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{{Infobox Unit | |||
| name = Steradian | |||
| image = [[File:Steradian.svg|150px]] | |||
| caption = A graphical representation of 1 steradian.{{br}}The sphere has radius ''r'', and in this case the area ''A'' of the highlighted surface patch is ''r''{{sup|2}}. The solid angle Ω equals {{nowrap|''A''/''r''<sup>2</sup>}} which equals 1 in this example. The entire sphere has a solid angle of {{gaps|4π|sr}}. | |||
| standard = [[SI derived unit]] | |||
| quantity = [[Solid angle]] | |||
| symbol = {{unicode|㏛}} | |||
}} | |||
The '''steradian''' (symbol: '''sr''') or '''squared radian''' is the [[International System of Units|SI unit]] of [[solid angle]]. It is used in three-[[dimension]]al space, and functions analogously to the manner in which the [[radian]] quantifies [[planar angles]]. The name is derived from the [[Greek language|Greek]] ''stereos'' for "solid" and the [[Latin language|Latin]] ''radius'' for "ray, beam". | |||
The steradian, like the radian, is [[Dimensionless quantity|dimensionless]], essentially because a solid angle is the ratio between the area subtended and the square of its distance from the vertex: both the numerator and denominator of this ratio have dimension length squared. It is useful, however, to distinguish between dimensionless quantities of different nature, so in practice the symbol "sr" is used to indicate a solid angle. For example, [[radiant intensity]] can be measured in watts per steradian (W·sr<sup>−1</sup>). The steradian was formerly an [[SI supplementary unit]], but this category was abolished from the SI in 1995 and the steradian is now considered an [[SI derived unit]]. | |||
==Definition== | |||
[[File:Steradian cone and cap.svg|thumb|right|Section of cone (1) and spherical cap (2) that subtend a solid angle of one steradian inside a sphere]] | |||
A steradian can be defined as the solid angle [[subtended angle|subtended]] at the center of a [[unit sphere]] by a unit [[area]] on its surface. For a general sphere of [[radius]] ''r'', any portion of its surface with area ''A'' = r<sup>2</sup> subtends one steradian.<ref>"Steradian", ''McGraw-Hill Dictionary of Scientific and Technical Terms'', fifth edition, Sybil P. Parker, editor in chief. McGraw-Hill, 1997. ISBN 0-07-052433-5.</ref> | |||
The solid angle in steradians is related to the area it cuts out of a sphere: | |||
::<math>\Omega = \frac{A}{r^2} \,</math> | |||
:where | |||
::''A'' is the surface area of the [[spherical cap]], 2π''rh'', and | |||
::''r'' is the radius of the sphere. | |||
Because the surface area ''A'' of a sphere is 4π''r''<sup>2</sup>, the definition implies that a sphere measures 4π ≈ 12.56637 steradians. By the same argument, the maximum solid angle that can be subtended at any point is 4π sr. | |||
==Other properties== | |||
Since ''A'' = ''r''<sup>2</sup>, it corresponds to the area of a [[spherical cap]] (''A'' = 2π''rh'') (wherein ''h'' stands for the "height" of the cap), and the relationship ''h''/''r'' = 1/(2π) holds. Therefore one steradian corresponds to the plane (i.e. radian) angle of the cross-section of a simple cone subtending the plane angle ''2θ'', with ''θ'' given by: | |||
:<math> | |||
\begin{align} | |||
\theta & = \arccos \left( \frac{r-h}{r} \right)\\ | |||
& = \arccos \left( 1 - \frac{h}{r} \right)\\ | |||
& = \arccos \left( 1 - \frac{1}{2\pi} \right) \approx 0.572 \,\text{ rad,} \mbox{ or } 32.77^\circ. | |||
\end{align} | |||
</math> | |||
This angle corresponds to the plane aperture angle of 2''θ'' ≈ 1.144 rad or 65.54°. | |||
