When a sonnd wave reflects from a hard surface the pressure is doubled. See
the Kundt's tube.
So the "negative waves" coming back out of the hole are close to 200 %.
Probably simmilar like the E-traps. For the both the interference works.
S*

The reason that you are confused is because you are thinking in terms of
percent absorption without either defining or thinking about what you
really mean by 100% absorption.

The proper path toward underatnding this this apparent paradox is to
consider absorbed power which depends on "absorption area" which is
different than the physical area. The absorbed power equals the incident
intensity (incident power per unit physical area) times the absorption
area. When one calculates the power that is absorbed by a reasonator
having an area A at the opening, the result is that the absorption area can
easily be two orders of magnitude (100x) greater than the physical area A
of the opening.

http://books.google.com/books?id=ysznrLBo5OMC&pg=PA109&lpg=PA109
&dq=sound++absorption+cross-section+helmholtz&source=bl&ots=cPbujMkwV3
&sig=mIerdI4QZk892gjJLxmmQAy90xs&hl=en&ei=gWcAS9vSM4ncsgPe_ISICw&sa=X&oi=bo
ok_result&ct=result&resnum=10&ved=0CC8Q6AEwCQ#v=onepage&q=sound%20%
20absorption%20cross-section%20helmholtz&f=false

I am beginning to wonder if this is a troll. But in case you really don't
know, there is a fundamental difference between absorption and cancellation.
With absorption, the energy in the sound wave is converted to heat. With
cancellation it is not, so there is no loss of energy. So generally, if a
sound is cancelled in one place, it will be increased in another place.
For an explanation of the "magic" absorption that seems more than is
possible from the hole area, look at Fahy, "Foundations of Engineering
Acoustics" page 175.
My last word to you is: diffraction.

I agree with the others that this doesn't make sense. A bass trap MUST
absorb in order to reduce modal ringing decay times. Otherwise it does
only half the job.

--Ethan

Yes, it does.

d

When the JASA CD's covering JASA from 1929 forward came available, I
searched for the "shotgun microphone" paper, found it and determined that it
is a bundle of small tubes, quarter-wave resonant in the 1,000 to 2,000 Hz
range, abutting the diaphragm of a condenser microphone. That frequency
range favors human speech intelligibility.

This phenomenon is similar to the "conch shell" effect (sea shell
held by ear amplifies environmental sounds). One of our participants here,
Greg, I believe, managed to measure that effect, noting that it, too was
around 1,500 Hz range, at a level also of about 15 dB.

It's a small world, after all!

What we re seeing here is what I might call "Impedance
amplification", or simply Impedance Matching. The energy if the sound waves
about us is quite enough to stimulate our hearing cells, but it can be in
such a form that it is not immediately detectable. Sound in water vs. sound
in air is a good example of that fact. Our ear system makes use of that
fact. The hair cells are in a liquid medium of density near 1.0, while sound
critical to our existence propagates through air whose density is only
1/1,000th of that. The ear drum, and he stapes bone amount to an impedance
matching transformer to purvey sound energy out of air (low impedance) into
the oval window of the stapes into the cochlear fluid (high impedance). Like
any transformer, it has lower and upper cut off frequencies, with 3 dB
points of 500 Hz and about 5,000 Hz (less with NIPTS).

Another story: When swimming underwater to listen to the performance
of the Lubell underwater loudspeaker (http://www.lubell.com/), I found
amazing low frequency response was occurring.. I then realized that the
impedance match (terrible for the air entrained in the ear canal) was really
GOOD for bone conduction;then entire skull sphere being driven as a monopole
vibrator. This bypasses the ear canal and stapes, conducting vibrations into
the stapes itself. The 500 Hz rollover frequency does not apply.

If you ever swim in the field of an underwater loudspeaker -
typically music in a swimming pool - take note that the acoustic pressure
release near the top water surface eliminates most low frequency sound
(sounds "tinny"), while swimming underwater down to the bottom and
especially a corner, full brilliant low frequency sound is heard. This
demonstrates the coupling of water acoustic pressure to the skull (my
interpretation of the facts).

Ange




--- news://freenews.netfront.net/ - complaints: ***@netfront.net ---

On Thu, 31 Dec 2009 08:38:35 -0800 (PST), Ethan Winer
I understand the problem. A trap that covers a large area can be seen
to work - it absorbs the acoustic energy that covers that area. But a
relatively small opening only "sees" a small amount of the energy. My
Yagi analogy fell rather flat, although it did serve to show that a
far greater area can be absorbed than the physical size would suggest.
I'm still trying to rationalize the Helmholz case in my head, to see
if it can exploit the same effect.

d

Based on my understanding of what I have read on antenna theory and the
theory of resonant absorbers, gain is a separate issue that only
complicates one's understanding of the fundamental principles involved with
the absorption of a resonant (Helmholtz) absorber.
The maximum amount of power that a Helmholtz aborber can absorb is 50% of
the power of the incident wave. That occurs when it absorbs as much power
as it re-radiates, which occurs at resonance and when the input impedance
and its radiation impedance of the absorber are equal.