L'ECOLE. 1937. In-12. Cartonné. Bon état, Couv. légèrement passée, Dos satisfaisant, Intérieur frais. 254 pages.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Collection Foulon. Classification Dewey : 372.7-Livre scolaire : mathématiques
LIBRAIRIE L'ECOLE. 1936. In-8. Cartonné. Etat d'usage, Couv. légèrement passée, Dos satisfaisant, Intérieur frais. 308 pages. Quelques schémas en noir et blanc dans le texte.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
EDITIONS DE L'ECOLE. Non daté. In-8. Broché. Bon état, Couv. légèrement passée, Dos satisfaisant, Intérieur acceptable. 125 pages. Nombreux graphiques en noir et blanc dans le texte.. . . . Classification Dewey : 510-Mathématiques
Collection Foulon Classification Dewey : 510-Mathématiques
Editions Ecole et Collège. 1938. In-12. Broché. Etat d'usage, Tâchée, Dos satisfaisant, Papier jauni. 61pages. Mouillures. Nombreuses annotations à l'encre et au crayon dans le texte. Un ex-libris au crayon sur la page titre. Quelques tâches d'encre sur le 1er plat. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
LIBRAIRIE L'ECOLE. 1936. In-8. Cartonné. Etat d'usage, Couv. légèrement passée, Dos fané, Intérieur frais. 328 pages. Quelques schémas en noir et blanc dans le texte.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
VAUTRAIN Jacques. 1934. In-8. Broché. Bon état, Couv. légèrement passée, Dos satisfaisant, Non coupé. 158 + 222 pages. Nombreuses figures en noir et blanc dans le texte.. . . . Classification Dewey : 510-Mathématiques
"Collection ""Le collaborateur des candidats bacheliers. TOME I : Arithmétique, Algèbre, Trigonométrie, Cosmographie. TOME II : Géométrie, Mécanique. Classification Dewey : 510-Mathématiques"
Paris, Editions CEDIC, 1982. in-8 carre, 279 pp., figures, broché, couv.- ISBN 2712401611
Bel exemplaire. [GD8-8]
New York, Dover Publ., 1962. Paperback. XIV, 286 pp.
Paris, Gauthier-Villars, 1961. 8vo. Orig. printed wrappers, uncut. 100 pp.
First edition. Published in the series 'Collection de Logique Mathématique', Serie A.
Librairie vuibert in8. Sans date. Broché.
protection plastique tranhces fatiguées intérieur assez propre
Librairie Vuibert. 1935. In-12. Relié. Etat d'usage, Couv. légèrement pliée, Dos frotté, Quelques rousseurs. 356 pages - papier jauni. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
Vuibert & Nony. 1909. In-8. Relié. Etat d'usage, Coins frottés, Dos satisfaisant, Intérieur acceptable. Pages 478 à 674.. . . . Classification Dewey : 510-Mathématiques
2e édition. Classification Dewey : 510-Mathématiques
Vuibert et Nony. 1905. In-8. Relié. Bon état, Couv. convenable, Dos fané, Quelques rousseurs. 498 pages.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
Vuibert. 1938. In-8. Broché. Etat d'usage, Couv. convenable, Coiffe en tête abîmée, Papier jauni. 171 pages.. . . . Classification Dewey : 510-Mathématiques
Classification Dewey : 510-Mathématiques
PUF. 1963. In-8. Broché. Bon état, Couv. convenable, Dos satisfaisant, Intérieur acceptable. 243 pages. Tampon sur la page de titre.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
PUF. 1963. In-8. Broché. Bon état, Couv. convenable, Dos satisfaisant, Intérieur acceptable. 239 pages.. . . . Classification Dewey : 372.7-Livre scolaire : mathématiques
Classification Dewey : 372.7-Livre scolaire : mathématiques
Berlin, G. Reimer, 1852. 4to. In the original printed wrappers, without back strip. In ""Journal für die reine und angewandte Mathematik"", 43. band, Heft 2, 1852. Entire second heft offered. Fine and clean. Pp. 93-113. [Entire volume: Pp. 93-184 + 3 plates.].
First printing.
Berlin, G. Reimer, 1852. 4to. In the original printed wrappers, without back strip. In ""Journal für die reine und angewandte Mathematik"", 43. band, Heft 4, 1852. Entire fourth heft offered. Fine and clean. Pp. 294-339. [Entire volume: Pp. 283-374 + 3 plates.].
First printing.
