Two rotating bodies A and B of masses mand 2m with moments of inertia `I_(A)and I_(B)(I_(B)>I_(A))` have equal kinetic energy of rotation. If `L_(A) and L_(B)` be their angular momenta respectively, then

The kinetic energy of rotation K depends on the angular momentum J and moment of inertia I. Find the expression for kinetic energy.

The kinetic energy of rotation K depends on the angular momentum J and moment of inertia I. Find the expression for kinetic energy.

If the moment of inertia of a body is I and its mass be M the, its radius of gyration would be

The moment of inertia of two rotating bodies A and B are 1_(A) and I_(B) (I_(A) > I_(B) and their angular moments are equal. Which one has a greater kinetic energy?

Two bodies of masses m and 4 m are moving with equal kinetic energies. The ratio of their linear momenta is

If two circular discs A and B are of same mass but of radii r and 2r respectively, then the moment of inertia of A is:

A rigid body rotates with an angular momentums L. If its kinetic energy is reduced to one fourth (1/4) their angular momentum becomes:

What is the phenotype of (a) I^(A)I^(O) (b) I^(O)I^(O)

Separation of Motion of a system of particles into motion of the centre of mass and motion about the centre of mass : (a) Show p=p_(i)'+m_(i)V where pi is the momentum of the ith particle (of mass m_(i) ) and p'_(i)=m_(i)v'_(i) . Note v'_(i) is the velocity of the ith particle relative to the centre of mass. Also, prove using the definition of the centre of mass sump'_(i)=O (b) Show K=K'+1//2MV^(2) where K is the total kinetic energy of the system of particles, K′ is the total kinetic energy of the system when the particle velocities are taken with respect to the centre of mass and MV^(2)//2 is the kinetic energy of the translation of the system as a whole (i.e. of the centre of mass motion of the system). The result has been used in Sec. 7.14. (c ) Show L=L'+RxxMV where L'=sumr'_(i)xxp'_(i) is the angular momentum of the system about the centre of mass with velocities taken relative to the centre of mass. Remember – r'_(i)=r_(i)-R , rest of the notation is the standard notation used in the chapter. Note ′ L and MR × V can be said to be angular momenta, respectively, about and of the centre of mass of the system of particles. (d) Show (dL')/(dt)=sumr'_(i)xx(dp')/(dt) Further, show that (dL')/(dt)=tau'_(ext) where tau'_(ext) is the sum of all external torques acting on the system about the centre of mass.