题目内容
将函数f(x)=sin
x•sin
(x+2π)•sin
(x+3π)在区间(0,+∞)内的全部极值点按从小到大的顺序排成数列{an},(n=1,2,3,…).
(Ⅰ)求数列{an}的通项公式;
(Ⅱ)设bn=sinansinan+1sinan+2,求证:bn=
,(n=1,2,3,…).
| 3 |
| 4 |
| 3 |
| 4 |
| 3 |
| 2 |
(Ⅰ)求数列{an}的通项公式;
(Ⅱ)设bn=sinansinan+1sinan+2,求证:bn=
| (-1)n-1 |
| 4 |
分析:(Ⅰ)由f(x)=sin
x•sin(
x+
π)•sin(
x+
π)=-
sin3x,知f(x)的极值点为x=
+
,k∈Z,从而它在区间(0,+∞)内的全部极值点按从小到大排列构成以
为首项,
为公差的等差数列,由此能求出数列{an}的通项公式.
(Ⅱ)由an=
π知对任意正整数n,an都不是π的整数倍,知sinan≠0,从而bn=sinansinan+1sinan+2≠0.于是
=
=
=
=-1,由此能够证明bn=
,(n=1,2,3,…).
| 3 |
| 4 |
| 3 |
| 4 |
| 3 |
| 2 |
| 3 |
| 2 |
| 9 |
| 2 |
| 1 |
| 4 |
| kπ |
| 3 |
| π |
| 6 |
| π |
| 6 |
| π |
| 3 |
(Ⅱ)由an=
| 2n-1 |
| 6 |
| bn+1 |
| bn |
| sinan+1sinan+2sinan+3 |
| sinansinan+1sinan+2 |
| sinan+3 |
| sinan |
| sin(an+π) |
| sinan |
| (-1)n-1 |
| 4 |
解答:解:(Ⅰ)∵f(x)=sin
x•sin(
x+
π)•sin(
x+
π)
=sin
x•(-cos
x)•cos
x=-
sin
x•cos
x=-
sin3x
∴f(x)的极值点为x=
+
,k∈Z,
从而它在区间(0,+∞)内的全部极值点按从小到大排列构成以
为首项,
为公差的等差数列,
∴an=
+(n-1)•
=
π,(n=1,2,3,…)
(Ⅱ)由an=
π知对任意正整数n,
an都不是π的整数倍,
所以sinan≠0,
从而bn=sinansinan+1sinan+2≠0
于是
=
=
=
=-1
又b1=sin
•sin
•sin
=
,
{bn}是以
为首项,-1为公比的等比数列.
∴bn=
,(n=1,2,3,…)
| 3 |
| 4 |
| 3 |
| 4 |
| 3 |
| 2 |
| 3 |
| 2 |
| 9 |
| 2 |
=sin
| 3 |
| 4 |
| 3 |
| 4 |
| 3 |
| 2 |
| 1 |
| 2 |
| 3 |
| 2 |
| 3 |
| 2 |
| 1 |
| 4 |
∴f(x)的极值点为x=
| kπ |
| 3 |
| π |
| 6 |
从而它在区间(0,+∞)内的全部极值点按从小到大排列构成以
| π |
| 6 |
| π |
| 3 |
∴an=
| π |
| 6 |
| π |
| 3 |
| 2n-1 |
| 6 |
(Ⅱ)由an=
| 2n-1 |
| 6 |
an都不是π的整数倍,
所以sinan≠0,
从而bn=sinansinan+1sinan+2≠0
于是
| bn+1 |
| bn |
| sinan+1sinan+2sinan+3 |
| sinansinan+1sinan+2 |
| sinan+3 |
| sinan |
| sin(an+π) |
| sinan |
又b1=sin
| π |
| 6 |
| π |
| 2 |
| 5π |
| 6 |
| 1 |
| 4 |
{bn}是以
| 1 |
| 4 |
∴bn=
| (-1)n-1 |
| 4 |
点评:第(Ⅰ)题考查数列的通项公式的求法,解题时要认真审题,注意三角函数的性质和应用,合理运用三角函数的极值点进行解题.
第(Ⅱ)求证:bn=
,(n=1,2,3,…).解题时要认真审题,利用三角函数的性质证明{bn}是以
为首项,-1为公比的等比数列.
第(Ⅱ)求证:bn=
| (-1)n-1 |
| 4 |
| 1 |
| 4 |
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