Course detail
FEM in Engineering Computations I
FSI-RIVAcad. year: 2021/2022
The course presents an introduction to selected numerical methods in Continuum Mechanics (finite difference method, boundary element method) and, in
particular, a more detailed discourse of the Finite Element Method. The relation to Ritz method is explained, algorithm of the FEM is presented together with
the basic theory and terminology (discretisation of continuum, types of elements, shape functions, element and global matrices of stiffness, pre- and
post-processing). Application of the FEM in different areas of engineering analysis is presented in theory and practice: static linear elasticity, dynamics
(modal analysis and transient problem), thermal analysis. In the practical part students will learn how to create an appropriate computational model and
realise the FE analysis using commercial software.
Language of instruction
Number of ECTS credits
Mode of study
Guarantor
Learning outcomes of the course unit
running and postprocessing of FE models and able to use any of the commercial FE packages after only a short introductory training.
Prerequisites
Co-requisites
Planned learning activities and teaching methods
Assesment methods and criteria linked to learning outcomes
package. Examination has the form of a written test.
Course curriculum
Work placements
Aims
of the possibilities of commercial FE packages.
Specification of controlled education, way of implementation and compensation for absences
Recommended optional programme components
Prerequisites and corequisites
Basic literature
R.D.Cook: Concepts and Applications of Finite Element Analysis, J.Wiley, 2001
Zienkiewicz, O. C., Taylor, R. L., The Finite Element Method for Solid and Structural Mechanics, Elsevier, 2013
Recommended reading
V.Kolář, I.Němec, V.Kanický: FEM principy a praxe metody konečných prvků, Computer Press, 2001
Elearning
Classification of course in study plans
- Programme N-IMB-P Master's
specialization IME , 1 year of study, winter semester, compulsory
specialization BIO , 1 year of study, winter semester, compulsory - Programme N-MTI-P Master's 1 year of study, winter semester, elective
- Programme N-SLE-P Master's 1 year of study, winter semester, elective
- Programme N-ETI-P Master's
specialization FLI , 2 year of study, winter semester, compulsory
- Programme B3A-P Bachelor's
branch B-MET , 3 year of study, winter semester, compulsory
Type of course unit
Lecture
Teacher / Lecturer
Syllabus
2. Variational formulation of FEM, historical notes
3. Illustration of FE algorithm on the example of 1D elastic bar
4. Line elements in 2D and 3D space - bars, beams, frames
5. Plane and axisymmetrical elements, mesh topology and stiffness matrix structure
6. Isoparametric formulation of elements
7. Equation solvers, domain solutions
8. Convergence, compatibility, hierarchical and adaptive algorithms
9. Thin-walled elements in bending, hermitean shape functions
10.Plate and shell elements
11.FEM in dynamics, consistent and diagonal mass matrix
12.FEM in heat conduction problems, stationary and transient analysis
13.Explicit FE solution
Computer-assisted exercise
Teacher / Lecturer
Syllabus
2. Application of Ritz Method on the same problem
3. Commercial FE packages - brief overview
4. ANSYS - Introduction to environment and basic commands
5. Frame structure in 2D
6. Frame structure in 3D
7. Plane problem of elasticity
8. 3D problem, pre- and postprocessing
9. Consultation of individual projects
10.Consultation of individual projects
11.Modal analysis by ANSYS
12.Transient problem of heat conduction and thermal stress analysis
13.Presentation of semester projects
Elearning