A steradian is also equal to the spherical area of a [[polygon]] having an [[angle excess]] of 1 radian, to 1/(4π) of a complete [[sphere]], or to (180/π)<sup>2</sup> ≈ 3282.80635 [[square degree]]s. | |||
The solid angle in steradians of a cone whose cross-section subtends the angle ''θ'' is: | |||
:<math>\Omega = 2\pi\left(1 - \cos\theta\right)</math>. | |||
==Analogue to radians== | |||
In two dimensions, the angle in radians is related to the [[arc length]] it cuts out: | |||
::<math>\theta = \frac{l}{r} \,</math> | |||
:where | |||
::''l'' is arc length, and | |||
::''r'' is the radius of the circle. | |||
Now in three dimensions, the solid angle in steradians is related to the area it cuts out: | |||
::<math>\Omega = \frac{A}{r^2} \,</math> | |||
:where | |||
::''A'' is the surface area of the [[spherical cap]], 2π''rh'', and | |||
::''r'' is the radius of the sphere. | |||
==SI multiples== | |||
Steradians only go up to 4π ≈ 12.56637, so the large multiples are not usable for the base unit, but could show up in such things as rate of coverage of solid angle, for example. | |||
[[File:BlankMap-World6 steradian.svg|thumb|none|400px|Solid angle of various areas relative to Earth]] | |||
{|class="wikitable" | |||
! Multiple | |||
! Name | |||
! Symbol | |||
! May be visualized as... | |||
|- | |||
|10<sup>1</sup> | |||
| decasteradian | |||
|dasr | |||
|Surface area of the [[Americas]] plus [[sea|liquid water]] on Earth, relative to [[Earth]] <span style="color:#000000;background:#ccffff;padding:0 0.2em;">(cyan on map)</span><ref>10.0 sr (404 million km² out of 510 million km²)</ref> | |||
All constellations ''except'' those of the [[zodiac]] together subtend 0.992 dasr. | |||
|- | |||
|10<sup>0</sup> | |||
| '''steradian''' | |||
|sr | |||
|Area of [[Oceania]] plus [[Asia]] excluding [[Russia]], relative to Earth <span style="color:#000000;background:#ffff00;padding:0 0.2em;">(yellow on map)</span><ref>1.01 sr (40.8 million km² out of 510 million km²)</ref> | |||
The [[Heavenly_Waters_(astronomy)#Heavenly_Waters|Heavenly Waters]] [[constellation family]] subtends 1.16 sr. | |||
|- | |||
|10<sup>−1</sup> | |||
| decisteradian | |||
|dsr | |||
|Area of [[Algeria]] plus [[Libya]], relative to Earth <span style="color:#000000;background:#00ff00;padding:0 0.2em;">(green on map)</span><ref>0.102 sr (4.14 million km² out of 510 million km²)</ref> | |||
The constellation [[Lupus (constellation)|Lupus]] subtends 1.02 dsr. | |||
|- | |||
|10<sup>−2</sup> | |||
| centisteradian | |||
| csr | |||
|Area of [[Zimbabwe]], relative to Earth <span style="color:white;background:#0000ff;padding:0 0.2em;">(blue on map)</span><ref>0.00963 sr (391 000 km² out of 510 million km²); [[Paraguay]], at 0.0100 sr (407 000 km²) is closer to 1 csr, but has been shaded for the 10 sr region as part of the Americas</ref> | |||
The smallest constellation, [[Crux]] subtends 2.09 csr. | |||
|- | |||
|10<sup>−3</sup> | |||
| millisteradian | |||
| msr | |||
|Area of [[Switzerland]], relative to Earth <span style="color:white;background:#ff0000;padding:0 0.2em;">(red on map)</span><ref>0.00102 sr (41 300 km² out of 510 million km²)</ref> | |||
The Earth, viewed from the Moon, subtends 1.2 msr.<ref>[http://lunarscience.nasa.gov/?question=3318 Near-side/far-side impact crater counts | NASA Lunar Science Institute]</ref> | |||
|- | |||
|10<sup>−6</sup> | |||
| microsteradian | |||
| µsr | |||
|Area of [[Costa Mesa, California]], relative to Earth<ref>0.00000100 sr (40.7 km² out of 510 million km²)</ref> | |||
The Sun and the Moon, viewed from Earth, each subtends 60 µsr. | |||
|- | |||
|10<sup>−9</sup> | |||
| nanosteradian | |||
