Topological Properties of Non-Archimedean Division Rings/Spheres are Clopen

Theorem
Let $\struct {R, \norm {\,\cdot\,} }$ be a normed division ring with non-Archimedean norm $\norm{\,\cdot\,}$,

Let $x \in R$.

Let $r \in \R_{\gt 0}$.

Let $\map {S_r} x$ denote the $r$-sphere of $x$ in $\struct {R,\norm{\,\cdot\,}}$

Then:
 * The $r$-sphere of $x$, $\map {S_r} x$, is both open and closed in the metric induced by $\norm {\,\cdot\,}$.

Proof
We have:

Let $d$ be the metric induced by the norm $\norm{\,\cdot\,}$.

By Open Balls Are Clopen then $\map {B_r} x$ is both open and closed in $d$.

By Metric Induces Topology then $R \setminus \map {B_r} x$ is is both open and closed in $d$.

By Closed Balls Are Clopen then $\map { {B_r}^-} x$ is both open and closed in $d$.

By Metric Induces Topology then the intersection of a finite number of open sets is open.

Hence $\map {S_r} x$ is open in the metric space $\struct {R, d}$.

By Intersection of Closed Sets is Closed then $\map {S_r} x$ is closed in $\struct {R, d}$.

The result follows.