Wantzel Pierre Laurent Wantzel. Born 5 du Commerce. Pierre Wantzel attendedprimary school in Ecouen, near Paris, where the family lived. http://www-gap.dcs.st-and.ac.uk/~history/Mathematicians/Wantzel.html
Extractions: Pierre Wantzel Saint-Venant relates in [4] that ... he showed, with his great memory, a marvellous aptitude for mathematics, a subject about which he read with extreme interest. He soon surpassed even his master, who sent for the young Wantzel, at age nine, when he encountered a difficult surveying problem. Bobillier By 1829, at the remarkably young age of 15, he edited a second edition of Reynaud 's Treatise on arithmetic In ... he threw himself into mathematics, philosophy, history, music, and into controversy, exhibiting everywhere equal superiority of mind. Saint-Venant in [4] says that Wantzel:- ... said merrily to his friends that he would be but a mediocre engineer. He preferred the teaching of mathematics... Wantzel is famed for his work on solving equations by radicals . In 1837 Wantzel published proofs of what are some of the most famous mathematical problems of all time in a paper in Liouville 's Journal on ... the means of ascertaining whether a geometric problem can be solved with ruler and compasses Gauss had stated that the problems of duplicating a cube and trisecting an angle could not be solved with ruler and compasses but he gave no proofs. In this 1837 paper Wantzel was the first to prove these results. Improved proofs were later given by Charles
Pierre Wantzel Pierre Wantzel. post a message on this topic. post a message on a new topic. 12 Mar 1997 Pierre Wantzel, by Samuel S. Kutler. 13 Mar 1997. Re Pierre Wantzel, by Julio Gonzalez Cabillon. 13 Mar 1997 . http://mathforum.com/epigone/math-history-list/yolhermtwy
Untitled Roland US (Hung.born) architect _1898-1970 wantzel, pierre Fr. math.; proved impossibility of trisecting angle using http://world.std.com/obi/Biographical/biog_dict.w
History Of Mathematics: Chronology Of Mathematicians Adriaan Vlacq (Vlaccus) (16001667) *W *W. pierre de Carcavi (c pierre-Alphonse Laurent (1813-1854) *MT. pierre Laurent wantzel (1814-1848 http://aleph0.clarku.edu/~djoyce/mathhist/chronology.html
Extractions: Note: there are also a chronological lists of mathematical works and mathematics for China , and chronological lists of mathematicians for the Arabic sphere Europe Greece India , and Japan 1700 B.C.E. 100 B.C.E. 1 C.E. To return to this table of contents from below, just click on the years that appear in the headers. Footnotes (*MT, *MT, *RB, *W, *SB) are explained below Ahmes (c. 1650 B.C.E.) *MT Baudhayana (c. 700) Thales of Miletus (c. 630-c 550) *MT Apastamba (c. 600) Anaximander of Miletus (c. 610-c. 547) *SB Pythagoras of Samos (c. 570-c. 490) *SB *MT Anaximenes of Miletus (fl. 546) *SB Cleostratus of Tenedos (c. 520) Katyayana (c. 500) Nabu-rimanni (c. 490) Kidinu (c. 480) Anaxagoras of Clazomenae (c. 500-c. 428) *SB *MT Zeno of Elea (c. 490-c. 430) *MT Antiphon of Rhamnos (the Sophist) (c. 480-411) *SB *MT Oenopides of Chios (c. 450?) *SB Leucippus (c. 450) *SB *MT Hippocrates of Chios (fl. c. 440) *SB Meton (c. 430) *SB
Wantzel Biography of pierre wantzel (18141848) pierre wantzel's father served in the army for seven years after the birth of pierre, then became École speciale du Commerce. pierre wantzel attended http://www-groups.dcs.st-and.ac.uk/~history/Mathematicians/Wantzel.html
Extractions: Pierre Wantzel Saint-Venant relates in [4] that ... he showed, with his great memory, a marvellous aptitude for mathematics, a subject about which he read with extreme interest. He soon surpassed even his master, who sent for the young Wantzel, at age nine, when he encountered a difficult surveying problem. Bobillier By 1829, at the remarkably young age of 15, he edited a second edition of Reynaud 's Treatise on arithmetic In ... he threw himself into mathematics, philosophy, history, music, and into controversy, exhibiting everywhere equal superiority of mind. Saint-Venant in [4] says that Wantzel:- ... said merrily to his friends that he would be but a mediocre engineer. He preferred the teaching of mathematics... Wantzel is famed for his work on solving equations by radicals . In 1837 Wantzel published proofs of what are some of the most famous mathematical problems of all time in a paper in Liouville 's Journal on ... the means of ascertaining whether a geometric problem can be solved with ruler and compasses Gauss had stated that the problems of duplicating a cube and trisecting an angle could not be solved with ruler and compasses but he gave no proofs. In this 1837 paper Wantzel was the first to prove these results. Improved proofs were later given by Charles
