The angular speed of a body changes from `omega_1` to `omega_2` without applying a torque but due to change in its moment of inertia. The ratio of radii of gyration in the two cases is :-

The angular velocity of a body is increased from 5 rad/s to 20 rad/s, without applying a torque but by changing its moment of Inertia. What is the relation between the new radius of gyration and the initial radius of gyration?

The angular velocity of a body changes from one revolution per 9 second to 1 revolution per second without applying any torque. The ratio of its radius of gyration in the two cases is

The angular momentum of a rotating body changes from A_(0) to 4 A_(0) in 4 min. The torque acting on the body is

The position of axis of rotation of a body is changed so that its moment of inertia decreases so that its moment of inertia decreases by 36%. The % change in its radius of gyration is

The diameter of a disc is increased by 2% without changing its mass. What is the percentage increase in its moment of inertia about its axis of symmetry?

Two rings having same moment of inertia have their radii in the ratio 1 : 4. Their masses will be in the ratio

A disc is rotating with angular speed omega_(1) . The combined moment of inertia of the disc and its axle is I_(1) . A second disc of moment of inertia I_(2) is dropped on to the first and ends up rotating with it. Find the angular velocity of the combination if the original angular velocity of the upper disc was (a) zero (b) omega_(2) in the same direction as omega_(1) and (c) omega_(2) in a direction opposite to omega_(1) .

If I is the moment of inertial of a disc about an axis passing through its centre then find the change in moment of inertial due to small change in its moment of inertia due to small change in its temperature Delta t . alpha is the coefficient of linear expansion of disc.

A body starts rotating from rest. Due to a torque of 10 N.m, it completes 300 rotations in one minute. Find the moment of inertia of the body.