【答案】(1)①an=2n﹣1②Tn=n2n(2)存在���;λ=0
【解析】
(1)化簡(jiǎn)得到
�,根據(jù)累乘法計(jì)算得到Sn+1+1=2an+1,得到數(shù)列{an}是首項(xiàng)為1��,公比為2的等比數(shù)列���,得到答案�,再利用錯(cuò)位相減法計(jì)算得到答案.
(2)要使數(shù)列{an}是等差數(shù)列����,必須有2a2=a1+a3��,解得λ=0�����,λ=0���,計(jì)算得到an=1�,得到答案.
(1)①當(dāng)λ=1時(shí),anSn+1﹣an+1Sn=an+1﹣an�����,則anSn+1+an=an+1Sn+an+1��,
即(Sn+1+1)an=(Sn+1)an+1.
∵數(shù)列{an}的各項(xiàng)均為正數(shù),∴.
∴
,
化簡(jiǎn)���,得Sn+1+1=2an+1�����,①��,∴當(dāng)n≥2時(shí),Sn+1=2an��,②
②﹣①��,得an+1=2an���,
∵當(dāng)n=1時(shí),a2=2�,∴n=1時(shí)上式也成立,
∴數(shù)列{an}是首項(xiàng)為1��,公比為2的等比數(shù)列,即an=2n﹣1.
②由①知����,bn=(n+1)an=(n+1)2n﹣1.
Tn=b1+b2+…+bn=21+321+…+(n+1)2n﹣1��,
2Tn=22+322+…+n2n﹣1+(n+1)2n,
兩式相減��,可得﹣Tn=2+2+22+…+2n﹣1﹣(n+1)2n=2
(n+1)2n=﹣n2n.
∴Tn=n2n.
(2)由題意�,令n=1��,得a2=λ+1;令n=2�����,得a3=(λ+1)2.
要使數(shù)列{an}是等差數(shù)列�����,必須有2a2=a1+a3�����,解得λ=0.
當(dāng)λ=0時(shí)�����,Sn+1an=(Sn+1)an+1�����,且a2=a1=1.
當(dāng)n≥2時(shí),Sn+1(Sn﹣Sn﹣1)=(Sn+1)(Sn+1﹣Sn)�,
整理�����,得Sn2+Sn=Sn+1Sn﹣1+Sn+1���,即
�����,
從而
���,
化簡(jiǎn)���,得Sn+1=Sn+1,即an+1=1.
綜上所述��,可得an=1���,n∈N*.
∴λ=0時(shí),數(shù)列{an}是等差數(shù)列.
