I have the inequality $\cos^2(−\frac{\pi}{4}+\frac{\pi}{p})>\frac{1}{2}+\frac{π}{p^2}$ and have found that it holds for $p>p^*$, where $p^*$ is some positive number (around ~2.8). I'm looking for a way to determine $p^*$ and to prove the inequality for $p$ greater than this threshold. Any suggestions on approaches or relevant theorems would be greatly appreciated.
Thank you!
Sketch:
Write $p=1/x$, so that you want to show $f(x) = \sin(\pi/4+\pi x)-1/2-\pi x^2\ge 0$ for $0\le x\le 0.355$ approximately.
First, $f''(x)<0$ in $[0,1/2]$ (by a large margin), so $f'(x)$ is strictly decreasing in $[0,1/2]$. Moreover, $f'(0)>0$ and $f'(1/2)<0$, so $f(x)$ is strictly increasing up to a maximum, then strictly decreasing. Since $f(1/2)<0$, there is a single point in $(0,1/2)$ where it equals 0. You have to find that point numerically as there is almost certainly no closed expression. I get $x=1/2.8185102203577819$.
