【答案】
(1)解:∵a1,a2����,a3成等比數(shù)列,可設(shè)公比為q����,則a2=q,a3=q2.
∵anSn+1﹣an+1Sn+an﹣an+1=λanan+1(λ≠0�����,n∈N )���,
∴當(dāng)n=1時(shí)�,a1S2﹣a2S1+a1﹣a2=λa1a2,即(1+q)﹣q+1﹣q=λq����,化為2﹣q=λq�,
當(dāng)n=2時(shí),a2S3﹣a3S2+a2﹣a3=λa2a3��,化為:2﹣q=λq2�,
聯(lián)立解得λ=q=1.
∴λ=1.
(2)解:λ= 
���,則anSn+1﹣an+1Sn+an﹣an+1= anan+1�����,
∵Sn+1=Sn+an+1,
∴(an﹣an+1)Sn+ 
+an﹣an+1=0.
化為Sn+ 
+1=0��,
∵a1=1����,令n=1,則1+ 
+1=0���,解得a2= 
���,
同理可得a3= 
.
猜想 
.
下面利用數(shù)學(xué)歸納法證明:
①當(dāng)n=1時(shí)��,a1= 
=1���,成立;
②假設(shè)當(dāng)n≤k(k∈N*)時(shí)成立���, 
�,則Sk= 
= 
.
∵Sk+ 
+1=0���,
∴ + 
+1=0�,
解得ak+1= 
.
因此當(dāng)n=k+1時(shí)也成立����,
綜上可得:對(duì)于n∈N* 都成立.
由等差數(shù)列的前n項(xiàng)和公式可得:Sn= 
.
可得an+1= 
,Sn= 
= ����,Sn+1= 
.
代入anSn+1﹣an+1Sn+an﹣an+1= anan+1,驗(yàn)證成立.
∴Sn= .
【解析】(1)由于a1 ���, a2 �����, a3成等比數(shù)列��,可設(shè)公比為q�����,則a2=q���,a3=q2 . 由anSn+1﹣an+1Sn+an﹣an+1=λanan+1(λ≠0,n∈N )��,分別令n=1���,2����,即可得出.(2)λ= �����,則anSn+1﹣an+1Sn+an﹣an+1= anan+1 , 化為Sn+ +1=0����,由a1=1,a2= ��,a3= .猜想 .再利用數(shù)學(xué)歸納法證明即可得出.
【考點(diǎn)精析】掌握數(shù)列的前n項(xiàng)和是解答本題的根本��,需要知道數(shù)列{an}的前n項(xiàng)和sn與通項(xiàng)an的關(guān)系
.
