the signs change (negated).
122 More about reflecting over axes
Term4
Week1
1. Draw the lines.
a. x = y b. -x = y
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
C
E
D
BA
F
C'B'
F'A'
E' D'
Explain how you determine the line: Explain how you determine the line:
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111
i. Write down the co-ordinates for
both figures: ___________________________________
___________________________________
ii. Reflects over ____ axis.
iii. Compare x - and y-coordinates. ___________________________________
___________________________________
___________________________________
___________________________________
i. Write down the co-ordinates
for both figures: ___________________________________
___________________________________
ii. Reflects over ____ axis.
iii. Compare x - and y-coordinates. ___________________________________
___________________________________
___________________________________
___________________________________
Problem solving
Draw a figure reflecting over a line -x = y. Write down the co-ordinates.
2. Describe each reflection. Remember to label your figuresbefore you describe them.
a. b.
3. Draw figures reflecting over a line x = y.
i. What are the co-ordinates?
___________________________________
___________________________________
ii. Reflects over ____ axis.
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112
Describe the reflection.The co-ordinates for ABC:
(-5,3); (-3,0); (-5,2).
The co-ordinates for A'B'C':(1,3); (-1,0); (1,2)
The line of reflection in line withA and A' is (-2,3)
B and B' is (-2,0)C and C' is (-2,2).
123 Reflecting over any line
Term4
Week1
1. Describe the reflection using the example in the concept development to guideyou. Remember to label your diagrams.
a.
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
C
B
A
C'
B'
A'
A A'Line of
reflection
(-5,3) (1,3) (-2,3)
B B'Line of
reflection
(-3,6) (-1,0) (-2,0)
C C' Line ofreflection
(-5,2) (1,-2) (-2,2)
A -5 -(-2) = -3(Move 3 to the left).A' 1-(-2) = 3
(Move 3 to the right).
B -3 -(-2) = -1(Move 1 to the left).B' 1-(-2) = 1
(Move 1 to the right).
c -5 -(-2) = -3(Move 3 to the left).
C' 1-(-2) = 3(Move 3 to the right).
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b.
c.
d.
Problem solving
Show a figure reflecting over any line. Write down the co-ordinates.
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Explain this rotation.
Co-ordinates for ABCDEF are:(0,5); (2,5); (2,2); (4,2); (4,0); (0,0)
Co-ordinates for A'B'C'D'E'F' are:
(0,-5); (-2,-5); (-2,-2); (-3,-2); (-3,0); (0,0)
The co-ordinates of corresponding vertices
are opposite integers (just the + and - signs aredifferent). This is always the same for 180° rotationsabout the origin.
124 Rotations
Term4
Week1
1. Give two more examples of your own to show that the co-ordinates ofcorresponding vertices are opposite integers (with just the + and - signs beingdifferent).
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
-5 -4 -3 -2 -1 1 2 3 4 5 6
2. RotationMake use of words such as rotated or turned, clockwise, anti-clockwise, point of
rotation and distance.
a. Write down the co-ordinates for:
A: ______ A': ______
B: ______ B': ______
C: ______ C': ______
D: ______ D': ______
E: ______ E': ______
F: ______ F': ______
C
E
D
BA
F
C'
B'
F'
A'
E'
D'
C
E
D
BA
F
C'B'
F' A'
E' D'
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
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Problem solving
Show a figure on a Cartesian grid. Write down the co-ordinates.
3.
a. Write down the co-ordinates for:
A: ______ A': ______
B: ______ B': ______
C: ______ C': ______
D: ______ D': ______
E: ______ E': ______
F: ______ F': ______
b. What do you notice about the co-ordinates of corresponding vertices?
c. Give two more examples of rotating a figure 90º over the x -axis.
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
-5 -4 -3 -2 -1 1 2 3 4 5 6
C
E
D
BA
F
C'B'
F'A'
E'D'
b. What do you notice about the co-ordinates of corresponding vertices?
c. Give two more examples of rotating a figure 90º over the x -asis.
