问题
解答题
| 已知等差数列{an}中,公差d>0,又a2•a3=45,a1+a4=14 (I)求数列{an}的通项公式; (II)记数列bn=
|
答案
(I)∵等差数列{an}中,公差d>0,a2•a3=45,a1+a4=14,
∴
,(a1+d)(a1+2d)=45 a1+a1+3d=14
解得
,或a1=1 d=4
(舍),a1=13 d=-4
∴an=a1+(n-1)d=1+4(n-1)=4n-3.
(II)∵an=4n-3,
∴bn=
=1 an•an+1
=1 (4n-3)(4n+1)
(1 4
-1 4n-3
),1 4n+1
∴数列{bn}的前n项和:
Sn=b1+b2+b3+…+bn
=
(1-1 4
)+1 5
(1 4
-1 5
)+1 9
(1 4
-1 9
)+…+1 13
(1 4
-1 4n-3
)1 4n+1
=
(1-1 4
)1 4n-1
=
.2n-1 8n-2