References For Wantzel References for pierre wantzel. Articles F Cajori, pierre Laurent wantzel,Bull. Amer. Math. Soc. 24 (1) (1917), 339347. A de Lapparent http://www-gap.dcs.st-and.ac.uk/~history/References/Wantzel.html
Pierre-Laurent Wantzel (II) By Julio Gonzalez Cabillon pierreLaurent wantzel (II) by Julio Gonzalez Cabillon. reply to this message. post a message on a new topic. Back to math-history-list Subject pierre-Laurent wantzel (II) Author Julio Gonzalez http://mathforum.com/epigone/math-history-list/mixsporwun
Biography-center - Letter W Mathematicians/Wangerin.html; wantzel, pierre wwwhistory.mcs.st-and.ac.uk/~history/Mathematicians/wantzel.html;Warburg, Otto Heinrich http://www.biography-center.com/w.html
Extractions: random biography ! Any language Arabic Bulgarian Catalan Chinese (Simplified) Chinese (Traditional) Croatian Czech Danish Dutch English Estonian Finnish French German Greek Hebrew Hungarian Icelandic Indonesian Italian Japanese Korean Latvian Lithuanian Norwegian Polish Portuguese Romanian Russian Serbian Slovak Slovenian Spanish Swedish Turkish 476 biographies Waals, Johannes Diderik van der
Pierre-Laurent Wantzel (II) By Julio Gonzalez Cabillon pierreLaurent wantzel (II) by Julio Gonzalez Cabillon. Born June 5, 1814,pierre-Laurent wantzel was taught by a mere elementary school teacher. http://mathforum.org/epigone/math-history-list/mixsporwun
The CTK Exchange Forums The place to post math questions and answers http//www.cutthe-knot.org/arithmetic/ antiquity.shtml " pierre Laurant wantzel" should be " pierre Laurent wantzel" http://www.cut-the-knot.org/htdocs/dcforum/DCForumID5/287.shtml
Extractions: Subject Author Message Date ID more typos Vladimir Sep-28-03 TOP RE: more typos Vladimir Oct-03-03 RE: more typos Vladimir Dec-06-03 RE: more typos Vladimir Oct-12-03 RE: more typos Vladimir Oct-13-03 RE: more typos Vladimir Oct-15-03 RE: more typos Vladimir Oct-17-03 RE: more typos Vladimir Nov-19-03 RE: more typos Vladimir Dec-04-03 RE: more typos alexb Dec-04-03
Pierre-Laurent Wantzel (I) By Julio Gonzalez Cabillon pierreLaurent wantzel (I) by Julio Gonzalez Cabillon. reply to thismessage post a message on a new topic Back to math-history-list http://mathforum.org/epigone/math-history-list/touglonquul
Extractions: , de Descartes et de Gauss Théorème de Wantzel Abel Un nombre constructible est donc est constructible ! Conséquence 1 : la duplication du cube est impossible Selon le théorème de wantzel, n'est pas constructible et par suite et la duplication du cube est impossible Q et non constructible. Conséquence 2 : la quadrature du cercle est impossible : quadrature p est transcendant Lindemann p . Il faut donc construire p Quadrature approchée du cercle selon Dinostrate Conséquence 3 : la trisection de l'angle est impossible : trisection de l'angle x : par projection, cos x = OH et la formule : x - 3cos x montre que cos Il est clair que les angles de 180° et 90° sont trisectables; d'ailleurs si x est trisectable, son double (par report) et sa moitié (bisection) le sont aussi Ainsi 45° est trisectable : Q p Or, il est facile de prouver ci-dessous Gauss Noter que les mathématiciens arabes avaient déjà soupçonné l'impossibilité de la trisection géométrique de l'angle en ramenant le problème, comme le fit ultérieurement Al-Biruni : N = b Donc b est pair. Posons b = 2c. Il vient a
Akolad News| Romain 1837, a French mathematician named pierre wantzel proclaimed that it was impossible with those simple tools, disproving wantzel's assertion and exploding centuries of mathematical http://www.akolad.com/news/romain.htm
Extractions: Around 450 B.C., the Greek mathematician, Hippias of Ellis, began searching for a way to trisect an angle. Over 2000 years later, in 1837, a French mathematician named Pierre Wantzel proclaimed that it was impossible to trisect an angle using just a compass and a straightedge, the only tools allowed in geometric construction. But now, at the dawn of the twenty-first century, a Haitian computer program designer, Leon Romain, claims he has proven, with a "missing theorem," that it is possible to trisect an angle with those simple tools, disproving Wantzel's assertion and exploding centuries of mathematical gospel. "This discovery shows us that the notions that every mathematician has held for the past 200 years as absolute certainty are actually false," Romain told Haiti Progres. "The mathematical and even philosophical ramifications are huge."
