Question

A ball with a mass of `4 kg` and velocity of `1 m/s` collides with a second ball with a mass of `9 kg` and velocity of `- 4 m/s`. If `40%` of the kinetic energy is lost, what are the final velocities of the balls?

Answer 1

The final velocities are `=-3.78ms^-1` and `=-1.88ms^-1`

Explanation:

We have conservation of momentum

`m_1u_1+m_2u_2=m_1v_1+m_2v_2`

The kinetic energy is

`k(1/2m_1u_1^2+1/2m_2u_2^2)=1/2m_1v_1^2+1/2m_2v_2^2`

Therefore,

`4xx1+9xx(-4)=4v_1+9v_2`

`4v_1+9v_2=-32`

`v_2=(-(32+4v_1))/9`........................`(1)`

and

`0.60(1/2xx4xx1^2+1/2xx9xx(-4)^2)=1/2xx4xxv_1^2+1/2xx9xxv_2^2`

`4v_1^2+9v_2^2=88.8`...................`(2)`

Solving for `v_1` and `v_2` in equation s `(1)` and `(2)`

`4v_1^2+9((-(32+4v_1))/9)^2=88.8`

`36v_1^2+16v_1^2+256v_1+1024-799.2=0`

`52v_1^2+256v_1+224.8=0`

`13v_1^2+64v_1+56.2=0`

Solving this quadratic equation in `v_1`

`v_1=(-64+-sqrt(64^2-4xx13xx56.2))/(26)`

`v_1=(-64+-sqrt(1173.6))/(26)`

`v_1=(-64+-34.3)/(26)`

`v_1=-3.78ms^-1` or `v_1=-1.14ms^-1`

`v_2=-1.88ms^-1` or `v_2=-3.05ms^-1`