Thanks.
That has helped my thinking....
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I have another thought... A very long pipe with a speaker at one end, and pressure sensors along its length.
For a given wavelength, pressure sensor should detect a minimum at 1/4 wavelength.
-perhaps?
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The reason for my question is I'm studying the inner ear.
Von Bekesey's theory, simply, is thus:
the (dead) cochlea is a 32mm long tapered tube divided along almost its entire lenth by the Basilar Membrane.
Sound enters and travels along the top fluid filled chamber. The compression travels a distance dependant on frequency, takes a short-cut accross the Basilar membrane, and returns along the lower fluid-filled chamber.
The distance travelled is short for high frequencies and long for low frequencies.
..I cant see any physical reason for this.
An earlier, similar theory by Helmholtz proposed that cross sections of the membrane under different tensions like resonating guitar strings. This turned out to be wrong, but at least he had some physics that I recognise there.
If it worked like my proposed tube, I calclate the cochlea would have to be 1/4 wavelength long, sveral metres for the lowest notes.
...The point of max distortion of the Basilar membrane is independant of how loud the sound is.
I cant find any physics, resonance or otherwise that explains this simple mechanical frequency analyser.
(In the live cochlea, the accuracy is thought to be refined by the electromechanical action of the muscle-like outer hair cells)
I'm aware of complex mathematical models by people like Lighthill, but I don't think a model explains or justifies the physics. (I could write a mathematical formula for the height of a flying pig!)
I'm starting to doubt the truth of von Bekesey's theory for which he received a nobel prize!
Cheers
Tony
