题目内容
18.已知f(x)=|ax-1|(a∈R),不等式f(x)>5的解集为{x|x<-3或x>2}.(1)求a的值;
(2)解不等式f(x)-f($\frac{x}{2}$)≤2.
分析 (1)讨论a=0,a>0,a<0,由题意可得-3,2为|ax-1|=5的两根,运用绝对值不等式的解法,即可得到a=-2:
(2)运用绝对值的含义,讨论x的范围可得$\left\{{\begin{array}{l}{x<-1}\\{-x≤2}\end{array}}\right.$或$\left\{{\begin{array}{l}{-1≤x<-\frac{1}{2}}\\{-3x-2≤2}\end{array}}\right.$或$\left\{{\begin{array}{l}{x≥-\frac{1}{2}}\\{x≤2}\end{array}}\right.$,解不等式即可得到所求解集.
解答 解:(1)由|ax-1|>5,得到ax>6或ax<-4,
当a=0时,不等式无解.
当a<0时,$x<\frac{6}{a}$或$x>-\frac{4}{a}$.
由题意可得-3,2为|ax-1|=5的两根,
则$\left\{{\begin{array}{l}{\frac{6}{a}=-3}\\{-\frac{4}{a}=2}\end{array}}\right.$,解得a=-2.
当a>0时,$x>\frac{6}{a}$或$x<-\frac{4}{a}$.
故$\left\{{\begin{array}{l}{\frac{6}{a}=2}\\{-\frac{4}{a}=-3}\end{array}}\right.$,此时a无解.
综上所述,a=-2.
(2)f(x)=|-2x-1|,
f(x)-f($\frac{x}{2}$)≤2,即为:
|2x+1|-|x+1|≤2?$\left\{{\begin{array}{l}{x<-1}\\{-x≤2}\end{array}}\right.$或$\left\{{\begin{array}{l}{-1≤x<-\frac{1}{2}}\\{-3x-2≤2}\end{array}}\right.$或$\left\{{\begin{array}{l}{x≥-\frac{1}{2}}\\{x≤2}\end{array}}\right.$,
即-2≤x<-1或$-1≤x<-\frac{1}{2}$或$-\frac{1}{2}≤x≤2$.
故原不等式的解集为{x|-2≤x≤2}.
点评 本题考查不等式的解法,注意运用转化思想和分类讨论的思想方法,考查运算能力,属于中档题.
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