A simple pendulum performs simple harmonic motion about `x=0` with an amplitude a ans time period T. The speed of the pendulum at `x = (a)/(2)` will be

If a simple pendulum oscillates with an amplitude of 50 mm and time period of 2 sec, then its maximum velocity is

As shown in figure, a simple harmonic motion oscillator having identical four springs has time period

A particle performs simple harmonic mition with amplitude A. Its speed is trebled at the instant that it is at a destance (2A)/3 from equilibrium position. The new amplitude of the motion is:

The mass M shown in the figure oscillates in simple harmonic motion with amplitude A. The amplitude of the point P is

Two particles P and Q start from origin and execute simple harmonic motion along X-axis with same amplitude but with periods 3s and 6s respectively. The ratio of the velocities of P and Q when they meet is

A particle starts performing simple harmonic motion. Its amplitude is A . At one time its speed is half that of the maximum speed. At this moment the displacement is

A simple pendulum attached to the ceiling of a stationary lift has a time period T. The distance y covered by the lift moving upwards varies with time t as y = t^(2) where y is in metres and t in seconds. If g = 10 m//s^(2) , the time period of pendulum will be

A simple harmonic motion is given by the equation x=10cos 10 pit . The phase of S.H.M. after time 2 s is

A simple pendulum has a time period T. If the support and the pendulum fall freely, the time period will be

The time period of a simple pendulum inside a stationary lift is T. If it starts descending with acceleration g/5. the new period of the simple pendulum will be