Affine space/Product with K/Standard space/Basis/Exercise

Let ${\displaystyle {}V}$ be a ${\displaystyle {}K}$-vector space. We consider the set

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

which is an affine space over ${\displaystyle {}V}$.

a) Show that the points ${\displaystyle {}P_{i}=(v_{i},1)}$, ${\displaystyle {}i=1,\ldots ,n}$, form an affine basis of ${\displaystyle {}E}$ if and only if the ${\displaystyle {}P_{i}}$ (considered as vectors in ${\displaystyle {}V\times K}$) form a vector space basis of ${\displaystyle {}V\times K}$.

b) Show that, in this case, for a point ${\displaystyle {}P\in E}$, the barycentric coordinates of ${\displaystyle {}P}$ with respect to ${\displaystyle {}P_{1},\ldots ,P_{n}}$ equal the coordinates of ${\displaystyle {}P}$ with respect to the vector space basis ${\displaystyle {}P_{1},\ldots ,P_{n}}$.