Theorem[edit | edit source]

Let G be a Group.

1. ${\displaystyle \forall \;g,a,b\in G:(g\ast a=g\ast b)\rightarrow (a=b)}$

2. ${\displaystyle \forall \;g,a,b\in G:(a\ast g=b\ast g)\rightarrow (a=b)}$

Proof[edit | edit source]

0. Choose ${\displaystyle {\color {OliveGreen}g},a,b\in G}$ such that ${\displaystyle {\color {OliveGreen}g}\ast a={\color {OliveGreen}g}\ast b}$
1. ${\displaystyle {\color {BrickRed}g^{-1}}\in G}$	definition of inverse of g in G (usage 1)
2. ${\displaystyle {\color {BrickRed}g^{-1}}\ast ({\color {OliveGreen}g}\ast a)={\color {BrickRed}g^{-1}}\ast ({\color {OliveGreen}g}\ast b)}$	0.
3. ${\displaystyle ({\color {BrickRed}g^{-1}}\ast {\color {OliveGreen}g})\ast a=({\color {BrickRed}g^{-1}}\ast {\color {OliveGreen}g})\ast b}$	${\displaystyle \ast }$ is associative in G
4. ${\displaystyle e_{G}\ast a=e_{G}\ast b}$	g-1 is inverse of g (usage 3)
5. ${\displaystyle a=b\,}$	eG is identity of G(usage 3)

Diagrams[edit | edit source]

Usage[edit | edit source]

1. if a, b, x are in the same group, and x*a = x*b, then a = b

Notice[edit | edit source]

1. a, b, and g have to be all in the same group.
2. ${\displaystyle \ast }$ has to be the binary operator of the group.
3. G has to be a group.