A tennis ball of mass 0.04kg is held just above a basketball of mass 0.5kg. With

Question

A tennis ball of mass 0.04kg is held just above a basketball of mass 0.5kg. With their centers vertically aligned, both are released from rest at the same moment, so that the bottom of the basketball falls freely through a height 1.5m and strikes the floor. Assume an elastic collision with the ground instantaneously reverses the velocity of the basketball while the tennis ball is still moving down because the balls have separated a bit while falling.

The two balls meet in an elastic collision. To what height does the tennis ball rebound?

Explanation / Answer

speed of basket ball u1 = sqrt(2*g*h)

mass of basket ball m1 = 0.5 kg

speed of tennis ball u2 = -sqrt(2*g*h)

mass of the tennis ball m2 = 0.04 kg

initial momentum before collision

Pi = m1*u1 + m2*u2

after collision final momentum

Pf = m1*v1 + m2*v2

from momentum conservation

total momentum is conserved

Pf = Pi

m1*u1 + m2*u2 = m1*v1 + m2*v2 .....(1)

from energy conservation

total kinetic energy before collision = total kinetic energy after collision

KEi = 0.5*m1*u1^2 + 0.5*m2*u2^2

KEf =   0.5*m1*v1^2 + 0.5*m2*v2^2

KEi = KEf

0.5*m1*u1^2 + 0.5*m2*u2^2 = 0.5*m1*v1^2 + 0.5*m2*v2^2 .....(2)

solving 1&2

we get

v1 = ((m1-m2)*u1 + (2*m2*u2))/(m1+m2)

v2 = ((m2-m1)*u2 + (2*m1*u1))/(m1+m2)

v2 = ( (-(0.04-0.5)*sqrt(2*g*h)) + (2*0.5*sqrt(2gh)) ) /(0.04+0.5)

v2 = 2.7*sqrt(2*g*h)

height rebounded = v2^2/2g = 10.935 m <<<<------answer

Related Questions

Navigate

• Browse (All)
• Browse A
• Subjects

Integrity-first tutoring: explanations and feedback only — we do not complete graded work. Learn more.