Subgroup structure of groups of order 37
This article gives specific information, namely, subgroup structure, about a family of groups, namely: groups of order 37.
View subgroup structure of group families | View subgroup structure of groups of a particular order |View other specific information about groups of order 37
This article gives information on the subgroup structure of groups of order 37. There is one group of this order, namely cyclic group:Z37, since 37 is a prime number. (More generally, a cyclicity-forcing number.)
By Lagrange's theorem, the order of subgroups of a group of order 37 must be 1 or 37. Also, the subgroup of a cyclic group is cyclic.
Thus, the only subgroups of cyclic group:Z37 are cyclic group:Z37 and trivial group.
Since cyclic group:Z37 is abelian, these are normal subgroups. Thus, cyclic group:Z37 is a simple group.
Subgroup-defining functions
| Subgroup-defining function | What it means | Value as subgroup for cyclic group:Z37 |
|---|---|---|
| center | elements that commute with every group element | whole group (cyclic group:Z37) |