Two simple harmonic motion `y_(2) A sin omegat` and `y_(2)=A cos omegat` are superimposed on a particle of mass `m`. The total mechanical energy of the particle is:

Two simple harmonic motions y_(1) = Asinomegat and y_(2) = Acos omega t are superimposed on a particle of mass m. The total mechanical energy of the particle is

Two simple harmonic motions y_1=Asinomegat and y_2=Acosomegat are supre imposed on a particle of mass m.

Two waves of equation y_(1)=acos(omegat+kx) and y_(2)=acos(omegat-kx) are superimposed upon each other. They will produce

(a) A particle is subjected to two simple harmonic motions x_1=A_1sin omegat and x_2=A_2 sin (omegat+pi//3) . Find (i) the displacement at t=0 , (ii) the maximum speed of the particle and (iii) the maximum acceleration of the particle. (b) A particle is subjected to two simple harmonic motions, one along the x-axis and the other on a line making an angle of 45^@ with the x-axis. The two motions are given by xy=x_0sinomegat and s=s_0sin omegat Find the amplitude of the resultant motion.

Two simple harmonic motions are given by y_(1)=A_(1)sinomegat andy_(2)=A_(2)sin(omegat+phi) are acting on the particles in the same direction .The resultant motion is S.H.M., its amplitude is

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