GraphsTopic Summary

Knowledge Organiser: Gradient and Intercepts

Part of Gradient & Intercept · GCSE GCSE Mathematics revision

This topic summary covers Knowledge Organiser: Gradient and Intercepts within Gradient & Intercept for GCSE Mathematics. Revise Gradient & Intercept in Graphs for GCSE Mathematics with 10 exam-style questions and 20 flashcards. This topic appears regularly enough that it should still be part of a steady revision cycle. It is section 9 of 9 in this topic. Use this topic summary to connect the idea to the wider topic before moving on to questions and flashcards.

Topic position

Section 9 of 9

Practice

10 questions

Recall

20 flashcards

Knowledge Organiser: Gradient and Intercepts

Key Terms

Gradient: The steepness of a line — rise divided by run between two points
Rise: The vertical change between two points on a line
Run: The horizontal change between two points on a line
y-intercept: The point where the line crosses the y-axis (x = 0)
x-intercept: The point where the line crosses the x-axis (y = 0)
Undefined gradient: A vertical line (x = constant) has no defined gradient

Must-Know Facts

Gradient = rise ÷ run; use two clearly-readable points from the graph
Positive gradient: line goes up left to right; negative gradient: line goes down
Zero gradient means a horizontal line (y = constant)
To find the y-intercept from an equation, set x = 0
To find the x-intercept from an equation, set y = 0 and solve
Always check the sign of the gradient matches the direction of the line on the graph

Key Formulas

Gradient = (y₂ − y₁) ÷ (x₂ − x₁)
y-intercept: set x = 0 in the equation, read c from y = mx + c
x-intercept: set y = 0 in the equation, solve for x
Gradient from a graph: draw a right-angled triangle and count squares

Common Mistakes

Reading c from non-y-axis crossing: c is only readable directly when the line crosses the y-axis — for other forms, substitute x = 0
Sign of gradient: Downward slope (top-left to bottom-right) = negative gradient — always check direction
Using non-grid points: When calculating gradient from a graph, use points that lie exactly on grid intersections for accuracy
Triangle too small: Use a large right-angled triangle (spanning several squares) to reduce reading errors

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Keep building this topic

Read this section alongside the surrounding pages in Gradient & Intercept. That gives you the full topic sequence instead of a single isolated revision point.

Special Cases Reading the Map of a Line Gradient and Intercept Essentials

Practice Questions for Gradient & Intercept

The gradient of a straight line is calculated by:

A. change in x ÷ change in y
B. change in y ÷ change in x
C. change in y × change in x
D. sum of y-values ÷ sum of x-values

1 markfoundation

A graph shows the distance (km) travelled by a car plotted against time (hours). The line has gradient 80. What does the gradient represent in this context?

2 markshigher

Quick Recall Flashcards

What is the y-intercept?

The point where a line crosses the y-axis. Found by setting x = 0.

What is the x-intercept?

The point where a line crosses the x-axis. Found by setting y = 0.

10 questions on Gradient & Intercept — practise free

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Special Cases

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Gradient & Intercept