Mathem_abbrev Wafa alBuzjani Abu l Wallis, John Wang, Hsien Chung wantzel, pierre Weierstrass,Karl Weil, André, Weinstein, Alexander Wheeler, Anna J Pell Whittaker, Edmund http://www.pbcc.cc.fl.us/faculty/domnitcj/mgf1107/mathrep1.htm
Extractions: Mathematician Report Index Below is a list of mathematicians. You may choose from this list or report on a mathematician not listed here. In either case, you must discuss with me the mathematician you have chosen prior to starting your report. No two students may write a report on the same mathematician. I would advise you to go to the library before choosing your topic as there might not be much information on the mathematician you have chosen. Also, you should determine the topic early in the term so that you can "lock-in" your report topic!! The report must include: 1. The name of the mathematician. 2. The years the mathematician was alive. 3. A biography. 4. The mathematician's major contribution(s) to mathematics and an explanation of the importance. 5. A historical perspective during the time the mathematician was alive.
Mathematical Mysteries: Trisecting The Angle the general case remained a mathematical mystery for millennia it was only in 1837that it was eventually proved to be impossible by pierre wantzel, a French http://plus.maths.org/issue7/xfile/
Extractions: Permission is granted to print and copy this page on paper for non-commercial use. For other uses, including electronic redistribution, please contact us. Issue 7 January 1999 Contents Features Unspinning the boomerang Bang up a boomerang! Galloping gyroscopes Time and motion ... The origins of proof Career interview Career interview: Games developer Regulars Plus puzzle Pluschat Mystery mix Letters Staffroom Introducing the MMP Geometer's corner International Mathematics Enrichment Conference News from January 1999 ... poster! January 1999 Regulars Bisecting a given angle using only a pair of compasses and a straight edge is easy. But trisecting it - dividing it into three equal angles - is in most cases impossible. Why? If we have a pair of lines meeting at a point O, and we want to bisect the angle between them, here's how we do it.
8th Grade Rheticus (15141574) *SB *MT *W ·. pierre de la Ramée (Ramus) (1515-1572) *SB *W pierre-Alphonse Laurent (1813-1854) *MT ·. pierre Laurent wantzel (1814-1848) http://mslombardo.freehosting.net/catalog.html
India Talking Hindustan Network Discussion Forums In 1837 the French mathematician pierre wantzel proved the impossibility oftrisecting the angle with straightedge(unmarked) and compass alone . http://hindustan.net/discus/messages/55/12112.html?1083743060
Mathematics Pronunciation Guide Pronunciation guide for mathematical names and terms English bawt ih 'chel ee. pierre Bouguer 16981758 pee air boo gair T. Wang. pierre Laurent wantzel 1814-48 http://www.waukesha.uwc.edu/mat/kkromare/main.html
Extractions: This guide contains most mathematical names and terms encountered in high school and the first two years of college. If you are not using frames go to my homepage at waukesha.uwc.edu/mat/kkromare and click on the "no frames" option for the Guide. This guide contains most mathematical names and terms encountered in high school and the first two years of college. If you are not using frames go to my homepage at waukesha.uwc.edu/mat/kkromare and click on the "no frames" option for the Guide.
Carte ATI Rage 128 Pro GL 16 Mo. 2001 135322 +0000; Sender plw@free.fr. pierre-Laurent wantzel. http://lists.debian.org/debian-user-french/2001/09/msg00172.html
Extractions: Date Prev Date Next Thread Prev Thread Next ... Thread Index Bonjour, Quelle dénomination, lorsqu'on éxécute XF86Setup, version 3.3.6, correspond effectivement à cette carte, apparamment ce n'est pas ATI Rage 128 (Generic). Merci d'avance des renseignements. Pierre-Laurent Wantzel. Re: Carte ATI Rage 128 Pro GL 16 Mo. From: Prev by Date: Re: Creation de .deb Next by Date: Re: Carte ATI Rage 128 Pro GL 16 Mo. Prev by thread: Re: xfs ou jfs Next by thread: Re: Carte ATI Rage 128 Pro GL 16 Mo. Index(es): Date Thread
Bizarrerie Avec Squid. Date Fri, 14 Dec 2001 142833 +0000; pierre-Laurent wantzel. http://lists.debian.org/debian-user-french/2001/debian-user-french-200112/msg008
Extractions: Date Prev Date Next Thread Prev Thread Next ... Thread Index To debian-user-french@lists.debian.org guilde@imag.fr Subject : Bizarrerie avec squid. From plwantzel@free.fr Date : Fri, 14 Dec 2001 14:28:33 +0000 Sender plw@free.fr Prev by Date: RE: Debian sur un Mac ? Next by Date: RE: Debian sur un Mac ? Prev by thread: Paquet lists-archives : problème de version Next by thread: Paquet Samba Index(es): Date Thread