设ABCD为四边形,AB×CD=E,AD×BC=F,AC×BD=O.过O作l/∥AB交CD,EF于G,H(如图2-3).求证:O
设ABCD为四边形,AB×CD=E,AD×BC=F,AC×BD=O.过O作l/∥AB交CD,EF于G,H(如图2-3).求证:OG=GH.
【正确答案】:证明 视ABCD为完全四点形,则OEF为其对边三点形.
因此
E(BG,OH)=-1.
以l截此调和线束,得(P∞G,OH)=-1,其中P∞=l×AB.故OG=GH.
设ABCD为四边形,AB×CD=E,AD×BC=F,AC×BD=O.过O作l/∥AB交CD,EF于G,H(如图2-3).求证:OG=GH.