Speed of light: Difference between revisions

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| caption = On average, [[sunlight]] takes 8{{Nbsp}}minutes and 17{{Nbsp}}seconds to travel from the [[Sun]] to [[Earth]].<!-- (1 AU − 1 solar radius − 1 earth radius)/c = (149597871 − 695500 − 6371)/299792.458 = 496.66 s = 8 min 17 sec -->

| data2 = {{Val|299792458}}

| data5 = {{Val|1080000000}}

| data6 = {{Val|186000}}

| data7 = {{Val|671000000}}

| data8 = 173{{#tag:ref|Exact value: {{Nowrap|({{Val|299792458}} × 60 × 60 × 24 / {{Val|149597870700}}) AU/day}}|group="Note"}}

| data9 = 0.307{{#tag:ref|Exact value: {{Nowrap|({{Val|999992651|end=&nbsp;π}} / {{Val|10246429500}}) pc/y}}|group="Note"}}

| label18 = from [[Sun]] to Earth (1 [[astronomical unit|AU]])

| label22 = from the [[Proxima Centauri|nearest star]] to Sun ({{Nowrap|1.3 {{Abbr|pc|parsec}}}})

| data23 = {{Val|70,000|u=years}}

| data24 = {{Val|87,400|u=years}}

The '''speed of light''' in [[vacuum]], commonly denoted {{Mvar|'''c'''}}, is a universal [[physical constant]] that is exactly equal to {{Convert|299792458|m/s|km/s mi/s e6mph|abbr=off|sigfig=3|disp=x| (approximately }}).{{Refn|group="Note"|It is exact because, by a 1983 international agreement, a [[Metre#Speed of light definition|metre]] is defined as the length of the path travelled by [[light]] in vacuum during a time interval of {{frac|1|{{Val|299792458}}}} [[second]]. This particular value was chosen to provide a more accurate definition of the metre that still agreed as much as possible with the definition used before. See, for example, the [[NIST]] website<ref name="nist-definitions"/> or the explanation by [[Roger Penrose|Penrose]].<ref name="penrose">{{Cite book |last=Penrose |first=R | author-link=Roger Penrose |year=2004 |title=The Road to Reality: A Complete Guide to the Laws of the Universe |pages=[https://archive.org/details/roadtoreality00penr_319/page/n438 410]–411 |publisher=Vintage Books |isbn=978-0-679-77631-4 |quote=...{{Nbsp}}the most accurate standard for the metre is conveniently ''defined'' so that there are exactly {{Val|299792458}} of them to the distance travelled by light in a standard second, giving a value for the metre that very accurately matches the now inadequately precise [[History of the metre#International prototype metre|standard metre rule]] in Paris. |title-link=The Road to Reality: A Complete Guide to the Laws of the Universe }}</ref> The second is, in turn, defined to be the length of time occupied by {{Val|9192631770|u=cycles}} of the radiation emitted by a [[caesium]]-133 [[atom]] in a transition between two specified [[energy level|energy states]].<ref name="nist-definitions">{{Cite web |url=https://physics.nist.gov/cuu/Units/current.html |title=Definitions of the SI base units |website=physics.nist.gov |date=29 May 2019 |access-date=8 February 2022}}</ref>}} According to the [[special relativity|special theory of relativity]], {{Mvar|c}} is the upper limit for the speed at which conventional [[matter]] or [[energy]] (and thus any [[signal]] carrying [[information]]) can travel through [[Space#Relativity|space]].<ref>{{cite book |title=Special Relativity and How it Works |author1=Moses Fayngold |edition=illustrated |publisher=John Wiley & Sons |year=2008 |isbn=978-3-527-40607-4 |page=497 |url=https://books.google.com/books?id=Q3egk8Ds6ogC}} [https://books.google.com/books?id=Q3egk8Ds6ogC&pg=PA497 Extract of page 497]</ref><ref>{{cite book |title=Special Relativity |author1=Albert Shadowitz |edition=revised |publisher=Courier Corporation |year=1988 |isbn=978-0-486-65743-1 |page=79 |url=https://books.google.com/books?id=1axfJqUT6R0C}} [https://books.google.com/books?id=1axfJqUT6R0C&pg=PA79 Extract of page 79]</ref><ref>{{Cite journal |last1=Peres |first1=Asher |author-link=Asher Peres |last2=Terno |first2=Daniel R. |date=2004-01-06 |title=Quantum information and relativity theory |url=https://link.aps.org/doi/10.1103/RevModPhys.76.93 |journal=Reviews of Modern Physics |language=en |volume=76 |issue=1 |pages=93–123 |doi=10.1103/RevModPhys.76.93 |arxiv=quant-ph/0212023 |bibcode=2004RvMP...76...93P |s2cid=7481797 |issn=0034-6861}}</ref>

[[Ole Rømer]] first [[Rømer's determination of the speed of light|demonstrated in 1676]] that light does not travel instantaneously by studying the apparent motion of [[Jupiter]]'s moon [[Io (moon)|Io]]. Progressively more accurate measurements of its speed came over the following centuries. In a [[A Dynamical Theory of the Electromagnetic Field|paper]] published in 1865, [[James Clerk Maxwell]] proposed that light was an [[Electromagnetic radiation|electromagnetic wave]] and, therefore, travelled at speed {{Mvar|c}}.<ref>{{Cite web |title=How is the speed of light measured? |url=http://math.ucr.edu/home/baez/physics/Relativity/SpeedOfLight/measure_c.html |url-status=dead |website=The Physics and Relativity FAQ |first=Philip |last=Gibbs |date=1997 |archive-url=https://web.archive.org/web/20150821181850/http://math.ucr.edu/home/baez/physics/Relativity/SpeedOfLight/measure_c.html |archive-date=21 August 2015 }}</ref> In 1905, [[Albert Einstein]] postulated that the speed of light {{Mvar|c}} with respect to any [[inertial frame of reference]] is a constant and is independent of the motion of the light source.<ref name="stachel">{{Cite book |title=Einstein from "B" to "Z" – Volume 9 of Einstein studies |first1=JJ |last1=Stachel |publisher=Springer |year=2002 |isbn=978-0-8176-4143-6 |page=226 |url=https://books.google.com/books?id=OAsQ_hFjhrAC&pg=PA226}}</ref> He explored the consequences of that postulate by deriving the [[theory of relativity]] and, in doing so, showed that the parameter {{Mvar|c}} had relevance outside of the context of light and electromagnetism.

