Two beams of light having intensities I and 4I interfere to produce a fringe pattern on a screen. The phase difference between the beams is `(pi)/(2)` at point A and `pi` at point B. Then the difference between the resultant intensities at A and B is

Two beams of ligth having intensities I and 4I interface to produce a fringe pattern on a screen. The phase difference between the beams is (pi)/(2) at point A and pi at point B. Then the difference between the resultant intensities at A and B is

Two beam of light having intensities I and 4I interfere to produce a fringe pattern on a screen. The phase difference between the beams is (pi)/(2) at point A and pi at point B. Then the difference between resultant intensities at A and B is : (2001 , 2M)

Two beams of light having intensities I and 4I interferer to produce a fringe pattern on a screen .the phase difference between the beam is π/2 at a point A and 2π at a point B.Then find out the difference between the resultant intensitites at A and B.

Interference fringes are produced on a screen by using two light sources of intensities / and 9/. The phase difference between the beams pi/2 is at point P and pi at point Q on the screen. The difference between the resultant intensities at point P and Q is

Two coherent sources of light interfere and produce fringe pattern on a screen . For central maximum phase difference between two waves will be

Two beams of light having intensities 9I and 4I interfere to produce fringe pattern on a screen P, Q and R are three points on the screen at which the phase differences between the interfering beams are 30^(@), 45^(@)" and "60^(@) and the intensities are I_(P), I_(Q)" and "I_(R ) respectivley. Arrange the diffrence between the intensities in ascending order

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 .

Two waves having intensity I and 9I produce interference . If the resultant intensity at a point is 7 I , what is the phase difference between the two waves ?

Two waves of intensity I and 9I are superimposed in such a way that resultant Intensity is 7I .Find the phase difference between them ?