Passage I) In simple harmonic motion force acting on a particle is given as `F=-4x`, total mechanical energy of the particle is 10 J and amplitude of oscillations is 2m, At time t=0 acceleration of the particle is `-16m/s^(2)`. Mass of the particle is 0.5 kg.
Potential energy of the particle at mean position is

Passage I) In simple harmonic motion force acting on a particle is given as F=-4x , total mechanical energy of the particle is 10 J and amplitude of oscillations is 2m, At time t=0 acceleration of the particle is -16m/s^(2) . Mass of the particle is 0.5 kg. At x=+1m, potential energy and kinetic energy of the particle are

Passage I) In simple harmonic motion force acting on a particle is given as F=-4x , total mechanical energy of the particle is 10 J and amplitude of oscillations is 2m, At time t=0 acceleration of the particle is -16m/s^(2) . Mass of the particle is 0.5 kg. Displacement time equation equation of the particle is

Force acting on a particle is F=-8x in S.H.M. The amplitude of oscillation is 2 (in m) and mass of the particle is 0.5 kg. The total mechanical energy of the particle is 20 J. Find the potential energy of the particle in mean position (in J).

In simple harmonic motion of a particle, maximum kinetic energy is 40 J and maximum potential energy is 60 J. then

The simple harmonic motion of a particle is given by x = a sin 2 pit . Then, the location of the particle from its mean position at a time 1//8^(th) of second is

The kinetic energy of a particle, executing S.H.M. is 16 J when it is in its mean position. IF the amplitude of oscillation is 25 cm and the mass of the particle is 5.12 Kg, the time period of its oscillations is

Two simple harmonic motions y_(1) = Asinomegat and y_(2) = Acos omega t are superimposed on a particle of mass m. The total mechanical energy of the particle is

Kinetic energy of a particle moving in a straight line varies with time t as K = 4t^(2) . The force acting on the particle

A particle executes simple harmonic motion with an amplitude of 4cm At the mean position the velocity of the particle is 10 cm/s. distance of the particle from the mean position when its speed 5 cm/s is

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