A cage of mass M hangs from a light spring of force constant `k`. A body of mass m falls from height h inside the cage and stricks to its floor. The amplitude of oscillations of the cage will be-

The period of oscillation of a mass M, hanging from a spring of force constant k is T. When additional mass m is attached to the spring, the period of oscillation becomes 5T/4. m/M =

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

A box B of mass M hangs from an ideal spring of force constant k. A small particle, also of mass M, is stuck to the ceiling of the box and the system is in equilibrium. The particle gets detached from the ceiling and falls to strike the floor of the box. It takes time t for the particle to hit the floor after it gets detached from the ceiling. The particle, on hitting the floor, sticks to it and the system thereafter oscillates with a time period T. Find the height H of the box if it is given that t=(T)/(6sqrt(2)) . Assume that the floor and ceiling of the box always remian horizontal.

A mass m is suspended from a spring of force constant k and just touches another identical spring fixed to the floor as shown in the fig. The time period of small oscillations is

A spring of force constant 'k' is cut into four equal parts one part is attached with a mass m. The time period of oscillation will be

A block of mass m hangs from a vertical spring of spring constant k. If it is displaced from its equilibrium position, find the time period of oscillations.

A block of mass m initially at rest is dropped from a height h on to a spring of force constant k . the maximum compression in the spring is x then

Two spring of force constants K and 2K are connected a mass m below The frequency of oscillation the mass is

Two masses M and m are suspended together by massless spring of force constant -k. When the masses are in equilibrium, M is removed without disturbing the system. The amplitude of oscillations.