Question

A ball with a mass of `5 kg` is rolling at `12 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 velocities are `4/3ms^-1` and `40/3ms^-1`

Explanation:

Here it's an elastic collision with no loss of kinetic energy.

We have the conservation of momentum.

`m_1u_1+m_2u_2=m_1v_1+m_2v_2`

`m_1=5 kg`

`u_1=12 ms^(-1)`

`m_2=4 kg`

`u_2=0`

`v_1=?`

`v_2=?`

`5*12+4*0=5*v_1+4*v_2`

`5v_1+4v_2=60`............`(1)`

There is also conservation of kinetic energies

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

`5*12^2+4*0=5*v_1^2+4*v_2^2`

`5v_1^2+4v_2^2=720`.........`(2)`

From `(1)`, we get

`v_1=(60-4v_2)/5`

Plugging this value in `(2)`

`5*((60-4v_2)/5)^2+4v_2^2=720`

`((60-4v_2))^2/5+4v_2^2=720`

`16(15-v_2)^2+20v_2^2=720*5=3600`

`4(15-v_2)^2+5v_2^2=900`

`4(225-30v_2+v^2)+5v_2^2=900`

`900-120v_2+4v_2^2+5v_2^2=900`

`9v_2^2-120v_2=0`

`v_2(9v_2-120)=0`

`v_2=0` or `v_2=120/9=40/3=13.3ms^-1`

`v_1=(60-4*40/3)/5=4/3ms^-1`