Frobenius group: Z7⋊Z3: Difference between revisions
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The group Z7⋊Z3 is the smallest nonabelian group of odd order. | The group Z7⋊Z3 is the smallest nonabelian group of odd order. It is a [[groups of order 21|group of order 21]]. | ||
The group is the [[semidirect product]] of Z7 and Z3. | The group is the [[semidirect product]] of Z7 and Z3. | ||
This group is [[soluble group]]. | This group is [[soluble group]]. | ||
Revision as of 12:35, 5 June 2023
The group Z7⋊Z3 is the smallest nonabelian group of odd order. It is a group of order 21.
The group is the semidirect product of Z7 and Z3.
This group is soluble group.