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{{Short description|Logarithmic measure of the brightness of an astronomical object}}
{{Other uses|Magnitude (disambiguation)}}
{{Other uses|Magnitude (disambiguation)}}
[[File:Magnitude illustration.svg|thumb|upright=1.5|An illustration of light sources from magnitude 1 to 3.5, in 0.5 increments]]
<!-- lead images -->
In [[astronomy]], '''magnitude''' is a measure of the [[brightness]] of an [[astronomical object|object]], usually in a defined [[passband]]. An imprecise but systematic determination of the magnitude of objects was introduced in ancient times by [[Hipparchus]].
{| class="infobox" style="width: 280px;"
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{| style="background: white; white-space: nowrap;" cellpadding=0 cellspacing=2
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| colspan=2 | [[File:Iridium flare 2008 08 11.jpg|282px|Night sky with a very bright satellite flare]]
|-
|[[File:Hubble Ultra Deep Field part.jpg|x140px|]]&thinsp;[[File:CometBorrelly1002.jpg|x140px|]]
|}
|-
|
* Top: Light sources of different magnitudes. A very bright [[satellite flare]] can be seen in the night sky.
* Bottom: The [[Hubble Ultra-Deep Field]] detected objects as faint as 30th magnitude ''(left)''. [[19P/Borrelly|Comet Borrelly]], the colors show its brightness over the range of three orders of magnitude ''(right)''.
|}


Magnitude values do not have a unit. The scale is [[Logarithmic scale|logarithmic]] and defined such that a magnitude 1 star is exactly 100 times brighter than a magnitude 6 star. Thus each step of one magnitude is <math>\sqrt[5]{100} \approx 2.512</math> times brighter than the magnitude 1 higher. The brighter an object appears, the lower the value of its magnitude, with the brightest objects reaching negative values.
In [[astronomy]], '''magnitude''' is a [[unitless]] measure of the [[brightness]] of an [[astronomical object|object]] in a defined [[passband]], often in the [[visible spectrum|visible]] or [[infrared]] spectrum, but sometimes across all wavelengths. An imprecise but systematic determination of the magnitude of objects was introduced in ancient times by [[Hipparchus]].


Astronomers use two different definitions of magnitude: [[apparent magnitude]] and [[absolute magnitude]]. The ''apparent'' magnitude ({{mvar|m}}) is the brightness of an object and depends on an object's intrinsic [[luminosity]], its [[Cosmic distance ladder|distance]], and the [[Extinction (astronomy)|extinction]] reducing its brightness. The ''absolute'' magnitude ({{mvar|M}}) describes the intrinsic luminosity emitted by an object and is defined to be equal to the apparent magnitude that the object would have if it were placed at a certain distance, 10 [[parsec]]s for stars. A more complex definition of absolute magnitude is used for [[planet]]s and [[small Solar System bodies]], based on its brightness at one [[astronomical unit]] from the observer and the Sun.
The scale is [[Logarithmic scale|logarithmic]] and defined such that each step of one magnitude changes the brightness by a factor of the fifth [[nth root|root]] of 100, or approximately 2.512. For example, a magnitude 1 star is exactly 100 times brighter than a magnitude 6 star. The brighter an object appears, the lower the value of its magnitude, with the brightest objects reaching negative values.


The [[Sun]] has an apparent magnitude of −27 and [[Sirius]], the brightest visible star in the night sky, −1.46. [[Venus]] at its brightest is -5. The [[International Space Station]] (ISS) sometimes reaches a magnitude of −6.
Astronomers use two different definitions of magnitude: [[apparent magnitude]] and [[absolute magnitude]]. The ''apparent'' magnitude ({{mvar|m}}) is the brightness of an object as it appears in the [[night sky]] from [[Earth]]. Apparent magnitude depends on an object's intrinsic [[luminosity]], its [[Cosmic distance ladder|distance]], and the [[Extinction (astronomy)|extinction]] reducing its brightness. The ''absolute'' magnitude ({{mvar|M}}) describes the intrinsic luminosity emitted by an object and is defined to be equal to the apparent magnitude that the object would have if it were placed at a certain distance from Earth, 10 [[parsec]]s for stars. A more complex definition of absolute magnitude is used for [[planet]]s and [[small Solar System bodies]], based on its brightness at one [[astronomical unit]] from the observer and the Sun.


[[Amateur astronomy|Amateur astronomers]] commonly express the darkness of the sky in terms of [[limiting magnitude]], i.e. the apparent magnitude of the faintest star they can see with the naked eye. At a dark site, it is usual for people to see stars of 6th magnitude or fainter.
The [[Sun]] has an apparent magnitude of −27 and [[Sirius]], the brightest visible star in the night sky, −1.46. Apparent magnitudes can also be assigned to [[satellite|artificial objects]] in [[geocentric orbit|Earth orbit]] with the [[International Space Station]] (ISS) sometimes reaching a magnitude of −6.

Apparent magnitude is really a measure of [[illuminance]], which can also be measured in photometric units such as [[lux]].<ref>{{cite journal |last1=Crumey |first1=A.|title=Human Contrast Threshold and Astronomical Visibility.|journal=Monthly Notices of the Royal Astronomical Society|date=October 2006|volume=442|issue=3|pages=2600–2619 |doi=10.1093/mnras/stu992 |doi-access=free |arxiv=1405.4209 |bibcode=2014MNRAS.442.2600C }}</ref>


== History ==
== History ==
[[File:Iridium flare 2008 08 11.jpg|thumb|Light sources of different magnitudes. A very bright [[satellite flare]] can be seen in the night sky.]]

