Parsec
From Academic Kids

 This article is about the unit of length. In computer programming, Parsec [1] (http://research.microsoft.com/~emeijer/Papers/Parsec.pdf) is an XML syntax analyzer, like Lark, or a parsing library for the Haskell programming language [2] (http://www.cs.uu.nl/~daan/parsec.html). There is also a FLOSS computer game named Parsec [3] (http://openparsec.sourceforge.net/).
The parsec (symbol pc) is a unit of length used in astronomy. It stands for "parallax of one arc second", and is approximately 19,131,554,073,600 (19 trillion) miles.
It is based on the method of trigonometric parallax, the most ancient and standard method of determining stellar distances. The angle subtended (http://www.answers.com/subtended) at a star by the mean radius of the Earth's orbit, around the Sun, is called the parallax. The parsec is defined to be the distance from the Earth of a star that has a parallax of 1 arcsecond. Alternatively, the parsec is the distance at which two objects, separated by 1 astronomical unit, appear to be separated by an angle of 1 arcsecond. It is, therefore, approximately:
 <math>\frac{360\cdot60\cdot60}{2\pi}<math> AU = 206,265 AU = 3.08568×10^{16} m = 30.8568 Pm (petametres) = 3.2616 ly (lightyears).
See 1 E16 m for a list of comparable lengths and scientific notation for an explanation of the notation.
Astronomers usually express distances to astronomical objects in units of parsecs, instead of lightyears. This is both for historical reasons, and because it avoids including conversion factors such as the length of an astronomical unit, which was not known to a high level of precision until the latter part of the 20th century. The first direct measurements of an object at interstellar distances (of the star 61 Cygni, by Friedrich Wilhelm Bessel in 1838) were done using trigonometry using the width of the Earth's orbit as a baseline. The parsec follows naturally from this method, since the distance (in parsecs) is simply the reciprocal of the parallax angle (in arcseconds).
Though it had probably been used before, the term parsec was first mentioned in an astronomical publication in 1913, when Frank Watson Dyson expressed his concern for the need of a name for that unit of distance. He himself proposed the name astron, while Carl Charlier had suggested siriometer. However, Herbert Hall Turner's suggestion, parsec, was eventually adopted.
There is no star whose parallax is 1 arcsecond. The greater the parallax of the star the closer it is to the Earth, and the smaller its distance in parsecs. Therefore the closest star to the Earth will have the largest measured parallax. This belongs to the star Proxima Centauri, with a parallax of 0.772 arcseconds, and thus lying approximately 1.29 parsecs, or 4.22 lightyears, away from us.
The measurement of distances of celestial bodies from the Earth in parsecs is a key aspect of astrometry, the science of making positional measurements of celestial bodies.
Because of the extremely small scale of parallactic shifts, groundbased parallax methods provide reliable measurements of stellar distances of no more than 325 lightyears, or about 100 parsecs, corresponding to parallaxes of no less than 1/100 of 1 arcsecond, or 10 mas (1 mas or milliarcsecond = 1/1000 arcsecond).
Between 1989 and 1993 the Hipparcos satellite, launched by the European Space Agency (ESA) in 1989, measured parallaxes for about 100,000 stars, with a precision of about 0.97 mas, and obtained accurate measurements for stellar distances of around 1000 pc.
NASA's FAME satellite was due to be launched in 2004, to measure parallaxes for about 40 million stars with sufficient precision to measure stellar distances of up to 2000 pc. However, the mission's funding was withdrawn by NASA in January 2002.
The ESA's GAIA satellite, due to be launched in mid2012, will be of sufficiently high astrometric precision to measure stellar distances to within 10% accuracy as far as the galactic centre about 8 kpc away in the Sagittarius constellation.
Contents 
Distances in parsecs
One kiloparsec, abbreviated kpc, is one thousand parsecs. One megaparsec, abbreviated Mpc, is one million parsecs.
How to calculate the value of a parsec
Missing image
Parsec.png
Image:Parsec.png
In the diagram above (not to scale), S represents the Sun, and E the Earth at one point in its orbit. D is an object at a distance of one parsec from the Sun. By definition, the angle D is one arcsecond and the distance ES is one astronomical unit. By trigonometry, the distance SD is
 <math>SD = {{ES} \over {\tan 1''}} = 206 265 \mbox{ au}<math>
One astronomical unit is equal to approximately 1.49598×10^{8} km, so
 <math> 1 \mbox{ pc} = 206 265 \times 1.49598 \times 10^{11} \mbox{ m} = 3.08568 \times 10^{16} \mbox{ m} \,<math>
The attoparsec (atto being the prefix indicating 10^{18}) is a unit humorously used by some hackers. It is approximately 3.1 centimetres  just a little over an inch. See also microfortnight.
See also
 conversion of units
 megaparsec
 The Millennium Falcon, "the ship made the Kessel Run in less than twelve parsecs."
External links
 Conversion Calculator for Units of LENGTH (http://www.ex.ac.uk/trol/scol/index.htm)bg:Парсек
ca:Prsec cs:Parsek da:Parsec de:Parsec et:Parsek es:Prsec eo:Parseko fr:Parsec io:Parseko id:Parsec it:Parsec hu:Parszek ko:파섹 nl:Parsec ja:パーセク pl:Parsek pt:Parsec ro:Parsec ru:Парсек sk:Parsek sl:Parsek sr:Парсек fi:Parsek th:พาร์เซก zh:秒差距