发布时间 : 星期二 文章2017-2018学年高一下学期期中考试数学试题-Word版含答案更新完毕开始阅读
(1)因为等比数列{an}中a32?9a2a6,故a32?9a42,an?0,故q=1 31?1?又因为2a1+3a2?1,所以a1=,an=??
3?3?nbn?log3a1?log3a2??log3an??1?2??n??n?n?1? 2(2)因为数列cn?an+?1?1,令数列?an?前n项和Tn,数列??的前n项和为Qn bn?bn?n1?1??1??3?3?1?1n?则Tn==?1??
12?3?1?3121??1=?2??? bnn?n+1?nn?1???111Qn=2?1?????22311?1????21???? nn?1?n?1??nn1?1??1?321?1?Sn=?1???2?1???? ????2?3??n?1?2n?12?3?21.解:
(1)因为3csinA?acosC?b?2c?0, 所以3sinCsinA?sinAcosC?sinB?2sinC?0 因为sinB=sin?A?C??sinAcosC?cosAsinC, 所以3sinCsinA?cosAsinC?2sinC?0
sinC?0,所以3sinA?cosA?2
sin(A??6)?1,因为?ABC是锐角三角形,所以,A??6??2,A??3
(2)因为A??3,所以B?C?2????2???,cosB?cosC?cos??C??cosC=sin?C?? 36??3??因为?ABC是锐角三角形,所以
?6?C??2,
?3?cosB?cosC的范围??2,1??
??22.解:
1133a1?p=+p?1,p?;显然,当p?时,有an=1 4444123(2)由条件得a2?a1?a1?p?a1=p??0得a2?a1,
441122又因为an?2?an?1?p,an?1?an?p,
44(1)若数列{an}是常数列,则a2?两式相减得
an?2?an?1?1111an?12?an2??an?12?an2???an?1?an??an?1?an? 4444显然有an?0,所以an?2?an?1与an?1?an同号,而a2?a1?0,所以an?1?an?0; 从而有an?an?1. (3)因为ak?1?ak?1212ak?ak?p??ak?2??p?1?p?1, 44所以an?a1??a2?a1???an?an?1??1??n?1??p?1?,
这说明,当p?1时,an越来越大,不满足an?2,所以要使得an?2对一切整数n恒成立,只可能p?1,下面证明当p?1时,an?2恒成立;用数学归纳法证明: 当n?1时,a1?1显然成立;
假设当n?k时成立,即ak?2,则当n?k?1时,ak?1?121ak?1??22?1?2成立,44由上可知对一切正整数n恒成立,因此,正数p的最大值是1