Combination Theorem for Cauchy Sequences/Quotient Rule

Theorem
Let $\struct {R, \norm {\, \cdot \,} }$ be a normed division ring with zero: $0$.

Let $\sequence {x_n}$ and $\sequence {y_n}$ be Cauchy sequences in $R$. Suppose $\sequence {y_n}$ does not converge to $0$.

Then:
 * $\exists K \in \N: \forall n > K : y_n \ne 0$

and the sequences:
 * $\sequence { {x_{K + n} } \paren {y_{K + n} }^{-1} }_{n \mathop \in \N}$ and $\sequence {\paren {y_{K + n} }^{-1} {x_{K + n} } }_{n \mathop \in \N}$ are well-defined and Cauchy sequences.

Proof
By the Inverse Rule for Normed Division Ring:
 * $\exists K \in \N : \forall n > K : y_n \ne 0$.

and the sequence:
 * $\sequence {\paren {x_{K+n}}^{-1} }_{n \mathop \in \N}$ is well-defined and a Cauchy sequence.

By Subsequence of Cauchy Sequence in Normed Division Ring is Cauchy Sequence, $\sequence {x_{K + n} }_{n \mathop \in \N}$ is a Cauchy sequence.

By Product Rule for Normed Division Ring Sequences:
 * the sequences $\sequence { {x_{K + n} } \paren {y_{K + n} }^{-1} }_{n \mathop \in \N}$ and $\sequence {\paren {y_{K + n} }^{-1} {x_{K + n} } }_{n \mathop \in \N}$ are Cauchy sequences.