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

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.

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).

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

In the figure shown, mass of the plank is m and that of the solid cylinder is 8m. Springs are light. The plank is slightly displaced from equilibrium and then released. Find the period of small oscillations (in seconds) of the plank. There is no slipping at any contact point. The ratio of the mass of the plank adn stiffness of the spring i.e., (m)/(K) = (2)/(pi^(2))

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 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.

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.

Spring mass system is shown in figure. find the time period of vertical oscillations. The system is in vertical plane.