Home
Class 11
PHYSICS
The ratio of intensities of two waves is...

The ratio of intensities of two waves is 9:16. If these two waves interfere, then determine the ratio of the maximum and minimum possible intensities.

Text Solution

Verified by Experts

The correct Answer is:
A, D
`I_(max)/I_(min) = ((sqrt((I_1//I_2))+1)/(sqrt((I_1//I_2))-1))^(2)`
Promotional Banner

Topper's Solved these Questions

  • SUPERPOSITION OF WAVES

    DC PANDEY|Exercise Exercise 18.2|4 Videos

  • SUPERPOSITION OF WAVES

    DC PANDEY|Exercise Exercise 18.3|5 Videos

  • SUPERPOSITION OF WAVES

    DC PANDEY|Exercise miscellaneous example|7 Videos

  • SOUND WAVES

    DC PANDEY|Exercise Exercise 19.7|4 Videos

  • THERMOMETRY THERMAL EXPANSION AND KINETIC THEORY OF GASES

    DC PANDEY|Exercise Medical entrance gallary|30 Videos

Similar Questions

Explore conceptually related problems

The ratio of intensities of two waves is 9:16. If these two waves interfere, then determine the ration of the maximum and minimum possible intensities.

The intensity ratio of two waves is 9:1 . If they produce interference, the ratio of maximum to minimum intensity will be

The ratio of the intensities of two waves is 16:9 . The ratio of their amplitudes is

If the ratio of the intensities of two waves producing interference is 9:4, then the ratio of the resultant maximum and minimum intensities will be

Ratio of intensity of two waves is 25 : 1 . If interference occurs, then ratio of maximum and minimum intensity should be :

The ratio of intensities of two waves is 9 : 25. What is the ratio of their amplitude ?

If the ratio of the amplitudes of two waves is 4 : 3 , then the ratio of the maximu and minimum intensities is

The ratio of the intensities two waves is 1 : 9 The ratio of their amplitudes is

Intensity of two waves whicch produce interference are 100:1. The ratio of maximum and minimum intensities is

The ratio of intensities of two waves is 9 : 1 When they superimpose, the ratio of maximum to minimum intensity will become :-