The path difference between the two waves :
`y_1 = a_1 sin (omegat - (2 pi x)/(lambda))` and
`y_2 = a_2 cos (omegat - (2pi x)/(lambda) + phi)` is

The path difference between the two waves y_(1)=a_(1) sin(omega t-(2pi x)/(lambda)) and y(2)=a_(2) cos(omega t-(2pi x)/(lambda)+phi) is

The path difference between the two waves y_(1)=a_(1) sin(omega t-(2pi x)/(lambda)) and y(2)=a_(2) cos(omega t-(2pi x)/(lambda)+phi) is

The phase difference between the waves y=acos(omegat+kx) and y=asin(omegat+kx+(pi)/(2)) is

Find the phase difference betwee the two progressive wave. y_(1)=A sin ((2pi)/(T) t-(2pi)/(lambda) x) and y_(2)=A cos ((2pi)/(T) t-(2pi)/(lambda)x)

Two waves are passing through a region in the same direction at the same time . If the equation of these waves are y_(1) = a sin ( 2pi)/(lambda)( v t - x) and y_(2) = b sin ( 2pi)/( lambda) [( vt - x) + x_(0) ] then the amplitude of the resulting wave for x_(0) = (lambda//2) is

Two waves y_1 = A sin (omegat - kx) and y_2 = A sin (omegat + kx) superimpose to produce a stationary wave, then

Two choherent waves represented by y_1 = A sin ((2pi x_1)/(lamda) - wt + pi/3) " and " y_2 = A sin ((2pi x_2)/(lamda) - wt + pi/6) are superposed. The two waves will produce

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 ?

On the superposition of the two waves given as y_1=A_0 sin( omegat-kx) and y_2=A_0 cos ( omega t -kx+(pi)/6) , the resultant amplitude of oscillations will be

Two SHM's are represented by y = a sin (omegat - kx) and y = b cos (omegat - kx) . The phase difference between the two is :