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Lecturer(s)
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Rachůnek Lukáš, doc. RNDr. Ph.D.
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Chodorová Marie, RNDr. Ph.D.
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Course content
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1. Theorerical bases of the Monge mapping, mappings of points, straight lines and planes. Basic position and metric problems in the Monge mapping. Transformations of the projection planes and their application. Mappings of basic angulated solids in the Monge mapping, exercises about angulated solids. Application of the Monge mapping. 2. Theoretical bases of the orthogonal axonometry, mappings of points, straight lines and planes. Basic position and metric problems in the orthogoval axonometry. Mappings of basic angulated solids, problems on angulated solids. Application of the orthogonal axonometry.
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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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Mapping of three-dimensional shapes into the plane, square solids and tasks on square solids.
1. Knowledge Describe properties of some kinds of projection from the 3-dimensional space to the plane
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Prerequisites
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unspecified
KAG/ZME1
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Assessment methods and criteria
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Oral exam, Written exam, Student performance
Credit: the student has to attend the seminars and pass two written tests during the semester. Exam: the student has to understand the subject and be able to make the important constructions.
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Recommended literature
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Machala F., Sedlářová M., Srovnal. (2002). Konstrukční geometrie. UP Olomouc.
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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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