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- In [[Euclidean geometry]], a '''rigid motion''' is a transformation which preserves the geometrical properties of the [[3 KB (392 words) - 14:42, 28 November 2008
- 160 bytes (18 words) - 14:46, 28 November 2008
- 930 bytes (146 words) - 14:49, 28 November 2008
Page text matches
- In Euclidean geometry, triangles which can be superposed by a rigid motion.111 bytes (15 words) - 14:40, 28 November 2008
- In [[Euclidean geometry]], a '''rigid motion''' is a transformation which preserves the geometrical properties of the [[3 KB (392 words) - 14:42, 28 November 2008
- ...translated and rotated without change of shape. Such a map is called a ''[[rigid motion]]'' of the figure. The totality of rigid motions form a [[group]] of infini1 KB (163 words) - 15:47, 25 November 2008
- ...idean geometry]], the relation between figures that can be superposed by [[rigid motion]]s645 bytes (93 words) - 12:51, 31 May 2009
- {{r|Rigid motion}}559 bytes (73 words) - 18:06, 11 January 2010
- {{r|Rigid motion}}566 bytes (74 words) - 16:25, 11 January 2010
- {{r|Rigid motion}}616 bytes (79 words) - 07:47, 8 January 2010
- {{r|Rigid motion}}739 bytes (92 words) - 17:31, 11 January 2010
- {{r|Rigid motion}}1,019 bytes (129 words) - 03:09, 8 March 2024
- ...uclidean geometry]], two [[triangle]]s are '''congruent''' if there is a [[rigid motion]] which brings one triangle exactly onto the other ("superposition"). Sinc2 KB (246 words) - 14:37, 28 November 2008
- {{r|Rigid motion}}886 bytes (141 words) - 14:42, 28 November 2008
- *[[rigid motion]]2 KB (177 words) - 03:10, 8 March 2024
- ...ola can be moved to any other parabola with the same focal distance by a [[rigid motion]].4 KB (730 words) - 03:09, 8 March 2024
- ...φ and two points ''P'' and ''P''′ then there exists exactly one rigid motion which sends ''P'' into ''P''′ and induces φ on ''V''.15 KB (2,366 words) - 09:09, 4 April 2010
- '''Euler's theorem on rotation''' is the statement that in space a [[rigid motion]] which has a fixed point always has an axis (of rotation), i.e., a straigh12 KB (1,865 words) - 02:49, 19 April 2010