The total mechanical energy of a hamronic oscillator of amplitude `1m` and force constant `200N//m` is `150J`. Then

The total mechanical energy of a particle performing S.H.M. is 150 J with amplitude 1 m and force constant 200 N/m. Then minimum P.E. is,

Total mechanical energy of an oscillator is 160 J. Its force constant is 200 N/m and amplitude is 1m. Find its {:((1)" "KE_(max),(2)" "KE_(min)),((3)" "PE_(max),(4)" "PE_(min)):}

Calculate the maximum kinetic energy of a linear harmonic oscillator of force constant 12 xx 10^(5) N/m., amplitude 0.05 m.

A linear harmonic oscillator of force constant 10^(6) N//m and amplitude 2 cm has

The potential energy of a harmonic oscillator of mass 2 kg in its mean positioin is 5J. If its total energy is 9J and its amplitude is 0.01m, its period will be

The potential energy of a simple harmonic oscillator of mass 2 kg in its mean position is 5 J. If its total energy is 9 J and its amplitude is 0.01 m, its time period would be

The total energy of simple harmonic oscillator is E and amplitude is 'A'. It the kinetic energy is 3E/4 without altering the amplitude. The displacement of the oscillator is

An oscillating mass spring system has mechanical energy 1 joule, when it has an amplitude 0.1m and maximum speed of 1ms^(-1) . The force constant of the spring is (in Nm^(-1))

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