The magnitude system dates back roughly 2000 years to the Greek astronomer [[Hipparchus]] (or the Alexandrian astronomer [[Ptolemy]]—references vary) who classified stars by their apparent brightness, which they saw as size (''[[wikt:magnitude|magnitude]]'' means "bigness, size"<ref>
The Greek astronomer [[Hipparchus]] produced a catalogue which noted the apparent brightness of stars in the second century BCE. In the second century CE the Alexandrian astronomer [[Ptolemy]] classified stars on a six-point scale, and originated the term [[wikt:magnitude|magnitude]].<ref>
{{Cite book
{{cite journal
|last1=Miles
| last = Heifetz
| first = M.
|first1=R.
|title=A light history of photometry: from Hipparchus to the Hubble Space Telescope
| last2 = Tirion
|journal=Journal of the British Astronomical Association
| first2 = W.
|date=October 2006
| title = A Walk Through the Heavens: A Guide to Stars and Constellations and Their Legends
|volume=117
| date = 2004
|page=172
| publisher = [[Cambridge University Press]]
|bibcode=2007JBAA..117..172M
| publication-place = Cambridge
|url=http://adsabs.harvard.edu/full/2007JBAA..117..172M
| page = 6
|access-date=8 February 2021}}
}}
</ref>). To the unaided eye, a more prominent star such as [[Sirius]] or [[Arcturus]] appears larger than a less prominent star such as [[Mizar and Alcor|Mizar]], which in turn appears larger than a truly faint star such as [[Mizar and Alcor|Alcor]]. In 1736, the mathematician [[John Keill]] described the ancient naked-eye magnitude system in this way:
</ref> To the unaided eye, a more prominent star such as [[Sirius]] or [[Arcturus]] appears larger than a less prominent star such as [[Mizar and Alcor|Mizar]], which in turn appears larger than a truly faint star such as [[Mizar and Alcor|Alcor]]. In 1736, the mathematician [[John Keill]] described the ancient naked-eye magnitude system in this way:
<blockquote>
<blockquote>
The ''fixed Stars'' appear to be of different Bignesses, not because they really are so, but because they are not all equally distant from us.{{refn|group=note|Today astronomers know that the brightness of stars is a function of both their distance and their own [[luminosity]].}} Those that are nearest will excel in Lustre and Bigness; the more remote ''Stars'' will give a fainter Light, and appear smaller to the Eye. Hence arise the Distribution of ''Stars'', according to their Order and Dignity, into ''Classes''; the first Class containing those which are nearest to us, are called ''Stars'' of the first Magnitude; those that are next to them, are ''Stars'' of the second Magnitude ... and so forth, 'till we come to the ''Stars'' of the sixth Magnitude, which comprehend the smallest ''Stars'' that can be discerned with the bare Eye. For all the other ''Stars'', which are only seen by the Help of a Telescope, and which are called Telescopical, are not reckoned among these six Orders. Altho' the Distinction of ''Stars'' into six Degrees of Magnitude is commonly received by ''Astronomers''; yet we are not to judge, that every particular ''Star'' is exactly to be ranked according to a certain Bigness, which is one of the Six; but rather in reality there are almost as many Orders of ''Stars'', as there are ''Stars'', few of them being exactly of the same Bigness and Lustre. And even among those ''Stars'' which are reckoned of the brightest Class, there appears a Variety of Magnitude; for ''Sirius'' or ''Arcturus'' are each of them brighter than ''Aldebaran'' or the ''Bull's'' Eye, or even than the ''Star'' in ''Spica''; and yet all these ''Stars'' are reckoned among the ''Stars'' of the first Order: And there are some ''Stars'' of such an intermedial Order, that the ''Astronomers'' have differed in classing of them; some putting the same ''Stars'' in one Class, others in another. For Example: The little ''Dog'' was by ''Tycho'' placed among the ''Stars'' of the second Magnitude, which ''Ptolemy'' reckoned among the ''Stars'' of the first Class: And therefore it is not truly either of the first or second Order, but ought to be ranked in a Place between both.<ref>
The ''fixed Stars'' appear to be of different Bignesses, not because they really are so, but because they are not all equally distant from us.{{refn|group=note|Today astronomers know that the brightness of stars is a function of both their distance and their own [[luminosity]].}} Those that are nearest will excel in Lustre and Bigness; the more remote ''Stars'' will give a fainter Light, and appear smaller to the Eye. Hence arise the Distribution of ''Stars'', according to their Order and Dignity, into ''Classes''; the first Class containing those which are nearest to us, are called ''Stars'' of the first Magnitude; those that are next to them, are ''Stars'' of the second Magnitude ... and so forth, 'till we come to the ''Stars'' of the sixth Magnitude, which comprehend the smallest ''Stars'' that can be discerned with the bare Eye. For all the other ''Stars'', which are only seen by the Help of a Telescope, and which are called Telescopical, are not reckoned among these six Orders. Altho' the Distinction of ''Stars'' into six Degrees of Magnitude is commonly received by ''Astronomers''; yet we are not to judge, that every particular ''Star'' is exactly to be ranked according to a certain Bigness, which is one of the Six; but rather in reality there are almost as many Orders of ''Stars'', as there are ''Stars'', few of them being exactly of the same Bigness and Lustre. And even among those ''Stars'' which are reckoned of the brightest Class, there appears a Variety of Magnitude; for ''Sirius'' or ''Arcturus'' are each of them brighter than ''Aldebaran'' or the ''Bull's'' Eye, or even than the ''Star'' in ''Spica''; and yet all these ''Stars'' are reckoned among the ''Stars'' of the first Order: And there are some ''Stars'' of such an intermedial Order, that the ''Astronomers'' have differed in classing of them; some putting the same ''Stars'' in one Class, others in another. For Example: The little ''Dog'' was by ''Tycho'' placed among the ''Stars'' of the second Magnitude, which ''Ptolemy'' reckoned among the ''Stars'' of the first Class: And therefore it is not truly either of the first or second Order, but ought to be ranked in a Place between both.<ref>
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| edition = 3rd
| edition = 3rd
| date = 1739
| date = 1739
| pages = [https://archive.org/details/anintroductiont01keilgoog/page/n75 47]–48
| pages = 47–48
| location = London
| location = London
}}
}}
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| first = V. E.
| first = V. E.
| title = The Lord of Uraniborg
| title = The Lord of Uraniborg
| url = https://archive.org/details/lorduraniborgbio00veth
| url-access = limited
| date = 1990
| date = 1990
| publisher = Cambridge University Press
| publisher = Cambridge University Press
| location = Cambridge
| location = Cambridge
| page = [https://archive.org/details/lorduraniborgbio00veth/page/n318 306]
| page = 306
| isbn = 9780521351584
}}
}}
</ref> The development of the telescope showed that these large sizes were illusory—stars appeared much smaller through the telescope. However, early telescopes produced a spurious disk-like image of a star that was larger for brighter stars and smaller for fainter ones. Astronomers from [[Galileo Galilei|Galileo]] to [[Jacques Cassini|Jaques Cassini]] mistook these spurious disks for the physical bodies of stars, and thus into the eighteenth century continued to think of magnitude in terms of the physical size of a star.<ref name="Graney/Grayson" /> [[Johannes Hevelius]] produced a very precise table of star sizes measured telescopically, but now the measured diameters ranged from just over six [[Minute of arc|''seconds'' of arc]] for first magnitude down to just under 2 seconds for sixth magnitude.<ref name="Graney/Grayson">
</ref> The development of the telescope showed that these large sizes were illusory—stars appeared much smaller through the telescope. However, early telescopes produced a spurious disk-like image of a star that was larger for brighter stars and smaller for fainter ones. Astronomers from [[Galileo Galilei|Galileo]] to [[Jacques Cassini|Jaques Cassini]] mistook these spurious disks for the physical bodies of stars, and thus into the eighteenth century continued to think of magnitude in terms of the physical size of a star.<ref name="Graney/Grayson" /> [[Johannes Hevelius]] produced a very precise table of star sizes measured telescopically, but now the measured diameters ranged from just over six [[Minute of arc|''seconds'' of arc]] for first magnitude down to just under 2 seconds for sixth magnitude.<ref name="Graney/Grayson">
{{Cite journal
{{Cite journal
| last = Graney
| last1 = Graney
| first = C. M.
| first1 = C. M.
| last2 = Grayson
| last2 = Grayson
| first2 = T. P.
| first2 = T. P.
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| doi = 10.1080/00033790.2010.507472
| doi = 10.1080/00033790.2010.507472
| arxiv = 1003.4918
| arxiv = 1003.4918
| s2cid = 118007707
}}</ref><ref>
}}</ref><ref>
{{Cite journal
{{Cite journal
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|bibcode = 2009BaltA..18..253G |arxiv = 1001.1168
|bibcode = 2009BaltA..18..253G |arxiv = 1001.1168
}}
}}
</ref> By the time of [[William Herschel]] astronomers recognized that the telescopic disks of stars were spurious and a function of the telescope as well as the brightness of the stars, but still spoke in terms of a star's size more than its brightness.<ref name="Graney/Grayson" /> Even well into the nineteenth century the magnitude system continued to be described in terms of six classes determined by apparent size, in which
</ref> By the time of [[William Herschel]] astronomers recognized that the telescopic disks of stars were spurious and a function of the telescope as well as the brightness of the stars, but still spoke in terms of a star's size more than its brightness.<ref name="Graney/Grayson" /> Even into the early nineteenth century, the magnitude system continued to be described in terms of six classes determined by apparent size.<ref>
<blockquote>
There is no other rule for classing the stars but the estimation of the observer; and hence it is that some astronomers reckon those stars of the first magnitude which others esteem to be of the second.<ref>
{{Cite book
{{Cite book
| last = Ewing
| last1 = Ewing
| first = A.
| first1 = A.
| last2 = Gemmere
| last2 = Gemmere
| first2 = J.
| first2 = J.
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| page = 41
| page = 41
}}</ref>
}}</ref>

</blockquote>
However, by the mid-nineteenth century astronomers had measured the distances to stars via [[stellar parallax]], and so understood that stars are so far away as to essentially appear as [[point source]]s of light. Following advances in understanding the [[Airy disk|diffraction of light]] and [[astronomical seeing]], astronomers fully understood both that the apparent sizes of stars were spurious and how those sizes depended on the intensity of light coming from a star (this is the star's apparent brightness, which can be measured in units such as watts/cm<sup>2</sup>) so that brighter stars appeared larger.
However, by the mid-nineteenth century astronomers had measured the distances to stars via [[stellar parallax]], and so understood that stars are so far away as to essentially appear as [[point source]]s of light. Following advances in understanding the [[Airy disk|diffraction of light]] and [[astronomical seeing]], astronomers fully understood both that the apparent sizes of stars were spurious and how those sizes depended on the intensity of light coming from a star (this is the star's apparent brightness, which can be measured in units such as watts per square metre) so that brighter stars appeared larger.


