题目内容
15.已知函数f(x)=$\left\{\begin{array}{l}{{x}^{2}-2x,x≤2}\\{lo{g}_{2}(x-1),x>2}\end{array}\right.$.(1)当x∈[-1,2]时,求函数f(x)的值域;
(2)解不等式f(x+1)>3.
分析 (1)根据二次函数的性质,即可求出当x∈[-1,2]时,函数f(x)的值域,
(2)不等式f(x+1)>3等价于$\left\{\begin{array}{l}{x+1≤2}\\{{x}^{2}-1>3}\end{array}\right.$或$\left\{\begin{array}{l}{x+1>2}\\{lo{g}_{2}x>3}\end{array}\right.$解得即可.
解答 解:(1)当x∈[-1,2]时,f(x)=x2-2x=(x-1)2-1,
函数f(x)在[-1,1]上递减,在[1,2]上递增,
∴f(x)min=f(1)=-1,f(x)max=f(-1)=3,
∴当x∈[-1,2]时,函数f(x)的值域为[-1,3],
(2)不等式f(x+1)>3等价于$\left\{\begin{array}{l}{x+1≤2}\\{{x}^{2}-1>3}\end{array}\right.$或$\left\{\begin{array}{l}{x+1>2}\\{lo{g}_{2}x>3}\end{array}\right.$
解得x≤-2,或x≥8,
故不等式的解集为(-∞,-2)∪(8,+∞)
点评 本题考查了分段函数的问题,以及二次函数和对数函数的性质,和不等式的解法,属于中档题.
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