题目内容
9.已知数列{an}的前n项和为Sn,a1=$\frac{3}{2},2{S}_{n}=(n+1){a}_{n}$+1(n≥2).(Ⅰ)求数列{an}的通项公式;
(Ⅱ)设bn=$\frac{1}{({a}_{n}+1)^{2}}(n∈{N}^{+})$,数列{bn}的前n项和为Tn,证明:Tn<$\frac{33}{50}(n∈{N}^{+})$.
分析 (Ⅰ)由数列递推式可得$\frac{{a}_{n}}{{a}_{n-1}}=\frac{n}{n-1}$,然后利用累积法求得数列通项公式;
(Ⅱ)把数列{an}的通项公式代入bn=$\frac{1}{({a}_{n}+1)^{2}}(n∈{N}^{+})$,然后利用裂项相消法求和,放缩得答案.
解答 (Ⅰ)解:当n=2时,2S2=3a2+1,解得a2=2,
当n=3时,2S3=4a3+1,解得a3=3.
当n≥3时,2Sn=(n+1)an+1,2Sn-1=nan-1+1,
以上两式相减,得2an=(n+1)an-nan-1,
∴$\frac{{a}_{n}}{{a}_{n-1}}=\frac{n}{n-1}$,
∴${a}_{n}=\frac{{a}_{n}}{{a}_{n-1}}•\frac{{a}_{n-1}}{{a}_{n-2}}…\frac{{a}_{3}}{{a}_{2}}•{a}_{2}$=$\frac{n}{n-1}•\frac{n-1}{n-2}…\frac{3}{2}×2=n$,
∴${a}_{n}=\left\{\begin{array}{l}{\frac{3}{2},n=1}\\{n,n≥2}\end{array}\right.$;
(Ⅱ)证明:bn=$\frac{1}{({a}_{n}+1)^{2}}$=$\left\{\begin{array}{l}{\frac{4}{25},n=1}\\{\frac{1}{(n+1)^{2}},n≥2}\end{array}\right.$,
当n=1时,${T}_{1}={b}_{1}=\frac{4}{25}<\frac{33}{50}$,
当n≥2时,${b}_{n}=\frac{1}{(n+1)^{2}}<\frac{1}{n(n+1)}=\frac{1}{n}-\frac{1}{n+1}$,
∴${T}_{n}=\frac{4}{25}+(\frac{1}{2}-\frac{1}{3})+(\frac{1}{3}-\frac{1}{4})+…+$$(\frac{1}{n}-\frac{1}{n+1})=\frac{33}{50}-\frac{1}{n+1}<\frac{33}{50}$.
∴Tn<$\frac{33}{50}(n∈{N}^{+})$.
点评 本题考查数列递推式,考查了等比关系的确定,训练了裂项相消法求数列的前n项和,是中档题.
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