\displaystyle{y}=\pm\frac{{x}^{{2}}}{\sqrt{{{1}-{x}^{{2}}}}},{x}\in{\left(-{1},{1}\right)} . The graph is through the origin and is symmetrical about the origin. As \displaystyle{x}\to\pm{1},{y}\to\pm\infty ...

We have \dfrac1{1+\cos^2(t)} = \dfrac{\sec^2(t)}{\sec^2(t)+1} = \dfrac{\sec^2(t)}{2+\tan^2(t)} This gives us I(x) = \int_0^x \dfrac{dt}{1+\cos^2(t)} = \int_0^x \dfrac{\sec^2(t)}{2+\tan^2(t)}dt ...

\displaystyle \int_{0}^{\pi/2}{\frac{dt}{1+\cos^{2}(t)}}\tag{1} Indeed, let v = \tan t,\quad\text{ then}\; dv = \sec ^2t\,dt\;\implies\; (1+v^2)dt=dv\;\implies\; dt=\dfrac{dv}{(1+v^2)} \cos^2 t=\dfrac{1}{\sec^2 t}\;=\;\dfrac{1}{1+v^2} ...

By C-S \left(\frac{(a+b)^2}{2}+1\right)(2+c^2)\geq(a+b+c)^2 and since (a^2+2)(b^2+2)\geq3\left(\frac{(a+b)^2}{2}+1\right) it's (a-b)^2+2(ab-1)^2\geq0, we obtain: (a^2+2)(b^2+2)(c^2+2)\geq3(a+b+c)^2\geq9(ab+ac+bc).

I will give an answer to my own question. The solution was almost right. The question was how to find the intersection points of the normal line with the ellipse. (There can be at most 2 intersection ...

\newcommand{\Im}{\operatorname{Im}} I don't think your last integral is correct. You have made a mistake somewhere which I could not find. Assume wolog a\geq 0 (because the case a<0 follows from ...