f(x)+f(-x)=x^3*[1/(2^x - 1)+ 1/2] + (-x)^3*[1/(2^(-x) - 1)+ 1/2]
=x^3*[1/(2^x - 1)- 1/(2^(-x) - 1)] = x^3*[1/(2^x - 1)- 2^x/(1 - 2^x)]
= x^3*[1/(2^x - 1)+ 2^x/(2^x -1)] = x^3*[ (2^x + 1)/(2^x -1)]
= x^3*[ 1 + 2/(2^x -1)]=2*{x^3*[ 1/2 + 1/(2^x - 1)]} = 2f(x)
所以f(x)是偶函数.
f(x) = x^3*[ (2^x + 1)/(2^x -1)]
当x>0时,(2^x-1)>0,x^3>0,(2^x + 1)>0 ,所以此时f(x)>0
f(x)是偶函数,则x=0(如果刨除零点,就满足f(x)>0)