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 ?

The acceleration due to gravity at a place is pi^(2)m//s^(2) . Then, the time period of a simple pendulum of length 1 m is

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 with a bob of mass 'm' oscillates from A to C and back to A such that PB is H. If the acceleration due to gravity is 'g' , then the velocity of the bob, as it passes through B, is

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?

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.

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

The length of second 's pendulum on the surface of earth is nearly 1 m . Its length on the surface of moon should be [ Given : acceleration due to gravity (g) on moon is 1/6th of that on the earth 's surface]

A simple pendulum of length 1 m is freely suspended from the ceiling of an elevator. The time period of small oscillations as the elevator moves up with an acceleration of 2m//s^2 is (use g=10 m//s^2 )

A vehicle moves on a horizontal curved road of radius of curvature 50 m, height of centre of gravity 1.5 m, the distance between the two wheels 2 m and acceleration due to gravity 9.8 m//s^2 .Then the maximum velocity with which it can travel on the road will be

Solve the following examples: (numerical problems) A particle of mass 10^(-10) kg moves in a straight line. Figure shows how its speed changes with time. Answer the following questions based on it. Find the momentum of the particle at t=1.85s.