Module 4 Simultaneous Linear Equations - smcewen / …smcewen.pbworks.com/w/file/fetch/107569770/Yr10...Set 2 1 Solve the following simultaneous equations using the substitution method.

2015

Year 10 Core Mathematics

Module 4

Simultaneous Linear Equations

Name: ________________________________________________________

Contents: Set 1 Graphical Solutions of Simultaneous Linear Equations Set 2 Solving Simultaneous Linear Equations using Substitution Set 3 Solving Simultaneous Linear Equations using Elimination Set 4 Writing Equations from worded statements Set 5 Applications of Linear Sketch Graphs SAC Test – Set 1-5 inclusive.

Media Files: Each set has a video link to Dropbox. You can view these lessons as required. Maths Online has associated lessons that can be attempted as revision prior to assessment. Substitution Method I (MOL 4223) Elimination Method I (MOL 4220) Problem Solving using Simultaneous Equations (MOL 4226) Topic Test (MOL 4227)

Software Files: Graphmatica 2.4 Free graphing software. Download from the net or SIMON>Simultaneous Equations>media folder.

Assessment: An in-class test covering set 1-5 inclusive.

3x — 2y = 19 4y + x = —3

Check equation [1]: LHS = 3x — 2y

= 3(5) — 2(-2) = 15+4 =19

LHS = RHS

RHS = 19

Graphical solution of simultaneous linear equations Simultaneous linear equations • Any two linear graphs will meet at a point, unless they are parallel. • At this point, the two equations simultaneously share the same x- and y-coordinates. • This point is referred to as the solution to the two simultaneous linear equations. • Simultaneous equations can be solved graphically or algebraically.

Graphical solution • This method involves drawing the graph of each equation on the same set of axes. • The intersection point is the simultaneous solution to the two equations. • An accurate solution depends on drawing an accurate graph. • Graph paper or graphing software can be used.

Use the graph of the given simultaneous equations below to determine the point of intersection and, hence, the solution of the simultaneous equations.

x + 2y =4 y = 2x — 3

Point of intersection (2, 1) Solution: x = 2 and y = I

For the following simultaneous equations, use substitution to check if the given pair of coordinates, (5, —2), is a solution.

3x — 2y = 19 [1]

4y + x = —3 [2]

[1] Check equation [2]: [2] LHS = 4y + x RHS = —3

= 4(-2) +5 = —8+ 5 =-3

LHS = RHS

In both cases, LHS = RHS. Therefore, the solution set (5, —2) is correct.

Graphical Method Video Link

Set 1 Use the graphs below of the given simultaneous equations to write the point of

intersection and, hence, the solution of the simultaneous equations.

a x+y= 3 b x + y = 2

x — y = 1 3x — y = 2

C y—x=4

d y + 2x = 3 3x + 2y = 8

2y + x = 0

e y — 3x = 2

f 2y — 4x = 5 x — y = 2

4y+ 2x=5

2 For the following simultaneous equations, use substitution to check if the given pair of coordinates is a solution.

y — x = 4 2y+x= 17 x+y= 7 2x+ 3y= 18 x — 2y = 2 3x+y= 16 y — 5x = —24 3y + 4x = 23 y —x = 2 2y — 3x = 7

a (7,5) 3x + 2y = 31 2x+3y= 28

b (3,7)

C (9,1) x + 3y = 12 d (2,5) 5x — 2y = 43

e (4, —3) y = 3x — 15 f (6, —2) 4x + 7y = —5

g (4, —2) 2x + y = 6 x — 3y = 8

h (5,1)

i (-2, —5) 3x — 2y = —4 j (-3, —1) 2x — 3y = 11

3 Solve each of the following pairs of simultaneous equations using a graphical method. a x + y = 5 b x+2y=10

2x + y = 8 3x+y=15 c 2x+3y=6 d x-3y=-8

2x — y = —10 2x + y = —2 • 6x+5y=12 f y+2x=6

5x + 3y = 10 2y + 3x = 9

Answers — Graphical solution of simultaneous linear equations

1 a (2,1) b (1,1) c (0,4) d (2, —1) e (-2, —4) f (-0.5, 1.5)

2 a No b Yes C Yes d No e Yes f No g No h Yes i No j Yes

3 a (3, 2) b (4, 3) c (-3, 4) d (-2, 2) e (2,0) f (3,0)

Solving simultaneous linear equations using substitution • There are two algebraic methods which can be used to solve simultaneous equations. • They are the substitution method and the elimination method.

