题目内容

已知数列{an}中,Sn是它的前n项和,并且Sn+1=4an+2(n=1,2,…),a1=1

(1)bn=an+12an(n=1,2,…),求证{bn}是等比数列;

(2)cn=(n=1,2,…),求证{cn}是等差数列;

3)求数列{an}的通项公式及前n项和公式.

答案:
解析:

解:(1)∵Sn+1=4an+2                              ①                                                                                                                                                             

Sn+2=4an+1+2                                              ②                                                                                                                                                 

②-①得Sn+2Sn+1=4an+1-4an(n=1,2,…),即an+2=4an+1-4an

an+2-2an+1=2(an+1-2an)

bn=an+1-2an(n=1,2,…)

bn+1=2bn

由此可知,数列{bn}是公比为2的等比数列.

S2=a1+a2=4a1+2,又a1=1,得a2=5

b1=a22a1=3,∴bn=3·2n1

(2)∵cn= (n=1,2,…),∴cn+1cn=

bn=3·2n1代入,得cn+1cn=(n=1,2,…)

由此可知:数列{cn}是公差为的等差数列,c1== ,故cn=+

(3)∵cn=

an=2n·cn=(3n-1)·2n2(n=1,2,…)

n≥2时,Sn=4an1+2=(3n-4)·2n1+2.

由于S1=a1=1也适合于此式,∴前n项公式为Sn=(3n-4)·2n1+2

 


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