Introduction to Differentiation (Higher)
Part of Gradients of Curves — GCSE Mathematics
This deep dive covers Introduction to Differentiation (Higher) within Gradients of Curves for GCSE Mathematics. Revise Gradients of Curves in Graphs for GCSE Mathematics with 9 exam-style questions and 10 flashcards. This topic appears less often, but it can still be a useful differentiator on mixed-topic papers. It is section 6 of 10 in this topic. Use this deep dive to connect the idea to the wider topic before moving on to questions and flashcards.
Topic position
Section 6 of 10
Practice
9 questions
Recall
10 flashcards
Introduction to Differentiation (Higher)
Differentiation provides an exact method to find the gradient at any point, without drawing.
Power rule: if y = axⁿ, then dy/dx = naxⁿ⁻¹
Multiply by the power, then reduce the power by 1.
| Function y | Derivative dy/dx |
|---|---|
| x² | 2x |
| 3x³ | 9x² |
| 5x | 5 |
| 4 (constant) | 0 |
| x² + 3x − 2 | 2x + 3 |
Example: Find the gradient of y = x² + 3x at x = 2.
dy/dx = 2x + 3
At x = 2: dy/dx = 2(2) + 3 = 4 + 3 = 7
The gradient of the curve at x = 2 is exactly 7 — more precise than estimating from a tangent.