=== Modern definition ===
=== Modern definition ===
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}}</ref><ref>
}}</ref><ref>
{{Cite book
{{Cite book
| last = Tassoul
| last1 = Tassoul
| first = J. L.
| first1 = J. L.
| last2 = Tassoul
| last2 = Tassoul
| first2 = M.
| first2 = M.
| title = A Concise History of Solar and Stellar Physics
| title = A Concise History of Solar and Stellar Physics
| url = https://archive.org/details/concisehistoryof00tass
| url-access = registration
| date = 2004
| date = 2004
| publisher = [[Princeton University Press]]
| publisher = [[Princeton University Press]]
| location = Princeton, NJ
| location = Princeton, NJ
| page = [https://archive.org/details/concisehistoryof00tass/page/47 47]
| page = 47
| isbn = 9780691117119
}}</ref> Every interval of one magnitude equates to a variation in brightness of {{radic|100|5}} or roughly 2.512 times. Consequently, a magnitude 1 star is about 2.5 times brighter than a magnitude 2 star, 2.5<sup>2</sup> brighter than a magnitude 3 star, 2.5<sup>3</sup> brighter than a magnitude 4 star, and so on.
}}</ref> Every interval of one magnitude equates to a variation in brightness of {{radic|100|5}} or roughly 2.512 times. Consequently, a magnitude 1 star is about 2.5 times brighter than a magnitude 2 star, about 2.5<sup>2</sup> times brighter than a magnitude 3 star, about 2.5<sup>3</sup> times brighter than a magnitude 4 star, and so on.


This is the modern magnitude system, which measures the brightness, not the apparent size, of stars. Using this logarithmic scale, it is possible for a star to be brighter than “first class”, so [[Arcturus]] or [[Vega]] are magnitude 0, and [[Sirius]] is magnitude −1.46.{{citation needed|date=March 2019}}
This is the modern magnitude system, which measures the brightness, not the apparent size, of stars. Using this logarithmic scale, it is possible for a star to be brighter than “first class”, so [[Arcturus]] or [[Vega]] are magnitude 0, and [[Sirius]] is magnitude −1.46.{{citation needed|date=March 2019}}
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As mentioned above, the scale appears to work 'in reverse', with objects with a negative magnitude being brighter than those with a positive magnitude. The more negative the value, the brighter the object.
As mentioned above, the scale appears to work 'in reverse', with objects with a negative magnitude being brighter than those with a positive magnitude. The more negative the value, the brighter the object.
[[File:Number-line.svg|center]]
[[File:Real Number Line.PNG|center]]
Objects appearing farther to the left on this line are brighter, while objects appearing farther to the right are dimmer. Thus zero appears in the middle, with the brightest objects on the far left, and the dimmest objects on the far right.
Objects appearing farther to the left on this line are brighter, while objects appearing farther to the right are dimmer. Thus zero appears in the middle, with the brightest objects on the far left, and the dimmest objects on the far right.


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* Apparent magnitude, the brightness of an object as it appears in the night sky.
* Apparent magnitude, the brightness of an object as it appears in the night sky.
* Absolute magnitude, which measures the [[luminosity]] of an object (or reflected light for non-luminous objects like [[asteroid]]s); it is the object's apparent magnitude as seen from a specific distance, conventionally 10 [[parsec]]s (32.6 [[light year]]s).
* Absolute magnitude, which measures the [[luminosity]] of an object (or reflected light for non-luminous objects like [[asteroid]]s); it is the object's apparent magnitude as seen from a specific distance, conventionally 10 [[parsec]]s (32.6 [[light year]]s).
The difference between these concepts can be seen by comparing two stars. [[Betelgeuse]] (apparent magnitude 0.5, absolute magnitude −5.8) appears slightly dimmer in the sky than [[Alpha Centauri]] (apparent magnitude 0.0, absolute magnitude 4.4) even though it emits thousands of times more light, because Betelgeuse is much farther away.
The difference between these concepts can be seen by comparing two stars. [[Betelgeuse]] (apparent magnitude 0.5, absolute magnitude −5.8) appears slightly dimmer in the sky than [[Alpha Centauri A]] (apparent magnitude 0.0, absolute magnitude 4.4) even though it emits thousands of times more light, because Betelgeuse is much farther away.


=== Apparent magnitude ===
=== Apparent magnitude ===
{{Main|Apparent magnitude}}
{{Main|Apparent magnitude}}


Under the modern logarithmic magnitude scale, two objects, one of which is used as a reference or baseline, whose [[Intensity (physics)|intensities]] (brightnesses) measured from [[Earth]] in units of power per unit area (such as watts per square metre, W&nbsp;m<sup>−2</sup>) are {{math|''I''<sub>1</sub>}} and {{math|''I''<sub>ref</sub>}}, will have magnitudes {{math|''m''<sub>1</sub>}} and {{math|''m''<sub>ref</sub>}} related by
Under the modern logarithmic magnitude scale, two objects, one of which is used as a reference or baseline, whose [[Intensity (physics)|flux]] (i.e., brightness, a measure of power per unit area) in units such as watts per square metre (W&nbsp;m<sup>−2</sup>) are {{math|''F''<sub>1</sub>}} and {{math|''F''<sub>ref</sub>}}, will have magnitudes {{math|''m''<sub>1</sub>}} and {{math|''m''<sub>ref</sub>}} related by


:<math>m_1-m_{\rm ref}=-2.5\log_{10} \left ( \frac{I_1}{I_{\rm ref}} \right ).</math>
:<math>m_1-m_{\rm ref}=-2.5\log_{10} \left ( \frac{F_1}{F_{\rm ref}} \right ).</math>


Using this formula, the magnitude scale can be extended beyond the ancient magnitude 1–6 range, and it becomes a precise measure of brightness rather than simply a classification system. [[Astronomer]]s can now measure differences as small as one-hundredth of a magnitude. Stars that have magnitudes between 1.5 and 2.5 are called second-magnitude; there are some 20 stars brighter than 1.5, which are first-magnitude stars (see the [[list of brightest stars]]). For example, [[Sirius]] is magnitude −1.46, [[Arcturus]] is −0.04, [[Aldebaran]] is 0.85, [[Spica]] is 1.04, and [[Procyon]] is 0.34. Under the ancient magnitude system, all of these stars might have been classified as "stars of the first magnitude".
Astronomers use the term "flux" for what is often called "intensity" in physics, in order to avoid confusion with the [[Spectral radiance|specific intensity]]. Using this formula, the magnitude scale can be extended beyond the ancient magnitude 1–6 range, and it becomes a precise measure of brightness rather than simply a classification system. [[Astronomer]]s now measure differences as small as one-hundredth of a magnitude. Stars that have magnitudes between 1.5 and 2.5 are called second-magnitude; there are some 20 stars brighter than 1.5, which are first-magnitude stars (see the [[list of brightest stars]]). For example, [[Sirius]] is magnitude −1.46, [[Arcturus]] is −0.04, [[Aldebaran]] is 0.85, [[Spica]] is 1.04, and [[Procyon]] is 0.34. Under the ancient magnitude system, all of these stars might have been classified as "stars of the first magnitude".


Magnitudes can also be calculated for objects far brighter than stars (such as the [[Sun]] and [[Moon]]), and for objects too faint for the human eye to see (such as [[Pluto]]).
Magnitudes can also be calculated for objects far brighter than stars (such as the [[Sun]] and [[Moon]]), and for objects too faint for the human eye to see (such as [[Pluto]]).
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{{main|Absolute magnitude}}
{{main|Absolute magnitude}}
Often, only apparent magnitude is mentioned since it can be measured directly. Absolute magnitude can be calculated from apparent magnitude and distance from:
Often, only apparent magnitude is mentioned since it can be measured directly. Absolute magnitude can be calculated from apparent magnitude and distance from:
:<math>m - M = 5 \left( \log_{10}d - 1 \right).</math>
:<math>m - M = 2.5 \log_{10} (d/10)^2 = 5 \left( \log_{10}d - 1 \right)\,,</math>
This is known as the [[distance modulus]], where {{mvar|d}} is the distance to the star measured in [[parsec]]s, {{mvar|m}} is the apparent magnitude, and {{mvar|M}} is the absolute magnitude.
because intensity falls off proportionally to distance squared. This is known as the [[distance modulus]], where {{mvar|d}} is the distance to the star measured in [[parsec]]s, {{mvar|m}} is the apparent magnitude, and {{mvar|M}} is the absolute magnitude.


