题目:
| 等差数列{an}的公差d不为零,首项a1=1,a2是a1和a5的等比中项. (1)求数列{an}的通项公式及前n项和Sn (2)证明数列{2an}为等比数列; (3)求数列{
|
答案:
(1)由题意知,∵a2是a1和a5的等比中项
∴(a1+d)2=a1(a1+4d),
即a12+2a1d+d2=a12++4a1d,
∴d=2a1=2.
∴an=1+(n-1)×2=2n-1,Sn=n×1+
×2=n2n(n-1) 2
(2)证明:∵
=2an-an-1=2d=42an 2an-1
∴数列{2an}为等比数列;
(3)
=1 an•an+1
=1 (2n-1)(2n+1)
(1 2
-1 2n-1
)1 2n+1
∴数列{
}的前n项和Tn=1 an•an+1
{(1-1 2
)+(1 3
-1 3
)+…+(1 5
-1 2n-1
)=1 2n+1
(1-1 2
)=1 2n+1 n 2n+1
