Question

A ball with a mass of `6 kg` moving at `1 m/s` hits a still ball with a mass of `24 kg`. If the first ball stops moving, how fast is the second ball moving? How much kinetic energy was lost as heat in the collision?

Answer 1

The kinetic energy lost as heat in the collision is `=2.25J`

Explanation:

We have conservation of momentum

`m_1u_1+m_2u_2=m_1v_1+m_2v_2`

The mass the first ball is `m_1=6kg`

The velocity of the first ball before the collision is `u_1=1ms^-1`

The mass of the second ball is `m_2=24kg`

The velocity of the second ball before the collision is `u_2=0ms^-1`

The velocity of the first ball after the collision is `v_1=0ms^-1`

Therefore,

`6*1+24*0=6*0+24*v_2`

`24v_2=6`

`v_2=6/24=0.25ms^-1`

The velocity of the second ball after the collision is `v_2=0.25ms^-1`

The loss in kinetic energy is

`DeltaKE=KE_i-KE_f`

`=1/2*6*1^2-1/2*24*0.25^2`

`=3-0.75`

`=2.25J`

The kinetic energy lost as heat in the collision is `=2.25J`