Vector space/Direct/Definition

Let ${\displaystyle {}K}$ denote a field, and ${\displaystyle {}V}$ a set with a distinguished element ${\displaystyle {}0\in V}$, and with two mappings

${\displaystyle +\colon V\times V\longrightarrow V,(u,v)\longmapsto u+v,}$

and

${\displaystyle \cdot \colon K\times V\longrightarrow V,(s,v)\longmapsto sv=s\cdot v.}$

Then ${\displaystyle {}V}$ is called a ${\displaystyle {}K}$-vector space (or a vector space over ${\displaystyle {}K}$), if the following axioms hold (where ${\displaystyle {}r,s\in K}$ and ${\displaystyle {}u,v,w\in V}$ are arbitrary).

1. ${\displaystyle {}u+v=v+u}$,
2. ${\displaystyle {}(u+v)+w=u+(v+w)}$,
3. ${\displaystyle {}v+0=v}$,
4. For every ${\displaystyle {}v}$, there exists a ${\displaystyle {}z}$ such that ${\displaystyle {}v+z=0}$,
5. ${\displaystyle {}1\cdot u=u}$,
6. ${\displaystyle {}r(su)=(rs)u}$,
7. ${\displaystyle {}r(u+v)=ru+rv}$,
8. ${\displaystyle {}(r+s)u=ru+su}$.