Back Symmetrie (Geometrie) ALS تناظر (هندسة) Arabic প্রতিসাম্য (জ্যামিতি) Bengali/Bangla Symmetrie (Geometrie) German Συμμετρία (γεωμετρία) Greek Simetría (geometría) Spanish Symétrie (transformation géométrique) French Simetri (geometri) Malay Simetrie (geometrie) Romanian
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In geometry, an object has symmetry if there is an operation or transformation (such as translation, scaling, rotation or reflection) that maps the figure/object onto itself (i.e., the object has an invariance under the transform).[1] Thus, a symmetry can be thought of as an immunity to change.[2] For instance, a circle rotated about its center will have the same shape and size as the original circle, as all points before and after the transform would be indistinguishable. A circle is thus said to be symmetric under rotation or to have rotational symmetry. If the isometry is the reflection of a plane figure about a line, then the figure is said to have reflectional symmetry or line symmetry;[3] it is also possible for a figure/object to have more than one line of symmetry.[4]
The types of symmetries that are possible for a geometric object depend on the set of geometric transforms available, and on what object properties should remain unchanged after a transformation. Because the composition of two transforms is also a transform and every transform has, by definition, an inverse transform that undoes it, the set of transforms under which an object is symmetric form a mathematical group, the symmetry group of the object.[5]
- ^ Martin, G. (1996). Transformation Geometry: An Introduction to Symmetry. Springer. p. 28.
- ^ "Symmetry | Thinking about Geometry | Underground Mathematics". undergroundmathematics.org. Retrieved 2019-12-06.
- ^ "Symmetry - MathBitsNotebook(Geo - CCSS Math)". mathbitsnotebook.com. Retrieved 2019-12-06.
- ^ Freitag, Mark (2013). Mathematics for Elementary School Teachers: A Process Approach. Cengage Learning. p. 721.
- ^ Miller, Willard Jr. (1972). Symmetry Groups and Their Applications. New York: Academic Press. OCLC 589081. Archived from the original on 2010-02-17. Retrieved 2009-09-28.
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