问题
解答题
若数列{an}和{bn}满足关系:an=
(1)求证:数列{lgbn}是等比数列; (2)设Tn=b1b2b3…bn,求满足Tn≥
(3)设cn=
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答案
(1)∵an=
∴an+1=1+bn 1-bn
由an+1=1+bn+1 1-bn-1
(an+1 2
),得1 an
=1+bn+1 1-bn+1
(1 2
+1+bn 1-bn
)=1-bn 1+bn
,1+ b 2n 1- b 2n
∴bn+1=
,即lgbn+1=2lgbn,b 2n
又
=a1=3,b1=1+b1 1-b1
,lgb1=-lg2≠0,1 2
所以数列{lgbn}是等比数列,首项-lg2,公比2;
(2)由(1)得:lgbn=(-lg2)•2n-1⇒bn=(
)2n-1,Tn=b1b2…bn=(1 2
)1+2+…+2n-1=(1 2
)2n-1≥1 2
⇒2n-1≤71 128
∴2n≤8,即n≤3,又因为n∈N*
∴M={1,2,3};
(3)因为an=
,所以an=1+bn 1-bn
=1+(
)2n-11 2 1-(
)2n-11 2
=1+22n-1+1 22n-1-1
=1+2 (22n-2+1)(22n-2-1)
-1 22n-2-1 1 22n-2+1
同理an-1═
=1+22n-2+1 22n-2-1
,则an-an-1=2 22n-2-1
,又cn=2•22n-2 1-22n-1
=2 bn 1-bn 2•22n-2 1-22n-1
∴an-an-1=cn(n≥2),
∴an-a1=sn-c1,
∵a1=3,c1=-22
∴an=Sn+3+2
.2