Matches in DBpedia 2015-10 for { <http://dbpedia.org/resource/Wolstenholme_prime> ?p ?o }
- Wolstenholme_prime abstract "In number theory, a Wolstenholme prime is a special type of prime number satisfying a stronger version of Wolstenholme's theorem. Wolstenholme's theorem is a congruence relation satisfied by all prime numbers greater than 7. Wolstenholme primes are named after mathematician Joseph Wolstenholme, who first described this theorem in the 19th century.Interest in these primes first arose due to their connection with Fermat's last theorem, another theorem with significant importance in mathematics. Wolstenholme primes are also related to other special classes of numbers, studied in the hope to be able to generalize a proof for the truth of the theorem to all positive integers greater than two.The only two known Wolstenholme primes are 16843 and 2124679 (sequence A088164 in OEIS). There are no other Wolstenholme primes less than 109.".
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- Wolstenholme_prime wikiPageID "29426653".
- Wolstenholme_prime wikiPageLength "10537".
- Wolstenholme_prime wikiPageOutDegree "31".
- Wolstenholme_prime wikiPageRevisionID "679111242".
- Wolstenholme_prime wikiPageWikiLink 16843_(number).
- Wolstenholme_prime wikiPageWikiLink 2124679_(number).
- Wolstenholme_prime wikiPageWikiLink Acta_Arithmetica.
- Wolstenholme_prime wikiPageWikiLink Bernoulli_number.
- Wolstenholme_prime wikiPageWikiLink Binomial_coefficient.
- Wolstenholme_prime wikiPageWikiLink Category:Classes_of_prime_numbers.
- Wolstenholme_prime wikiPageWikiLink Category:Unsolved_problems_in_mathematics.
- Wolstenholme_prime wikiPageWikiLink Congruence_relation.
- Wolstenholme_prime wikiPageWikiLink Empirical_relationship.
- Wolstenholme_prime wikiPageWikiLink Fermats_Last_Theorem.
- Wolstenholme_prime wikiPageWikiLink Fermats_last_theorem.
- Wolstenholme_prime wikiPageWikiLink Harmonic_number.
- Wolstenholme_prime wikiPageWikiLink Irregular_prime.
- Wolstenholme_prime wikiPageWikiLink Joseph_Wolstenholme.
- Wolstenholme_prime wikiPageWikiLink Left-hand_side.
- Wolstenholme_prime wikiPageWikiLink Mathematics_of_Computation.
- Wolstenholme_prime wikiPageWikiLink Natural_logarithm.
- Wolstenholme_prime wikiPageWikiLink Number_theory.
- Wolstenholme_prime wikiPageWikiLink Prime_number.
- Wolstenholme_prime wikiPageWikiLink Regular_prime.
- Wolstenholme_prime wikiPageWikiLink Sides_of_an_equation.
- Wolstenholme_prime wikiPageWikiLink Table_of_congruences.
- Wolstenholme_prime wikiPageWikiLink Uniform_distribution_(discrete).
- Wolstenholme_prime wikiPageWikiLink Wall–Sun–Sun_prime.
- Wolstenholme_prime wikiPageWikiLink Wieferich_prime.
- Wolstenholme_prime wikiPageWikiLink Wilson_prime.
- Wolstenholme_prime wikiPageWikiLink Wolstenholmes_theorem.
- Wolstenholme_prime wikiPageWikiLinkText "Wolstenholme prime".
- Wolstenholme_prime wikiPageWikiLinkText "Wolstenholme prime#Expected number of Wolstenholme primes".
- Wolstenholme_prime author "McIntosh, R. J.".
- Wolstenholme_prime conNumber "Infinite".
- Wolstenholme_prime firstTerms "168432124679".
- Wolstenholme_prime hasPhotoCollection Wolstenholme_prime.
- Wolstenholme_prime largestKnownTerm "2124679".
- Wolstenholme_prime namedAfter Joseph_Wolstenholme.
- Wolstenholme_prime oeis "A088164".
- Wolstenholme_prime parentsequence "Irregular primes".
- Wolstenholme_prime publicationYear "1995".
- Wolstenholme_prime termsNumber "2".
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- Wolstenholme_prime subject Category:Classes_of_prime_numbers.
- Wolstenholme_prime subject Category:Unsolved_problems_in_mathematics.
- Wolstenholme_prime hypernym Type.
- Wolstenholme_prime type Class.
- Wolstenholme_prime type Thing.
- Wolstenholme_prime comment "In number theory, a Wolstenholme prime is a special type of prime number satisfying a stronger version of Wolstenholme's theorem. Wolstenholme's theorem is a congruence relation satisfied by all prime numbers greater than 7. Wolstenholme primes are named after mathematician Joseph Wolstenholme, who first described this theorem in the 19th century.Interest in these primes first arose due to their connection with Fermat's last theorem, another theorem with significant importance in mathematics.".
- Wolstenholme_prime label "Wolstenholme prime".
- Wolstenholme_prime differentFrom Wolstenholme_number.
- Wolstenholme_prime sameAs Primo_de_Wolstenholme.
- Wolstenholme_prime sameAs Número_primo_de_Wolstenholme.
- Wolstenholme_prime sameAs Nombre_de_Wolstenholme.
- Wolstenholme_prime sameAs Numero_primo_di_Wolstenholme.
- Wolstenholme_prime sameAs m.0gk_8lr.
- Wolstenholme_prime sameAs Простое_число_Вольстенхольма.
- Wolstenholme_prime sameAs Q2550445.
- Wolstenholme_prime sameAs Q2550445.
- Wolstenholme_prime wasDerivedFrom Wolstenholme_prime?oldid=679111242.