If the line of sight between the object and observer is affected by [[Extinction (astronomy)|extinction]] due to absorption of light by [[Cosmic dust|interstellar dust particles]], then the object's apparent magnitude will be correspondingly fainter. For {{mvar|A}} magnitudes of extinction, the relationship between apparent and absolute magnitudes becomes
If the line of sight between the object and observer is affected by [[Extinction (astronomy)|extinction]] due to absorption of light by [[Cosmic dust|interstellar dust particles]], then the object's apparent magnitude will be correspondingly fainter. For {{mvar|A}} magnitudes of extinction, the relationship between apparent and absolute magnitudes becomes
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Stellar absolute magnitudes are usually designated with a capital M with a subscript to indicate the passband. For example, M<sub>V</sub> is the magnitude at 10 parsecs in the [[UBV photometric system|V]] passband. A [[bolometric magnitude]] (M<sub>bol</sub>) is an absolute magnitude adjusted to take account of radiation across all wavelengths; it is typically smaller (i.e. brighter) than an absolute magnitude in a particular passband, especially for very hot or very cool objects. Bolometric magnitudes are formally defined based on stellar luminosity in [[watt]]s, and are normalised to be approximately equal to M<sub>V</sub> for yellow stars.
Stellar absolute magnitudes are usually designated with a capital M with a subscript to indicate the passband. For example, M<sub>V</sub> is the magnitude at 10 parsecs in the [[UBV photometric system|V]] passband. A [[bolometric magnitude]] (M<sub>bol</sub>) is an absolute magnitude adjusted to take account of radiation across all wavelengths; it is typically smaller (i.e. brighter) than an absolute magnitude in a particular passband, especially for very hot or very cool objects. Bolometric magnitudes are formally defined based on stellar luminosity in [[watt]]s, and are normalised to be approximately equal to M<sub>V</sub> for yellow stars.


Absolute magnitudes for solar system objects are frequently quoted based on a distance of 1 AU. These are referred to with a capital H symbol. Since these objects are lit primarily by reflected light from the sun, an H magnitude is defined as the apparent magnitude of the object at 1 AU from the sun and 1 AU from the observer.<ref>{{cite web|url=https://cneos.jpl.nasa.gov/glossary/h.html|title=Glossary|publisher=JPL|accessdate=2017-11-23|url-status=live|archiveurl=http://archive.wikiwix.com/cache/20171125195529/https://cneos.jpl.nasa.gov/glossary/h.html|archivedate=2017-11-25}}</ref>
Absolute magnitudes for Solar System objects are frequently quoted based on a distance of 1 AU. These are referred to with a capital H symbol. Since these objects are lit primarily by reflected light from the Sun, an H magnitude is defined as the apparent magnitude of the object at 1 AU from the Sun and 1 AU from the observer.<ref>{{cite web|url=https://cneos.jpl.nasa.gov/glossary/h.html|title=Glossary|publisher=JPL|access-date=2017-11-23|url-status=live|archive-url=http://archive.wikiwix.com/cache/20171125195529/https://cneos.jpl.nasa.gov/glossary/h.html|archive-date=2017-11-25}}</ref>


=== Examples ===
=== Examples ===


The following is a table giving [[apparent magnitude]]s for [[celestial object]]s and [[artificial satellites]] ranging from the Sun to the faintest object visible with the [[Hubble Space Telescope|Hubble Space Telescope (HST)]]:
The following is a table giving [[apparent magnitude]]s for [[celestial object]]s and [[artificial satellites]] ranging from the Sun to the faintest object visible with the [[James Webb Space Telescope|James Webb Space Telescope (JWST)]]:


