two coherent sources of intensities, `l_(2)` and `l_(2)` produce an interference pattern. The maximum intensity in the interference pattern will be

Two coherent sources of intensities I_1 and I_2 produce an interference pattern. The maximum intensity in the interference pattern will be

Two coherent light beams of intensities I and 4I produce interference pattern. The intensity at a point where the phase difference is zero, will b:

Two coherent sources of light of intensity ratio beta produce interference pattern. Prove that in the interferencepattern (I_(max) - I_(min))/(I_(max) + (I_(min))) = (2 sqrt beta)/(1 + beta) where I_(max) and I_(min) are maximum and mininum intensities in the resultant wave.

Two incoherent sources of intensities l and 4l superpose then the resultant intensity is

Two sources with intensity 9 : 4 interfere in a medium. Then find the ratio of maximum to the minimum intensity in the interference pattern.

Two sources with intensity 4I_0 , and 9I_0 , interfere at a point in medium. The minimum intensity would be

The two coherent sources with intensity ratio beta produce interference. The fringe visibility will be

Two coherent sources of different intensities send waves which interfere. The ratio of maximum intensity to the minimum intensity is 25. The intensities of the sources are in the ratio

In Young's double-slit experiment, the intensity at a point P on the screen is half the maximum intensity in the interference pattern. If the wavelength of light used is lambda and d is the distance between the slits, the angular separation between point P and the center of the screen is

Two coherent sources of intensity ratio alpha interfere in interference pattern (I_(max)-I_(min))/(I_(max)+I_(min)) is equal to