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The displacement of an object in SHM is described by the equation


x = cos\binom{2\pi}{3}t
where x is in meters and t in seconds. Determine the velocity of the object at t = 0.6 s. ​

User Josh Rack
by
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1 Answer

14 votes
14 votes

Answer:


-1.99\:\mathrm{m/s}

Step-by-step explanation:

Assuming that the equation is intended to be
\displaystyle x=\cos\left((2\pi)/(3)t\right), we can find the velocity vs. time equation by taking the first derivative with respect to
t:


\displaystyle (dx)/(dt)=(d)/(dt)\left(\cos\left((2\pi)/(3)t\right)\right)

Recall the chain rule:


\displaystyle f(g(x))'=f'(g(x))\cdot g'(x)

Therefore,


\displaystyle (d)/(dt)\left(\cos\left((2\pi)/(3)t\right)\right)=-\sin\left((2\pi)/(3)t\right)\cdot (2\pi)/(3)

Therefore, the velocity vs. time equation of the object is
\displaystyle v=-\sin\left((2\pi)/(3)t\right)\cdot (2\pi)/(3).

Substitute
t=0.6\text{ s} into this equation to find the velocity at that given time:


\displaystyle v=-\sin\left((2\pi)/(3)(0.6)\right)\cdot (2\pi)/(3)\approx \boxed{-1.99\text{ m/s}}

User McStretch
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