Two simple pendulums of length 5 m and 20 m respectively are given small linear displacement in one direction at the same time . They will again be in phase when the pendulum of shorter length has completedthe number of oscillations are

Two simple pendulums of length 0.5 m and 20 m, respectively are given small linear displacement in one direction at the same time. They will again be in the phase when the pendulum of shorter length has completed oscillations.

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.

A simple pendulum of length l has a maximum angular displacement theta . The maximum kinetic energy of the bob of mass m will be

Two pendulum of time periods 3 s and 7 s respectively start oscillating simultaneously from two opposite extreme positions. After how much time they will be in same phase?

A simple pendulum of length 'L' has mass 'M' and it oscillates freely with amplitude energy is (g = acceleration due to gravity)

Two pendulums start oscillating in the same direction at the same time. Their time periods are 2 s and 1.5 s respectively , then the phase difference between them when the smaller pendulum has completed one vibration , will be

Two pendulum of lengths 1m and 16m are in phase at the mean position at a certain instant of time. If T is the time period of the shorter pendulum, then the minimum time after which they will again be in phase is

A simple pendulum of length 121 cm takes 11/3 minutes to execute 100 oscillations. Then the time that another simple pendulum of length 81 cm takes to execute the same number of oscillations is

Two simple pendulum A and B of lengths 1.69m and 1.44m start swinging at the time from a location where acceleration due to gravity is 10ms^(-1) . Answer the following question. After how much time, the two pendulums will be in phase again ?