Let G be a group with operation ${\displaystyle \ast }$

${\displaystyle \forall \;g\in G:\exists \;g^{-1}\in G:g\ast g^{-1}=g^{-1}\ast g=e_{G}}$

1. If g is in G, g has an inverse g⁻¹ in G
2. b is the inverse of g on group G if

   b is in G, and

   b ${\displaystyle \ast }$ g = g ${\displaystyle \ast }$ b = e_G.

   e_G here again means the Identity of group G.

3. If b is the inverse of g on group G, then

   b is in G, and

   b ${\displaystyle \ast }$ g = g ${\displaystyle \ast }$ b = e_G.

1. G has to be a group