The History of Having Settled To Accomplish Studies

Theorem

A group homomorphism preserves inverses elements. That is, for groups $(G,\ast)$ and $(K,\star)$ , and a homomorphism $\phi\colon G\to K$ , $\phi(x^{-1})=\phi(x)^{-1}$ .

{proof}

Fix an $x\in G$ . Observe that

\phi(x\ast x^{-1})=\phi(1_{G})=\phi(x)\star\phi(x^{-1})

(1)

Recall that, for any group homomorphism $\phi\colon G\to K$ ,

\phi(1_{G})=1_{K}

(2)

In other , homomorphisms preserve identity. ¹¹A proof for that statement is attached to the . It follows from (1) and (2) that

\phi(x)\star\phi(x^{-1})=1_{K}

(3)

Because the inverse of any group is unique, the only value of $\phi(x^{-1})$ whose product with $\phi(x)$ is $1_{K}$ is, of course, $\phi(x)^{-1}$ . Therefore, all group homomorphisms preserve the inverse.

Title	The History of Having Settled To Accomplish Studies
Canonical name	TheHistoryOfHavingSettledToAccomplishStudies
Date of creation	2013-11-27 10:59:44
Last modified on	2013-11-27 10:59:44
Owner	jacou (1000048)
Last modified by	(0)
Numerical id	14
Author	jacou (0)
Entry type	Proof
Classification	msc 20A05