{|class="wikitable" style="text-align:center; border:none; "
{|class="wikitable" style="text-align:center; border:none; "
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!width=60 | Brightness<br>relative to<br>magnitude 0
!width=60 | Brightness<br>relative to<br>magnitude 0
!width=150 | Example
!width=150 | Example
!width=30 rowspan="21" style="border:none; background-color: white;"|
! rowspan="22" width="30" style="border:none; background-color: white;" |
!width=60 | Apparent<br>magnitude
!width=60 | Apparent<br>magnitude
!width=60 | Brightness<br>relative to<br>magnitude 0
!width=60 | Brightness<br>relative to<br>magnitude 0
!width=150 | Example
!width=150 | Example
!width=30 rowspan="21" style="border:none; background-color: white;"|
! rowspan="22" width="30" style="border:none; background-color: white;" |
!width=60 | Apparent<br>magnitude
!width=60 | Apparent<br>magnitude
!width=60 | Brightness<br>relative to<br>magnitude 0
!width=60 | Brightness<br>relative to<br>magnitude 0
!width=150 | Example
!width=150 | Example
|-
|-
|style="background:#edf3fe;"|−27||style="background:#edf3fe;"|{{val|6.31|e=10}}||style="background:#edf3fe;"|[[Sun]]||−7||631||[[SN 1006|SN 1006 supernova]]||13||{{val|6.31|e=−6}}||[[3C 273|3C 273 quasar]] <br> limit of 4.5–6&nbsp;in (11–15&nbsp;cm) telescopes
|style="background:#edf3fe;"|−27||style="background:#edf3fe;"|{{val|6.31|e=10}}||style="background:#edf3fe;"|[[Sun]]||−6||251||[[International Space Station|ISS]] {{small|(max.)}}||15||{{val|e=−6}}||
|-
|-
| −26||{{val|2.51|e=10}}||||−6||251||[[International Space Station|ISS]] {{small|(max.)}}||14||{{val|2.51|e=−6}}||[[Pluto]] {{small|(max.)}} <br> limit of 8–10&nbsp;in (20–25&nbsp;cm) telescopes
| −26||{{val|2.51|e=10}}||||−5||100||[[Venus]] {{small|(max.)}}||16||{{val|3.98|e=−7}}||[[Charon (moon)|Charon]] {{small|(max.)}}
|-
|-
| −25||{{val|e=10}}||||style="background:#edf3fe;" |−4||style="background:#edf3fe;" |39.8||style="background:#edf3fe;" |Faintest objects visible during the day with the naked eye when the sun is high<ref>{{cite web |title=Seeing stars and planets in the daylight |url=http://sky.velp.info/daystars.php |url-status=live |archive-url=https://web.archive.org/web/20160307165917/http://sky.velp.info/daystars.php |archive-date=7 March 2016 |access-date=8 May 2018 |website=sky.velp.info}}</ref>||17||{{val|1.58|e=−7}}||
| −25||{{val|1|e=10}}||||−5||100||[[Venus]] {{small|(max.)}}||15||{{val|1|e=−6}}||
|-
|-
| −24||{{val|3.98|e=9}}||||−3|||15.8||[[Jupiter]] {{small|(max.)}}, [[Mars]] {{small|(max.)}}||18||{{val|6.31|e=−8}}||
| −24||{{val|3.98|e=9}}||||style="background:#edf3fe;"|−4||style="background:#edf3fe;"|39.8||style="background:#edf3fe;"|Faintest objects visible during the day with the naked eye when the sun is high<ref>{{cite web|url=http://sky.velp.info/daystars.php|title=Seeing stars and planets in the daylight|website=sky.velp.info|accessdate=8 May 2018|url-status=live|archiveurl=https://web.archive.org/web/20160307165917/http://sky.velp.info/daystars.php|archivedate=7 March 2016}}</ref>||16||{{val|3.98|e=−7}}||[[Charon (moon)|Charon]] {{small|(max.)}}
|-
|-
| −23||{{val|1.58|e=9}}||||−3||15.8||[[Jupiter]] {{small|(max.)}}, [[Mars]] {{small|(max.)}}||17||{{val|1.58|e=−7}}||
| −23||{{val|1.58|e=9}}||||−2||6.31||[[Mercury (planet)|Mercury]] {{small|(max.)}}||19||{{val|2.51|e=−8}}||
|-
|-
| −22||{{val|6.31|e=8}}||||−2||6.31||[[Mercury (planet)|Mercury]] {{small|(max.)}}||18||{{val|6.31|e=−8}}||
| −22||{{val|6.31|e=8}}||||−1||2.51||[[Sirius]]||20||{{val|e=−8}}||
|-
|-
| −21||{{val|2.51|e=8}}||||−1||2.51||[[Sirius]]||19||{{val|2.51|e=−8}}||
| −21||{{val|2.51|e=8}}||||0||1||[[Vega]], [[Saturn]] {{small|(max.)}}||21||{{val|3.98|e=−9}}||[[Callirrhoe (moon)|Callirrhoe]] {{small|(satellite of Jupiter)}}
|-
|-
| −20||{{val|1|e=8}}||||0||1||[[Vega]], [[Saturn]] {{small|(max.)}}||20||{{val|1|e=−8}}||
| −20||{{val|e=8}}||||1||0.398||[[Antares]]||22||{{val|1.58|e=−9}}||
|-
|-
| −19||{{val|3.98|e=7}}||||1||0.398||[[Antares]]||21||{{val|3.98|e=−9}}||[[Callirrhoe (moon)|Callirrhoe]] {{small|(satellite of Jupiter)}}
| −19||{{val|3.98|e=7}}||||2||0.158||[[Polaris]]||23||{{val|6.31|e=−10}}||
|-
|-
| −18||{{val|1.58|e=7}}||||2||0.158||[[Polaris]]||22||{{val|1.58|e=−9}}||
| −18||{{val|1.58|e=7}}||||3||0.0631||[[Cor Caroli]]||24||{{val|2.51|e=−10}}||
|-
|-
| −17||{{val|6.31|e=6}}||||3||0.0631||[[Cor Caroli]]||23||{{val|6.31|e=−10}}||
| −17||{{val|6.31|e=6}}||||4||0.0251||[[Acubens]]||25||{{val|e=−10}}||[[Fenrir (moon)|Fenrir]] {{small|(satellite of Saturn)}}
|-
|-
| −16||{{val|2.51|e=6}}||||4||0.0251||[[Acubens]]||24||{{val|2.51|e=−10}}||
| −16||{{val|2.51|e=6}}||||5||0.01||[[4 Vesta|Vesta]] {{small|(max.)}}, [[Uranus]] {{small|(max.)}}||26||{{val|3.98|e=−11}}||
|-
|-
| −15||{{val|e=6}}||||style="background:#edf3fe;"|6||style="background:#edf3fe;" |{{val|3.98|e=−3}}||style="background:#edf3fe;" |typical limit of naked eye{{refn|group=note|Under very dark skies, such as are found in remote rural areas}}||27||{{val|1.58|e=−11}}||visible light limit of [[Optical telescope#Astronomical research telescopes|8m telescopes]]
| −15||{{val|1|e=6}}||||5||0.01||[[4 Vesta|Vesta]] {{small|(max.)}}, [[Uranus]] {{small|(max.)}}||25||{{val|1|e=−10}}||[[Fenrir (moon)|Fenrir]] {{small|(satellite of Saturn)}}
|-
|-
| −14||{{val|3.98|e=5}}||||7||{{val|1.58|e=−3}}|||[[Ceres (dwarf planet)|Ceres]] {{small|(max.)}} faintest naked-eye stars visible from "dark" rural areas<ref>{{Cite web |title=The astronomical magnitude scale |url=http://www.icq.eps.harvard.edu/MagScale.html |access-date=2020-12-17 |website=www.icq.eps.harvard.edu}}</ref>||28||{{val|6.31|e=−12}}||
| −14||{{val|3.98|e=5}}||||style="background:#edf3fe;"|6||style="background:#edf3fe;"|{{val|3.98|e=−3}}||style="background:#edf3fe;"|typical limit of naked eye{{refn|group=note|Under very dark skies, such as are found in remote rural areas}}||26||{{val|3.98|e=−11}}||
|-
|-
| style="background:#edf3fe;"|−13||style="background:#edf3fe;"|{{val|1.58|e=5}}||style="background:#edf3fe;"|[[full moon]]||7||{{val|1.58|e=−3}}||[[Ceres (dwarf planet)|Ceres]] {{small|(max.)}}||27||{{val|1.58|e=−11}}||visible light limit of [[Optical telescope#Astronomical research telescopes|8m telescopes]]
| style="background:#edf3fe;"|−13||style="background:#edf3fe;"|{{val|1.58|e=5}}||style="background:#edf3fe;"|[[full moon]]||8||{{val|6.31|e=−4}}||[[Neptune]] {{small|(max.)}}
|29||{{val|2.51|e=−12}}||
|-
|-
| −12||{{val|6.31|e=4}}||||8||{{val|6.31|e=−4}}||[[Neptune]] {{small|(max.)}}||28||{{val|6.31|e=−12}}||
| −12||{{val|6.31|e=4}}||||9||{{val|2.51|e=−4}}|| ||30||{{val|e=−12}}||
|-
|-
| −11||{{val|2.51|e=4}}||||9||{{val|2.51|e=−4}}||||29||{{val|2.51|e=−12}}||
| −11||{{val|2.51|e=4}}||||10||{{val|e=−4}}||typical limit of 7×50 binoculars||31||{{val|3.98|e=−13}}||
|-
|-
| −10||{{val|e=4}}||||11||{{val|3.98|e=−5}}||[[Proxima Centauri]]|| style="background:#edf3fe;" |32|| style="background:#edf3fe;" |{{val|1.58|e=−13}}|| style="background:#edf3fe;" |visible light limit of [[Hubble Space Telescope]]<ref>{{cite journal |last1=Illingworth |first1=G. D. |last2=Magee |first2=D. |last3=Oesch |first3=P. A. |last4=Bouwens |first4=R. J. |last5=Labbé |first5=I. |last6=Stiavelli |first6=M. |last7=van Dokkum |first7=P. G. |last8=Franx |first8=M. |last9=Trenti |first9=M. |last10=Carollo |first10=C. M. |last11=Gonzalez |first11=V. |title=The HST eXtreme Deep Field XDF: Combining all ACS and WFC3/IR Data on the HUDF Region into the Deepest Field Ever|journal=The Astrophysical Journal Supplement Series |date=21 October 2013 |volume=209 |issue=1 |page=6 |arxiv=1305.1931 |bibcode=2013ApJS..209....6I |doi=10.1088/0067-0049/209/1/6|s2cid=55052332 }}</ref>
| −10||{{val|1|e=4}}||||10||{{val|1|e=−4}}||typical limit of 7×50 binoculars||30||{{val|1|e=−12}}||
|-
|-
| −9||{{val|3.98|e=3}}||[[Iridium flare]] {{small|(max.)}}||11||{{val|3.98|e=−5}}||[[Proxima Centauri]]||31||{{val|3.98|e=−13}}||
| −9||{{val|3.98|e=3}}||[[Iridium flare]] {{small|(max.)}}||12||{{val|1.58|e=−5}}|| ||33||{{val|6.29|e=−14}} ||
|-
|-
| −8||{{val|1.58|e=3}}||||12||{{val|1.58|e=−5}}||||style="background:#edf3fe;"|32||style="background:#edf3fe;"|{{val|1.58|e=−13}}||style="background:#edf3fe;"|visible light limit of [[Hubble Space Telescope|HST]]
| −8||{{val|1.58|e=3}}||||13||{{val|6.31|e=−6}}||[[3C 273|3C 273 quasar]] <br> limit of 4.5–6&nbsp;in (11–15&nbsp;cm) telescopes|| style="background:#edf3fe;" |34|| style="background:#edf3fe;" |{{val|2.50|e=−14}}|| style="background:#edf3fe;" |near-infrared light limit of [[James Webb Space Telescope]]<ref name="maron">{{cite web |title=Telescopes |url=http://www.jaymaron.com/telescopes/telescopes.html |website=www.jaymaron.com |access-date=14 September 2017 |archive-date=1 August 2017 |archive-url=https://web.archive.org/web/20170801093437/http://www.jaymaron.com/telescopes/telescopes.html |url-status=dead }} (retrieved 14 September 2017)</ref>
|-
|−7
|631
|[[SN 1006|SN 1006 supernova]]
|14
|{{val|2.51|e=−6}}
|[[Pluto]] {{small|(max.)}} <br> limit of 8–10&nbsp;in (20–25&nbsp;cm) telescopes
|35||{{val|9.97|e=−15}}||
|}
|}


