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19 February, 03:10

A particle is moving along the x axis so that its position at time t> / = 0 is given by s (t) = (t) ln (2t). Find the acceleration of the particle when the velocity is first zero.

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  1. 19 February, 03:11
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    The acceleration of the particle in any time will be the second derivative of s (t) = (t) ln (2t)

    1) We have to find the first derivative.

    v (t) = velocitiy

    v (t) = ds/dt=ln (2t) + 2t/2t

    v (t) = ds/dt=ln (2t) + 1

    2) we find out the value of "t" when v (t) = 0

    ln (2t) + 1=0

    ln (2t) = - 1 ⇔ e⁻¹=2t ⇒t=1/2e

    3) We have to find the second derivative of s (t)

    a (t) = acceleration

    a (t) = d²/d²t=2/2t+0=1/t

    3) We find the acceleration of the particle at t=1/2e

    a (1/2e) = 1 / (1/2e) = 2e

    Answer: the acceleration of the particle when the veolocity is zero would be 2e u/t² (u=units of lenght; t=units of time).

    Answer: 2e
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