[[Massless particle]]s and [[field (physics)|field]] perturbations, such as [[gravitational wave]]s, also travel at speed {{Mvar|c}} in vacuum. Such particles and waves travel at {{Mvar|c}} regardless of the motion of the source or the inertial reference frame of the [[observer (special relativity)|observer]]. Particles with nonzero [[rest mass]] can be accelerated to approach {{Mvar|c}} but can never reach it, regardless of the frame of reference in which their speed is measured. In the [[theory of relativity]], {{Mvar|c}} interrelates [[spacetime|space and time]] and appears in the famous [[mass–energy equivalence]], {{Math|1=''E'' = ''mc''{{i sup|2}}}}.<ref>See, for example:

The speed at which light propagates through [[Transparency and translucency|transparent materials]], such as glass or air, is less than {{Mvar|c}}; similarly, the speed of [[electromagnetic waves]] in wire cables is slower than {{Mvar|c}}. The ratio between {{Mvar|c}} and the speed {{Mvar|v}} at which light travels in a material is called the [[refractive index]] {{Mvar|n}} of the material ({{Math|1={{Mvar|n}} = {{Sfrac|{{Mvar|c}}|{{Mvar|v}}}}}}). For example, for visible light, the refractive index of glass is typically around 1.5, meaning that light in glass travels at {{Nowrap|{{Sfrac|{{Mvar|c}}|1.5}} ≈ {{Cvt|200000|km/s|mi/s|comma=gaps|sigfig=3}}}}; the [[refractive index of air]] for visible light is about 1.0003, so the speed of light in air is about {{Cvt|{{#expr:299792.458*(1-1/1.0003) round 0}}|km/s|mi/s|comma=gaps|sigfig=2}} slower than {{Mvar|c}}.

==Numerical value, notation, and units==

The speed of light in vacuum is usually denoted by a lowercase {{Math|''c''}}, for "constant" or the Latin {{Lang|la|[[:wikt:celeritas|celeritas]]}} (meaning 'swiftness, celerity'). In 1856, [[Wilhelm Eduard Weber]] and [[Rudolf Kohlrausch]] had used {{Math|''c''}} for a different constant that was later shown to equal {{Radic|2}} times the speed of light in vacuum. Historically, the symbol ''V'' was used as an alternative symbol for the speed of light, introduced by [[James Clerk Maxwell]] in 1865. In 1894, [[Paul Drude]] redefined {{Math|''c''}} with its modern meaning. [[Albert Einstein|Einstein]] used ''V'' in his [[Annus Mirabilis papers|original German-language papers]] on special relativity in 1905<!--, the 1923 English translation of them by Perrett and Jeffery using {{Math|''c''}}-->, but in 1907 he switched to {{Math|''c''}}, which by then had become the standard symbol for the speed of light.<ref name=Yc>

|first=P

|archive-url=https://web.archive.org/web/20100325220247/http://math.ucr.edu/home/baez/physics/Relativity/SpeedOfLight/c.html

|url-status=dead

|last=Mendelson |first=KS

Sometimes {{Math|''c''}} is used for the speed of waves in any material medium, and {{Math|''c''}}₀ for the speed of light in vacuum.<ref name=handbook>See, for example:

|last=Lide |first=DR

|last=Harris |first=JW |year=2002

|last=Whitaker |first=JC

|last=Cohen |first=ER |year=2007

|display-authors=etal}}</ref> This subscripted notation, which is endorsed in official SI literature,<ref name=BIPM_SI_units>{{SIbrochure8th|page=112}}</ref> has the same form as related electromagnetic constants: namely, ''μ''₀ for the [[vacuum permeability]] or magnetic constant, ''ε''₀ for the [[vacuum permittivity]] or electric constant, and ''Z''₀ for the [[impedance of free space]]. This article uses {{Math|''c''}} exclusively for the speed of light in vacuum.

Since 1983, the constant {{Math|''c''}} has been defined in the [[International System of Units]] (SI) as ''exactly'' {{Val|299792458|u=m/s}}; this relationship is used to define the metre as exactly the distance that light travels in vacuum in {{frac|1|{{Val|299792458}}}} of a [[second]]. By using the value of {{Math|''c''}}, as well as an accurate measurement of the [[second]], one can thus establish a standard for the metre.<ref name="fixes">See, for example:

*{{Cite book

|last=Sydenham |first=PH

|quote=...{{Nbsp}}if the speed of light is defined as a fixed number then, in principle, the time standard will serve as the length standard{{Nbsp}}...

*{{Cite web

|publisher=[[National Institute of Standards and Technology|NIST]]

*{{Cite book

|last1=Jespersen |first1=J |last2=Fitz-Randolph |first2=J |last3=Robb |first3=J

}}</ref> As a [[Physical constant#Dimensional and dimensionless physical constants|dimensional physical constant]], the numerical value of {{Math|''c''}} is different for different unit systems. For example, in [[imperial units]], the speed of light is approximately {{Val|186,282}} miles per second,{{#tag:ref|The speed of light in imperial and [[United States customary units]] is based on an [[inch]] of exactly {{Val|2.54|u=cm}} and is exactly

:{{Val|299792458 |u=m/s}} × {{Nowrap|100 {{Sfrac|cm|m}}}} × {{Sfrac|1|2.54}}&nbsp;{{Sfrac|in|cm}}

which is exactly {{Val|186,282}}{{Nbsp}}miles, {{Val|698}}{{Nbsp}}yards, {{Val|2}}{{Nbsp}}feet, and {{Val|5}}{{Nbsp}}{{Sfrac|21|127}}{{Nbsp}}inches per second.|group="Note"|name="imperial"}} or roughly 1 [[Foot (unit)|foot]] per nanosecond.{{#tag:ref|The exact value is {{Sfrac|{{Val|149,896,229}}|{{Val|152,400,000}}}} {{Sfrac|ft|ns}} ≈ 0.98{{Sfrac|ft|ns}}|group="Note"|name="nanosecond"}}<ref>{{Cite book|last=Mermin |first=N. David |url=https://www.worldcat.org/oclc/57283944 |title=It's About Time: Understanding Einstein's Relativity |date=2005 |publisher=Princeton University Press |isbn=0-691-12201-6 |location=Princeton |oclc=57283944 |author-link=N. David Mermin |page=22}}</ref><ref>{{Cite web|url=https://americanhistory.si.edu/collections/search/object/nmah_692464 |title=Nanoseconds Associated with Grace Hopper |website=[[National Museum of American History]] |quote=[[Grace Hopper|Grace Murray Hopper]] (1906–1992), a mathematician who became a naval officer and computer scientist during World War II, started distributing these wire "nanoseconds" in the late 1960s in order to demonstrate how designing smaller components would produce faster computers. |access-date=1 March 2022}}</ref>

In branches of physics in which {{Math|''c''}} appears often, such as in relativity, it is common to use systems of [[natural units]] of measurement or the [[geometrized unit system]] where {{Nowrap|{{Math|''c''}} {{=}} 1}}.<ref name="Lawrie">

|last=Lawrie |first=ID

|last=Hsu |first=L

}}</ref> Using these units, {{Math|''c''}} does not appear explicitly because multiplication or division by{{Nbsp}}1 does not affect the result. Its unit of [[light-second]] per second is still relevant, even if omitted.

