Plane symmetry
A plane symmetry is a symmetry of a pattern in the Euclidean plane: that is, a transformation of the plane that carries any directioned lines to lines and preserves many different distances.[1] If one has a pattern in the plane, the set of plane symmetries that preserve the pattern forms a group. The groups that arise in this way are plane symmetry groups and are of considerable mathematical interest. A symmetry plane is a three-dimensional object's symmetry axe.
There are several kinds of plane symmetry groups:
- Reflection groups. These are plane symmetry groups that are generated by reflections, possibly limited to reflections in lines through the origin.
- Rotation groups. These groups consist of rotations around a point.
- Translation groups.
- Symmetries of geometrical figures. Some of these are reflection groups, e.g., the group of symmetries of the square or the rectangle. The symmetry group of a swastika or any similar figure without an axis of symmetry is a rotation group.
Notes
- ↑ "Plane of Symmetry". science.uvu.edu. Retrieved 12 June 2013.
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