A particle is subjected to SHM as given by equations `x_1 = A_1 sin omegat ` and `x_2 = A_2 sin (omega t + pi//3)`.The maximum acceleration and amplitude of the resultant motion are it `a_("max")` and `A`,respectively , then 

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

x_(1) = 5 sin omega t x_(2) = 5 sin (omega t + 53^(@)) x_(3) = - 10 cos omega t Find amplitude of resultant SHM.

x_(1) = 5 sin omega t x_(2) = 5 sin (omega t + 53^(@)) x_(3) = - 10 cos omega t Find amplitude of resultant SHM.

x_(1) = 5 sin (omegat + 30^(@)) x_(2) = 10 cos (omegat) Find amplitude of resultant SHM .

A particle is subjected to two simple harmonic motions x_1=A_1 sinomegat and x_2=A_2sin(omegat+pi/3) Find a the displacement at t=0, b. the maxmum speed of the particle and c. the maximum acceleration of the particle

x_(1) = 3 sin omega t , x_(2) = 4 cos omega t . Find (i) amplitude of resultant SHM, (ii) equation of the resultant SHM.

x_(1) = 3 sin omega t , x_(2) = 4 cos omega t Find (i) amplitude of resultant SHM, (ii) equation of the resultant SHM.

A partical is subjucted to two simple harmonic motions x_(1) = A_(1) sin omega t and x_(2) = A_(2) sin (omega t + pi//3) Find(a) the displacement at t = 0 , (b) the maximum speed of the partical and ( c) the maximum acceleration of the partical.

x_(1) = 3 sin omega t implies x_(2) = 4 cos omega t . Find (i) amplitude of resultant SHm, (ii) equation of the resultant SHm.

The SHM of a particle is given by the equation x=2 sin omega t + 4 cos omega t . Its amplitude of oscillation is