问题
解答题
若等差数列{an}的前n项和为Sn,且满足
(Ⅰ)判断an=4n-2是否为S数列?并说明理由; (Ⅱ)若首项为a1的等差数列{an}(an不为常数)为S数列,试求出其通项公式. |
答案
(Ⅰ)由an=4n-2,得a1=2,d=4,
=Sn S2n
=2n+
n(n-1)41 2 2n•2+
•2n(2n-1)41 2
,1 4
所以它为S数列;
(Ⅱ)设等差数列{an},公差为d,则
=Sn S2n
=k(常数),a1n+
n(n-1)d1 2 2a1n+
•2n(2n-1)d1 2
∴2a1n+n2d-nd=4a1kn+4n2dk-2nkd,化简得d(4k-1)n+(2k-1)(2a1-d)=0①,
由于①对任意正整数n均成立,
则
解得:d(4k-1)=0 (2k-1)(2a1-d)=0
,d=2a1≠0 k=
.1 4
故存在符合条件的等差数列,其通项公式为:an=(2n-1)a1,其中a1≠0.