Polynomial ring/Ordered field/Positivity/Exercise

Let ${\displaystyle {}K}$ be an ordered field and let ${\displaystyle {}R=K[X]}$ be the polynomial ring over ${\displaystyle {}K}$. Let

${\displaystyle {}P={\left\{F\in K[X]\mid {\text{The leading coefficient of }}F{\text{ is positive}}\right\}}\,.}$

Show that ${\displaystyle {}P}$ fulfils the following three properties.

1. Either ${\displaystyle {}F\in P}$ or ${\displaystyle {}-F\in P}$ or ${\displaystyle {}F=0}$.
2. If ${\displaystyle {}F,G\in P}$, then also ${\displaystyle {}F+G\in P}$.
3. If ${\displaystyle {}F,G\in P}$, then also ${\displaystyle {}F\cdot G\in P}$.