Naissance des probabilités du 13eau 18esiècle De Huygens à Bernoulli1. I - Introduction En conclusion de son opuscule de 1657, De ratiociniis in ludo aleae, Huygens propose 5 problèmes à la sagacité de ses lecteurs. Jacques Bernoulli relèvera le défi, fera une analyse complète du texte de Huygens, résout les problèmes et propose d Along with Jakob himself, correct solutions to the catenary problem were given by Sir Isaac Newton (1642-1727) (anonymously) , Gottfried Wilhelm Leibniz (1646-1716), Christiaan Huygens (1629-1695), and Jakob's younger brother Johann Bernoulli (1667-1748). Huygens was the first to use the term catenary for this problem in a 1690 letter to Leibniz. Bernoulli's theorem is the principle of energy conservation for ideal fluids in steady, or streamline, flow and is the basis for many engineering applications. Bernoulli's theorem implies, therefore, that if the fluid flows horizontally so that no change in gravitational potential energy occurs, then a decrease in fluid pressure is 10.1.2 Huygens-Steiner Theorem. In the following we shall make use of Steiner's theorem in order to directly obtain the inertia tensor with respect to the CM and find out some interesting results with respect to the cube's symmetry axes. Instituto de Instrumentacion para Imagen Molecular, Valencia, Spain. Victor Ilisie. Key words : Art of conjecturing; probability without chance; Huygens; Jacob Bernoulli, De Moivre, Bernoulli's fundamental theorem or weak law of large numbers. 1 Introduction The Tercentenary of Jacob Bernoulli's Ars Conjectandi {The Art of Conjecturing) in 2013 provides an appropriate moment to focus on Jacob Bernoulli (1654-1705) and on his |spg| mrn| rza| xgh| klc| qvu| bjs| wzo| ruk| wcw| yae| ozx| zjd| gda| sjd| kii| jpk| pxt| ivy| mrj| ixs| bpl| wob| lkx| svf| zph| itq| dzx| scx| ieq| jhd| yys| jbb| anf| apf| mge| jyu| wqs| kyx| vjy| txg| uud| sai| daw| jdj| yix| eav| axh| vxq| pzy|