Substitution method • This method is particularly useful when one (or both) of the equations is in a form where

one of the two variables is the subject. • This variable is then substituted into the other equation, producing a third equation with only

one variable. • This third equation can then be used to determine the value of the variable.

Solve the following simultaneous equations using the substitution method. y = 2x — 1 and 3x + 4y = 29

V = 2x — 1 3x + 4y = 29

Substituting (2x — 1) into [2]: 3x + 4(2x — 1) = 29

3x + 8x — 4 = 29 [3 ]

1 lx — 4 = 29 1 lx = 33

x = 3

Substituting x = 3 into [1]: y = 2(3) — 1

= 6 — 1 =5

Solution: x = 3, y = 5 or (3, 5)

Set 2 1 Solve the following simultaneous equations using the substitution method. Check your

solutions using technology. a x=-10 + 4y b 3x + 4y = 2

3x + 5y = 21 x=7+5y C 3x+y=7 d 3x + 2y = 33

x = —3 — 3y y = 41 — 5x e y = 3x — 3 f 4x+y= 9

—5x + 3y = 3 x=-5-2y 5y+x=-11 x = 7 + 4y 2x+y=-4 3x + 2y = 12 x=9 —4y

y = 11 — 5x h x = —4 — 3y

—3x — 4y = 12 j x=14 +4y

—2x + 3y = —18 I y= 2x+ 1

—5x — 4y = 35 2 Solve the following pairs of simultaneous equations using the substitution method.

Check your solutions using technology. Answers — Solving simultaneous linear a y = 2x — 11 and y = 4x + 1 equations using substitution b y = 3x + 8 and y = 7x — 12 c y=2x— 10 andy=-3x d y = x — 9 and y = —5x e y = —4x — 3 and y = x — 8 f y = 0.5x and y = 0.8x + 0.9

Solving simultaneous linear equations using elimination • Elimination is best used when the two equations are given in the form ax + by = k. • The method involves combining the two equations so that one of the variables is eliminated. • Addition or subtraction can be used to reduce the two equations with two variables into

one equation with only one variable.

WORKED EXAMPLE

Solve the following pair of simultaneous equations using the elimination method. —2x — 3y = —9 2x + y = 7

—2x — 3y = —9 111 2x+y=7 [2]

[1] + [2]: —2x — 3y + (2x + y) = —9 +7

—2x — 3y + 2x + y = —2 —2y = —2

Y = 1

Substituting y = 1 into 121: 2x + 1 = 7

2x = 6 x = 3

Solution: x = 3, y = 1 or (3, 1)

1 a (2, 3) b (2, —1) c (3, —2) d (7,6) e (3,6) f (2,1) g (-1, —2) h (-4, 0) i (-1, —2)

j (6, —2) k (3, 1 . ) I (-3, —5)

2 a (-6, —23) b (5, 23) c (2, —6)

d e (1, —7) f (-3 —1 5)

Substitution Video Link

Set 3 1 Solve the following pairs of simultaneous equations by adding equations or by subtracting equations

to eliminate either x or y.

