?1?2a(1?lna)?0,??a?e112??e?a?e. ∴?f(1)??0, 即?,此时,1222a?e???212?f(e)?e?a?0,?2?所以,a的取值范围为(e,12e).…………………………………………………………..13分 2(19)(本小题满分13分)
解:(Ⅰ)由题意可知,A(?a,0), B(a,0),F(?c,0), AFgBF?(a?c)(a?c)?1
?a2?c2?b2?1
c2a2?b2a2?1332?2? ,解得a2?4 又e?, e?2?2aaa42x2?y2?1…………………………5分 所求椭圆方程为4 (Ⅱ)设P(x0,y0),则Q(x0,2y0)(x0?2,x0??2)
由A(?2,0),得kAQ?2y0 x0?22y0(x?2) x0?2所以直线AQ方程y?由B(?2,0),得直线l的方程为x?2,
?M(2,8y04y0) ?N(2,) x0?2x0?2 由 kNQ4y0?2y0x0?22xy??200
2?x0x0?422又点P的坐标满足椭圆方程得到:x0+4y0?4 ,
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所以 x02?4??4y02 kNQ?2x0y02x0y0x0 ???x02?4?4y022y0x0(x?x0) 2y0 ?直线NQ的方程:y?2y0??化简整理得到:x0x?2yy0?x02?4y02?4 即x0x?2yy0?4 所以点O到直线NQ的距离d?4x0+4y022?2?圆O的半径
?直线NQ与AB为直径的圆O相切.……………………………………. 13分
(20)(本小题满分14分)
解:(I)当k?0,b?3,p??4时,
3(a1?an)?4?2(a1?a2??an), ①
用n?1去代n得,3(a1?an?1)?4?2(a1?a2??an?an?1), ②
②—①得,3(an?1?an)?2an?1,an?1?3an,???????????2分 在①中令n?1得,a1?1,则an?0,∴
an?1?3, an∴数列{an}是以首项为1,公比为3的等比数列,
3n?1∴a1?a2?a3???an=???????????????????.4分
2(II)当k?1,b?0,p?0时,n(a1?an)?2(a1?a2??an), ③ 用n?1去代n得,(n?1)(a1?an?1)?2(a1?a2??an?an?1), ④
④—③得, (n?1)an?1?nan?a1?0, ⑤. 用n?1去代n得,nan?2?(n?1)an?1?a1?0, ⑥
⑥—⑤得,nan?2?2nan?1?nan?0,即an?2?an?1?an?1?an,. ∴数列{an}是等差数列.∵a3?3,a9?15,
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∴公差d?a9?a3?2,∴an?2n?3????????????????9分 9?3(III)由(II)知数列{an}是等差数列,∵a2?a1?2,∴an?a1?2(n?1). 又?an?是“封闭数列”,得:对任意m,n?N*,必存在p?N*使
a1?2(n?1)?a1?2(m?1)?a1?2(p?1),
得a1?2(p?m?n?1),故a1是偶数, ············· 10分 又由已知,
18181111?a1?12.一方面,当?a1?12时,,故??111112S118?0,对任意n?N*,都有Sn?n(n?1a?1)111111???????. S1S2S3SnS112另一方面,当a1?2时,Sn?n(n?1),则
11111, ??????1?S1S2S3Snn?1111, ??Snnn?1取n?2,则
111211??1???,不合题意. S1S233181111?(?),则 Sn3nn?3当a1?4时,Sn?n(n?3),
111111111111, ???????(??)?S1S2S3Sn183n?1n?2n?318当a1?6时,Sn?n(n?a1?1)?n(n?3),
1111?(?), Sn3nn?3111111111111???????(??)?, S1S2S3Sn183n?1n?2n?318又
18?a1?12,∴a1?4或a1?6或a1?8或a1?10?????????.14分 11
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