Answer:
The boat will be 74 .17 meters downstream by the time it reaches the shore.
Explanation:
Consider the vector diagrams for velocity and distance shown below.
converting 72 miles per hour to km/hr
we have 72 miles per hour 72 × 1.60934 = 115.83 km/hr
The velocity vectors form a right angled triangle, and can be solved using simple trigonometric laws
[tex]tan \theta = \frac{12}{115.873}[/tex]
[tex]\theta = tan^{-1}( \frac{12}{115.873})=5.9126[/tex]
This is the vector angle with which the ship drifts away with respect to its northward direction.
From the sketch of the displacement vectors, Â we can use trigonometric ratios to determine the distance the boat moves downstream.
Let x be the distance  the boat moves downstream.d
[tex]sin(5.9126)=\frac{x}{720}[/tex]
[tex]x= 720\times 5.9126[/tex]
[tex]x=74.17m[/tex]
∴The boat will be 74 .17 meters downstream by the time it reaches the shore.
