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29 May, 18:03

A stone is dropped from the roof of a high building. A second stone is dropped 1.25 s later. How long does it take for the stones to be 25.0 meters apart?

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  1. 29 May, 18:30
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    It will take the stones 2.67s to be 25 m apart.

    Explanation:

    if s is the distance between the stones.

    for the first stone:

    s = u*t + 1/2*g*t^2

    since u is the initial velocity, u = o m/s.

    s1 = 1/2*g*t^2

    for the second block:

    s2 = 1/2*g * (t - 1.25) ^2

    then s1 - s2 = 25 m,

    s1 - s2 = 1/2*g*t^2 - 1/2*g * (t - 1.25) ^2

    25 = 1/2*g*t^2 - 1/2*g * (t - 1.25) ^2

    50 = g*t^2 - g * (t - 1.25) ^2

    50/g = t^2 - (t - 1.25) ^2

    50/g = t^2 - (t^2 - 2.5*t + 1.5625)

    50/g = 2.5*t - 1.5625

    t = [50/g+1.5625] / (2.5)

    = [50 / (9.8) + 1.5625] / (2.5)

    = 2.67 s

    Therefore, it will take the stones 2.67s to be 25 m apart.
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