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GCSE Maths Algebra Simult. Equations

Solving Simult. Equations Graphically

Solving Simultaneous Equations Graphically

Here we will learn how to solve simultaneous equations graphically including linear and quadratic simultaneous equations.

There are also solving simultaneous equations graphically worksheets based on Edexcel, AQA and OCR exam questions, along with further guidance on where to go next if you’re still stuck.

What is solving simultaneous equations graphically?

Solving simultaneous equations graphically is the process that allows us to solve two or more algebraic equations that share variables by sketching their graphs.

The point (or points) of intersection give(s) the solution(s) to the simultaneous equations.

This is because at the point of intersection the two equations are equal to one another and therefore the values of the variables are the same for both equations. 

What is solving simultaneous equations graphically?

What is solving simultaneous equations graphically?

Solving linear simultaneous equations graphically

E.g. Solve the pair of simultaneous equations

\[\begin{aligned} x +y &= 6\\ -3x +y &=2\\ \end{aligned}\]

Solving Simultaneous Equation Graphically image 1

When we draw the graphs of these two equations,
we can see that they intersect at (1, 5).

So the solution to the simultaneous equations is:

x = 1 and y = 5

We can prove this is the solution by substituting the values into the original equations:

x = 1, y = 5

\[\begin{aligned} x+y&=6\\ 1+5&=6\\ \end{aligned}\]

\[\begin{aligned} -3x+y&=2\\ -3(1)+5=2\\ -2+5=2\\ \end{aligned}\]

Solving quadratic simultaneous equations graphically

One key difference with simultaneous equations containing a quadratic element is we can expect multiple answers. This is because of the way linear and non-linear functions can intersect.

Here a linear function is intersecting a quadratic function which has a shape known as a parabola.

Notice that the two points of intersection means that the simultaneous equations have two valid solutions

Solving Simultaneous Equation Graphically image 2

E.g.

\[\begin{aligned} x+y&=4 \\ y&=x^{2}+4x-2 \\ \end{aligned}\]

Solving Simultaneous Equation Graphically image 3

When graphed these two equations intersect at two points (6, 10) and (1, 3)
So therefore the simultaneous equations has two valid solutions

So the solutions to the simultaneous equations are:

\[x = -6, y = 10\]

And

\[x =1, y = 3\]

We can prove these are the solutions to the simultaneous equations by substituting the values into the original equations:

\[x = -6, y = 10\]

\[\begin{aligned} x+y=4 \\ -6+10=4 \end{aligned}\]

\[\begin{aligned} y&=x^{2}+4x-2 \\ 10&=(-6)^2+4(-6)-2\\ 10&=36-24-2\\ \end{aligned}\]

And

\[x =1, y = 3\]

\[\begin{aligned} x+y=4 \\ 1+3=4\\ \end{aligned}\]

\[\begin{aligned} y&=x^{2}+4x-2 \\ 3&=(1)^2+4(1)-2\\ 3&=1+4-2\\ \end{aligned}\]

Solving simultaneous equations graphically is part of our series of lessons to support revision on simultaneous equations. You may find it helpful to start with the main simultaneous equations lesson for a summary of what to expect, or use the step by step guides below for further detail on individual topics. Other lessons in this series include:

How to solve simultaneous equations graphically

In order to solve simultaneous equations graphically:

  1. Identify if the equations are linear or quadratic (or other non-linear)
  2. Draw each equation on the same set of axes
  3. Find the coordinates where the lines intersect
  4. State the values of the variable where the lines intersect and clearly state your answer (if you have multiples values of a variable ensure you match the correct pair)

How to solve simultaneous equations graphically

How to solve simultaneous equations graphically

Solving simultaneous equations graphically worksheet

Solving simultaneous equations graphically worksheet

Solving simultaneous equations graphically worksheet

Get your free solving simultaneous equations graphically worksheet of 20+ questions and answers. Includes reasoning and applied questions.

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Solving simultaneous equations graphically worksheet

Solving simultaneous equations graphically worksheet

Solving simultaneous equations graphically worksheet

Get your free solving simultaneous equations graphically worksheet of 20+ questions and answers. Includes reasoning and applied questions.

