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x2y29. (2008湖北文)已知双曲线C:2?2?1(a?0,b?0)的两个焦点为F:(?2,0),F:(2,0),点P(3,7)的曲线C上.
ab (Ⅰ)求双曲线C的方程;
(Ⅱ)记O为坐标原点,过点Q (0,2)的直线l与双曲线C相交于不同的两点E、F,若△OEF的面积为22,求直线
l的方程
10. (2008湖北理)如图,在以点O为圆心,|AB|=4为直径的半圆ADB中,OD⊥AB,P是半圆弧上一点, ∠POB=30°,曲线C是满足||MA|-|MB||为定值的动点M的轨迹,且曲线C过点P. (Ⅰ)建立适当的平面直角坐标系,求曲线C的方程; (Ⅱ)设过点D的直线l与曲线C相交于不同的两点E、F. 若△OEF的面积不小于...2.2,求直线l斜率的取值范围.
(Ⅱ)解法1:依题意,可设直线l的方程为y=kx+2,代入双曲线C的方程并整理得(1-K2)x2-4kx-6=0. ∵直线l与双曲线C相交于不同的两点E、F, ∴
1?k2?0,??(?4k)?4?6(1?k)?0,22?
k??1,?3?k?3.
∴k∈(-3,-1)∪(-1,1)∪(1,3). 设E(x,y),F(x2,y2),则由①式得x1+x2=|EF|=(x1?x2)2?(y1?x2)2?224k6,于是 ,xx??1221?k1?k223?k21?k2(1?k2)(x1?x2)2
2=1?k?(x1?x2)?4x1x2?1?k?而原点O到直线l的距离d=
.
21?k2,
2112223?k22223?k?1?k??. ∴S△DEF=d?EF??22221?k21?k1?k若△OEF面积不小于22,即S△OEF?22,则有
223?k21?k2?22?k4?k2?2?0,解得?2?k?2. ③
综合②、③知,直线l的斜率的取值范围为[-2,-1]∪(1-,1) ∪(1, 2).
18.(2008全国Ⅱ卷文、理)设椭圆中心在坐标原点,A(2,,0)B(0,1)是它的两个顶点,直线y?kx(k?0)与AB相交于点D,与椭圆相交于E、F两点.
y (Ⅰ)若ED?6DF,求k的值;
B F (Ⅱ)求四边形AEBF面积的最大值.
D 2x O x2A ?y?1, 18.(Ⅰ)解:依题设得椭圆的方程为4E 直线AB,EF的方程分别为x?2y?2,y?kx(k?0). ··············································· 2分 如图,设D(x0,kx0),E(x1,kx1),F(x2,kx2),其中x1?x2, 且x1,x2满足方程(1?4k)x?4, 故x2??x1?2221?4k2.①
由ED?6DF知x0?x1?6(x2?x0),得x0?由D在AB上知x0?2kx0?2,得x0?所以
1510(6x2?x1)?x2?;
27771?4k2. 1?2k210?,
21?2k71?4k2化简得24k?25k?6?0,
23解得k?或k?.··············································································································· 6分
38(Ⅱ)解法一:根据点到直线的距离公式和①式知,点E,F到AB的距离分别为
x1?2kx1?22(1?2k?1?4k2)h1??,
255(1?4k)h2?x2?2kx2?25?2(1?2k?1?4k2)5(1?4k)2. ······································································ 9分
又AB?22?1?5,所以四边形AEBF的面积为
1AB(h1?h2) 214(1?2k) ?5225(1?4k)2(1?2k)? 21?4kS?1?4k2?4k ?21?4k2≤22,
1时,上式取等号.所以S的最大值为22. ······························ 12分 2解法二:由题设,BO?1,AO?2.
当2k?1,即当k?设y1?kx1,y2?kx2,由①得x2?0,y2??y1?0, 故四边形AEBF的面积为 S?S△BEF?S△AEF
?x2?2y2 ································································································································· 9分
?(x2?2y2)2 22?x2?4y2?4x2y2 22≤2(x2?4y2) ?22,
当x2?2y2时,上式取等号.所以S的最大值为22. ················································· 12分
1x2y2例4、如图,椭圆C:2+2?1(a>b>0)的离心率为,其左焦点到点P(2,1)的距离为10.不过原点2abO的直线l与C相交于A,B两点,且线段AB被直线OP平分.
(Ⅰ)求椭圆C的方程;
(Ⅱ) 求?ABP的面积取最大时直线l的方程.
x2y22 在平面直角坐标系xOy中,已知椭圆C1:2?2?1(a?b?0)的离心率e=,且椭圆C上的点到
3abQ(0,2)的距离的最大值为3.
(1)求椭圆C的方程;
(2)在椭圆C上,是否存在点M(m,n)使得直线l:mx+ny=1与圆O:x2+y2=1相交于不同的两点A、B,
且△OAB的面积最大?若存在,求出点M的坐标及相对应的△OAB的面积;若不存在,请说明理由.
圆锥曲线关于面积的最大值