==Fundamental role in physics==

|last=Einstein |first=A

|url=http://sedici.unlp.edu.ar/handle/10915/2786

}} English translation: {{Cite web

|last=Perrett |first=W

|translator-last=Jeffery |translator-first=GB

|last1=Hsu |first1=J-P |last2=Zhang |first2=YZ

}}</ref><ref name=Zhang>{{Cite book |last = Zhang

|first = YZ

|first=R

}}</ref><ref>

|last=Sriranjan |first=B

}}</ref> One consequence is that ''c'' is the speed at which all [[massless particle]]s and waves, including light, must travel in vacuum.<ref name=":0">{{Cite book|last1=Ellis|first1=George F. R.|url=https://www.worldcat.org/oclc/44694623|title=Flat and Curved Space-times|last2=Williams|first2=Ruth M.|date=2000|publisher=Oxford University Press|isbn=0-19-850657-0|edition=2nd|location=Oxford|oclc=44694623|author-link=George F. R. Ellis|author-link2=Ruth Margaret Williams |page=12}}</ref>{{#tag:ref|Because [[neutrino]]s have a small but non-zero mass, they travel through empty space [[Measurements of neutrino speed|very slightly more slowly than light]]. However, because they pass through matter much more easily than light does, there are in theory occasions when the neutrino signal from an astronomical event might reach Earth before an optical signal can, like [[supernova]]e.<ref>{{Cite journal|last1=Antonioli|first1=Pietro|last2=Fienberg|first2=Richard Tresch|last3=Fleurot|first3=Fabrice|last4=Fukuda|first4=Yoshiyuki|last5=Fulgione|first5=Walter|last6=Habig|first6=Alec|last7=Heise|first7=Jaret|last8=McDonald|first8=Arthur B|last9=Mills|first9=Corrinne|last10=Namba|first10=Toshio|last11=Robinson|first11=Leif J|display-authors=1|date=2 September 2004|title=SNEWS: the SuperNova Early Warning System|url=https://iopscience.iop.org/article/10.1088/1367-2630/6/1/114|journal=[[New Journal of Physics]]|volume=6|pages=114|doi=10.1088/1367-2630/6/1/114|arxiv=astro-ph/0406214|bibcode=2004NJPh....6..114A|s2cid=119431247|issn=1367-2630}}</ref>|group="Note"}}

[[File:Lorentz factor.svg|thumb|upright|alt=γ starts at&nbsp;1 when&nbsp;v equals zero and stays nearly constant for small v's, then it sharply curves upwards and has a vertical asymptote, diverging to positive infinity as&nbsp;v approaches c. |The [[Lorentz factor]] ''γ'' as a function of velocity. It starts at{{Nbsp}}1 and approaches infinity as ''v'' approaches&nbsp;''c''.]]

Special relativity has many counterintuitive and experimentally verified implications.<ref>{{Cite web

|last1 = Roberts

|first1 = T

|first2 = S

|editor-last = Dlugosz

|editor-first = JM

|access-date = 27 November 2009

|archive-url = https://web.archive.org/web/20091015153529/http://math.ucr.edu/home/baez/physics/Relativity/SR/experiments.html

|url-status=dead

}}</ref> These include the [[Mass–energy equivalence|equivalence of mass and energy]] {{Nowrap|(''E'' {{=}} ''mc''{{i sup|2}})}}, [[length contraction]] (moving objects shorten),{{#tag:ref|Whereas moving objects are ''measured'' to be shorter along the line of relative motion, they are also ''seen'' as being rotated. This effect, known as [[Terrell rotation]], is due to the different times that light from different parts of the object takes to reach the observer.<ref>

|last=Terrell |first=J

|bibcode = 1959PhRv..116.1041T }}</ref><ref>

|last=Penrose |first=R

|bibcode = 1959PCPS...55..137P |s2cid=123023118

}}</ref>|group="Note"}} and [[time dilation]] (moving clocks run more slowly). The factor&nbsp;''γ'' by which lengths contract and times dilate is known as the [[Lorentz factor]] and is given by {{Nowrap|''γ'' {{=}} (1 − ''v''{{i sup|2}}/''c''{{i sup|2}})^−1/2}}, where ''v'' is the speed of the object. The difference of ''γ'' from{{Nbsp}}1 is negligible for speeds much slower than&nbsp;''c'', such as most everyday speeds{{Snd}}in which case special relativity is closely approximated by [[Galilean relativity]]{{Snd}}but it increases at relativistic speeds and diverges to infinity as ''v'' approaches ''c''. For example, a time dilation factor of ''γ''&nbsp;=&nbsp;2 occurs at a relative velocity of 86.6% of the speed of light (''v''&nbsp;=&nbsp;0.866&nbsp;''c''). Similarly, a time dilation factor of ''γ''&nbsp;=&nbsp;10 occurs at 99.5% the speed of light (''v''&nbsp;=&nbsp;0.995&nbsp;''c'').

|first=JB

}}</ref> Lorentz invariance is an almost universal assumption for modern physical theories, such as [[quantum electrodynamics]], [[quantum chromodynamics]], the [[Standard Model]] of [[particle physics]], and [[general relativity]]. As such, the parameter&nbsp;''c'' is ubiquitous in modern physics, appearing in many contexts that are unrelated to light. For example, general relativity predicts that&nbsp;''c'' is also the [[speed of gravity]] and of [[gravitational waves]],<ref name="Hartle">

|first=JB

}}</ref> and observations of gravitational waves have been consistent with this prediction.<ref>See, for example:

* {{Cite journal|last1=Abbott|first1=B.P.|display-authors=etal|year=2017|title=Gravitational Waves and Gamma-Rays from a Binary Neutron Star Merger: GW170817 and GRB 170817A|journal=[[The Astrophysical Journal Letters]]|volume=848|issue=2|page=L13|arxiv=1710.05834|bibcode=2017ApJ...848L..13A|doi=10.3847/2041-8213/aa920c|doi-access=free}}

