Gradient of a Line (Edexcel IGCSE Maths B): Revision Note

Exam code: 4MB1

Gradient of a line

What is the gradient of a line?

  • The gradient is a measure of how steep a straight line is

  • A gradient of 3 means:

    • For every 1 unit to the right, go up by 3

  • A gradient of -4 means:

    • For every 1 unit to the right, go down by 4 

  • A gradient of 3 is steeper than 2

    • A gradient of -5 is steeper than -4

  • A positive gradient means the line goes upwards (uphill)

    • Bottom left to top right 

  • A negative gradient means the line goes downwards (downhill)

  • Top left to bottom right

How do I find the gradient of a line?

  • Find two points on the line and draw a right-angled triangle

    • Then gradient = change in ychange in x

    • Or, in short, riserun 

      • The rise is the vertical length of the triangle

      • The run is the horizontal length of the triangle

    • Put the correct sign on your answer

      • Positive for uphill lines

      • Negative for downhill lines

    • You can also find gradient of a line between two points, (x1, y1) and (x2, y2) 

      • Use the formula  y2y1x2x1

How do I draw a line with a given gradient?

  • To draw the gradient 23

    • The rise is 2

    • The run is 3

    • It is positive (uphill)

      • Move 3 units to the right and 2 units up

  • To draw the gradient 5 make it a fraction, 51

    • The rise is 5

    • The run is 1

    • It is negative (downhill)

      • Move 1 unit to the right and 5 units down

Examiner Tips and Tricks

A lot of students forget to make their gradients negative for downhill lines!

Worked Example

(a) Find the gradient of the line shown in the diagram below.

screenshot-2023-02-12-at-20-42-17

Answer:

Find two points that the line passes through

(0, 2) and (1, 5)

Use the grid to draw a right-angled triangle
Find the 'rise' (vertical length) and 'run' (horizontal length)

cie-igcse-core-gradient-of-a-line-rn-we-a

Work out the fraction riserun

31=3

Look to see if the line is uphill or downhill

uphill, so the gradient is positive

The gradient is 3

(b) On the grid below, draw the line with a gradient of −2 that passes through (0,1).

Answer:

Mark on the point (0, 1)
-2 is the fraction 21
The rise is 2, the run is 1, the line goes downhill (so 1 across, 2 down)

cie-igcse-gradients-of-lines-we-1

(c) On the grid below, draw the line with a gradient of 23 that passes through (0,-1).

Answer:

Mark on the point (0,-1) 
The rise is 2, the run is 3, the line goes uphill (so 3 across, 2 up)

cie-igcse-gradients-of-lines-we-2

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