题目内容
17.设正项等差数列{an}的前n项和为Sn,且an=$\sqrt{{S}_{2n-1}}$(n∈N*).若对任意正整数n,都有λ>$\frac{1}{{a}_{1}{a}_{2}}$+$\frac{1}{{a}_{2}{a}_{3}}$+…+$\frac{1}{{a}_{n}{a}_{n+1}}$恒成立,则实数λ的取值范围为$[\frac{1}{2},+∞)$.分析 an=$\sqrt{{S}_{2n-1}}$(n∈N*).an=$\sqrt{\frac{(2n-1)({a}_{1}+{a}_{2n-1})}{2}}$=$\sqrt{(2n-1){a}_{n}}$,解得an=2n-1.$\frac{1}{{a}_{n}{a}_{n+1}}$=$\frac{1}{2}(\frac{1}{2n-1}-\frac{1}{2n+1})$.利用“裂项求和”方法与数列的单调性即可得出.
解答 解:∵an=$\sqrt{{S}_{2n-1}}$(n∈N*).
∴an=$\sqrt{\frac{(2n-1)({a}_{1}+{a}_{2n-1})}{2}}$=$\sqrt{(2n-1){a}_{n}}$,解得an=2n-1.
∴$\frac{1}{{a}_{n}{a}_{n+1}}$=$\frac{1}{2}(\frac{1}{2n-1}-\frac{1}{2n+1})$.
∴$\frac{1}{{a}_{1}{a}_{2}}$+$\frac{1}{{a}_{2}{a}_{3}}$+…+$\frac{1}{{a}_{n}{a}_{n+1}}$=$\frac{1}{2}[(1-\frac{1}{3})+(\frac{1}{3}-\frac{1}{5})$+…+$(\frac{1}{2n-1}-\frac{1}{2n+1})]$
=$\frac{1}{2}(1-\frac{1}{2n+1})$$<\frac{1}{2}$.
∵对任意正整数n,都有λ>$\frac{1}{{a}_{1}{a}_{2}}$+$\frac{1}{{a}_{2}{a}_{3}}$+…+$\frac{1}{{a}_{n}{a}_{n+1}}$恒成立,∴$λ≥\frac{1}{2}$.
则实数λ的取值范围为$λ≥\frac{1}{2}$.
故答案为:$[\frac{1}{2},+∞)$.
点评 本题考查了“裂项求和法”、数列递推关系,考查了推理能力与计算能力,属于中档题.
| A. | an=$\frac{1}{2}$n | B. | an=n${\;}^{\frac{1}{2}}$ | C. | an=($\frac{1}{2}$)n | D. | an=2n |
| A. | $\frac{{\sqrt{3}}}{3}$ | B. | 1 | C. | $\sqrt{2}$ | D. | $\sqrt{3}$ |
如图,在直三棱柱ABC-A1B1C1中,AB=$\sqrt{3},BC=1,A{A_1}$=AC=2,E,F分别为A1C1,BC的中点.