已知数列{an}中,a1=3,前n项和Sn=1/2(n+1)(an+1)−1 (Ⅰ)求证:数列{an}是等差数列; (Ⅱ)求数列{an}的通项公式.
已知数列{a
n}中,a
1=3,前n项和
Sn=(n+1)(an+1)−1(Ⅰ)求证:数列{a
n}是等差数列;
(Ⅱ)求数列{a
n}的通项公式.
数学人气:519 ℃时间:2019-12-12 03:09:56
优质解答
(Ⅰ):证明:∵
Sn=(n+1)(an+1)−1,∴
Sn+1=(n+2)(an+1+1)−1∴
an+1=Sn+1−Sn=[(n+2)(an+1+1)−(n+1)(an+1)]整理,得na
n+1=(n+1)a
n-1①
∴(n+1)a
n+2=(n+2)a
n+1-1②
②-①得:(n+1)a
n+2-na
n+1=(n+2)a
n+1-(n+1)a
n即(n+1)a
n+2-2(n+1)a
n+1+(n+1)a
n=0∴a
n+2-2a
n+1+a
n=0,
即a
n+2-a
n+1=a
n+1-a
n∴数列{a
n}是等差数列
(II)∵a
1=3,na
n+1=(n+1)a
n-1,
∴a
2=2a
1-1=5∴a
2-a
1=2,
即等差数列{a
n}的公差为2,
∴a
n=a
1+2(n-1)=2n+1,(n∈N
*)
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