【答案】
(1)
解:設(shè)等比數(shù)列{an}首項(xiàng)為a1,公比為q�,
則a3=S3﹣S2=﹣6﹣2=﹣8,則a1= 
= 
��,a2= 
= 
�����,
由a1+a2=2����, + =2,整理得:q2+4q+4=0��,解得:q=﹣2,
則a1=﹣2��,an=(﹣2)(﹣2)n﹣1=(﹣2)n�,
∴{an}的通項(xiàng)公式an=(﹣2)n;
(2)
由(1)可知:Sn= 
= 
=﹣ 
(2+(﹣2)n+1)��,
則Sn+1=﹣ (2+(﹣2)n+2)�����,Sn+2=﹣ (2+(﹣2)n+3)����,
由Sn+1+Sn+2=﹣ (2+(﹣2)n+2)﹣ (2+(﹣2)n+3)=﹣ [4+(﹣2)×(﹣2)n+1+(﹣2)2×+(﹣2)n+1]�,
=﹣ [4+2(﹣2)n+1]=2×[﹣ (2+(﹣2)n+1)],
=2Sn�,
即Sn+1+Sn+2=2Sn,
∴Sn+1����,Sn,Sn+2成等差數(shù)列.
【解析】(1.)由題意可知a3=S3﹣S2=﹣6﹣2=﹣8�,a1= = ,a2= = 
�����,由a1+a2=2,列方程即可求得q及a1 �, 根據(jù)等比數(shù)列通項(xiàng)公式,即可求得{an}的通項(xiàng)公式��;
(2.)由(1)可知.利用等比數(shù)列前n項(xiàng)和公式�����,即可求得Sn ����, 分別求得Sn+1 , Sn+2 �, 顯然Sn+1+Sn+2=2Sn , 則Sn+1 �, Sn , Sn+2成等差數(shù)列.
【考點(diǎn)精析】本題主要考查了等比數(shù)列的通項(xiàng)公式(及其變式)和等比數(shù)列的前n項(xiàng)和公式的相關(guān)知識(shí)點(diǎn)��,需要掌握通項(xiàng)公式:
���;前
項(xiàng)和公式:
才能正確解答此題.
