对f(x)求导,f'(x)=(x-(1+x)ln(1+x))/((1+x)x^2),令f'(x)=0,则x=0,故f(x)在x=0处有最大值,故f(x)在(0,正无穷)单调递减;令g(x)=(e^x-1)ln(x+1)-x^2,用上述方法得g(x)在x=0处有最小值0,且在(0,正无穷)单调递增,故当x>0时,(e^x-1)ln(x+1)>x^2
