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Difference between revisions of "Euclidean mapping"

From Online Dictionary of Crystallography

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The '''Euclidean mapping''' is a special case of [[affine mapping]] that, besides collinearity and ratios of distances, keeps also ''distances'' and ''angles''. Because of this, a Euclidean mapping is also called a ''rigid motion''.
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The '''Euclidean mapping''' or '''isometry''' is a special case of [[affine mapping]] that, besides collinearity and ratios of distances, keeps also ''distances'' and ''angles''. Because of this, a Euclidean mapping is also called a ''rigid motion''.
  
 
Euclidean mappings are of three types:
 
Euclidean mappings are of three types:

Revision as of 14:05, 30 April 2012

Transformation Euclidienne (Fr). Transformazione Euclidiana (It). ユークリッド写像 (Ja)


The Euclidean mapping or isometry is a special case of affine mapping that, besides collinearity and ratios of distances, keeps also distances and angles. Because of this, a Euclidean mapping is also called a rigid motion.

Euclidean mappings are of three types:

  • translations
  • rotations
  • reflections.

A special case of Euclidean mapping is a symmetry operation.