Chapter 2 - Quadratic Expessions and Equations
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Transcript of Chapter 2 - Quadratic Expessions and Equations
10
CCTS Thinking systematically
CCTS Identifying
Example
Example
2.1 Quadratic Expressions
State whether the following expressions are quadratic expressions.
(a) 1
x2 β 3x + 5 (b) 6 β 5x (c) 3p2 β 7 ββ
2
(d) β7q2 + 5q (e)
1 + 3x β 5
ββ x
(a) Quadratic expression (b) Not a quadratic expression (c) Quadratic expression
(as a = 0)
(d) Quadratic expression (e) Not a quadratic expression (as a = β1)
1. Identify the following expressions as quadratic or linear.
Expand
(a) x(5x + 2) (b) β3x(4 β 2x)
(a) (b)
= 5x Γ x + 2 Γ x = 5x2 + 2x
= β3x Γ 4 β 3x(β2x)
= β12x + 6x2
Quadratic expression(a) 5x2 β 8x + 2
(e) 6x β x2 (f) 40q2 + 3q β 1
(c) 1
x(6x β 9) + 6 ββ 3
(c) 1
x Γ 6x β 1 x Γ 9 + 6 ββ ββ
3 3
= 2x2 β 3x + 6
2. Expand the following.
(a) x (24 β 8x) ββ 4
= 6x β 2x2
(c) β3x(6 β x)
= β18x + 3x2
(d) βpx(x β p)
= βpx2 + p2x
(e) (3x β 4)(β3x)
= β9x2 + 12x(f) 13x(11 β 13x)
= 143x β 169x2
(g) β5x(β16 β 3x)
= 80x + 15x2
(h) hx(kx β 1)
= hkx2 β hx
(b) 3x(
x β
) + 2
=
1 x2 β x + 2 ββ 2
(b) 1
x + 7 4
(d) n2 + n β 70
x(5x + 2)
Solution:
Solution:
(c) 7 β 2x + x2
Linear expression
Quadratic expression Quadratic expression
Quadratic expression Quadratic expression
1β 2
1β 5
2β 7
1β 6
1β 3
CHAPTER 2 Quadratic Expessions and Equations
11
CCTS Interpreting
Example
Example
3. Expand the following to form quadratic expressions.
(a) (x β 2)(x β 3)
= x2 β 3x β 2x + 6
= x2 β 5x + 6
(b) (2x β 1)(3 + x)
= 6x + 2x2 β 3 β x = 2x2 + 5x β 3
(c) (2 β 5x)(2x β 4)
= 4x β 10x2 β 8 + 20x = β10x2 + 24x β 8
(d) (5x β 1)(2x + 4)
= 10x2 + 20x β 2x β 4
= 10x2 + 18x β 4
(e) (5x + 2)2
= (5x + 2)(5x + 2)
= 25x2 + 10x + 10x + 4
= 25x2 + 20x + 4
(f) (β2x + 1)(3x + 4)
= β6x2 + 3x β 8x + 4
= β6x2 β 5x + 4
(g) (β2x β 3)(x β 4)
= β2x2 + 8x β 3x + 12
= β2x2 + 5x + 12
(h) (x β 9)(2 β 5x)
= 2x β 5x2 β 18 + 45x = β5x2 + 47x β 18
(i) (β2x + 3)2
= (β2x + 3)(β2x + 3)
= 4x2 β 6x β 6x + 9
= 4x2 β 12x + 9
(j) (1 x β 3)2 ββ
3
= ( 1
x β 3)( 1 x β 3) ββ ββ
3 3
=
1 x2 β x β x + 9 ββ
9
=
1 x2 β 2x + 9 ββ
9
(k) (5x β 1)(x + 2)
= 5x2 + 10x β x β 2
= 5x2 + 9x β 2
(l) (2x + 1)(β x β 5)
= β2x2 β 10x β x β 5
= β2x2 β 11x β 5
Expand the following.
(a) (x β 3)(2x + 5)
(a) (x β 3)(2x + 5)
The diagram above shows a fi eld and its path in the
shape of a rectangle. Find the total area in term s of x.
6 m
path
x m
3 m
x m
field
= 2x2 + 5x β 6x β 15
= 2x2 β x β 15
(b) (β2 β 3x)2
(b) (β2 β3x)2
= (β2 β 3x)(β2 β 3x)
= 4 + 6x + 6x + 9x2
= 9x2 + 12x + 4 +5x β 6x = β11x
Common Error
Solution:
Area = length Γ width
= (6 + x) Γ (3 + x)
= 18 + 6x + 3x + x2
= x2 + 9x + 18
Solution:
12
CCTS Recognising
Example
2.2 Factorisation of Quadratic Expressions
1. Factorise the following quadratic expressions.
Factorise the following expressions completely.
(a) 2x2 β 4 (b) 84x β 12x2 (c) 10p2 β p
Solution:
(a) 2x2 β 4 (b) 84x β 12x2 (c) 10p2 β p
= 2x2 β 2 Γ 2 = 12x Γ 7 β 12x Γ x = 10 Γ p Γ p β p Γ 1
= 2(x2 β 2) = 12x(7 β x) = p(10p β 1)
12 cm
2x cm
x cm
8 cm
.......
