Pages that link to "Item:Q342610"

The following pages link to On the arithmetical quadrature of the circle, the ellipse and the hyperbola. A corollary is a trigonometry without tables. Edited and with an epilogue by Eberhard Knobloch. Dual German-Latin text. Translated from the Latin by Otto Hamborg (Q342610):

Displaying 8 items.

• Unknown manuscript material of Christiaan Huygens (Q1057249) (← links)
• Reply to Knobloch (Q1678025) (← links)
• Leibniz's syncategorematic infinitesimals. II: Their existence, their use and their role in the justification of the differential calculus (Q2201990) (← links)
• The Leibniz catenary and approximation of \(e\) -- an analysis of his unpublished calculations (Q2279707) (← links)
• On what has been called Leibniz's rigorous foundation of infinitesimal geometry by means of Riemannian sums (Q2359606) (← links)
• How Leibniz tried to tell the world he had squared the circle (Q2697615) (← links)
• On the analysis of the infinity (1684--1703). Treatise on the quadrature of curves (1704) (Q4841554) (← links)
• Collected works and letters. Series 7. Mathematical writings. Vol. 6. 1673--1676. Arithmetic squaring of the circle. Edited by Uwe Mayer and Siegmund Probst (Q5172334) (← links)