The Early Mathematical Manuscripts of LeibnizCourier Corporation, 6 dic 2012 - 256 pagine The manuscripts and correspondence of Leibniz possess a special interest: they are invaluable as aids to the study of their author's part in the invention and development of the infinitesimal calculus. In addition, the main ideas behind Leibniz's philosophical theories lay here, in his mathematical work. This volume consists of two sections. The first part features Leibniz's own accounts of his work, and the second section comprises critical and historical notes and essays. An informative Introduction leads to the "postscript" to Leibniz's 1703 letter to James Bernoulli, his "Historia et Origio Calculi Differentialis," and manuscripts of the period 1673-77. Essays by the distinguished scholar C. I. Gerhardt follow--Leibniz in London and Leibniz and Pascal, along with additional letters and manuscripts by Leibniz. |
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The Early Mathematical Manuscripts of Leibniz: Translated from the Latin ... Gottfried Wilhelm Freiherr von Leibniz Visualizzazione completa - 1920 |
The Early Mathematical Manuscripts of Leibniz: Translated from the Latin ... Gottfried Wilhelm Freiherr von Leibniz Visualizzazione completa - 1920 |
The Early Mathematical Manuscripts of Leibniz: Translated from the Latin ... Gottfried Wilhelm Freiherr von Leibniz Visualizzazione completa - 1920 |
Parole e frasi comuni
abscissae Acta Eruditorum algebraical analysis analytical angle applied arithmetical progression arithmetical quadrature axis Barrow Cantor Cavalieri center of gravity characteristic triangle circle considered curve cycloid Descartes Dettonville diagram differences differential calculus differential triangle equal equation essay expressed figure follows geometry Gerhardt give given Gregory St Hence Historia Huygens hyperbola idea indivisibles infinitely small infinitesimal infinitesimal calculus integration inverse James Gregory known later Leib Leibniz letter logarithm manuscript mathematicians mathematics matter means method of tangents multiplied namely Newton Newton's method notation obtained Oldenburg ordinates parabola parallel Pascal perpendicular plane problems proof published quadratrix quadrature quantities ratio rectangle contained referred remark Roberval sine Sluse Slusius solid solution square straight line subtangent suggestion suppose surface taken theorem things tion Traitté triangular sum variable Wallis Weissenborn word