Dechales, Claude François Millet

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Dechales, Claude François Millet

(b. Chambéry, France, 1621; d Turin, Italy, 28 March 1678)

mathematics.

Not much is known of Dechales’s personal life. For some times he was a Jesuit missionary in Turkey. He was well liked in Paris, where for four years he read public mathematics lectures at the Collège de Clermont. After teaching at Lyons and chambéry, he moved to Marseilles, where he taught the arts of navigation and military engineering and the practical applications of mathematics to science. From Marseilles he went to Turin, where he was appointed professor of mathematics at the university. He died there at the age of fifty-seven.

Although not a first-rate mathematician, Dechales was rather skillful in exposition; Hutton has observed that “his talent rather lay in explaining those sciences [mathematics and mechanics] with ease and accuracy… that he made the best use of the production of other man, and that he drew the several parts of the mathematical sciences together with great judgement and perspicuity.”

Dechales is best remembered for his Cursus seu mundus mathematicus, a complete course of mathematics, including many related subject that in his day were held to belong to the exact sciences. The first volume opens with a description of mathematical books arranged chronologically that, as De Morgan remarks, is well done and indicates that Dechales had actually read them. This is followed by his edition of Euclid’s Elements (bks. I-VI, XI, and XII). Arithmetic computation, algebra, spherical trigonometry, and conic sections are of course included. Of the algebraic material, Hutton observes that it is “of a very old fashioned sort, considering the time when it was written.” The algebra of Dechales is imbued with the spirit of Diophantus; as Mortiz Cantor points out, Dechales rarely mentions the work of Mydorge, Desargues, Pascal, Fermat, Descartes, or Wallis. Among other subjects included in the Cursus are practical geometry, machanics, statics, geography, magnetism, civil architecture, military architecture, optics, catoptrics, perspective, dioptrics, hydrostatics, hydraulic machinery, navigation, pyrotechnics, gnomonics, astronomy, astrology, meteoritics, the calender, and music, as well as a section entitled “A Refutation of the Cartesian Hypothesis.” Indeed, in his history of mathematics, Cantor gives a detailed description of the Cursus both because it was a popular and widely used textbook and because it reflected the totality of mathematical knowledge as possessed by dilettantes or amateur mathematicians of the time who were fairly competent interpreters or expounders of the subject. Thus, while according Dechales due credit for his effort, Cantor is nevertheless critical of much of the mathematical content of his work, deploring Dechales’s failure to make full use of such available contemporary source materials as the firsthand works of mathematicians, their correspondence and so on.

Dechales’s separate edition of Euclid, long a favorite in France and elsewhere on the Continent, never became popular in England.

BIBLIOGRAPHY

I. Original Works. Dechales’s works are Cursus seu mundus mathematicus, 3 vold. (Lyons, 1674), also ed. by Amati Varcin, 4 vold. (Lyons, 1960); L’art de fortifier, de défendre et d’attaquer les places, suivant les méthodes françoises, hollandoises, italiennes & espagnoles (Paris, 1677); L’art de naviger demontré par principes & confirmé par plusieurs observations tirées de l’expérience (Paris, 1677); and Les principes généraux de la géographie (Paris, 1677). His edition of Euclid, Les élémens d’Euclide, expliquez d’une manière nouvelle & très facile. Avec l’usage de chaque proposition pour toutes les parties de mathématiques (Lausanne, 1678, 1683), appeared in revised editions by Ozanam (Paris, 1730) and Audierne (Paris, 1753) and in English translation by Reeve Williams (London, 1685).

II. Secondary Literature. On Dechales or his work, see Moritz Cantor, Vorlesungen über die Geschichte der Mathematik, III (Leipzig, 1913), 4–6, 15–19; Augustus De Morgan, Arithmetical Books From the Invention of printing to the Present Time (London, 1847), pp. xv, 53; Charles Hutton, “History of Algebra,” in Tracts on Mathematical Philosophical Subjects, II (London, 1812), tract no. 33, p. 301; and Philosophical and Mathematical Dictionary, I (London, 1815), 395–396; and The Penny Cyclopaedia of the Society for the Diffusion of Useful Knowledge, VIII (London, 1837), 343.

William Schaaf