La geometria sulla sfera

Arzarello, Ferdinando; Dané, Cristiano; Lovera, Laura; Mosca, Miranda; Nolli, Nicoletta; Ronco, Antonella

doi:10.1007/978-88-470-2574-5_2

Ferdinando Arzarello⁶,
Cristiano Dané⁷,
Laura Lovera⁸,
Miranda Mosca⁹,
Nicoletta Nolli¹⁰ &
…
Antonella Ronco⁸

Part of the book series: Convergenze ((CONVERGENZE))

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Riassunto

Proviamo a ipotizzare l’esistenza di una formica euclidea, ovvero di una formica pensante che, imprigionata su di un pallone isolato nel vuoto, senta l’esigenza di dare un ordine razionale al suo ambiente. Potrebbe essere la stessa famosa formica che, correndo sul nastro di Moebius disegnato da Escher, è pervenuta alla conclusione che quel nastro ha una sola faccia.

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Authors and Affiliations

Dipartimento di Matematica, Università di Torino, Italy
Ferdinando Arzarello
Liceo Scientifico “A. Volta”, Torino, Italy
Cristiano Dané
Liceo psicopedagogico “Regina Margherita”, Torino, Italy
Laura Lovera & Antonella Ronco
Associazione Subalpina MATHESIS, Torino, Italy
Miranda Mosca
Liceo scientifico “G. Aselli”, Cremona, Italy
Nicoletta Nolli

Authors

Ferdinando Arzarello
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Cristiano Dané
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Laura Lovera
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Miranda Mosca
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Nicoletta Nolli
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Antonella Ronco
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Arzarello, F., Dané, C., Lovera, L., Mosca, M., Nolli, N., Ronco, A. (2012). La geometria sulla sfera. In: Dalla geometria di Euclide alla geometria dell’Universo. Convergenze. Springer, Milano. https://doi.org/10.1007/978-88-470-2574-5_2

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DOI: https://doi.org/10.1007/978-88-470-2574-5_2
Publisher Name: Springer, Milano
Print ISBN: 978-88-470-2573-8
Online ISBN: 978-88-470-2574-5
eBook Packages: Mathematics and StatisticsMathematics and Statistics (R0)

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