题目内容
已知函数f(x)=4x+1,g(x)=2x,x∈R,数列{an},{bn}满足条件:a1=1,an+1=g(an)+1(n∈N*),bn=| 1 | ||||
[
|
(Ⅰ)求数列{an}的通项公式;
(Ⅱ)求数列{bn}的前n项和Tn,并求使得Tn>
| m |
| 150 |
(Ⅲ)求证:
| a1 |
| a2 |
| a2 |
| a3 |
| an |
| an+1 |
| n |
| 2 |
分析:(Ⅰ)先根据Ⅰ可求出a1的值且得到数列{an+1}是首项为2,公比为2的等比数列,进而根据等比数列的通项公式可得到an+1=2×2n-1,进而得到an=2n-1.
(Ⅱ)根据bn=
,可得到bn=
=
(
-
),进而根据裂项法可得到Tn的值,再由
>1可知Tn<Tn+1,故当n=1时,Tn取得最小值
,要使得Tn>
对任意n∈N*都成立只要T1=
>
即可,从而可求出m的值.
(Ⅲ)根据
=
=
<
对任意n≥1恒成立,再由放缩法可得到
+
+…+
<
(n∈N*),进而可得证.
(Ⅱ)根据bn=
| 1 | ||||
[
|
| 1 |
| (2n+1)(2n+3) |
| 1 |
| 2 |
| 1 |
| 2n+1 |
| 1 |
| 2n+3 |
| Tn+1 |
| Tn |
| 1 |
| 15 |
| m |
| 150 |
| 1 |
| 15 |
| m |
| 150 |
(Ⅲ)根据
| ak |
| ak+1 |
| 2k-1 |
| 2k+1-1 |
| 2k-1 | ||
2(2k-
|
| 1 |
| 2 |
| a1 |
| a2 |
| a2 |
| a3 |
| an |
| an+1 |
| n |
| 2 |
解答:解:(Ⅰ)由题意an+1=2an+1,
∴an+1+1=2(an+1).
∵a1=1,
∴数列{an+1}是首项为2,公比为2的等比数列.
∴an+1=2×2n-1,
∴an=2n-1.
(Ⅱ)∵bn=
=
(
-
),
∴Tn=
(
-
+
-
++
-
)=
(
-
)=
=
.
∵
=
•
=
>1,
∴Tn<Tn+1,n∈N*.
∴当n=1时,Tn取得最小值
.
由题意得
>
,
∴m<10.
∵m∈Z,
∴m=9.
(Ⅲ)证明:∵
=
=
<
,k=1,2,3,,n,
∴
+
++
<
.
∴an+1+1=2(an+1).
∵a1=1,
∴数列{an+1}是首项为2,公比为2的等比数列.
∴an+1=2×2n-1,
∴an=2n-1.
(Ⅱ)∵bn=
| 1 |
| (2n+1)(2n+3) |
| 1 |
| 2 |
| 1 |
| 2n+1 |
| 1 |
| 2n+3 |
∴Tn=
| 1 |
| 2 |
| 1 |
| 3 |
| 1 |
| 5 |
| 1 |
| 5 |
| 1 |
| 7 |
| 1 |
| 2n+1 |
| 1 |
| 2n+3 |
| 1 |
| 2 |
| 1 |
| 3 |
| 1 |
| 2n+3 |
| n |
| 3×(2n+3) |
| n |
| 6n+9 |
∵
| Tn+1 |
| Tn |
| n+1 |
| 6n+15 |
| 6n+9 |
| n |
| 6n2+15n+9 |
| 6n2+15n |
∴Tn<Tn+1,n∈N*.
∴当n=1时,Tn取得最小值
| 1 |
| 15 |
由题意得
| 1 |
| 15 |
| m |
| 150 |
∴m<10.
∵m∈Z,
∴m=9.
(Ⅲ)证明:∵
| ak |
| ak+1 |
| 2k-1 |
| 2k+1-1 |
| 2k-1 | ||
2(2k-
|
| 1 |
| 2 |
∴
| a1 |
| a2 |
| a2 |
| a3 |
| an |
| an+1 |
| n |
| 2 |
点评:本题主要考查求数列通项公式、裂项法求数列前n项和、用放缩法证明不等式的问题.考查基础知识的综合运用和计算能力.
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