Sound pressure
From Free net encyclopedia
Sound pressure p (or acoustic pressure) is the measurement in pascals of the root mean square (RMS) pressure deviation (from atmospheric pressure) caused by a sound wave passing through a fixed point. The symbol for pressure is the lower case p. The upper case P is the symbol for power. This is often misprinted. The unit is pascal (symbol: Pa) and that is equal to a force F of one newton (1 N) applied over an area A of one square metre (1 m2).
The amplitude of sound pressure from a point source decreases in the free field (direct field) proportional to the inverse of the distance r from that source. That is 1/r and really not squared!
Sound pressure level is a decibel scale based on a reference sound pressure of 20 µPa (micropascals)[Air], calculated in dB as:
- <math>
L_p=20\, \log_{10}\left(\frac{p_1}{p_0}\right)\mathrm{dB} </math>
This is written "dBSPL".
- Reference sound pressure p0 = 2 × 10-5 Pa = 20 µPa [Air]
Sound pressure p in N/m2 or Pa is:
- <math>
p = Zv = \frac{I}{v} = \sqrt{IZ} </math>
- Z: acoustic impedance, sound impedance, or characteristic impedance; Pa·s/m
- v: particle velocity; m/s
- I: acoustic intensity or sound intensity; W/m2
Sound pressure p is connected to particle displacement (or particle amplitude) ξ m, by:
- <math>
\xi = \frac{v}{2 \pi f} = \frac{v}{\omega} = \frac{p}{Z \omega} = \frac{p}{ 2 \pi f Z} </math>
Sound pressure p:
- <math>
p = \rho c \omega \xi = Z \omega \xi = { 2 \pi f \xi Z} = \frac{a Z}{\omega} = c \sqrt{\rho E} = \sqrt{\frac{P_{ac} Z}{A}} </math> normally in units of pascals.
where:
| Symbol | Units | Meaning |
|---|---|---|
| p | Pa | sound pressure |
| f | Hz | frequency |
| ξ | m | particle displacement |
| c | m/s | speed of sound |
| v | m/s | particle velocity |
| ω = 2πf | rad/s | angular frequency |
| ρ | kg/m3 | density of air |
| Z = c · ρ | N·s/m³ | acoustic impedance |
| a | m/s² | particle acceleration |
| I | W/m² | sound intensity |
| E | W·s/m³ | sound energy density |
| Pac | W | sound power or acoustic power |
| A | m² | area |
The distance law for the sound pressure p is inverse-proportional to the distance r of a punctual sound source. This is not like sound intensity which follows the inverse-square law.
- <math>
p \propto \frac{1}{r} </math> (proportional)
- <math>
\frac{p_1} {p_2} = \frac{r_2}{r_1} </math>
- <math>
p_1 = p_{2} \cdot r_{2} \cdot \frac{1}{r_1} </math>
Note: The often used term "intensity of sound pressure" is nonsensical. Use "magnitude", "strength", "amplitude", or "level" instead. "Sound intensity" is sound power per unit area, while "pressure" is a measure of force per unit area. Intensity is not equivalent to pressure.
External links
- Ohm's law of the acoustics - calculations
- Conversion: sound pressure to sound pressure level
- Connection of acoustic sizes for even progressive acoustic wavesde:Schalldruck
es:Presión sonora it:Pressione acustica nl:Geluidsdruk pl:Ciśnienie akustyczne