Azuoliukas Boys Choir Distribution STUDIO SM 3, rue nicolas chuquet 75017 PARIS. DistributionSTUDIO SM 3, rue nicolas chuquet 75017 PARIS. Maurice Duruflè. http://www.boychoirs.org/azuoliukas/azuoliukas1.html
Extractions: RECORDINGS The Choir's repertoire consists of contemporary and classical secular and religious music. Compositions performed with orchestra accompaniment constitute a significant part of the choir's repertoire. The following pieces are performed: Requiem by Mozart Requiem, Mass Cum Jubilo by Duruflè Requiem by Cherubini The War Requiem by Britten Dido and Aeneas by Purcell Judas Maccabeaus, Belsazar by Händel Gloria, Stabat Mater by Poulenc Die Jahreszeiten by Haydn Alexander Nevsky by Prokofiev Spring by Rachmaninov Cantatas #21, 106, 140, 150, 196, Magnificat by Bach Symphonies #2, 3, 8 by Mahler The Music Makers by Elgar Magnificat by Rutter Stabat Mater by Pergolesi Tosca by Puccini La domnation de Faust by Berlioz Execution of Stepan Razin by Shostakovich Don't touch a Blue Globe by Balsys The choir has given numerous performances on radio and television as well as recorded about 30 LPs and 5 CDs. A lot of its performance's where given together with the Lithuanian Chamber orchestra (S.Sondeckis), Lithuanian National Symphony Orchestra (J.Domarkas) and Lithuanian State Symphony Orchestra (G.Rinkevicius), as well as with orchestras from other countries, such as Moscow Radio, Israel Philharmonic, Warsaw Radio, St.Petersburg Philharmonic Symphony Orchestras, conducted by V.Fedoseyev, N.Sheriff, G.Bertini, V.Ponkin. The choir's most talented singers continue their studies at the Academy of Music and become professional musicians.
Full Alphabetical Index Translate this page Grace (583*) Chowla, Sarvadaman (819*) Christoffel, Elwin (1580*) Chrysippus (831)Chrystal, George (2763*) Chu Shih-Chieh (80) chuquet, nicolas (299) Church http://www.maththinking.com/boat/mathematicians.html
History Of Mathematics: Europe Regiomontanus) (14361476); Luca Pacioli (c. 1445-c. 1514); nicolas chuquet(c. 1445-c. 1500); Leonardo da Vinci (1452-1519); Johann Widman http://aleph0.clarku.edu/~djoyce/mathhist/europe.html
Extractions: See Greece for mathematicians writing in Greek, and see the general chronology for European mathematicians after 1500. Marcus Terentius Varro (116-27 B.C.E.) Balbus (fl. c. 100 C.E.) Anicius Maulius Severinus Boethius (c. 480-524) Flavius Magnus Aurelius Cassiodorus (c. 490-c. 585) Bede (673-735) Alcuin of York (c. 735-804) Gerbert d'Aurillac, Pope Sylvester II (c. 945-1003) Adelard of Bath (1075-1164) John of Seville (c. 1125) Plato of Tivoli (c. 1125) Girard of Cremona (1114-1187) Robert of Chester (c. 1150) Robert Grosseteste (c. 1168-1253) Leonardo of Pisa (Fibonacci) (1170-1240) Alexandre de Villedieu (c. 1225)
Names For Large Numbers The French physician and mathematician nicolas chuquet (14451488) apparently coinedthe words byllion and tryllion and used them to represent 10 12 and 10 18 http://www.unc.edu/~rowlett/units/large.html
Extractions: Using the Dictionary Names for Large Numbers The English names for large numbers are coined from the Latin names for small numbers n by adding the ending -illion suggested by the name "million." Thus billion and trillion are coined from the Latin prefixes bi- n = 2) and tri- n = 3), respectively. In the American system for naming large numbers, the name coined from the Latin number n applies to the number 10 n . In a system traditional in many European countries, the same name applies to the number 10 n In particular, a billion is 10 = 1 000 000 000 in the American system and 10 = 1 000 000 000 000 in the European system. For 10 , Europeans say "thousand million" or "milliard." Although we describe the two systems today as American or European, both systems are actually of French origin. The French physician and mathematician Nicolas Chuquet (1445-1488) apparently coined the words byllion and tryllion and used them to represent 10 and 10 , respectively, thus establishing what we now think of as the "European" system. However, it was also French mathematicians of the 1600's who used
Biography-center - Letter C lriddle/women/chung.htm; chuquet, nicolas wwwhistory.mcs.st-and.ac.uk/~history/Mathematicians/chuquet.html;Church, Alonzo www-history http://www.biography-center.com/c.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 854 biographies Cabana, Robert D.