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The co-ordinates are:
ABCDEF
(-4,0); (-2,0); (-2,-3); (0,-3); (0,-5); (-4,-5)
A'B'C'D'E'F' are:(-2,3); (0,3); (0,0); (2,0); (2,-2); (-2,-2)
The translation vector is a vector that gives thelength and direction of a particular translation.
3 up on the y-axis2 right on the x -axis.
What is the translation vector for the figure?
2 right means +2 and 3 up means +3.
125 Translation
Term4
Week1
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
C
E
D
BA
F
C'
B'
F'
A'
E'
D'
Work in pairs to prove this.
Write down the pairs of corresponding vertices.
• (-4,0) and (-2,3) • (-2,0) and (0,3) • (-2,-3) and (0,0)
-4 + 2 = -2 -2 + 2 = 0 -2 + 2 = 0
0 + 3 = 3 0 + 3 = 3 -3 + 3 = 0
• (0,-3) and (2,0) • (0,-5) and (2,-2) • (-4,-5) and (-2,-2)
0 + 2 = 2 0 + 2 = 2 -4 + 2 = -2
-3 + 3 =
0 -5 + 3 =
-2 -5 + 3 =
-2
Co-ordinates
______________________________________
______________________________________
Translation vector
______________________________________
1. Describe the translation. Remember to label your diagrams.
a. b.
Co-ordinates
______________________________________
______________________________________
Translation vector
______________________________________
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Problem solving
Show translation of a figure on the Cartesian plane. Write down the co-ordinates.
Co-ordinates
______________________________________
______________________________________
Translation vector ______________________________________
______________________________________
c. d.
Co-ordinates
______________________________________
______________________________________
Translation vector ______________________________________
______________________________________
Co-ordinates
______________________________________
______________________________________
Translation vector ______________________________________
______________________________________
e. f.
Co-ordinates
______________________________________
______________________________________
Translation vector ______________________________________
______________________________________
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In your own words describe each of these transformation words:
126 Transformation
Term4
Week2
Reflection
Over the x-axis
Over the y-axis
Over any line
Rotation Translation
a.
b.
1. Describe the transformations. Remember to label your diagrams and axes.
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c.
d.
Problem solving
Show reflection, rotation and translation on a Cartesian plane and write down the co-ordinates.
Write down notes on what to remember when working with transformations on the
Cartesian plane.
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120
Show that the figures and its images are congruent by describing how the original
figure has moved, using a combination of transformations.
127 More transformations
Term4
Week2
The figure is:
• reflected, then• rotated - clockwise by 90º, and then• translated 5 blocks to the left and 2
blocks down.
Use co-ordinates to describe the
transformation. You described thetransformation from left to right; explainit now from right to left.
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
C
B
A
C'
B'
A'
(-4,3)
(-3,-1)
(-1,-3)
(-5,-2)
(-2,-5)
(3,-4)
1a. Write down the co-ordinates of the geometric figures.
b. What do you notice?
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continued☛
c. What type of transformation is it?
-5 -4 -3 -2 -1 1 2 3 4 5 6
6
5
4
3
2
1
0
-1
-2
-3
-4
-5
C
B
A
C'
B'
A'(-2,2)
(-4,4)(4,4)
(-5,1) (5,1)
(2,2)
2a. Write down the co-ordinates of the geometric figures.
b. What do you notice?
c. What type of transformation is it?
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127b More transformations continued
Term4
Week2
3a. Use words to describe thistransformation, starting from the
figure on the left.
b. Now use co-ordinates to describe thetransformation.
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Problem solving
Show a transformation on the Cartesian plane using reflection, rotation and translation. Write down theco-ordinates.
4. Describe transformation, starting from the figure on the right.
a. Show congruent figures (a figure and its image), using rotation and reflection. (Example of an answer:)
1 2 3 4 5 6 7
7
6
5
4
3
2
1
0
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This worksheet you will use the scale factor and center of enlargement to work out
the measure of enlargement.
128 Enlargement and reduction
Term4
Week2
A'B' = 2 × ABB'C' = 2 × BC
A'C' = 2 × AC
Calculate the area and perimeter of the
• original triangle• enlarged triangleif one square = 1 cm × 1 cm.
