7 (a) Sketch the graph of any cubic function that has both three distinct real roots and a positive coefficient of $x^3$ - AQA - A-Level Maths Pure - Question 7 - 2019 - Paper 2

To find the turning points of the function, we first differentiate it: $f'(x) = 3x^2 + 6px.$ Set the derivative to zero to find turning points:

3x(x + 2p) = 0.$$ This yields $x = 0$ or $x = -2p$. Since $p > 0$, $-2p < 0$ which confirms that there is a turning point at $x = 0$, where the curve crosses the y-axis.

To ensure that the function has three distinct real roots, we need to analyze the positions of turning points. The turning point at $x = 0$ is a maximum and the one at $x = -2p$ is a minimum due to the nature of the cubic function. Evaluating the function at these points gives us: $f(0) = q$ and $f(-2p) = -4p^3 + q.$ For the cubic to cross the x-axis three times, the max at $x = 0$, which is $f(0) = q$, must be greater than 0, while the minimum at $x = -2p$ must be less than 0:

\ q < 4p^3.$$ Thus, the range for $q$ is: $$-4p^3 < q < 0.$$