(Berlin, G. Reimer, 1832) 4to. As extracted from ""Journal für die reine und angewandte Mathematik, 8. Band, 1832"", without backstrip. Fine and clean. pp. 160-68.
First printing.
(Berlin, G. Reimer, 1832) 4to. As extracted from ""Journal für die reine und angewandte Mathematik, 8. Band, 1832"", without backstrip. Fine and clean. pp. 64-116"" Pp. 194-212.
First printing of Gudermann extensive and important papers on hyperbolic functions. During 1830ies Gudermann focused his work on these functions and published extensive on the subject. It was later coined the Gudermannian function.The function was introduced by Johann Heinrich Lambert in the 1760s at the same time as the hyperbolic functions. He called it the ""transcendent angle,"" and it went by various names until 1862 when Cayley suggested it be given its current name as a tribute to Gudermann's work in the 1830ies on the theory of special functions. The present paper together with two later published papers were collected in Theorie der potenzial- oder cyklisch-hyperbolischen functionen (1833), a book which expounded sinh and cosh to a wide audience.The issue also contain a paper by the famous Norwegian mathematician Niels Henrik Abel.""Gudermann devoted much more attention to the theory of special functions. After the earlier works of Leonhard Euler, John Landen, and A. M. Legendre (Gauss's results were still in manuscript), Niels Abel's studies on elliptical functions, published mostly in A. L. Crelle's Journal für reine und angewandte Mathematik, represented an important divide in treating this area. In 1829 Carl Jacobi's book Fundamenta nova theoriae functionum ellipticarum was published. At the time Gudermann was one of the first mathematicians to expand on these results. Beginning with volume 6 (1830) of Crelle's Journal, he published a series of papers which he later summarized in two books: Theorie der Potenzialoder cyklisch-hyperbolischen Functionen (1833) and Theorie der Modular-Functionen und der Modular-Integrale (1844), which were to have had a sequel which was never written."" (DSB). Gudermann is known today for being the teacher of Karl Weierstrass, who took Gudermann's course in elliptic functions in 1839, the first to be taught in any institute. Weierstrass was greatly influenced by this course, which marked the direction of his own research.
Berlin, G. Reimer, 1838. 4to. In ""Journal für die reine und angewandte Mathematik, 18. Band, 1-2 Heft, 1838"". Both issues in the original printed wrappers, without backstrip. Fine and clean. [Gudermann, 1 heft:] Pp. 1-54. [Gudermann, 2 heft:] Pp. 142-175. [Entire issue, heft 1: IV, 100, (2) pp. 2 Heft: 101-188, (2) pp. + 2 plates, one of them detached.].
First printing of Gudermann's two papers on modular functions and modular integrals, ideas which anticipated his 1844-book.""Gudermann devoted much more attention to the theory of special functions. After the earlier works of Leonhard Euler, John Landen, and A. M. Legendre (Gauss's results were still in manuscript), Niels Abel's studies on elliptical functions, published mostly in A. L. Crelle's Journal für reine und angewandte Mathematik, represented an important divide in treating this area. In 1829 Carl Jacobi's book Fundamenta nova theoriae functionum ellipticarum was published. At the time Gudermann was one of the first mathematicians to expand on these results. Beginning with volume 6 (1830) of Crelle's Journal, he published a series of papers which he later summarized in two books: Theorie der Potenzialoder cyklisch-hyperbolischen Functionen (1833) and Theorie der Modular-Functionen und der Modular-Integrale (1844), which were to have had a sequel which was never written."" (DSB).
Berlin, G. Reimer, 1840. 4to. In ""Journal für die reine und angewandte Mathematik, 1840, 3 Heft"". Without backstrip. Fine and clean. [Guderman:] Pp. 240-292.
First printing of the second part of Gudermann's papers on modular functions and modular integrals, ideas which anticipated his 1844-book.""Gudermann devoted much more attention to the theory of special functions. After the earlier works of Leonhard Euler, John Landen, and A. M. Legendre (Gauss's results were still in manuscript), Niels Abel's studies on elliptical functions, published mostly in A. L. Crelle's Journal für reine und angewandte Mathematik, represented an important divide in treating this area. In 1829 Carl Jacobi's book Fundamenta nova theoriae functionum ellipticarum was published. At the time Gudermann was one of the first mathematicians to expand on these results. Beginning with volume 6 (1830) of Crelle's Journal, he published a series of papers which he later summarized in two books: Theorie der Potenzialoder cyklisch-hyperbolischen Functionen (1833) and Theorie der Modular-Functionen und der Modular-Integrale (1844), which were to have had a sequel which was never written."" (DSB).