Centre of enlargement
A
C B'B
A'
C'
Look at this example and discuss it.
Note how we write it.We put a
single apostrophe (') after each
point of the enlarged image.
Original figure Enlarged figure
Perimeter
3 cm + 3 cm +3 cm = 9 cm
Area1
2 × b × h
=1
2 × 3 cm × 3 cm
=9
2 cm2
= 41
2 cm2
Perimeter
6 cm + 6 cm +6 cm = 18 cm
Area1
2 × b × h
=1
2 × 6 cm × 6 cm
=36
2 cm2
= 18 cm2
Area
• Original triangle = 41
2 cm
• Enlarged triangle = 18 cm2
18 cm2
÷ 4,5 cm2
= 4
Perimeter
• Original triangle = 9 cm
• Enlarged triangle = 18 cm
9 cm × 2 = 18 cm
The 4 = 2 (because we work with area).
The scale factor is 2.
Therefore we say that the transformation is an enlargement with scale factor 2.
√
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continued☛
a. Each square on the square paper = 1 cm × 1 cm
1. By what scale factor is the figure enlarged?
A
C
B'
B
A'
C'D D'
A'B' = (2) × AB 2 × 3 = 6
B'C' = (2) × BC _____ = _____
C'D' = (2) × CD _____ = _____
A'D' = (2) × AD _____ = _____
What is the perimeter and the area of:
• the original figure?
Area: ____________________________ Perimeter: ____________________________
• the enlarged figure?
Area: ____________________________ Perimeter: ____________________________
Therefore we say that the transformation is an enlargement with scale factor _____ .
b. Each square = 1 cm × 1 cm
A
C
B'
B
A'
D D'
A'B' = (3) × AB _____ = _____
B'C' = (3) × BC _____ = _____
C'D' = (3) × CD _____ = _____
A'D' = (3) × AD _____ = _____
What is the perimeter and the area of:
• the original figure?
Area: ____________________________ Perimeter: ____________________________
• the enlarged figure?
Area: ____________________________ Perimeter: ____________________________
Therefore we say that the transformation is an enlargement with scale factor _____ .
C'
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c. Each square = 1 cm × 1 cm
A
C B'
A'
B
A'B' = 4 × AB
B'C' = 4 × BC
A'C' = 4 × AC
What is the perimeter and the area of:
• the original figure?
Area: ____________________________ Perimeter: ____________________________
• the enlarged figure?
Area: ____________________________ Perimeter: ____________________________
Therefore we say that the transformation is an enlargement with scale factor _____ .
C'
d. By what scale factor is the figure enlarged?
What is the perimeter and the area of:
• the original figure?
Area: ____________________________
Perimeter: ____________________________
• the enlarged figure?
Area: ____________________________
Perimeter: ____________________________
Therefore we say that the transformation is an enlargement with scale factor _____ .
A
C
B
D
3. Draw the enlargement.
a. An enlargement with scale factor 5
128b Enlargement and reduction continued
Term4
Week2
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b. An enlargement with scale factors 2 1
2
What is the perimeter and the area of:
• the original figure?
Area: ____________________________ Perimeter: ____________________________
• the enlarged figure?
Area: ____________________________ Perimeter: ____________________________
Therefore we say that the transformation is an enlargement with scale factor _____ .
What is the perimeter and the area of:
• the original figure?
Area: ____________________________
Perimeter: ____________________________
• the enlarged figure?
Area: ____________________________
Perimeter: ____________________________
Therefore we say that the transformation is an enlargement with scale factor _____ .
A
B
C
We can draw an enlargement likethis as well
4. Draw an enlargement with scale factor 2
Problem solving
If I enlarge a triangle with sides that equal 3 units by scale factor 4, what will the length of the sides be?
Each unit = 1 cm by 1cm. What is the perimeter and area of:
• the original figure? • the enlarged figure?