=== Other scales ===
=== Other scales ===


Any magnitude systems must be calibrated to define the brightness of magnitude zero. Many magnitude systems, such as the Johnson UBV system, assign the average brightness of several stars to a certain number to by definition, and all other magnitude measurements are compared to that reference point.<ref>{{Cite journal |last1=Johnson |first1=H. L. |last2=Morgan |first2=W. W. |date=1953 |title=Fundamental stellar photometry for standards of spectral type on the revised system of the Yerkes spectral atlas |url=http://adsabs.harvard.edu/doi/10.1086/145697 |journal=The Astrophysical Journal |language=en |volume=117 |pages=313 |doi=10.1086/145697 |bibcode=1953ApJ...117..313J |issn=0004-637X}}</ref> Other magnitude systems calibrate by measuring energy directly, without a reference point, and these are called "absolute" reference systems. Current absolute reference systems include the [[AB magnitude]] system, in which the reference is a source with a constant flux density per unit frequency,<ref>{{Cite journal |last1=Oke |first1=J. B. |last2=Gunn |first2=J. E. |date=1983 |title=Secondary standard stars for absolute spectrophotometry |url=http://adsabs.harvard.edu/doi/10.1086/160817 |journal=The Astrophysical Journal |language=en |volume=266 |pages=713 |doi=10.1086/160817 |bibcode=1983ApJ...266..713O |issn=0004-637X}}</ref> and the STMAG system, in which the reference source is instead defined to have constant flux density per unit wavelength.{{citation needed|date=March 2019}}
Under [[N. R. Pogson|Pogson's]] system the star [[Vega]] was used as the fundamental reference star, with an apparent magnitude defined to be [[zero]], regardless of measurement technique or wavelength filter. This is why objects brighter than Vega, such as [[Sirius]] (Vega magnitude of −1.46. or −1.5), have negative magnitudes. However, in the late twentieth century Vega was found to vary in brightness making it unsuitable for an absolute reference, so the reference system was modernized to not depend on any particular star's stability. This is why the modern value for Vega' magnitude is close to, but no longer exactly zero, but rather 0.03 in the V (visual) band.<ref>
{{Cite book
| last = Milone
| first = E. F.
| title = Astronomical Photometry: Past, Present and Future
| date = 2011
| publisher = Springer
| location = New York
| pages = 182–184
| isbn = 978-1-4419-8049-6
}}</ref>
Current absolute reference systems include the [[AB magnitude]] system, in which the reference is a source with a constant flux density per unit frequency, and the STMAG system, in which the reference source is instead defined to have constant flux density per unit wavelength.{{citation needed|date=March 2019}}


== Problems ==
==== Decibel ====
Another logarithmic measure for intensity is the level, in [[decibel]]. Although it is more commonly used for sound intensity, it is also used for light intensity. It is a parameter for [[photomultiplier tube]]s and similar camera optics for telescopes and microscopes. Each factor of 10 in intensity corresponds to 10 decibels. In particular, a multiplier of 100 in intensity corresponds to an increase of 20 decibels and also corresponds to a decrease in magnitude by 5. Generally, the change in level is related to a change in magnitude by
{{unreferenced section|date=March 2019}}
:<math>\Delta L = -4 \Delta m\,</math> dB
The human eye is easily fooled, and Hipparchus's scale has had problems. For example, the human eye is more sensitive to [[yellow]] and [[red]] light than to [[blue]], and [[photograph]]ic film more to blue than to yellow/red, giving different values of [[visual magnitude]] and [[photographic magnitude]]. Apparent magnitude can also be affected by factors such as dust in the atmosphere or light cloud cover [[extinction (astronomy)|absorbing]] some of the light.
For example, an object that is 1 magnitude larger (fainter) than a reference would produce a signal that is {{val|4|u=dB}} smaller (weaker) than the reference, which might need to be compensated by an increase in the capability of the camera by as many decibels.

Furthermore, many people find it counter-intuitive that a high magnitude star is dimmer than a low magnitude star.


== See also ==
== See also ==
{{Portal|Astronomy}}
* [[AB magnitude]]
* [[AB magnitude]]
* [[Color–color diagram]]
* [[Color–color diagram]]
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| publisher=[[Cornell University]]
| publisher=[[Cornell University]]
| date=18 September 2003
| date=18 September 2003
| accessdate=23 December 2011
| access-date=23 December 2011
| archiveurl=https://web.archive.org/web/20150117205438/http://curious.astro.cornell.edu/question.php?number=569
}}
| archivedate=2015-01-17
* {{cite web
|url = http://encarta.msn.com/encyclopedia_761558851/Magnitude_(astronomy).html
|title = Magnitude (astronomy)
|archiveurl = https://web.archive.org/web/20091028081734/http://encarta.msn.com/encyclopedia_761558851/Magnitude_(astronomy).html
|work = MSN Encarta
|archivedate = 28 October 2009
|url-status = dead
|accessdate = 23 December 2011
}}
}}


{{Star|state=collapsed}}
{{Star|state=collapsed}}
{{Portal bar|Astronomy|Spaceflight|Outer space|Solar System}}


[[Category:Observational astronomy]]
[[Category:Observational astronomy]]
[[Category:Units of measurement in astronomy]]
[[Category:Units of measurement in astronomy]]
[[Category:Logarithmic scales of measurement]]
[[Category:Logarithmic scales of measurement]]
[[Category:Concepts in astronomy]]


[[la:Magnitudo (astronomia)]]
[[la:Magnitudo (astronomia)]]

Latest revision as of 02:31, 14 October 2024

An illustration of light sources from magnitude 1 to 3.5, in 0.5 increments

In astronomy, magnitude is a measure of the brightness of an object, usually in a defined passband. An imprecise but systematic determination of the magnitude of objects was introduced in ancient times by Hipparchus.

Magnitude values do not have a unit. The scale is logarithmic and defined such that a magnitude 1 star is exactly 100 times brighter than a magnitude 6 star. Thus each step of one magnitude is times brighter than the magnitude 1 higher. The brighter an object appears, the lower the value of its magnitude, with the brightest objects reaching negative values.

Astronomers use two different definitions of magnitude: apparent magnitude and absolute magnitude. The apparent magnitude (m) is the brightness of an object and depends on an object's intrinsic luminosity, its distance, and the extinction reducing its brightness. The absolute magnitude (M) describes the intrinsic luminosity emitted by an object and is defined to be equal to the apparent magnitude that the object would have if it were placed at a certain distance, 10 parsecs for stars. A more complex definition of absolute magnitude is used for planets and small Solar System bodies, based on its brightness at one astronomical unit from the observer and the Sun.

The Sun has an apparent magnitude of −27 and Sirius, the brightest visible star in the night sky, −1.46. Venus at its brightest is -5. The International Space Station (ISS) sometimes reaches a magnitude of −6.

Amateur astronomers commonly express the darkness of the sky in terms of limiting magnitude, i.e. the apparent magnitude of the faintest star they can see with the naked eye. At a dark site, it is usual for people to see stars of 6th magnitude or fainter.

Apparent magnitude is really a measure of illuminance, which can also be measured in photometric units such as lux.[1]

History

[edit]
Light sources of different magnitudes. A very bright satellite flare can be seen in the night sky.

