令f(x)=y,则y=(ax+b)/(x2+1)yx2+y=ax+b∴yx2-ax+y-b=0∵f(x)的定义域是R∴yx2-ax+y-b=0恒有实数根,即△=a2-4y(y-b)≥0-4y2+4by+a2≥0∵y∈[-1,4]由韦达定理,得-4b/(-4)=4-1,a2/(-4)=-4∴a=正负4,b=3...