Course detail
Constructive Geometry
FSI-1KD Acad. year: 2022/2023 Winter semester
The constructive geometry course summarizes and clarifies basic geometric concepts, including basic geometric projections, and introduces students to some types of projections, their properties and applications. Emphasis is placed on Monge projections and orthogonal axonometry. The basics of plane kinematic geometry are also presented. A large part of the course is devoted to the representation of curves and surfaces of engineering practice and some necessary constructions such as plane sections and intersections.
The constructions are complemented by modeling in Rhinoceros software.
Language of instruction
Czech
Number of ECTS credits
5
Supervisor
Department
Learning outcomes of the course unit
Students will acquire the basic knowledge of three-dimensional descriptive geometry necessary to solve real life situations in various areas of engineering.
Prerequisites
The students have to be familiar with the fundamentals of geometry and mathematics at the secondary school level.
Planned learning activities and teaching methods
The course is taught through lectures explaining the basic principles and theory of the discipline. Exercises are focused on practical topics presented in lectures.
Assesment methods and criteria linked to learning outcomes
COURSE-UNIT CREDIT REQUIREMENTS: Draw up 2 semestral works (each at most 5 points), there is one written test (the condition is to obtain at least 5 points of maximum 10 points). The written test will be in the 9th week of the winter term approximately.
FORM OF EXAMINATIONS: The exam has an practical and theoretical part. In a 90-minute practical part, students have to solve 3 problems (at most 60 points). The student can obtain at most 20 points for theoretical part.
RULES FOR CLASSIFICATION:
1. Results from seminars (at most 20 points)
2. Results from the practical part (at most 60 points)
3. Results from the theoretical part (at most 20 points)
Final classification:
0-49 points: F
50-59 points: E
60-69 points: D
70-79 points: C
80-89 points: B
90-100 points: A
Aims
The aim of the course is to deepen spatial imagination, to introduce students to the principles of representation and important properties of some curves and surfaces. The aim of the course is to introduce students to the basics of the international language of engineers, i.e. descriptive geometry, so that they can then creatively apply this knowledge in professional subjects and in the use of computer technology.
Specification of controlled education, way of implementation and compensation for absences
Attendance at seminars is required. The way of compensation for an absence is fully at the discretion of the teacher.
The study programmes with the given course
Programme B-ENE-P: Energy, Bachelor's, compulsory
Programme B-PRP-P: Professional Pilot, Bachelor's, compulsory
Programme B-ZSI-P: Fundamentals of Mechanical Engineering, Bachelor's
specialization STI: Fundamentals of Mechanical Engineering, compulsory
Programme B-STR-P: Engineering, Bachelor's
specialization STR: Engineering, compulsory
Type of course unit
Lecture
26 hours, optionally
Teacher / Lecturer
Syllabus
- Cross sections, focal properties of conic sections, construction of conic sections, conjugate diameters of conic section
- Methods for mapping three-dimensional objects onto the plane – central and parallel projections. Introduction into the Monge's method of projection (the two picture protocol) – the orthogonal projection onto two orthogonal planes.
- Monge's method: points and lines that belong to a plane, principal lines, horizontal and frontal lines.
- Monge's method: rotation of a plane, circle in a plane. 3rd projection plane (profile projection plane).
- Axonometric – basis
- Axonometric – completion
- Elementary surfaces and solids, cross sections
- Solids and cross sections of the solids
- Curves: Basics of projective geometry (points at infinity, axioms, incidence, projective axiom, geometric model of projective plane) kinematic geometry in the plane (trochoids). Rectification of the arc.
- Helix: helical movement, points and tangent lines in Monge's method and axonometry
- Helical surfaces: helical movement of the curve, ruled (opened, closed, orthogonal, oblique) and cyclical surfaces
- Surfaces of revolution: derivation of parametric equations in projective space, surfaces of revolution construction, cross sections of the surfaces
- Developable surfaces: cylinder and right circular cone with cross-section curve
Computer-assisted exercise
26 hours, compulsory
Teacher / Lecturer
Syllabus
1.- 2. Rhinoceros 3D – Line, Plane, Circle, Polygon in 3D. A line perpendicular, conic sections, focal properties of conic sections
3.- 4. Monge's method
5.- 6. Axonometry
7.- 8. Elementary surfaces and solids, cross sections
9.- 10. Kinematic geometry in the plane, helix
11.- 12. Helical surfaces, Surfaces of revolution
Presence in the seminar is obligatory.