When you have 2x-1\ge 2\sqrt{2x^2-3x-5}\ \ (\ge 0) you have to have 2x-1\ge 0.

Lemma 1: If x is a prime, then f(x) = x+1. Lemma 2: If x = mn (not necessarily coprime), then f(mn) - 1 = [f(m) - 1] + [f(n) - 1 ]. I consider this the crux of the function. This is easily ...

Move -1008x^2 to the right side and use \mathrm{AM}\geq\mathrm{GM} \frac{x^{2016}+\underbrace{1+1+\ldots+1}_{1007}}{1008} \geq \sqrt[1008]{x^{2016} \underbrace{1 \cdot 1\cdots 1}_{1007}} =x^2

If Y is \mathcal G -measurable then: \mathbb EXY=\mathbb E[\mathbb E[XY\mid\mathcal G]]=\mathbb E[\mathbb E[X\mathcal\mid G]Y] Applying that for Y=\mathbb E[X\mid\mathcal G] we find: ...

\begin{align} &2x^2+y^2+2xy+2x-3y+8\\ &=\left(x^2+y^2+\frac94+2xy-3x-3y\right)+x^2+5x+\frac{23}{4}\\ &=(x+y-3/2)^2+x^2+5x+\frac{23}4\\ &=(x+y-3/2)^2+\left(x+\frac52\right)^2-\frac12\\ &\geq-\frac12\\ ...

HINT: As \displaystyle x^2+x+1=0, x^3-1=(x-1)(x^2+x+1)=0\implies x^3=1 \displaystyle \implies x^{3m}=(x^3)^m=1 if m is an integer