|nsr | |||
|About 8 [[American football]] fields, relative to Earth | |||
[[Mars]], viewed from Earth at its closest approach, subtends 11 nsr.<ref>π × (25.113 / 60 / 60 / 2)<sup>2</sup> / 3282.80635 × 1000000000</ref> | |||
|- | |||
|10<sup>−12</sup> | |||
| picosteradian | |||
|psr | |||
|Area of a small apartment, relative to Earth | |||
[[Pluto]], viewed from Earth at its closest approach, subtends 0.24 psr.<ref>π × (0.115 / 60 / 60 / 2)<sup>2</sup> / 3282.80635 × 1000000000</ref> | |||
|- | |||
|10<sup>−15</sup> | |||
| femtosteradian | |||
|fsr | |||
|Area of a sheet of [[A5 paper]], relative to Earth | |||
[[Alpha Centauri]] A, viewed from Earth, subtends 0.9 fsr.<ref>π × (0.007 / 60 / 60 / 2)<sup>2</sup> / 3282.80635 × 1000000000</ref> | |||
|- | |||
|10<sup>−18</sup> | |||
| attosteradian | |||
|asr | |||
|Area of a quarter-inch square, relative to Earth | |||
[[Proxima Centauri]], viewed from Earth, subtends 20 asr.<ref>π × (0.001 / 60 / 60 / 2)<sup>2</sup> / 3282.80635 × 1000000000</ref> | |||
|- | |||
|10<sup>−21</sup> | |||
| zeptosteradian | |||
| zsr | |||
|Cross-sectional area of 32 [[American wire gauge|gauge]] wire, relative to Earth | |||
|- | |||
|10<sup>−24</sup> | |||
| yoctosteradian | |||
| ysr | |||
|Surface area of a [[red blood cell]], relative to Earth | |||
|- | |||
|} | |||
==See also== | |||
* [[Square degree]] | |||
* [[List of constellations by area]] | |||
== Notes and references == | |||
{{Reflist|2}} | |||
{{SI units}} | |||
[[Category:Natural units]] | |||
[[Category:SI derived units]] | |||
[[Category:Units of angle]] | |||
Revision as of 18:20, 10 January 2014
Template:Infobox Unit The steradian (symbol: sr) or squared radian is the SI unit of solid angle. It is used in three-dimensional space, and functions analogously to the manner in which the radian quantifies planar angles. The name is derived from the Greek stereos for "solid" and the Latin radius for "ray, beam".
The steradian, like the radian, is dimensionless, essentially because a solid angle is the ratio between the area subtended and the square of its distance from the vertex: both the numerator and denominator of this ratio have dimension length squared. It is useful, however, to distinguish between dimensionless quantities of different nature, so in practice the symbol "sr" is used to indicate a solid angle. For example, radiant intensity can be measured in watts per steradian (W·sr−1). The steradian was formerly an SI supplementary unit, but this category was abolished from the SI in 1995 and the steradian is now considered an SI derived unit.
Definition
A steradian can be defined as the solid angle subtended at the center of a unit sphere by a unit area on its surface. For a general sphere of radius r, any portion of its surface with area A = r2 subtends one steradian.[1]
The solid angle in steradians is related to the area it cuts out of a sphere:
- where
- A is the surface area of the spherical cap, 2πrh, and
- r is the radius of the sphere.
Because the surface area A of a sphere is 4πr2, the definition implies that a sphere measures 4π ≈ 12.56637 steradians. By the same argument, the maximum solid angle that can be subtended at any point is 4π sr.
Other properties
Since A = r2, it corresponds to the area of a spherical cap (A = 2πrh) (wherein h stands for the "height" of the cap), and the relationship h/r = 1/(2π) holds. Therefore one steradian corresponds to the plane (i.e. radian) angle of the cross-section of a simple cone subtending the plane angle 2θ, with θ given by:
This angle corresponds to the plane aperture angle of 2θ ≈ 1.144 rad or 65.54°.
