A particle is moving with constant angular velocity \( \omega \) along a circular path of radius...

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A particle is moving with constant angular velocity \( \omega \) along a circular path of radius \( \mathrm{A} \) as shown in
\( \mathrm{P} \) figure. Find out \( \mathrm{x} \)-component of velócity of W particle as a function of time.
(1) \( v=A \omega \cos (\omega t+\pi / 6) \)
(2) \( v=A \omega \cos (\omega t-\pi / 6) \)
-(3) \( v=-A \omega \cos (\omega t+\pi / 6) \)
(4) \( v=-A \omega \sin (\omega t+\pi / 6) \)
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