DOWNLOAD FREE

Solving simultaneous equations graphically examples

Example 1: solving linear simultaneous equations where ‘y’ is the subject of the formula

Solve this pair of simultaneous equations graphically:

\[\begin{aligned} y&=2x+1\\ y&=4x+3 \end{aligned}\]

  1. Identify if the equations are linear or quadratic

Both the equations are linear.
This means you will be drawing two straight lines which will intersect at one point only.

2Draw each equation on the same set of axes

Solving Simultaneous Equation Graphically example 1

3Find the coordinates where the lines intersect

Solving Simultaneous Equation Graphically example 1.2

The lines intersect (cross) at the coordinate (−1, −1)

4State the values of the variable where the lines intersect and clearly state your answer (if you have multiples values of a variable ensure you match the correct pair) 

\[\begin{aligned} x&=-1\\ y&=-1 \end{aligned}\]

Example 2: solving linear simultaneous equations where ‘y’ is not the subject of the formula

Solve this pair of simultaneous equations graphically:

\[\begin{aligned} 2x+4y&=14\\ 4x-4y&=4 \end{aligned}\]

Identify if the equations are linear or quadratic

Draw each equation on the same set of axes

Find the coordinates where the lines intersect

State the values of the variable where the lines intersect and clearly state your answer (if you have multiples values of a variable ensure you match the correct pair)

Example 3: solving linear simultaneous equations where ‘y’ is not the subject of the formula

Solve this pair of simultaneous equations graphically:

\[\begin{aligned} 3x+2y&=8\\ 2x+5y&=-2 \end{aligned}\]

Identify if the equations are linear or quadratic

Draw each equation on the same set of axes

Find the coordinates where the lines intersect

State the values of the variable where the lines intersect and clearly state your answer (if you have multiples values of a variable ensure you match the correct pair)

Example 4: solving simultaneous equations (one linear and one quadratic) where ‘y’ is the subject of the formula

Solve this pair of simultaneous equations graphically:

\[\begin{aligned} y&=x+3\\ y&=x^2+5x-2 \end{aligned}\]

Identify if the equations are linear or quadratic

Draw each equation on the same set of axes

Find the coordinates where the lines intersect

State the values of the variable where the lines intersect and clearly state your answer (if you have multiples values of a variable ensure you match the correct pair)

Example 5: solving simultaneous equations (one linear and one circle)

Solve this pair of simultaneous equations graphically:

\[\begin{aligned} y^2+x^2&=29\\ x+7&=y\\ \end{aligned}\]

Identify if the equations are linear or quadratic

Draw each equation on the same set of axes

Find the coordinates the lines intersect

State the values of the variable where the lines intersect and clearly state your answer (if you have multiples values of a variable ensure you match the correct pair) 

Common misconceptions

  • Incorrect drawing of graphs

A common mistake is to incorrectly the draw the graphs. It can be helpful to:

  1. Complete a table of values for the equation
  2. Make y the subject of the formula (especially for linear functions)
  3. Consider the gradient of the graph (for linear functions)
  4. Consider where the graph intersects the x and y axes

  • Multiple points of intersection

Remember linear and non-linear functions can intersect at 0, 1 or 2 points. If the lines have multiple points of intersection make sure to match the correct value of x and y.

Practice solving simultaneous equations graphically questions

1. Can two linear equations intersect at two points?

Yes

GCSE Quiz False

No

GCSE Quiz True

Sometimes

GCSE Quiz False

Need more information

GCSE Quiz False

 

Solving Simultaneous Equation Graphically practice Q1

 

Two linear functions cannot intersect at two points. If they cross each other it will be at one point only.

2. Can one linear equation and one quadratic intersect at two points?

Always

GCSE Quiz False

Never

GCSE Quiz False

Sometimes

GCSE Quiz True

Need more information

GCSE Quiz False

 

Solving simultaneous equations graphically practice Q4

 

A parabola and a line can intersect at 2 points but they can also intersect at 1 point or 0 points

3. If two linear equations do not intersect when drawn graphically they must be:

Parallel

GCSE Quiz True

Perpendicular

GCSE Quiz False

Far away from each other

GCSE Quiz False

Incorrectly drawn

GCSE Quiz False

 

Practice q3

 

Two lines that never meet (never intersect) are parallel to one another.

