An impulse J is applied on a ring of mass m along a line passing through its centre O. the ring is placed on a rough horizontal surface. The linear velocity of centre of ring once it starts rolling without spilling is

An impulse J is applied on a ring of mass m along a line passing through its centre O . The ring is placed on a rough horizontal surface. The linear velocity of centre of ring once it starts rolling without slipping is

For a uniform ring of mass M and radius R at its centre

A uniform thin ring of mass 0.4kg rolls without slipping on a horizontal surface with a linear velocity of 10 cm/s. The kinetic energy of the ring is

A uniformly conducting wire is bent to form a ring of mass 'm' and radius 'r' , and the ring is placed on a rough horizontal surface with its plane horizontal. There exists a uniform and constant horizontal magnetic field of induction B . Now a charge q is passed through the ring in a very small time interval Deltat . As a result the ring ultimately just becomes vertical. Calculate the value of g (acceleration due to gravity) in terms of other given quantities. Assume that friction is sufficient to prevent slipping and ignore any loss in energy.

A thin ring of mass m and radius R is in pure rolling over a horizontal surface. If v_0 is the velocity of the centre of mass of the ring, then the angular momentum of the ring about the point of contact is

The moment of inerta of a ring of mass 1kg about an axis passing through its centre perpendicular to its surface is 4kgm^(2) . Calculate the radius of the ring.

The moment of inerta of a ring of mass 1kg about an axis passing through its centre perpendicular to its surface is 4kgm^(2) . Calculate the radius of the ring.

Calculate the moment of inertia of a ring of mass 2kg and radius 2cm about an axis passing through its centre and perpendicular to its surface.

Calculate the moment of inertia of a ring of mass 2kg and radius 2cm about an axis passing through its centre and perpendicular to its surface.

The moment of inertia of a circular ring of mass 1 kg about an axis passing through its centre and perpendicular to its plane is "4 kg m"^(2) . The diameter of the ring is