a2=2a1,∴an=2an-1(n≥2,且n∈N*),数列{an}为首项为1,公比为2的等比数列,∴an=
2
n-1
,a3=2=4.设数列{bn}的公差为d,又b1=a1=1,b4=1+3d=7,∴d=2,bn=1+(n-
1?11?1-==??,
bnbn+1?2n-1??2n+1?2?2n-12n+1?1
111+-+?+-352×10-1
2
1)×2=2n-1,cn=
1?1
∴T10=?1-
2?3
1?=1?1-1?=10. ??2×10+1??2?21?21
*
解法二:∵数列{an}的首项a1=1,前n项和为Sn,且Sn=2Sn-1+1(n≥2,且n∈N),∴当n=2时,a1+a2=2a1+1,∴a2=2,当n=3时,a1+a2+a3=2a1+2a2+1,
∴a3=4.设数列{bn}的公差为d,又b1=a1=1,b4=1+3d=7,∴d=2,bn=1+(n-1)×2=2n-1,cn=
1
1?11?1
-=??,
?2n-1??2n+1?2?2n-12n+1?
bnbn+1
=
111?111?=1?1-1?=10. -∴T10=?1-+-+?+??3352×10-12×10+1?2??2?21?21
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