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(Redirected from DB (SPL)) Local pressure deviation caused by a sound wave Not to be confused with Sound energy density.
Sound measurements
CharacteristicSymbols
 Sound pressure p, SPL, LPA
 Particle velocity v, SVL
 Particle displacement δ
 Sound intensity I, SIL
 Sound power P, SWL, LWA
 Sound energy W
 Sound energy density w
 Sound exposure E, SEL
 Acoustic impedance Z
 Audio frequency AF
 Transmission loss TL

Sound pressure or acoustic pressure is the local pressure deviation from the ambient (average or equilibrium) atmospheric pressure, caused by a sound wave. In air, sound pressure can be measured using a microphone, and in water with a hydrophone. The SI unit of sound pressure is the pascal (Pa).

Mathematical definition

Sound pressure diagram:
  1. Silence
  2. Audible sound
  3. Atmospheric pressure
  4. Sound pressure

A sound wave in a transmission medium causes a deviation (sound pressure, a dynamic pressure) in the local ambient pressure, a static pressure.

Sound pressure, denoted p, is defined by p total = p stat + p , {\displaystyle p_{\text{total}}=p_{\text{stat}}+p,} where

  • ptotal is the total pressure,
  • pstat is the static pressure.

Sound measurements

Sound intensity

Main article: Sound intensity

In a sound wave, the complementary variable to sound pressure is the particle velocity. Together, they determine the sound intensity of the wave.

Sound intensity, denoted I and measured in W·m in SI units, is defined by I = p v , {\displaystyle \mathbf {I} =p\mathbf {v} ,} where

  • p is the sound pressure,
  • v is the particle velocity.

Acoustic impedance

Main article: Acoustic impedance

Acoustic impedance, denoted Z and measured in Pa·m·s in SI units, is defined by Z ( s ) = p ^ ( s ) Q ^ ( s ) , {\displaystyle Z(s)={\frac {{\hat {p}}(s)}{{\hat {Q}}(s)}},} where

  • p ^ ( s ) {\displaystyle {\hat {p}}(s)} is the Laplace transform of sound pressure,
  • Q ^ ( s ) {\displaystyle {\hat {Q}}(s)} is the Laplace transform of sound volume flow rate.

Specific acoustic impedance, denoted z and measured in Pa·m·s in SI units, is defined by z ( s ) = p ^ ( s ) v ^ ( s ) , {\displaystyle z(s)={\frac {{\hat {p}}(s)}{{\hat {v}}(s)}},} where

  • p ^ ( s ) {\displaystyle {\hat {p}}(s)} is the Laplace transform of sound pressure,
  • v ^ ( s ) {\displaystyle {\hat {v}}(s)} is the Laplace transform of particle velocity.

Particle displacement

Main article: Particle displacement

The particle displacement of a progressive sine wave is given by δ ( r , t ) = δ m cos ( k r ω t + φ δ , 0 ) , {\displaystyle \delta (\mathbf {r} ,t)=\delta _{\text{m}}\cos(\mathbf {k} \cdot \mathbf {r} -\omega t+\varphi _{\delta ,0}),} where

It follows that the particle velocity and the sound pressure along the direction of propagation of the sound wave x are given by v ( r , t ) = δ t ( r , t ) = ω δ m cos ( k r ω t + φ δ , 0 + π 2 ) = v m cos ( k r ω t + φ v , 0 ) , {\displaystyle v(\mathbf {r} ,t)={\frac {\partial \delta }{\partial t}}(\mathbf {r} ,t)=\omega \delta _{\text{m}}\cos \left(\mathbf {k} \cdot \mathbf {r} -\omega t+\varphi _{\delta ,0}+{\frac {\pi }{2}}\right)=v_{\text{m}}\cos(\mathbf {k} \cdot \mathbf {r} -\omega t+\varphi _{v,0}),} p ( r , t ) = ρ c 2 δ x ( r , t ) = ρ c 2 k x δ m cos ( k r ω t + φ δ , 0 + π 2 ) = p m cos ( k r ω t + φ p , 0 ) , {\displaystyle p(\mathbf {r} ,t)=-\rho c^{2}{\frac {\partial \delta }{\partial x}}(\mathbf {r} ,t)=\rho c^{2}k_{x}\delta _{\text{m}}\cos \left(\mathbf {k} \cdot \mathbf {r} -\omega t+\varphi _{\delta ,0}+{\frac {\pi }{2}}\right)=p_{\text{m}}\cos(\mathbf {k} \cdot \mathbf {r} -\omega t+\varphi _{p,0}),} where

  • vm is the amplitude of the particle velocity,
  • φ v , 0 {\displaystyle \varphi _{v,0}} is the phase shift of the particle velocity,
  • pm is the amplitude of the acoustic pressure,
  • φ p , 0 {\displaystyle \varphi _{p,0}} is the phase shift of the acoustic pressure.

