The total energy of a particle having a displacement x, executing simple harmonic motion is

The velocity of a particle executing simple harmonic motion is

The total energy of a particle, executing simple harmonic motion is. where x is the displacement from the mean position, hence total energy is independent of x.

The total energy of a particle executing simple harmonic motion is

The total meachanical energy of a particle executing simple harmonic motion is E when the displacement is half the amplitude is kinetic energy will be

Consider the following statements. The total energy of a particle executing simple harmonic motion depends on its (1) Amplitude (2) Period (3) Displacement Of these statements

The total energy of a partical executing simple harmonic motion of period 2pi secon is 10,240ert. The displacement of the particle at pi//4 second is 8sqrt(2)cm . Calculate the amplitutde of motion and mass of the particle

While a particle executes linear simple harmonic motion

The potential energy of a particle, executing a simple harmonic motion, at a dis"tan"ce x from the equilibrium position is proportional to

If a body is executing simple harmonic motion, then

The kinetic energy and potential energy of a particle executing simple harmonic motion will be equal, when displacement (amplitude =a ) is