1 Answer

Trevon · Answer 1 · 2021-11-09T18:53:12+0000

Answer:

$v=<2,2\sqrt 3>$

Step-by-step explanation:

We are given that

Magnitude of vector v=
$\mid v\mid =4$

v lies in the first quadrant

$\theta=(\pi)/(3)$

$v_x=\mid v\mid cos\theta$

$v_y=\mid v\mid sin\theta$

Substitute the values then we get

$v_x=4cos(\pi)/(3)$

v_x=4* (1)/(2)=2

$cos(\pi)/(3)=(1)/(2)$

$v_y=4* sin(\pi)/(3)=4* (\sqrt 3)/(2)=2\sqrt 3$

$sin(\pi)/(3)=(\sqrt 3)/(2)$

Therefore, the vector v in component form
=<v_x,v_y>

$v=<2,2\sqrt 3>$

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