If someone could help with either of these problems that would be awesome!
$(\tan x)^2 \leq |1 - 2(\cot x)^2|$
$x^{\sin(x-a)}>1$ where $0< x < \frac{\pi}{2}$ and $a>0$
If someone could help with either of these problems that would be awesome!
$(\tan x)^2 \leq |1 - 2(\cot x)^2|$
$x^{\sin(x-a)}>1$ where $0< x < \frac{\pi}{2}$ and $a>0$