Displacement between maximum potential energy position and maximum kinetic energy position for a particle executing `S.H.M` is

Draw the graph between displacement and kinetic energy for a particle executing SHM.

STATEMENT-1 , The total energy of a particle executing S.H.M( of given amplitude) of depends on the mass of particle but does not depend on its displacement from mean position and STATEMENT -2 : The total energy of a particle executing S.H.M. ismaximum at the mean position.

Draw the graph between displacement and potential energy for a particle executing SHM.

Ratio of kinetic energy at mean position to potential energy at A/2 of a particle performing SHM

Draw the graph between displacement and total energy for a particle executing SHM.

A particle executing SHM has potential energy U_0 sin^2 omegat . The maximum kinetic energy and total energy respectively are

A particle is executing simple harmonic motion (SHM) of amplitude A, along the x-axis, about x = 0. When its potential Energy (PE) equals kinetic energy (KE), the position of the particle will be :

In SHM with amplitude a, the potential energy and kinetic energy are equal to each other as displacement

In SHM , potential energy of a particle at mean position is E_(1) and kinetic enregy is E_(2) , then

A linear harmonic oscillator has a total mechanical energy of 200 J . Potential energy of it at mean position is 50J . Find (i) the maximum kinetic energy, (ii)the minimum potential energy, (iii) the potential energy at extreme positions.