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.

A solid iron sphere A rolls down an inclined plane, while another hollow sphere B with the same mass and same radius also rolls down the inclided plane. If V_(A) and V_(B) are their velocities a the bottom of the inclined plane. Then

A solid iron sphere A rolls down an inclined plane, while another hollow sphere B with the same mass and same radius also rolls down the inclided plane. If V_(A) and V_(B) are their velocities a the bottom of the inclined plane. Then A. V_(A)gtV_(B) B. V_(A)=V_(B) C. V_(A)ltV_(B) D. V_(A)gt = ltV_(B)

A solid sphere of mass m rolls down an inclined plane without slipping from rest at the top of an inclined plane.The linear speed of the sphere at the bottom of the inclined plane is v .The kinetic energy of the sphere at the bottom is

A solid sphere having mass m and radius r rolls down an inclined plane. Then its kinetic energy is

A solid cylinder and a solid sphere roll down on the same inclined plane. Then ratio of their acclerations is

A solid sphere of mass m rolls down an inclined plane a height h . Find rotational kinetic energy of the sphere.

A solid sphere of mass m rolls down an inclined plane a height h . Find rotational kinetic energy of the sphere.

A solid sphere rolls down an inclined plane and its velocity at the bottom is v_(1) . Then same sphere slides down the plane (without friction) and let its velocity at the bottom be v_(2) . Which of the following relation is correct