Step 1:
A'B' and B'C' should be the same length as A'C'. How would I measure this withoutusing a ruler? __________________________________________________________________
A
B
C
A'
B'
C'
A
B
C
A'
B'
C'
A
B
C
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128
Look at the example. Discuss.By what scale factor is the figure enlarged? (2).
129 More enlargement and reduction
Term4
Week2
1. Complete the following.
In pairs, calculate the areaand perimeter of:
• the original figure
• the enlarged figure
By what scale factor is the figure enlarged? (4).
In pairs, calculate the area
and perimeter of:
• the original figure
• the enlarged figure
3 cm3 cm
3 cm
6 cm
6 cm
6 cm
A
B C
A'
B' C'
2 cm
3 cmA B
D C
8 cm
12 cmA' B'
C'D'
a. 2,1 cm i. Enlarge by scale factor 2.
ii. Calculate the perimeter and area of: • the original figure • the enlarged figure
iii. What do you notice?
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b. 2,5 cm
i. Enlarge by scale factor 2.
ii. Calculate the perimeter and area of:
• the original figure • the enlarged figure
iii. What do you notice?
3,5 cm
c.
i. Enlarge by scale factor 2.
4,2 cm
continued☛
1,5 cm
height
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ii. Calculate the perimeter and area of: • the original figure • the enlarged figure
iii. What do you notice?
d.
i. Enlarge by scale factor 3.
Diagonal AC = 22,5 cm
Diagonal BD = 16,5 cm
129b More enlargement and reductioncontinued
Term4
Week2
C
BD
A
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Problem solving
Enlarge your answer of question 1b by scale factor 3.
Reduce your answer of question 1b by scale factor 3.
What do you notice?
ii. Calculate the perimeter and area of: • the original figure • the enlarged figure
iii. What do you notice?
2. Complete the following.
a. By which scale factor is the figure enlarged? ____________________________________ b. Calculate the perimeter and area of: • the original figure • the enlarged figure
2 cm
4 cm
4 cm
7 cm
5 cm
4 cm
8 cm
8 cm
14 cm
10 cm
225°
25°
225°
25°
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Look at this Venn diagram of polyhedra. Discuss.
130 Polyhedra
Term4
Week2
Platonic solids: A set of five regularconvex polyhedrons which all haveidentical faces and the same number
of edges meeting at each vertex:tetrahedron, cube, octahedron,dodecahedron and icosahedron (with
4,6, 8, 12 and 20 faces respectively).
1. What is a regular polyhedron?
2. Semi-regular or Archimedean solids.
Polyhedra
Pyramids Prisms
Platonic solids
OctahedronDodecahedron
Triangular
prism
Pentagonalprism
Octagonalprism
Cuboid
Cube
Irregular
Icosahedron
Octagonal
pyramid
Pentagonal
pyramid
Squarepyramid
Hexagonalpyramid
Tetrahedron
a. How many regular polyhedra exist? _________________________________________
b. Which polygons are they made up of? What are they called?
a. Look at these examples of Archimedean solids. i. What do you notice?
Regular
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Problem Solving
Find another two Archimedean and Johnson solids. Name and describe each.
3. What is the difference between Platonic, Archimedean and Johnson solids?Platonic solids
_______________________________________________________________________________
_______________________________________________________________________________
Archimedean solids _______________________________________________________________________________
_______________________________________________________________________________
Johnson solids
_______________________________________________________________________________
_______________________________________________________________________________
Truncatedtetrahedron
Cuboctahedron
Truncated cube Truncated
octahedron
Square
pyramid
Pentagonal
pyramid
Triangular
cupola
Square
cupola
l
ii. Why do you think they are named “semi-regular” solids?
b. Look at the Johnson solids. What do you notice?
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cylinder
131 Polyhedra and non-polyhedra
Term4
Week3
1. How can you tell that a surface is a plane surface?
2a. We know now that that we can classify spheres, cylinders and hemispheres in
their own category. Why?
b. What do you think a hemisphere is?
sphere
Read more about the Archimedean and Johnson solids.Summarise it in your own words.
