Prime Order $\Rightarrow$ Cyclic $\Rightarrow$ Abelian

Asked Nov 02 '19 at 19:31

Active Nov 02 '19 at 19:43

Viewed 115 times

Is this correct?

If a group has prime order $p$, then it is cyclic since it all nonidentity elements have order $p$ by Cauchy's theorem.

If it is cyclic, then it is abelian since every element is a power of the generator.

Thus, every group of prime order is abelian.

edited Nov 02 '19 at 19:43

asked Nov 02 '19 at 19:31

Peter_Pan

1

Yep! Although it seems you mean "group" rather than "subgroup" in the first sentence. – Greg Martin Nov 02 '19 at 19:37
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The duplicate has many different proofs, i.e., using either Lagrange, or Cauchy based on Lagrange, or even Cauchy without Lagrange. – Dietrich Burde Nov 02 '19 at 19:41

0 Answers0