As shown in the figure, a disc of mass m is rolling without slipping with angular velocity `omega`. When it crosses point B disc will be in

A circular disc of mass 0.41 kg and radius 10 m rolls without slipping with a velocity of 2 m/s. The total kinetic energy of disc is

A disc is rolling without slipping with angular velocity omega . P and Q are two points equidistant from the centre C. the order of magnitude fo velocity is

A disc of mass 100 g is rolling without slipping on a horizontal surface with a velocity of 10 cm s^(-1) . Calculate its total energy.

A circular disc of mass 2 kg and radius 10 cm rolls without slipping with a speed 2 m/s. The total kinetic energy of disc is

A disc of mass 2 kg is rolling on a horizontal surface without slipping with a velocity of 0.1 m/s. What is its rotational kinetic energy?

A ring and a disc having the same mass, roll without slipping with the same linear velocity. If the kinetic energy of the ring is 8 j , Find the kinetic energy of disc (in J)

A ring of radius 4a is rigidly fixed in vertical position on a table. A small disc of mass m and radius a is released as shown in the fig. When the disc rolls down, without slipping, to the lowest point of the ring, then its speed will be

A disc of radius R rolls without slipping at speed v along positive x -axis. Velocity of point P at the instant shown in Fig. is

A disc of radius R has a light pole fixed perpendicular to the disc at its periphery whish in turn has a pendulum of legth R attached to its other end as shown in figure. The disc is rotated with a constant angular velocity omega The string is making an angle 45^(@) with the rod. Then the angular velocity omega of disc is