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Lecturer(s)
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Chodorová Marie, RNDr. Ph.D.
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Course content
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1. Quételet-Danielin theorems for sections of rounded solids, sections of rounded solids. 2. Mapping of spherical surfaces in projections, tasks on spherical surfaces. 3. Construction of intersections of rounded solids. 4. Lighting in descriptive geometry, lighting of edgy and rounded solids and surfaces.
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Learning activities and teaching methods
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Monologic Lecture(Interpretation, Training), Dialogic Lecture (Discussion, Dialog, Brainstorming), Demonstration
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Learning outcomes
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Construction the sections and intersections of rounded solids. Learn the bases of lighting in descriptive geometry and can light solids.
1. Knowledge Mappings rounded solids, construction sections, intersections and lighting.
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Prerequisites
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unspecified
KAG/GZME2 and KAG/GZME3
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Assessment methods and criteria
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Oral exam, Analysis of Activities ( Technical works), Systematic Observation of Student
Credit: active participation in seminars, test and homework. Exam.
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Recommended literature
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Kadeřávek, Klíma , Kounovský. (1954). Deskriptivní geometrie I. ČSAV Praha.
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Piska R. Medek M. (1966). Deskriptivní geometrie I. SNTL Praha.
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Pomykalová, E. (2012). Deskriptivní geometrie pro SŠ. Prometheus.
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Urban A. (1949). Deskriptivní geometrie I. JČMF Praha.
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