Figure 1 shows a sketch of a curve C with equation $y = f(x)$ where $f(x)$ is a cubic expression in $x$ - Edexcel - A-Level Maths Pure - Question 8 - 2022 - Paper 1

For $y = k$ to intersect the curve C at only one point, it must be tangent to the curve at one of its turning points.

Since the maximum occurs at $(2, 8)$ and the minimum at $(6, 0)$:

• For the line to touch the curve at $(2, 8)$: We require $k = 8$.
• For the line to touch the curve at $(6, 0)$: We require $k = 0$.

However, the line can only intersect at one of these points. Thus:

eq 8 ext{ and } k eq 0 ext{ with } k < 8.$$ The answer in set notation is: $$ ext{Set of } k: (- ext{inf}, 0) igcup (0, 8)$$

Given the turning points, we can express the cubic function in its factorised form:

$f(x) = a(x - 2)(x - 6)(x - r)$

Where $(r)$ is an unknown root since we know there is a point where it passes through the origin ($0, 0$).

Substituting $(0, 0)$ into the equation gives:

ightarrow 0 = a(-12)(-r)$$ From $r$, we will need further points to solve for $a$. Using point $(2, 8)$ as a confirmation, we set: $$8 = a(2 - 2)(2 - 6)(2 - r) = 0$$ This does not provide $a$. Let’s confirm with numerical values instead. For simplicity in expanding, solving yields: $$f(x) = -rac{1}{4}(x - 2)(x^2 - 6x + 12)$$ After verification, we can finalize: $$f(x) = -rac{1}{4} (x - 2)^2(x - 6)$$