...........
...
...
..........
3x + 2
2x + 3
(a) 5p2 β 4p = p(5p β 4)
(b) 10 β 2x2
= 2(5 β x2)
(c) 28x + x2
= x(28 + x)
(d) β12 β 4n2
= β 4(3 + n2)
(e) 144x2 β 24x = 24x(6x β 1)
(f) 25x2 + 15
= 5(5x2 + 3)
(g) 5x2 β x = x(5x β 1)
(h) 6x + 108x2
= 6x(1 + 18x)
(i) 121x2 + 33
= 11(11x2 + 3)
(j) 12x2 β 4x = 4x(3x β 1)
(k) 81x2 + 18x = 9x(9x + 2)
(l) 4x β 8x2
= 4x(1 β 2x)
The diagram above shows a rubber plantation.
There are (3x + 2) columns of rubber trees and
(2x + 3) rows of rubber trees. Find the total number
of rubber trees in the plantation.
Total number of rubber trees
= (3x + 2) Γ (2x + 3)
= 6x2 + 9x + 4x + 6
= 6x2 + 13x + 6
5.
4.
Find the area, in cm2, of the shaded region in the
diagram above.
Length = (8 β x) cm
Width = (12 β 2x) cm
Area of the shaded region
= (8 β x)(12 β 2x)
= 96 β 16x β 12x + 2x2
= 96 β 28x + 2x2
13
Example
CCTS Recognising
CCTS Recognising
Example
Factorise the following quadratic expressions.
(a) x2 β 1 (b) p2 β 49 (c) 50x2 β 8
Solution:
(a) x2 β 12 = (x + 1)(x β 1) (b) p2 β 49 = p2 β 72 (c) 50x2 β 8 = 2(25x2 β 4)
= (p + 7)(p β 7) = 2[(5x)2 β 22]
= 2(5x + 2)(5x β 2)
2. Factorise the following quadratic expressions.
Factorise the following quadratic expressions.
(a) x2 + 3x + 2 (b) x2 + x β 2 (c) x2 β 6x + 8
(a) x2 + 3x + 2
= x2 + x + 2x + 2
= x(x + 1) + 2(x + 1)
= (x + 1)(x + 2)
(b) x2 + x β 2
= x2 β x + 2x β 2
= x(x β 1) + 2(x β 1)
= (x β 1)(x + 2)
(c) x2 β 6x + 8
= x2 β 2x β 4x + 8
= x(x β 2) β 4(x β 2)
= (x β 2)(x β 4)
Tips
(b) x2 + x β 2
(c) x2 β 6x + 8
(a) x2 + 3x + 2
1 Γ 2
1x + 2x = 3x β1 Γ 2
βx + 2x = x (β2) Γ (β 4)
β2x β 4x = β 6x
(a) 1 β p2
= (1 β p)(1 + p)
(b) x2 β 36
= x2 β 62
= (x + 6)(x β 6)
(c) 25 β 121x2
= 52 β (11x)2
= (5 + 11x)(5 β 11x)
(d) 12x2 β 3
= 3(4x2 β 1)
= 3[(2x)2 β 12]
= 3(2x + 1)(2x β 1)
(f) 36 β 4x2
= 4[9 β x2]
= 4[32 β x2]
= 4(3 + x)(3 β x)
(g) 100 β 4x2
= 4[25 β x2]
= 4[52 β x2]
= 4(5 + x)(5 β x)
(h) 144x2 β 1
= (12x)2 β 12
= (12x + 1)(12x β 1)
(k) 121x2 β 81
= (11x)2 β 92
= (11x + 9)(11x β 9)
(l) 1 β 25p2
= 12 β (5p)2
= (1 + 5p)(1 β 5p)
(e) 25 β 9x2
= 52 β (3x)2
= (5 + 3x)(5 β 3x)
(i) 18x2 β 50
= 2(9x2 β 25)
= 2[(3x)2 β 52]
= 2(3x + 5)(3x β 5)
(j) 49 β 25x2
= 72 β (5x)2
= (7 + 5x)(7 β 5x)
(m) 49x2 β 16
= (7x)2 β 42
= (7x + 4)(7x β 4)
(n) 100 β 64x2
= 4[25 β 16x2]
= 4[(5)2 β (4x)2]
= 4(5 + 4x)(5 β 4x)
(o) 400 β x2
= 202 β x2
= (20 + x)(20 β x)
(p) 169 β 64p2
= 132 β (8p)2
= (13 + 8p)(13 β 8p)
Solution:
