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

The velocity of the particle performing simple harmonic motion, when it passes through the mean position is

The phase of a particle executing simple harmonic motion is pi/2 when it has

Define linear simple harmonic motion.

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

If the displacement (x) and velocity (v) of a particle executing simple harmonic motion are related through the expression 4v^2=25-x^2 , then its time period is given by

A particle performing uniform circular motion has

Total energy of a particle performing S H M is 25 J. when particle is passing through the mean position, its velocity is (Given mass of the particle is 0.5 kg)

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

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 velocity of a particle executing a simple hannonic motion is 13 ms^(-1) . when its distance from the equi librium positfon (Q) is 3 m and its velociry is 12 ms^(-1) . when it is 5 m away from Q. The frequency of the simple hannonic motion is