题目内容
9.已知数列{an}满足Sn+1=an+n2(Ⅰ)求数列{an}的通项公式;
(Ⅱ)记bn=$\frac{1}{{a}_{n}{a}_{n+1}{a}_{n+2}}$,数列{bn}的前n项和为Tn,若m$<\frac{1}{{T}_{n}}$<m+50对任意正整数n恒成立,求实数m的取值范围.
分析 (Ⅰ)当n=2时,可得数列的首项为3,再将n换为n-1相减可得数列{an}的通项公式;
(Ⅱ)求得bn=$\frac{1}{4}$[$\frac{1}{(2n+1)(2n+3)}$-$\frac{1}{(2n+3)(2n+5)}$],运用裂项相消求和可得前n项和为Tn,判断单调性可得范围,再由不等式恒成立思想可得m的范围.
解答 解:(Ⅰ)当n=2时,S2+1=a2+4,
可得a1+a2+1=a2+4,即有a1=3,
由Sn+1=an+n2
当n>1时,Sn-1+1=an-1+(n-1)2,
两式相减可得an=an-an-1+2n-1,
可得an-1=2n-1,即有an=2n+1,n>1.
对n=1也成立.
则{an}的通项公式为an=2n+1;
(Ⅱ)bn=$\frac{1}{{a}_{n}{a}_{n+1}{a}_{n+2}}$=$\frac{1}{(2n+1)(2n+3)(2n+5)}$=$\frac{1}{4}$[$\frac{1}{(2n+1)(2n+3)}$-$\frac{1}{(2n+3)(2n+5)}$],
前n项和为Tn=$\frac{1}{4}$[$\frac{1}{3•5}$-$\frac{1}{5•7}$+$\frac{1}{5•7}$-$\frac{1}{7•9}$+…+$\frac{1}{(2n+1)(2n+3)}$-$\frac{1}{(2n+3)(2n+5)}$]
=$\frac{1}{4}$[$\frac{1}{15}$-$\frac{1}{(2n+3)(2n+5)}$],
可得数列{Tn}为递增数列,即有T1=$\frac{1}{105}$为最小值,且Tn<$\frac{1}{60}$,
即有60<$\frac{1}{{T}_{n}}$≤105,
m$<\frac{1}{{T}_{n}}$<m+50对任意正整数n恒成立,可得
m≤60,且m+50>105,
解得55<m≤60.
点评 本题考查数列的通项公式的求法,注意运用下标变换相减法,考查数列的求和方法:裂项相消求和,以及化简整理的运算能力,考查数列的单调性及运用,属于中档题.
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