Question

A ball with a mass of `2 kg` is rolling at `4 m/s` and elastically collides with a resting ball with a mass of `4 kg`. What are the post-collision velocities of the balls?

Answer 1

The velocity of the first ball is `=-1.33ms^-1`
The velocity of the second ball is `=2.67ms^-1`

Explanation:

In an elastic collision, we have conservation of momentum and conservation of kinetic energy.

The velocities before the collision are `u_1` and `u_2`.

The velocities after the collision are `v_1` and `v_2`.

`m_1u_1+m_2u_2=m_1v_1+m_2v_2`

and

`1/2m_1u_1^2+1/2m_2u_2^2=1/2m_1v_1^2+1/2m_2v_2^2`

Solving the above 2 equations for `v_1` and `v_2`, we get

`v_1=(m_1-m_2)/(m_1+m_2)*u_1+(2m_2)/(m_1+m_2)*u_2`

and

`v_2=(2m_1)/(m_1+m_2)*u_1+(m_2-m_1)/(m_1+m_2)*u_2`

Taking the direction as positive `rarr^+`

`m_1=2kg`

`m_2=4kg`

`u_1=4ms^-1`

`u_2=0ms^-1`

Therefore,

`v_1=-2/6*4+8/6*(0)=-4/3=-1.33ms^-1`

`v_2=4/6*4-2/6*(0)=8/3=2.67ms^-1`

Verificaition

`m_1u_1+m_2u_2=2*4+4*0=8`

`m_1v_1+m_2v_2=-2*4/3+4*8/3=8`