Dunod. 1916. In-8. Relié. Bon état, Couv. convenable, Dos satisfaisant, Intérieur bon état. 376 pages. Illustré de nombreuses figures géométriques en noir et blanc dans le texte.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Lesnombres entiers. Les figures dans le plan... Classification Dewey : 372.7-Livre scolaire : mathématiques
Librairie Vuibert. 1924. In-8. Broché. Bon état, Couv. convenable, Dos satisfaisant, Intérieur frais. 22 pages.. . . . Classification Dewey : 510-Mathématiques
Classification Dewey : 510-Mathématiques
Librairie Vuibert Broché 1934 In-8 (14,3 x 22,7 cm), broché, 50 pages ; réparation au ruban adhésif au dos, papier bruni, en l'état. Livraison a domicile (La Poste) ou en Mondial Relay sur simple demande.
P., L'Auteur, sans date (vers 1880), , in 8° broché, XII pages et 334 pages de tableaux ; couvetrure muette effrangée, dos cassé.
PHOTOS sur DEMANDE. ...................... Photos sur demande ..........................
Phone number : 04 77 32 63 69
Gauthier-Villars , Mémorial des Sciences Mathématiques Malicorne sur Sarthe, 72, Pays de la Loire, France 1954 Book condition, Etat : Bon broché, sous couverture imprimée éditeur rose grand In-8 1 vol. - 93 pages
1ere édition papier à peine jauni sans gravité, sinon tres bon état
NON EDITE. 1962. In-4. Broché. Bon état, Couv. convenable, Dos satisfaisant, Intérieur frais. 117 pages dactylographiées.. . . . Classification Dewey : 510-Mathématiques
Présentées à la faculté des sciences de l'université de Paris pour obtenir le grade de docteur es sciences mathématiques. Président MM. R. Fortet, Examinateurs J. Ville, J. Neveu. Classification Dewey : 510-Mathématiques
Delagrave. 1930. In-12. Cartonné. Etat d'usage, Couv. défraîchie, Coiffe en pied abîmée, Papier jauni. XI + 158 pages - nombreuses figures en noir et blanc dans le texte - coins frottés - plats jaunis avec des mouillures - 1er plat frotté - tâche rose sur le 2ème plat.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
Leipzig & Berlin, Teubner, 1914, un volume in 8, broché, 150pp.
---- EDITION ORIGINALE**5076/L7AR
CRDP - LANGUEDOC-ROUSSILLON. 1997. In-8. Broché. Bon état, Couv. convenable, Dos satisfaisant, Intérieur frais. 140 pages - Nomnreuses annotations au crayon a papier et quelques soulignements dnas le texte.. . . . Classification Dewey : 510-Mathématiques
Classification Dewey : 510-Mathématiques
CENTRE DE DOCUMENTATION UNIVERSITAIRE. 1940. In-8. Broché. Etat d'usage, Couv. convenable, Dos satisfaisant, Intérieur acceptable. 74 pages de texte dactylographié. Quelques figures dans le texte.. . . . Classification Dewey : 510-Mathématiques
Classification Dewey : 510-Mathématiques
Centre de Documentation Universitaire. 1940. In-4. Broché. Etat d'usage, Couv. partiel. décollorée, Dos abîmé, Papier jauni. 34 pages.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
NATHAN. 1990. In-8. Broché. Etat d'usage, Couv. convenable, Dos satisfaisant, Intérieur frais. 127 pages.. . . . Classification Dewey : 510-Mathématiques
Classification Dewey : 510-Mathématiques
Nathan. 1996. In-8. Broché. Bon état, Coins frottés, Dos satisfaisant, Intérieur frais. 447 pages. Figures en noir.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
"Collection ""étapes références"". Classification Dewey : 372.7-Livre scolaire : mathématiques"
ELLIPSES. 2001. In-4. Broché. Bon état, Couv. convenable, Dos satisfaisant, Intérieur frais. 287 pages illustrées de nombreuses figures dans le texte.. . . . Classification Dewey : 510-Mathématiques
Classification Dewey : 510-Mathématiques
Gauthier-Villars. 1905. In-4. Relié. Très bon état, Couv. convenable, Dos satisfaisant, Intérieur frais. LXXIX pages + 45 pages + 7 cartes d'occultations cartonnées avec serpente.. . . . Classification Dewey : 510-Mathématiques
Etiquette sur coiffe en pied. Tampon bibliothèque. 2 photos disponibles. Classification Dewey : 510-Mathématiques
"TSCHIRNHAUS, EHRENFRIED W. V. [FIRST PUBLICATION OF THE ""TSCHIRNHAUS TRANSFORMATION"".]
