Two cars, A and B, travel along two straight roads which intersect at an angle $ heta$ - Leaving Cert Applied Maths - Question 2 - 2013

The relationship can be established using the sine rule, given that the speeds are different. The speed of car A is 9 m s$^{-1}$ and that of car B is 15 m s$^{-1}$, thus:

$\frac{|AB|}{\sin(\theta)} = \frac{90}{15} \Rightarrow \sin(\theta) = \frac{9}{15} = 0.6$

This gives:

$\theta = \arcsin(0.6) \approx 36.87°$

For aircraft P to intercept Q:

1. Let the velocity vector of P be represented as $extbf{V}_{p} = 600 \cos(a) \hat{i} - 600 \sin(a) \hat{j}$ where $a$ is the angle to be determined.
2. The velocity vector of Q is $extbf{V}_{q} = 600 \hat{i}$. Therefore, the relative velocity vector is: $\textbf{V}_{r} = \textbf{V}_{p} - \textbf{V}_{q} = (600 \cos(a) - 600) \hat{i} - 600 \sin(a) \hat{j}$
3. To determine the intercept line, set up: $\tan(30°) = \frac{600 \sin(a)}{600(1 - \cos(a))}$
4. Simplifying leads to: $\sin(a) = \frac{1}{2}, \therefore a = 30°$
5. Thus, P should head $W 60° S$ or $S 30° W$.