题目内容
1.已知抛物线y2=2px的准线方程为x=-1焦点为F,A,B,C为该抛物线上不同的三点,$\overrightarrow{\left|{FA}\right|},\overrightarrow{\left|{FB}\right|},\overrightarrow{\left|{FC}\right|}$成等差数列,且点B在x轴下方,若$\overrightarrow{FA}+\overrightarrow{FB}+\overrightarrow{FC}=0$,则直线AC的方程为2x-y-1=0.分析 根据抛物线的准线方程求出p,设A,B,C的坐标,根据$\overrightarrow{\left|{FA}\right|},\overrightarrow{\left|{FB}\right|},\overrightarrow{\left|{FC}\right|}$成等差数列,且点B在x轴下方,若$\overrightarrow{FA}+\overrightarrow{FB}+\overrightarrow{FC}=0$,求出x1+x3=2,x2=1,然后求出直线AC的斜率和A,C的中点坐标,进行求解即可.
解答 解:抛物线的准线方程是x=-$\frac{p}{2}$=-1,∴p=2,
即抛物线方程为y2=4x,F(1,0)
设A(x1,y1),B(x2,y2),C(x3,y3),
∵|$\overrightarrow{FA}$|,|$\overrightarrow{FB}$|,|$\overrightarrow{FC}$|成等差数列,
∴|$\overrightarrow{FA}$|+|$\overrightarrow{FC}$|=2|$\overrightarrow{FB}$|,
即x1+1+x3+12(x2+1),
即x1+x3=2x2,
∵$\overrightarrow{FA}+\overrightarrow{FB}+\overrightarrow{FC}=0$,
∴(x1-1+x2-1+x3-1,y1+y2+y3)=0,
∴x1+x2+x3=3,y1+y2+y3=0,
则x1+x3=2,x2=1,
由y22=4x2=4,则y2=-2或2(舍),
则y1+y3=2,
则AC的中点坐标为($\frac{{x}_{1}+{x}_{3}}{2}$,$\frac{{y}_{1}+{y}_{3}}{2}$),即(1,1),
AC的斜率k=$\frac{{y}_{1}-{y}_{3}}{{x}_{1}-{x}_{3}}$=$\frac{{y}_{1}-{y}_{3}}{\frac{{{y}_{1}}^{2}}{4}-\frac{{{y}_{3}}^{2}}{4}}$=$\frac{4}{{y}_{1}+{y}_{3}}$=$\frac{4}{2}$=2,
则直线AC的方程为y-1=2(x-1),
即2x-y-1=0,
故答案为:2x-y-1=0
点评 本题主要考查直线和抛物线的位置关系,根据条件求出直线AB的斜率和AB的中点坐标是解决本题的关键.综合性较强,难度较大.
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