A linear harmonic oscillator of force constant `2 xx 10^(6)N//m` and amplitude `0.01 m` has a total mechanical energy of `160 J`. Its

A linear harmonic oscillator of force constant 2 xx 10^(6) N //m and amplitude 10 mm has a total mechanical energy is 160 J . Its

A linear harmonic oscillator of force constant 6 xx 10^(5) N/m and amplitude 4cm, has a total energy 600J. Select the correct statement.

A harmonic oscillation of force constant 4xx10^(6) Nm^(-1) and amplitude 0.01 m has total energy 240 J. What is maximum kinetic energy and minimum potential energy?

For the spring pendulum shown in fig. the value of spring constant is 3xx10^4(N)/(m) and amplitude of oscillation is 0.1m . The total mechanical energy of oscillating system is 200 J. Mark out the correct option (s).

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. 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. 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).

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.