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 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 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 amplitude of the harmonic motion obtained by combining the motions x_(1) = (2.0 cm) sin omega t and x_(2) = (2.0 cm) sin (omega t + pi//3) .

What is the amplitude of the S.H.M. obtained by combining the motions. x_(1)=4 "sin" omega t cm, " " x_(2)=4 "sin"(omega t + (pi)/(3)) cm

The resultant amplitude due to superposition of three simple harmonic motions x_(1) = 3sin omega t , x_(2) = 5sin (omega t + 37^(@)) and x_(3) = - 15cos omega t is

The resultant amplitude due to superposition of three simple harmonic motions x_(1) = 3sin omega t , x_(2) = 5sin (omega t + 37^(@)) and x_(3) = - 15cos omega t is

Three sinusoidal displacements are applied in X-direction to a point mass in such a way that total displacement is zero and the mass comes to rest. What are the values of B and phi if the equations are x_(1) (t) = A sin 2 omega t x_(2) (t) = A sin (2 omega t + (4pi)/(3)) x_(3) (t) = B sin (2 omega t + phi)

The equations of two SH M's are X_(1) = 4 sin (omega t + pi//2) . X_(2) = 3 sin(omega t + pi)

Find the resultant amplitude of the following simple harmonic equations : x_(1) = 5sin omega t x_(2) = 5 sin (omega t + 53^(@)) x_(3) = - 10 cos omega t