Answer:
0.56*λ = 200º
Explanation:
- In order to know the phase difference between the two sounds detected by the receiver, we need first to know the wavelength of the sound.
- Assuming that the sound wave is a plane wave, there exists a fixed relationship between the speed of sound, the frequency and the wavelength, as follows:
[tex]v =\lambda * f[/tex]
- Assuming v= 343 m/s, and f = 320 Hz, we can find λ, as follows:
[tex]\lambda = \frac{v}{f} = \frac{343 m/s}{320 (1/s)} = 1.08 m[/tex]
- In order to know the phase difference, we need to know the path difference between both sounds, in units of wavelength:
- d = 2.9 m - 2.3 m = 0.6 m
- So, we can the fraction of the wavelength represented by the distance d, as follows:
[tex]\Delta\lambda = \frac{d}{\lambda} =\frac{0.6m}{1.08m} =0.56[/tex]
- As a difference of 1 λ, means that both sounds arrive in phase each other, a difference of 0.56*λ, in degrees, is as follows:
[tex]\Delta\theta = 0.56*360deg = 200 deg[/tex]
