Equation of two SHM and `y_1 = 10 sin (3 pi t + pi/3)` , `y_2 = 5[ sin(3 pi t) + sqrt(3) cos (3 pi t)]`. Find ratio of amplitude `A_1/A_2`

If two SHMs are represented by equations y_1 = 4 sin[3 pi t + ( pi /3)], y_2 = 4 [sin(3 pi t) + sqrt 3 cos (3 pi t)], then the ratio of their amplitudes is

The equation of displacement of two waves are given as y_(1) = 10 sin( 3 pi t + (pi)/(3)) , y_(2) = 5 [ sin 3 pi t + sqrt(3) cos 3 pi t] Then what is the ratio of their amplitudes

If two SHMs are represented by equations y_(1) = 5 sin (2pi t + pi//6) and y_(2) = 5 [sin (3pi) + sqrt3 cos (3pi t)] . Find the ratio of their amplitudes.

Two simple harmonic motion, are represented by the equations y _(1) = 10 sin ( 3 pi t + (pi)/(3)) y _(2) = 5 ( sin 3 pi t + sqrt3 cos 3 pi t ) Ratio of amplitude of y _(1) to y _(2) = x :1. The value of x is __________

If two SHMs are repersented by y_(1) = 10 sin (4 pi + pi//2) and y_(2) = 5 (sin 2 pi t +sqrt 8 cos 2 pi t) , compare their amplitudes .

If two particles performing SHM, are given by, x_(1)=10 sin[3pi t +(pi//4)] and x_(2)=5[sin 3pi t +sqrt(3) cos 3 pi t] then the ratio of their amplitudes is

If two S.H.M.'s are represented by equation y_(1) = 10 "sin" [3pit+(pi)/(4)] and y_(2) = 5[sin(3pit)+sqrt(3)cos(3pit)] then find the ratio of their amplitudes and phase difference in between them.

Two simple harmonic motions are represented by the equations y_(1) = 10 sin (3pit + (pi)/(4)) and y_(2) = 5 (3 sin 3 pi t+sqrt(3) cos 3 pi t) . Their amplitudes are in the ratio of

The S.H.M.s of two particles are given by y_(1)=10 "sin" [2pi t +(pi)/(6)] " and " y_(2) =5["sin" 2pi t + sqrt(3) "cos" 2 pi t] The ratio of their amplitudes is

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