Form the differential equation of simple harmonic motion given by
`x=A cos(nt+alpha)`, where n is fixed and `A, alpha` are parameters.

State the differential equation of angular simple harmonic motion.

The equation of a simple harmonic motion is given by , x=8sin(8pit)+6cos(8pit) . The initial phase angle is

The equation of linear simple harmonic motion is x = 8 cos (12pit) where x is in cm and t is in second. The initial phase angle is

The differential equation of the family of straight line y=mx+(4)/(m) , where m is the parameter, is

The differential equations cos y dx = x dy has solution of the form

Which of the following equation does not represent a simple harmonic motion

The differential equation satistied by the family of curves y=axcos(1/x+b) , where a,b are parameters, is

The displacement of a particle performing simple harmonic motion is given by, x=8" "sin" "omegat+6cos" "omegat , where distance is in cm and time is in second. What is the amplitude of motion?

The total energy of a particle executing simple harmonic motion is (x- displacement)

A simple harmonic motion is given by the equation x=10cos 10 pit . The phase of S.H.M. after time 2 s is