In interference, two individual amplitudes are 5 units and 3 units. Find
(a)`A_(max)/A_(min)` (b) ` I_(max)/I_(min)` .

Assertion: Ratio of maximum intensity and minimum intensity in interference is 25:1 . The amplitudes ratio of two waves should be 3:2 . Reason: I_(max)/I_(min) = ((A_1+A_2)/(A_1-A_2))^2 .

In interference, I_(max)/I_(min) = alpha , find (a) A_(max)/A_(min) (b) A_1/A_2 (c) I_1/I_2 .

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 coherent sources of intensity ratio beta^2 interfere. Then, the value of (I_(max)- I_(min))//(I_(max)+I_(min)) is

If I_1/I_2 =4 then find the value of (I_max - I_min)/ (I_max+I_min)

If I_1/I_2 =9 then find the value of (I_max - I_min)/ (I_max+I_min) A ̅

If I_1/I_2 =16 then find the value of (I_max - I_min)/ (I_max+I_min)

If I_1/I_2 =25 then find the value of (I_max - I_min)/ (I_max+I_min)

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

The interference pattern is obtained with two coherent light sources of intensity ration n. In the interference pattern, the ratio (I_(max)-I_(min))/(I_(max)+I_(min)) will be