Two waves are represented by `y_(1)= a sin (omega t + ( pi)/(6)) and y_(2) = a cos omega t `. What will be their resultant amplitude

when two displacements represented by y_(1) = a sin(omega t) and y_(2) = b cos (omega t) are superimposed the motion is

The displacement of two identical particles executing SHM are represented by equations x_(1) = 4 sin (10t+(pi)/(6)) & x_(2) = 5 cos (omegat) For what value of w , energy of both the particles is same.

Two waves y_(1) =A_(1) sin (omega t - beta _(1)), y_(2)=A_(2) sin (omega t - beta_(2) Superimpose to form a resultant wave whose amplitude is

Equation of motion in the same direction are given by ltbygt y_(1)=2a sin (omega t-kx) and y_(2)=2a sin (omega t-kx - theta ) The amplitude of the medium particle will be

Two parallel S.H.M. s are given by , x _1 = 20 sin (8 (pi) t) and x_2 = 10 sin [8 (pi) t + (pi)/ 6] Find the resultant amplitude and initial phase of resultant S.H.M.

Two particle are executing SHMs .The equations of their motions are y_(1)=10"sin"(omegat+(pi)/(4)) " and "y_(2)=5 "sin"(omegat+(sqrt(3)pi)/(4)) What is the ratio of their amplitudes.

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

Equations of two progressive waves at a certain point in a medium are given by, y_1 =a_1 sin ( omega t+phi _1) and y_ 1 =a_2 sin (omegat+ phi _2) If amplitude and time period of resultant wave formed by the superposition of these two waves is same as that of both the waves,then phi _ 1-phi _2 is

The amplitude of a wave represented by displacement equation y=(1)/(sqrt(a)) sin omega t +-(1)/(sqrt(b)) cos omega t will be

The displacement of the interfaring light waves are y_1 =4 sin omega t and y_2=3sin (omegat +(pi)/( 2)) What is the amplitude of the resultant wave?