At absolute maximum or minimum derivative of f(x)=(x+1)/(x^2+x+9) will be zero. We have a maximum when second derivative is negative.
(df)/(dx)=((x^2+x+9)xx1-(x+1)(2x+1))/(x^2+x+9)^2
= (x^2+x+9-2x^2-3x-1)/(x^2+x+9)^2
= -(x^2+2x-8)/(x^2+x+9)^2
= -((x+4)(x-2))/(x^2+x+9)^2
as such we have extrema at x=-4 and x=2 and in the interval we have just one extrema at x=2 and
(d^2f)/(dx^2)=-((x^2+x+9)^2(2x+2)-2(x^2+x+9)(2x+1)(x^2+2x-8))/(x^2+x+9)^4
= -((x^2+x+9)((x^2+x+9)(2x+2)-(4x+2)(x^2+2x-8)))/(x^2+x+9)^4
= -(2x^3+4x^2+20x+18-(4x^3+10x^2-28x-16))/(x^2+x+9)^3
= (2x^3+6x^2-48x-34)/(x^2+x+9)^3
at x=2, we have (d^2f)/(dx^2)=-2/75
and at x=-4, (d^2f)/(dx^2)=2/147
Hence we have an absolute maxima at x=2 and f(2)=3/15=1/5
And as degree of denominator is higher, while at x=0, f(0)=1/9, as x->oo, f(x)->0
graph{y-(x+1)/(x^2+x+9)=0 [-10, 10, -0.4, 0.4]}
graph{y-(x+1)/(x^2+x+9)=0 [-200, 200, -0.4, 0.4]}
