The displacement of the interfering light waves are `y_1 = 4 sin omegat` and `y_2 = 3 sin (omegat + pi//2)`. The amplitude of the resultant wave is

Two sound waves are y = a sin (omegat - kx), y = a cos (omega - kx) . Phase difference between two waves is

Two waves are represented at a certain point by the equation y_1 = 10 sin 2000 pi t and y_2 = 10 sin [ 2000 pi t + (pi//2)] , for the resultant wave

The differential equation obtained by eliminating A and B from y = A cos omega t + B sin omegat is

A progressive wave on a string is represented by the equation y=0.2 a sin ( pi bx - 2 pi kt +(pi)/(6)) . The amplitude of the wave is

In an interference pattern the ratio of the intensity of light at the bright fringe to that at the dark fringe is 9 : 1 . Then the ratio of the amplitudes of the two interfering waves.