Characterisation of Non-Archimedean Division Ring Norms/Sufficient Condition/Lemma 2

Theorem
Let $\struct{R, \norm{\,\cdot\,}}$ be a normed division ring with unity $1_R$.

Let $x \in R$.

Let $n \in \N$.

Then for all $i$, $0 \le i \le n$:
 * $\norm {x}^i \le \max \set {\norm {x}^n, 1}$

Proof
If $\norm{x} \gt 1$ then for all $i$, $0 \le i \le n$:
 * $\norm {x}^i \le \norm {x}^n \le \max \set {\norm {x}^n, 1}$

If $\norm{x} \le 1$ then for all $i$, $0 \le i \le n$:
 * $\norm {x}^i \le 1 \le \max \set {\norm {x}^n, 1}$

In either case for all $i$, $0 \le i \le n$, then:
 * $\norm {x}^i \le \max \set {\norm {x}^n, 1}$