a 3x+y= 7

b x+y=12

C 8x+3y = 8

d 11x+3y= 5

2x — y = 3 x — y = 2

5x — 3y = 5

7x — 3y = 13

e 8x+ 6y = 2

f 5x+ 2y = 9

g 4x + 3y = 11

h 10x+y= 34

2x — 6y = 3

2x+ 2y = 6

4x+5y =13

2x + y = 10

1 r+3y=10

5x-3y = —2

k 4x — 3y = 0

I 8x+ 7y = 7

x—y=-2 —5x+y= 4 —4x+y=-8

10x — 7y = —7

3 Solve each of the following equations using the elimination method. a x+2y= 12 b 3x + 2y = —23

3x — 2y = 12 5x + 2y = —29 c 6x+ 5y = —13 d 6x — 5y = —43

—2x + 5y = —29 6x—y=-23 e x — 4y = 27 f —4x+y=-10

3x — 4y = 17 4x — 3y = 14 g —5x + 3y = 3 h 5x — 5y = 1

—5x+y=-4 2x — 5y = —5

4 Solve the following pairs of simultaneous equations. a x+2y=4 b 3x+2y= 19

3x — 4y = 2 6x — 5y = —7 C —2x + 3y = 3 d 6x + y = 9

5x — 6y = —3 —3x + 2y = 3 e x+ 3y= 14 f 5x+y=27

3x+y=10 4x + 3y = 26 g —6x + 5y = —14 h 2x+ 5y= 14

—2x + y = —6 3x + y = —5

5 Solve the following pairs of simultaneous equations. a 2x+3y= 16 b 5x — 3y = 6

3x + 2y = 19 3x — 2y = 3 c 3x + 2y = 6 d 2x + 7y = 3

4x+3y= 10 3x + 2y = 13

e 2x — 3y = 14 f —3x + 7y = —2 3x — 5y = 21 4x + 2y = 14

g —4x + 5y = —9 h 2x+5y=-6 2x + 3y = 21 3x + 2y = 2

6 Solve the following simultaneous equations using an appropriate method.

a 7x + 3y = 16 b 2x+y= 8 y = 4x — 1 4x+ 3y= 16

Elimination Video Link

Answers - Solving simultaneous linear equations using elimination

1 b (-3, -7) C (2, -5) e (-5, -8) f (2, -2)

a (2,1) b (7,5) c (1,0) d (1, -2) e (0.5, 1/3) f (1,2) g (2,1) h (3,4) 1(1,3) j (-1, -1) k (3,4) 1(0,1)

3 a (6, 3) d (-3, 5)

g 4 3

4 a (2, 1) d (1,3)

g (4, 2)

5 a (5,2) d (5, -1) g (6, 3)

6 a (1,3)

h (2,1)

b (3,5) C (3,3) e (2,4) f (5,2)

h (-3, 4)

b (3,3) C (-2, 6) e (7,0) f (3.1) h (2, -2)

b (4,0)

Writing equations from worded statements 1. The multiplication sign between the number and the pronumeral is omitted (not written). For example, 2 x x is written as 2x. 2. Division of algebraic terms is usually written as a fraction with the number that is being divided (the dividend) in the

numerator and the number by which we are dividing (the divisor) in the denominator. For example, x ÷ 2 is written as Lc . 2

The table below shows some common words and expressions and their mathematical meaning.

Word expression Operation

'the sum of', 'is added to', 'plus'

'the difference between', 'is subtracted from', 'minus'

'the product of', 'is multiplied by', 'times'

'the quotient of', 'is divided by'

'is equal to', 'the result is', 'gives'

Write an equation for each of the following statements, using x to represent the unknown number. a Five times a certain number gives 15. b When 12 is subtracted from a certain number, the result is 6.

a 'Five times' means '5 x'. 'A certain number' means x. 'Gives 15' means '= 15'.

5 xx= 15 5x= 15

b '12 is subtracted from' means `- 12'. 'A certain number' means x. 'The result is 6' means '= 6'.

x - 12 = 6

Try these Set 4 Write an equation for each of the following statements, using x to represent the unknown number.

