A particle starts oscillating simple harmonically from its equillibrium position with time period T. Determine ratio of KE and PE of the particle at time t`=(T)/(12)`

A particle starts oscillating simple harmonically from its equilibrium position then, the ratio of kinetic energy and potential energy of the particle at the time T//12 is: (T="time period")

A particle starts oscillating simple harmoniclaly from its equilibrium postion. Then the ratio fo kinetic and potential energy of the principle at time T/12 is ( U_(mean) =0, T= Time period)

If particle is excuting simple harmonic motion with time period T, then the time period of its total mechanical energy is :-

A particle executing simple harmonic motion with time period T. the time period with which its kinetic energy oscillates is

A particle of mass 2 kg moves in simple harmonic motion and its potential energy U varies with position x as shown. The period of oscillation of the particle is

A particle of mass 2 kg moves in simple harmonic motion and its potential energy U varies with position x as shown. The period of oscillation of the particle is

A particle is executing simple harmonic motion with an amplitude A and time period T. The displacement of the particles after 2T period from its initial position is

A particle executes a simple harmonic motion of time period T. Find the time taken by the particle to go directly from its mean position to half the amplitude.

A particle is executing simple harmonic motion with a time period T . At time t=0, it is at its position of equilibium. The kinetice energy -time graph of the particle will look like

A particle performs simple harmonic motion about O with amolitude A and time period T . The magnitude of its acceleration at t=(T)/(8) s after the particle reaches the extreme position would be