Find the angular frequency of the small osciallations of the thin sphere of mass M constaining ideal fluid of mass m . The spring has a constant k and sphere executes pure roling.

If the angular frequency of small oscillations of a thin uniform vertical rod of mass m and length l hinged at the point O (Fig.) is sqrt((n)/(l)) , then find n . The force constant for each spring is K//2 and take K = (2mg)/(l) . The springs are of negiligible mass. (g = 10 m//s^(2))

Find the time period of oscillation of block of mass m. Spring, and pulley are ideal. Spring constant is k.

The curve for the moment of inertia of a sphere of constant mass M versus its radius will be:

The angular frequency of the damped oscillator is given by omega=sqrt((k)/(m)-(r^(2))/(4m^(2))) ,where k is the spring constant, m is the mass of the oscillator and r is the damping constant. If the ratio r^(2)//(m k) is 8% ,the change in the time period compared to the undamped oscillator

The frequency of oscillations of a mass m connected horizontally by a spring of spring constant k is 4 HZ. When the spring is replaced by two identical spring as shown in figure. Then the effective frequency is

In the adjoining figure, block A is of mass (m) and block B is of mass2 m. The spring has force constant k. All the surfaces are smooth and the system is released form rest with spring unstretched. .

A block of mass m suspended from a spring of spring constant k . Find the amplitude of S.H.M.

A mass m is placed inside a hollow sphere of mass M as shown in figure. The gravitaional force on mass m is

A solid sphere of mass m rolls down an inclined plane a height h . Find rotational kinetic energy of the sphere.

A sphere of mass M rolls without slipping on rough surface with centre of mass has constant speed v_0 . If its radius is R , then the angular momentum of the sphere about the point of contact is.