Histoire Des Maths Pour Le Collège Translate this page racine carrée, Léonard de Pise dit Fibonacci en 1220. 2 racine carrée,nicolas chuquet (Français, 2ème moitié du XVème siècle). http://trucsmaths.free.fr/hist_symbol.htm
Extractions: Symboles de multiplication a x b (croix de St-André pour la multiplication) Oughtred en 1631 a * b (étoile pour la multiplication) Johann Rahn (Allemand, 1622-1676) en 1659 a b (point pour la multiplication) Leibniz (Allemand, 1646-1716) en 1698 ab au lieu de a x b Stifel (1486-1567) en 1544 x n (notation en exposant pour les puissances)
A History Of Hypercomplex Numbers Detailed timeline of the development of hypercomplex numbers, from early discoveries of complex numbers Category Science Math History solution to the quadratic equation. 1484, nicolas chuquet (14451500)writes Triparty en la sciences des nombres. The fourth part of http://history.hyperjeff.net/hypercomplex.html
Extractions: Abraham bar Hiyya Ha-Nasi writes the work Hibbur ha-Meshihah ve-ha-Tishboret , translated in 1145 into Latin as Liber embadorum , which presents the first complete solution to the quadratic equation. Nicolas Chuquet (1445-1500) writes Triparty en la sciences des nombres . The fourth part of which contains the "Regle des premiers," or the rule of the unknown, what we would today call an algebra. He introduced an exponential notation, allowing positive, negative, and zero powers. In solving general equations he showed that some equations lead to imaginary solutions, but dismisses them ("Tel nombre est ineperible"). pre Nicolo Fontana (Tartaglia) finds the general method for solving all types of cubic equations and tells Cardano, under the promise that Cardano tell no one until he publishes first. Cardno tells everyone in 1545. Geronimo Cardano (1501-1576) writes Ars magna on the solutions of cubic and quartic equations. In it, solutions to polynomials which lead to square roots of negative quantities occur, but Cardano calls them "sophistic" and concludes that it is "as subtle as it is useless."
Untitled Translate this page autre côté que les nouveautés de Léonard ne sont reçues que beaucoup plus tarddans les oeuvres des mathématiciens français, nicolas chuquet par exemple http://palissy.humana.univ-nantes.fr/CETE/TXT/boysset/2pch4.htm
Extractions: Chapitre 4 Formules de Bertran Algorisme de Pamiers Compendion de lo abaco Summa de la art de arismetica Algorisme de Pamiers Un deuxième angle d'approche, qui s'éloigne de la langue, qui observe le genre " géométrie pratique " tel qu'il se développe au Moyen Âge et qui essaie de réintégrer l'oeuvre de l'arlésien dans ce mouvement prolifique parait devoir être plus prometteur. practica geometriae , au picard pratike de geometrie et au toscan geometria pratica pratique pratique pratique si l'on se situe en dehors de lui. Cette traduction de practica Quoi de commun en effet entre la Practica geometriae de Fibonacci et les Regole di geometria pratica Liber abaci pratique captatio benevolentiae mensor geumetrie et le mensor laicus qui lui s'occupe réellement de mesurer sans chercher de démonstration à ce qu'il avance. Après avoir douté de l'existence d'un rapport entre la circonférence et le diamètre du cercle, Dominicus nous dit : " Je n'ai pas l'intention de parler de façon démonstrative mais seulement d'enseigner à en trouver la surface [du cercle] de telle sorte qu'il ne reste pas d'erreur perceptible . " , il serait peu utile d'essayer de chercher des points communs entre Fibonacci, Nicolas Chuquet, Jean Fusoris et Bertrand Boysset.
