Order
- Page ID
- 19071
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If G is a group consisting of a finite number of elements, this number of elements is the order of G. For example, the point group m3m has order 48.
For an element g of a (not necessarily finite) group G, the order of g is the smallest integer n such that gn is the identity element of G. If no such integer exists, g is of infinite order. For example, the rotoinversion 3 has order 6 and a translation has infinite order. An element of order 2 is called an involution.