Time period T of a simple pendulum of length l is given by `T=2pisqrt((l)/(g))`. If the length is increased by `2%` then an approximate change in the time period is

The time T of of oscillation of a simple pendulum of length l is given by T=2pisqrt(l/g) . Find the percentage error in T, corresponding to an error of 2% in the value of l.

The period of oscillation T of a simple pendulum of length l is connected by the relation T = 2pi sqrt((i)/(g)) , where g is a constant. Find approximately the percentage error in the computed value of T correspounding to an error of 1% in the value of l.

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) .

Time period of a simple pendulum is 2 s. If its length is doubled, then the new time period will be

What is the time period of a simple pendulum of effective length 60 cm? g=980cm*s^(-2) .