The particle performing S.H.M. with epoch `alpha` displacement of motion is x = A `sin omega t + alpha`.
The term `(omegat+alpha)` is known as

What is the time - period of x = A sin (omega t + alpha) ?

The displacement of a particle performing S.H.M. is given by x=10 "sin"(omega t+ alpha) metre. If the displacement of the particle is 5m, then the phase of S.H.M. is

The epoch of a simple harmonic motion represented by x = sqrt(3)sin omegat + cos omega t m is

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

The motion of a particle in S.H.M. is described by the displacement function, x=Acos(omegat+phi) , If the initial (t=0) position of the particle is 1cm and its initial velocity is omega cm s^(-1) , what are its amplitude and initial phase angle ? The angular frequency of the particle is pis^(-1) . If instead of the cosine function, we choos the sine function to describe the SHM : x=B sin(omegat+alpha) , what are the amlitude and intial phase of the particle with the above intial conditions ?

The displacement of a particle moving in S.H.M. at any instant is given by y = a sin omegat . The accelreation after time t=T/4 os

The displacement of a particle performing a S.H.M. is given by x =12 "cos" (omega t + alpha) cm . If at time t, the displacement of the particle is 6 cm, them the phase of the particle at that instant is

Two simple harmonic motions act on a particle. These harmonic motions are x = A "cos"omegat + delta , y = A "cos"(omegat + alpha) when delta= alpha + (pi)/(2) , the resulting motion is