2 Answers

Geanette · Answer 1 · 2018-01-27T16:27:48+0000

Answer:

d=

Explanation:

The given simple harmonic motion equation is given as:

d=
$5sin(2{\pi}t)$

Differentiating the above equation with respect to t, we have

$d'=5cos(2{\pi}t)(2{\pi)$

$d'=10{\pi}cos(2{\pi}t)$

Now, equating
d'=0 , we have

$10{\pi}cos2{\pi}t=0$

$cos2{\pi}t=0$

$2{\pi}t=\frac{{\pi}}{2}$

t=(1)/(4)

Also, differentiating again with respect to t, we get

$d''=10{\pi}(-sin(2{\pi}t)(2{\pi})$

⇒
d''<0

Therefore, at t=
(1)/(4) , d=
$5sin(2{\pi}t)$ will have maximum displacement.

⇒d=
$5sin(2{\pi}((1)/(4)))$

⇒d=
$5sin((\pi)/(2))$

⇒d=

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