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3 November, 14:17

A 4.10 g bullet moving at 837 m/s strikes a 820 g wooden block at rest on a frictionless surface. The bullet emerges, traveling in the same direction with its speed reduced to 467 m/s. (a) What is the resulting speed of the block? (b) What is the speed of the bullet-block center of mass?

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  1. 3 November, 14:46
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    (a) 1.85 m/s

    (b) 4.1 m/s

    Explanation:

    Data

    bullet mass, Mb = 4.10 g initial bullet velocity, Vbi = 837 m/s wooden block mass, Mw = 820 g initial wooden block velocity, Vwi = 0 m/s final bullet velocity, Vbf = 467 m/s

    (a) From the conservation of momentum:

    Mb*Vbi + Mw*Vwi = Mb*Vbf + Mw*Vwf

    Mb * (Vbi - Vbf) / Mw = Vwf

    4.1 * (837 - 467) / 820 = Vwf

    Vwf = 1.85 m/s

    (b) The speed of the center of mass speed is calculated as follows:

    V = Mb / (Mb + Mw) * Vbi

    V = 4.1 / (4.1 + 820) * 837

    V = 4.1 m/s
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