设各项均为正数的数列?an?的前n项和为Sn,已知数列等差 数列.
(1) 求数列?an?的通项公式; (2)令bn?n1,若不等式?bi??an?1S2n?1i?1?S?是首项为1,公差为1的
nL2n?1?1anS2n?1*
对任意n?N都成立, 求实数L的取值范围.
14..(2011广州一模) (1)解:∵数列
?S?是首项为1,公差为1的等差数列,
n ∴Sn?1??n?1??n.
∴Sn?n2. …… 2分 当n?1时,a1?S1?1;
2 当n?2时,an?Sn?Sn?1?n??n?1??2n?1.
2 又a1?1适合上式.
∴an?2n?1. …… 4分 (2)解:bn?11 ?anS2n?1?an?1S2n?1?2n?1?2n?1??2n?1?2n?11 ??2n?1??2n?1??2n?1?2n?122n?1?2n?1
? ??2n?1??2n?1? ?n1?11?. …… 6分 ???2?2n?12n?1?i ∴
?bi?1?b1?b2???bn
?1?1?1?11?1?11? 1?????????????2?2?2n?13?2?35?2n?1?1?1?2n?1?1. …… 8分 1????2?2n?1?22n?1 ? 故要使不等式
?bi?i?1nL2n?1?1L对任意n?N都成立,
* 即2n?1?122n?1?2n?1?1对任意n?N都成立,
*? 得L? 令cn?2n?1?1??2n?1?122n?1??n2n?1对任意n?N都成立. … 10分
*ncn?1?n?1?2n?12n3?5n2?4n?1,则???1.
32cn2n?1n2n?32n?3n ∴cn?1?cn. ∴cn?cn?1???c1?3. …… 12分 3 ∴L??3?3. ∴实数L的取值范围为???,?. …… 14分 ?3?3?
15.(2011茂名一模)(本小题满分12分)
等差数列{an}中,a1?3,前n项和为Sn,等比数列{bn}各项均为正数,
b1?1,且b2?S2?12,{bn}的公比q? (1)求an与bn; (2)求
S2 b2111??…? S1S2Sn?q?3?a2?12? 15.(2011茂名一模)解:(I)由已知可得? 3?a2q??q?解得,q?3或q??4(舍去),a2?6
?an?3?(n?1)3?3n bn?3n?1
(2)证明:?Sn?n(3?3n)12211???(?) 2Snn(3?3n)3nn?1?1112111111121??…??(1??????…??)?(1?) S1S2Sn322334nn?13n?1