Pinter’s Book of Abstract Algebra

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Pinter’s Book of Abstract Algebra Chapter 11, Exercise D5

Posted on July 23, 2020 | Leave a comment

Problem
Let $G$ be a group and let $a, b \in G$ . Prove the following:
Let $\operatorname{ord}(a)=n$ , and suppose $a$ has a $k$ th root, say $a=b^k$ . Then $\langle a\rangle=\langle b\rangle$ iff $k$ and $n$ are relatively prime.

Proof. Consider the cyclic subgroup of $\mathbb{Z}_{10}$ . For $a = 2$ and $b = 1$ , we have $a = b^2$ , $n = 5$ , and $\gcd(2, 5) = 1$ . However, $\langle 1 \rangle = \mathbb{Z}_{10}$ but $\langle 2 \rangle$ consists of all even numbers of $\mathbb{Z}_{10}$ . Hence $\langle a \rangle \neq \langle b \rangle$ . A contradiction. $\qed$

Category Archives: Pinter’s Book of Abstract Algebra

Pinter’s Book of Abstract Algebra Chapter 11, Exercise D5

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