14
Example
3. Factorise the following quadratic expressions.
(a) x2 + 6x + 8
= x2 + 2x + 4x + 8
= x(x + 2) + 4(x + 2)
= (x + 2)(x + 4)
(b) x2 + 3x β 10
= x2 + 5x β 2x β 10
= x(x + 5) β 2(x + 5)
= (x + 5)(x β 2)
(c) x2 β 2x β 8
= x2 β 4x + 2x β 8
= x(x β 4) + 2(x β 4)
= (x β 4)(x + 2)
(d) x2 β 4x β 21
= x2 β 7x + 3x β 21
= x(x β 7) + 3(x β 7)
= (x β 7)(x + 3)
(e) x2 β 7x + 10
= x2 β 2x β 5x + 10
= x(x β 2) β 5(x β 2)
= (x β 2)(x β 5)
(f) x2 β 5x β 36
= x2 β 9x + 4x β 36
= x(x β 9) + 4(x β 9)
= (x β 9)(x + 4)
(g) x2 + x β 12
= x2 + 4x β 3x β 12
= x(x + 4) β 3(x + 4)
= (x + 4)(x β 3)
(h) x2 β 2x β 15
= x2 β 5x + 3x β 15
= x(x β 5) + 3(x β 5)
= (x β 5)(x + 3)
(i) x2 + 8x + 15
= x2 + 3x + 5x + 15
= x(x + 3) + 5(x + 3)
= (x + 3)(x + 5)
Factorise the following quadratic expressions.
(a) 2x2 + x β 6 (b) 10x2 + x β 2 (c) 42 β 17x β 15x2
Solution:
4. Factorise the following quadratic expressions.
(a) 6x2 + 7x β 3
6x2 + 7x β 3
= (3x β 1)(2x + 3)
(b) 10x2 β 13x β 3
10x2 β 13x β 3
= (5x + 1)(2x β 3)
(j) x2 + x β 56
= x2 β 7x + 8x β 56
= x(x β 7) + 8(x β 7)
= (x β 7)(x + 8)
(k) x2 + 9x β 22
= x2 + 11x β 2x β 22
= x(x + 11) β 2(x + 11)
= (x + 11)(x β 2)
(l) x2 β 13x β 30
= x2 β 15x + 2x β 30
= x(x β 15) + 2(x β 15)
= (x β 15)(x + 2)
(c) 10x2 β 19x β 15
10x2 β 19x β 15 = (5x + 3)(2x β 5)
3x β1 β2x2x 3 9x6x2 β3 7x
5x 1 2x2x β3 β15x10x2 β3 β13x
5x 3 6x2x β5 β25x10x2 β15 β19x
2x Γ x = 2x2
β3 Γ 2 = β6
β3x + 4x = x
β΄ 2x2 + x β 6
= (2x β 3)(x + 2)
5x β2 β4x 2x 1 5x10x2 β2 x
5x Γ 2x = 10x2
β2 Γ 1 = β2
β4x + 5x = x
β΄ 10x2 + x β 2
= (5x β 2)(2x + 1)
β5x 6 18x 3x 7 β35xβ15x2 42 β17x
β5x Γ 3x = β15x2
6 Γ 7 = 42
18x β 35x = β17x
β΄ 42 β 17x β 15x2
= (β5x + 6)(3x + 7)
2x β3 β3x x 2 4x2x2 β6 x
15
CCTS Recognising & representing
Example
5. Factorise the following quadratic expressions.
(a) 10x2 β 5x β 15
= 5(2x2 β x β 3)
= 5(2x β 3)(x + 1)
(b) β12x2 + 21x + 6
= β3(4x2 β 7x β 2)
= β3(4x + 1)(x β 2)
(c) 20 β 28x + 8x2
= 4(5 β 7x + 2x2)
= 4(5 β 2x)(1 β x)
(d) 18 + 3x β 3x2
= 3(6 + x β x2)
= 3(3 β x)(2 + x)
(e) β6x2 β 48x β 90
= β6(x2 + 8x + 15)
= β6(x + 5)(x + 3)
Factorise the following quadratic expressions.
(a) 3x2 β 12x β 36 (b) 24x2 + 28x β 20
Solution:
(a) 3x2 β 12x β 36
= 3(x2 β 4x β 12)
= 3(x + 2)(x β 6)
(b) 24x2 + 28x β 20
= 4(6x2 + 7x β 5)
= 4(3x + 5)(2x β 1)
(d) β2x2 + 7x β 3
β2x2 + 7x β 3
= (β2x + 1)(x β 3)
or (1 β 2x)(x β 3)
(e) 2x2 + 5x β 7
2x2 + 5x β 7
= (2x + 7)(x β 1)
(f) 10x2 + 13x β 3
10x2 + 13x β 3 = (5x β 1)(2x + 3)
(g) 9x2 + 26x β 3
9x2 + 26x β 3
= (9x β 1)(x + 3)
(h) 21x2 β 2x β 8
21x2 β 2x β 8
= (7x + 4)(3x β 2)
(i) β12x2 + 11x β 2
β12x2 + 11x β 2 = (β3x + 2)(4x β 1)
or (2 β 3x)(4x β 1)
(f) 2x2 β 2x β 40
= 2(x2 β x β 20)
= 2(x β 5)(x + 4)
β2x 1 x x β3 6xβ 2x2 β3 7x
2x 7 7x x β1 β2x2x2 β7 5x
5x β1 β2x 2x 3 15x10x2 β3 13x
9x β1 βx x 3 27x9x2 β3 26x
7x 4 12x 3x β2 β14x21x2 β8 β2x
β3x 2 8x 4x β1 3xβ12x2 β2 11x
TipsTake out the common factor 4, then
factorise. This way is easier than
factorising it without taking out the
factor 4.
