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Last update: JANCARIK/PEDF.CUNI.CZ (04.06.2010)
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Last update: JANCARIK/PEDF.CUNI.CZ (04.06.2010)
To goal is to deeper understand a geometric description of real world in the context of the historical development of geometry. |
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Last update: JANCARIK/PEDF.CUNI.CZ (04.06.2010)
PAVLÍČEK, J.B. Základy neeukleidovské geometrie Lobačevského. Praha: Přírodovědecké vydavatelství, 1953. VRBA, A. Geometrie na počítači. Učebnice pro kurzy TTT. Praha, 1999. SEKANINA, M. a kol. Geometrie 1,2. Praha: SPN, 1986. COXETER, H.S.M. Introduction to Geometry. John Wiley & Sons, USA, 1989. |
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Last update: JANCARIK/PEDF.CUNI.CZ (04.06.2010)
Seminar. |
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Last update: KVASZ/PEDF.CUNI.CZ (21.02.2012)
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Last update: JANCARIK/PEDF.CUNI.CZ (04.06.2010)
Review of the historical development of geometry. Geometry as a theoretical discipline, axiomatic building of geometry. Axiomatic building of euclidean geometry: axioms, incidence, order, congruence, parallelism, continuity. Lobachevski geometry: absolute geometry, Lobachevski axiom, historical notes to the fifth postulate, Beltrami-Klein model, etc. Systems of axims and their properties, ways towards non-euclidean geometry. |