(1)b1=-1(2)見解析(3)
【解析】(1)∵bn+2=-bn+1-bn����,
∴b3=-b2-b1=-3b1=3��,
∴b1=-1���;(3分)
(2)∵bn+2=-bn+1-bn①�����,
∴bn+3=-bn+2-bn+1②,
②-①得bn+3=bn����,(5分)
∴(bn+1bn+2bn+3+n+1)-(bnbn+1bn+2+n)=bn+1bn+2(bn+3-bn)+1=1為常數(shù)�,
∴數(shù)列{bnbn+1bn+2+n}是等差數(shù)列.(7分)
(3)∵Tn+1=Tn·bn+1=Tn-1bnbn+1=Tn-2bn-1bnbn+1=…=b1b2b3…bn+1
當n≥2時Tn=b1b2b2…bn(*)��,
當n=1時�����,T1=b1適合(*)式
∴Tn=b1b2b3…bn(n∈N*).(9分)
∵b1=-
,b2=2b1=-1����,
b3=-3b1=
����,bn+3=bn��,
∴T1=b1=-
,T2=T1b2=
,
T3=T2b3=
,T4=T3b4=T3b1=
T1���,
T5=T4b5=T2b3b4b5=T2b1b2b3=
T2,
T6=T5b6=T3b4b5b6=T3b1b2b3=
T3,
……
T3n+1+T3n+2+T3n+3=T3n-2b3n-1b3nb3n+1+
T3n-1b3nb3n+1b3n+2+T3nb3n+1b3n+2b3n+3
=T3n-2b1b2b3+T3n-1b1b2b3+T3nb1b2b3
=
(T3n-2+T3n-1+T3n),
∴數(shù)列{T3n-2+T3n-1+T3n)(n∈N*)是等比數(shù)列,
首項T1+T2+T3=
且公比q=
���,(11分)記Sn=T1+T2+T3+…+Tn�����,
①當n=3k(k∈N*)時,
Sn=(T1+T2+T3)+(T4+T5+T6)…+(T3k-2+T3k-1+T3k)
=
����,
∴
≤Sn<3�����;(13分)
②當n=3k-1(k∈N*)時
Sn=(T1+T2+T3)+(T4+T5+T6)+…+(T3k-2+T3k-1+T3k)-T3k
=3
-(b1b2b3)k=3-4·
∴0≤Sn<3;(14分)
③當n=3k-2(k∈N*)時
Sn=(T1+T2+T3)+(T4+T5+T6)+…+(T3k-2+T3k-1+T3k)-T3k-1-T3k
=3-(b1b2b3)k-1b1b2-
