Difference between revisions of "Elliptical geometry"

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'''Elliptical geometry''' is [[geometry]] on the surface of an [[ellipsoid]]. The simplest and most commonly used form is spherical geometry, in which the major and minor axes of the ellipsoid are equal in length.
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'''Elliptical geometry''' is a term used to refer to [[geometry | geometries]] in which there are no parallel lines and the third axiom of order, which states that, of three points of a straight line, there is one and only one that lies between the other two, cannot be satisfied. One possible representation of elliptical geometry is on a sphere. This is because the closest analogue to lines on a sphere is a great circle, and any two great circles on a sphere must intersect.
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== See Also ==
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* [[Hyperbolic geometry]]
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* [http://www.ams.org/journals/bull/1902-08-10/S0002-9904-1902-00923-3/S0002-9904-1902-00923-3.pdf Mathematical Problems Lecture]
  
 
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[[Category:Geometry]]
 
[[Category:Geometry]]

Latest revision as of 11:22, 20 November 2012

Elliptical geometry is a term used to refer to geometries in which there are no parallel lines and the third axiom of order, which states that, of three points of a straight line, there is one and only one that lies between the other two, cannot be satisfied. One possible representation of elliptical geometry is on a sphere. This is because the closest analogue to lines on a sphere is a great circle, and any two great circles on a sphere must intersect.


See Also

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