Question

已知定點(diǎn)F(1,0),點(diǎn)P在y軸上運(yùn)動(dòng),點(diǎn)M在x軸上,PM⊥PF,設(shè)點(diǎn)M關(guān)于點(diǎn)P的對(duì)稱點(diǎn)為N.

(1)求點(diǎn)N軌跡E的方程;

(2)過F作軌跡E的兩條互相垂直的弦AB、CD,設(shè)AB、CD的中點(diǎn)分別為G、H,求證:直線GH必過定點(diǎn)Q(3,0).

Answer 1

(1)解:設(shè)N(x,y),依題意,則x+x_m=0,y=2y_p.

又PF⊥MN,k_PF·k_MN=-1,

k_PF=-y_p,k_MN=.

代入整理,得y²=4x.

(2)解:設(shè)A(x_a,y_a),B(x_b,y_b),G(x_G,y_G),H(x_H,y_H),直線AB的方程為y=k(x-1),

則①②

①-②,得y_A+y_B=,即y_G=,代入方程y=k(x-1),解得x_G=+1.

所以點(diǎn)G坐標(biāo)為(+1,).9分同理可得:點(diǎn)H的坐標(biāo)為(2k²+1,-2k).

直線GH的斜率為k_GH=,方程為y+2k=(x-2k²-1),

整理,得y(1-k²)=k(x-3),不論k為何值,(3,0)均滿足方程,所以直線GH恒過定點(diǎn)Q(3,0).