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Books on the topic 'Geometria Euclidea'

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Author: Grafiati
Published: 26 July 2024

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1

Infantino, Rocco. Geometria non euclidea. Poggibonsi: Lalli, 1987.

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2

Balistreri-Trincanato, Corrado. Dalla geometria euclidea al rilievo architettonico. Mestre (Venezia): Stamperia Cetid, 2000.

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3

Agazzi, Evandro. Le geometrie non euclidee e i fondamenti della geometria dal punto di vista elementare. Brescia: La Scuola, 1998.

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4

Maracchia, Silvio. Dalla geometria euclidea alla geometria iperbolica: Il modello di Klein. Napoli: Liguori, 1993.

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5

Arzarello, Ferdinando, Cristiano Dané, Laura Lovera, Miranda Mosca, Nicoletta Nolli, and Antonella Ronco. Dalla geometria di Euclide alla geometria dell’Universo. Milano: Springer Milan, 2012. http://dx.doi.org/10.1007/978-88-470-2574-5.

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6

Greenberg, Marvin J. Euclidean and non-Euclidean geometries. 4th ed. New York: W.H. Freeman, 2008.

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7

Benedetto, Francesco Di. Le geometrie non euclidee. Napoli: Città del sole, 2001.

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8

Henle, Michael. Modern geometries: Non-Euclidean, projective, and discrete. 2nd ed. Upper Saddle River, N.J: Prentice Hall, 2001.

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9

Euclidean and non-Euclidean geometry: An analytical approach. Cambridge [Cambridgeshire]: Cambridge University Press, 1986.

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10

Greenberg, Marvin J. Euclidean and non-Euclidean geometries. 4th ed. New York: W.H. Freeman, 2008.

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11

Saccheri, Gerolamo. Euclide liberato da ogni macchia: Testo latino a fronte. Milano: Bompiani, 2001.

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12

Saccheri, Girolamo. Euclide liberato da ogni macchia. Milano: Bompiani, 2001.

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13

Miller, Nathaniel. Euclid and his twentieth century rivals: Diagrams in the logic of Euclidean geometry. Stanford, CA: CSLI Publications, 2007.

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14

Baillairgé, Charles P. Florent. Mémoire lu par l'auteur C. Baillairgé devant la Société Royale du Canada, durant sa séance de mai 1888. [S.l: s.n., 1986.

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15

Scrimieri, Giorgio. Fondazione della geometria: Da Bernhard Riemann a Hermann Weyl = Über die Hypothesen, welche der Geometrie zu Grunde liegen. Galatina: Congedo, 1992.

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16

Hans, Sachs. Ebene isotrope Geometrie. Braunschweig: F. Vieweg, 1987.

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17

Greenberg, Marvin J. Euclidean and non-Euclidean geometries: Development and history. 3rd ed. New York: W.H. Freeman, 1993.

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18

W, Henderson David. Experiencing geometry: Euclidean and non-Euclidean with history. 3rd ed. Upper Saddle River, N.J: Pearson Prentice Hall, 2005.

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19

Zamorano, Rodrigo de, b. ca. 1542., Negrón, Luciano de, d. 1606., and Sanz Hermida José Ma, eds. Los seis libros primeros de la geometría de Euclides. [Salamanca]: Ediciones Universidad de Salamanca, 1999.

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20

Betti, Renato. Lobačevskij: L'invenzione delle geometrie non euclidee. Milano: B. Mondadori, 2005.

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21

Kulczycki, Stefan. Non-Euclidean geometry. Mineola, N.Y: Dover Publications, 2008.

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22

Clavius, Christoph. Commentaria in Euclidis Elementa geometrica. Hildesheim: Olms-Weidmann, 1999.

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23

Hilbert, David. Anschauliche Geometrie. 2nd ed. Berlin: Springer, 2011.

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24

Coxeter, H. S. M. Non-Euclidean geometry. 6th ed. Washington, D.C: Mathematical Association of America, 1998.

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25

Manning, Henry Parker. Non-Euclidean geometry. Boston, U.S.A: Ginn, 1990.

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26

Finelli, Andrea. Chiarimenti Di Geometria Euclidea 1. Lulu Press, Inc., 2015.

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27

Bellini, Nicola. Numeri Complessi e Geometria Euclidea. Independently Published, 2020.

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28

Bellini, Nicola. Numeri Complessi e Geometria Euclidea. Independently Published, 2022.

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29

Finelli, Andrea. Chiarimenti Di Geometria Euclidea 1. Independently Published, 2015.

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30

Dalla geometria euclidea al rilievo architettonico. Mestre (Venezia): Stamperia Cetid, 2000.

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31

Dalla geometria euclidea al rilievo architettonico. Mestre (Venezia): Stamperia Cetid, 2000.

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32

Pattaro, Valerio. Matematica AttivaMente: 20 Problemi Di Geometria Euclidea. Independently Published, 2021.

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33

La geometria non-euclidea: Esposizione storico-critica del suo sviluppo. Bologna: N. Zanichelli, 1991.