Archimedean solidsA set of 13 highly symmetric, semi-regular convex polyhedronsmade up of two or more types of non-intersecting regular
polygons meeting in identical vertices with all sides the samelength (excluding regular prisms and anti-prisms and theelongated square gyrobicupola).
Johnson solidsA set of 92 convex polyhedrons with regular faces and equal
edge lengths but whose regular polygonal faces do not meetin identical vertices (but excluding the completely regularPlatonic solids and the semi-regular Archimedean solids andhuge range of prisms and anti-prisms).
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132
Term4
Week3
Regular and non-regular polyhedraand non-polyhedra
a. ________ b. _________ c. ________
d. ________ e. ________ f. ________
g. ________ h. _______ i. ________
Describe each of the following
1. Identify whether the following is regular or irregular.
2
i. Identify the following geometric solids in the photographs: e.g. cube,hemisphere, cylinder, triangular prism, etc.
ii. Identify also whether each is:
• a regular or irregular polyhedron• not a polyhedron
a. b.
Regular polyhedra Non-regularpolyhedra
Non-polyhedra
i. _____________________
_____________________
ii. _____________________
_____________________
i. _____________________
_____________________
ii. _____________________
_____________________
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Problem solving
Why do you think that a hemisphere and the solids above are not the same.
c. d.
e. f.
g. h.
i.
i. _____________________ _____________________
ii. _____________________
_____________________
i. _____________________
_____________________
ii. _____________________
_____________________
i. _____________________
_____________________
ii. _____________________
_____________________
i. _____________________
_____________________
ii. _____________________
_____________________
i. _____________________ _____________________
ii. _____________________
_____________________
i. _____________________
_____________________
ii. _____________________
_____________________
i. _____________________
_____________________
ii. _____________________
_____________________
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133 Polyhedra and non-polyhedra allaround us.
Term4
Week3
Look at the following pictures. Identify the geometric object and then name it.
1. Look at these ancient ruins. What is similar in all the pictures?
2.
a.
a. Which building is this?
b. What solid do you observe?
b. c.
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Problem solving
Concave means curved inwards and convex means curved outwards. Explain this using the pictures in
this worksheet.
3. Nature provides us with the most beautiful patterns. Look at the followingpatterns in nature and see how you can create a polyhedron out of each one.
You don’t have to name the polyhedron.
4. Look at this architectural structure. Why do we say this is a concave polyhedron?
Flowers Under the sea
a.
e. Rocks f. Plants
c.b.
d.
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134 Visualise geometric objects
Term4
Week3
Read, close your eyes and visualise.
Imagineyou have atetrahedron.Imaginenow thatyou havetwo identicaltetrahedra.Place themtogether.Name anddescribe thenew solid.
Imagine you have a cube.In your mind, cut off all thevertices. Which Archimedeansolid will it be?
Truncatedoctahedron
Truncatedicosahedron
Snub cube Truncatedcube
Cuboctahedron
Truncatedtetrahedron
Truncateddodecahedron
Rhombicuboctahedron
Imagine you have atetrahedron. In your mind,cut off all the vertices. WhichArchimedean solid will it be?
1. Write down all the platonic solids’ names. Next to each give a description that you
will read to a friend. The friend must then guess the geometric object.
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2. Place the five platonic solids made on your table from the cut-outs. Tick howmany geometric figures you can see from the angle from which you are looking.
a. b.
d.
e.
c.
Work in pairs
In pairs do the following activity:
Each of you makes a regular, irregular, cylinder, sphere and any other geometric solid.
Each of you places the geometric solid you have made into a bag.
One of you then feels one of the objects in the bag and describes it to his or her friend who has toguess what it is.
Do this a few times by replacing the solid.
T e t r a h e d r o n Triangles
1 2 3 4 5
O c t a h e d r o n Triangles
1 2 3 4 5 6 7 8
D o d e c a
h e d r o n Pentagons
1 2 3 4 5 6 7 8 9 10 11 12
I c o s a
h e d r o n
Triangles
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
C u b e
Squares
1 2 3 4 5 6 7 8
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135 Geometric solid game
Term4
Week3
In this activity you are going to design the questions for this game. First, write downsome key geometric solid words learned so far. Use these words to create your
game cards on the next page.
