In the previous question the smallest kinetic energy at the bottom of the incline will be achieved by

A solid sphere, a hollow sphere and a disc, all having same mass and radius, are placed at the top of an incline and released. The friction coefficients between the objects and the incline are same and not sufficient to allow pure rolling. The smallest kinetic energy at the bottom of the incline will be achieved by

in the previous question, the change in potential energy.

A solid ball is realeased from rest down inclines of various inclination angle theta but through a fixed vertical height h. The coefficient of static and kinetic friction are both equal to mu . Which of the following graph best represents the total kinetic energy K of the ball at the bottom of the incline as a function of the angle theta of the incline?

A particle is released from the top of an incline of height h. Does the kinetic energy of the particle at the bottom of the incline dpend on the angle of incline? Do you ned any more information to anwer this question in Yes or No?

A disc of mass 3 kg rolls down an inclined plane of height 5 m. The translational kinetic energy of the disc on reaching the bottom of the inclined plane is

A solid iron sphere A rolls down an inclined plane. While an identical hollow sphere B of same mass sides down the plane in a frictionless manner. At the bottom of the inclined plane, the total kinetic energy of sphere A is.