Reference : 46399
(1683)
Leipzig, Grosse & Gleditsch, 1683. 4to. Contemporary full vellum. Handwritten title on spine. Library label to pasted down front free end-paper and a small stamps on titlepage. In: ""Acta Eruditorum Anno MDCLXXXIII"". As usual with various browning to leaves and plates. Tschirnhaus' paper: pp. 122-124" Pp. 204-207" Pp. 433-437. [Entire volume: (8), 561, (7) pp + 13 plates].
First appearance of Tschirnhaus's three exceedingly important papers which were to to initiate one of the most famous mathematical discoveries. In the papers he used infinitisimal methods which were very close to Leibniz's method and where he tried to lay down criteria for rational quadratures in the case of conic, cubic and quadratic curves, papers that led Leibniz to publish his first paper on the differential calculus, the ""Nova Methoda"" in the Acta for 1684 in order to secure his priority over Tschirnhaus concerning the calculus. Leibniz discovered, when he read Tschirnhaus' papers, that Tschirnhaus had here published results showing similarity with Leibniz's invention of the calculus as he had confided to Tschirnhaus earlier, during their Parisian stay, and this without references to Leibniz.The present volume of Acta also contain the first edition of Tschirnhaus' ""Tschirnhaus Tranformation"". Tschirnhaus work intensively on finding a general method for solving equations of higher of higher degree. ""His transformations constituted the most promising contribution to the solution of equations during the seventeenth century" but his elimination of the second and third coefficients by means of such transformation was far from adequate for the solution of the quintic.(Boyer. A History of Mathematics, 1968, 472 p.).Tschirnhaus (1651-1708) , a Saxon nobleman, had as wide interest as acquaintances: He studied in Leyden, served in the Dutch army, visited England and Paris several times. He set up a glassworks in Italy and is said to have introduced Porcelain to Europe. He wrote about philosophy and mathematics and was a close friend of Leibniz.
"(TSCHIRNHAUS, EHRENFRIED W. von.). - THE ""TSCHIRNHAUS TRANSFORMATION""
Reference : 45600
(1683)
Leipzig, Grosse & Gleditsch, 1683. 4to. Without wrappers. In: ""Acta Eruditorum Anno MDCLXXXIII"", No. V (May issue). Pp.177-224 (entire issue offered). Tschirnhaus' paper: pp. 204-207. Some browning as usual. With titlepage to the volume 1683. Titlepage with a stamp and a faint dampstain.
First edition of Tschirnhaus' ""Tschirnhaus Tranformation"".Tschirnhaus work intensively on finding a general method for solving equations of higher of higher degree. ""His transformations constituted the most promising contribution to the solution of equations during the seventeenth century"" but his elimination of the second and third coefficients by means of such transformation was far from adequate for the solution of the quintic.(Boyer. A History of Mathematics, 1968, 472 p.).Tschirnhaus (1651-1708) , a Saxon nobleman, had as wide interest as acquaintances: He studied in Leyden, served in the Dutch army, visited England and Paris several times. He set up a glassworks in Italy and is said to have introduced Porcelain to Europe. He wrote about philosophy and mathematics and was a close friend of Leibniz.""In mathematics, a Tschirnhaus transformation, also known as Tschirnhausen transformation, is a type of mapping on polynomials developed by Ehrenfried Walther von Tschirnhaus in 1683. It may be defined conveniently by means of field theory, as the transformation on minimal polynomials implied by a different choice of primitive element. This is the most general transformation of an irreducible polynomial that takes a root to some rational function applied to that root.""(Wikipedia).Parkinson ""Breakthroughs 1683 M.
Leipzig, Berlin, B.G. Teubner, 1925. Orig. hcloth. VI,153 pp.
[Various places and printer] ,1945 - 1974. Collection of 24 offprint from various academic journals. All with wrappers (or as issued) and in fine condition. Contained in a black kassett.