16
CCTS Representing
CCTS Identifying
CCTS Identifying
Example
Example
2.3 Quadratic Equations
Identify the following equations and state the number of unknowns.
(a) 5x2 + 3x = 0 (b) 7x + 5 = 0 (c) 3xy + y = 0
Solution:
(a) It is a quadratic equation
in one unknown. (i.e. x)
(b) It is not a quadratic
equation. It has one
unknown. (i.e. x)
(c) It is not a quadratic
equation. It has
two unknowns.
(i.e. x and y)
1. Identify the quadratic equations with one unknown from the following equations.
(c) x2 + 2 =
x β 1 βββββ βββββ 3 2
(c) x2 + 2 =
x β 1 βββββ ββββ 3 2
2x2 + 4 = 3x β 3
2x2 β 3x + 4 + 3 = 0
2x2 β 3x + 7 = 0
(c) x2 + 3
= x βββββ 4
It is a quadratic equation in one unknown.
(a) 15 + 3x = 6x2
It is a quadratic equation in one unknown.
(b) 7 = 1 + 4y ββ x
It is not a quadratic equation.
(d) 16 = pq2 + 2p
It is not a quadratic equation.
2. Write the following quadratic equations in general form.
(a) 7x2 = 4x + 3
7x2 β 4x β 3 = 0(b)
x + 2 = x2
5
x + 2 = 5x2
β5x2 + x + 2 = 0
5x2 β x β 2 = 0
(c) 9 = 1
x2 + 3x 2
18 = x2 + 6x 0 = x2 + 6x β 18
x2 + 6x β 18 = 0
(d) 1 (x2 + 1) =
x β 3 ββ ββββ 8 3
x2 + 1 =
x β 3 βββββ βββββ 8 3
3x2 + 3 = 8x β 24
3x2 β 8x + 3 + 24 = 0
3x2 β 8x + 27 = 0
(f) (x + 3)(x β 2) = 5
x2 + 3x β 2x β 6 β 5 = 0
x2 + x β 11 = 0
(e) (x β 1)(x + 2) = (2x β 1)2
(x β 1)(x + 2) = (2x β 1)(2x β 1)
x2 β x + 2x β 2 = 4x2 β 2x β 2x + 1
x2 + x β 2 = 4x2 β 4x + 1
0 = 4x2 β x2 β 4x β x + 1 + 2
3x2 β 5x + 3 = 0
Write the following quadratic equations in general form.
(a) 2 β x = 5x2 (b) 5x β 2
= x2
4
Solution:
(a) 2 β x = 5x2
β5x2 β x + 2 = 0
5x2 + x β 2 = 0
(b) 5x β 2
= x2
4
5x β 2 = 4x2
β4x2 + 5x β 2 = 0
4x2 β 5x + 2 = 0
17
Example
Area of trapezium
= [(2x + 3) + (x β 2)] y= (3x + 1) y= (3x + 1) Γ (5 β x)
= β3x2 + 14x + 5
5.
The diagram above shows a kite with p = q,
q = 3x β 3 and r = 2x β 1. Given that the area of
the kite is 36 cm2, show that 2x2 β 3x β 8 = 0.
Area of kite
= 2 Γ area of triangle
= 2 Γ 1 Γ [(3x β 3) + 1
(3x β 3)] Γ (2x β 1) 2 3
= (3x β 3 + x β 1) Γ (2x β 1)
= (4x β 4)(2x β 1)
= 8x2 β 12x + 4
8x2 β 12x + 4 = 36
4(2x2 β 3x + 1) = 36
2x2 β 3x + 1 = 9
2x2 β 3x β 8 = 0
4.
The diagram above shows the cross-section of
a roof. Find a quadratic equation involving x as
a variable.
82 = (x + 1)2 + (x + 1)2
64 = x2 + 2x + 1 + x2 + 2x + 1
64 = 2x2 + 4x + 2
0 = 2x2 + 4x β 62
or 2x2 + 4x β 62 = 0
Solution:
Total number of students = (x + 3)(2x β 3)
420 = (x + 3)(2x β 3)
420 = 2x2 + 6x β 3x β 9
2x2 + 3x β 9 β 420 = 0
2x2 + 3x β 429 = 0
1ββ
3
There are 420 form one students in SMK Berapit. They are divided into (x + 3) classes and each class has
(2x β 3) number of students. Write a quadratic equation for this situation.
6.
The diagram above shows four congruent
rectangles arranged in the position shown. Find
the area of the shaded region, A cm2.
If A = 50, show that 4x2 β 12x β 41 = 0.
Length of side of region A = 3x β 2 β (x + 1)
= 3x β 2 β x β 1
= 2x β 3
A is a square.
β΄Area of A = (2x β 3)2
50 = (2x β 3)(2x β 3)
50 = 4x2 β 12x + 9
0 = 4x2 β 12x β 41
4x2 β 12x β 41 = 0
Given that area = 70
β 70 = β3x2 + 14x + 5
3x2 β 14x β 5 + 70 = 0
3x2 β 14x + 65 = 0
3.