Extractions: au XVIe siècle NB: L'affectation de ces scientifiques à telle ou telle catégorie est un peu arbitraire. Par exemple, les mathématiciens purs n'existaient pas, ils étaient en général architectes ou médecins. Par ailleurs, les astrologues étaient aussi souvent médecins ou astronomes. Astronomie Tycho B rahé Nicolas ... Giordano Bruno (cosmologie) Mathématiques En mathématique, le XVIe siècle a vu de grands progrès dans la trigonométrie et l'algèbre avec en particulier la résolution des équations du troisième degré, l'emploi des nombres négatifs puis des nombres complexes, et des logarithmes. Ces nouveaux outils connurent un succès rapide en raison de leurs applications dans le commerce, l'astronomie et les sciences de l'ingénieur. Les notations se simplifièrent. Les chiffres arabes (qui étaient en fait d'origine indienne) étaient déjà apparus progressivement entre les X-XIIIe siècles. Les symboles +, - et remplacèrent progressivement les lettres p, m et r (pour radicus Sciences et Techniques de l'Ingénieur, Architecture, Machines de guerre
Earliest Uses Of Grouping Symbols Vinculum below. The first use of the vinculum was in 1484 by nicolas chuquet(1445?1500?) in his Le Triparty en la Science des Nombres. http://members.aol.com/jeff570/grouping.html
Extractions: Earliest Uses of Grouping Symbols Last revision: June 24, 1999 Vinculum below. The first use of the vinculum was in 1484 by Nicolas Chuquet (1445?-1500?) in his Le Triparty en la Science des Nombres. The bar was placed under the parts affected (Cajori vol. 1, pages 101 and 385). Chuquet wrote: The above expression in modern notation is . This use of a vinculum appears to be the earliest use of a grouping symbol of any kind mentioned by Cajori. Vinculum above. According to Cajori, the first use of the vinculum above the parts affected was by Frans van Schooten (c. 1615-1660), who "in editing Vieta's collected works, discarded the parentheses and placed a horizontal bar above the parts affected." In Van Schooten's 1646 edition of Vieta, is used to represent B D BD Ball (page 242) says the vinculum was introduced by Francois Vieta (1540-1603) in 1591. This information may be incorrect. Grouping expressed by letters. In the late fifteenth century and in the sixteenth century various writers used letters or words to indicate grouping. The earliest use of such a device mentioned by Cajori (vol. 1, page 385) is the use of the letter v for vniversale by Luca Paciolo (or Pacioli) (c. 1445 - prob. after 1509) in his
ROMALILAR DÖNEMÝ'NDE BÝLÝM - FORSNET ve Onaltinci Yüzyil) Doga ve Bilgi Felsefesi Matematik RaffaelloBombelli Girolamo Cardano nicolas chuquet Lodovice Ferrari http://www.bilimtarihi.gen.tr/yenicag/yenidendogus/matematik.html
Extractions: Eskiçað'da Bilim Yunanlýlar Döneminde Bilim Romalýlar Döneminde Bilim Ortaçað'da Bilim ... Yakýnçað'da Bilim YENÝÇAÐ'DA BÝLÝM Matematik Bu dönem diðer alanlarda olduðu gibi matematik alanýnda da yeniden bir uyanýþýn gerçekleþtiði ve özellikle trigonometri ve cebir alanlarýnda önemli çalýþmalarýn yapýldýðý bir dönemdir. Trigonometri, Regiomontanus , daha sonra da Rhaeticus ve Bartholomaeus Pitiscus `un çabalarýyla ve cebir ise Scipione del Ferro Nicola Tartaglia Geronimo Cardano ve Lodovice Ferrari tarafýndan yeniden hayata döndürülmüþtür. Yapýlan çalýþmalar sonucunda geliþtirilen iþlem simgeleri, þu anda bizim kullandýklarýmýza benzer denklemlerin ortaya çýkmasýna olanak vermiþ ve böylelikle, denklem kuramý biçimlenmeye baþlamýþtýr. Rönesans matematiði özellikle Raffaello Bombelli François Viète ve Simon Stevin ile doruk noktasýna ulaþmýþtýr.
