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Pollock_octahedral_numbers_conjecture abstract "In additive number theory, the Pollock octahedral numbers conjecture is an unproven conjecture that every positive integer is the sum of at most seven octahedral numbers. It was first stated in 1850 by Sir Frederick Pollock, better known as a lawyer and politician but also a contributor of papers on mathematics to the Royal Society. This conjecture is part of a generalization of Fermat's polygonal number theorem to three-dimensional figurate numbers, also called polyhedral numbers.".
Pollock_octahedral_numbers_conjecture wikiPageID "2684060".
Pollock_octahedral_numbers_conjecture wikiPageRevisionID "600360392".
Pollock_octahedral_numbers_conjecture hasPhotoCollection Pollock_octahedral_numbers_conjecture.
Pollock_octahedral_numbers_conjecture subject Category:Additive_number_theory.
Pollock_octahedral_numbers_conjecture subject Category:Conjectures.
Pollock_octahedral_numbers_conjecture subject Category:Figurate_numbers.
Pollock_octahedral_numbers_conjecture type Abstraction100002137.
Pollock_octahedral_numbers_conjecture type Amount105107765.
Pollock_octahedral_numbers_conjecture type Attribute100024264.
Pollock_octahedral_numbers_conjecture type Cognition100023271.
Pollock_octahedral_numbers_conjecture type Concept105835747.
Pollock_octahedral_numbers_conjecture type Conjectures.
Pollock_octahedral_numbers_conjecture type Content105809192.
Pollock_octahedral_numbers_conjecture type FigurateNumbers.
Pollock_octahedral_numbers_conjecture type Hypothesis105888929.
Pollock_octahedral_numbers_conjecture type Idea105833840.
Pollock_octahedral_numbers_conjecture type Magnitude105090441.
Pollock_octahedral_numbers_conjecture type Number105121418.
Pollock_octahedral_numbers_conjecture type Property104916342.
Pollock_octahedral_numbers_conjecture type PsychologicalFeature100023100.
Pollock_octahedral_numbers_conjecture type Speculation105891783.
Pollock_octahedral_numbers_conjecture comment "In additive number theory, the Pollock octahedral numbers conjecture is an unproven conjecture that every positive integer is the sum of at most seven octahedral numbers. It was first stated in 1850 by Sir Frederick Pollock, better known as a lawyer and politician but also a contributor of papers on mathematics to the Royal Society. This conjecture is part of a generalization of Fermat's polygonal number theorem to three-dimensional figurate numbers, also called polyhedral numbers.".
Pollock_octahedral_numbers_conjecture label "Pollock octahedral numbers conjecture".
Pollock_octahedral_numbers_conjecture sameAs 폴록의_팔면체수_추측.
Pollock_octahedral_numbers_conjecture sameAs m.07xtch.
Pollock_octahedral_numbers_conjecture sameAs Q5394231.
Pollock_octahedral_numbers_conjecture sameAs Q5394231.
Pollock_octahedral_numbers_conjecture sameAs Pollock_octahedral_numbers_conjecture.
Pollock_octahedral_numbers_conjecture wasDerivedFrom Pollock_octahedral_numbers_conjecture?oldid=600360392.
Pollock_octahedral_numbers_conjecture isPrimaryTopicOf Pollock_octahedral_numbers_conjecture.