A steradian is also equal to the spherical area of a polygon having an angle excess of 1 radian, to 1/(4π) of a complete sphere, or to (180/π)2 ≈ 3282.80635 square degrees.
The solid angle in steradians of a cone whose cross-section subtends the angle θ is:
- .
Analogue to radians
In two dimensions, the angle in radians is related to the arc length it cuts out:
- where
- l is arc length, and
- r is the radius of the circle.
Now in three dimensions, the solid angle in steradians is related to the area it cuts out:
- where
- A is the surface area of the spherical cap, 2πrh, and
- r is the radius of the sphere.
SI multiples
Steradians only go up to 4π ≈ 12.56637, so the large multiples are not usable for the base unit, but could show up in such things as rate of coverage of solid angle, for example.
| Multiple | Name | Symbol | May be visualized as... |
|---|---|---|---|
| 101 | decasteradian | dasr | Surface area of the Americas plus liquid water on Earth, relative to Earth (cyan on map)[2]
All constellations except those of the zodiac together subtend 0.992 dasr. |
| 100 | steradian | sr | Area of Oceania plus Asia excluding Russia, relative to Earth (yellow on map)[3]
The Heavenly Waters constellation family subtends 1.16 sr. |
| 10−1 | decisteradian | dsr | Area of Algeria plus Libya, relative to Earth (green on map)[4]
The constellation Lupus subtends 1.02 dsr. |
| 10−2 | centisteradian | csr | Area of Zimbabwe, relative to Earth (blue on map)[5]
The smallest constellation, Crux subtends 2.09 csr. |
| 10−3 | millisteradian | msr | Area of Switzerland, relative to Earth (red on map)[6]
The Earth, viewed from the Moon, subtends 1.2 msr.[7] |
| 10−6 | microsteradian | µsr | Area of Costa Mesa, California, relative to Earth[8]
The Sun and the Moon, viewed from Earth, each subtends 60 µsr. |
| 10−9 | nanosteradian | nsr | About 8 American football fields, relative to Earth
Mars, viewed from Earth at its closest approach, subtends 11 nsr.[9] |
| 10−12 | picosteradian | psr | Area of a small apartment, relative to Earth
Pluto, viewed from Earth at its closest approach, subtends 0.24 psr.[10] |
| 10−15 | femtosteradian | fsr | Area of a sheet of A5 paper, relative to Earth
Alpha Centauri A, viewed from Earth, subtends 0.9 fsr.[11] |
| 10−18 | attosteradian | asr | Area of a quarter-inch square, relative to Earth
Proxima Centauri, viewed from Earth, subtends 20 asr.[12] |
| 10−21 | zeptosteradian | zsr | Cross-sectional area of 32 gauge wire, relative to Earth |
| 10−24 | yoctosteradian | ysr | Surface area of a red blood cell, relative to Earth |
See also
Notes and references
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- ↑ "Steradian", McGraw-Hill Dictionary of Scientific and Technical Terms, fifth edition, Sybil P. Parker, editor in chief. McGraw-Hill, 1997. ISBN 0-07-052433-5.
- ↑ 10.0 sr (404 million km² out of 510 million km²)
- ↑ 1.01 sr (40.8 million km² out of 510 million km²)
- ↑ 0.102 sr (4.14 million km² out of 510 million km²)
- ↑ 0.00963 sr (391 000 km² out of 510 million km²); Paraguay, at 0.0100 sr (407 000 km²) is closer to 1 csr, but has been shaded for the 10 sr region as part of the Americas
- ↑ 0.00102 sr (41 300 km² out of 510 million km²)
- ↑ Near-side/far-side impact crater counts | NASA Lunar Science Institute
- ↑ 0.00000100 sr (40.7 km² out of 510 million km²)
- ↑ π × (25.113 / 60 / 60 / 2)2 / 3282.80635 × 1000000000
- ↑ π × (0.115 / 60 / 60 / 2)2 / 3282.80635 × 1000000000
- ↑ π × (0.007 / 60 / 60 / 2)2 / 3282.80635 × 1000000000
- ↑ π × (0.001 / 60 / 60 / 2)2 / 3282.80635 × 1000000000