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{{r|Span (algebra)}}

* [[Adjoint (linear algebra)]], the adjoint of a square matrix

...e relationship between [[addition]] and [[multiplication]] in [[elementary algebra]] known as "multiplying out". For these elementary operations it is also k

{{r|algebra}}

* An element of a group in a [[chain complex]] in [[homological algebra]]

In mathematics, the '''Hasse invariant of an algebra''' is an invariant attached to a Brauer class of algebras over a field. Th ...d the [[Albert–Brauer–Hasse–Noether theorem]] we may take to be a [[cyclic algebra]] (''L'',φ,π^''k'') for some ''k'' mod ''n'', where φ is the [

{{r|Fundamental Theorem of Algebra}}

{{r|Elementary algebra}}

The '''Chinese remainder theorem''' is the name of a theorem in [[abstract algebra]], which, in its most general formulation, provides information about the s

{{r|Sigma algebra}}

{{r|Elementary algebra}}

{{r|Linear algebra}}

{{r|Elementary algebra}}

.../math> is a [[set]] and <math>\scriptstyle \mathcal{F}</math> is a [[sigma algebra]] of subsets of <math>\scriptstyle \Omega</math>.

{{r|C*-algebra}}

{{r|Sigma algebra}}

* {{cite book | author=Serge Lang | authorlink=Serge Lang | title=Algebra | edition=3rd ed | publisher=Addison-Wesley | year=1993 | isbn=0-201-55540-

...modern mathematics for physicists and other outsiders: An introduction to algebra, topology, and functional analysis ...modern mathematics for physicists and other outsiders: An introduction to algebra, topology, and functional analysis

The '''Fundamental Theorem of Algebra''' is a mathematical theorem stating that every nonconstant [[polynomial]] One important case of the Fundamental Theorem of Algebra is that every nonconstant polynomial with [[Real number|real]] coefficients

{{r|Algebra}}