Product Type
Condition
Binding
Collectible Attributes
Free Shipping
Seller Location
Seller Rating
Published by University of Michigan Library, 2006
ISBN 10: 1418186198ISBN 13: 9781418186197
Seller: Lucky's Textbooks, Dallas, TX, U.S.A.
Book
Condition: New.
More buying choices from other sellers on AbeBooks
New offers from £ 34.59
Publication Date: 2023
Seller: True World of Books, Delhi, India
Book Print on Demand
LeatherBound. Condition: New. LeatherBound edition. Condition: New. Reprinted from 1896 edition. Leather Binding on Spine and Corners with Golden leaf printing on spine. Bound in genuine leather with Satin ribbon page markers and Spine with raised gilt bands. A perfect gift for your loved ones. NO changes have been made to the original text. This is NOT a retyped or an ocr'd reprint. Illustrations, Index, if any, are included in black and white. Each page is checked manually before printing. As this print on demand book is reprinted from a very old book, there could be some missing or flawed pages, but we always try to make the book as complete as possible. Fold-outs, if any, are not part of the book. If the original book was published in multiple volumes then this reprint is of only one volume, not the whole set. Sewing binding for longer life, where the book block is actually sewn (smythe sewn/section sewn) with thread before binding which results in a more durable type of binding. Pages: 716 Language: French.
Published by Legare Street Press, 2022
ISBN 10: 1019148179ISBN 13: 9781019148174
Seller: ALLBOOKS1, Salisbury Plain, SA, Australia
Book
Published by Legare Street Press, 2022
ISBN 10: 1019143703ISBN 13: 9781019143704
Seller: ALLBOOKS1, Salisbury Plain, SA, Australia
Book
2. Paris, Librairie Scientifique et Technique Albert Blanchard., 1973, in-8°, xxiv + 667 pp. Original softcover; Livre en français.
Published by Burt Franklin, NY 1969, 1969
Seller: Wonderland Books, Berkeley, CA, U.S.A.
reprint of the 1896 book ed. hardback very good condition - no dust jacket.
Published by Félix Alcan, Paris, 1896
Seller: Pietro Panizzi Libraio, Giulianova, Italy
In 8°; piena canapa post.; pp. XXIV-667-(1); alcune figure n.t.; edizione originale. Lievi e sporadiche fioriture marginali, in buon esemplare.
Nouveau tirage. Albert Blanchard, Paris,1973, fort vol. in-8, br, XXIV - 667 p, errata, qqs. fig I.T. Bel ex. en partie non coupé.
Published by Burt Franklin, 1969
Seller: Librairie de l'Avenue - Henri Veyrier, Saint-Ouen, FR, France
Couverture rigide. Condition: Très bon état. In-8 reliure éditeur pleine toile bordeaux. Titre et auteur dorés au dos. XVI + 668 pages. Très bon état d'occasion. Réimpression de l'édition de Paris, 1896. Notes, explication des signes, index bibliographique, appendice bibliographique, liste alphabétique des auteurs cités, table des figures, table des matières in-8°.
Burt Franklin, New York, 1969 (réimpression de l'édition de Paris, 1896), fort vol., gr. in-8, rel. éd., XXIV - 668 p. Très bel ex.
Published by Felix Alcan, Paris, 1896
Seller: Invito alla Lettura, Vetralla, VT, Italy
rilegato. Condition: Mediocre (Poor). 0. In 8, leg. m. pergamena, titolo al dorso, pp. 667. Strappi alla testa del dorso, piatti un po' lenti, timbro illeggibile a pag. 1, rari segni a matita. Discrete condizioni. Available to export SUE 18148 Luogo di pubblicazione ParisEditore Felix AlcanAnno pubblicazione 1896Materia/Argomento Matematica. Book.
Hardcover. Condition: Very Good. First Edition. [Infinity - Number Theory] 2 volumes Bound in contemporary leather-backed speckled boards. Original wraps bound in. XXIV, 667 p. Figures in text. These pour le Doctorat presentee a la Faculte des lettres de Paris par Louis Couturat. Couturat was a French mathematician who "sought a universal language and symbolic-logic system to study the history of philosopjy and philosophy of mathematics." - Britannica. In this work, "On Mathematical Infinity" he argued for the actual infinite. "For him the actual infinite was a generalisation of number, in the same way that negative numbers, fractions, irrational numbers and complex numbers had all been seen at extending the concept of number. Couturat argued that all of these generalisations had at first encountered strong opposition, but had become accepted in the end because they were suitable for representing new magnitudes and they allowed a calculus of operations which was impossible before their introduction. Infinite numbers, he claimed, were necessary in order to maintain the continuity of magnitudes." - J J O'Connor and E F Robertson, St. Andrews, Dept of Mathematics.