\(e(U_1+U_2,V_1) =e(U_1,V_1) \times e(U_2,V_1)\)
\(e(U_1,V_1+V_2) =e(U_1,V_1) \times e(U_1,V_2)\)
If \(U\) is a point on \(G_1\), and \(V\) is a point on \(G_2\), we get:
\(e(aU,bV)=e(bU,aV)\)
In this example, we will prove these mappings for a pairing for \(e(aU,bV)=e(abU,V)\).