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Lemma: Sets of Integers Co-Prime to a given Integer are Divisor-Closed

Let \(d\in\mathbb Z\) denote any integer. Every subset of integers co-prime to $d$ \(\mathbb Z_d\) is divisor-closed.

Table of Contents

Proofs: 1

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References

Bibliography

1. Piotrowski, Andreas: Own Research, 2014