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Properly typeset variables, and fixed some typo's.
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Stefan Kohl
Stefan Kohl
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covering Covering systems

Suppose we have a minimal covering system.If k If $k$ is the maximal positive integer integer such that kthe $k$-th power power of a prime p$p$ divides some modulus,than k then the $k$-th power power of p$p$ is a divisor of at least p$p$ moduli.  Is itthis true or is there a counterexample?

covering systems

Suppose we have a minimal covering system.If k is maximal positive integer such that k-th power of a prime p divides some modulus,than k-th power of p is divisor of at least p moduli.Is it true or is there a counterexample?

Covering systems

Suppose we have a minimal covering system. If $k$ is the maximal positive integer such that the $k$-th power of a prime $p$ divides some modulus, then the $k$-th power of $p$ is a divisor of at least $p$ moduli.  Is this true or is there a counterexample?

Post Reopened by Gerry Myerson, Lucia, David Roberts, Bjørn Kjos-Hanssen, Yemon Choi
Post Closed as "Not suitable for this site" by Daniel Loughran, Wolfgang, Stefan Kohl, Franz Lemmermeyer, Myshkin
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John Neumann
John Neumann
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covering systems

Suppose we have a minimal covering system.If k is maximal positive integer such that k-th power of a prime p divides some modulus,than k-th power of p is divisor of at least p moduli.Is it true or is there a counterexample?