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4 August, 16:35

A 6.20 g bullet moving at 929 m/s strikes a 850 g wooden block at rest on a frictionless surface. The bullet emerges, traveling in the same direction with its speed reduced to 478 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. 4 August, 16:47
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    (a) Final speed of block = 3.2896 m/s

    (b) 6.7350 m/s is the speed of the bullet-block center of mass?

    Explanation:

    Given that:

    Mass of bullet (m₁) = 6.20 g

    Initial Speed of bullet (u₁) = 929 m/s

    Final speed of bullet (v₁) = 478 m/s

    Mass of wooden block (m₂) = 850g

    Initial speed of block initial (u₂) = 0 m/s

    Final speed of block (v₂) = ?

    By the law of conservation of momentum as:

    m₁*u₁ + m₂*u₂ = m₁*v₁ + m₂*v₂

    6.20*929 + 850*0 = 6.20*478 + 850*v₂

    Solving for v₂, we get:

    v₂ = 3.2896 m/s

    Let the V be the speed of the bullet-block center of mass. So,

    V = [m₁ * u₁]/[m₁ + m₂] (p before collision = p after collision)

    = [6.2 * 929]/[5.2+850]

    V = 6.7350 m/s
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