题目内容
3.设t∈R,对任意的n∈N*,不等式ntlnn+20lnt≥ntlnt+20lnn,则t的取值范围是[4,5].分析 由不等式ntlnn+20lnt≥ntlnt+20lnn,得(tn-20)ln($\frac{n}{t}$)≥0,等价于$\left\{\begin{array}{l}{tn≥20}\\{\frac{n}{t}≥1}\end{array}\right.$或$\left\{\begin{array}{l}{tn≤20}\\{0<\frac{n}{t}≤1}\end{array}\right.$,分离出参数t后化为函数的最值可求,注意n的取值范围.
解答 解:由不等式ntlnn+20lnt≥ntlnt+20lnn,得
nt(Inn-Int)≥20(Inn-Int),即(tn-20)ln($\frac{n}{t}$)≥0,
(tn-20)ln($\frac{n}{t}$)≥0等价于$\left\{\begin{array}{l}{tn≥20}\\{\frac{n}{t}≥1}\end{array}\right.$或$\left\{\begin{array}{l}{tn≤20}\\{0<\frac{n}{t}≤1}\end{array}\right.$,
∴$\left\{\begin{array}{l}{t≥\frac{20}{n}}\\{t≤n}\end{array}\right.$ ①,或$\left\{\begin{array}{l}{t≤\frac{20}{n}}\\{t≥n}\end{array}\right.$ ②,
对于①有n≥5,
∵对于n恒成立,
∴t≥$(\frac{20}{n})_{max}=4$,且t≤nmin=5,∴t∈[4,5];
同理由②也得t∈[4,5],
综上得,t∈[4,5].
故答案为:[4,5].
点评 本题考查函数恒成立问题,不等式的等价转化,考查转化思想,准确理解题意是解决该题的关键,是中档题.
