Three waves due to three coherent sources meet at one point. Their amplitudes are `sqrt2A_0 , 3A_0` and `sqrt2A_0` . Intensity corresponding to `A_0` is `l_0`. Phasse difference between first and second is `45^@`. Path difference between first and third is `lambda/4`. In phase angle, first wave lags behind from the other two waves. Find resultant intensity at this point.

Three waves from three coherent sources meet at some point. Resultant amplitude of each is A_0 . Intensity corresponding to A_0 is I_0 . Phase difference between first wave and second wave is 60^@ . Path difference between first wave and third wave is lambda/3 . The first wave lags behind in phase angle from second and third wave. Find resultant intensity at this point.

Three waves from three coherent sources meet at some point . Resultant amplitude of each is A_0 . Intensity corresponding to A_0 is I_0 . Phase difference between first wave and the second wave is 60^@ . Path difference between first wave and the third wave is lambda/3. The first wave lags behind in phase angle from second and the third wave. Find resultant intensity at this point.

In interference, two individual amplitudes are A_0 each and the intensity is I_0 each. Find resultant amplitude and intensity at a point, where: (a) phase difference between two waves is 60^@ . (b) path difference between two waves is lambda/3 .

Maximum intensity in YDSE is I_0 . Find the intensity at a point on the screen where (a) The phase difference between the two interfering beams is pi/3. (b) the path difference between them is lambda/4 .

Maximum intensity in YDSE is I_0 . Find the intensity at a point on the screen where (a) The phase difference between the two interfering beams is pi/3. (b) the path difference between them is lambda/4 .

Light waves of wavelength 5460 A, emitted by two coherent sources, meet at a point after travelling different paths. The path difference between the two wave trains at that point is 2.1 mum . then phase difference will be ?

The path difference between two interfering waves of equal intensities at a point on the screen is lambda//4 . The ratio of intensity at this point and that at the central fringe will be

The phase difference between two waves reaching a point is (pi)/(2) . What is the resultant amplitude. If the individual amplitude are 3 mm and 4mm ?

It is found that what waves of same intensity from two coherent sources superpose at a certain point, then the resultant intensity is equal to the intensity of one wave only. This means that the phase difference between the two waves at that point is

Three waves of same intensity (I_0) having initial phases 0, pi/4 , - pi/4 rad respectively interfere at a point. Find the resultant Intensity