Answer to Question #249271 in Electric Circuits for Jayson

Let the velocity of the spheres before collision u

And the mass of them is m and 3m

Let there speed after collision be "v_{1}" and "v_{2}"

Hence,

Velocity of approach = velocity of separation

"u_{1}-u_{2}=v_{2}-v_{1} \\\\\n\nu-(-u)=v_{2}-v_{1} \\\\\n\nv_{2}-v_{1}=2u \\\\\n\nv_{2}=2u+v_{1}...(i)"

Now from the conservation of momentum

"m_{1}u_{1}+m_{2}u_{2}=m_{1}v_{1}+m_{2}v_{2} \\\\\n\nmu+3m(-u)=mv_{1}+3mv_{2} \\\\\n\nmu-3mu=mv_{1}+3mv_{2} \\\\\n\n-2mu=mv_{1}+3mv_{2} \\\\\n\nv_{1}+3v_{2}=-2u... (ii)"

Solve (i) and (ii)

"v_{1}+3(2u+v_{1})=-2u \\\\\n\nv_{1}+6u+3v_{1}=-2u \\\\\n\nv_{1}+3v_{1}=-2u-6u \\\\\n\n4v_{1}=-8u \\\\\n\nv_{1}=-2u"

Putting this in (i)

"v_{2}=2u+(-2u) \\\\\n\nv_{2}=0"

hence the 1st sphere will come back with a speed twice of its initial and the 2nd sphere will attains at rest.