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Polynomials and equations in arabic algebra

Jeffrey A. Oaks

Archive for History of Exact Sciences 63 (2):169-203 (2009)

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François Viète’s revolution in algebra.Jeffrey A. Oaks - 2018 - Archive for History of Exact Sciences 72 (3):245-302.details Françios Viète was a geometer in search of better techniques for astronomical calculation. Through his theorem on angular sections he found a use for higher-dimensional geometric magnitudes which allowed him to create an algebra for geometry. We show that unlike traditional numerical algebra, the knowns and unknowns in Viète’s logistice speciosa are the relative sizes of non-arithmetized magnitudes in which the “calculations” must respect dimension. Along with this foundational shift Viète adopted a radically new notation based in Greek geometric equalities. (...) Download Export citation Bookmark 1 citation
Medieval Arabic Algebra as an Artificial Language.Jeffrey A. Oaks - 2007 - Journal of Indian Philosophy 35 (5-6):543-575.details Medieval Arabic algebra is a good example of an artificial language.Yet despite its abstract, formal structure, its utility was restricted to problem solving. Geometry was the branch of mathematics used for expressing theories. While algebra was an art concerned with finding specific unknown numbers, geometry dealtwith generalmagnitudes.Algebra did possess the generosity needed to raise it to a more theoretical level—in the ninth century Abū Kāmil reinterpreted the algebraic unknown “thing” to prove a general result. But mathematicians had no motive to (...) Download Export citation Bookmark 4 citations
Algebraic symbolism in medieval Arabic algebra.Jeffrey A. Oaks - 2012 - Philosophica 87 (4):27-83.details Download Export citation Bookmark 5 citations
Situating the Debate on “Geometrical Algebra” within the Framework of Premodern Algebra.Michalis Sialaros & Jean Christianidis - 2016 - Science in Context 29 (2):129-150.details ArgumentThe aim of this paper is to employ the newly contextualized historiographical category of “premodern algebra” in order to revisit the arguably most controversial topic of the last decades in the field of Greek mathematics, namely the debate on “geometrical algebra.” Within this framework, we shift focus from the discrepancy among the views expressed in the debate to some of the historiographical assumptions and methodological approaches that the opposing sides shared. Moreover, by using a series of propositions related toElem.II.5 as (...) Download Export citation Bookmark 2 citations
Irrational “Coefficients” in Renaissance Algebra.Jeffrey A. Oaks - 2017 - Science in Context 30 (2):141-172.details ArgumentFrom the time of al-Khwārizmī in the ninth century to the beginning of the sixteenth century algebraists did not allow irrational numbers to serve as coefficients. To multiply$\sqrt {18} $byx, for instance, the result was expressed as the rhetorical equivalent of$\sqrt {18{x^2}} $. The reason for this practice has to do with the premodern concept of a monomial. The coefficient, or “number,” of a term was thought of as how many of that term are present, and not as the scalar (...) Download Export citation Bookmark 1 citation

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