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34

La geometria non-euclidea: Esposizione storico-critica del suo sviluppo. Bologna: N. Zanichelli, 1991.

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35

(Crip), Claudio Ripamonti. MATE 41 - GEOMETRIA 1 : PROCEDURARIO Di GEOMETRIA- Formule e Strategie per: Enti Fondamentali, Angoli, Poligoni, Figure Piane e Solidi, Dimostrazione Euclidea, Criteri, Parallelismo, Teoremi, Circonferenza. Independently Published, 2019.

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36

McMorran, Ciaran. Joyce and Geometry. University Press of Florida, 2020. http://dx.doi.org/10.5744/florida/9780813066288.001.0001.

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Following the development of non-Euclidean geometries from the mid-nineteenth century onwards, Euclid’s system came to be re-conceived as a language for describing reality rather than a set of transcendental laws. As Henri Poincaré famously put it, “[i]f several geometries are possible, is it certain that our geometry [...] is true?” By examining James Joyce’s linguistic play and conceptual engagement with ground-breaking geometric constructs in Ulysses and Finnegans Wake, this book explores how his topographical writing of place encapsulates a common crisis between geometric and linguistic modes of representation within the context of modernity. More specifically, it investigates how Joyce presents Euclidean geometry and its topographical applications as languages, rather than ideally objective systems, for describing the visible world; and how, conversely, he employs language figuratively to emulate the systems by which the world is commonly visualized. With reference to his early readings of Giordano Bruno, Henri Poincaré, and other critics of the Euclidean tradition, it examines how Joyce’s obsession with measuring and mapping space throughout his works enters into his more developed reflections on the codification of visual signs in Finnegans Wake. In particular, this book sheds new light on Joyce’s fascination with the “geometry of language” practiced by Bruno, whose massive influence on Joyce is often assumed to exist in Joyce studies yet is rarely explored in any detail.
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37

Dunajski, Maciej. Geometry: A Very Short Introduction. Oxford University Press, 2022. http://dx.doi.org/10.1093/actrade/9780199683680.001.0001.

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Geometry: A Very Short Introduction discusses the fundaments of Euclidean and non-Euclidean geometries. This topic includes curved spaces, projective geometry in Renaissance art, and the geometry of spacetime inside a black hole. The study of geometry is at least 2,500 years old, and within it is the concept of mathematical proof or deductive reasoning from a set of axioms. Geometry remained a very active area of research in mathematics, with links to science and art. The subject of geometry includes examples of mathematical objects, such as Platonic solids, or theorems like the Pythagorean theorem, as well as general principles.
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38

(Translator), T. L. Heath, ed. Euclid's Elements. Green Lion Press, 2002.

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39

Euclidean and Non-Euclidean Geometries. 4th ed. W. H. Freeman, 2007.

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40

Noronha, Helena. Euclidean and Non-Euclidean Geometries. Prentice Hall, 2002.

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41

Noronha, Helena. Euclidean and Non-Euclidean Geometries. Prentice Hall, 2002.

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42

Ryan, Patrick J. Euclidean and Non-Euclidean Geometry: An Analytic Approach. Cambridge University Press, 2009.

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43

J, Ryan Patrick. Euclidean and Non-Euclidean Geometry: An Analytic Approach. Cambridge University Press, 2012.

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44

Euclidean and non-Euclidean geometries: Development and history. 3rd ed. New York: W.H. Freeman, 1993.

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45

Libeskind, Shlomo. Euclidean and Non-Euclidean Geometries. Jones & Bartlett Learning, LLC, 2020.

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46

Nichteuklidische Geometrie. Leipzig: G. J. Göschen, 1991.

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47

Henderson, Andrea. Geometry. Oxford University Press, 2018. http://dx.doi.org/10.1093/oso/9780198809982.003.0002.

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Edwin Abbott’s Flatland dramatizes the implications of dethroning what Victorians regarded as the preeminent representational system: Euclidean geometry. The displacement of the singular Euclidean account of space with a multiplicity of non-referential spatial regimes did more than introduce the possibility of varying perspectives on the world; the challenge to the “sacredness” of Euclid met with resistance partly because it suggested the ideal of a transparent representational system was inherently untenable. Flatland explores the repercussions of this problem for the novel, shifting emphasis from the revelation of the content of character to focus on the vagaries of point of view. The characters are Euclidean figures shown the limitations of their constructions of the world, and epistemic certainty is unavailable because all representational systems are contingent. Abbott finds consolation for this loss of certainty in the formalist, aesthetic character of projective geometry, insisting on the beauty of signs in and of themselves.
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48

Nicht-Euklidische geometrie. 2nd ed. Göttingen, 1991.

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49

Euclid's Elements: Volume C (Book 10). Athens, Greece: Nikolaos L. Kechris, 2017.

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50

Euclid's Elements: Volume B (Books 5,6,7,8,9). Athens, Greece: Nikolaos L. Kechris, 2017.

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