proof that $\operatorname{exp}~{}G$ divides $|G|$

The following is a proof that $\operatorname{exp}~{}G$ divides $|G|$ for every finite group $G$ .

Proof.

By the division algorithm, there exist $q,r\in{\mathbb{Z}}$ with $0\leq r<\operatorname{exp}~{}G$ such that $|G|=q(\operatorname{exp}~{}G)+r$ . Let $g\in G$ . Then $e_{G}=g^{|G|}=g^{q(\operatorname{exp}~{}G)+r}=g^{q(\operatorname{exp}~{}G)}g^{% r}=(g^{\operatorname{exp}~{}G})^{q}g^{r}=(e_{G})^{q}g^{r}=e_{G}g^{r}=g^{r}$ . Thus, for every $g\in G$ , $g^{r}=e_{G}$ . By the definition of exponent, $r$ cannot be positive. Thus, $r=0$ . It follows that $\operatorname{exp}~{}G$ divides $|G|$ . ∎

Title	proof that $\operatorname{exp}~{}G$ divides $\|G\|$
Canonical name	ProofThatoperatornameexpGDividesG
Date of creation	2013-03-22 13:30:32
Last modified on	2013-03-22 13:30:32
Owner	Wkbj79 (1863)
Last modified by	Wkbj79 (1863)
Numerical id	10
Author	Wkbj79 (1863)
Entry type	Proof
Classification	msc 20D99

proof that exp⁡G divides |G|

Proof.

proof that $\operatorname{exp}~{}G$ divides $|G|$