The period of a conical pendulum in terms of its length (l) , semivertical angle `( theta )` and acceleration due to gravity (g) is

If unit of length and time is doubled the numerical value of g (acceleration due to gravity ) will be

The length of a second's pendulum on the earth is L .What would be its length at a planet where the acceleration due g to gravity is (g)/(4) ?

What would be the time period of a seconds pendulum constructed on the earth if it is taken to the surface of the moon. The acceleration due to gravity on the surface of the moon is 1//6g_("earth")

Derive an expression for time period (t) of a simple pendulem, which may depend upon : mass of bob (m), length of pendulum (I) and acceleration due to gravity(g).

The time period of a simple pendulum is given by T = 2pi sqrt((l)/(g)) where 'l' is the length of the pendulum and 'g' is the acceleration due to gravity at that place. (a) Express 'g' in terms of T (b) What is the length of the seconds pendulum ? (Take g = 10 m s^(-2) )