A thin circular ring of mass M is rotating about its axis with a constant angular velocity `omega`. Two objects each of mass m are attached gently to the opposite ends of a diameter of the ring.Then the ring now rotates with an angular velocity

When a circular disc of radius 0.5 m is rotating about its own axis then the direction of its angular momentum is

A body of mass M is rotating about an axis with angular velocity omega . If k is radius of gyration of the body about the given axis, its angular momentum is

A circular disc of radius 20 cm is rotating about its own axis at an angular velocity omega . The angular velocity of a particle 'A' which is at a distance 10 cm from the axis of rotation is

A circular disc of radius R is rotating about its axis through O with uniform angular velocity omegarad//s as shown. The magnitude of velocity of A relative to B is

Auniform disc of mass M and radius R is rotating in a horizontal plane about anaxis perpendicular to its plane with an angular velocity omega . Another disc of mass M/3 and radius R/2 is placed gently on the first disc coaxially. Then final angular velocity of the system is

A body of mass10 kg ismoving in a circle of radius 1 m with an angular velocity of 2 rad/s. The centripetal force is

A thinuniform circular disc of mass M and radius R is rotating in a horizontal plane about an axis passing through its centre and perpendicular to its plane withan angular velocity omega .Another disc of same dimensions but of mass M/4 is placed gently onthe first disc co-axially, then the angular velocity of the system is

A wheel rotates with a constant angular velocity of 300 r.p.m. The angle through which the wheel rotates in one second is

A disc of mass 16 kg and radius 25 cm is rotated about its axis. What torque will increase its angular velocity from 0 to 8pi rad/s in 8 s ?

A disc has mass 'M' and radius 'R'. How much tangential force should be applied to the rim of the disc so as to rotate with angular velocity omega in time 't'?