A system shown in the figure consists of a massless pulley, a spring of force constant k displaced vertically downwards from its equilibrium position and released, then the Period of vertical oscillations is

Figure shows a system consisting of a massless pulley, a spring of force constant k and a block of mass m. If the block is slightly displaced vertically down from is equilibrium position and then released, the period of its vertical oscillation is

Figure shows a system consisting of a massles pulley, a spring of force constant k and a block of mass m . If the block is sligthtly displaced vertically down from its equilibrium and released, find the period of its vertical oscillation in cases (a) and (b).

In the following arrangements, bock is slightly displaced vertically down from its equilibrium position and released. Find time period of vertical oscillations. The pulley is light.

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 horizontal rod of mass m=(3k)/(pi^2) kg and length L is pivoted at one end . The rod at the other end is supported by a spring of force constant k. The rod is displaced by a small angle theta from its horizontal equilibrium position and released . The time period (in second) of the subsequent simple harmonic motion is

A block of mass m is connected with two ideal pullies and a massless spring of spring constant K as shown in figure. The block is slightly displaced from its equilibrium position. If the time period of oscillation is mupisqrt(m/K) . Then find the value of mu .

A rectangular tank having base 15 cm xx 20 cm is filled with water (density rho = 1000 kg//m^(3)) up to 20 cm and force constant K = 280 N//m is fixed to the bottom of the tank so that the spring remains vertical. This system is in an elevator moving downwards with acceleration a = 2 m//s^(2) . A cubical block of side l = 10 cm and mass m = 2 kg is gently placed over the spring and released gradually, as shown in the figure. a. Calculate compression of the spring in equilibrium position. b. If the block is slightly pushed down from equilibrium position and released, calculate frequency of its vertical oscillations.

A 5 kg collar is attached to a spring of spring constant 500 N m^(-1) . It slides without friction over a horizontal rod. The collar is displaced from its equilibrium position by 10 cm and released. The time period of oscillation is

Find the time period of mass M when displaced from its equilibrium position and then released for the system shown in figure.

Find the time period of mass M when displaced from its equilibrium position and then released for the system shown in figure.