题目内容
13.已知过点(2,0)的直线l1交抛物线C:y2=2px于A,B两点,直线l2:x=-2交x轴于点Q.(1)设直线QA,QB的斜率分别为k1,k2,求k1+k2的值;
(2)点P为抛物线C上异于A,B的任意一点,直线PA,PB交直线l2于M,N两点,$\overrightarrow{OM}$$•\overrightarrow{ON}$=2,求抛物线C的方程.
分析 (1)解:设直线AB的方程为x=ky+2,联立$\left\{\begin{array}{l}{{y}^{2}=2px}\\{x=ky+2}\end{array}\right.$可得,y2-2pky-4p=0,设A(x1,y1),B(x2,y2),则可求y1+y2,y1y2,进而可求x1x2,x1+x2,然后根据k1=$\frac{{y}_{1}}{{x}_{1}+2}$,k2=$\frac{{y}_{2}}{{x}_{2}+2}$可求k1+k2,
(2)由(1)可得,直线OA,OB的斜率关系,可求k,由题意不妨取P(0,0),设M(-2,a),N(-2,b),
由$\overrightarrow{OM}•\overrightarrow{ON}$=2,可求ab,然后有kPA=kPM,kPN=kPB,可求p,进而可求抛物线方程
解答 (1)解:设直线AB的方程为x=ky+2,
联立$\left\{\begin{array}{l}{{y}^{2}=2px}\\{x=ky+2}\end{array}\right.$可得,y2-2pky-4p=0,
设A(x1,y1),B(x2,y2),则y1+y2=2pk,y1y2=-4p,
∴x1x2=$\frac{{{(y}_{1}{y}_{2})}^{2}}{4{p}^{2}}$=4,x1+x2=k(y1+y2)+4=2pk2+4,
∵Q(-2,0),
∴k1=$\frac{{y}_{1}}{{x}_{1}+2}$,k2=$\frac{{y}_{2}}{{x}_{2}+2}$
∴k1+k2=$\frac{{y}_{1}}{{x}_{1}+2}$+$\frac{{y}_{2}}{{x}_{2}+2}$=$\frac{{y}_{1}({x}_{2}+2)+{y}_{2}({x}_{1}+2)}{({x}_{1}+2)({x}_{2}+2)}$=$\frac{{y}_{1}(k{y}_{2}+4)+{y}_{2}(k{y}_{1}+4)}{{x}_{1}{x}_{2}+2({x}_{1}+{x}_{2})+4}$=$\frac{2k{y}_{1}{y}_{2}+4({y}_{1}+{y}_{2})}{{{x}_{1}x}_{2}+2({x}_{1}+{x}_{2})+4}$
=$\frac{-8pk+8pk}{{x}_{1}{x}_{2}+2({x}_{1}+{x}_{2})+4}$=0
(2)由(1)可得,直线OA,OB的斜率互为相反数,则有AB⊥x轴,此时k=0
∵点P为抛物线C上异于A,B的任意一点,不妨取P(0,0),
设M(-2,a),N(-2,b),
∵$\overrightarrow{OM}•\overrightarrow{ON}$=4+ab=2,
∴ab=-2,
∵kPA=kPM,kPN=kPB,
∴$\frac{{y}_{1}}{{x}_{1}}=\frac{a}{-2}$,$\frac{{y}_{2}}{{x}_{2}}=\frac{b}{-2}$,
两式相乘可得,$\frac{{y}_{1}{y}_{2}}{{x}_{1}{x}_{2}}=\frac{ab}{4}=-\frac{1}{2}$,
∴$\frac{-4p}{4}=-\frac{1}{2}$,
∴p=$\frac{1}{2}$,抛物线C的方程为:y2=x.
点评 本题主要考查了直线与抛物线的位置关系的应用,求解本题(2)的关键是一般问题特殊化.
阅读快车系列答案| A. | $\frac{π}{4}$ | B. | -$\frac{π}{4}$ | C. | $\frac{7π}{12}$ | D. | -$\frac{7π}{12}$ |