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Sierpinski_number abstract "In number theory, a Sierpinski or Sierpiński number is an odd natural number k such that k2n + 1 is composite, for all natural numbers n; in 1960, Wacław Sierpiński proved that there are infinitely many odd integers k which have this property.In other words, when k is a Sierpiński number, all members of the following set are composite:Numbers in such a set with odd k and k < 2n are Proth numbers.".
Sierpinski_number wikiPageExternalLink showthread.php?t=2665.
Sierpinski_number wikiPageExternalLink sierp.html.
Sierpinski_number wikiPageID "169570".
Sierpinski_number wikiPageRevisionID "604239307".
Sierpinski_number hasPhotoCollection Sierpinski_number.
Sierpinski_number title "Sierpinski's composite number theorem".
Sierpinski_number urlname "SierpinskisCompositeNumberTheorem".
Sierpinski_number subject Category:Conjectures.
Sierpinski_number subject Category:Number_theory.
Sierpinski_number subject Category:Prime_numbers.
Sierpinski_number subject Category:Science_and_technology_in_Poland.
Sierpinski_number subject Category:Unsolved_problems_in_mathematics.
Sierpinski_number type Abstraction100002137.
Sierpinski_number type Attribute100024264.
Sierpinski_number type Cognition100023271.
Sierpinski_number type Concept105835747.
Sierpinski_number type Condition113920835.
Sierpinski_number type Conjectures.
Sierpinski_number type Content105809192.
Sierpinski_number type DefiniteQuantity113576101.
Sierpinski_number type Difficulty114408086.
Sierpinski_number type Hypothesis105888929.
Sierpinski_number type Idea105833840.
Sierpinski_number type Measure100033615.
Sierpinski_number type Number113582013.
Sierpinski_number type Prime113594005.
Sierpinski_number type PrimeNumber113594302.
Sierpinski_number type PrimeNumbers.
Sierpinski_number type Problem114410605.
Sierpinski_number type PsychologicalFeature100023100.
Sierpinski_number type Speculation105891783.
Sierpinski_number type State100024720.
Sierpinski_number type UnsolvedProblemsInMathematics.
Sierpinski_number comment "In number theory, a Sierpinski or Sierpiński number is an odd natural number k such that k2n + 1 is composite, for all natural numbers n; in 1960, Wacław Sierpiński proved that there are infinitely many odd integers k which have this property.In other words, when k is a Sierpiński number, all members of the following set are composite:Numbers in such a set with odd k and k < 2n are Proth numbers.".
Sierpinski_number label "Liczby Sierpińskiego".
Sierpinski_number label "Nombre de Sierpiński".
Sierpinski_number label "Numero di Sierpiński".
Sierpinski_number label "Número de Sierpiński".
Sierpinski_number label "Sierpinski number".
Sierpinski_number label "Sierpiński-Zahl".
Sierpinski_number label "Sierpińskigetal".
Sierpinski_number label "Числа Серпинского".
Sierpinski_number label "عدد سيربنسكي".
Sierpinski_number label "シェルピンスキー数".
Sierpinski_number label "谢尔宾斯基数".
Sierpinski_number sameAs Sierpiński-Zahl.
Sierpinski_number sameAs Número_de_Sierpiński.
Sierpinski_number sameAs Nombre_de_Sierpiński.
Sierpinski_number sameAs Numero_di_Sierpiński.
Sierpinski_number sameAs シェルピンスキー数.
Sierpinski_number sameAs Sierpińskigetal.
Sierpinski_number sameAs Liczby_Sierpińskiego.
Sierpinski_number sameAs m.016qml.
Sierpinski_number sameAs Q547430.
Sierpinski_number sameAs Q547430.
Sierpinski_number sameAs Sierpinski_number.
Sierpinski_number wasDerivedFrom Sierpinski_number?oldid=604239307.
Sierpinski_number isPrimaryTopicOf Sierpinski_number.