A simple pendulum of length L and mass M is oscillating about a vertical line with angular amplitude `theta`. If for an angular displacement `phi (phi>theta)` the tension in the string is `T_1` and for angular amplitude `theta` the tension is `T_2`, then

A simple pendulum of length L and mass (bob) M is oscillating in a plane about a vertical line between angular limit -phi and +phi . For an angular displacement theta(|theta|ltphi) , the tension in the string and the velocity of the bob are T and V respectively. The following relations hold good under the above conditions:

A simple pendulum of length 1 m with a bob of mass m swings with an angular amplitude 30^(@) . Then (g= 9.8m//s^(2)

A simple pendulum with a bob of mass m swings with an angular amplitude of 40^@ . When its angular displacement is 20^@ , the tension in the string is greater than mg cos 20^@ true false

A simple pendulum with a bob of mass m swings with an angular amplitude of 40^@ . When its angular displacement is 20^@ , the tension in the string is greater than mg cos 20^@

A simple pendulum of mass 'm' , swings with maximum angular displacement of 60^(@) . When its angular displacement is 30^(@) ,the tension in the string is

A simple pendulum of length 'L' has mass 'M' and it oscillates freely with amplitude A, Energy is (g = acceleration due to gravity)

The angular amplitude of a simple pendulum is theta_(0) . The maximum tension in its string will be

The bob of a simple pendulum of length L is released at time t = 0 from a position of small angular displacement theta _ 0 . Its linear displacement at time t is given by :

A simple pendulm has a length L and a bob of mass M. The bob is vibrating with amplitude a .What is the maximum tension in the string?

A simple pendulum swings with angular amplitude theta . The tension in the string when it is vertical is twice the tension in its extreme position. Then, cos theta is equal to