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In [[algebra]], the '''content''' of a [[polynomial]] is the [[highest common factor]] of its coefficients.
A polynomial is ''[[Primitive polynomial|primitive]]'' if it has content unity.
[[Gauss's lemma (polynomial)|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.
==References==
* {{cite book | author=B. Hartley | authorlink=Brian Hartley | coauthors=T.O. Hawkes | title=Rings, modules and linear algebra | publisher=Chapman and Hall | year=1970 | isbn=0-412-09810-5 }}
* Page 181 of {{Lang Algebra|edition=3}}
* {{cite book | author=David Sharpe | title=Rings and factorization | publisher=[[Cambridge University Press]] | year=1987 | isbn=0-521-33718-6 | pages=68-69 }}
