设A(x1,y1),Bx2,y2) ,OA垂直OB ,kOA*kOB=(y1/x1)*(y2/x2)=(y1y2)/(x1x2)=-1,y1y2+x1x2=0
当AB不垂直于x轴时,设直线AB:y=k(x-a),代入y^2=2px,整理得,(k^2)x^2-2[(k^2)a+p]x+(ka)^2=0,
x1x2=[(ka)^2]/(k^2)=a^2,(y1y2)^2=(y1)^2*(y2)^2=2px1*2px2=4p^2*x1x2=4p^2*(a^2),y1y2=-2pa(A,B在x轴两侧,y1*y2<0),y1y2+x1x2=a^2-2pa=a(a-2p)=0,a=2p(AB不过原点,a不等于0),即直线AB过定点(2p,0)
当AB垂直于x轴时,x1=x2,y1=-y2,y1y2+x1x2=(x1)^2-(y1)^2=(x1)^2-2px1=x1(x1-2p)=0,x1=x2=2p,直线AB过定点(2p,0)
综上直线AB过定点(2p,0)
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