* {{Cite journal|last1=Cornish|first1=Neil|last2=Blas|first2=Diego|last3=Nardini|first3=Germano|date=18 October 2017|title=Bounding the Speed of Gravity with Gravitational Wave Observations|url=https://link.aps.org/doi/10.1103/PhysRevLett.119.161102|journal=[[Physical Review Letters]]|volume=119|issue=16|pages=161102|doi=10.1103/PhysRevLett.119.161102|pmid=29099221|arxiv=1707.06101|bibcode=2017PhRvL.119p1102C|s2cid=206300556}}

* {{Cite journal|last1=Liu|first1=Xiaoshu|last2=He|first2=Vincent F.|last3=Mikulski|first3=Timothy M.|last4=Palenova|first4=Daria|last5=Williams|first5=Claire E.|last6=Creighton|first6=Jolien|last7=Tasson|first7=Jay D.|date=7 July 2020|title=Measuring the speed of gravitational waves from the first and second observing run of Advanced LIGO and Advanced Virgo|url=https://link.aps.org/doi/10.1103/PhysRevD.102.024028|journal=[[Physical Review D]]|volume=102|issue=2|pages=024028|doi=10.1103/PhysRevD.102.024028|arxiv=2005.03121|bibcode=2020PhRvD.102b4028L|s2cid=220514677}}</ref> In [[non-inertial frame]]s of reference (gravitationally curved spacetime or [[accelerated reference frame]]s), the ''local'' speed of light is constant and equal to&nbsp;''c'', but the speed of light can differ from&nbsp;''c'' when measured from a remote frame of reference, depending on how measurements are extrapolated to the region.<ref name="Gibbs1997" />

|last1=Ellis |first1=GFR |last2=Uzan |first2=J-P

|bibcode = 2005AmJPh..73..240E |s2cid=119530637 }}</ref><ref name=Mota>{{Cite thesis |type=PhD

|last=Mota |first=DF

|bibcode=2004astro.ph..1631M}}</ref> No conclusive evidence for such changes has been found, but they remain the subject of ongoing research.<ref name=Uzan>

|last=Uzan |first=J-P

|bibcode=2003RvMP...75..403U

|s2cid=118684485

}}</ref><ref name=Camelia>

|last=Amelino-Camelia |first=G

|bibcode=2013LRR....16....5A

}}</ref>

It is generally assumed that the speed of light is [[isotropy|isotropic]], meaning that it has the same value regardless of the direction in which it is measured. Observations of the emissions from nuclear [[energy level]]s as a function of the orientation of the emitting [[atomic nucleus|nuclei]] in a magnetic field (see [[Hughes–Drever experiment]]), and of rotating [[optical resonator]]s (see [[Michelson–Morley experiment#Recent experiments|Resonator experiments]]) have put stringent limits on the possible two-way [[anisotropy]].<ref name=Herrmann>{{Cite journal

|last1=Herrmann |first1=S |last2=Senger |first2=A |last3=Möhle |first3=K |last4=Nagel |first4=M |last5=Kovalchuk |first5=EV |last6=Peters |first6=A |display-authors=1

|journal=Physical Review D|volume=80|issue=100|pages=105011|year=2009

|doi=10.1103/PhysRevD.80.105011|arxiv=1002.1284|bibcode = 2009PhRvD..80j5011H |s2cid=118346408 }}</ref><ref name=Lang>{{Cite book

|first=KR |last=Lang

|year=1999}}</ref>

===Upper limit on speeds===

According to special relativity, the energy of an object with [[rest mass]] ''m'' and speed ''v'' is given by {{Nowrap|''γmc''{{i sup|2}}}}, where ''γ'' is the Lorentz factor defined above. When ''v'' is zero, ''γ'' is equal to one, giving rise to the famous {{Nowrap|''E'' {{=}} ''mc''{{i sup|2}}}} formula for mass–energy equivalence. The ''γ'' factor approaches infinity as ''v'' approaches&nbsp;''c'', and it would take an infinite amount of energy to accelerate an object with mass to the speed of light. The speed of light is the upper limit for the speeds of objects with positive rest mass, and individual photons cannot travel faster than the speed of light.<ref>See, for example:

* {{Cite journal |title=Optical Precursor of a Single Photon |author1=Shanchao Zhang |author2=J.F. Chen |author3=Chang Liu |author4=M.M.T. Loy |author5=G.K.L. Wong |author6=Shengwang Du |journal=[[Physical Review Letters]] |volume=106 |issue=243602 |pages=243602 |date=16 June 2011 |doi=10.1103/physrevlett.106.243602|pmid=21770570 |bibcode=2011PhRvL.106x3602Z |url=http://repository.ust.hk/ir/bitstream/1783.1-7246/1/PhysRevLett.106.243602.pdf }}</ref> This is experimentally established in many [[tests of relativistic energy and momentum]].<ref>

|last=Fowler |first=M

* {{Cite journal|last=Fearn|first=H.|date=10 November 2006|title=Dispersion relations and causality: does relativistic causality require that n (ω) → 1 as ω → ∞ ?|url=http://www.tandfonline.com/doi/abs/10.1080/09500340600952085|journal=Journal of Modern Optics|language=en|volume=53|issue=16–17|pages=2569–2581|doi=10.1080/09500340600952085|bibcode=2006JMOp...53.2569F|s2cid=119892992|issn=0950-0340}}

* {{Cite journal|last=Fearn|first=H.|date=May 2007|title=Can light signals travel faster than c in nontrivial vacua in flat space-time? Relativistic causality II|url=http://link.springer.com/10.1134/S1054660X07050155|journal=Laser Physics|language=en|volume=17|issue=5|pages=695–699|doi=10.1134/S1054660X07050155|arxiv=0706.0553|bibcode=2007LaPhy..17..695F|s2cid=61962|issn=1054-660X}}</ref> and it appears the special conditions in which this effect might occur would prevent one from using it to violate causality.<ref>

|last1=Liberati |first1=S |last2=Sonego |first2=S |last3=Visser |first3=M

|bibcode = 2002AnPhy.298..167L |s2cid=48166 }}</ref>|group="Note"}}<ref name="Taylor_p74">

|first1=EF

|first2=JA

|publisher=W.H. Freeman

}}</ref> In such a frame of reference, an "effect" could be observed before its "cause". Such a violation of causality has never been recorded,<ref name=Zhang/> and would lead to [[paradox]]es such as the [[tachyonic antitelephone]].<ref>

|last=Tolman |first=RC

|last=Hecht |first=E

}}</ref> but phase velocity does not determine the velocity at which waves convey information.<ref>{{Cite book

