Draft:Babczynski's theorem

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Declined by KylieTastic 29 days ago. Last edited by KylieTastic 29 days ago. Reviewer: Inform author.

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Babczynski's theorem is a mathematical statement in number theory that describes a regularity in the divisibility of certain six-digit numbers. Specifically, if a number is of the form xyxyxyxy (where two two-digit numbers are repeated), it is always divisible by four prime numbers: 3, 7, 13 and 37.

Definition

Any six-digit number of the form xyxyxy, where xy is any two-digit number, is divisible by the prime numbers 3, 7, 13 and 37. For example: 121212, 565656, or 989898. These numbers are divisible by all four prime numbers.

Proof

Numbers in the form xyxyxy can be written algebraically as: n=100000x+10000y+1000x+100y+10x+y=10101×(100x+y)

This shows that every number in this form is a multiple of 10101. The number 10101 can be factorised into prime numbers:

10101=3×7×13×37

Since every number in the form xyxyxy is a multiple of 10101, it must also be divisible by 3, 7, 13 and 37.

Application

Although this theorem is primarily theoretical, it has potential applications in several areas:

Control number generation: In systems that use numerical identifiers (e.g. bar codes), this theorem can be used to generate numbers with predictable divisibility properties.
Numerical algorithms: The theorem simplifies divisibility checking in certain numerical algorithms.
Mathematical modelling: The number patterns defined by the theorem can serve as useful constructs in number theory, providing examples of regular number structures.

Context in number theory

The theorem has its roots in number theory, specifically in the study of divisibility and regular numerical patterns. It can be related to other well-known problems and concepts in number theory, such as the

These concepts, like Babczynski's theorem, are useful in the study of divisibility, primes, and other fundamental structures in number theory.

References

^[1]

^ "Babczyński Theorem - ProofWiki". proofwiki.org.

[1] "Babczyński Theorem - ProofWiki". proofwiki.org.

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