The Greek astronomer Hipparchus produced a catalogue which noted the apparent brightness of stars in the second century BCE. In the second century CE the Alexandrian astronomer Ptolemy classified stars on a six-point scale, and originated the term magnitude.[2] To the unaided eye, a more prominent star such as Sirius or Arcturus appears larger than a less prominent star such as Mizar, which in turn appears larger than a truly faint star such as Alcor. In 1736, the mathematician John Keill described the ancient naked-eye magnitude system in this way:

The fixed Stars appear to be of different Bignesses, not because they really are so, but because they are not all equally distant from us.[note 1] Those that are nearest will excel in Lustre and Bigness; the more remote Stars will give a fainter Light, and appear smaller to the Eye. Hence arise the Distribution of Stars, according to their Order and Dignity, into Classes; the first Class containing those which are nearest to us, are called Stars of the first Magnitude; those that are next to them, are Stars of the second Magnitude ... and so forth, 'till we come to the Stars of the sixth Magnitude, which comprehend the smallest Stars that can be discerned with the bare Eye. For all the other Stars, which are only seen by the Help of a Telescope, and which are called Telescopical, are not reckoned among these six Orders. Altho' the Distinction of Stars into six Degrees of Magnitude is commonly received by Astronomers; yet we are not to judge, that every particular Star is exactly to be ranked according to a certain Bigness, which is one of the Six; but rather in reality there are almost as many Orders of Stars, as there are Stars, few of them being exactly of the same Bigness and Lustre. And even among those Stars which are reckoned of the brightest Class, there appears a Variety of Magnitude; for Sirius or Arcturus are each of them brighter than Aldebaran or the Bull's Eye, or even than the Star in Spica; and yet all these Stars are reckoned among the Stars of the first Order: And there are some Stars of such an intermedial Order, that the Astronomers have differed in classing of them; some putting the same Stars in one Class, others in another. For Example: The little Dog was by Tycho placed among the Stars of the second Magnitude, which Ptolemy reckoned among the Stars of the first Class: And therefore it is not truly either of the first or second Order, but ought to be ranked in a Place between both.[3]

Note that the brighter the star, the smaller the magnitude: Bright "first magnitude" stars are "1st-class" stars, while stars barely visible to the naked eye are "sixth magnitude" or "6th-class". The system was a simple delineation of stellar brightness into six distinct groups but made no allowance for the variations in brightness within a group.

Tycho Brahe attempted to directly measure the "bigness" of the stars in terms of angular size, which in theory meant that a star's magnitude could be determined by more than just the subjective judgment described in the above quote. He concluded that first magnitude stars measured 2 arc minutes (2′) in apparent diameter (130 of a degree, or 115 the diameter of the full moon), with second through sixth magnitude stars measuring 1+12′, 1+112′, 34′, 12′, and 13′, respectively.[4] The development of the telescope showed that these large sizes were illusory—stars appeared much smaller through the telescope. However, early telescopes produced a spurious disk-like image of a star that was larger for brighter stars and smaller for fainter ones. Astronomers from Galileo to Jaques Cassini mistook these spurious disks for the physical bodies of stars, and thus into the eighteenth century continued to think of magnitude in terms of the physical size of a star.[5] Johannes Hevelius produced a very precise table of star sizes measured telescopically, but now the measured diameters ranged from just over six seconds of arc for first magnitude down to just under 2 seconds for sixth magnitude.[5][6] By the time of William Herschel astronomers recognized that the telescopic disks of stars were spurious and a function of the telescope as well as the brightness of the stars, but still spoke in terms of a star's size more than its brightness.[5] Even into the early nineteenth century, the magnitude system continued to be described in terms of six classes determined by apparent size.[7]

However, by the mid-nineteenth century astronomers had measured the distances to stars via stellar parallax, and so understood that stars are so far away as to essentially appear as point sources of light. Following advances in understanding the diffraction of light and astronomical seeing, astronomers fully understood both that the apparent sizes of stars were spurious and how those sizes depended on the intensity of light coming from a star (this is the star's apparent brightness, which can be measured in units such as watts per square metre) so that brighter stars appeared larger.

Modern definition

[edit]

Early photometric measurements (made, for example, by using a light to project an artificial “star” into a telescope's field of view and adjusting it to match real stars in brightness) demonstrated that first magnitude stars are about 100 times brighter than sixth magnitude stars.

Thus in 1856 Norman Pogson of Oxford proposed that a logarithmic scale of 5100 ≈ 2.512 be adopted between magnitudes, so five magnitude steps corresponded precisely to a factor of 100 in brightness.[8][9] Every interval of one magnitude equates to a variation in brightness of 5100 or roughly 2.512 times. Consequently, a magnitude 1 star is about 2.5 times brighter than a magnitude 2 star, about 2.52 times brighter than a magnitude 3 star, about 2.53 times brighter than a magnitude 4 star, and so on.

This is the modern magnitude system, which measures the brightness, not the apparent size, of stars. Using this logarithmic scale, it is possible for a star to be brighter than “first class”, so Arcturus or Vega are magnitude 0, and Sirius is magnitude −1.46.[citation needed]

Scale

[edit]

As mentioned above, the scale appears to work 'in reverse', with objects with a negative magnitude being brighter than those with a positive magnitude. The more negative the value, the brighter the object.

Objects appearing farther to the left on this line are brighter, while objects appearing farther to the right are dimmer. Thus zero appears in the middle, with the brightest objects on the far left, and the dimmest objects on the far right.

Apparent and absolute magnitude

[edit]

Two of the main types of magnitudes distinguished by astronomers are:

  • Apparent magnitude, the brightness of an object as it appears in the night sky.
  • Absolute magnitude, which measures the luminosity of an object (or reflected light for non-luminous objects like asteroids); it is the object's apparent magnitude as seen from a specific distance, conventionally 10 parsecs (32.6 light years).

The difference between these concepts can be seen by comparing two stars. Betelgeuse (apparent magnitude 0.5, absolute magnitude −5.8) appears slightly dimmer in the sky than Alpha Centauri A (apparent magnitude 0.0, absolute magnitude 4.4) even though it emits thousands of times more light, because Betelgeuse is much farther away.

Apparent magnitude

[edit]

Under the modern logarithmic magnitude scale, two objects, one of which is used as a reference or baseline, whose flux (i.e., brightness, a measure of power per unit area) in units such as watts per square metre (W m−2) are F1 and Fref, will have magnitudes m1 and mref related by

Astronomers use the term "flux" for what is often called "intensity" in physics, in order to avoid confusion with the specific intensity. Using this formula, the magnitude scale can be extended beyond the ancient magnitude 1–6 range, and it becomes a precise measure of brightness rather than simply a classification system. Astronomers now measure differences as small as one-hundredth of a magnitude. Stars that have magnitudes between 1.5 and 2.5 are called second-magnitude; there are some 20 stars brighter than 1.5, which are first-magnitude stars (see the list of brightest stars). For example, Sirius is magnitude −1.46, Arcturus is −0.04, Aldebaran is 0.85, Spica is 1.04, and Procyon is 0.34. Under the ancient magnitude system, all of these stars might have been classified as "stars of the first magnitude".

Magnitudes can also be calculated for objects far brighter than stars (such as the Sun and Moon), and for objects too faint for the human eye to see (such as Pluto).

Absolute magnitude

[edit]

Often, only apparent magnitude is mentioned since it can be measured directly. Absolute magnitude can be calculated from apparent magnitude and distance from:

because intensity falls off proportionally to distance squared. This is known as the distance modulus, where d is the distance to the star measured in parsecs, m is the apparent magnitude, and M is the absolute magnitude.

If the line of sight between the object and observer is affected by extinction due to absorption of light by interstellar dust particles, then the object's apparent magnitude will be correspondingly fainter. For A magnitudes of extinction, the relationship between apparent and absolute magnitudes becomes

Stellar absolute magnitudes are usually designated with a capital M with a subscript to indicate the passband. For example, MV is the magnitude at 10 parsecs in the V passband. A bolometric magnitude (Mbol) is an absolute magnitude adjusted to take account of radiation across all wavelengths; it is typically smaller (i.e. brighter) than an absolute magnitude in a particular passband, especially for very hot or very cool objects. Bolometric magnitudes are formally defined based on stellar luminosity in watts, and are normalised to be approximately equal to MV for yellow stars.