|last=Quimby |first=RS

|last=Wertheim |first=M

|date=20 June 2007

|first=P

|archive-date=10 March 2010

|archive-url=https://web.archive.org/web/20100310205556/http://math.ucr.edu/home/baez/physics/Relativity/SpeedOfLight/FTL.html

|last=Sakurai |first=JJ|author-link=J. J. Sakurai

|editor-last=Tuan |editor-first=SF

|editor-last=Muga |editor-first=JG |editor-last2=Mayato |editor-first2=RS |editor-last3=Egusquiza |editor-first3=IL

|last1=Hernández-Figueroa |first1=HE |last2=Zamboni-Rached |first2=M |last3=Recami |first3=E

|first=K

}} [https://web.archive.org/web/20090325093856/http://bcp.phys.strath.ac.uk/the_group/r/uf/2002-OC-causality.pdf archive]</ref>

|last=Rees |first=M |author-link=Martin Rees

|bibcode = 1966Natur.211..468R |s2cid=41065207

}}</ref> such as the [[relativistic jet]]s of [[radio galaxy|radio galaxies]] and [[quasar]]s. However, these jets are not moving at speeds in excess of the speed of light: the apparent superluminal motion is a [[graphical projection|projection]] effect caused by objects moving near the speed of light and approaching Earth at a small angle to the line of sight: since the light which was emitted when the jet was farther away took longer to reach the Earth, the time between two successive observations corresponds to a longer time between the instants at which the light rays were emitted.<ref>

|last=Chase |first=IP

|last= Harrison |first=ER

==Propagation of light==

|last1=Panofsky |first1=WKH

|last2=Phillips |first2=M

:<math> c =\frac {1}{\sqrt{\varepsilon_0 \mu_0}} \ . </math>

|first=P

|editor-first=S

|archive-url=https://web.archive.org/web/20100402090332/http://math.ucr.edu/home/baez/physics/Relativity/SpeedOfLight/speed_of_light.html

|last=Schaefer |first=BE

|bibcode=1999PhRvL..82.4964S

|s2cid=119339066

|last1=Ellis |first1=J

|last2=Mavromatos |first2=NE

|last3=Nanopoulos |first3=DV

|last4=Sakharov |first4=AS

|s2cid=15388873

|last=Füllekrug |first=M

|bibcode=2004PhRvL..93d3901F

* {{Cite journal|last1=Bartlett|first1=D. J.|last2=Desmond|first2=H.|last3=Ferreira|first3=P. G.|last4=Jasche|first4=J.|date=17 November 2021|title=Constraints on quantum gravity and the photon mass from gamma ray bursts|url=https://link.aps.org/doi/10.1103/PhysRevD.104.103516|journal=[[Physical Review D]]|language=en|volume=104|issue=10|pages=103516|arxiv=2109.07850|bibcode=2021PhRvD.104j3516B|doi=10.1103/PhysRevD.104.103516|s2cid=237532210|issn=2470-0010}}</ref> The limit obtained depends on the model used: if the massive photon is described by [[Proca action|Proca theory]],<ref name="adelberger">{{Cite journal

|last1=Adelberger |first1=E

|last2=Dvali |first2=G

|last3=Gruzinov |first3=A

|s2cid=31249827

}}</ref> the experimental upper bound for its mass is about 10⁻⁵⁷ [[gram]]s;<ref name=Sidharth>

|last=Sidharth |first=BG

}}</ref> if photon mass is generated by a [[Higgs mechanism]], the experimental upper limit is less sharp, {{Nowrap|''m'' ≤ {{Val|e=-14|ul=eV/c2}}}}&nbsp; (roughly 2&nbsp;×&nbsp;10⁻⁴⁷&nbsp;g).<ref name="adelberger" />

Another reason for the speed of light to vary with its frequency would be the failure of special relativity to apply to arbitrarily small scales, as predicted by some proposed theories of [[quantum gravity]]. In 2009, the observation of [[gamma-ray burst]] [[GRB&nbsp;090510]] found no evidence for a dependence of photon speed on energy, supporting tight constraints in specific models of spacetime quantization on how this speed is affected by photon energy for energies approaching the [[Planck scale]].<ref>{{Cite journal

|last=Amelino-Camelia |first=G

|bibcode = 2009Natur.462..291A |s2cid=205051022

}}</ref>

===In a medium===

The phase velocity is important in determining how a light wave travels through a material or from one material to another. It is often represented in terms of a ''refractive index''. The refractive index of a material is defined as the ratio of ''c'' to the phase velocity&nbsp;''v''_p in the material: larger indices of refraction indicate lower speeds. The refractive index of a material may depend on the light's frequency, intensity, [[polarization (waves)|polarization]], or direction of propagation; in many cases, though, it can be treated as a material-dependent constant. The [[refractive index of air]] is approximately 1.0003.<ref name=Podesta>{{Cite book

|last=de Podesta |first=M

}}</ref> Denser media, such as [[Optical properties of water and ice|water]],<ref>{{Cite web

|title=Optical constants of H2O, D2O (Water, heavy water, ice)

|access-date =7 November 2017

}}</ref> [[glass]],<ref>{{Cite web

|access-date =7 November 2017

In transparent materials, the refractive index generally is greater than 1, meaning that the phase velocity is less than ''c''. In other materials, it is possible for the refractive index to become smaller than{{Nbsp}}1 for some frequencies; in some exotic materials it is even possible for the index of refraction to become negative.<ref>{{Cite book

|last=Milonni |first=PW

}}</ref> The requirement that causality is not violated implies that the [[real and imaginary parts]] of the [[dielectric constant]] of any material, corresponding respectively to the index of refraction and to the [[attenuation coefficient]], are linked by the [[Kramers–Kronig relation]]s.<ref>{{Cite journal

|last=Toll |first=JS

|bibcode = 1956PhRv..104.1760T }}</ref><ref>{{Cite book|last=Wolf|first=Emil|url=https://www.worldcat.org/oclc/261134839|title=Selected Works of Emil Wolf: with commentary|date=2001|publisher=World Scientific|isbn=978-981-281-187-5|location=River Edge, N.J.|pages=577–584|chapter=Analyticity, Causality and Dispersion Relations|oclc=261134839|author-link=Emil Wolf}}</ref> In practical terms, this means that in a material with refractive index less than 1, the wave will be absorbed quickly.<ref>{{Cite journal|last1=Libbrecht|first1=K. G.|last2=Libbrecht|first2=M. W.|date=December 2006|title=Interferometric measurement of the resonant absorption and refractive index in rubidium gas|url=https://authors.library.caltech.edu/12639/1/LIBajp06.pdf|journal=American Journal of Physics|language=en|volume=74|issue=12|pages=1055–1060|doi=10.1119/1.2335476|bibcode=2006AmJPh..74.1055L|issn=0002-9505}}</ref>