Taking the Laplace transforms of v and p with respect to time yields v ^ ( r , s ) = v m s cos φ v , 0 ω sin φ v , 0 s 2 + ω 2 , {\displaystyle {\hat {v}}(\mathbf {r} ,s)=v_{\text{m}}{\frac {s\cos \varphi _{v,0}-\omega \sin \varphi _{v,0}}{s^{2}+\omega ^{2}}},} p ^ ( r , s ) = p m s cos φ p , 0 ω sin φ p , 0 s 2 + ω 2 . {\displaystyle {\hat {p}}(\mathbf {r} ,s)=p_{\text{m}}{\frac {s\cos \varphi _{p,0}-\omega \sin \varphi _{p,0}}{s^{2}+\omega ^{2}}}.}

Since φ v , 0 = φ p , 0 {\displaystyle \varphi _{v,0}=\varphi _{p,0}} , the amplitude of the specific acoustic impedance is given by z m ( r , s ) = | z ( r , s ) | = | p ^ ( r , s ) v ^ ( r , s ) | = p m v m = ρ c 2 k x ω . {\displaystyle z_{\text{m}}(\mathbf {r} ,s)=|z(\mathbf {r} ,s)|=\left|{\frac {{\hat {p}}(\mathbf {r} ,s)}{{\hat {v}}(\mathbf {r} ,s)}}\right|={\frac {p_{\text{m}}}{v_{\text{m}}}}={\frac {\rho c^{2}k_{x}}{\omega }}.}

Consequently, the amplitude of the particle displacement is related to that of the acoustic velocity and the sound pressure by δ m = v m ω , {\displaystyle \delta _{\text{m}}={\frac {v_{\text{m}}}{\omega }},} δ m = p m ω z m ( r , s ) . {\displaystyle \delta _{\text{m}}={\frac {p_{\text{m}}}{\omega z_{\text{m}}(\mathbf {r} ,s)}}.}

Inverse-proportional law

Further information: Inverse-square law

When measuring the sound pressure created by a sound source, it is important to measure the distance from the object as well, since the sound pressure of a spherical sound wave decreases as 1/r from the centre of the sphere (and not as 1/r, like the sound intensity): p ( r ) 1 r . {\displaystyle p(r)\propto {\frac {1}{r}}.}

This relationship is an inverse-proportional law.

If the sound pressure p1 is measured at a distance r1 from the centre of the sphere, the sound pressure p2 at another position r2 can be calculated: p 2 = r 1 r 2 p 1 . {\displaystyle p_{2}={\frac {r_{1}}{r_{2}}}\,p_{1}.}

The inverse-proportional law for sound pressure comes from the inverse-square law for sound intensity: I ( r ) 1 r 2 . {\displaystyle I(r)\propto {\frac {1}{r^{2}}}.} Indeed, I ( r ) = p ( r ) v ( r ) = p ( r ) [ p z 1 ] ( r ) p 2 ( r ) , {\displaystyle I(r)=p(r)v(r)=p(r)\left(r)\propto p^{2}(r),} where

hence the inverse-proportional law: p ( r ) 1 r . {\displaystyle p(r)\propto {\frac {1}{r}}.}

Sound pressure level

For other uses, see Sound level.

Sound pressure level (SPL) or acoustic pressure level (APL) is a logarithmic measure of the effective pressure of a sound relative to a reference value.

Sound pressure level, denoted Lp and measured in dB, is defined by: L p = ln ( p p 0 )   Np = 2 log 10 ( p p 0 )   B = 20 log 10 ( p p 0 )   dB , {\displaystyle L_{p}=\ln \left({\frac {p}{p_{0}}}\right)~{\text{Np}}=2\log _{10}\left({\frac {p}{p_{0}}}\right)~{\text{B}}=20\log _{10}\left({\frac {p}{p_{0}}}\right)~{\text{dB}},} where

  • p is the root mean square sound pressure,
  • p0 is a reference sound pressure,
  • 1 Np is the neper,
  • 1 B = (⁠1/2⁠ ln 10) Np is the bel,
  • 1 dB = (⁠1/20⁠ ln 10) Np is the decibel.

