题目内容
在数列{an}中,a1=1,an+1=an2-1则此数列的前4项之和为( )
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试题答案
A
相关题目
在数列{an}中,如果对任意的n∈N*,都有
-
=λ(λ为常数),则称数列{an}为比等差数列,λ称为比公差.现给出以下命题,其中所有真命题的序号是
①若数列{Fn}满足F1=1,F2=1,Fn=Fn-1+Fn-2(n≥3),则该数列不是比等差数列;
②若数列{an}满足an=(n-1)•2n-1,则数列{an}是比等差数列,且比公差λ=2;
③等差数列是常数列是成为比等差数列的充分必要条件;
(文)④数列{an}满足:an+1=an2+2an,a1=2,则此数列的通项为an=32n-1-1,且{an}不是比等差数列;
(理)④数列{an}满足:a1=
,且an=
(n≥2,n∈N*),则此数列的通项为an=
,且{an}不是比等差数列.
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| an+2 |
| an+1 |
| an+1 |
| an |
①④
①④
.①若数列{Fn}满足F1=1,F2=1,Fn=Fn-1+Fn-2(n≥3),则该数列不是比等差数列;
②若数列{an}满足an=(n-1)•2n-1,则数列{an}是比等差数列,且比公差λ=2;
③等差数列是常数列是成为比等差数列的充分必要条件;
(文)④数列{an}满足:an+1=an2+2an,a1=2,则此数列的通项为an=32n-1-1,且{an}不是比等差数列;
(理)④数列{an}满足:a1=
| 3 |
| 2 |
| 3nan-1 |
| 2an-1+n-1 |
| n•3n |
| 3n-1 |