问题
解答题
| 已知等差数列前三项为a,4,3a,前n项和为Sn,又Sk=2550. (1)求a及k值; (2)求
|
答案
(1)∵等差数列前三项为a,4,3a,
∴2×4=a+3a,
∴a=2,
公差d=4-2=2
又∵Sk=2550,
∴2k+
×2=2550,k(k-1) 2
∴k2+k-2550=0,
∴k=50或k=-51(不合,舍去),即k=50
(2)等差数列2,4,6,…的前n项和Sn=
,即Sn=n(n+1)n(2+2n) 2
于是
=1 Sn
=1 n(n+1)
-1 n
,1 n+1
从而
+1 S1
+1 S2
+…+1 S3 1 S2006
=(1-
)+(1 2
-1 2
)+(1 3
-1 3
)+…+(1 4
-1 2006
)=1-1 2007
=1 2007 2006 2007