The commonly used reference sound pressure in air is

p0 = 20 μPa,

which is often considered as the threshold of human hearing (roughly the sound of a mosquito flying 3 m away). The proper notations for sound pressure level using this reference are Lp/(20 μPa) or Lp (re 20 μPa), but the suffix notations dB SPL, dB(SPL), dBSPL, or dBSPL are very common, even if they are not accepted by the SI.

Most sound-level measurements will be made relative to this reference, meaning 1 Pa will equal an SPL of 20 log 10 ( 1 2 × 10 5 )   dB 94   dB {\displaystyle 20\log _{10}\left({\frac {1}{2\times 10^{-5}}}\right)~{\text{dB}}\approx 94~{\text{dB}}} . In other media, such as underwater, a reference level of 1 μPa is used. These references are defined in ANSI S1.1-2013.

The main instrument for measuring sound levels in the environment is the sound level meter. Most sound level meters provide readings in A, C, and Z-weighted decibels and must meet international standards such as IEC 61672-2013.

Examples

The lower limit of audibility is defined as SPL of 0 dB, but the upper limit is not as clearly defined. While 1 atm (194 dB peak or 191 dB SPL) is the largest pressure variation an undistorted sound wave can have in Earth's atmosphere (i. e., if the thermodynamic properties of the air are disregarded; in reality, the sound waves become progressively non-linear starting over 150 dB), larger sound waves can be present in other atmospheres or other media, such as underwater or through the Earth.

Equal-loudness contour, showing sound-pressure-vs-frequency at different perceived loudness levels

Ears detect changes in sound pressure. Human hearing does not have a flat spectral sensitivity (frequency response) relative to frequency versus amplitude. Humans do not perceive low- and high-frequency sounds as well as they perceive sounds between 3,000 and 4,000 Hz, as shown in the equal-loudness contour. Because the frequency response of human hearing changes with amplitude, three weightings have been established for measuring sound pressure: A, B and C.

In order to distinguish the different sound measures, a suffix is used: A-weighted sound pressure level is written either as dBA or LA. B-weighted sound pressure level is written either as dBB or LB, and C-weighted sound pressure level is written either as dBC or LC. Unweighted sound pressure level is called "linear sound pressure level" and is often written as dBL or just L. Some sound measuring instruments use the letter "Z" as an indication of linear SPL.

Distance

The distance of the measuring microphone from a sound source is often omitted when SPL measurements are quoted, making the data useless, due to the inherent effect of the inverse proportional law. In the case of ambient environmental measurements of "background" noise, distance need not be quoted, as no single source is present, but when measuring the noise level of a specific piece of equipment, the distance should always be stated. A distance of one metre (1 m) from the source is a frequently used standard distance. Because of the effects of reflected noise within a closed room, the use of an anechoic chamber allows sound to be comparable to measurements made in a free field environment.

According to the inverse proportional law, when sound level Lp1 is measured at a distance r1, the sound level Lp2 at the distance r2 is L p 2 = L p 1 + 20 log 10 ( r 1 r 2 )   dB . {\displaystyle L_{p_{2}}=L_{p_{1}}+20\log _{10}\left({\frac {r_{1}}{r_{2}}}\right)~{\text{dB}}.}

Multiple sources

The formula for the sum of the sound pressure levels of n incoherent radiating sources is L Σ = 10 log 10 ( p 1 2 + p 2 2 + + p n 2 p 0 2 )   dB = 10 log 10 [ ( p 1 p 0 ) 2 + ( p 2 p 0 ) 2 + + ( p n p 0 ) 2 ]   dB . {\displaystyle L_{\Sigma }=10\log _{10}\left({\frac {p_{1}^{2}+p_{2}^{2}+\dots +p_{n}^{2}}{p_{0}^{2}}}\right)~{\text{dB}}=10\log _{10}\left~{\text{dB}}.}