|last1=Hau |first1=LV |author-link1=Lene Hau

|last2=Harris |first2=SE |author-link2=Stephen E. Harris

|last3=Dutton |first3=Z |author-link3=Zachary Dutton

|last4=Behroozi |first4=CH

|bibcode = 1999Natur.397..594V |s2cid=4423307

}}

|last1=Liu |first1=C |last2=Dutton |first2=Z |author-link2=Zachary Dutton |last3=Behroozi |first3=CH |last4=Hau |first4=LV |author-link4=Lene Hau

|bibcode = 2001Natur.409..490L |s2cid=1894748 |url=http://www.seas.harvard.edu/haulab/publications/pdf/Stopped_Light_2001.pdf }}

|last1=Bajcsy |first1=M |last2=Zibrov |first2=AS |last3=Lukin |first3=MD

|arxiv = quant-ph/0311092 |bibcode = 2003Natur.426..638B |s2cid=4320280 }}

|first=B

|archive-date=5 December 2008

|archive-url=https://web.archive.org/web/20081205051203/http://physicsworld.com/cws/article/news/18724

}}</ref>

|doi=10.1038/35018520|pmid=10917523

}}

|last=Whitehouse |first=D

|title=Beam Smashes Light Barrier

|access-date=9 February 2022

It is possible for a particle to travel through a medium faster than the phase velocity of light in that medium (but still slower than ''c''). When a [[charged particle]] does that in a [[dielectric]] material, the electromagnetic equivalent of a [[shock wave]], known as [[Cherenkov radiation]], is emitted.<ref>{{Cite journal |last=Cherenkov |first=Pavel A. |author-link=Pavel Alekseyevich Cherenkov |year=1934 |title=Видимое свечение чистых жидкостей под действием γ-радиации |trans-title=Visible emission of pure liquids by action of γ radiation |journal=[[Doklady Akademii Nauk SSSR]] |volume=2 |page=451}} Reprinted: {{Cite journal |last=Cherenkov |first=P.A. |date=1967 |title=Видимое свечение чистых жидкостей под действием γ-радиации |trans-title=Visible emission of pure liquids by action of γ radiation |journal=Usp. Fiz. Nauk |volume=93 |issue=10 |page=385 |doi=10.3367/ufnr.0093.196710n.0385}}, and in {{Cite book |title=Pavel Alekseyevich Čerenkov: Chelovek i Otkrytie |trans-title=Pavel Alekseyevich Čerenkov: Man and Discovery |editor1=A.N. Gorbunov |editor2=E.P. Čerenkova |location=Moscow |publisher=Nauka |date=1999 |pages=149–153}}</ref>

==Practical effects of finiteness==

===Small scales===

In [[Computer|computers]], the speed of light imposes a limit on how quickly data can be sent between [[central processing unit|processors]]. If a processor operates at 1{{Nbsp}}[[gigahertz]], a signal can travel only a maximum of about {{Convert|30|cm|ft|0}} in a single clock cycle — in practice, this distance is even shorter since the [[printed circuit board]] refracts and slows down signals. Processors must therefore be placed close to each other, as well as [[Computer memory|memory]] chips, to minimize communication latencies, and care must be exercised when routing wires between them to ensure [[signal integrity]]. If clock frequencies continue to increase, the speed of light may eventually become a limiting factor for the internal design of single [[integrated circuit|chips]].<ref name="processorlimit">{{Cite book

|last=Parhami |first=B

}}</ref><ref name="processorlimit2">{{Cite conference

|first1=D |last1=Imbs

|first2=Michel |last2=Raynal

|year=2009

|conference=10th International Conference, PaCT 2009, Novosibirsk, Russia, 31 August – 4 September 2009

|editor=Malyshkin, V

|publisher=Springer

|isbn=978-3-642-03274-5

|page=26

===Large distances on Earth===

Given that the equatorial circumference of the Earth is about {{Val|40075|u=km}} and that ''c'' is about {{Val|300000|u=km/s}}, the theoretical shortest time for a piece of information to travel half the globe along the surface is about 67 milliseconds. When light is traveling in [[optical fibre]] (a [[Transparency and translucency|transparent material]]) the actual transit time is longer, in part because the speed of light is slower by about 35% in optical fibre, depending on its refractive index ''n''.{{#tag:ref|A typical value for the refractive index of optical fibre is between 1.518 and 1.538.<ref name=Midwinter>{{Cite book

| last = Midwinter |first=JE

}}</ref>|group="Note"}} Straight lines are rare in global communications and the travel time increases when signals pass through electronic switches or signal regenerators.<ref>{{Cite web

|archive-date=2 September 2010

|archive-url=https://web.archive.org/web/20100902224536/http://royal.pingdom.com/2007/06/01/theoretical-vs-real-world-speed-limit-of-ping/

}}</ref>

===Spaceflight and astronomy===

Similarly, communications between the Earth and spacecraft are not instantaneous. There is a brief delay from the source to the receiver, which becomes more noticeable as distances increase. This delay was significant for communications between [[Mission Control Center|ground control]] and [[Apollo 8]] when it became the first crewed spacecraft to orbit the Moon: for every question, the ground control station had to wait at least three&nbsp;seconds for the answer to arrive.<ref>{{Cite web

|access-date = 16 December 2010

|url-status = dead

The communications delay between Earth and [[Mars]] can vary between five and twenty minutes depending upon the relative positions of the two planets. As a consequence of this, if a robot on the surface of Mars were to encounter a problem, its human controllers would not be aware of it until {{Nowrap|5–20 minutes}} later. It would then take a further {{Nowrap|5–20 minutes}} for commands to travel from Earth to Mars.<ref>{{Cite web |url=https://mars.nasa.gov/mars2020/spacecraft/rover/communications/ |website=Mars 2020 Mission Perseverance Rover |title=Communications |publisher=NASA |access-date=14 March 2020}}</ref>

Receiving light and other signals from distant astronomical sources takes much longer. For example, it takes 13&nbsp;billion (13{{E|9}}) years for light to travel to Earth from the faraway galaxies viewed in the [[Hubble Ultra-Deep Field]] images.<ref name=Hubble>{{Cite press release

|title=Hubble Reaches the "Undiscovered Country" of Primeval Galaxies

Astronomical distances are sometimes expressed in [[light-year]]s, especially in [[popular science]] publications and media.<ref>{{Cite web

