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- Q7992010 subject Q7012332.
- Q7992010 abstract "Wheel factorization is a method for performing a preliminary reduction in the number of potential primes from the initial set of all natural numbers 2 and greater; possibly prior to passing the result list of potential primes to the Sieve of Eratosthenes or other sieve that separates prime numbers from composites, but may further be used as a prime number wheel sieve in its own right by recursively applying the factorization wheel generation algorithm. Much definitive work on wheel factorization, sieves using wheel factorization, and wheel sieve, was done by Paul Pritchard in formulating a series of different algorithms. To demonstrate the use of the factorization wheel graphically, one starts by writing the natural numbers around circles as shown in the adjacent diagram. Prime numbers in the innermost circle have their multiples in similar positions as themselves in the other circles, forming spokes of primes and their multiples. Multiples of the prime numbers in the innermost circle form spokes of composite numbers in the outer circles.".
- Q7992010 thumbnail Wheel_factorization-n=30.svg?width=300.
- Q7992010 wikiPageExternalLink summary?doi=10.1.1.52.835.
- Q7992010 wikiPageExternalLink page.php?sort=WheelFactorization.
- Q7992010 wikiPageWikiLink Q177898.
- Q7992010 wikiPageWikiLink Q190026.
- Q7992010 wikiPageWikiLink Q2389810.
- Q7992010 wikiPageWikiLink Q2517976.
- Q7992010 wikiPageWikiLink Q273023.
- Q7992010 wikiPageWikiLink Q49008.
- Q7992010 wikiPageWikiLink Q50707.
- Q7992010 wikiPageWikiLink Q7012332.
- Q7992010 wikiPageWikiLink Q8366.
- Q7992010 comment "Wheel factorization is a method for performing a preliminary reduction in the number of potential primes from the initial set of all natural numbers 2 and greater; possibly prior to passing the result list of potential primes to the Sieve of Eratosthenes or other sieve that separates prime numbers from composites, but may further be used as a prime number wheel sieve in its own right by recursively applying the factorization wheel generation algorithm.".
- Q7992010 label "Wheel factorization".
- Q7992010 depiction Wheel_factorization-n=30.svg.