Timeline for Resonant frequencies in air filled closed cylinder

5 events

when toggle format	what		by	license	comment
Jan 31, 2021 at 19:16	comment	added	alephzero		For the OP's situation where the length = diameter, this will give only a small number of the possible resonances. For example, a rectangular box (e.g. a room) with dimensions $x \times y \times z$ has resonances $\dfrac v 2 \sqrt{\left(\dfrac i x\right)^2 + \left(\dfrac j y\right)^2 + \left(\dfrac k z\right)^2}$ for all integers $i. j, k >= 0$, where $v$ is the speed of sound. Similar formulas for a "wide" cylinder are more complicated.
Mar 30, 2019 at 15:14	vote	accept	Becay
Mar 28, 2019 at 19:20	comment	added	Sidharth Giri		Yes, i believe so, also actually this disturbance happens in 3 dimensional space, where the air moves in packets of compression and rarefaction.
Mar 28, 2019 at 9:38	comment	added	Becay		Meaning that the formula can also apply even in three dimensional spaces?
Mar 22, 2019 at 7:24	history	answered	Sidharth Giri	CC BY-SA 4.0