A ring, a disc, a hollow sphere, a solid sphere of the same mass and radius are released from the top of an inclined plane. Then the bodies which reach the bottom first and last are

'A' solid sphere and solid disc having the same mass and radius roll down on the same inclined plane. What is the ratio of their accelerations ?

The M.I. of a solid sphere of mass'M' and radius 'R' about a tangent in its plane is

A hollow sphere and solid sphere of the same radius rotate about their diameters with the same angular velocity and angular momentum. Then the ratio of their masses is

A thin ring and a solid disc of same mass and radius are rolling with the same linear velocity. Then ratio of their kinetic energies is

A solid sphere and hollow sphere of the same material have same mass.Then moment of inertia about the diameter is more for

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

A body' of mass m slides down on an inclined plane and reaches'the bottom with a velocity V. If the same mass were in the form of a ring which rolls down on the inclined plane, then the velocity of the ring at the bottom will be

A circular disc first rolls without slipping and then slides without rolling down the same inclined plane. The ratio of velocities of the disc at the bottom of the plane in both the cases repectively is

A solid sphere, hollow sphere and ring have the same mass and diameter.If they rotate about axes passing through centre of gravity and in the case of ring it is normal to its plane, which will have more moment of inertia ?

A solid cylinder rolls down on inclined plane. Its mass is 2kg and radius 0.1m. If the height of the inclined plane is 4m, what is its rotational K.E. when it reaches foot of the plane? Take M.I. of solid cylinder about its axis = frac( Mr^2)(2) .