Berlin, G. Reimer, 1830. 4to. In ""Journal für die reine und angewandte Mathematik, 6. Band, 1 Heft, 1830"". In the original printed wrappers, without backstrip. Fine and clean. [Gudermann:] Pp. 1-39. [Entire issue: Pp. 106 pp. + 1 folded plate. ].
First printing of Gudermann extensive and important paper on hyperbolic functions. During 1830ies Gudermann focused his work on these functions and published extensive on the subject, the present paper being the first. It was later coined the Gudermannian function.The function was introduced by Johann Heinrich Lambert in the 1760s at the same time as the hyperbolic functions. He called it the ""transcendent angle,"" and it went by various names until 1862 when Cayley suggested it be given its current name as a tribute to Gudermann's work in the 1830ies on the theory of special functions. The present paper together with two later published papers were collected in Theorie der potenzial- oder cyklisch-hyperbolischen functionen (1833), a book which expounded sinh and cosh to a wide audience.The issue also contain a paper by the famous Norwegian mathematician Niels Henrik Abel.""Gudermann devoted much more attention to the theory of special functions. After the earlier works of Leonhard Euler, John Landen, and A. M. Legendre (Gauss's results were still in manuscript), Niels Abel's studies on elliptical functions, published mostly in A. L. Crelle's Journal für reine und angewandte Mathematik, represented an important divide in treating this area. In 1829 Carl Jacobi's book Fundamenta nova theoriae functionum ellipticarum was published. At the time Gudermann was one of the first mathematicians to expand on these results. Beginning with volume 6 (1830) of Crelle's Journal, he published a series of papers which he later summarized in two books: Theorie der Potenzialoder cyklisch-hyperbolischen Functionen (1833) and Theorie der Modular-Functionen und der Modular-Integrale (1844), which were to have had a sequel which was never written."" (DSB).Gudermann is known today for being the teacher of Karl Weierstrass, who took Gudermann's course in elliptic functions in 1839, the first to be taught in any institute. Weierstrass was greatly influenced by this course, which marked the direction of his own research.
Berlin, G. Reimer, 1830. 4to. As extracted from ""Journal für die reine und angewandte Mathematik, 6. Band, 1830""., without backstrip. Fine and clean. [Gudermann:] Pp. 162-194. [Entire volue: Pp. 147-214].
First printing of Gudermann extensive and important second paper on hyperbolic functions. During 1830ies Gudermann focused his work on these functions and published extensive on the subject, the present paper being the first. It was later coined the Gudermannian function.The function was introduced by Johann Heinrich Lambert in the 1760s at the same time as the hyperbolic functions. He called it the ""transcendent angle,"" and it went by various names until 1862 when Cayley suggested it be given its current name as a tribute to Gudermann's work in the 1830ies on the theory of special functions. The present paper together with two later published papers were collected in Theorie der potenzial- oder cyklisch-hyperbolischen functionen (1833), a book which expounded sinh and cosh to a wide audience.The issue also contain a paper by the famous Norwegian mathematician Niels Henrik Abel.""Gudermann devoted much more attention to the theory of special functions. After the earlier works of Leonhard Euler, John Landen, and A. M. Legendre (Gauss's results were still in manuscript), Niels Abel's studies on elliptical functions, published mostly in A. L. Crelle's Journal für reine und angewandte Mathematik, represented an important divide in treating this area. In 1829 Carl Jacobi's book Fundamenta nova theoriae functionum ellipticarum was published. At the time Gudermann was one of the first mathematicians to expand on these results. Beginning with volume 6 (1830) of Crelle's Journal, he published a series of papers which he later summarized in two books: Theorie der Potenzialoder cyklisch-hyperbolischen Functionen (1833) and Theorie der Modular-Functionen und der Modular-Integrale (1844), which were to have had a sequel which was never written."" (DSB).Gudermann is known today for being the teacher of Karl Weierstrass, who took Gudermann's course in elliptic functions in 1839, the first to be taught in any institute. Weierstrass was greatly influenced by this course, which marked the direction of his own research.
GALLIMARD. 1996. In-12. Broché. Bon état, Couv. convenable, Dos satisfaisant, Intérieur frais. 176 pages augmentées de nombreuses illustrations en couleurs et noir et blanc in et hors txte.. . . . Classification Dewey : 510-Mathématiques
Classification Dewey : 510-Mathématiques