Using small angle approximations, show that for small, non-zero, values of $x$ $$\frac{x \tan 5x}{\cos 4x - 1} \approx A$$ where $A$ is a constant to be determined. - AQA - A-Level Maths Pure - Question 4 - 2020 - Paper 2

Using the small angle approximation for cosine, we know that: $\cos \theta \approx 1 - \frac{\theta^2}{2}.$ Therefore, for $\cos 4x$, we can write: $\cos 4x \approx 1 - \frac{(4x)^2}{2} = 1 - 8x^2.$

We substitute these approximations into our expression: $\frac{x \tan 5x}{\cos 4x - 1} \approx \frac{x (5x)}{(1 - 8x^2) - 1} = \frac{5x^2}{-8x^2} = -\frac{5}{8}.$ Thus, we can conclude that $A = -\frac{5}{8}$.

Finally, we have shown that for small values of $x$, $\frac{x \tan 5x}{\cos 4x - 1} \approx A$ where $A = -\frac{5}{8}.$