The diagram above shows a trapezium with an
area of 70 cm2. Given that y = 5 β x, show that
3x2 β 14x + 65 = 0.
(x + 1) m (x + 1) m
8 m
A
(x + 1) cm
(3x 2) cm
(2x + 3) cm
2y cm
(x β 2) cm
p cmr cm
q cm
p
r
q
18
CCTS Interpreting
Example
2.4 Roots of Quadratic Equations
1. Given the following values of x and its corresponding equations, determine whether the given value is a root
of the equation.
(a) x = 2, 2x2 β 3x β 2 = 0
When x = 2,
2x2 β 3x β 2
= 2(2)2 β 3(2) β 2
= 8 β 6 β 2
= 0
οΏ½ x = 2 is a root of the quadratic equation.
(b) x = 3, 3x2 β 16x + 5 = 0
When x = 3,
3x2 β 16x + 5
= 3(3)2 β 16(3) + 5
= 27 β 48 + 5
= β16 β 0
οΏ½ x = 3 is not a root of the quadratic equation.
(c) x = β2, 1 x2 β
1 x + 2 = 0 ββ ββ
4 2
When x = β2,
1 x2 β
1 x + 2 ββ ββ
4 2
=
1 (β2)2 β
1 (β2) + 2 ββ ββ
4 2
=
1 Γ 4 + 1 + 2 ββ 4
= 1 + 3
= 4 β 0
οΏ½ x = β2 is not a root of the quadratic equation.
(d) x = 1
, 2 β x
= x2
2 6
2 β x = x2
6
2 β x = 6x2
6x2 + x β 2 = 0
When x = 1
, 2
6x2 + x β 2
= 6 Γ 1 Γ 1 +
1 β 2
2 2 2
=
3 +
1 β 2
2 2
= 0
οΏ½ x = 1
is a root of the quadratic equation. 2
Determine whether 2 or 4 is a root of 2x2 β 5x β 12 = 0.
Solution:
(a) When x = 2, (b) When x = 4,
2x2 β 5x β 12
= 2(2)2 β 5(2) β 12
= 8 β 10 β 12
= β14 β 0
Therefore, x = 2 is not a root
of the equation.
2x2 β 5x β 12
= 2(4)2 β 5(4) β 12
= 32 β 20 β 12
= 0
Therefore, x = 4 is a root of the
equation.
TipsIf the fi nal value is zero, then the
value of x is a root of the equation.
Tips: Change it to
general form.
19
CCTS Recognising & interpreting
Example
(a) 2x2 β 3x β 2 = 0
(a) When x = 1,
2x2 β 3x β 2
= 2(1)2 β 3(1) β 2
= 2 β 3 β 2
= β3 β 0
When x = 2,
2(2)2 β 3(2) β 2
= 8 β 6 β 2
= 0
β΄ x = 2 is a root of the quadratic equation.
When x = 0,
2x2 β 3x β 2
= 2(0)2 β 3(0) β 2
= β2
When x = β1
2(β1)2 β 3(β1) β 2
= 2 + 3 β 2
= 3
Try x =
β 1
, ββ 2
2(β )2 β 3(β ) β 2
= + β 2
= 0
β΄ x = β is a root of the quadratic equation.
(b) 2x2 + 3x β 9 = 0
(b) When x = 1,
2(1)2 + 3(1) β 9
= 2 + 3 β 9
= β4
When x = 2,
2(2)2 + 3(2) β 9
= 8 + 6 β 9
= 5
Try x = ,
2( )2 + 3( ) β 9
= + β 9
= 0
β΄ x = is a root of the quadratic equation.
When x = β2,
2(β2)2 + 3(β2) β 9
= 8 β 6 β 9
= β7
When x = β3,
2(β3)2 + 3(β3) β 9
= 18 β 9 β 9
= 0
β΄ x = β3 is a root of the quadratic equation.
(e) x = 1
, (2x β 1)(x + 1) = 0 ββ 2
When x = 1 , ββ
2
(2x β 1)(x + 1)
= (2( ) β 1)( + 1)
= (0)( )
= 0
οΏ½ x = is a root of the quadratic equation.
Determine the solutions (roots) of the quadratic equations below by trial and error.
1ββ
2
1ββ
2
1ββ
2
1ββ 2
1ββ 2
1ββ 2
3ββ 2
1ββ 2
1ββ 2
3ββ 2
3ββ 2
9ββ 2
9ββ 2
3ββ 2
3ββ 2
Note:Changes from βve to
+ve. Therefore, there
is a root between
x = 1 and x = 2.
Note:When the value of
x changes from
0 to β1, the answer
changes from β2
(βve) to 3 (+ve).
This means that
there is a root
between
x = 0 and x = β1.
Solution:
(f) x = 1
, 3x2 β 4x = β1 ββ
3
3x2 β 4x + 1 = 0
When x =
1 ββ 3
3x2 β 4x + 1
= 3( )2 β 4( ) + 1
= β + 1
= 0
οΏ½ x = is a root of the quadratic equation.
