Equivalence relation/Group elements under inner automorphisms/Exercise

Let ${\displaystyle {}G}$ be a group. We consider the relation ${\displaystyle {}R}$ on ${\displaystyle {}G}$, where ${\displaystyle {}xRy}$ means that there exists an inner automorphism ${\displaystyle {}\kappa _{g}}$ with ${\displaystyle {}x=\kappa _{g}(y)}$. Show that this relation is an equivalence relation.