Group theory MOC

Group order

The order |๐บ| of a group ๐บ is the number of elements in that group. #m/def/group Similarly order |๐‘Ž| of an element ๐‘Ž โˆˆ๐บ is the smallest integer ๐‘› such that ๐‘Ž๐‘› =๐‘’, #m/def/group where ๐‘Ž is said to have infinite order if no such ๐‘› exists. The reason for this dual naming and notation is the order of a cyclic group equals the order of its generator.

Properties


#state/tidy | #lang/en | #SemBr

Footnotes

  1. See Gallian ยง3 exercise 50 โ†ฉ