Cyclic group/Z mod n/Example

Let ${\displaystyle {}G}$ be a cyclic group with a generator ${\displaystyle {}g}$. We consider the corresponding group homomorphism

${\displaystyle \varphi \colon \mathbb {Z} \longrightarrow G,n\longmapsto g^{n},}$

in the sense of fact. Since we have a generator, this mapping is surjective. The kernel of this mapping is determined the order of ${\displaystyle {}g}$, which we denote by ${\displaystyle {}k}$ (or it is ${\displaystyle {}0}$, in case the order is ${\displaystyle {}\infty }$). Due to fact, there exists a canonical isomorphism

${\displaystyle {\tilde {\varphi }}\colon \mathbb {Z} /(k)\longrightarrow G.}$

In particular, there exists, up to isomorphism, for every ${\displaystyle {}k}$, exactly one cyclic group, namely ${\displaystyle {}\mathbb {Z} /(k)}$.