Find the displacement equation of the simple harmonic motion obtained by conbining the motions.
`x_(1)=2 "sin "omegat,x_(2)=4 "sin "(omegat+(pi)/(6))`
and `x_(3)=6 "sin" (omegat+(pi)/(3))`

Find the displacement equation of the simple harmonic motion obtained by combining the motion. x_(1) = 2sin omega t , x_(2) = 4sin (omega t + (pi)/(6)) and x_(3) = 6sin (omega t + (pi)/(3))

Find the amplitude of the simple harmonic motion obtasined by combining the motions x_1=(2.0 cm) sinomegat and x_2=(2.0cm)sin(omegat+pi/3)

What is the phase difference between two simple harmonic motions represented by x_(1)=A"sin"(omegat+(pi)/(6)) and x_(2)=A "cos"omegat ?

In the given figure, if i_(1)=3 sin omegat and i_(2)=4 cos omegat, then i_(3) is

The displacement of a particle is repersented by the equation y=sin^(3)omegat . The motion is

The displacement of a particle is represented by the equation y=sin^(3)omegat . The motion is

The instantaneous displacement x of a particle executing simple harmonic motion is given by x=a_1sinomegat+a_2cos(omegat+(pi)/(6)) . The amplitude A of oscillation is given by

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

A particle is subjected to two mutually perpendicular simple harmonic motions such that its X and y coordinates are given by X=2 sin omegat , y=2 sin (omega+(pi)/(4)) The path of the particle will be:

Two particles are executing identical simple harmonic motions described by the equations x_1=acos(omegat+(pi)/(6)) and x_2=acos(omegat+(pi)/(3)) . The minimum interval of time between the particles crossing the respective mean positions is (pi)/(2omega)