A hollow sphere and a solid sphere having same mass and same radii are rolled down a rough inclined plane.

A solid cylinder and a solid sphere, both having the same mass and radius, are released from a rough inclined plane of inclination theta one by one. They roll on the inclined plane without slipping. The force of friction that acts

A hollow sphere, a solid sphere, a disc and a ring all having same mass nd radius are rolled on an inclined plane. If no slipping takes place, which one will take the smallest time to cover a given length?

A solid sphere and a hollow sphere of same mass M and same radius R are released from the top of a rough inclined plane. Friction coefficient is same for both the bodies. If both bodies perform imperfect rolling, then Statement - 1 : Work done by friction for the motion of bodies from top of incline to the bottom will be same for both the bodies. Statement - 2 : Force of friction will be same for both the bodies.

The ratio of the time taken by a solid sphere and that taken by a disc of the same mass and radius to roll down a rough inclined plane from rest, from the same height is

A solid sphere and a solid cylinder having the same mass and radius, rolls down the same incline. The ratio of their acceleration will be

A solid sphere, a hollow sphere and a disc, all having the 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 least time will be taken in reaching the bottom by

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 hollow sphere and a solid sphere both having the same mass of 5 kg and radius 10 m are initially at rest. If they are made to roll down the same inclined plane without slipping, the ratio of their speeds when they reach the bottom of the plane (V_("hollow"))/(V_("solid")) , will be

A solid sphere and a solid cylinder of same mass are rolled down on two inclined planes of heights h_(1) and h_(2) respectively. If at the bottom of the plane the two objects have same linear velocities, then the ratio of h_(1):h_(2) is

A disc and a solid sphere of same mass and radius roll down an inclined plane. The ratio of thhe friction force acting on the disc and sphere is