1. Read the rules. Create your own game components.
Game RulesWhat you need:• Two tokens to play with (use any small objects)• Markers to cover the numbers• Dice (make your own using a cube template)• Question cards (Cut up a sheet of paper into 32 rectangular cards on which you will
write questions to be asked)• Game board
How to play:Divide your group into two teams.Each team has a token. • Place your token on any empty square. You can move in any direction.• Throw the dice. The number on the dice will indicate to you how many places you can
move.• Your aim is to land on a solid. When you land on a solid, take a card from the box. Read
the question and answer it. Turn over the card to find the correct answer. If you haveanswered correctly, you can keep the card; otherwise place it at the back of Pack 1,
Grade 9.• Also, if you answered correctly and kept the card, place a marker on the geometric
shape or solid. This means that no-one can answer a question on this square again; it isnow the same as a white square.
• The next team plays. • You always wait for your turn where you answered the previous question. If you land on
an empty square you cannot take a card but must wait for your next turn to throwagain.
• The game is over once all the shapes or geometric solids are covered.• In the bottom corner of each card is a score. Add all of the scores of the cards you won.
Prisms
Triangular
prism
Pentagonalprism
Octagonalprism
Hexagonalprism
Cuboid
Cube
Cube
l
Pyramids
Pentagonalpyramid
Squarepyramid
Hexagonalpyramid
Tetrahedron
Platonic solids
Octahedron
Dodecahedron
Icosahedron
Hexagonalpyramid
Tetrahedron
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Family time:
Play your own created game with your family members at home.
Q u e s t i o n s C a r d s
Geometric Game
G e o m e t r i c G a m e
Q u e s t i on s C ar d s Q u e s t i o n s C a r d s
Questions Cards
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136 Perspective
Term4
Week4
Look at these photographs, and answer the questions.
Are these railway tracks parallel?
If we were to view this
from above, we would see
parallel lines.
What is happeningwith this girl? Does shephysically get smaller?
vanishing point vanishing point
perspective line
1. Use a pencil, a piece of paper, a ruler and an eraser. Follow the instructions, anddraw the following.
Step 1: Draw a horizontal line. Step 2: Choose a vanishing point.
You can pick a point anywhere on this line, it doesn'treally matter (Your results will just look differentdepending on where you put the point.)
Step 3: Draw perspective lines, (Draw the perspective
lines lightly so that you can easily erase them). Makeone line with your ruler from the vanishing point
outward. This line will be the bottom of your building.Next, draw the top line. This will form the base of one
wall of the house.
Step 4: Draw two vertical lines that connect the
bottom and top lines. One wall of your structure isdone
e ouse.
perspective line
perspective line
connecting line
connecting line
vanishing point
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Step 5: Form the front of the perspective object.Drawtwo horizontal lines of equal distance from the top and
bottom of the closest part of the wall. Connect thesetwo new lines with another vertical line.
What you have done so far is to draw a cuboid. You
might need to shade it to see it more clearly. This iswhat we call a one-point perspective drawing at its
simplest.
Step 6: Draw the roof.Draw two diagonal lines from the top vertices of the
front of the box (creating a triangle). Draw a line fromwhere the lines meet towards the vanishing point.
Draw another diagonal line that connects the far pointof the box with the line you just created going towards
the vanishing point. Try to make this diagonal line havethe same angle as the line it matches up with at thefront. These two lines should be parallel.
Step 7: Make the drawing neat.Remove anyunwanted perspective lines, like the ones extending
towards the vanishing point and horizon line.
Before you carry on with Step 5, answer the following questions.
• Are the two connecting lines the same length? ______________________________
• Why do you think we have one long and one short line?
