The M.I. of a solid sphere of mass'M' and radius 'R' about a tangent in its plane is

The M.I. of solid sphere of mass M and radius R about its diameter is

The M.I. of the solid sphere of density 'p' and radius'R' about an axis passing through its centre is given by

The moment of inertia of a solid sphere of mass M and radius R, about its diameter is (2//5) MR^2 . Its M.I. about parallel axis passing through a point at a distance (R//2) from its centre is

The moment of inertia of a disc about a tangent axis in its plane is

The M.I. of a wheel of mass 8 kg and radius of gyration 25 cm is

If a solid sphere of mass 1kg and radius 3 cm is rotating about an axis passing through its centre with an angular velocity of 50 rad/s, then the kinetic energy of rotation will be

The radius of gyration of a solid sphere about a tangent in its plane is given by

The total energy of rolling ring of mass 'm' and radius 'R' is

If a uniform solid sphere of radius R and mass m rotates about a tangent and has moment of inertia 42 kg m^2 , then the moment of inertia of a solid sphere about an axis passing through its centre and perpendicular to its plane will be

Show that the ratio of radius of gyration of a thin ring about a tangential axis in its plane to its radius of gyration about an axis passing through its Centre and perpendicular to its plane is 1.225