Course Details
Descriptive Geometry
Academic Year 2024/25
AA002 course is not part of any programme in the faculty
Course Guarantor
Institute
Language of instruction
Czech
Credits
4 credits
Semester
Forms and criteria of assessment
Offered to foreign students
Course on BUT site
Lecture
13 weeks, 2 hours/week, elective
Syllabus
1. Basics of lihting. Technical lighting.
2. Surfaces of revolution, sections of surfaces of revolution.
3. Lighting of surfaces of revolution .
4. Axonometry – basics.
5. Orthogonal axonometry.
6. Skew axonometry, oblique projection.
7. Linear perspective.
8. Linear perspective.
9. Basics of photogrammetry. Reconstruction from a vertical picture.
10. Warped quadrics. Hyperbolic paraboloid. One-sheet hyperboloid.
11. Higher order warped surfaces. Theoretical designe of roofs.
12. Helix, developable helicoidal surface, helicoidal conoid.
13. Topographic surfaces.
Exercise
13 weeks, 2 hours/week, compulsory
Syllabus
1. Revision – Monge projection.
2. Projections of a simple bodies and surfaces, their sections and intersections with a straight line. Technical lighting.
3. Tangent plane of a surface of revolution, section of a surface of revolution.
4. Lighting of a surface of revolution.
5. Orthogonal axonometry. Metric problems in coordinate planes.
6. Orthogonal axonometry. Projections of simple bodies and surfaces, their sections and intersections with a straight line.
7. Projecting in oblique projection. Projection of a circle in a coordinate plane. Displaying simple bodies. Cutting method.
8. Linear perspective. Intersection method. Constructing a free perspective.
9. Linear perspective. Method of rotated ground plan. Other methods of projecting a perspective.
10. Linear perspective. Vertical picture. Reconstructing an object from a perpendicular picture.
11. Warped hyperboloid, construction. Hyperbolic paraboloid. Hyperbolic paraboloid given by skew tetragon. Roofing by hyperbolic paraboloid.
12. Higher-order warped surfaces. Theoretic design of roofs.
13. Constructing a helix. Right helicoidal conoid. Credits.