Answer:
a) f = 3400 Hz , b) f5 = 17000 Hz , c) speed is much higher and the frequency is directly proportional to the speed so the frequency increases
Explanation:
The resonance in a system with one end closed and the other open, we can find it because in the closed points we have nodes and in the open parts we have a maximum, so for this system we have the following resonances
4L = λ fundamental
4L = 3 λ₃ third harmonic
4L = 5 λ₅ fifth harmonic
4L = (2n + 1)λ general with n = 1, 2,3,
a) the speed of the wave is
v = λ f
f = v /λ
λ₁ = 4L / 1
λ₁ = 4 0.025 m
λ₁ = 0.1 m
f = 340 / 0.1
f = 3400 Hz
b) the second resonance occurs for n = 5
λ₅ = 4 0.025 / 5
λ₅ = 0.02 m
f5 = 340 / 0.02
f5 = 17000 Hz
c) if the channel is full of water the speed of sound is v = 1436 m / s
Since the speed is much higher and the frequency is directly proportional to the speed so the frequency increases
d) The intensity is defined
I = P / A
P = I A
P = 4.10-6 210.10-3
P = 840 10-9 W
e) the intensity is β₁ = 110 if it is reduced by a factor of 3, Δβ = 110/3 = 36.67 f
The intensity of the system is now β₂ = 110 - 36.67 = 73.33
We can calculate what the intensity reduction is
β1 = 10 log (I1 / Io)
β2 = 10 log (I2 / Io)
β1 - β 2 = 10 [log (I1 / Io) - log (I2 / Io))
β1 -β2 = 10 log (I1 / I2)
I1 / I2 = 10 (β1-β2) / 10
Calculous
I1-I2 = 10 (36.67 / 10)
I1 / I2 = 4645
I2 = 1/4645 I1
