If two simple harmonic motions are given as
`x_(1)=Asin omegat andx_(2)=(A//2)sinomegat+(A//2)cosomegat`, then the ratio of their amplitudes is

Two simple harmonic motions are given by y _(1) = 5 sin ( omegat- pi //3). y_(2) = 5 ( sin omegat+ sqrt(3) cos omegat) . Ratio of their amplitudes is

Two simple harmonic motions are given by y _(1) = 5 sin ( omegat = pi //3). y_(2) = 5 ( sin omegat+ sqrt(3) cos omegat) . Ratio of their amplitudes is

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

Equations y_(1) =A sinomegat and y_(2) = A/2 sin omegat + A/2 cos omega t represent S.H.M. The ratio of the amplitudes of the two motions is

Equations y_(1) A sinomegat and y_(2) = A/2 sin omegat + A/2 cos omega t represent S.H.M. The ratio of the amplitudes of the two motions is

Two sound waves are represented by y_(1)=sinomegat+cosomegat and y_(2)=(sqrt(3))/(2)sinomegat+(1)/(2)cosomegat . The ratio of their amplitude is

The equation of simple harmonic motion of two particle is x_1=A_1" "sin" "omegat and x_2=A_2" "sin(omegat+prop) . If they superimpose, then the amplitude of the resultant S.H.M. will be

The equation of simple harmonic motion of two particle is x_1=A_1" "sin" "omegat and x_2=A_2" "sin(omegat+prop) . If they superimpose, then the amplitude of the resultant S.H.M. will be