1 706 résultats
2008ROD0122127FLAMMARION. 2008. In-12. Relié. Bon état, Couv. convenable, Dos satisfaisant, Intérieur frais. XX+839 pages. Emboitage cartonné souple en noir et blanc satisfaisante. Un signet.. . Sous Emboitage. . Classification Dewey : 100-PHILOSOPHIE ET DISCIPLINES CONNEXES
1967R300273473Librairie philosophique J.Vrin. 1967. In-12. Broché. Etat d'usage, Couv. légèrement passée, Dos satisfaisant, Intérieur acceptable. 94 pages.. . . . Classification Dewey : 190-Philosophie occidentale moderne
1962R320052970MONTAIGNE. 1962. In-8. Broché. Etat d'usage, Couv. convenable, Dos satisfaisant, Intérieur frais. 522 pages.. . . . Classification Dewey : 100-PHILOSOPHIE ET DISCIPLINES CONNEXES
1962R300330359Aubier/Montaigne. 1962. In-12. Broché. Etat d'usage, Couv. légèrement passée, Dos plié, Papier jauni. 522 pages. Légère trace de mouillure sur le 1er plat et le dos.. . . . Classification Dewey : 100-PHILOSOPHIE ET DISCIPLINES CONNEXES
38710BBHildesheim ; Zürich ; New York, Georg Olms Verlag, 2016. Gebundene Ausgabe. Sehr guter Zustand mit nur minimalen Gebrauchsspuren am Einband. Kein Besitzervermerk! Keine Anstreichungen! Kein Mängelexemplar!
22863ABHildesheim, Georg Olms Verlag, 2017. Gr.-8vo. 858 S. Originaler Pappeinband. Bd. 6. Verlagsfrischer Zustand! (NP 78,-- EUR).
20323Hildesheim u.a., Olms, 2017. Gr.-8vo. 858 S. Illustr. OPp.
1962R320058604LIBRAIRIE PHILOSOPHIQUE J. VRIN. 1962. In-8. Broché. Etat d'usage, Couv. convenable, Dos satisfaisant, Intérieur frais. 154 pages - 1 petite etiquette collée en coiffe en tete -. . . . Classification Dewey : 100-PHILOSOPHIE ET DISCIPLINES CONNEXES
19081199082Leipzig; Verlag der Dürr'schen Buchhandlung, 1904 / 1908. LXVIII; 590 Seiten und 122 Seiten; 19 cm; 2 fadengeh. Orig.-Leinenbände.
194755836ABReutlingen, Gryphius 1947. Gr.-8°. 240 S., OBrosch. (stw. verblaßt). EA. OBrosch. (stw. verblaßt). EA.
169141859Leipzig Grosse & Gleditsch 1691. 4to. Contemp. full vellum. Faint handwritten title on spine. a small stamp on titlepage. In: "Acta Eruditorum Anno MDCLXXXXI". 85906 pp. and 13 of 15 folded engraved plates. The 2 first plates lacks but they do not belong to the papers listed.Leibniz' papers: pp.277-281 a. 1 plate pp. 435-439. Johann Bernoulli: pp. 274-276 a. 1 plate. Huygens: pp. 281-282. - Jacob Bernoulli: pp. 282-290 a. 1 plate. <br/><br/><em>All papers first apperance. All 5 of extreme importence in the development of the Calculus. Leibniz' 2 papers on the catenary curve paper 1-2 offered here was written at the instigation of Jacques Bernoulli. Following the example of Blaise Pascal who had initiated in 1658 a contest for the construction of the cycloid Leibniz also provoked the geometers of his time by challenging them to submit at the fixed date of mid-1691 their geometric method for the construction of the catenary curve. Leibniz later provided the answer followed by Johann Bernoulli and Huygens.'These two papers are a historical account of the origin of the study of this transcendental curve and at the same time the first physical-geometric construction showing the species-relationship between the catenary and the logarithmic curves as two companion curves; one arithmetic the other geometric. All of the differentials of the catenary curve are arithmetic means of corresponding differentials of the logarithmic curve; and all of the differentials of the logarithmic curve are geometric means of the catenary.'"The Catenary is the form of a hanging fully flexible rope or chain the name comes from "catena" which means 'chain' suspended on two points. The interest in this curve originated with Galileo who thought that is was a parabola. Young Christiaan Huygens proved in 1646 that this cannot be the case. What the actual form was remained an open question till 1691 when Leibniz Johann Bernoulli and the then much older Huygens sent solutions to the problem to the "Acta" Jakob Bernoulli 1690 Johann Bernoulli 1691 Huygens 1691 and Leibniz 1691 - these 4 1691-papers offered here - in which the previous year Jakob Bernoulli had challenged mathematicians to solve it. As published the solutions did not reveal the methods but through later publications of manuscripts these methods have been known. Huygens applied with great paper 4 virtuosity the by then classical methods of 17th century infinitesimal mathematics and he needed all his ingenuity to reach a satisfactory solution. Leibniz the papers 1-2 and Bernoulli paper 3 applying the new Calculus found the solutions in a much direct way. In fact the catenary was a test-case between the old and the new style in the study of curves and only because the champion of the old style was a giant like Huygens the test-case can formally be considered as ending in a draw." Grattan-Guiness in "From the Calculus to Set Theory 1630-1910.".The paper by JACOB BERNOULLI no. 5 offered here is a milestone papers as it marks the invention of the "SYSTEM OF POLAR COORDINATES" with points located by reference to a fixed point and a line through that point. Although newton had earlier also devised such a coordinate