Course detail
Statics
FSI-3ST-KAcad. year: 2024/2025
Introduction to solid mechanics and Statics, its relation to other courses of solid mechanics. Model and theoretical aspects of engineering mechanics, specification of basic terms and general principles. Introduction to and discussion of the elements of Statics - force, moment of force about a point, moment of force about an axis. Classification of force systems and their resultants. Equivalent force systems. Replacement of a force system by a force and a couple, replacement of a force system by a single force. Conditions for rigid-body equilibrium. Basic tasks of Statics. Centre of gravity and methods of its evaluation. Body supports and connections, their computational models, kinematic pairs. Degrees of freedom of a single body, constraints, concept of a free-body diagram. Statically determinate and indeterminate problems. Algorithm of static equilibrium solution of a body and its application to the analysis and solution of statically determinate systems, mechanisms and trusses. Basic graphical constructions. Passive resistances - their analysis and computational models, dry friction and rolling resistance. Free-body diagrams in actual states of motion. Application to engineering problems including friction forces and rolling resistances. Integral and differential approach to calculation of the resulting internal effects in straight rods.
Language of instruction
Number of ECTS credits
Mode of study
Guarantor
Entry knowledge
Rules for evaluation and completion of the course
Final examination:
The exam is divided into two parts. The content of the first part is a cross-sectional written test, from which it is possible to obtain a maximum of 40 ECTS points. Progression to the second part of the exam is conditional on gaining at least 20 ECTS points. If this condition is not met, the exam is graded „F“. The content of the second part is a written solution of typical tasks from the profiling areas of the subject, from which it is possible to obtain a maximum of 40 ECTS points. The specific form of the exam, types, number of examples or questions and details of the evaluation will be announced by the lecturer during the semester.
Final evaluation of the course is obtained as the sum of ECTS points gained in seminars and at the examination. To pass the course, at least 50 ECTS points must be reached.
Attendance at practical training is obligatory. Head of seminars carry out continuous monitoring of student's presence, their activities and basic knowledge.
Aims
Students will acquire basic knowledge of mechanics of solids, description and classification of force systems, determination of their characteristics and resultants as well as possibility of their equivalent replacement. Students will be made familiar with computational models of body connections without and with friction. Also provided will be the knowledge of kinematic and static analysis of supported and connected solids and mechanisms, equilibrium solution and concept of free-body diagram. Students will be able to solve static problems using basic graphic methods and calculate the internal resultant forces and moments in straight bars.
Study aids
Prerequisites and corequisites
Basic literature
Hibbeler, R.,C.: Engineering Mechanics - Statics and Dynamics, 7th ed., , 0
Muvdi,B.,B.,Al-Khafaji,A.,W.,McNabb,J.,W.: Statics for engineers, , 0
Recommended reading
Florian, Z., Suchánek, M.: Mechanika těles - úlohy ze statiky, , 0
Elearning
Classification of course in study plans
Type of course unit
Guided consultation in combined form of studies
Teacher / Lecturer
Syllabus
2. Force systems, their classification and characteristic features.
3. Centre of gravity and methods of its evaluation.
4. Equivalent force systems. Static equilibrium of a rigid body.
5. Basic tasks of Statics.
6. Geometry and characteristics of body supports and connections, their computational models.
7. Algorithm of static equilibrium solution of a constrained body.
8. Basic graphical constructions.
9. Body systems and their static numerical and graphical solutions.
10. Pin-jointed structures, the general and sequential method of solution.
11. Bonds with the passive resistance - their analysis and computational models, basic models of body connections.
12. Bonds with the passive resistance - static equilibrium of bodies and systems in motion.
13. The internal resultant forces and moments in straight bars - an integral and differential approach.
Guided consultation
Teacher / Lecturer
Syllabus
Force and moment resultants of force system.
Replacement of a force system by an equivalent force, resultants of distributed force systems.
Centre of gravity determination.
Constraints of a rigid body, concept of a free-body diagram.
Solution of static equilibrium of a constrained body.
Static equilibrium of movable body, equilibrium position.
Classification of rigid body systems, their degrees of freedom. Free–body diagram of a body system.
Computational and graphical solution of equilibrium of rigid body system.
Computational and graphical solution of trusses structures.
Static equilibrium of movable body with passive resistances.
Static equilibrium of movable body system with passive resistances.
Internal resultant forces and moments in straight bars - an integral and differential approach.
Elearning