◀ ▲ ▶Branches / Numbertheory / Lemma: Sets of Integers CoPrime to a given Integer are DivisorClosed
Lemma: Sets of Integers CoPrime to a given Integer are DivisorClosed
Let \(d\in\mathbb Z\) denote any integer. Every subset of integers coprime to $d$ \(\mathbb Z_d\) is divisorclosed.
Table of Contents
Proofs: 1
Thank you to the contributors under CC BYSA 4.0!
 Github:

References
Bibliography
 Piotrowski, Andreas: Own Research, 2014