【答案】(1)a1=2�����,a2=9;(2)t=1����;(3)Sn=(2n-1)×2n-n+1.
【解析】試題分析:(1)利用an=2an-1+2n+1��, 
�,代入可求����;
(2)假設(shè)存在實數(shù)t���,使得{bn}為等差數(shù)列�����,從而有2bn=bn-1+bn+1��,代入條件即可得解����;
(3)利用錯位相減即可得解.
試題解析:
(1)由a3=27�,得27=2a2+23+1�,∴a2=9��,
∵9=2a1+22+1�����,∴a1=2.
(2)假設(shè)存在實數(shù)t��,使得{bn}為等差數(shù)列,
則2bn=bn-1+bn+1(n≥2且n∈N*)����,
∴2×
(an+t)=
(an-1+t)+
(an+1+t)�,
∴4an=4an-1+an+1+t,
∴4an=4×
+2an+2n+1+1+t�,∴t=1.
即存在實數(shù)t=1��,使得{bn}為等差數(shù)列.
(3)由(1)����,(2)得b1=
�����,b2=
���,∴bn=n+
�,
∴an=
·2n-1=(2n+1)2n-1-1��,
Sn=(3×20-1)+(5×21-1)+(7×22-1)+…+[(2n+1)×2n-1-1]
=3+5×2+7×22+…+(2n+1)×2n-1-n��,①
∴2Sn=3×2+5×22+7×23+…+(2n+1)×2n-2n�,②
由①-②得-Sn=3+2×2+2×22+2×23+…+2×2n-1-(2n+1)×2n+n=1+2×
-(2n+1)×2n+n
=(1-2n)×2n+n-1�,
∴Sn=(2n-1)×2n-n+1.
