题目内容
已知数列{bn}中,b1=| 11 |
| 7 |
| 2 |
| bn |
| 1 |
| bn-2 |
(1)求a1,a2;
(2)求证:an+1+2an+1=0;
(3)求数列{an}的通项公式;
(4)求证:(-1)b1+(-1)2b2+…+(-1)nbn<1(n∈N*)
分析:(1)根据b1=
,求得a1=-
,从而b2=
a2=
;
(2)将bn+1=1+
代入得到:an+1=
=
=
=-2an-1即可证得:an+1+2an+1=0;
(3)由(2)所得结论变形得到:an+1+
=-2 (an+
)从而得出数列{an+
}是以-2为首项,公比为-2的等比数列,最后利用等比数列的通项公式即可求出数列{an}的通项公式;
(4)由(3)得出数列{an}的通项公式写出数列bn,下面对n进行奇偶数讨论:①当n为偶数时②当n为奇数时,分别利用等比数列的前n项结合不等式的放缩即可得到证明.
| 11 |
| 7 |
| 7 |
| 3 |
| 25 |
| 11 |
| 11 |
| 3 |
(2)将bn+1=1+
| 2 |
| bn |
| 1 |
| bn+1-2 |
| 1 | ||
|
| bn |
| 2-bn |
(3)由(2)所得结论变形得到:an+1+
| 1 |
| 3 |
| 1 |
| 3 |
| 1 |
| 3 |
(4)由(3)得出数列{an}的通项公式写出数列bn,下面对n进行奇偶数讨论:①当n为偶数时②当n为奇数时,分别利用等比数列的前n项结合不等式的放缩即可得到证明.
解答:解:(1)∵b1=
∴a1=-
∴b2=
a2=
…(3分)
(2)证明:∵an+1=
=
=
=-2an-1∴an+1+2an+1=0…(5分)
(3)∵an+1=-2an-1∴an+1+
=-2 (an+
)…(6分)
又 a1+
=-2 ≠0∴数列{an+
}是以-2为首项,公比为-2的等比数列…(7分)
∴an+
=(-2)n∴an=(-2)n-
…(8分)
(4)bn=
+2=
+2∴(-1)nbn=2•(-1)n+
当n为奇数时(-1)nbn+(-1)n+1bn+1=
+
=
<
=
+
,
①当n为偶数时,(-1)b1+(-1)2b2+…+(-1)nbn<
+
+…+
+
<
=1,
②当n为奇数时,(-1)b1+(-1)2b2+…+(-1)nbn<
+
+…+
+
-2+
<
-2+
=
-1<1…(11分)
综上所述:(-1)b1+(-1)2b2+…+(-1)nbn<1…(12分)
| 11 |
| 7 |
| 7 |
| 3 |
| 25 |
| 11 |
| 11 |
| 3 |
(2)证明:∵an+1=
| 1 |
| bn+1-2 |
| 1 | ||
|
| bn |
| 2-bn |
(3)∵an+1=-2an-1∴an+1+
| 1 |
| 3 |
| 1 |
| 3 |
又 a1+
| 1 |
| 3 |
| 1 |
| 3 |
∴an+
| 1 |
| 3 |
| 1 |
| 3 |
(4)bn=
| 1 |
| an |
| 1 | ||
(-2)n-
|
| 1 | ||
2n-
|
当n为奇数时(-1)nbn+(-1)n+1bn+1=
| 1 | ||
2n+
|
| 1 | ||
2n+1-
|
| 2n+2n+1 | ||||
(2n+
|
| 2n+2n+1 |
| 2n•2n+1 |
| 1 |
| 2n |
| 1 |
| 2n+1 |
①当n为偶数时,(-1)b1+(-1)2b2+…+(-1)nbn<
| 1 |
| 2 |
| 1 |
| 22 |
| 1 |
| 2n-1 |
| 1 |
| 2n |
| ||
1-
|
②当n为奇数时,(-1)b1+(-1)2b2+…+(-1)nbn<
| 1 |
| 2 |
| 1 |
| 22 |
| 1 |
| 2n-2 |
| 1 |
| 2n-1 |
| 1 | ||
2n+
|
| ||
1-
|
| 1 | ||
2n+
|
| 1 | ||
2n+
|
综上所述:(-1)b1+(-1)2b2+…+(-1)nbn<1…(12分)
点评:本小题主要考查数列递推式、数列与不等式的综合、不等式的性质等基础知识,考查运算求解能力,考查化归与转化思想.属于基础题.
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