Answer:
-2 m/s
Explanation:
Assuming the collision is elastic, the total momentum must be conserved:
[tex]p_i = p_f[/tex]
[tex]m_1 u_1 + m_2 u_2 = m_1 v_1 + m_2 v_2[/tex]
where
m1 = 0.50 kg is the mass of the first ball
m2 = 1.00 kg is the mass of the second ball
u1 = +6.0 m/s is the initial velocity of the first ball
u2 = -12.0 m/s is the initial velocity of the second ball
v1 = -14 m/s is the final velocity of the first ball
v2 = ? is the final velocity of the second ball
By re-arranging the equation, we can find the final velocity of the 1.00 kg ball:
[tex]v_2 = \frac{m_1 u_1 + m_2 u_2 - m_1 v_1}{m_2}=\frac{(0.50 kg)(6.0 m/s)+(1.00 kg)(-12 m/s)-(0.50 kg)(-14 m/s)}{1.00 kg}=-2 m/s[/tex]
which means, 2 m/s in the same direction the second ball was travelling before the collision.
The speed of the second ball is 2 m/s
To calculate the speed of the second ball after the collision, we use the formula below.
Formula:
Where:
From the question,
Given:
Substitute these values into equation 1
Solve for v'
Note: The negative sign can be ignored in the final answer
Hence, the speed of the second ball is 2 m/s.
Learn more about speed here: https://brainly.com/question/4931057
