2.18.2 Applications of Differentiation | CIE IGCSE Maths: Extended Revision Notes 2023

Finding Stationary Points & Turning Points

The easiest way to think of a turning point is that it is a point at which a curve changes from moving upwards to moving downwards, or vice versa
Turning points are also called stationary points
- stationary means the gradient is zero (flat) at these points

Turn Pts Notes fig1, downloadable IGCSE & GCSE Maths revision notes

At a turning point the gradient of the curve is zero.
- If a tangent is drawn at a turning point it will be a horizontal line
- Horizontal lines have a gradient of zero
This means substituting the x-coordinate of a turning point into the gradient function (aka derived function or derivative) will give an output of zero

Turn Pts Notes fig2, downloadable IGCSE & GCSE Maths revision notes

STEP 1: Solve the equation of the gradient function (derivative / derived function) equal to zero
ie. solve $\frac{d y}{d x} = 0$
This will find the x-coordinate of the turning point
STEP 2: To find the y-coordinate of the turning point, substitute the x-coordinate into the equation of the graph, y = ...
- not into the gradient function

Remember to read the questions carefully (sometimes only the x-coordinate of a turning point is required)

Turn Pts Notes fig4, downloadable IGCSE & GCSE Maths revision notes

You can see from the shape of a curve the different types of stationary points
You need to know two different types of stationary points (turning points):
- Maximum points (this is where the graph reaches a “peak”)
- Minimum points (this is where the graph reaches a “trough”)

Turn Pts Notes fig3, downloadable IGCSE & GCSE Maths revision notes

These are sometimes called local maximum/minimum points as other parts of the graph may still reach higher/lower values

You can see and justify which is a maximum point and which is a minimum point from the shape of a curve...
- ... either from a sketch given in the question
- ... or a sketch drawn by yourself
  (You may even be asked to do this as part of a question)
- ... or from the equation of the curve
For parabolas (quadratics) it should be obvious ...
- ... a positive parabola (positive x² term) has a minimum point
- ... a negative parabola (negative x² term) has a maximum point

Turn Pts Notes fig5, downloadable IGCSE & GCSE Maths revision notes

Cubic graphs are also easily recognisable ...
- ... a positive cubic has a maximum point on the left, minimum on the right
- ... a negative cubic has a minimum on the left, maximum on the right

Turn Pts Notes fig6, downloadable IGCSE & GCSE Maths revision notes

The second derivative, $\frac{d^{2} y}{d x^{2}}$ , is the derivative-of-the-derivative
- differentiate the expression for $\frac{d y}{d x}$ to get the expression for $\frac{d^{2} y}{d x^{2}}$
  - this is the same as differentiating the original equation for $y$ twice
A quick algebraic test to find out the turning point (that does not require sketching) is as follows
- If the stationary point is at $x = a$ , substitute $x = a$ into the expression for $\frac{d^{2} y}{d x^{2}}$ to get a numerical value...
  - ...if this value is negative, $\frac{d^{2} y}{d x^{2}} < 0$ , the stationary point is a maximum point
  - ...if this value is positive, $\frac{d^{2} y}{d x^{2}} > 0$ , the stationary point is a minimum point
  - If the value is zero, $\frac{d^{2} y}{d x^{2}} = 0$ , then unfortunately the test has failed
    - a zero means it could be any out of a max, min, or other types (stationary points-of-inflection)
    - go back to sketching the graph to classify the stationary point(s)

Turn Pts Example fig1 qu, downloadable IGCSE & GCSE Maths revision notes Turn Pts Example fig2 sol, downloadable IGCSE & GCSE Maths revision notes