题目内容
10.已知数列{an}的各项均为正数,其前n项和为Sn,且满足a1=1,an+1=2$\sqrt{S_n}+1,n∈{N^*}$.(Ⅰ)求数列{an}的通项公式;
(Ⅱ)设数列{bn}满足bn=$\frac{{4{n^2}}}{{{a_n}{a_{n+1}}}}$,设数列{bn}的前n项和为Tn,若?n∈N*,不等式Tn-na<0恒成立,求实数a的取值范围.
分析 (Ⅰ)由${a_{n+1}}=2\sqrt{S_n}+1,n∈{N^+}$得${S_{n+1}}-{S_n}=2\sqrt{S_n}+1$,故${S_{n+1}}={({\sqrt{S_n}+1})^2}$,可得$\sqrt{{S}_{n+1}}$=$\sqrt{{S}_{n}}$+1,利用等差数列的通项公式与数列递推关系即可得出.
(II)利用“裂项求和”方法、数列的单调性即可得出.
解答 解:(Ⅰ)由${a_{n+1}}=2\sqrt{S_n}+1,n∈{N^+}$得${S_{n+1}}-{S_n}=2\sqrt{S_n}+1$,故${S_{n+1}}={({\sqrt{S_n}+1})^2}$,
∵an>0,∴Sn>0,∴$\sqrt{{S}_{n+1}}$=$\sqrt{{S}_{n}}$+1,(2分)
∴数列$\left\{{\sqrt{S_n}}\right\}$是首项为$\sqrt{S_1}=1$,公差为1的等差数列.(3分)
∴$\sqrt{S_n}=1+({n-1})=n$,∴${S_n}={n^2}$,…(4分)
当n≥2时,${a_n}={S_n}-{S_{n-1}}={n^2}-{({n-1})^2}=2n-1$,a1=1,…(5分)
又a1=1适合上式,∴an=2n-1.…(6分)
(Ⅱ)将an=2n-1代入${b_n}=\frac{{4{n^2}}}{{{a_n}{a_{n+1}}}}$,${b_n}=\frac{{4{n^2}}}{{({2n-1})({2n+1})}}=\frac{{4{n^2}}}{{4{n^2}-1}}=1+\frac{1}{{({2n-1})({2n+1})}}=1+\frac{1}{2}({\frac{1}{2n-1}-\frac{1}{2n+1}})$…(7分)
∴${T_n}=n+\frac{1}{2}({1-\frac{1}{3}+\frac{1}{3}-\frac{1}{5}+…+\frac{1}{2n-1}-\frac{1}{2n+1}})=n+\frac{n}{2n+1}$…(9分)
∵Tn-na<0,∴$n+\frac{n}{2n+1}-na<0$,
∵n∈N+,∴$1+\frac{1}{2n+1}-a<0$…(10分)∴$a>1+\frac{1}{2n+1}$,
∵2n+1≥3,$0<\frac{1}{2n+1}≤\frac{1}{3}$,$1<1+\frac{1}{2n+1}$$≤\frac{4}{3}$,∴$a>\frac{4}{3}$.(12分)
点评 本题考查了“裂项求和”、等差数列通项公式、数列递推关系,考查了推理能力与计算能力,属于中档题.
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| A. | 30° | B. | 60° | C. | 90° | D. | 120° |
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