题目内容
(2013•浙江模拟)已知A,B是双曲线
-y2=1的两个顶点,点P是双曲线上异于A,B的一点,连接PO(O为坐标原点)交椭圆
+y2=1于点Q,如果设直线PA,PB,QA的斜率分别为k1,k2,k3,且k1+k2=-
,假设k3>0,则k3的值为( )
| x2 |
| 4 |
| x2 |
| 4 |
| 15 |
| 8 |
分析:由双曲线
-y2=1可得两个顶点A(-2,0),B(2,0).设P(x0,y0),则
-
=1,可得
=
.于是kPA+kPB=
+
=
=
.同理设Q(x1,y1),由kOP=kOQ得
=
.得到kQA+kQB=-
.可得kPA+kPB+kQA+kQB=0,由kPA+kPB=-
,可得kQA+kQB=
.又kQA•kQB=-
,联立解得kQA.
| x2 |
| 4 |
| ||
| 4 |
| y | 2 0 |
| ||
| 4 |
| y | 2 0 |
| y0 |
| x0+2 |
| y0 |
| x0-2 |
| 2x0y0 | ||
|
| x0 |
| y0 |
| y0 |
| x0 |
| y1 |
| x1 |
| x1 |
| y1 |
| 15 |
| 8 |
| 15 |
| 8 |
| b2 |
| a2 |
解答:解:由双曲线
-y2=1可得两个顶点A(-2,0),B(2,0).设P(x0,y0),则
-
=1,可得
=
.
∴kPA+kPB=
+
=
=
.
设Q(x1,y1),则
+
=1,得到
=-
.
由kOP=kOQ得
=
.
∴kQA+kQB=
+
=
=-
,
∴kPA+kPB+kQA+kQB=0,
∵kPA+kPB=-
,∴kQA+kQB=
…①
又kQA•kQB=-
=-
…②
联立①②解得kQA=2>0.
故选C.
| x2 |
| 4 |
| ||
| 4 |
| y | 2 0 |
| ||
| 4 |
| y | 2 0 |
∴kPA+kPB=
| y0 |
| x0+2 |
| y0 |
| x0-2 |
| 2x0y0 | ||
|
| x0 |
| y0 |
设Q(x1,y1),则
| ||
| 4 |
| y | 2 1 |
| ||
| 4 |
| y | 2 1 |
由kOP=kOQ得
| y0 |
| x0 |
| y1 |
| x1 |
∴kQA+kQB=
| y1 |
| x1+2 |
| y1 |
| x1-2 |
| 2x1y1 | ||
|
| x1 |
| y1 |
∴kPA+kPB+kQA+kQB=0,
∵kPA+kPB=-
| 15 |
| 8 |
| 15 |
| 8 |
又kQA•kQB=-
| b2 |
| a2 |
| 1 |
| 4 |
联立①②解得kQA=2>0.
故选C.
点评:熟练掌握双曲线、椭圆的标准方程、斜率的计算公式及其有关结论是解题的关键.
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