system in 1671 his work was not known so that the credit for the discovery generally goes to Bernoulli. Parkinson Breakthroughs 1691.Further papers contained in this volume of Acta Eruditorum:DENYS PAPIN: Mecanicorum de Viribus Motricibus sententia asserta a D. Papino adversius C.G.G. L. Leibniz objectiones. pp. 6-13. The plate lacks. - and Dion. Papini Observationes quaedam circa materias ad Hydraulicam spectantes. Pp. 208-213 a. 1 plate. This importent paper is part of the LEIBNIZ-PAPIN-CONTROVERSY.JACOB BERNOULLI: Specimen Calculi Differentialis in dimensione Parabolæ helicoidis ubi de flexuris curvarum in genere carundem evolutionibus. Pp. 13-22. The plate lacks. - and J.B. Demonstratio Centri Oscillationis ex Natura Vectis reperta occassione eorum quæ super hac materia in Historia Literaria Roterodamensi recensentur articulo.Pp.317-321.LEIBNIZ: O.V.E. Additio ad Schediasma de Medii Resistentia publicatum in Actis mensis Febr. 1889. Pp. 177-178. and O.V.E. Quadratura Arithmetica Communis Sectionum Conicarum quæ centrum babent.Pp. 178-182 a. 1 plate.TSCHIRNHAUS: Singularia Effecta Vitri Caustici bipedalis quod omnia magno sumtu hactenus constructa specula ustoria virtute superat per D.T. Pp. 517-520 </em> hardcover
169141859Leipzig, Grosse & Gleditsch, 1691. 4to. Contemp. full vellum. Faint handwritten title on spine. a small stamp on titlepage. In: ""Acta Eruditorum Anno MDCLXXXXI"". (8),590,(6) pp. and 13 (of 15) folded engraved plates. The 2 first plates lacks, but they do not belong to the papers listed.Leibniz' papers: pp.277-281 a. 1 plate, pp. 435-439. Johann Bernoulli: pp. 274-276 a. 1 plate. Huygens: pp. 281-282. - Jacob Bernoulli: pp. 282-290 a. 1 plate.
169441704Leipzig Grosse & Gleditsch 1694. 4to. Contemp. full vellum. Faint handwritten title on spine. a small stamp on titlepage. In: "Acta Eruditorum Anno MDCXCIV". 2518 pp. and 11 folded engraved plates. As usual with various browning to leaves and plates. The entire volume offered. Leibniz's papers: pp. 311-316 pp. 364-375. - Johann Bernoulli's papers: pp. 200-206 pp. 394-99 pp. 435-437 pp. 437-441. - Huygen's papers: pp. 338 pp. 339-41. - Jakob Bernoulli's papers: pp. 262-276 pp. 276-280 pp. 336-338 pp. 391-400. Some mispaginations. <br/><br/><em>All papers first appearance dealing with and clarifying the problems and the new applications of Leibniz' inventions of the differential- and integral calculus.In the papers Leibniz shows how to reduce linear first order ordinary differential equations to quadratures. I the other paper he gives a general method of finding the envelope of a family of curves which helped to spread the theory of plane curves.In the groundbreaking paper offered here Jakob Bernoulli introduces THE LEMNISCATE a symmetric self-intersecting curve resembling a figure eight and defined by the condition that the product of the distance of anay point on the curve from two fixed points is d/22 where d is the distance between the fixed points."Jacob Bernoulli was fascinated by curves and the calculus and one curve bears his name - the "lemniscate of Bernoulli" given by the polar equation r2=a cos 2"0". The curve was described in the Acta Eruditorum of 1694 as resembling a figure eight or a knotted ribbon lemniscus. However the curve that most caught his fancy was the logarithmic spiral.he swowed that it had several strioking properties not noted before.it is easy to appreciate the feeling that led Bernoulli to request that the "spira mirabils" be engraved on his tombstone together with the inscription "Eadem mutata resurgo" Though changed I arise again the same." Boyer in his History of Mathematics. </em> hardcover
169441704Leipzig, Grosse & Gleditsch, 1694. 4to. Contemp. full vellum. Faint handwritten title on spine. a small stamp on titlepage. In: ""Acta Eruditorum Anno MDCXCIV"". (2),518 pp.. and 11 folded engraved plates. As usual with various browning to leaves and plates. The entire volume offered. Leibniz's papers: pp. 311-316, pp. 364-375. - Johann Bernoulli's papers: pp. 200-206, pp. 394-99, pp. 435-437, pp. 437-441. - Huygen's papers: pp. 338, pp. 339-41. - Jakob Bernoulli's papers: pp. 262-276, pp. 276-280, pp. 336-338, pp. 391-400. Some mispaginations.
1983__311277650XDe Gruyter 1983. Hardcover. New. 3rd edition. 795 pages. German language. 8.50x1.69x11.00 inches. De Gruyter hardcover
49564888-nnew. unknown
49564888like new. unknown
2008__3050045787Akademie-Verlag 2008. Hardcover. New. 703 pages. Latin language. 10.00x7.87x1.97 inches. Akademie-Verlag hardcover
1990__3112747186De Gruyter 1990. Hardcover. New. 2nd edition. 709 pages. German language. 8.46x1.73x11.26 inches. De Gruyter hardcover
49989777like new. unknown
49989777-nnew. unknown
2022x-3110772930De Gruyter Akademie Forschung 2022. Hardcover. New. 1047 pages. German language. 9.75x8.00x2.75 inches. De Gruyter Akademie Forschung hardcover
3563757763.Ghardcover. Good. Access codes and supplements are not guaranteed with used items. May be an ex-library book. hardcover
201312872(Stuttgart), Franz Steiner, (2013). Gr.-8vo. 476 S., 1 Bl. Illustr. OPp.