Time period of a pendulum (T) its length (l), mass of its bob (m) and acceleration due to gravity (g) are related as T = `km^(x)l^(y)g^(z)` where,

Consider a simple pendulum having a bob attached to a string that oscillates under the action of the force of gravity. Suppose that the period of oscillation of the simple pendulum depends on its length (l) , mass of the bob (m) and acceleration due to gravity (g). Derive the expression for its time period using the method of dimensions.

The time period of a simple pendulum is 2 s. The mass of its bob is 10 g and the bob is oscillating with an amplitude of 4 cm. What is the total mechanical energy of the bob?

If a seconds pendulum is taken to the surface of the moon from the earth, its time period would be (acceleration due to gravity on the surface of the moon is 1/6 th that on the earth's surface)

A body of mass m is raised to a height h from a point on the surface of the earth of the earth where the acceleration due to gravity is g. Prove that the loss of weight due to variation of g is (2mgh)/R , where R is the radius of the earth.

The time period of a simple pendulum is T. When the length is increased by 10 cm, its period is T_(1) . When the length is decreased by 10 cm, its period is T_(2) . Prove that the relation between T,T_(1)andT_(2) is T_(1)^(2)+T_(2)^(2)=2T^(2) .

Imagine earth to be a solid sphere of mass M and radius R. If the value of acceleration due to gravity at a depth d below earth's surface is same as its value at a height h above its surface and equal to (g)/(4) (where g is the value of acceleration due to gravity on the surface of earth), the ratio of (h)/(d) will be

What will be the change in the time period of a pendulum if (i) the diameter of the bob is increased (ii) the mass of the bob is increased keeping its diameter constant?