Title:

# Selected Parts from Mathematics 1

Code:IVP1 (FEKT BVPA)
Ac.Year:2018/2019
Sem:Summer
Curriculums:
ProgrammeField/
Specialization
YearDuty
IT-BC-3BIT2ndElective
Language of Instruction:Czech
Credits:5
Completion:examination (written)
Type of
instruction:
Hour/semLecturesSeminar
Exercises
Laboratory
Exercises
Computer
Exercises
Other
Hours:3900013
ExamsTestsExercisesLaboratoriesOther
Points:7030000
Guarantor:Šmarda Zdeněk, doc. RNDr., CSc. (DMAT)
Lecturer:Šmarda Zdeněk, doc. RNDr., CSc. (DMAT)
Faculty:Faculty of Electrical Engineering and Communication BUT
Department:Department of Mathematics FEEC BUT
Schedule:
DayLessonWeekRoomStartEndLect.Gr.Groups
Wedlecture - ŠmardalecturesT8/010 09:0011:502BIA 2BIB 3BIT xx
Wedexercise - ostatní aktivity, ŠmardalecturesT8/010 12:0012:502BIA 2BIB 3BIT xx

Learning objectives:
The aim of this course is to introduce the basics of theory and calculation methods of local and absolute extrema of functions of several variables, double and triple integrals, line and surface integrals including applications in technical fields. Mastering basic calculations of multiple integrals, especialy tranformations of multiple integrals and calculations of line and surface integrals in scalar-valued and vector-valued fields. of a stability of solutions of differential equations and applications of selected functions with solving of dynamical systems.
Description:
The aim of this course is to introduce the basics of calculation of local, constrained and absolute extrema of functions of several variables, double and triple inegrals, line and surface integrals in a scalar-valued field and a vector-valued field including their physical applications. In the field of multiple integrals , main attention is paid to calculations of multiple integrals on elementary regions and utilization of polar, cylindrical and sferical coordinates, calculalations of a potential of vector-valued field and application of integral theorems.
Knowledge and skills required for the course:
The student should be able to apply the basic knowledge of analytic geometry and mathamatical analysis on the secondary school level: to explain the notions of general, parametric equations of lines and surfaces and elementary functions. From the IDA and IMA courses, the basic knowledge of differential and integral calculus and solution methods of linear differential equations with constant coefficients is demanded. Especially, the student should be able to calculate derivative (including partial derivatives) and integral of elementary functions.
Learning outcomes and competencies:
Students completing this course should be able to:
• Calculate local, constrained and absolute extrema of functions of several variables.
• calculate multiple integrals o, elementary regions,
• transform integrals into polar, cylindrical and sferical coordinates,
• calculate line and surface integrals in scalar-valued and vector-valued fields,
• apply integral theorems in the field theory.
Syllabus of lectures:

1. Differential calculus of functions of several variables, limit, continuity, derivative
2. Vector analysis
3. Local extrema
4. Constrained and absolute extrema
5. Multiple integral
6. Transformation of multiple integrals
7. Applications of multiple integrals
8. Line integral in a scalar-valued field.
9. Line integral in a vector-valued field.
10. Potential, Green's theorem
11. Surface integral in a scalar-valued field.
12. Surface integral in a vector-valued field.
13. Integral theorems.
Fundamental literature:

• ŠMARDA, Z., RUŽIČKOVÁ, I.: Vybrané partie z matematiky, el. texty na PC síti.
• KRUPKOVÁ, V.: Diferenciální a integrální počet funkce více proměnných,skripta VUT Brno, VUTIUM 1999, 123 p.
• BRABEC, J., HRUZA, B.: Matematická analýza II, SNTL/ALFA, Praha 1986, 579 p.
• GARNER, L.E.: Calculus and Analytical Geometry. Brigham Young University, Dellen publishing Company, San Francisco,1988, ISBN 0-02-340590-2.
Controlled instruction:
Teaching methods include lectures and demonstration practical classes. Course is taking advantage of exercise bank and maplets on UMAT server.
The content and forms of instruction in the evaluated course are specified by a regulation issued by the lecturer responsible for the course and updated for every academic year.
Progress assessment:
The student's work during the semestr (written tests and homework) is assessed by maximum 30 points.
Written examination is evaluated by maximum 70 points. It consist of seven tasks (one from extrema of functions of several variables (10 points), two from multiple integrals (2 X 10 points), two from line integrals (2 x 10 points) and two from surface integrals (2 x 10 points)).