题目内容

15.已知函数f(x)=x2+$\frac{2}{x}$+alnx.
(Ⅰ)若f(x)在区间[2,3]上单调递增,求实数a的取值范围;
(Ⅱ)设f(x)的导函数f′(x)的图象为曲线C,曲线C上的不同两点A(x1,y1)、B(x2,y2)所在直线的斜率为k,求证:当a≤4时,|k|>1.

分析 (1)由函数单调性,知其导函数≥0在[2,3]上恒成立,将问题转化为$g(x)=\frac{2}{x}-2{x}^{2}$在[2,3]上单调递减即可求得结果;
(2)根据题意,将$|\begin{array}{l}{f′({x}_{1})-f′({x}_{2})}\end{array}|$写成$|\begin{array}{l}{{x}_{1}-{x}_{2}}\end{array}|•|\begin{array}{l}{2+\frac{2({x}_{1}+{x}_{2})}{{{x}_{1}}^{2}{{x}_{2}}^{2}}-\frac{a}{{x}_{1}{x}_{2}}}\end{array}|$,利用不等式的性质证明$|\begin{array}{l}{2+\frac{2({x}_{1}+{x}_{2})}{{{x}_{1}}^{2}{{x}_{2}}^{2}}-\frac{a}{{x}_{1}{x}_{2}}}\end{array}|>1$,所以$|\begin{array}{l}{f′({x}_{1})-f′({x}_{2})}\end{array}|$>$|\begin{array}{l}{{x}_{1}-{x}_{2}}\end{array}|$,即得$|\begin{array}{l}{k}\end{array}|>1$.

解答 解:(1)由$f(x)={x}^{2}+\frac{2}{x}+alnx$,得$f′(x)=2x-\frac{2}{{x}^{2}}+\frac{a}{x}$.
因为f(x)在区间[2,3]上单调递增,
所以$f′(x)=2x-\frac{2}{{x}^{2}}+\frac{a}{x}$≥0在[2,3]上恒成立,
即$a≥\frac{2}{x}-2{x}^{2}$在[2,3]上恒成立,
设$g(x)=\frac{2}{x}-2{x}^{2}$,则$g′(x)=-\frac{2}{{x}^{2}}-4x<0$,
所以g(x)在[2,3]上单调递减,
故g(x)max=g(2)=-7,
所以a≥-7;
(2)对于任意两个不相等的正数x1、x2
${x}_{1}{x}_{2}+\frac{2({x}_{1}+{x}_{2})}{{x}_{1}{x}_{2}}$>${x}_{1}{x}_{2}+\frac{4}{\sqrt{{x}_{1}{x}_{2}}}$
=${x}_{1}{x}_{2}+\frac{2}{\sqrt{{x}_{1}{x}_{2}}}+\frac{2}{\sqrt{{x}_{1}{x}_{2}}}$
$≥3\root{3}{{x}_{1}{x}_{2}×\frac{2}{\sqrt{{x}_{1}{x}_{2}}}×\frac{2}{\sqrt{{x}_{1}{x}_{2}}}}$
=$3\root{3}{4}>4.5>a$,
∴$|\begin{array}{l}{2+\frac{2({x}_{1}+{x}_{2})}{{{x}_{1}}^{2}{{x}_{2}}^{2}}-\frac{a}{{x}_{1}{x}_{2}}}\end{array}|>1$,
而$f′(x)=2x-\frac{2}{{x}^{2}}+\frac{a}{x}$,
∴$|\begin{array}{l}{f′({x}_{1})-f′({x}_{2})}\end{array}|$=$|\begin{array}{l}{(2{x}_{1}-\frac{2}{{{x}_{1}}^{2}}+\frac{a}{{x}_{1}})-(2{x}_{2}-\frac{2}{{{x}_{2}}^{2}}+\frac{a}{{x}_{2}})}\end{array}|$
=$|\begin{array}{l}{{x}_{1}-{x}_{2}}\end{array}|•|\begin{array}{l}{2+\frac{2({x}_{1}+{x}_{2})}{{{x}_{1}}^{2}{{x}_{2}}^{2}}-\frac{a}{{x}_{1}{x}_{2}}}\end{array}|$>$|\begin{array}{l}{{x}_{1}-{x}_{2}}\end{array}|$,
故:$|\begin{array}{l}{f′({x}_{1})-f′({x}_{2})}\end{array}|$>$|\begin{array}{l}{{x}_{1}-{x}_{2}}\end{array}|$,即$|\begin{array}{l}{\frac{f′({x}_{1})-f′({x}_{2})}{{x}_{1}-{x}_{2}}}\end{array}|$>1,
∴当a≤4时,$|\begin{array}{l}{k}\end{array}|>1$.

点评 本题考查导数及基本不等式的应用,解题的关键是利用不等式得到函数值的差的绝对值要大于自变量的差的绝对值.

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