Cauchy sentence example

cauchy
  • To determine N recourse must be made to Cauchy's formula of dispersion (q.v.), n =A+B/X2+C/A4+...

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  • Cauchy and published in 1835.

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  • The formula arrived at by Cauchy was n= A-FB+?

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  • There are also grave theoretical objections to Cauchy's formula.

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  • Cauchy (Paris, 1846); and the Geometrie descriptive (originating, as mentioned above, in the lessons given at the normal school).

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  • Grassmann made in 1854 a somewhat savage onslaught on Cauchy and De St Venant, the former of whom had invented, while the latter had exemplified in application, the system of " clefs algebriques," which is almost precisely 1 Die Ausdehnungslehre, Leipsic, 1844; 2nd ed., vollstandig and in strenger Form bearbeitet, Berlin, 1862.1862.

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  • But it is to be observed that Grassmann, though he virtually accused Cauchy of plagiarism, does not appear to have preferred any such charge against Hamilton.

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  • Having received his early education from his father Louis Francois Cauchy (1760-1848), who held several minor public appointments and counted Lagrange and Laplace among his friends, Cauchy entered Ecole Centrale du Pantheon in 1802, and proceeded to the Ecole Polytechnique in 1805, and to the Ecole des Ponts et Chaussees in 1807.

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  • Returning to Paris in 1838, he refused a proffered chair at the College de France, but in 1848, the oath having been suspended, he resumed his post at the Ecole Polytechnique, and when the oath was reinstituted after the coup d'etat of 1851, Cauchy and Arago were exempted from it.

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  • A profound mathematician, Cauchy exercised by his perspicuous and rigorous methods a great influence over his contemporaries and successors.

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  • The genius of Cauchy was promised in his simple solution of the problem of Apollonius, i.e.

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  • His collected works, CEuvres completes d'Augustin Cauchy, have been published in 27 volumes.

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  • Mourey in France, independently of one another and of Argand, reinvented these modes of interpretation; and still later, in the writings of Cauchy, Gauss and others, the properties of the expression a + b I were developed into the immense and most important subject now called the theory of complex numbers (see Number).

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