This article is about rotational symmetry in mathematics. For the size measure in structural engineering, see radius of gyration. For the motion of a charged particle in an magnetic field, see gyroradius. For the tensor of second moments, see gyration tensor.
For example, having a sphere rotating about any point that is not the center of the sphere, the sphere is gyrating. If it was rotating about its center, the rotation would be symmetrical and it would not be considered gyration.
Referencesedit
^Liebeck, Martin W.; Saxl, Jan; Hitchin, N. J.; Ivanov, A. A. (1992-09-10) [1990]. Groups, Combinatorics & Geometry. Lecture note series. Vol. 165 (illustrated ed.). Symposium, London Mathematical Society: Symposium on Groups and Combinatorics (1990), Durham: Cambridge University Press. ISBN0-52140685-4. ISSN 0076-0552. Retrieved 2010-04-07.{{cite book}}: CS1 maint: location (link) (489 pages)
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gyration, this, article, about, rotational, symmetry, mathematics, size, measure, structural, engineering, radius, gyration, motion, charged, particle, magnetic, field, gyroradius, tensor, second, moments, gyration, tensor, geometry, gyration, rotation, discre. This article is about rotational symmetry in mathematics For the size measure in structural engineering see radius of gyration For the motion of a charged particle in an magnetic field see gyroradius For the tensor of second moments see gyration tensor In geometry a gyration is a rotation in a discrete subgroup of symmetries of the Euclidean plane such that the subgroup does not also contain a reflection symmetry whose axis passes through the center of rotational symmetry In the orbifold corresponding to the subgroup a gyration corresponds to a rotation point that does not lie on a mirror called a gyration point 1 For example having a sphere rotating about any point that is not the center of the sphere the sphere is gyrating If it was rotating about its center the rotation would be symmetrical and it would not be considered gyration References edit Liebeck Martin W Saxl Jan Hitchin N J Ivanov A A 1992 09 10 1990 Groups Combinatorics amp Geometry Lecture note series Vol 165 illustrated ed Symposium London Mathematical Society Symposium on Groups and Combinatorics 1990 Durham Cambridge University Press ISBN 0 52140685 4 ISSN 0076 0552 Retrieved 2010 04 07 a href Template Cite book html title Template Cite book cite book a CS1 maint location link 489 pages nbsp Look up gyration in Wiktionary the free dictionary nbsp This geometry related article is a stub You can help Wikipedia by expanding it vte Retrieved from https en wikipedia org w index php title Gyration amp oldid 1157175386, wikipedia, wiki, book, books, library,
