solid sphere of radius `r` is gently placed on a rough horizontal ground with an initial angular speed `omega_(0)` and no linear velocity. If the coefficient of friction is `mu`, find the time `t` when the slipping stops. in addition state the linear velocity `v` and angular velocity `omega` at the end of slipping

Write the relation between linear velocity (v),angular velocity(omega) and radius of circle(r).

The vector relation between linear velocity vec v ,angular velocity vec omega and radius vector vec r is given by

A solid sphere is projected along an inclined plane according to diagram. If coefficient of friction is mu=0.5 and radius R , then find (a) Time when linear velocity becomes zero (b) Angular velocity at that instant

A solid sphere is projected along an inclined plane according to diagram. If coefficient of friction is mu=0.5 and radius R , then find (a) Time when linear velocity becomes zero (b) Angular velocity at that instant

A disc of radius R rolls on a horizontal ground with linear acceleration a and angular acceleration alpha as shown in Fig. The magnitude of acceleration of point P as shown in the figure at an instant when its linear velocity is v and angular velocity is omega will be a

A ring of radius R rolls on a horizontal ground with linear speed v and angular speed omega . For what value of theta the velocity of point P is in vertical direction (vltRomega) .

A ring of radius R rolls on a horizontal ground with linear speed v and angular speed omega . For what value of theta the velocity of point P is in vertical direction (vltRomega) .

Choose the correct option: A disc of radius R rolls on a horizontal ground with linear acceleration a and angular acceleration alpha as shown in Fig. The magnitude of acceleration of point P as shown in the figure at an instant when its linear velocity is v and angular velocity is omega will be a

A uniform solid sphere of radius r is rolling on a smooth horizontal surface with velocity V and angular velocity omega=(V=omegar) . The sphere collides with a sharp edge on the wall as shown in Fig. The coefficient of friction between the sphere and the edge mu = 1//5 . Just after the collision the angular velocity of the sphere becomes equal to zero. The linear velocity of the sphere just after the collision is equal to