题目内容
已知椭圆
的离心率为
,以原点为圆心,椭圆的短半轴长为半径的圆与直线
相切.
(1)求椭圆
的方程;
(2)若过点
(2,0)的直线与椭圆相交于两点
,设
为椭圆上一点,且满足
(O为坐标原点),当
<
时,求实数
取值范围.
【答案】
解:(1)由题意知
, 所以
.
即
.··············································································· (2分)
又因为
,所以
,
.
故椭圆
的方程为
.····················································· (4分)
(2)由题意知直线
的斜率存在.
设:
, 
,
,
,
由
得
.
,
.········································· (6分)
,
.
∵
,∴
,
,
.
∵点
在椭圆上,∴
,
∴
.······································································· (8分)
∵
<
,∴
,∴
∴
,
∴
,∴
.··············································· (10分)
【解析】略
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