Group homomorphism/Z to Z mod d/Directly/Example

Let ${\displaystyle {}d\in \mathbb {N} _{+}}$. We consider the set

${\displaystyle {}\mathbb {Z} /(d)=\{0,1,\ldots ,d-1\}\,,}$

together with the addition described in exercise, which makes it a group. The mapping

${\displaystyle \varphi \colon \mathbb {Z} \longrightarrow \mathbb {Z} /(d)}$

that sends an integer number ${\displaystyle {}n}$ to its remainder after division by ${\displaystyle {}d}$ is a group homomorphism. For, if ${\displaystyle {}m=ad+r}$ and ${\displaystyle {}n=bd+s}$ are given with ${\displaystyle {}0\leq r,s<d}$, then

${\displaystyle {}m+n=(a+b)d+r+s\,.}$

Here, it may happen that ${\displaystyle {}r+s\geq d}$. In this case,

${\displaystyle {}\varphi (m+n)=r+s-d\,,}$

and this coincides with the addition of ${\displaystyle {}r}$ and ${\displaystyle {}s}$ in ${\displaystyle {}\mathbb {Z} /(d)}$. This mapping is surjective, but not injective.