Untitled nicolas chuquet, (c. 1445 c. 1500) French physician. chuquet wrote Triparty en lascience des nombres (1484), a work on algebra and arithmetic in three parts. http://www.math.tamu.edu/~don.allen/history/renaissc/renassc.html
Extractions: April 2, 1997 Algebra in the Renaissance The general cultural movement of the renaissance in Europe had a profound impact also on the mathematics of the time. Italy was especially impacted. The Italian merchants of the time travelled widely throughout the East, bringing goods back in hopes of making a profit. They needed little by way of mathematics. Only the elementary needs of finance were required. After the crusades, the commercial revolution changed this system. New technologies in ship building and saftey on the seas allows the single merchant to become a shipping magnate. These sedentary merchants could remain at home and hire others to make the journeys. This allowed and required them to make deals, and finance capital, arrange letters of credit, create bills of exchange, and make interest calculations. Double-entry bookkeeping began as a way of tracking the continuous flow of goods and money. The economy of barter was slowly replaced by the economy of money we have today. Needing more mathematics, they inspired the emergence of a new class of mathematician called
Palais Beaumont Organisation De Spectacles Translate this page Laurent Bretéché Régisseur Audio Vidéo. nicolas chuquet RégisseurAudio Vidéo. Ramon Alonso Responsable sécurité et aménagement. http://www.paucc.com/pdc_public/fr/presentation/equipe/equipe.htm
Matematiikan Historia; Muun Maailman Matemaatikot Translate this page Jordanus Nemorarius, Nicole Oresme Richard Suiseth (Calculator), Al-Kashi JohannesMüller (Regiomontanus) Adam Riese Luca Pacioli nicolas chuquet Johann Widman http://solmu.math.helsinki.fi/2000/mathist/muumaa.html
Extractions: Narratiuncola de fundatione monasterii Vitaescholae in Cimbria vol. 8(19980128 Narratiuncola de Roberto I comite Flandrensi vol. VIII, 128 Narrative of the expulsion of the English from Normandy vol. VIII, 128 Narrative of the marriage of Richard duke of York with Ann of Norfolk vol. VIII, 129 Narrative of the proceedings against dame Alice Kyteler, prosecuted for sorcery in 1324 by Richard de Ledrede, bishop of Ossory in Ireland vol. VIII, 129 Narratives of the arrival of Louis de Bruges, seigneur de la Gruthuyse, in England, and of his creation as Earl of Winchester in 1472 v. Naso v. Naso, Giovanni vol. VIII, 129 Nassi David ben Hodaya de Bagdad vol. VIII, 129 N'At de Mons vol. VIII, 130 Natales aliquot sanctorum ex fastis consularibus excerpti v.
The Radical Symbol The French writer nicolas chuquet (1484) sometimes used R x 2 forR x , R x 3 and R x 4 for cube and fourth roots, respectively. http://www.und.edu/instruct/lgeller/radical.html
Extractions: Before symbols, the words "roots" or "side" were commonly used for the square root of a number. Arab writers thought of a square number as growing out of a root, so Arabs often used the word radix , "extracting," or pulling out, the root. Latin writers thought of it as "finding" the latus, or side of a square. Late medieval Latin writers turned radix into a single symbol R x . This was used for more than one hundred years. The French writer Nicolas Chuquet (1484) sometimes used R x for R x , R x and R x for cube and fourth roots, respectively. The symbol was introduced by Christoff Rudolff in 1525 in his book Die Coss . It is believed this symbol was used because it resembled a small r radix ) at the time. The cube and fourth roots were as shown below: Cube Root Fourth Root Rudolff's symbol was not immediately used. The letter l (latus, "side") was often used. For example the square root of 4 was l 4 and the third root of 5 was lc 5. By the seventeenth century, the square root symbol was being used regularly even though there were many ways the indices were written for higher roots.
Proloc Paris Paris City Guide , Road Index (N) Translate this page 12eme-M20 nicolas CHARLET (RUE)15eme-P11 nicolasCHUQUET (RUE)17eme-D9 nicolas FLAMEL (RUE http://www.geocities.com/~proloc2/streetind/A75000/VOIE3N.html
Mathématiques Bac Première L Besançon Translate this page Une activité à réaliser sur tableur Ce problème est dû à NicolasChuquet (Paris 1445 - Lyon 1500). Médecin à Lyon, il écrit http://artic.ac-besancon.fr/mathematiques/reflycee/chuquet.htm
