Assertion The total kinetic energy of a rolling solid sphere is the sum of translational and rotationla kinetic energies .
Reason For all solid bodies. Totla kinetic energy is always twice of translational kinetic energy.

The ratio rotational and translational kinetic energies of a sphere is

Assertion: A solid sphere and a hollow sphere are rolling on ground with same total kinetic energies. if translational kinetic energy of solid sphere is K, then translational kinetic energy of follow sphere should be greater than K. Reason: In case of hollow sphere rotational kinetic energy is less than its translational kinetic energy.

At a given temperature, rotational kinetic energy of diatomic gas is K_(0) . Find its translational and total kinetic energy.

The translational kinetic energy of an ideal gas depends only its

Kinetic energy of molecules is highest in

A small steel sphere of mass m and radius r rolls without slipping on the fiictionless surface of a large hemisphere of radius R {R gt gt r) whose axis of symmetry is vertical. It starts at the top from the rest, (a) What is the kinetic energy at the bottom ? (b) What fraction is the rotational kinetic energy of the total kinetic energy ? (c) What fraction is the rotational kinetic energy of the total kinetic energy? (d) What fraction is the translational kinetic energy of the total kinetic energy?

A disc is rolling on a surface without slipping. What is the ratio of its translational to rotational kinetic energies ?

If kinetic energy of a body is increasing then.

If a sphere is rolling, the ratio of the translation energy to total kinetic energy is given by

A ring is rolling without slipping. The ratio of translational kinetic energy to rotational kinetic energy is