We have \begin{align}\frac{x-(x^2+1)\arctan x}{x^2(x^2+1)} < 0&\iff x<(x^2+1)\arctan x\\&\iff (1+x^2)\arctan x-x>0\end{align} This is true iff \frac d{dx}\left[(1+x^2)\arctan x-x\right]=2x\arctan x+\frac{1+x^2}{1+x^2}-1=2x\arctan x>0 ...

Equivalently we may look at g^{(200)}(0) for g(x)=x\arctan(x) = \sum_{m\geq 0}\frac{(-1)^m x^{2m+2}}{2m+1}. By considering m=99 we have [x^{200}]g(x) = -\frac{1}{2\cdot 99+1} = \frac{g^{(200)}(0)}{200!} ...

I'll follow your first step and show \arctan x^2 is uniformly continuous on [0,\infty). You can split the positive line into two parts: where x^2 is big, and where x^2 is small. Let \epsilon > 0 ...

HINT: you Need the power and the chain rule 2\,{1\arctan \left( 3\,{\frac {x}{2\,{x}^{2}-8}} \right) \left( 3\, \left( 2\,{x}^{2}-8 \right) ^{-1}-12\,{\frac {{x}^{2}}{ \left( 2\,{x} ^{2}-8 \right) ^{2}}} \right) \left( 9\,{\frac {{x}^{2}}{ \left( 2\,{ x}^{2}-8 \right) ^{2}}}+1 \right) ^{-1}} ...

Two observations resolve this. The first is that you didn't invert the derivative properly, so your 1/3 coefficient should be 3 because dx=-3t^{-4}dt. Secondly, \arctan 1/y=\pi/2-\arctan y ...

The question is ultimately answered by author. I make this community wiki to reduce the number of unanswered questions.