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)

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

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

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

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

The displacement of a particle along the x-axis is given by x = a sin^(2) omega t . The motion of the particle corresponds to

The angular displacement of a particle performing circular motion is theta = (t^3)/60 - t/4 where theta is in radian and 't' is in seconds. Then the angular velocity and angular accleration of the particle at the end of 5 s will be

The displacement of a particle performing S.H.M is x=A" "sin(omegat+prop) . The quantity prop is called

The angular displacement of a particle performing circular motion is theta = (t^3)/60 - t/4 where theta is in radian and 't' is in seconds. Then the acceleration of the particle at the end 10 s will be

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