Assertion : A uniform disc of radius R is performing impure rolling motion on a rough horizontal plane as shown in figur. After some time the disc comes to rest. It is possible only when `v_(0) = (omega_(0)R)/(2)`

Reason : For a body performing pure rolling motion, the angular momentum uis conserved about any point in space.

An object of mass M and radius R is performing pure rolling motion on a smooth horizontal surface under the action of a constant force F as shown in Fig. The object may be

A uniform disc of radius R is in pure rolling on a fixed horizontal surface with constant speed v_0 as shown in the figure. For what value of theta , speed of point P will be v_0/2√(5+2√3) ? (OP= R/2 and O is the centre of disc)

A disc of mass M and Radius R is rolling with an angular speed omega on the horizontal plane. The magnitude of angular momentum of the disc about origin is:

A disc of radius R is moving on a rough horizontal surface with velocity v and angular speed omega at an instant as shown in figure. Choose the correct statement.

A disc shaped body (having a hole shown in the figure) of mass m=10kg and radius R=10/9m is performing pure rolling motion on a rough horizontal surface. In the figure point O is geometrical center of the disc and at this instant the centre of mass C of the disc is at same horizontal level with O . The radius of gyration of the disc about an axis pasing through C and perpendicular to the plane of the disc is R/2 and at the insant shown the angular velocity of the disc is omega=sqrt(g/R) rad/sec in clockwise sence. g is gravitation acceleration =10m//s^(2) . Find angular acceleation alpha ( in rad//s^(2) ) of the disc at this instant.

a uniform circular disc of radiu8s r placed on a roughn horizontal plane has initial velocity v_(0) and an angul,ar velocity omega_(0) has shown The disc comes to rest after moving some distance in the direction of motion. Then

A disc of mass M and radius R rolls on a horizontal surface and then rolls up an inclined plane as shown in the figure. If the velocity of the disc is v, the height to which the disc will rise will be:

A particle of mass 'm' is attached to the rim of a uniform disc of mass 'm' and radius R. The disc is rolling wihtout slipping on a stationery horizontal surface as shown in the figure. At a particular instant, the particle is at the topmost position and centre of the disc has speed v_(0) amd its angular speed is omega . Choose the correct option (s).

A sphere of mass M and radius r shown in figure slips on a rough horizontal plane. At some instant it has translational velocity V_(0) and rotational velocity about the centre (v_(0))/(2r) . Find the translational velocity after the sphere starts pure rolling. .

A solid spherical ball of radius R collides with a rough horizontal surface as shown in figure. At the time of collision its velocity is v_(0) at an angle theta to the horizontal and angular velocity omega_(0) as shown . After collision, the angular velocity of ball may