A box placed on a smooth inclined plane is free to move. Find the time period of oscillation of the simple pendulum attached to the ceiling of the box.

In a simple pendulum the period of oscillation (T) is related to the length of the pendulum (L) as

If the earth stops rotating then the time period of a simple pendulum at the equator would be

A body of mass 10kg is placed on a smooth inclined plane making an angle of 30^(@) with the horizontal, the component of the force of gravity trying to move the body down the inclined plane is [g=9.8m//s^(2)]

A horizontal rod of mass 10g and length 10cm is placed on a smooth plane inclined at an angle of 60^@ with the horizontal with the length of the rod parallel to the edge of the inclined plane. A uniform magnetic field induction B is applied vertically downwards. If the current through the rod is 1*73ampere , the value of B for which the rod remains stationary on the inclined plane is

The acceleration due to gravity on the surface of moon is 1.7 ms ^-2 . What is the time period of a simple pendulum on the surface of moon if its time period of the surface of earth is 3.5 s ? (g on the surface of the earth is 9.8 ms^-2

A simple pendulum completes 10 oscillations in 25 s. Another simple pendulum completes 11 oscillations in the same time , at the same place. Compare the length of the pendulums.

The period of oscillation of a simple pendulum of constant length at earth surface is T. Its period inside a mine is C

When the length of a simple pendulum is increased by 36 cm, its time period of oscillation is found to increase by 25 %. The initial length of the simple pendulum 1s (Acceleration due to gravity= 9.8ms^(-2) )

The time period of vertical oscillations of a light spring with a load of mass M is T. If another load of mass m is attaches to the load M, the time period of oscillation is doubled. The value of m is