Answer:
0.9904 m/s
Explanation:
To solve this problem we need to use the conservation of momentum:
m1v1 + m2v2 = m1'v1' + m2'v2'
Using this equation, we have:
m_bullet*v_bullet = m_bullet_after*v_bullet_after + m_block*v_block
0.00425 * 375 = 0.00425 * 114 + 1.12 * v_block
1.12 * v_block = 1.5938 - 0.4845
1.12 * v_block = 1.1093
v_block = 1.1093 / 1.12
v_block = 0.9904 m/s
Answer:
0.99 m/s
Explanation:
From the question,
Note: The collision between the bullet the the wooden block is elastic.
Total momentum before collision = Total momentum after collision.
mu+Mu' = mv+Mv'................ Equation 1
Where m = mass of the bullet, u = initial velocity of the bullet, M= mass of the wooden block, u' = initial velocity of the wooden block, v = final velocity of the bullet, v' = final velocity of the wooden block
Since, u' = 0 m/s
Therefore,
mu = mv+Mv'
make v' the subject of the equation
v' = (mu-mv)/M.................... Equation 2
Given: m = 4.25 g = 0.00425 kg, u = 375 m/s, M = 1.12 kg, v = 114 m/s.
Substitute into equation 2
v' = [(0.00425×375)-(0.00425×114)]/1.12
v' = (1.59375-0.4845)/1.12
v' = 0.99 m/s
