题目内容
已知离心率分别为e1、e2的椭圆C1:
+
=1(a>b>0)和双曲线C2:
-
=1的两个公共顶点为A、B,若P、Q分别为双曲线C2和椭圆C1上不同于A、B的动点,O为坐标原点,且满足
=λ
(λ∈R,|λ|>1).如果直线AP、BP、AQ、BQ的斜率依次记为k1、k2、k3、k4.
(1)求证:e12+e22=2;
(2)求证:k1+k2+k3+k4=0.
| x2 |
| a2 |
| y2 |
| b2 |
| x2 |
| a2 |
| y2 |
| b2 |
| OP |
| OQ |
(1)求证:e12+e22=2;
(2)求证:k1+k2+k3+k4=0.
考点:直线与圆锥曲线的综合问题
专题:圆锥曲线中的最值与范围问题
分析:(1)由已知得e1=
=
,e2=
=
,由此能证明e12+e22=2.
(2)设P(x1,y1),Q(x2,y2),x12-a2=
y12,k1+k2=
+
=
×
,k3+k4=
+
=-
×
,由此能证明k1+k2+k3+k4=0.
| c |
| a |
| ||
| a |
| c′ |
| a |
| ||
| a |
(2)设P(x1,y1),Q(x2,y2),x12-a2=
| a2 |
| b2 |
| y1 |
| x1+a |
| y1 |
| x1-a |
| 2b2 |
| a2 |
| x1 |
| y1 |
| y2 |
| x2+a |
| y2 |
| x2-a |
| 2b2 |
| a2 |
| x2 |
| y2 |
解答:
(1)证明:∵离心率分别为e1、e2的椭圆C1:
+
=1(a>b>0)和双曲线C2:
-
=1,
∴由已知得e1=
=
,e2=
=
,
∴e12+e22=
+
=2.
(2)证明:设P(x1,y1),Q(x2,y2),
∵
-
=1,∴x12-a2=
y12,
k1+k2=
+
=
=
×
,①
∵
+
=1,∴x22-a2=-
y22,
∴k3+k4=
+
=
=-
×
,②
∵
=λ
,∴O、P、Q三点共线,
∴
=
,
∴由①②得k1+k2+k3+k4=0.
| x2 |
| a2 |
| y2 |
| b2 |
| x2 |
| a2 |
| y2 |
| b2 |
∴由已知得e1=
| c |
| a |
| ||
| a |
| c′ |
| a |
| ||
| a |
∴e12+e22=
| a2-b2 |
| a2 |
| a2+b2 |
| a2 |
(2)证明:设P(x1,y1),Q(x2,y2),
∵
| x12 |
| a2 |
| y12 |
| b2 |
| a2 |
| b2 |
k1+k2=
| y1 |
| x1+a |
| y1 |
| x1-a |
| 2x1y1 |
| x12-a2 |
| 2b2 |
| a2 |
| x1 |
| y1 |
∵
| x22 |
| a2 |
| y22 |
| b2 |
| a2 |
| b2 |
∴k3+k4=
| y2 |
| x2+a |
| y2 |
| x2-a |
| 2x2y2 |
| x22-a2 |
| 2b2 |
| a2 |
| x2 |
| y2 |
∵
| OP |
| OQ |
∴
| x1 |
| y1 |
| x2 |
| y2 |
∴由①②得k1+k2+k3+k4=0.
点评:本题考查e12+e22=2的证明,考查k1+k2+k3+k4=0的证明,解题时要注意函数与方程思想的合理运用.
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