}}</ref> A light-year is the distance light travels in one [[Julian year (astronomy)|Julian year]], around 9461&nbsp;billion kilometres, 5879&nbsp;billion miles, or 0.3066 [[parsec]]s. In round figures, a light year is nearly 10&nbsp;trillion kilometres or nearly 6&nbsp;trillion miles. [[Proxima Centauri]], the closest star to Earth after the Sun, is around 4.2 light-years away.<ref name=starchild>Further discussion can be found at {{Cite web

===Distance measurement===

[[Radar]] systems measure the distance to a target by the time it takes a radio-wave pulse to return to the radar antenna after being reflected by the target: the distance to the target is half the round-trip [[Radar#Transit time|transit time]] multiplied by the speed of light. A [[Global Positioning System]] (GPS) receiver measures its distance to [[GPS satellites]] based on how long it takes for a radio signal to arrive from each satellite, and from these distances calculates the receiver's position. Because light travels about {{Val|300000|u=kilometres}} ({{Val|186000|u=miles}}) in one second, these measurements of small fractions of a second must be very precise. The [[Lunar Laser Ranging experiment]], [[radar astronomy]] and the [[Deep Space Network]] determine distances to the Moon,<ref name=science265_5171_482>{{Cite journal

|last=Dickey |first=JO

|last=Standish |first=EM

}}</ref> and spacecraft,<ref name=pieee95_11_2202>{{Cite journal

|last1=Berner |first1=JB

|last2=Bryant |first2=SH

|last3=Kinman |first3=PW

|url=https://trs.jpl.nasa.gov/bitstream/2014/40972/1/07-0166.pdf}}</ref> respectively, by measuring round-trip transit times.

==Measurement==

In 1983 the metre was defined as "the length of the path travelled by light in vacuum during a time interval of {{frac|1|{{Val|299792458}}}} of a second",<ref name=Resolution_1/> fixing the value of the speed of light at {{Val|299792458|u=m/s}} by definition, as [[#Increased accuracy of c and redefinition of the metre and second|described below]]. Consequently, accurate measurements of the speed of light yield an accurate realization of the metre rather than an accurate value of ''c''.

===Astronomical measurements===

[[Ole Christensen Rømer]] used an astronomical measurement to make [[Rømer's determination of the speed of light|the first quantitative estimate of the speed of light]] in the year 1676.<ref name=cohen>{{Cite journal

|last=Cohen |first=IB |author-link=I. Bernard Cohen

|hdl=2027/uc1.b4375710

}}</ref><ref name=roemer>

}}<br />Translated in {{Cite journal

}}<br />Reproduced in {{Cite book

|editor1-last=Hutton |editor1-first=C

|editor2-last=Shaw |editor2-first=G

|editor3-last=Pearson |editor3-first=R

|volume=II. From 1673 to 1682| pages=397–398

The account published in ''Journal des sçavans'' was based on a report that Rømer read to the [[French Academy of Sciences]] in November 1676 [[#cohen-1940|(Cohen, 1940, p.&nbsp;346)]].</ref> When measured from Earth, the periods of moons orbiting a distant planet are shorter when the Earth is approaching the planet than when the Earth is receding from it. The difference is small, but the cumulative time becomes significant when measured over months. The distance travelled by light from the planet (or its moon) to Earth is shorter when the Earth is at the point in its orbit that is closest to its planet than when the Earth is at the farthest point in its orbit, the difference in distance being the [[diameter]] of the Earth's orbit around the Sun. The observed change in the moon's orbital period is caused by the difference in the time it takes light to traverse the shorter or longer distance. Rømer observed this effect for [[Jupiter]]'s innermost major moon [[Io (moon)|Io]] and deduced that light takes 22 minutes to cross the diameter of the Earth's orbit.<ref name="cohen" />

Another method is to use the [[aberration of light]], discovered and explained by [[James Bradley]] in the 18th century.<ref name="Bradley1729">{{Cite journal

|last=Bradley |first=J

|first=P

|isbn=978-0-521-35699-2}} [https://archive.org/details/practicalastrono0000duff/page/62 Extract of page 62]</ref> it is possible to express the speed of light in terms of the Earth's velocity around the Sun, which with the known length of a year can be converted to the time needed to travel from the Sun to the Earth. In 1729, Bradley used this method to derive that light travelled {{Val|10,210}} times faster than the Earth in its orbit (the modern figure is {{Val|10,066}} times faster) or, equivalently, that it would take light 8&nbsp;minutes 12&nbsp;seconds to travel from the Sun to the Earth.<ref name="Bradley1729"/>

====Astronomical unit====

An [[astronomical unit]] (AU) is approximately the average distance between the Earth and Sun. It was redefined in 2012 as exactly {{Val|149597870700|u=m}}.<ref name=AU_redef /><ref>{{Cite journal|journal=The International System of Units|title=Supplement 2014: Updates to the 8th edition (2006) of the SI Brochure|url=http://www.bipm.org/utils/common/pdf/si_supplement_2014.pdf|year=2014|publisher= International Bureau of Weights and Measures|page=14}}</ref> Previously the AU was not based on the [[International System of Units]] but in terms of the gravitational force exerted by the Sun in the framework of classical mechanics.{{#tag:ref|The astronomical unit was defined as the radius of an unperturbed circular Newtonian orbit about the Sun of a particle having infinitesimal mass, moving with an [[angular frequency]] of {{gaps|0.017|202|098|95}} [[radian]]s (approximately {{frac|{{Val|365.256898}}}} of a revolution) per day.<ref>{{SIbrochure8th|page=126}}</ref>|group="Note"}} The current definition uses the recommended value in metres for the previous definition of the astronomical unit, which was determined by measurement.<ref name=AU_redef>{{Cite web|title=Resolution B2 on the re-definition of the astronomical unit of length|url=https://www.iau.org/static/resolutions/IAU2012_English.pdf|year=2012|publisher=International Astronomical Union}}</ref> This redefinition is analogous to that of the metre and likewise has the effect of fixing the speed of light to an exact value in astronomical units per second (via the exact speed of light in metres per second).<ref>{{Cite journal|last=Brumfiel|first=Geoff|date=14 September 2012|title=The astronomical unit gets fixed|url=https://www.nature.com/articles/nature.2012.11416|journal=[[Nature (journal)|Nature]]|language=en|doi=10.1038/nature.2012.11416|s2cid=123424704|issn=1476-4687}}</ref>