1 When 3 is added to a certain number, the result is 100. 2 Nine times a certain number is 72.

'3 is added to' means 'Nine times' means

'A certain number' means 'A certain number' means

'The result is 100' means 'Is 72' means

Equation: x + = Equation: = 72

3 When 4 is subtracted from a certain number, the result is 19

'4 is subtracted from' means

'A certain number' means

'The result is 19' means

Equation:

5 The difference between a certain number and 7 is 3

'The difference between' means

'A certain number' means

'Is 3' means

Equation:

7 The sum of 23 and a certain number is 50.

'The sum of' means

'A certain number' means

'Is 50' means

Equation

9 Seven times a certain number gives 56

'Seven times' means

'A certain number' means

'Gives 56' means

Equation

4 Dividing a certain number by 5 gives 12.

'Dividing by' means

'A certain number' means

'Gives 12' means

Equation:

6 The product of a certain number and 12 is 88.

'The product of' means

'A certain number' means

'Is 88' means

Equation

8 When a certain number is divided by 10, the result is 3.

'A certain number' means

Is divided by' means

'The result is 3' means

Equation

10 Five more than a certain number is 9

'Five more than' means

'A certain number' means

Is 9' means

Equation

Answers

x + 3 = 10 9x = 72

n — 4 = 19 5

- 7 = 3 12n = 88

n + 23 = 50 _n = 3 10

7n = 56 n + 5 = 9

Problem solving using simultaneous linear equations • Many word problems can be solved using simultaneous linear equations. • Follow these steps.

• Define the unknown quantities using appropriate pronumerals. • Use the information given in the problem to form two equations in terms of these

pronumerals. • Solve these equations using an appropriate method. • Write the solution in words. • Check the solution.

Ashley received better results for his Maths test than for his English test. If the sum of the two marks is 164 and the difference is 22, calculate the mark he received for each subject.

Let x= the maths mark. Let y= the English mark.

x+y= 164 [1] x—y= 22 [2]

[1] + [2]: 2x=186

x = 93

Substituting x = 93 into [1]: x+y= 164

93 + y = 164

y= 71

Solution: Maths mark (x) = 93 English mark (y)= 71

Set 5

1 Rick received better results for his Maths test than for his English test. If the sum of his two marks is 163 and the difference is 31, find the mark for each subject.

3 Find two numbers whose difference is 5 and whose sum is 11. 4 The difference between two numbers is 2. If three times the larger number minus double the

smaller number is 13, find the two numbers.

5 One number is 9 less than three times a second number. If the first number plus twice the second number is 16, find the two numbers.

6 A rectangular house has a perimeter of 40 metres and the length is 4 metres more than the width. What are the dimensions of the house?

Worded Problems Video Link

7 Mike has 5 lemons and 3 oranges in his shopping basket. The cost of the fruit is $3.50. Voula, with 2 lemons and 4 oranges, pays $2.10 for her fruit. How much does each type of fruit cost?

8 A surveyor measuring the dimensions of a block of land finds that the length of the block is three times the width. If the perimeter is 160 metres, what are the dimensions of the block?

11 If three Magnums and two Paddlepops cost $8.70 and the difference in price between a Magnum and a Paddlepop is 90 cents, how much does each type of ice-cream cost?

12 If one Redskin and 4 Golden roughs cost $1.65, whereas 2 Redskins and 3 Golden roughs cost $1.55, how much does each type of sweet cost?

14 The difference between Sally's PE mark and Science mark is 12, and the sum of the marks is 154. If the PE mark is the higher mark, what did Sally get for each subject?

15 Mozza's cheese supplies sells six Mozzarella cheeses and eight Swiss cheeses to Munga's deli for $83.60, and four Mozzarella cheeses and four Swiss cheeses to Mina's deli for $48. How much does each type of cheese cost?

16 If the perimeter of the triangle in the diagram is 12 cm and the length of the rectangle is 1 cm more than the width, find the value of x and y.

Answers — Problem solving using simultaneous linear equations

1 Maths mark = 97, English mark =66 3 8 and 3 4 9 and 7 5 6 and 5 6 Length = 12 m and width = 8 m 7 Lemons cost 55 cents and oranges cost 25 cents. 8 Length 60 m and width 20 m 11 Paddlepops cost $1.20 and a Magnum costs $2.10. 12 Cost of the Golden rough = 35 cents and cost of the

Redskin = 25 cents

14 PE mark is 83 and Science -mark is 71. 15 Mozzarella costs $6.20, Swiss cheese costs $5.80. 16 x=3 andy=4

SAC Calculator Active Set (1 — 5) inclusive