_______________________________________________________________________________
_______________________________________________________________________________
_______________________________________________________________________________
_______________________________________________________________________________
_______________________________________________________________________________
Note: The top perspective line goes past the connecting line. Erase theextended line, as it is not needed. When drawing objects in one-pointperspective, drawing lines that are too long or too short is common, one shouldadjust them accordingly.
continued☛
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136b Perspective continued
Term4
Week4
2. Apply this knowledge (drawing method) to draw something amazing. (Remember,the more you apply this knowledge, the better your drawings will become.)
3. Look at the photographs. Indicate on the photographs the vanishing points and
the perspective lines.
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continued☛
4. Before looking at two-point perspective, we are going to draw a cube using one-point perspective.
Remember in the previous activity we focused onone-point perspective. In this activity, we are going to look at
what two-point perspective is.
Step 1: Draw the horizontal line and vanishing point. Step 2: Draw two pairs of perspective lines. Note that
we have more than two perspective lines, but still onlyone vanishing point.
Step 3: Draw a horizontal line joining three of the
perspective lines, as shown in the drawing.
Step 4: Draw a square using the horizontal line drawn
in Step 3.
Step 5: Estimate where you think the back edge of the
cube is going to be, and draw that horizontal line.
Step 6: Extend the perspective line on the right.
Step 7: Draw a vertical line from the back edge
(horizontal line) of the cube, to the perspective line onthe far right.
Step 8: Erase the lines not needed.
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Term4
Week4
a.
a.
b.
b.
136c Perspective continued
5. Identify the vanishing point and lines of perspective.
6. Look at these two photographs and identify the two vanishing points.
7. Draw a cube using two-point perspective.Step 1: Draw the horizontal line and two vanishingpoints.
Step 2: Draw four perspective lines from eachvanishing point, until they meet.
Step 3: Extend the first two perspective lines until they
reach the second pair of perspective lines.
Step 4: From where the perspective lines stop in Step
3, draw vertical lines until they reach the last pair ofperspective lines.
Step 5: Draw a line from where the second perspective
lines meet to where the last perspective lines meet.
Step 6: Erase the unnecessary lines.
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Problem solving
Make a perspective drawing of your own, using perspective lines and a vanishing point.
8a. Look at this picture and identify thevanishing points.
9. Follow the steps to draw two cuboids that look like buildings.
1. Draw a horizontal line. Add two vanishing points. 2. Make a vertical perpendicular to the horizontal line.Make sure it is in the middle of the line and shorter
than the horizontal line.
3. Draw perspective lines from the vertical line to the
vanishing points. Use the diagram to guide you.
4. Now draw two lines parallel to the vertical line, one
on the left and one on the right.
5. Erase the unnecessary lines as in the drawing below. 6. You have your first cuboid. Extend the left handperspective lines again. Decide where you want
your second cuboid. It should be on the left.Draw a vertical line from the top to the bottom
perspective line.
7. Extend the perspective lines on the right to whereyour second cuboid starts. Draw another vertical
line on the left-hand side, showing the other edgeof your cuboids.
8. Erase the lines as shown in the picture.
b. Name all the geometric solids this building is
made of.c. Expanded opportunity activity: challenge
learners to draw the castle above using ahorizontal line, vanishing points, perspectivelines, vertical lines, etc.
Expanded opportunity: if these were buildings, add another building to the drawing.Make sure it is in perspective.
.
ve ne.
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1. Construct a tetrahedron net
137 Constructing nets
Term4
Week4
Write down the important points that you need to remember when constructingfigures.
Step 1:
Construct an equilateral triangle. Label it ABC.Step 2:
Construct another equilateral triangle with one base
joined to base AB of the first triangle.
Step 3:
Construct another triangle using BD as a base.Step 4: Construct another triangle using AD as a base.
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2. Construct a square pyramid net.
Step 1:
Construct two perpendicular lines.
The lengths of AD and AB shouldbe the same. Use your pair of
compasses to measure them. Fromthere, construct rectangle ABCD.
Step 2:
• Using AB as a base, construct a
triangle. • Using DC as a base, construct a
triangle.
