By conserving momentum at initial and final condition of ball we get, m1u1+m2u2=m1v1+m1v2 Given that, m1=m2=m,u1=v,u2=0, and v=0.15v Therefore, mv=m(0.15v)+mv2 v2=0.85v The final kinetic energy is given by,
1
2
mv12+
1
2
mv22=
1
2
m(0.15v)2+
1
2
m(0.85v)2 The change in kinetic energy is given by, ΔKE=(KE)i−(KE)f =
1
2
mv2−[
1
2
m(0.15v)2+
1
2
m(0.85v)2] =12mv2(1−(0.15)2+(0.85)2) The percentage change in kinetic energy is given by, % change=