Two waves `y_1=2 sin omegat` and `y_2=4 sin(omegat + delta)` superimpose. The ratio of the maximum to the minimum intensity of the resultant wave is

Two progressive waves having equation x_(1) = 3 sin omegatau and x_(2) = 4 sin (omegatau + 90^(@)) are superimposed. The amplitude of the resultant wave is

Two waves gives by y_(1)=10sinomegat cm and y_(2)=10sin(omegat+(pi)/(3)) cm are superimposed. What is the amplitude of the resultannt wave?

Two waves of equal frequencies have their amplitude in the ratio of 5:3. They are superimposed on each other. Calculate the ratio of the maximum to minimum intensities of the resultant wave.

two waves y_1 = 10sin(omegat - Kx) m and y_2 = 5sin(omegat - Kx + π/3) m are superimposed. the amplitude of resultant wave is

Two waves represented by y=a" "sin(omegat-kx) and y=a" " sin(omega-kx+(2pi)/(3)) are superposed. What will be the amplitude of the resultant wave?

The equation of two light waves are y_(1)=6cosomegat,y_(2)=8cos (omegat+phi) .The ratio of maximum to minimum intensities produced by the supersposition of these waves will be-