Inserting the formulas ( p i p 0 ) 2 = 10 L i 10   dB , i = 1 , 2 , , n {\displaystyle \left({\frac {p_{i}}{p_{0}}}\right)^{2}=10^{\frac {L_{i}}{10~{\text{dB}}}},\quad i=1,2,\ldots ,n} in the formula for the sum of the sound pressure levels yields L Σ = 10 log 10 ( 10 L 1 10   dB + 10 L 2 10   dB + + 10 L n 10   dB )   dB . {\displaystyle L_{\Sigma }=10\log _{10}\left(10^{\frac {L_{1}}{10~{\text{dB}}}}+10^{\frac {L_{2}}{10~{\text{dB}}}}+\dots +10^{\frac {L_{n}}{10~{\text{dB}}}}\right)~{\text{dB}}.}

Examples of sound pressure

Examples of sound pressure in air at standard atmospheric pressure
Source of sound Distance Sound pressure level
(Pa) (dBSPL)
Shock wave (distorted sound waves > 1 atm; waveform valleys are clipped at zero pressure) >1.01×10 >191
Simple open-ended thermoacoustic device 1.26×10 176
1883 eruption of Krakatoa 165 km 172
.30-06 rifle being fired m to
shooter's side
7.09×10 171
Firecracker 0.5 m 7.09×10 171
Stun grenade Ambient 1.60×10
...8.00×10
158–172
9-inch (23 cm) party balloon inflated to rupture At ear 4.92×10 168
9-inch (23 cm) diameter balloon crushed to rupture At ear 1.79×10 159
9-inch (23 cm) party balloon inflated to rupture 0.5 m 1.42×10 157
9-inch (23 cm) diameter balloon popped with a pin At ear 1.13×10 155
LRAD 1000Xi Long Range Acoustic Device 1 m 8.93×10 153
9-inch (23 cm) party balloon inflated to rupture 1 m 731 151
Jet engine 1 m 632 150
9-inch (23 cm) diameter balloon crushed to rupture 0.95 m 448 147
9-inch (23 cm) diameter balloon popped with a pin 1 m 282.5 143
Loudest human voice 1 inch 110 135
Trumpet 0.5 m 63.2 130
Vuvuzela horn 1 m 20.0 120
Threshold of pain At ear 20–200 120–140
Risk of instantaneous noise-induced hearing loss At ear 20.0 120
Jet engine 100–30 m 6.32–200 110–140
Two-stroke chainsaw 1 m 6.32 110
Jackhammer 1 m 2.00 100
Traffic on a busy roadway (combustion engines) 10 m 0.20–0.63 80–90
Hearing damage (over long-term exposure, need not be continuous) At ear 0.36 85
Passenger car (combustion engine) 10 m 0.02–0.20 60–80
Traffic on a busy roadway (electric vehicles) 10 m 0.20–0.63 65-75
EPA-identified maximum to protect against hearing loss and other disruptive effects from noise, such as sleep disturbance, stress, learning detriment, etc. Ambient 0.06 70
TV (set at home level) 1 m 0.02 60
Normal conversation 1 m 2×10–0.02 40–60
Passenger car (electric) 10 m 0.02–0.20 38-48
Very calm room Ambient 2.00×10
...6.32×10
20–30
Light leaf rustling, calm breathing Ambient 6.32×10 10
Auditory threshold at 1 kHz At ear 2.00×10 0
Anechoic chamber, Orfield Labs, A-weighted Ambient 6.80×10 −9.4
Anechoic chamber, University of Salford, A-weighted Ambient 4.80×10 −12.4
Anechoic chamber, Microsoft, A-weighted Ambient 1.90×10 −20.35
  1. All values listed are the effective sound pressure unless otherwise stated.

See also

  • Acoustics – Branch of physics involving mechanical waves
  • Phon – Logarithmic unit of loudness level
  • Loudness – Subjective perception of sound pressure
  • Sone – Unit of perceived loudness
  • Sound level meter – Device for acoustic measurements
  • Stevens's power law – Empirical relationship between actual and perceived changed intensity of stimulus
  • Weber–Fechner law – Related laws in the field of psychophysics

