The time period of a simple pendulum on the surface of the Earth is `T_1` and that on the planet Mars is `T_2`. If `T_2

The time period of a simple pendulum on the surface of the earth is 4s. Its time period on the surface of the moon is

Time period of a simple pendulum inside a satellite orbiting earth is

The period of a simple pendulum on the surface of the earth is 2s. Find its period on the surface of this moon, if the acceleration due to gravity on the moon is one-sixth that on the earth ?

The time period of a simple pendulum of infinite length is (R=radius of earth).

If T_(1) and T_(2) are the time-periods of oscillation of a simple pendulum on the surface of earth (of radius R) and at a depth d, the d is equal to

At what depth from the surface of earth the time period of a simple pendulum is 0.5% more than that on the surface of the Earth? (Radius of earth is 6400 km )

Time period of spring-block system on surface of earth is T_(1) and that of a simple pendulum is T_(2) . At height h = R (the radius of earth) the corresponding values are T'_(1) and T'_(2) then

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 moon if its time period on the earth is 3.5 s ? (g on earth = 9.8 ms^(-2) )

Pertaining to two planets, the ratio of escape velocities from respective surfaces is 1:2 , the ratio of the time period of the same simple pendulum at their respective surfaces is 2:1 (in same order). Then the ratio of their average densities is

If the length of a simple pendulum is equal to the radius of the earth, its time period will be