Chinese remainder theorem

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Revision as of 16:48, 18 November 2008 by imported>Barry R. Smith (→‎Theorem statement)
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The Chinese remainder theorem is a mathematical result about modular arithmetic. It describes the solutions to a system of linear congruences with distinct moduli. As well as being a fundamental tool in number theory, the Chinese remainder theorem forms the theoretical basis of algorithms for storing integers and in cryptography. The Chinese remainder theorem can be generalized to a statement about commutative rings; for more about this, see the "Advanced" subpage.

Theorem statement

The Chinese remainder theorem:

Let be pairwise relatively prime positive integers, and set . Let be integers. The system of congruences

has solutions, and any two solutions differ by a multiple of .