Course detail
Selected Chapters from Constructive Geometry
FSI-0KD Acad. year: 2024/2025 Winter semester
The course familiarises students with the fundamentals of three-dimensional descriptive geometry, theory of engineering drawing and graphical method of solving space or solid analytic geometry problems. Presentation of these concepts will enable students
to understand descriptive geometry who will be able to relate it to engineering and technology.
Language of instruction
Czech
Number of ECTS credits
2
Supervisor
Department
Entry knowledge
Students are expected to be familiar with the fundamentals of geometry and mathematics
at the secondary school level.
Rules for evaluation and completion of the course
Course-unit credit is conditional on an active attendance at seminars.
If a student does not satisfy the given conditions, the teacher can set an alternative condition.
Aims
The course aims to acquaint the students with the theoretical basics of descriptive geometry.
Students will acquire basic knowledge of three-dimensional descriptive geometry
necessary to solve real life situations in various areas of engineering.
The study programmes with the given course
Programme B-MET-P: Mechatronics, Bachelor's, elective
Programme B-FIN-P: Physical Engineering and Nanotechnology, Bachelor's, elective
Programme B-PDS-P: Industrial Design, Bachelor's, elective
Programme B-MAI-P: Mathematical Engineering, Bachelor's, elective
Programme B-ZSI-P: Fundamentals of Mechanical Engineering, Bachelor's
specialization MTI: Materials Engineering, elective
Programme B-ZSI-P: Fundamentals of Mechanical Engineering, Bachelor's
specialization STI: Fundamentals of Mechanical Engineering, elective
Programme B-STR-P: Engineering, Bachelor's
specialization STR: Engineering, elective
Type of course unit
Lecture
26 hours, optionally
Teacher / Lecturer
Syllabus
1. Basics of conics.
2. Special constructions of conics.
3. Conics. Mapping between two planes.
4. Mapping between a circle and an ellipse.
5. Mongean system of descriptive geometry. Basic principles of orthographic projection.
6. Auxiliary inclined views or projections.
7. Orthographic projection – practicale problems.
8. Axonometric projection.
9. Solids in the isometric pictorial.
10. Elementary solids and surfaces.
11. Intersection of a line and a surface. Slice.
12. Auxiliary inclined views.
13. Examples according to student interest.