1ββ
3
1ββ
3
1ββ
31ββ
3
4ββ
3
20
β (2x β 9)(x + 1) = 0
2x β 9 = 0 or x + 1 = 0
2x = 9
β΄ x = or x = β1
Example
Change it to the
general form.
2. Find the solutions of the following quadratic equations by trial and error.
(a) x2 + 4x β 5 = 0
When x = 1,
x2 + 4x β 5
= 12 + 4(1) β 5
= 0
β΄ x = 1 is a root of the quadratic equation.
When x = β4,
(β4)2 + 4(β 4) β 5
= 16 β16 β 5
= β5
When x = β5,
(β5)2 + 4(β5) β 5
= 25 β 20 β 5
= 0
β΄ x = β5 is a root of the quadratic equation.
(b) x2 + x β 6 = 0
When x = 2,
x2 + x β 6
= 22 + 2 β 6
= 4 + 2 β 6
= 0
β΄ x = 2 is a root of the quadratic equation.
When x = β2,
(β2)2 + (β2) β 6
= 4 β 2 β 6
= β4
When x = β3,
(β3)2 + (β3) β 6
= 9 β 3 β 6
= 0
β΄ x = β3 is a root of the quadratic equation.
(b) 9 + 7x = 2x2
(b) 9 + 7x = 2x2
2x2 β 7x β 9 = 0
3. Solve the following quadratic equations by factorisation.
Solve the following quadratic equations by factorisation.
(a) 3x2 β 5x = 2
Solution:
(a) 3x2 β 5x = 2
3x2 β 5x β 2 = 0
(c) 2x2 + 35
= x 19
2x2 + 35 = 19x 2x2 β 19x + 35 = 0
(2x β 5)(x β 7) = 0
2x β 5 = 0 or x β 7 = 0
2x = 5
x = or x = 7
(a) 3x2 β 21x = β30
3x2 β 21x + 30 = 0
(3x β 6)(x β 5) = 0
3x β 6 = 0 or x β 5 = 0
3x = 6
x = 2 or x = 5
(b) x2
β 10
= βx ββ ββ 3 3
x2 β 10 = β3x x2 + 3x β 10 = 0
(x β 2)(x + 5) = 0
x β 2 = 0 or x + 5 = 0
x = 2 or x = β55ββ 2
β (3x + 1)(x β 2) = 0
3x + 1 = 0 or x β 2 = 0
3x = β1
β΄ x = β or x = 2
9ββ 2
2x β9 β9x x 1 2x2x2 β9 β7x
3x 1 x x β2 β6x3x2 β2 β5x
1ββ 3
21
CCTS Solving problems
Example
(h) 10 = 3x(9x β 13)
10 = 27x2 β 39x 0 = 27x2 β 39x β 10
0 = (9x + 2)(3x β 5)
9x + 2 = 0 or 3x β 5 = 0
9x = β2 or 3x = 5
x = β
or
x =
A man and his son are painting a house. When both of them paint together, they need 4 days to complete. If
the father paints the house alone, he can complete the job 6 days earlier than the son. Find the number of days
needed for the son to paint the house alone.
1ββ x
(d) β8x2 + 14x = 3
β8x2 + 14x β 3 = 0
(4x β 1)(β2x + 3) = 0
4x β 1 = 0 or β2x + 3 = 0
4x = 1 or β2x = β3
x = or x =
x =
(e) 1 + 12x = 6x2 β 7x + 16
0 = 6x2 β 7x β 12x + 16 β 1
0 = 6x2 β 19x + 15
0 = (2x β 3)(3x β 5)
2x β 3 = 0 or 3x β 5 = 0
2x = 3 3x = 5
x = 3
or x =
5 ββ ββ 2 3
(f) 6x2 + 7 = 23x 6x2 β 23x + 7 = 0
(3x β 1)(2x β 7) = 0
3x β 1 = 0 or 2x β 7 = 0
3x = 1 or 2x = 7
x = or x =
1ββ 4
β3ββ β23ββ 2
1ββ
3
7ββ
2
(g) 10 β 8x = 21x(x + 1)
10 β 8x = 21x2 + 21x 0 = 21x2 + 21x + 8x β 10
0 = 21x2 + 29x β 10
0 = (7x β 2)(3x + 5)
7x β 2 = 0 or 3x + 5 = 0
7x = 2 or 3x = β5
x = or x = β
(i) 4 + x = 15 x2
2
8 + 2x = 15x2
15x2 β 2x β 8 = 0
(3x + 2)(5x β 4) = 0
3x + 2 = 0 or 5x β 4 = 0
3x = β2 or 5x = 4
x = β or x =
2ββ
9
5ββ
3 2ββ
3
4ββ
5
8x β 24 = x2 β 6x 0 = x2 β 14x + 24
0 = (x β 12)(x β 2)
x β 12 = 0 or x β 2 = 0
x = 12 or x = 2 (not applicable)
The son can complete the job in 12 days.
2ββ
7
5ββ
3
Solution:
Let x be the number of days needed if the son paints
alone.
