假设四边形为ABCD,对角线AC=m,BD=n,对角线夹角为α,由sin(180°-α)=sinα,我们知道sin∠AOB=sin∠BOC=sin∠COD=sin∠AOD=sinα,
因为四边形ABCD的面积=S△AOB+S△BOC+S△COD+S△AOD,
而S△AOB=0.5*OA*OB*sin∠AOB;
S△BOC=0.5*OB*OC*sin∠BOC;
S△COD=0.5*OC*OD*sin∠COD;
S△AOD=0.5*OA*OD*sin∠AOD;
左右两边相加,得:
S△AOB+S△BOC+S△COD+S△AOD=0.5*OA*OB*sin∠AOB+0.5*OB*OC*sin ∠BOC+0.5*OC*OD*sin∠COD+0.5*OA*OD*sin∠AOD
=0.5sinα(OA*OB+OB*OC+OC*OD+OA*OD)
=0.5sinα[OB*(OA+OC)+OD*(OA+OC)]
=0.5sinα(OA+OC)*(OB+OD)
=0.5sinα*m*n
=1/2*m*n*sinα
即四边形的面积为1/2*m*n*sinα