∴Sn= (cos1°+ cos179°)+( cos2°+ cos178°)+ (cos3°+ cos177°)+···
+(cos89°+ cos91°)+ cos90° (合并求和)
= 0
[例13] 数列{an}:a1?1,a2?3,a3?2,an?2?an?1?an,求S2002.
解:设S2002=a1?a2?a3?????a2002
由a1?1,a2?3,a3?2,an?2?an?1?an可得
a4??1,a5??3,a6??2,
a7?1,a8?3,a9?2,a10??1,a11??3,a12??2,
??
a6k?1?1,a6k?2?3,a6k?3?2,a6k?4??1,a6k?5??3,a6k?6??2
∵ a6k?1?a6k?2?a6k?3?a6k?4?a6k?5?a6k?6?0 (找特殊性质项)∴ S2002=a1?a2?a3?????a2002 (合并求和) =(a1?a2?a3????a6)?(a7?a8????a12)?????(a6k?1?a6k?2?????a6k?6)
?????(a1993?a1994?????a1998)?a1999?a2000?a2001?a2002
=a1999?a2000?a2001?a2002 =a6k?1?a6k?2?a6k?3?a6k?4 =5
[例14] 在各项均为正数的等比数列中,若a5a6?9,求log3a1?log3a2?????log3a10的值.
解:设Sn?log3a1?log3a2?????log3a10
由等比数列的性质 m?n?p?q?aman?apaq (找特殊性质项) 和对数的运算性质 logaM?logaN?logaM?N 得
Sn?(log3a1?log3a10)?(log3a2?log3a9)?????(log3a5?log3a6) (合并求和)
=(log3a1?a10)?(log3a2?a9)?????(log3a5?a6) =log39?log39?????log39 =10
七、利用数列的通项求和
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先根据数列的结构及特征进行分析,找出数列的通项及其特征,然后再利用数列的通项揭示的规律来求数列的前n项和,是一个重要的方法.
[例15] 求1?11?111?????111????1之和. ??n个1解:由于111???1????11k?999???9?????(10?1) (找通项及特征) ?k个19k个19∴ 1?11?111?????111??????1 n个1=
19(101?1)?19(102?1)?19(103?1)?????19(10n?1) (分组求和)=
1(101?10219?103?????10n)?9(1???1??1?????????1) n个1=110(10n?1)9?10?1?n9 =
181(10n?1?10?9n) ?[例16] 已知数列{a8n}:an?(n?1)(n?3),求?(n?1)(an?an?1)的值.
n?1解:∵ (n?1)(an?an?1)?8(n?1)[1(n?1)(n?3)?1(n?2)(n?4)] (找通项及特征) =8?[1(n?2)(n?4)?1(n?3)(n?4)] (设制分组) =4?(1n?2?1n?4)?8(11n?3?n?4) (裂项)
??∴ ?(n?1)(a11?11n?an?1)?4n?1?(?n?1n?2n?4)?8?(?n?1n?3n?4) (分组、裂项求和)
=4?(1?1)?8?1344 =
133
说明:本资料适用于高三总复习,也适用于高一“数列”一章的学习。
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