Polynomial ring/Quotient field/Field/Exercise

Let ${\displaystyle {}K[X]}$ be the polynomial ring over a field ${\displaystyle {}K}$. Show that the set

${\displaystyle {\left\{{\frac {P}{Q}}\mid P,Q\in K[X],\,Q\neq 0\right\}}}$

with a suitable addition and multiplication is a field, where two fractions ${\displaystyle {}{\frac {P}{Q}}}$ and ${\displaystyle {}{\frac {P'}{Q'}}}$ are considered to be equal if ${\displaystyle {}PQ'=P'Q}$.