Answer:
Vb = v/2
Half of the speed of Car A before the collision
Explanation:
This problem can be solved by using conservation of momentum.
[tex]m_{A}*v_{A1} + m_{B}*v_{B1} = m_{A}*v_{A2} + m_{B}*v_{B2}[/tex]
Since car B was stopped before the collision and its mass is twice the mass of A:
[tex]v_{B1} = 0\\m_{B} = 2*m_{A}[/tex]
Also, since it is an elastic collision, car A stops after hitting car B. Rewriting the equation:
[tex]m_{A}*v_{A1} + 2m_{A}*0 = m_{A}*0 + 2m_{A}*v_{B2}\\m_{A}*v_{A1} = 2m_{A}*v_{B2}\\v_{B2}=\frac{v_{A1}}{2}[/tex]
Therefore, the speed of car B after the collision is half of the speed of car A before the collision (v)
Vb = v/2