4. Solve the simultaneous equations graphically:

 

\begin{aligned} 6x+3y&=48\\ 6x+y&=26\\ \end{aligned}

x= -2.5 , y=-11
GCSE Quiz False

x= 2.5, y= -11
GCSE Quiz False

x=2.5 , y=11
GCSE Quiz True

x=11 , y=2.5
GCSE Quiz False

 

Practice Q4 simultaneous equations solved graphically

5. Solve the simultaneous equations

 

\begin{aligned} 4x+2y&=34\\ 3x+y&=21\\ \end{aligned}

x= 4 , y=- 9
GCSE Quiz False

x= -4 , y=9
GCSE Quiz False

x= 4 , y= 9
GCSE Quiz True

x= -4 , y= -9
GCSE Quiz False

Solving Simultaneous Equations Graphically Practice Q5 explanation

6. Solve the simultaneous equations:

 

\begin{aligned} y&=x+3\\ y&=x^2+5x-2\\ \end{aligned}

x= -5 , y= -1
GCSE Quiz False

x= -5 , y= -2

 

or

 

x= 1 , y=4
GCSE Quiz True

x= 1 , y=4
GCSE Quiz False

x= -5 , y= 4

 

or

 

x= 1 , y= -2
GCSE Quiz False

Solving Simultaneous Equations Graphically practice Q6

Solving simultaneous equations graphically GCSE questions

1. The graphs of the straight lines with equations

 

\begin{aligned} 3y+2x&=12\\ y&=x+4\\ \end{aligned}

 

have been drawn on the grid below:

 

Solving Simultaneous Equations Graphically GCSE Q1

 

Use the graphs to solve the simultaneous equations

 

\begin{aligned} 3y+2x&=12\\ y&=x+4\\ \end{aligned}

 

(2 marks)

Show answer
x=0

(1)

y=4

(1)

2. The graphs of the straight lines with equations

 

\begin{aligned} 4y-2x&=8\\ y&=x\\ \end{aligned}

 

have been drawn on the grid below:

 

Solving Simultaneous Equations Graphically

 

Use the graphs to solve the simultaneous equations

 

\begin{aligned} 4y-2x&=8\\ y&=x\\ \end{aligned}

 

(2 marks)

Show answer
x=4

(1)

y=4

(1)

3. The graphs of the straight lines with equations

 

\begin{aligned} y&=\frac{x}{2}+2\\ 2y+3x&=12\\ \end{aligned}

 

have been drawn on the grid below:

 

Use the graphs to solve the simultaneous equations

 

\begin{aligned} y&=\frac{x}{2}+2\\ 2y+3x&=12\\ \end{aligned}

 

(2 marks)

Show answer
x=2

(1)

y=3

(1)

4. By drawing the graphs of

 

\begin{aligned} y&=3x+5x\\ x-2y+6&=0\\ \end{aligned}

 

 

Solve the simultaneous equations:

 

\begin{aligned} y&=3x+5x\\ x-2y+6&=0\\ \end{aligned}

 

(3 marks)

Show answer

Both graphs drawn correctly with intersection

(1)

x=0.4

(1)

y=3.2

(1)

5. By drawing the graphs of

 

\begin{aligned} x+y&=4\\ y&=x^2+3x-1 \end{aligned}

 

 

Solve the simultaneous equations:

 

\begin{aligned} x+y&=4\\ y&=x^2+3x-1 \end{aligned}

 

(3 marks)

Show answer

Both graphs drawn correctly with intersection

(1)

x= -5 and y=9

(1)

x= 1 and y=3

(1)

Learning checklist

You have now learned how to:

  • Work with coordinates in all four quadrants
  • Identify and interpret the intercepts of linear functions graphically
  • Identify and interpret the intercepts of quadratic functions graphically
  • Interpret graphs of linear functions and quadratic functions
  • Solve two simultaneous equations with two variables; linear/linear
  • Solve two simultaneous equations with two variables; linear/quadratic

The next lessons are

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