A pilot is flying in a helicopter - NSC Mathematics - Question 7 - 2018 - Paper 2

To find the distance BC, we apply the cosine rule in triangle ABC, which gives:

$BC^2 = AB^2 + AC^2 - 2AB \cdot AC \cdot \cos(\angle BAC)$

We know:

• (AB = 2h)
• (AC = 3h)
• (\cos(\angle BAC) = \cos(2x))

Substituting these values into the cosine rule, we get:

$BC^2 = (2h)^2 + (3h)^2 - 2(2h)(3h)\cos(2x)$

Calculating further:

$= 4h^2 + 9h^2 - 12h^2 \cos(2x)$ $= 13h^2 - 12h^2 \cos(2x)$

Using the double angle identity, (\cos(2x) = 2\cos^2(x) - 1), we substitute to find:

$BC^2 = 13h^2 - 12h^2(2\cos^2(x) - 1)$ $= 13h^2 - 24h^2\cos^2(x) + 12h^2$ $= 25h^2 - 24h^2\cos^2(x)$

Therefore, we get:

$BC = \sqrt{25h^2 - 24h^2 \cos^2(x)}$

And consequently:

$BC = \frac{h}{25 - 24\cos^2(x)}$