References

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  3. Longhurst, R. S. (1967). Geometrical and Physical Optics. Norwich: Longmans.
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  8. Thompson, A. and Taylor, B. N. Sec. 8.7: "Logarithmic quantities and units: level, neper, bel", Guide for the Use of the International System of Units (SI) 2008 Edition, NIST Special Publication 811, 2nd printing (November 2008), SP811 PDF.
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  10. "Noise Terms Glossary". Retrieved 2012-10-14.
  11. ^ Self, Douglas (2020-04-17). Small Signal Audio Design. CRC Press. ISBN 978-1-000-05044-8. this limit is reached when the rarefaction creates a vacuum, because you can't have a lower pressure than that. This corresponds to about +194 dB SPL.
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  13. ^ Winer, Ethan (2013). "1". The Audio Expert. New York and London: Focal Press. ISBN 978-0-240-82100-9.
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  15. "Krakatoa Eruption – The Loudest Sound". Brüel & Kjær. Retrieved 2021-03-24. 160 km (99 miles) away from the source, registered a sound pressure level spike of more than 2½ inches of mercury (8.5 kPa), equivalent to 172 decibels.
  16. Winchester, Simon (2003). Krakatoa: The Day the World Exploded, August 27, 1883. Penguin/Viking. p. 218. ISBN 978-0-670-91430-2.
  17. Flamme, Gregory A.; Liebe, Kevin; Wong, Adam (2009). "Estimates of the auditory risk from outdoor impulse noise I: Firecrackers". Noise and Health. 11 (45): 223–230. doi:10.4103/1463-1741.56216. ISSN 1463-1741. PMID 19805932.
  18. Brueck, Scott E.; Kardous, Chuck A.; Oza, Aalok; Murphy, William J. (2014). "NIOSH HHE Report No. 2013-0124-3208. Health hazard evaluation report: measurement of exposure to impulsive noise at indoor and outdoor firing ranges during tactical training exercises" (PDF). Cincinnati, OH: U.S. Department of Health and Human Services, Centers for Disease Control and Prevention, National Institute for Occupational Safety and Health.
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  20. "LRAD Corporation Product Overview for LRAD 1000Xi". Archived from the original on 16 March 2014. Retrieved 29 May 2014.
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  22. Recording Brass & Reeds.
  23. Swanepoel, De Wet; Hall III, James W.; Koekemoer, Dirk (February 2010). "Vuvuzela – good for your team, bad for your ears" (PDF). South African Medical Journal. 100 (4): 99–100. doi:10.7196/samj.3697 (inactive 2024-11-10). hdl:2263/13136. PMID 20459912.{{cite journal}}: CS1 maint: DOI inactive as of November 2024 (link)
  24. Nave, Carl R. (2006). "Threshold of Pain". HyperPhysics. SciLinks. Retrieved 2009-06-16.
  25. Franks, John R.; Stephenson, Mark R.; Merry, Carol J., eds. (June 1996). Preventing Occupational Hearing Loss – A Practical Guide (PDF). National Institute for Occupational Safety and Health. p. 88. Retrieved 2009-07-15.
  26. "Decibel Table – SPL – Loudness Comparison Chart". sengpielaudio. Retrieved 5 Mar 2012.
  27. ^ Hamby, William. "Ultimate Sound Pressure Level Decibel Table". Archived from the original on 2005-10-19.
  28. Nicolas Misdariis, Louis-Ferdinand Pardo (Aug 2017), The sound of silence of electric vehicles – Issues and answers, InterNoise, HAL Open Science, Hong-Kong, China, retrieved May 2, 2024
  29. "EPA Identifies Noise Levels Affecting Health and Welfare" (Press release). Environmental Protection Agency. April 2, 1974. Retrieved March 27, 2017.
  30. Nicolas Misdariis, Louis-Ferdinand Pardo (Aug 2017). "The sound of silence of electric vehicles – Issues and answers". InterNoise, HAL Open Science, Hong-Kong, China. Retrieved May 2, 2024.
  31. "'The Quietest Place on Earth' – Guinness World Records Certificate, 2005" (PDF). Orfield Labs.
  32. Middlemiss, Neil (December 18, 2007). "The Quietest Place on Earth – Orfield Labs". Audio Junkies. Archived from the original on 2010-11-21.
  33. Eustace, Dave. "Anechoic Chamber". University of Salford. Archived from the original on 2019-03-04.
  34. "Microsoft Lab Sets New Record for the World's Quietest Place". 2015-10-02. Retrieved 2016-09-20. The computer company has built an anechoic chamber in which highly sensitive tests reported an average background noise reading of an unimaginably quiet −20.35 dBA (decibels A-weighted).
  35. "Check Out the World's Quietest Room". Microsoft: Inside B87. Retrieved 2016-09-20.
General
  • Beranek, Leo L., Acoustics (1993), Acoustical Society of America, ISBN 0-88318-494-X.
  • Daniel R. Raichel, The Science and Applications of Acoustics (2006), Springer New York, ISBN 1441920803.

External links

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