题目内容
16.已知$f(x)=\left\{\begin{array}{l}-2,0<x<1\\ 1,x≥1\end{array}\right.$,则不等式${log_2}x-({{{log}_{\frac{1}{4}}}4x-1})f({{{log}_3}x+1})≤5$的解集为($\frac{1}{3}$,4].分析 根据分段函数f(x)的解析式,把不等式${log_2}x-({{{log}_{\frac{1}{4}}}4x-1})f({{{log}_3}x+1})≤5$化为等价的不等式组,求出解集即可.
解答 解:不等式${log_2}x-({{{log}_{\frac{1}{4}}}4x-1})f({{{log}_3}x+1})≤5$
$?\left\{\begin{array}{l}{log_3}x+1≥1\\{log_2}x-({{{log}_{\frac{1}{4}}}4x-1})≤5\end{array}\right.$或$\left\{\begin{array}{l}0<{log_3}x+1<1\\{log_2}x+2({{{log}_{\frac{1}{4}}}4x-1})≤5\end{array}\right.$,
解得1≤x≤4或$\frac{1}{3}<x<1$;
∴原不等式的解集为($\frac{1}{3}$,4].
故答案为:$(\frac{1}{3},4]$.
点评 本题考查了分段函数与对数不等式的解法与应用问题,是基础题.
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