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==Keplerian elements==
 
==Keplerian elements==
 
The traditionally used set of orbital elements is called the set of '''Keplerian elements''', after [[Johannes Kepler]] and his [[Kepler's laws]]. The Keplerian elements are six:
 
The traditionally used set of orbital elements is called the set of '''Keplerian elements''', after [[Johannes Kepler]] and his [[Kepler's laws]]. The Keplerian elements are six:
*[[Inclination]]  
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*[[Inclination]] (<math>i\,\!</math>)
*[[Longitude of the ascending node]]
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*[[Longitude of the ascending node]] <!--(&#9738;-->(<math>\Omega\,\!</math>)
*[[Argument of periapsis]]  
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*[[Argument of periapsis]] (<math>\omega\,\!</math>)
*[[Eccentricity (orbit)|Eccentricity]]  
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*[[Eccentricity (orbit)|Eccentricity]] (<math>e\,\!</math>)
*[[Semimajor axis]]
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*[[Semimajor axis]] (<math>a\,\!</math>)
*[[Mean anomaly]] at epoch  
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*[[Mean anomaly]] at epoch (<math>M_o\,\!</math>)
  
 
We see that the first three orbital elements are simply the Eulerian angles defining the orientation of the orbit relative to some fiducial coordinate system.
 
We see that the first three orbital elements are simply the Eulerian angles defining the orientation of the orbit relative to some fiducial coordinate system.
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The above six elements parameterise a conic orbit emerging in an unperturbed two-body problem - an ellipse, a parabola, or a hyperbola. A realistic perturbed trajectory is represented as a sequence of such instantaneous conics that share one of their foci. In case the orbital elements are postulated to parameterise a sequence of conics that are always tangent to the trajectory, these orbital elements are called osculating.  
 
The above six elements parameterise a conic orbit emerging in an unperturbed two-body problem - an ellipse, a parabola, or a hyperbola. A realistic perturbed trajectory is represented as a sequence of such instantaneous conics that share one of their foci. In case the orbital elements are postulated to parameterise a sequence of conics that are always tangent to the trajectory, these orbital elements are called osculating.  
  
Instead of the [[mean anomaly at epoch]] they often employ the [[mean anomaly]]. Sometimes the [[mean longitude]], or the [[true anomaly]] or, rarely, the [[eccentric anomaly]] are used instead of the mean anomaly at epoch. Sometimes the epoch itself is used as the sixth orbital element,
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Instead of the [[mean anomaly at epoch]], <math>M_o\,\!</math>,  they often employ the [[mean anomaly]] <math>M\,\!</math>. Sometimes the [[mean longitude]], or the [[true anomaly]] or, rarely, the [[eccentric anomaly]] are used instead of the mean anomaly at epoch. Sometimes the epoch itself is used as the sixth orbital element,
 
instead of the mean anomaly at epoch.
 
instead of the mean anomaly at epoch.
  
Keplerian elements can be obtained from [[orbital state vectors]] using [[VEC2TLE software]] or by some direct computations.
+
Keplerian elements can be obtained from [[orbital state vectors]] using [[VEC2TLE software]] or by some [[Orbital state vectors#Relation to orbital elements|direct computations]].
  
 
Other orbital parameters, such as the [[ellipse|period]], can then be calculated from the Keplerian elements. In some cases, the period is used as an orbital element instead of semi-major axis. The elements can be seen as defining the orbit by degrees:
 
Other orbital parameters, such as the [[ellipse|period]], can then be calculated from the Keplerian elements. In some cases, the period is used as an orbital element instead of semi-major axis. The elements can be seen as defining the orbit by degrees:
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Reference:  
 
Reference:  
 
* Explanatory Supplement to the Astronomical Almanac. 1992. K. P. Seidelmann, Ed., University Science Books, Mill Valley, California.
 
* Explanatory Supplement to the Astronomical Almanac. 1992. K. P. Seidelmann, Ed., University Science Books, Mill Valley, California.
 
==Orbiter Elements==
 
<!-- 'Orbiter Elements' section added by Quick_Nick of the Orbiter Forum -->
 
Example:
 
<br>ELEMENTS 6731158 0.0004046 51.6412 163.8597 185.4817 215.0447 54745.343391
 
 
where
 
 
6731158 - Semi-major axis in meters.
 
<br>0.0004046 - Eccentricity.
 
<br>51.6412 - Inclination.
 
<br>163.8597 - Longitude of Ascending Node.
 
<br>185.4817 - Argument of Periapsis.
 
<br>215.0447 - Mean Anomaly.
 
<br>54745.343391 - Epoch in Modified Julian Date.
 
 
Note that the lack of a semi-major axis element or MJD epoch element means that conversion between TLE format and Orbiter's format requires a small amount of math.
 
 
<math>a = \sqrt[3]{(T\div2\pi)^2 \mu}</math>
 
 
<br>(The equation for <math>a</math> is based on ''T'' because ''T'' can be easily derived from the <br>number of seconds in a day divided by a TLE's 'Revolutions per Day' element.)
 
<br><br><math>a</math> is the semi-major axis in meters.
 
<br><math>\mu</math> is the standard gravitational parameter. (398,600,441,800,000 <math>m^3s^{-2}</math> on Earth)
 
<br>''T'' is the orbital period in seconds.
 
<!-- 'Orbiter Elements' section added by Quick_Nick of the Orbiter Forum -->
 
  
 
==See also==
 
==See also==
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* [http://www.amsat.org/amsat/ftp/docs/spacetrk.pdf Spacetrack Report No. 3], a really serious treatment of orbital elements from [[North American Aerospace Defense Command|NORAD]] (in pdf format)
 
* [http://www.amsat.org/amsat/ftp/docs/spacetrk.pdf Spacetrack Report No. 3], a really serious treatment of orbital elements from [[North American Aerospace Defense Command|NORAD]] (in pdf format)
 
* [http://celestrak.com/columns/v04n03/ Celestrak Two-Line Elements FAQ]
 
* [http://celestrak.com/columns/v04n03/ Celestrak Two-Line Elements FAQ]
 
[[Category: Articles]]
 
[[Category:Glossary]]
 

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