A metal sphere of radius r and specific heat s is rotated about an axis passing through its centre at a speed of n rotations per second. It is suddenly stopped and `50%` of its energy is used in increasing its temperature. Prove that the raise in temperature of the sphere is `(2pi^(2)n^(2)r^(2))/(5s)`.

From a solid sphere of mass M and radius R a cube of maximum possible volume is cut. Moment of inertia of cube about an axis passing through its centre and perpendicular to one of its faces is

What is the moment of inertia of a solid sphere (radius = r mass =m ) about an axis passing through any of its diameters ?

The moment of inertia of a disc is 5 xx 10(-4) kg.m^(2) . It is rotating freely about a vertical axis passing through its centre at a speed of 40 rpm. A piece of wax of mass 20 g is attached at a distance of 8 cm from its centre. Calculate its new speed.

A metallic disc of radius 10 cm is rotating uniformly about a horizontal axis passing through its centre with angular velocity 10 revolution per second. A uniform magnetic field of intensity 10^(-2)T acts along the axis of the disc. Find the potential difference induced between the centre and the rim of the disc.

A metallic disc of radius 10 cm is roatating uniforminty about a horizontal axis passing through its centre with angular velocity 10 revolution per second. A uniform magnetic field of intensity 10^-2 Tesla acts along the axis of the disc. Find the potential difference induced between the centre and the rim, of the disc.

A uniform metallic circurlar disc of mass M and radius R, mounted on frictionless bearings, is rotating at an angular speed omega about an axis passing through its centre and perpendicular to its plane. The temperature of the disc is then increased by Deltat . If alpha is the coefficient of linear expansion of the metal.

A thin rod of length l and mass m per unit length is rotating about an axis passing through the mid-point of its length and perpendicular to it. Prove that its kinetic energy = (1)/(24) m omega^(2)l^(3), omega = angular velocity of the rod.