Cancellation Laws/Proof 3
Corollary to Group has Latin Square Property
Let $G$ be a group.
Let $a, b, c \in G$.
Then the following hold:
- Right cancellation law
- $b a = c a \implies b = c$
- Left cancellation law
- $a b = a c \implies b = c$
Proof
Suppose $x = b a = c a$.
By Group has Latin Square Property, there exists exactly one $y \in G$ such that $x = y a$.
That is, $x = b a = c a \implies b = c$.
Similarly, suppose $x = a b = a c$.
Again by Group has Latin Square Property, there exists exactly one $y \in G$ such that $x = a y$.
That is, $a b = a c \implies b = c$.
$\blacksquare$
Sources
- 1966: Richard A. Dean: Elements of Abstract Algebra ... (previous) ... (next): $\S 1.4$: Theorem $1$ Corollary