P is a point on the southern bank of a river - Leaving Cert Applied Maths - Question 2 - 2016

For Ship B, the angle ( \beta ) is determined from:

[ \tan(\beta) = \frac{1}{3} \Rightarrow \beta = \tan^{-1}(\frac{1}{3}) ]

The velocity is given by:

[ \vec{v}_B = 51 \cos(\beta) \hat{i} - 51 \sin(\beta) \hat{j} ]

Substituting the values:

[ \vec{v}_B \approx 45 \hat{i} - 24 \hat{j} ]

Thus, the final result is ( \vec{v}_B = 45 \hat{i} - 24 \hat{j} ) km h⁻¹.

To find the relative velocity of A with respect to B, we calculate:

[ \vec{v}_{AB} = \vec{v}_A - \vec{v}_B ]

Substituting the velocities:

[ \vec{v}_{AB} = (20 \hat{i} + 48 \hat{j}) - (45 \hat{i} - 24 \hat{j}) ]

After performing the subtraction:

[ \vec{v}_{AB} = -25 \hat{i} + 72 \hat{j} ]

Hence, ( \vec{v}_{AB} = -25 \hat{i} + 72 \hat{j} ) km h⁻¹.

The distance to point R is 9 km downstream.

For Ship B:

[ t_B = \frac{9}{45} = 0.2 \text{ h} ]

For Ship A:

[ t_A = \frac{9}{\sqrt{20^2 + 48^2}} = \frac{9}{\sqrt{400 + 2304}} = 0.45 \text{ h} ]

The difference in time is:

[ t_A - t_B = 0.45 - 0.2 = 0.25 \text{ h} ]

To find the width of the river, we calculate the distance covered by Ship A in the j-direction:

[ d = 24 \times 0.2 + 48 \times 0.45 ]

After calculating:

[ d \approx 26.4 \text{ km} ]

Thus, the width of the river is approximately 26.4 km.