题目
①对任意x∈R,有f(x)>0;
②对任意x,y∈R,有f(x•y)=[f(x)]y;
③f(
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(1)求f(0)的值;
(2)求证:f(x)在R上是单调递增函数.
答案
∵f(0)>0,∴f(0)=1
(2)任取x1,x2∈R,且x1<x2
设x1=
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∴f(x1)-f(x2)=f(
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∵f(
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∴f(x1)<f(x2),∴f(x)在R上是单调递增函数.
函数f(x)的定义域为R,并满足条件:①对任意x
①对任意x∈R,有f(x)>0;
②对任意x,y∈R,有f(x•y)=[f(x)]y;
③f(
(1)求f(0)的值;
(2)求证:f(x)在R上是单调递增函数.
∵f(0)>0,∴f(0)=1
(2)任取x1,x2∈R,且x1<x2
设x1=
∴f(x1)-f(x2)=f(
∵f(
∴f(x1)<f(x2),∴f(x)在R上是单调递增函数.