题目内容
10.设正项等比数列{an}中,a1=2,$\frac{1}{2}{a_3}$是3a1与2a2的等差中项.(1)求数列{an}的通项公式;
(2)若数列{bn}的各项为正,且bn是$\frac{n}{a_n}$与$\frac{n}{{{a_{n+2}}}}$的等比中项,求数列{bn}的前n项和Tn;若对任意n∈N*都有Tn>logm2成立,求实数m的取值范围.
分析 (1)设正项等比数列{an}的公比为q,由已知列式求出公比q,代入等比数列的通项公式得答案;
(2)由bn是$\frac{n}{a_n}$与$\frac{n}{{{a_{n+2}}}}$的等比中项,求得数列{bn}的通项公式,再由错位相减法求出数列{bn}的前n项和Tn,由对任意n∈N*都有Tn>logm2成立求得实数m的取值范围.
解答 解:(1)设正项等比数列{an}的公比为q,由题意得:a3=3a1+2a2,
∴2q2=6+4q,
∴q=3或q=-1(舍去),
∴${a_n}=2•{3^{n-1}}$;
(2)∵bn是$\frac{n}{a_n}$与$\frac{n}{{{a_{n+2}}}}$的等比中项,
∴${{b}_{n}}^{2}$=$\frac{n}{a_n}$•$\frac{n}{{{a_{n+2}}}}$=$\frac{n}{2•{3}^{n-1}}•\frac{n}{2•{3}^{n+1}}=(\frac{n}{2•{3}^{n}})^{2}$,
∴${b_n}=\frac{n}{{2•{3^n}}}$,
则${T_n}=\frac{1}{2}(\frac{1}{3}+\frac{2}{3^2}+\frac{3}{3^3}+…+\frac{n}{3^n})$,
$\frac{1}{3}{T_n}=\frac{1}{2}(\frac{1}{3^2}+\frac{2}{3^3}+\frac{3}{3^4}+…+\frac{n}{{{3^{n+1}}}})$,
两式作差得:$\frac{2}{3}{T_n}=\frac{1}{2}(\frac{1}{3}+\frac{1}{3^2}+…+\frac{1}{3^n}+\frac{n}{{{3^{n+1}}}})$=$\frac{1}{2}[\frac{{\frac{1}{3}(1-\frac{1}{3^n})}}{{1-\frac{1}{3}}}-\frac{n}{{{3^{n+1}}}}]=\frac{1}{2}(\frac{1}{2}-\frac{2n+3}{{2•{3^{n+1}}}})$.
∴${T_n}=\frac{3}{8}-\frac{2n+3}{{8•{3^n}}}$.
∵Tn单调递增,
∴Tn的最小值为T1=$\frac{1}{6}$,
由${log_m}2<\frac{1}{6}$,得$\left\{{\begin{array}{l}{0<m<1}\\{2<{m^{\frac{1}{6}}}}\end{array}}\right.$或$\left\{{\begin{array}{l}{m>1}\\{2<{m^{\frac{1}{6}}}}\end{array}}\right.$,
解得:0<m<1或m>64,
故实数m的取值范围是(0,1)∪(64,+∞).
点评 本题考查等差数列的通项公式,考查了等差数列的性质,训练了利用错位相减法求数列的和,是中档题.
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