Group homomorphism/Z to Z/Example

Let ${\displaystyle {}d\in \mathbb {N} }$ be fixed. The mapping

${\displaystyle \mathbb {Z} \longrightarrow \mathbb {Z} ,n\longmapsto dn,}$

is a group homomorphism. This follows immediately from the distributive law. For ${\displaystyle {}d\geq 1}$, this mapping is injective, and the image is the subgroup ${\displaystyle {}\mathbb {Z} d\subseteq \mathbb {Z} }$. For ${\displaystyle {}d=0}$, we have the zero mapping. For ${\displaystyle {}d=1}$, the mapping is the identity. For ${\displaystyle {}d\geq 2}$, the mapping is not surjective.