题目内容
已知a1,a2,a3,…,a30是首项为1,公比为2的等比数列.对于满足0<k<30的整数k,数列b1,b2,b3,…,b30由bn=
|
(Ⅰ)当k=1时,求C的值;
(Ⅱ)求C最小时k的值.
分析:(Ⅰ)把k=1代入得bn=
然后列举出C的项利用等比数列的求和公式求出C即可;
(Ⅱ)写出C=a1b1+a2b2+…+akbk+…+a30b30代入得到前30-k和k项,分别利用等比数列的求和公式化简,并利用基本不等式得到:
(230-k+2k)≥
,当且仅当230-k=2k时取等号,求出k即可.
|
(Ⅱ)写出C=a1b1+a2b2+…+akbk+…+a30b30代入得到前30-k和k项,分别利用等比数列的求和公式化简,并利用基本不等式得到:
| 230-1 |
| 3 |
| 216(230-1) |
| 3 |
解答:解:(Ⅰ)当k=1时,bn=
∴C=a1b1+a2b2+…+a30b30=a1a2+a2a3+…+arar+1+…+a29a30+a30a1
=1×2+2×22+…+2r-1×2r+…+228×229+229×1
=2+23++22r-1++257+229
=
+229=
×259+229-
(Ⅱ)C=a1b1+a2b2+…+akbk+…+a30b30
=1×2k+2×2k+1+…+2k-1×22k-1+…+229-k×229+230-k×1+231-k×2+…+229×2k-1
=
+
=
+
=
(260-k-2k+230+k-230-k)
=
[230-k(230-1)+2k(230-1)]
=
(230-k+2k)≥
当且仅当230-k=2k,即k=15时,C最小.
|
∴C=a1b1+a2b2+…+a30b30=a1a2+a2a3+…+arar+1+…+a29a30+a30a1
=1×2+2×22+…+2r-1×2r+…+228×229+229×1
=2+23++22r-1++257+229
=
| 2(429-1) |
| 4-1 |
| 1 |
| 3 |
| 2 |
| 3 |
(Ⅱ)C=a1b1+a2b2+…+akbk+…+a30b30
=1×2k+2×2k+1+…+2k-1×22k-1+…+229-k×229+230-k×1+231-k×2+…+229×2k-1
=
| ||
| 共30-k项 |
| ||
| 共k项 |
=
| 2k(430-k-1) |
| 4-1 |
| 230-k(4k-1) |
| 4-1 |
=
| 1 |
| 3 |
=
| 1 |
| 3 |
=
| 230-1 |
| 3 |
| 216(230-1) |
| 3 |
当且仅当230-k=2k,即k=15时,C最小.
点评:考查学生灵活运用等比数列性质的能力,以及会用数列的递推式进行化简求值,会用基本不等式求函数的最小值.
练习册系列答案
相关题目
已知a1>a2>a3>0,则使得(1-aix)2<1(i=1,2,3)都成立的x取值范围是( )
A、(0,
| ||
B、(0,
| ||
C、(0,
| ||
D、(0,
|
