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[[Fasciculus:Polynomialdeg5.svg|thumb|[[Graphum (mathematica)|Graphum]] Polynomium gradus quinti]]
'''Polynomium'''<ref>[http://books.google.com/books?id=MrhJAAAAMAAJ&printsec=frontcover&source=gbs_v2_summary_r&cad=0#v=snippet&q=polynomium&f=false Lectiones elementares mathemaicae: seu, elementa algebrae, et geometriae By Nicolas Louis de La Caille]</ref> (< πολύς 'multum' + in [[mathematica]] omnis [[functio]] formae <br /> <math> f(x)= \sum_{i=0}^n a_i \cdot x^{i}=a_n \cdot x^n+a_{n-1}\cdot x^{n-1}+\dots+a_1 \cdot x+a_0,</math> </br>
(ubi est <math>n \in \mathbb N, a_i \in \mathbb R</math>) appellatur. <math> n </math> appellatur gradus polynomii.
[[Algebra elementaria]] de polynomiis tractat.
== Etymologia ==
Nomen ''polynomium'' creatum est ab exemplo ''binomio'', quod ipsum a Francogallico ''nom'' vel Latino ''nomine'' contracto formatum est.<ref>''American Heritage Dictionary'', s.vv. "[https://ahdictionary.com/word/search.html?q=polynomial&submit.x=31&submit.y=28 polynomial]", "[https://ahdictionary.com/word/search.html?q=binomial&submit.x=0&submit.y=0 binomial]"; cf. ''Oxford English Dictionary''.</ref>
== Proprietates ==
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