问题
解答题
数列{an}的前n项和为Sn,a1=1,an+1=2Sn(n∈N+).
(Ⅰ)证明数列{Sn}是等比数列;
(Ⅱ)求数列{an}的通项an;
(Ⅲ)求数列{n•an}的前n项和Tn.
答案
(Ⅰ)∵an+1=2Sn,∴Sn+1-Sn=2Sn,∴
=3.Sn+1 Sn
又∵S1=a1=1,
∴数列{Sn}是首项为1,公比为3的等比数列,Sn=3n-1(n∈N*).…(4分)
(Ⅱ)当n≥2时,an=2Sn-1=2•3n-2(n≥2),
…(8分)∴an= 1,(n=1) 2•3n-2,(n≥2).
(Ⅲ)Tn=a1+2a2+3a3+…+nan,
当n=1时,T1=1;
当n≥2时,Tn=1+4•30+6•31+…+2n•3n-2,…①
3Tn=3+4•31+6•32+…+2n•3n-1,…②…(11分)
①-②得:-2Tn=-2+4+2(31+32+…+3n-2)-2n•3n-1
=2+2•
-2n•3n-1=-1+(1-2n)•3n-13(1-3n-2) 1-3
∴Tn=
+(n-1 2
)3n-1(n≥2).…(13分)1 2
又∵T1=a1=1也满足上式,
∴Tn=
+(n-1 2
)3n-1(n∈N*).…(14分)1 2