A partical of `mass m = 1 kg` oscillates simple harmonically with angular frequency `1 rad//s`. Find the phase of the partical at `t = 1 s and 2 s`. Start calculating time when the partical moves up passing through the mean position.

Starting from the mean position a body oscillates simple harmonically with a period of 2 s.

A ball hung from a vertical spring oscillates in simple harmonic motion with an angular frequency of 2.6 rad/s and an amplitude of 0.075m. What is the maximum acceleration of the ball?

A particle of mass 1kg is moving about a circle of radius 1m with a speed of 1m//s . Calculate the angular momentum of the particle.

A body is executing simple harmonic motion with an angular frequency s rad/2 . The velocity of the body at 20 mm displacement, when the amplitude of motion is 60 mm , is

A partical excutes SHM with an angular frequency omega = 4 pi rad//s . If it is at its extereme position initially, then find the transition when it is at a distance sqrt2//2 times its amplitude from the mean position.

A body of mass 10 kg is moving in a circle of radian 1 m with an angular velocity of 2 rad//s the centripetal force is

A particle of mass m = 1 kg excutes SHM about mean position O with angular frequency omega = 1.0 rad//s and total energy 2J . x is positive if measured towards right from O . At t = 0 , particle is at O and movel towards right.

A partical of mass 0.2 kg executes simple harmonic motion along a path of length 0.2 m at the rate of 600 oscillations per minute. Assum at t = 0 . The partical start SHM in positive direction. Find the kinetic potential energies in zoules when the displacement is x = A//2 where, A stands for the amplitude.

A partical excutes SHM with amplitude A and angular frequency omega . At an instant the partical is at a distance A//5 from the mean position and is moving away from it. Find the time after which it will come back t this position again and also find the time after which it will pass through the mean position.

A simple harmonic oscillator of angular frequency 2 "rad" s^(-1) is acted upon by an external force F = sint N . If the oscillator is at rest in its equilibrium position at t = 0 , its position at later times is proportional to :-