Absolute magnitudes for Solar System objects are frequently quoted based on a distance of 1 AU. These are referred to with a capital H symbol. Since these objects are lit primarily by reflected light from the Sun, an H magnitude is defined as the apparent magnitude of the object at 1 AU from the Sun and 1 AU from the observer.[10]

Examples

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The following is a table giving apparent magnitudes for celestial objects and artificial satellites ranging from the Sun to the faintest object visible with the James Webb Space Telescope (JWST):

Apparent
magnitude
Brightness
relative to
magnitude 0
Example Apparent
magnitude
Brightness
relative to
magnitude 0
Example Apparent
magnitude
Brightness
relative to
magnitude 0
Example
−27 6.31×1010 Sun −6 251 ISS (max.) 15 10−6
−26 2.51×1010 −5 100 Venus (max.) 16 3.98×10−7 Charon (max.)
−25 1010 −4 39.8 Faintest objects visible during the day with the naked eye when the sun is high[11] 17 1.58×10−7
−24 3.98×109 −3 15.8 Jupiter (max.), Mars (max.) 18 6.31×10−8
−23 1.58×109 −2 6.31 Mercury (max.) 19 2.51×10−8
−22 6.31×108 −1 2.51 Sirius 20 10−8
−21 2.51×108 0 1 Vega, Saturn (max.) 21 3.98×10−9 Callirrhoe (satellite of Jupiter)
−20 108 1 0.398 Antares 22 1.58×10−9
−19 3.98×107 2 0.158 Polaris 23 6.31×10−10
−18 1.58×107 3 0.0631 Cor Caroli 24 2.51×10−10
−17 6.31×106 4 0.0251 Acubens 25 10−10 Fenrir (satellite of Saturn)
−16 2.51×106 5 0.01 Vesta (max.), Uranus (max.) 26 3.98×10−11
−15 106 6 3.98×10−3 typical limit of naked eye[note 2] 27 1.58×10−11 visible light limit of 8m telescopes
−14 3.98×105 7 1.58×10−3 Ceres (max.) faintest naked-eye stars visible from "dark" rural areas[12] 28 6.31×10−12
−13 1.58×105 full moon 8 6.31×10−4 Neptune (max.) 29 2.51×10−12
−12 6.31×104 9 2.51×10−4 30 10−12
−11 2.51×104 10 10−4 typical limit of 7×50 binoculars 31 3.98×10−13
−10 104 11 3.98×10−5 Proxima Centauri 32 1.58×10−13 visible light limit of Hubble Space Telescope[13]
−9 3.98×103 Iridium flare (max.) 12 1.58×10−5 33 6.29×10−14
−8 1.58×103 13 6.31×10−6 3C 273 quasar
limit of 4.5–6 in (11–15 cm) telescopes
34 2.50×10−14 near-infrared light limit of James Webb Space Telescope[14]
−7 631 SN 1006 supernova 14 2.51×10−6 Pluto (max.)
limit of 8–10 in (20–25 cm) telescopes
35 9.97×10−15

Other scales

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Any magnitude systems must be calibrated to define the brightness of magnitude zero. Many magnitude systems, such as the Johnson UBV system, assign the average brightness of several stars to a certain number to by definition, and all other magnitude measurements are compared to that reference point.[15] Other magnitude systems calibrate by measuring energy directly, without a reference point, and these are called "absolute" reference systems. Current absolute reference systems include the AB magnitude system, in which the reference is a source with a constant flux density per unit frequency,[16] and the STMAG system, in which the reference source is instead defined to have constant flux density per unit wavelength.[citation needed]

Decibel

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Another logarithmic measure for intensity is the level, in decibel. Although it is more commonly used for sound intensity, it is also used for light intensity. It is a parameter for photomultiplier tubes and similar camera optics for telescopes and microscopes. Each factor of 10 in intensity corresponds to 10 decibels. In particular, a multiplier of 100 in intensity corresponds to an increase of 20 decibels and also corresponds to a decrease in magnitude by 5. Generally, the change in level is related to a change in magnitude by

dB

For example, an object that is 1 magnitude larger (fainter) than a reference would produce a signal that is 4 dB smaller (weaker) than the reference, which might need to be compensated by an increase in the capability of the camera by as many decibels.

See also

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Notes

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  1. ^ Today astronomers know that the brightness of stars is a function of both their distance and their own luminosity.
  2. ^ Under very dark skies, such as are found in remote rural areas

References

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  1. ^ Crumey, A. (October 2006). "Human Contrast Threshold and Astronomical Visibility". Monthly Notices of the Royal Astronomical Society. 442 (3): 2600–2619. arXiv:1405.4209. Bibcode:2014MNRAS.442.2600C. doi:10.1093/mnras/stu992.
  2. ^ Miles, R. (October 2006). "A light history of photometry: from Hipparchus to the Hubble Space Telescope". Journal of the British Astronomical Association. 117: 172. Bibcode:2007JBAA..117..172M. Retrieved 8 February 2021.
  3. ^ Keill, J. (1739). An introduction to the true astronomy (3rd ed.). London. pp. 47–48.
  4. ^ Thoren, V. E. (1990). The Lord of Uraniborg. Cambridge: Cambridge University Press. p. 306. ISBN 9780521351584.
  5. ^ a b c Graney, C. M.; Grayson, T. P. (2011). "On the Telescopic Disks of Stars: A Review and Analysis of Stellar Observations from the Early 17th through the Middle 19th Centuries". Annals of Science. 68 (3): 351–373. arXiv:1003.4918. doi:10.1080/00033790.2010.507472. S2CID 118007707.
  6. ^ Graney, C. M. (2009). "17th Century Photometric Data in the Form of Telescopic Measurements of the Apparent Diameters of Stars by Johannes Hevelius". Baltic Astronomy. 18 (3–4): 253–263. arXiv:1001.1168. Bibcode:2009BaltA..18..253G.
  7. ^ Ewing, A.; Gemmere, J. (1812). Practical Astronomy. Burlington, NJ: Allison. p. 41.
  8. ^ Hoskin, M. (1999). The Cambridge Concise History of Astronomy. Cambridge: Cambridge University Press. p. 258.
  9. ^ Tassoul, J. L.; Tassoul, M. (2004). A Concise History of Solar and Stellar Physics. Princeton, NJ: Princeton University Press. p. 47. ISBN 9780691117119.
  10. ^ "Glossary". JPL. Archived from the original on 2017-11-25. Retrieved 2017-11-23.
  11. ^ "Seeing stars and planets in the daylight". sky.velp.info. Archived from the original on 7 March 2016. Retrieved 8 May 2018.
  12. ^ "The astronomical magnitude scale". www.icq.eps.harvard.edu. Retrieved 2020-12-17.
  13. ^ Illingworth, G. D.; Magee, D.; Oesch, P. A.; Bouwens, R. J.; Labbé, I.; Stiavelli, M.; van Dokkum, P. G.; Franx, M.; Trenti, M.; Carollo, C. M.; Gonzalez, V. (21 October 2013). "The HST eXtreme Deep Field XDF: Combining all ACS and WFC3/IR Data on the HUDF Region into the Deepest Field Ever". The Astrophysical Journal Supplement Series. 209 (1): 6. arXiv:1305.1931. Bibcode:2013ApJS..209....6I. doi:10.1088/0067-0049/209/1/6. S2CID 55052332.
  14. ^ "Telescopes". www.jaymaron.com. Archived from the original on 1 August 2017. Retrieved 14 September 2017. (retrieved 14 September 2017)
  15. ^ Johnson, H. L.; Morgan, W. W. (1953). "Fundamental stellar photometry for standards of spectral type on the revised system of the Yerkes spectral atlas". The Astrophysical Journal. 117: 313. Bibcode:1953ApJ...117..313J. doi:10.1086/145697. ISSN 0004-637X.
  16. ^ Oke, J. B.; Gunn, J. E. (1983). "Secondary standard stars for absolute spectrophotometry". The Astrophysical Journal. 266: 713. Bibcode:1983ApJ...266..713O. doi:10.1086/160817. ISSN 0004-637X.
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