Affine space/Product with K/Realization/Exercise

Let ${\displaystyle {}E}$ be a nonempty affine space over a ${\displaystyle {}K}$-vector space ${\displaystyle {}V}$. Let ${\displaystyle {}P\in E}$ be a fixed point, and let

${\displaystyle \theta \colon V\longrightarrow E,v\longmapsto P+v,}$

be the corresponding bijection. Using this bijection, we identify ${\displaystyle {}E}$ with

${\displaystyle {}E'={\left\{(v,1)\in V\times K\mid v\in V\right\}}\,}$

via the mapping

${\displaystyle \varphi \colon E\longrightarrow E',P\longmapsto (\theta ^{-1}(P),1).}$

a) Show that ${\displaystyle {}E'}$ is an affine subspace of ${\displaystyle {}V\times K}$, with translation space ${\displaystyle {}V\times 0}$.

b) Show that

${\displaystyle {}\varphi (Q+v)=\varphi (Q)+v\,}$

holds for all ${\displaystyle {}Q\in E}$.