The velocity of a particle in simple harmonic motion at displacement y from mean position is

The velocity of a particle executing simple harmonic motion is

For a particle executing simple harmonic motion, the displacement from the mean position is given by y= a sin (wt ) , where a, w are constants. Find the velocity and acceleration of the particle at any instant t.

In simple harmonic motion,the particle is

The velocity of a particle performing simple harmonic motion, when it passes through its mean position i

A body is executing simple harmonic motion. At a displacement x from mean position, its potential energy is E_(1)=2J and at a displacement y from mean position, its potential energy is E_(2)=8J . The potential energy E at a displacement (x+y) from mean position is

The displacement of a particle in simple harmonic motion in one time period is

Assertion : For a given simple harmonic motion displacement (from the mean position) and acceleration have a constant ratio. Reason : T = 2pi sqrt(|("displacement")/("acceleration")|) .

Assertion : For an oscillating simple pendulum, the tension in the string is maximum at the mean position and minimum at the extreme position. lt brgt Reason : The velocity of oscillating bob in simple harmonic motion is maximum at the mean position.