MATH 211 Mathematician Of The Day 10/2 Johann Hudde (16281704). Discovered Hudde's Rule, which essentially gives formula for the derivative of a polynomial. http://tmsyn.wc.ask.com/r?t=an&s=hb&uid=24312681243126812&sid=343126
Hudde, Johann Van Waveren O matem tico holand s Hudde aprendeu matem tica em Leiden e estudou m todos para encontrar o m ximo e o m nimo. http://tmsyn.wc.ask.com/r?t=an&s=hb&uid=24312681243126812&sid=343126
Poster Of Hudde Johann Hudde worked on maxima and minima and the theory of equations. He gave aningenious method to find multiple roots of an equation. Find out more at http://www-groups.dcs.st-and.ac.uk/~history/Posters2/Hudde.html
Extractions: Over US$160,000 has been donated since the drive began on 19 August. Thank you for your generosity! Johann van Waveren Hudde April 23 April 15 ) was a mathematician He was born and died in Amsterdam Netherlands edit This biographical article about a mathematician is a stub . You can help Wikipedia by expanding it Retrieved from " http://en.wikipedia.org/wiki/Johann_van_Waveren_Hudde Categories Mathematician stubs Dutch mathematicians ... 1704 deaths Views Personal tools Navigation Search Toolbox What links here Related changes Upload file Special pages ... Permanent link This page was last modified 20:22, 16 April 2005. All text is available under the terms of the GNU Free Documentation License (see for details).
Johann Hudde - Definition Of Johann Hudde In Encyclopedia Johann van Waveren Hudde (April 23, 1628 April 15, 1704) was a mathematician. He was born and died in Amsterdam, Netherlands.External link"Johann http://tmsyn.wc.ask.com/r?t=an&s=hb&uid=24312681243126812&sid=343126
[HM] Johann Hudde 2 Sep 2004 HM Johann Hudde, by Romulo Lins 3 Sep 2004 Re HM Johann Hudde, by Siegmund Probst 3 Sep 2004 http://tmsyn.wc.ask.com/r?t=an&s=hb&uid=24312681243126812&sid=343126
Johann Waveren Hudde Johann van Waveren Hudde (1629 1704) Pol tico estrategista, importante matem tico e not vel pesquisador holand s nascido em Amsterd , que http://tmsyn.wc.ask.com/r?t=an&s=hb&uid=24312681243126812&sid=343126
Historia Matematica Mailing List Archive: Re: [HM] Hudde Johann van Waveren Hudde. Born 23 April 1628 in Amsterdam, Netherlands Johann Hudde attended the University of Leiden to study law. However he http://sunsite.utk.edu/math_archives/.http/hypermail/historia/mar00/0155.html
Extractions: Sommaire Chapitre 1 px q Chapitre 2 =1 et z =Z Chapitre 3 px q Chapitre 4 px q Chapitre 5 px q Chapitre 6 Chapitre 7 Annexe 1 Chapitre 1 +px+q=0 (-p/3);2 (-p/3)[ 3q/p (simple) et -3q/(2p) (double) Remarques : -3q/2p=(q/2) x +px+q=(x-3q/p)(x+3q/(2p)) a (-p/3);[ (-p/3);+ =X x ou x Preuve : Posons f(x)=x et + f'(x)=3x +p cas 1 : si p cas 2 f' s'annule pour s= f(s)f(-s)=q s Il y a donc un maximum relatif en -s et un minimum relatif en s : x -s s f'(x) f f(-s) f(s) cas 2.1 f(2s)=8s +2ps+q=8(-p/3)s+2ps+q=(-2p/3)s+q=f(-s) et f(-2s)=(2p/3)s+q=f(s). cas 2.2 mais f(s)=2ps/3+q=0 donc s=-3q/(2p) ; or s= comme f(-s)=-2ps/3+q=0 on a cette fois s=3q/(2p) donc -s=-3q/(2p) ; or s= =0, x +px+q=(x-3q/p)(x+3q/(2p)) Notons aussi que -3q/2p=(q/2) cas 2.3 et donc on a toujours a Conclusion : si 4p si 4p si 4p Chapitre 2 z =1 et z =Z (non nul) Equation Ensemble solution z z =Z ; jz ; j z
Hudde Biography of johann hudde (16281704) johann hudde attended the Universityof Leiden to study law. However he was introduced to mathematics at Leiden by http://www-groups.dcs.st-and.ac.uk/~history/Mathematicians/Hudde.html
Extractions: Version for printing Johann Hudde attended the University of Leiden to study law. However he was introduced to mathematics at Leiden by his teacher van Schooten . From 1654 until 1663 he worked on mathematics as part of van Schooten geometry research group at Leiden. From 1663 he worked in various roles for the Amsterdam City Council. He served for 30 years as burgomaster of Amsterdam being first appointed in 1672. All of Hudde's mathematics was done before he began to work for the city council in 1663. Van Schooten edited and published a second two-volume translation of Descartes 's (1659-1661) which contained appendices by de Witt , Hudde and van Heuraet Hudde worked on maxima and minima and the theory of equations. Hudde gave an ingenious method to find multiple roots of an equation which is essentially the modern method of finding the highest common factor of a polynomial and its derivative. He was the first to treat the coefficients in algebra without considering whether they were positive or negative in De reductione aequationum.
Math Forum Discussions Topic HM johann hudde Replies 5 Last Post Sep 6, 2004 730 AM a colleagueof mine is interested in the work of johann hudde, on http://mathforum.org/kb/thread.jspa?threadID=384489&tstart=135
Math Forum Discussions - Historia-Matematica 6, Read, HM johann hudde Romulo Lins. 9/5/04. 1, Read, HM Pascal,Cavalieri Dean Buckner. 9/4/04. 2, Read, HM Pascal, Cavalieri Dean Buckner http://mathforum.org/kb/forum.jspa?forumID=149&start=135
History Of Astronomy: Persons (H) hudde, johann Jan van Waveren (16281704). Biographical data and references Short biography and references (MacTutor Hist. Math.) http://www.astro.uni-bonn.de/~pbrosche/persons/pers_h.html
Extractions: Hadley, John (1682-1744) Hagen, Johann Georg (1847-1930) Haiyan: see Ibn Haiyan, Jabir (?-803) Hakluyt, Richard (1552(?)-1616) Hale, George Ellery Hall, Asaph (1829-1907) Haller von Hallerstein, Augustin (1703-1774) Halley, Edmond Halma, Nicholas (1755-1828) Hamilton, Laurentine (1826-1882) Hamilton, William Rowan (1805-1865) Short biography and references (MacTutor Hist. Math.)