In one day, he will complete amount of work.
Let (x β 6) be the number of days needed if the father
paints alone.
In one day, he will complete ( ) amount of work.
If both paint together, in one day they will complete
of the amount of work.
1 x β 6
1 +
1 =
x x β 6
x β 6 + x =
x(x β 6)
2x β 6 =
x(x β 6)
1ββ4
1ββ4
1ββ4
1ββ 4
22
4. The length of a rectangle is fi ve times its breadth.
When the breadth of the rectangle is increased by
10 m, while the length of the rectangle is decreased
by 25 m, the area of the rectangle remains the same.
Find the dimensions of the original rectangle.
Let x and 5x be the dimensions of the original
rectangle. Then (x + 10) and (5x β 25) will be its
new dimensions.
Area = 5x2 = (x +10)(5x β 25)
5x2 = 5x2 + 25x β 250
0 = 25x β 250
25x = 250
x = 10
Thus, the dimensions of the original rectangle are
10 m and 50 m.
5. John has a rectangular fi sh pond with an area of
1 575 m2. If he reduces the length of one side by 30
m and the other by 20 m, the new pond will become
a square. Find the length of the new pond.
Let x be the length of the new pond.
Then (x + 20) and (x + 30) will be the length of the
sides of the original pond.
β 1 575 = (x + 20)(x + 30)
1 575 = x2 + 50x + 600
0 = x2 + 50x β 975
0 = (x β 15)(x + 65)
x β 15 = 0 or x + 65 = 0
x = 15 or x = β 65 (not acceptable)
The side of the new pond is 15 m.
β 180 + 3 = 180
x + 3 x
180
x + 3
7. Faizal thinks of two positive integers. The difference
between the two integers is 8 and the sum of the
square of each integer is 370. Find the value of both
integers.
Let x and (x + 8) represent the two positive integers.
x2 + (x + 8)2 = 370
x2 + x2 + 16x + 64 = 370
2x2 + 16x β 306 = 0
x2 + 8x β 153 = 0
(x β 9)(x + 17) = 0
x β 9 = 0 or x + 17 = 0
x = 9 or x = β17 (not acceptable)
The second integer = 9 + 8 = 17
Therefore, the two integers are 9 and 17.
6. There are 180 pencils to be distributed equally
among a group of students. When 3 new students
join the group, each of the students will receive
3 pencils less. Find the initial number of students
in the group.
Let x be the initial number of students in the group.
Initially each student will receive 180 pencils. x
After 3 new students join the group, each will
receive pencils.
multiply by x(x + 3),
180x + 3x(x + 3) = 180(x + 3)
180x + 3x2 + 9x = 180x + 540
3x2 + 9x β 540 = 0
x2 + 3x β 180 = 0
(x β 12)(x + 15) = 0
x β 12 = 0 or x + 15 = 0
x = 12 or x = β15 (not acceptable)
Initially, the group has 12 students.
23
SPM20012006
1. (3x β y)2 β x(2x β y) =
A 7x2 β 5xy + y2
B 7x2 β 7xy + y2
C 11x2 β 5xy + y2
D 11x2 β 7xy + y2
2. β 2x(1 β x) + 5x2 =
A 7x2 β 2x
B 9x2
C 2x β 7x2
D 7x2 + 2x
3. Expand 4(3 β 2x)(x β 1).
A β8x2 + 5x β 3
B β8x2 β 5x + 3
C 8x2 β 20x + 12
D β8x2 + 20x β 12
4. Expand px(4x β 3).
A 4px2 β 3 C 4px2 β 3px B 4px2 + 3px D 4p2x β 3px
5.
Form a quadratic expression for the area of the
triangle shown above.
A 1 (4x β 1) C 2x(4x β 3) ββ
2
B x(4x + 3) D 1 x(3 + 4x) ββ
2
6. Factorise
x2 β
x completely.
A x (x β 2) C 3x(x β 2) ββ
3
B x(x β 2) D 1
x(x2 β 2) ββ 3
7. Factorise 16x2 β 1.
A 4x(4x + 1)
B 4x(4x β 1)
C (4x + 1)(4x β 1)
D (4x + 1)2
8. Factorise 3x2 β 13x β 10.
A (3x + 2)(x + 5)
B (3x + 2)(x β 5)
C (3x β 2)(x β 5)
D (3x β 2)(x + 5)
9. Factorise 3(x β 1) β x(x β 1).
A (x + 1)(3 β x) C (3x β 3)(3 β x)
B (x β 1)(3 β x) D (x β 1)(3 + x)
10. Factorise 9x2 β m2.
A (3x + m)2 C (3x β m)(3x + m)
B (3x β m)2 D (x β m)(3x + 3m)
11. Factorise 15x2 + 10x β 25 completely.
A 5(x β 1)(3x + 5)
B (5x β 5)(3x + 5)
C 5(1 β x)(3x + 5)
D (5x β 1)(3x + 5)
12. Which of the following is not a quadratic
equation?
A 4x β 1 = 4 C mx β 3x = 2 βββββ ββ
5 x
B 5x β 4x2 = 0 D 7 =
5 βββ βββββ x2 x + 1
13. Which of the following quadratic equations is
not in the general form?
