Figure 1 shows the sketch of a curve with equation $y = f(x)$, $x ext{ } ext{ } ext{} ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } \ ext{The curve crosses the } y ext{-axis at } (0, 4) ext{ and crosses the } x ext{-axis at } (5, 0) - Edexcel - A-Level Maths Pure - Question 8 - 2018 - Paper 1

To solve the equation $f(2x) = 0$, we need to find the value of $x$ that gives an output of 0 in the original function $f(x)$. The original function crosses the $x$-axis at $x = 5$. Therefore, setting $2x = 5$ gives us:

2x = 5 \ ext{ } \ x = rac{5}{2} = 2.5

Thus, the solution is $x = 2.5$.

The original asymptote is given as $y = 1$. In this case, reflecting the curve about the $y$-axis does not change the position of the asymptote. Therefore, the equation of the asymptote of the curve $y = f(-x)$ remains:

$y = 1$.

For the line $y = k$ to meet the curve $y = f(x)$ at only one point, $k$ can be equal to the maximum $y$-value of the curve or less than the horizontal asymptote. Given the maximum value at the turning point $(2, 7)$ and the asymptote at $y = 1$, the set of possible values for $k$ is:

$k ext{ } < 1 ext{ } ext{ or } k = 7$.