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- Content_(algebra) abstract "In algebra, the content of a polynomial is the highest common factor of its coefficients.A polynomial is primitive if it has content unity.Gauss's lemma for polynomials may be expressed as stating that for polynomials over a unique factorization domain, the content of the product of two polynomials is the product of their contents.".
- Content_(algebra) wikiPageID "11934455".
- Content_(algebra) wikiPageRevisionID "558097177".
- Content_(algebra) hasPhotoCollection Content_(algebra).
- Content_(algebra) subject Category:Algebra.
- Content_(algebra) subject Category:Polynomials.
- Content_(algebra) type Abstraction100002137.
- Content_(algebra) type Function113783816.
- Content_(algebra) type MathematicalRelation113783581.
- Content_(algebra) type Polynomial105861855.
- Content_(algebra) type Polynomials.
- Content_(algebra) type Relation100031921.
- Content_(algebra) comment "In algebra, the content of a polynomial is the highest common factor of its coefficients.A polynomial is primitive if it has content unity.Gauss's lemma for polynomials may be expressed as stating that for polynomials over a unique factorization domain, the content of the product of two polynomials is the product of their contents.".
- Content_(algebra) label "Content (algebra)".
- Content_(algebra) label "Inhalt (Polynom)".
- Content_(algebra) sameAs Inhalt_(Polynom).
- Content_(algebra) sameAs m.02ryp37.
- Content_(algebra) sameAs Q1663499.
- Content_(algebra) sameAs Q1663499.
- Content_(algebra) sameAs Content_(algebra).
- Content_(algebra) wasDerivedFrom Content_(algebra)?oldid=558097177.
- Content_(algebra) isPrimaryTopicOf Content_(algebra).