Previously, the inverse of&nbsp;{{Math|''c''}} expressed in seconds per astronomical unit was measured by comparing the time for radio signals to reach different spacecraft in the Solar System, with their position calculated from the gravitational effects of the Sun and various planets. By combining many such measurements, a [[best fit]] value for the light time per unit distance could be obtained. For example, in 2009, the best estimate, as approved by the [[International Astronomical Union]] (IAU), was:<ref>See the following:

|last1=Pitjeva |first1=EV

|last2=Standish |first2=EM

|bibcode = 2009CeMDA.103..365P |s2cid=121374703

|url=https://zenodo.org/record/1000691}}

|url-status=dead

:light time for unit distance: ''t''_au&nbsp;=&nbsp;{{Val|499.004783836|(10)|u=s}}

:''c''&nbsp;=&nbsp;{{Val|0.00200398880410|(4)|u=AU/s}}&nbsp;=&nbsp;{{Val|173.144632674|(3)|u=AU/day.}}

The relative uncertainty in these measurements is 0.02 parts per billion ({{Val|2|e=-11}}), equivalent to the uncertainty in Earth-based measurements of length by interferometry.<ref>

|url=http://www.npl.co.uk/educate-explore/posters/length/length-%28poster%29

===Time of flight techniques===

[[File:Michelson speed of light measurement 1930.jpg|thumb|center|One of the last and most accurate time of flight measurements, Michelson, Pease and Pearson's 1930–35 experiment used a rotating mirror and a one-mile (1.6&nbsp;km) long vacuum chamber which the light beam traversed 10 times. It achieved accuracy of ±11&nbsp;km/s.|600x600px]]

The [[Fizeau's measurement of the speed of light in air|setup as used by Fizeau]] consists of a beam of light directed at a mirror {{Convert|8|km|mi|0}} away. On the way from the source to the mirror, the beam passes through a rotating cogwheel. At a certain rate of rotation, the beam passes through one gap on the way out and another on the way back, but at slightly higher or lower rates, the beam strikes a tooth and does not pass through the wheel. Knowing the distance between the wheel and the mirror, the number of teeth on the wheel, and the rate of rotation, the speed of light can be calculated.<ref name=How>{{Cite web

|first=P

|url-status=dead

The [[Foucault's measurements of the speed of light|method of Foucault]] replaces the cogwheel with a rotating mirror. Because the mirror keeps rotating while the light travels to the distant mirror and back, the light is reflected from the rotating mirror at a different angle on its way out than it is on its way back. From this difference in angle, the known speed of rotation and the distance to the distant mirror the speed of light may be calculated.<ref>{{Cite web

|last=Fowler |first=M

|last1=Cooke |first1=J

|last2=Martin |first2=M

|last3=McCartney |first3=H

|last4=Wilf |first4=B

|bibcode = 1968AmJPh..36..847C }}

|last1=Aoki |first1=K |last2=Mitsui |first2=T

|bibcode = 2008AmJPh..76..812A |s2cid=117454437 }}

|last1=James |first1=MB |last2=Ormond |first2=RB |last3=Stasch |first3=AJ

|bibcode = 1999AmJPh..67..681J }}</ref>

===Electromagnetic constants===

An option for deriving ''c'' that does not directly depend on a measurement of the propagation of electromagnetic waves is to use the relation between ''c'' and the [[vacuum permittivity]] ''ε''₀ and [[vacuum permeability]] ''μ''₀ established by Maxwell's theory: ''c''²&nbsp;=&nbsp;1/(''ε''₀''μ''₀). The vacuum permittivity may be determined by measuring the [[capacitance]] and dimensions of a [[capacitor]], whereas the value of the vacuum permeability was historically fixed at exactly {{Val|4|end=π|e=-7|u=H.m-1}} through the definition of the [[ampere (unit)|ampere]]. [[Edward Bennett Rosa|Rosa]] and [[Noah Ernest Dorsey|Dorsey]] used this method in 1907 to find a value of {{Val|299710|22|u=km/s}}. Their method depended upon having a standard unit of electrical resistance, the "international [[ohm]]", and so its accuracy was limited by how this standard was defined.<ref name="Essen1948"/><ref name="RosaDorsey">{{Cite journal|last1=Rosa|first1=EB|author-link=Edward Bennett Rosa|last2=Dorsey|first2=NE|author-link2=Noah Ernest Dorsey|year=1907|title=A new determination of the ratio of the electromagnetic to the electrostatic unit of electricity.|journal=Bulletin of the Bureau of Standards|volume=3|issue=6|page=433|doi=10.6028/bulletin.070|doi-access=free}}</ref>

===Cavity resonance===

Another way to measure the speed of light is to independently measure the frequency ''f'' and wavelength ''λ'' of an electromagnetic wave in vacuum. The value of ''c'' can then be found by using the relation ''c''&nbsp;=&nbsp;''fλ''. One option is to measure the resonance frequency of a [[cavity resonator]]. If the dimensions of the resonance cavity are also known, these can be used to determine the wavelength of the wave. In 1946, [[Louis Essen]] and A.C. Gordon-Smith established the frequency for a variety of [[normal mode]]s of microwaves of a [[microwave cavity]] of precisely known dimensions. The dimensions were established to an accuracy of about ±0.8&nbsp;μm using gauges calibrated by interferometry.<ref name="Essen1948"/> As the wavelength of the modes was known from the geometry of the cavity and from [[electromagnetic theory]], knowledge of the associated frequencies enabled a calculation of the speed of light.<ref name="Essen1948">{{Cite journal

|last1=Essen |first1=L

|last2=Gordon-Smith |first2=AC

|doi-access=free

}}</ref><ref>

|last=Essen |first=L

|s2cid=4101717

}}</ref>

The Essen–Gordon-Smith result, {{Val|299792|9|u=km/s}}, was substantially more precise than those found by optical techniques.<ref name="Essen1948" /> By 1950, repeated measurements by Essen established a result of {{Val|299792.5|3.0|u=km/s}}.<ref name="Essen1950">

|last=Essen |first=L

|s2cid=121261770

}}</ref>

| last = Stauffer | first = RH

|date=April 1997

| title = Finding the Speed of Light with Marshmallows

| journal = [[The Physics Teacher]]

| volume = 35

| page = 231

| url = https://www.physics.umd.edu/icpe/newsletters/n34/marshmal.htm

| access-date = 15 February 2010

|bibcode = 1997PhTea..35..231S |doi = 10.1119/1.2344657

| issue = 4 }}</ref><ref>{{Cite web

| url =http://www.bbc.co.uk/norfolk/features/ba_festival/bafestival_speedoflight_experiment_feature.shtml

| title = BBC Look East at the speed of light

| work = BBC Norfolk website

| access-date = 15 February 2010