Step 3:
• Using DA as a base, construct a
triangle.• Using BC as a base, construct a
triangle.
continued☛
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Term3
Week6
137b Constructing nets continued
3. Construct a triangular prism construction net.
Step 1:
Construct two perpendicular lines.The lengths of AD and AB could
be the same or one longer toform a rectangle. Use your pair of
compasses to measure them). Fromthere, construct rectangle ABCD.
Step 2:
• Using AB as a base, constructanother square (or rectangle ).
• Using DC as a base, construct asquare (or rectangle).
Step 3:
• Using DA as a base, construct atriangle.
• Using BC as a base, construct atriangle.
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Making
Do all the construction on cardboard now, then cut it out and make the geometric object.
4. Construct a rectangular prism construction net.
Step 1:Construct two perpendicular lines.
The length between A and B shouldbe longer than that between D and
A. Use your compass to measurethem. From there, construct
rectangle ABCD.
Step 2:
• Use DC as base to construct
another rectangle above.
• Use AB as base to construct
another rectangle below. Labelthe new points G and H.
• Use GH as base to constructanother rectangle.
Step 3:
• Use DA as base to construct a
square.
• Use CB as base to construct a
square.
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138 More constructing nets
Term4
Week4
1. Construct a hexagonal prism.
In the previous worksheet you constructed nets. What are the mistakes you madeand how will you correct it in this worksheet?
Step 1:Construct hexagon ABCDEF.
Step 2:• Use AB as a base to construct a rectangle.
• Use BC as a base to construct a rectangle.
• Use CD as a base to construct a rectangle.
• Use DE as a base to construct a rectangle.
Label it EDJI.
• Use EF as a base to construct a rectangle.
• Use FA as a base to construct a rectangle.
Note: The rectangles can also be squares.
Step 3:• Use IJ as a base to construct
another hexagon.
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155continued☛
2. Hexagonal pyramid construction
Step 1:Construct hexagon ABCDEF.
Step 2:• Use AB as a base to construct a triangle.
• Use BC as a base to construct a triangle.• Use CD as a base to construct a triangle.
• Use DE as a base to construct a triangle.
• Use EF as a base to construct a triangle.• Use FA as a base to construct a triangle.
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Term4
Week4
138b More constructing nets continued
3. Construct a cube.
Step 1:
Construct two perpendicular lines.The length between A and B should
be the same as D and A. Use yourcompass to measure them. From
there, construct square ABCD.
Step 2:
• Use DC as base to constructanother square.
• Use AB as base to construct
another square. Label the new
points G and H.
• Use GH as base to construct
another square.
Step 3:
• Use DA as base to construct asquare.
• Use CB as base to construct a
square.
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157continued☛
5. Construct an octahedron net.
Step 1:
Construct a pentagon.Step 2:
Let H be the middle of the next circle, for constructing
the next pentagon.
4. Construct an octahedron.
Step 1:
Construct an equilateral triangle. Label it ABC.Step 2:
Construct another equilateral triangle with one base
joined to base AB of the first triangle.
Step 3:
Construct another triangle using BD as a base.Step 4: Carry on constructing triangles until you complete the
net.
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138c More constructing nets continued
Term4
Week4
6. Project
7a. Quick activity
b. Describe the net you made in Question 8 in the same way you described thetetrahedron’s net. Support what you say with some drawings of your net.
You have had various opportunities to work through constructions step-by-step. In thisactivity, you are going to choose your own geometric solid and design a net for it. Donot to choose solids that are too difficult or very easy to construct. You should:
• design and construct the net• trace it on cardboard and cut it out• fold it to make a solid.
Look at the net of the tetrahedron. In this activity, you will use transformation to
describe how a tetrahedron’s net looks.
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c. Quick activity:Look at this net of a Johnson solid.
Explain the faces in your own words.
d. Describe the shapes that make up your net in Question 8 in the same way as the
example above.
e. Describe the vertices of your created net.
Quick activity: Look what happens with the angles when the net is folded to form ageometric solid. Describe the vertices.
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Notes
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Cut-out 3Mathematics Grade 9
Cut-out 4Mathematics Grade 9
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Cut-out 5Mathematics Grade 9
Cut-out 6Mathematics Grade 9
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