The period of a simple pendulum for large deflection angles may be determined from the approximate formula
`T=2pisqrt((l)/(g))(1+(1)/(4)sin^(2)""(alpha_(0))/(2))`
Compare with the result of numerical calculations for the previous problem.

If the length of a simple pendulum is decreased by 2%, find the percentage decrease in its period T, where T = 2pi sqrt((l)/(g))

The periodic time (T) of a simple pendulum of length (L) is given by T=2pisqrt((L)/(g)) . What is the dimensional formula of Tsqrt((g)/(L)) ?

The time period of a simple pendulum of length 1 m is _____ second. ( take pi^(2) = 10.g =10 ms^(-2) )

If the time period of a simple pendulum is T = 2pi sqrt(l//g) , then the fractional error in acceleration due to gravity is

If 'L' is length of sample pendulum and 'g' is acceleration due to gravity then the dimensional formula for ((l)/(g))^(1/2) is same that for

If 'L' is length of simple pendulum and 'g' is acceleration due to gravity then the dimensional formula for (l/g)^(1/2) is same as that for

The l - T^(2) graph of a simple pendulum is an shown in the figure. The time period of the pendulum of length 0.5 mm is

Assertion : If the length of the simple pendulum is equal to the radius of the earth, the period of the pendulum is T=2pisqrt(R//g) Reason : Length of this pendulum is equal to radius of earth.

Time period of a simple pendulum of length L is T_(1) and time period of a uniform rod of the same length L pivoted about an end and oscillating in a vertical plane is T_(2) . Amplitude of osciallations in both the cases is small. Then T_(1)/T_(2) is