A particle is executing simple harmonic motion given by `x=5sin(4t-(pi)/(6))`. The velocity of the particle when its displacement is 3 units is…………….

The maximum speed and acceleration of a particle executing simple harmonic motion are 10 cm s^-1 and 50 cms^-2. Find the position of the particle when the speed is 8cms^-1.

For a particle executing simple harmonic motion, the acceleration is proportional to

A particle executes simple harmonic motion with a frequency. (f). The frequency with which its kinetic energy oscillates is.

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

A particle executing simple harmonic motion comes to rest at the extreme positions. Is the resultant force on the particle zero at these positions according to Newton's first law?

The equation of a particle executing simple harmonic motion is x=(5m)sin[(pis^-1)t+pi/3]. Write down the amplitude time period and maximum speed. Also find the velocity at t=1s.

The velocity v and displacement x of a particle executing simple harmonic motion are related as v (dv)/(dx)= -omega^2 x . At x=0, v=v_0. Find the velocity v when the displacement becomes x.

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)

For a particle executing simple harmonic motion select correct relation for the acceleration of the particle. Where omega is the angular frequency of the particle.