Introduction to group theory/Problem 1 solution

Proof:

Let $G$ be a group such that for all $a, b, c \in G$

a c = c b ⟹ a = b

.

Let $x, y \in G$ .

By reflexivity $x y x = x y x$ .

Reassociating for clarity $(x y) x = x (y x)$ .

By the assumed cross cancellation we may cancel on each side to obtain

x y = y x

.

Thus cross cancellation implies commutativity.

Q.E.D.

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