In simple harmonic motion

Define simple harmonic motion ?

(a) Define simple harmonic motion and derive, an expression for the period of simple harmonic motion by reference circle method. (b) Derive an expression for the period of oscillations of a simple pendulum.

A particle performing simple harmonic motion undergoes unitial displacement of (A)/(2) (where A is the amplitude of simple harmonic motion) in 1 s. At t=0 , the particle may be at he extreme position or mean position the time period of the simple harmonic motion can be

A particle executing simple harmonic motion along y -axis has its motion described by the equation y = A sin (omega t )+ B . The amplitude of the simple harmonic motion is

A graph of the square of the velocity against the square of the acceleration of a given simple harmonic motion is

The differential equation of a particle executing simple harmonic motion along y-axis is

The total energy of a particle having a displacement x, executing simple harmonic motion is

The x-t graph of a particle undergoing simple harmonic motion is shown in figure. Acceleration of particle at t = 4//3 s is

The displacement of a particle executing simple harmonic motion is given by y = 4 sin(2t + phi) . The period of oscillation is

The acceleration-displacement (a-X) graph of a particle executing simple harmonic motion is shown in the figure. Find the frequency of oscillation.