Figure 3 shows the plan of a stage in the shape of a rectangle joined to a semicircle - Edexcel - A-Level Maths Pure - Question 1 - 2018 - Paper 2

To find the stationary value of A, we take the derivative of A with respect to x and set it to zero:

1. $\frac{dA}{dx} = 0$
   Differentiating the area function: $\frac{dA}{dx} = 80 - 2y - 2x = 0$
   Solving for x, we can equate: \Rightarrow 40 - x - \frac{\pi x}{2} = 0$$ Solving for x gives us the required stationary value.

To prove that the value of x gives a maximum, we can use the second derivative test. We compute:

1. Second Derivative: $\frac{d²A}{dx²}.$ If this value is less than 0, it indicates a maximum:
   $\frac{d²A}{dx²} < 0\text{ indicates that } A \text{ reaches a maximum.}$
   Evaluating this will confirm the maximum value of A.

Substituting the value of x found back into the area equation gives:
$A = 80x - (2 + \frac{\pi}{2})y²$
Calculate the value of A based on our determined maximum, simplifying the area to:
$= 448 m²\text{ for the maximum area of the stage}$.