Physics Problem: Calculating Maximum Height of a Bouncing Ball

What is the maximum height of the ball after the bounce?

If we know the initial velocity v of the ball just before it hits the floor, we can calculate the maximum height h that it will reach after the bounce.

Answer:

The maximum height of the ball after the bounce can be calculated using the principle of conservation of energy. The total mechanical energy of the ball before and after the bounce is conserved, assuming neglecting dissipative forces. By equating the potential energy to the kinetic energy just after the bounce, we can determine the maximum height.

When solving for the maximum height of a bouncing ball, we need to consider the conservation of energy. The kinetic energy just before the bounce is equal to the potential energy at the maximum height after the bounce. This principle allows us to calculate the height the ball reaches after bouncing.

Let's assume the ball has a mass of m, and its initial velocity just before hitting the floor is v. The kinetic energy of the ball just before the bounce (KE) is given by:

KE = 0.5 * m * v^2

During the bounce, 0.60 J of energy is dissipated, so the kinetic energy just after the bounce is reduced by this amount:

KE' = KE - 0.60 J = 0.5 * m * v^2 - 0.60 J

At the maximum height, the velocity of the ball is zero, indicating all initial kinetic energy has been converted to potential energy. Therefore, we equate potential energy to the kinetic energy just after the bounce:

mgh = 0.5 * m * v^2 - 0.60 J

Solving for h, the maximum height, we get:

h = (v^2/2g) - (0.60 J/mg)

Where g is the acceleration due to gravity, approximately 9.81 m/s^2. By knowing the initial velocity v, we can determine the maximum height the ball reaches after bouncing.

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