证明：∵O为中点,P2是P1关于O的对称点∴OP1=OP2,AO=BO∴AO-OP2=BO-OP1即AP2=BP1又∵P1是AB的黄金分割点∴AP1^2=BP1*AB(AP2+P1P2)^2=BP1*(AP2+P1P2+BP1)(BP1+P1P2)^2=BP1*(2BP1+P1P2)BP1^2+P1P2^2+2BP1*P1P2=2BP1^2+B...