Answer:
The length of her second displacement = 247.12 m.
The direction of her second displacement = 31.24° from west.
Step-by-step explanation:
As per the question,
From the figure as drawn below,
Let the starting point be O. After running 140 m due west, she reached at point A.
∴ OA = 140 m
And At the end of the run, she is 374 m away from the starting point at an angle of 20° north of west.
∴ OP = 374 m
We have to find the distance AP = x.
By using the cosine rule in triangle OAP
[tex]cos \theta = \frac{OA^{2}+OP^{2}-AP^{2}}{2\times OA\times OP}[/tex]
After putting the given value, we get
[tex]cos 20= \frac{140^{2}+374^{2}-x^{2}}{2\times 140\times 374}[/tex]
[tex]x^{2}=140^{2}+374^{2} - 2\times 140\times 374\times cos 20[/tex]
∴ x = 247.12 m
Hence,the length of her second displacement = 247.12 m.
Again,
By using the cosine rule in triangle OAP, we get
[tex]cos \alpha = \frac{OA^{2}+AP^{2}-OP^{2}}{2\times OA\times AP}[/tex]
After putting the given value, we get
[tex]cos \alpha = \frac{140^{2}+247.12^{2}-374^{2}}{2\times 140\times 247.12}[/tex]
∴ α = 148.759°
Hence, the direction of her second displacement = 180° - α = 180° - 148.759 = 31.24° from west.
