A particle is executing SHM, whose equation is given below
`x=A cos (omegat+phi)`. If t=0 , particle is mean position going towards positive x-direction then `phi` is equal to

A particle executes simple harmonic motion with an amplitude of 10 cm and time period 6s. At t=0 it is at position x=5 cm going towards positive x-direction. Write the equation for the displacement x at time t. Find the magnitude of the acceleration of the particle at t=4s.

For a particle executing SHM , the kinetic energy (K) is given by K = K_(0)cos^(2) omegat . The equation for its displacement is

A particle is executing SHM according to the equation x =A cosomegat . Average speed of the particle during the interval 0larrtlarrpi/(6omega)

The displacement-time equation of a particle executing SHM is A-Asin(omegat+phi) . At tme t=0 position of the particle is x= A/2 and it is moving along negative x-direction. Then the angle phi can be

The position of a particle moving along x- axis is given by x=x_0 cos^2(omegat) . Its when it is at mean position is

A particle executes simple harmonic motion of amplitude A along the X-axis. At t=0 the position of the particle is x=A/2 and it moves along the positive x-direction. Find the phase constant delta if the equation is written as x=Asin(omegat+delta)

A particle is executing SHM given by x = A sin (pit + phi) . The initial displacement of particle is 1 cm and its initial velocity is pi cm//sec . Find the amplitude of motion and initial phase of the particle.

A particle is executing SHM according to the equation x = A cos omega t . Average speed of the particle during the interval 0 le t le (pi)/(6omega) is

Two particles are in SHM along same line with same amplitude A and same time period T. At time t=0, particle 1 is at + A/2 and moving towards positive x-axis. At the same time particle 2 is at -A/2 and moving towards negative x-axis. Find the timewhen they will collide.

A particle executes S.H.M with time period 12 s. The time taken by the particle to go directly from its mean position to half its amplitude.