A large collection of offprint by American physicist John Tukey known for development of the FFT algorithm and box plot. Tukey's range test, the Tukey lambda distribution, Tukey's test of additivity and Tukey's lemma all bear his name.""John Tukey's whole life was one of public service, and as the preceding quotes make clear, he had profound influence. He was a member of the President's Scientific Advisory Committee for each of Presidents Eisenhower, Kennedy, and Johnson. He was special in many ways. He merged the scientific, governmental, technological, and industrial worlds more seamlessly than, perhaps, anyone else in the 1900s. His scientific knowledge, creativity, experience, calculating skills, and energy were prodigious. He was renowned for creating statistical concepts and words. JWT's graduate work was in mathematics, but driven by World War II, he left that field to go on to revolutionize the world of the analysis of data. At the end of the war he began a joint industrial-academic career at Bell Telephone Laboratories and at Princeton University. Science and the analysis of data were ubiquitous. This split career continued until he retired in 1985. Even after retirement his technical and scientific work continued at a very high level.He is said to have introduced the terms: ""bit"", ""linear programming"", ""ANOVA"", ""Colonel Blotto"", and was first into print with ""software"". Of these efforts L. Hogben and M. Cartwright wrote, ""The introduction by Tukey of bits for binary digits has nothing but irresponsible vulgarity to commend it."" Tukey's word ""polykay"" was described as ""linguistic miscegenation"" by Kendall and Stuart because of its combining a Greek prefix with a Latin suffix. JWT did it again later with ""polyspectrum"". (Brillinger, John Wilder Tukey).
Lisboa, R. Almirante Pessinha, 1942. 8vo. In the original grey printed wrappers. Offprint from: ""Portugaliae Mathematica"", Vol 3, 1942. Very fine and clean. Pp. 95-102
Offprint of Tukey's paper on the pathology of convex sets.
Paris, A.Hermann 1892 xvi + 157pp., 25cm., br.orig., qqs.rousseurs (surtout aux tranches et à la couverture), bon état, [Ouvrage traduit de l'allemand, la traduction française est enrichie d'additions faites par l'auteur], W82138
New York - Berlin, Plenum Press - Veb Deutscher Verlag der Wissenschaften 1969, 250x170mm, 355pages, editor's binding. Book in good condition.
Genéve et Paris, 1914. Orig. printed wrappers. 170 pp. Clean and fine.
The original printing.
Seuil. 1999. In-12. Broché. Bon état, Couv. convenable, Dos satisfaisant, Intérieur frais. 174 pages.. . . . Classification Dewey : 510-Mathématiques
Collection Points Sciences n°131 - traduit de l'anglais par Julien Basch et Patrice Blanchard. Classification Dewey : 510-Mathématiques
London, Hodgson & Son, 1945. Royal8vo. In a recent nice green full cloth binding with gilt lettering to spine. Entire volumes 48 of ""Proceedings of the London Mathematical Society. Second Series"". A very nice and clean copy without any institutional stamps. Pp. 180-197. [Entire volume: (4),477 pp.]
First printing of Turing's first published paper devoted to the Riemann-zeta function, the basis for his famous ""Zeta-function Machine"", a foundation for the digital computer.While working on his Ph.D.-thesis, Turing was concerned with a few other subjects as well, one of them seemingly having nothing to do with logic, namely that of analytic number theory. The problem that Turing here took up was that of the famous Riemann Hypothesis, more precisely the aspect of it that concerns the distribution of prime numbers. This is the problem that Hilbert in 1900 listed as one of the most important unsolved problems of mathematics. Turing began investigating the zeros of the Rieman zeta-function and certain of its consequences. The initial work on this was never published, though, but nevertheless he continued his work. ""Turing had ideas for the design of an ""analogue"" machine for calculating the zeros of the Riemann zeta-function, similar to the one used in Liverpool for calculating the tides."" (Herken, The Universal Turing Machine: A Half-Century Survey, p. 110). Having worked on the zeta-function since his Ph.D.-thesis but never having published anything directly on the topic, Turing began working as chief cryptanalyst during the Second World War and thus postponed this important work till after the war. Thus, it was not until 1945 that he was actually able to publish his first work on this most important subject, namely the work that he had presented already in 1939, the groundbreaking ""A Method for the Calculation of the Zeta-Function"", which constitutes his first printed contribution to the subject.""After the publication of his paper ""On computable Numbers,"" Turing had begun investigating the Riemann zeta-function calculation, an aspect of the Riemann hypothesis concerning the distribution of prime numbers... Turing's work on this problem was interrupted by World War II, but in 1950 he resumed his investigations with the aid of the Manchester University Mark I [one of the earliest general purpose digital computers]..."" (Origins of Cyberspace p. 468).Not in Origins of Cyberspace (on this subject only having his 1953-paper - No. 938).