The moment of inertial of a rigid body in terms of its angular momentum L and kinetic energy K is

Two cylinders having radii 2R and R and moment of inertia 4I and I about their central axes are supported by axles perpendicular to their planes. The large cylinder is initially rotating clockwise with angular velocity omega_(0) . The small cylinder is moved to the right until it touches the large cylinder and is caused to rotate by the frictional force between the two. Eventually slipping ceases and the two cylinders rotate at constant rates in opposite directions. During this (A) angular momentum of system is conserved (B) kinetic energy is conserved (C neither the angular momentum nor the kinetic energy is conserved (D) both the angular momentum and kinetic energy are conserved

The moment of inertia (I) and the angular momentum (L) are related by the expression

A particle of mass m has momentum p. Its kinetic energy will be

The angular momentum of body remains conserve if :

By keeping moment of inertia of a body constant, if we double the time period, then angular momentum of body

The dimensions of (angular momentum)/(magnetic moment) are

Derive an expression for the magnetic moment (vec mu) of an electron revolving around the nucleus in termsof its angular momentum (vecl) . What is the direction of the magnetic moment of the electron with respect to its angular momentum?

The ratio of magnetic dipole moment to angular momentum of electron is

Keeping moment of inertia constant, the angular momentum of a body is increased by 20%. The percentage increase in its rotational kinetic energy is