Group theory/Cosets/Properties/Fact/Proof

The equivalence between ${\displaystyle {}(1)}$ and ${\displaystyle {}(3)}$ (and between ${\displaystyle {}(2)}$ and ${\displaystyle {}(4)}$) follows by multiplication with ${\displaystyle {}y^{-1}}$ and with ${\displaystyle {}y}$. The equivalence between ${\displaystyle {}(3)}$ and ${\displaystyle {}(4)}$ follows by going to the inverse elements. From ${\displaystyle {}(1)}$ we get ${\displaystyle {}(5)}$ because of ${\displaystyle {}1\in H}$. If ${\displaystyle {}(5)}$ holds, then this means that ${\displaystyle {}xh_{1}=yh_{2}}$ holds with certain ${\displaystyle {}h_{1},h_{2}\in H}$. Therefore, ${\displaystyle {}x=yh_{2}h_{1}^{-1}}$, and ${\displaystyle {}(1)}$ is satisfied. (4) and (6) are equivalent due to the definition. Since the left cosets are the equivalence classes, the equivalence between (5) and (7) follows.