The graph of $f(x) = ext{log}_k x$ is drawn below - NSC Mathematics - Question 6 - 2021 - Paper 1

We start by analyzing the inequalities one at a time.

1. For the left inequality: $-1 ext{ ≤ } ext{log}_k x$ This is equivalent to: x ext{ ≥ } k^{-1} = rac{1}{4}.

2. For the right inequality: $ext{log}_k x ext{ ≤ } 2$ This can be rewritten as: $x ext{ ≤ } k^2 = 16.$

Combining these gives: rac{1}{4} ext{ ≤ } x ext{ ≤ } 16.

To find the inverse function, we swap $x$ and $y$ in the equation:

$y = ext{log}_k x.$

Swapping gives:

$x = ext{log}_k y.$

Now, solving for $y$, we rewrite the equation in exponential form:

$y = k^x.$

To determine where the product is negative, we need to examine the behavior of $f'^{-1}(x)$:

1. The function $f'(x)$ indicates the rate of change of $f(x)$: Since $f(x) = ext{log}_k x$, we have: f'(x) = rac{1}{x ext{ln} k}.

The inverse function's derivative: f'^{-1}(x) = rac{1}{k^x ext{ln} k}.

2. Now for the condition: x rac{1}{f'^{-1}(x)} < 0. The product will be negative if:
   • Either $x < 0$ (where $f'^{-1}$ is positive)
   • Or when both terms are negative or positive, leading to: $x ext{ ∈ } (- ext{∞}; 0).$