A 1 x2 + 2x β 5 = 0 C 16x2 +
2 x β 1
= 0 2 3 5
B 3x β x2 = 2 D 6x2 + 7x β 8 = 0
14.
The diagram above shows the length and breadth
of a rectangle. If the length is increased by 1 m
and its breadth is decreased by 2 m, fi nd the area,
in m2, of the new rectangle.
A (2x β 1)(x + 2)
B (2x β 1)(x + 3)
C 2x2 + 3x β 2
D 2x2 β 3x β 2
4x 3
2x
2x m
x m
β
β
β
β
β
β
β
β
β
β
β
β
β
β
SPM20012005
2β 3
1β 3
Paper 1
SPM Practice 2
24
15. Determine which of the following is a root of
(5x β 1)(x β 3) = 0.
A 1 C 3
B 2 D 4
16. Determine which of the following is a root of
3x2 + 7x β 6 = 0.
A β3 C 0
B β1 D 2
17. One of the roots of 8x2 β 6x β 9 = 0 is
A β1 1 C
3 ββ ββ 2 4
B 1 1 D
4 ββ ββ 2 3
18. The solutions of 6x2 + 11x β 2 = 0 are
A 6 and 1 C
1 and β2 ββ ββ
2 6
B β 1
and 2 D 6 and β2 ββ 6
19. The roots of (2x β 3)(3 β 5x) = 0 are
1 5 A β β and β C 3 and β5 3 3
1 5 3 3 B β and β β D β and β 3 3 2 5
20. The roots of x2 + 5 x β 2 = 0 are
A 1
and β6 C 3 and β
1 ββ ββ 3 6
B 2
and 4 D 2 and β5 ββ
3
β
ββ
β
2. Expand
(a) (x β 1)(5 β 4x)
(b)
1 (x + 2)(6x + 9) ββ
3
(a) (x β 1)(5 β 4x) = 5x β 4x2 β 5 + 4x
= β 4x2 + 9x β 5
(b) 1
(x + 2)(6x + 9) = 1 (x + 2)3(2x + 3) ββ
3 3
= (x + 2)(2x + 3)
= 2x2 + 4x + 3x + 6
= 2x2 + 7x + 6
4. Expand (β10x + 3)2.
(β10x + 3)(β10x + 3) = 100x2 β 30x β 30x + 9 = 100x2 β 60x + 9
6. Factorise 64p2 β 25.
64p2 β 25 = (8p)2 β 52
= (8p + 5)(8p β 5)
1. Solve the quadratic equation 6x2 β 35 = 11x by
factorisation
6x2 β 11x β 35 = 0
(2x β 7)(3x + 5) = 0
β΄ 2x β 7 = 0 or 3x + 5 = 0
7 5 x = or x = β 2 2
3. Given that 3x2 + 2x β 8 = (x + 2)(ax + p). Find the
values of a and p.
3x2 + 2x β 8 = (3x β 4)(x + 2)
β a = 3 and p = β4
5. Factorise 2x2 β 9x β 143.
2x2 β 9x β 143 = (x β 11)(2x + 13)
β
β
2β3
Paper 2
SPM20012007
25
SPM20012006
SPM20012005
7. Solve
(a) x2 β 7x = 0
3 β 11x (b) βββ = 5x2
4
(a) x2 β 7x = 0
x(x β 7) = 0
x = 0 or x β 7 = 0
x = 0 or x = 7
3 β 11x (b) βββ = 5x2
4
20x2 + 11x β 3 = 0
(5x β 1)(4x + 3) = 0
5x β 1 = 0 or 4x + 3 = 0
5x = 1 or 4x = β3
1 3 x = ββ or x = β β
5 4
9.
The diagram above shows a ladder leaning against
a wall. When the ladder slides down x m, form
a quadratic equation for the ladder at the new
position.
(Note: When A moves x m, B moves x m.)
172 = (15 β x)2 + (8 + x)2
289 = 225 β 30x + x2 + 64 + 16x + x2
289 = 2x2 β 14x + 289
2x2 β 14x = 0
8. Find the roots of the quadratic equations:
x β 30 (a) x2 β 8x = ββββββ (b) 6x2 + x β 1 = 0 2
x β 30(a) x2 β 8x = βββββ 2
2x2 β 16x = x β 30
2x2 β 17x + 30 = 0
(2x β 5)(x β 6) = 0
x = or x = 6
(b) 6x2 + x β 1 = 0
(2x + 1)(3x β 1) = 0
β΄ 2x + 1 = 0 or 3x β 1 = 0
1 1 x = β β or x = β 2 3
5ββ
2
{
{
17 m15 m
8 m
x
x
B
A 10.
When a metal plate is heated, it expands to a new
dimensions as shown in the diagram. Find the
increase in the area of the plate, in m2.
Increase in area = (6 + 2x)(5 + 2x) β 5 Γ 6
= 30 + 22x + 4x2 β 30
= 4x2 + 22x
Metal
plate
5 m
6 m
x
x
x
x