搜搜考试网数列{an}的前n项和为Sn,数列{bn}中,b1=a1,bn=an-an-1(n≥2),若an+Sn=n.
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数列{an}的前n项和为Sn,数列{bn}中,b1=a1,bn=an-an-1(n≥2),若an+Sn=n.
(1)设cn=an-1,求证:数列{cn}是等比数列;
(2)求数列{bn}的通项公式.
(1)设cn=an-1,求证:数列{cn}是等比数列;
(2)求数列{bn}的通项公式.
(1)证明:∵a1=S1,an+Sn=n,∴a1+S1=1,得a1=
1
2.
又an+1+Sn+1=n+1,两式相减得2(an+1-1)=an-1,即
an+1−1
an−1=
1
2,
也即
cn+1
cn=
1
2,故数列{cn}是等比数列.
(2)∵c1=a1-1=-
1
2,
∴cn=-
1
2n,an=cn+1=1-
1
2n,an-1=1-
1
2n−1.
故当n≥2时,bn=an-an-1=
1
2n−1-
1
2n=
1
2n.
又b1=a1=
1
2,即bn=
1
2n(n∈N*).
1
2.
又an+1+Sn+1=n+1,两式相减得2(an+1-1)=an-1,即
an+1−1
an−1=
1
2,
也即
cn+1
cn=
1
2,故数列{cn}是等比数列.
(2)∵c1=a1-1=-
1
2,
∴cn=-
1
2n,an=cn+1=1-
1
2n,an-1=1-
1
2n−1.
故当n≥2时,bn=an-an-1=
1
2n−1-
1
2n=
1
2n.
又b1=a1=
1
2,即bn=
1
2n(n∈N*).
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