A bob of mass `m` is hanging from a cart of mass `M`. System is relased from rest from the position shown. Find the maximum speed of the cart with respect to ground.

In the situation shown, a pendulum bob of mass m and length L is taken aside and released from rest from the angular position theta as shown. If the mass takes time t to reach the lowest point. Find the magnitude of impulse of tension (in the string) on mass m from time t=0 to t.

If the masses are released from the position shown in figure then the speed of mass m1 just before it strikes the floor is -

A block of mass m is dropped from height h above the ground. Find out the speed of the block when it reaches the ground.

In the figure shown, the cart of mass 6m is initially at rest. A particle of mass m is attached to the end of the light rod which can rotate freely about A. If the rod is released from rest in a horizontal position shown, determine the velocity v_(rel) of the particle with respect to the cart when the rod is vertical. (Assume frictionless surface)

In the figure shown, the cart of mass 6m is initially at rest. A particle of mass in is attached to the end of the light rod which can rotate freely about A . If the rod is released from rest in a horizontal position shown, determine the velocity v_(rel) of the particle with respect to the cart when the rod is vertical.

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.

In the system shown in figure, mass m is released from rest from position A. Suppose potential energy of m at point A with respect to point B is E. Dimensions of m negligible and all surfaces are smooth. When mass reaches at point B.

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