--- title: "Groups Simplified" date: 2019-12-10T21:40:00-05:00 draft: false tags: [ "Math" ] math: true medium_enabled: true --- This post is inspired by the book "Term Rewriting & All That" by Franz Baader and Tobias Nipkow. Let us have a set $G$ together with a binary operation $*$. We will use multiplicative notation throughout meaning $ab = a * b$. Let $x, y, z \in G$. If $\langle G , * \rangle$ has the following properties: 1. $(x y)z = x (y z)$ 2. $ex = x$ 3. $x^{-1} x = e$ for some fixed $e \in G$, then we say that $\langle G, * \rangle$ is a group. In class, we needed to show that $xe = x$ and $xx^{-1} = e$. However, these can be derived by the prior properties. ### Prove $xx^{-1} = e$ \begin{align*} e &= (xx^{-1})^{-1}(x x^{-1}) \\\\ &= (xx^{-1})^{-1} (x (ex^{-1})) \\\\ &= (xx^{-1})^{-1} (x ((x^{-1} x) x^{-1})) \text{ ----- (A)} \\\\ &= (x x^{-1})^{-1} (x (x^{-1} x)x^{-1}) \\\\ &= (x x^{-1})^{-1}((x x^{-1})xx^{-1}) \\\\ &= (x x^{-1})^{-1} ((xx^{-1}) (x x^{-1})) \\\\ &= ((x x^{-1})^{-1}(x x^{-1})) (x x^{-1}) \\\\ &= e(xx^{-1}) \\\\ &= xx^{-1} \end{align*} ### Prove $xe = x$ Once we showed $xx^{-1} = e$, the proof of $xe = e$ is simple. \begin{align*} x &= ex \\\\ &= (xx^{-1})x \\\\ &= x(x^{-1}x) \\\\ &= xe \end{align*}