(1)直接计算f(0)和f(1)即可;
(2)由于|f(x2)-f(x1)|=|x2-x1||x2+x1-1|.故只要证明|x2+x1-1|<1即可;
(3)将|f(x2)-f(x1)|=|f(x2)-f(1)+f(0)-f(x1)|,再利用绝对值不等式的性质进行放缩即得.
证明:(1)f(0)=c,f(1)=c,
∴f(0)=f(1).
(2)|f(x2)-f(x1)|=|x2-x1||x2+x1-1|.
∵0≤x1≤1,∴0≤x2≤1,0<x1+x2<2(x1≠x2).
∴-1<x1+x2-1<1.
∴|f(x2)-f(x1)|<|x2-x1|.
(3)不妨设x2>x1,由(2)知
|f(x2)-f(x1)|<x2-x1.①
而由f(0)=f(1),从而
|f(x2)-f(x1)|=|f(x2)-f(1)+f(0)-f(x1)|≤|f(x2)-f(1)|+|f(0)-
f(x1)|<|1-x2|+|x1|<1-x2+x1.②
①+②得2|f(x2)-f(x1)|<1,
即|f(x2)-f(x1)|<.
.
的定义域恰为不等式log2(x+3)+
x≤3的解集,且f(x)在定义域内单调递减,求实数a的取值范围.
≤
.
≤1的解集.