PřF:F2422 Fundamental mathematical metho - Course Information

F2422 Fundamental mathematical methods in physics 2

Extent and Intensity

3/0. 3 credit(s) (plus 2 credits for an exam). Type of Completion: zk (examination).

Teacher(s)

Mgr. Lenka Czudková, Ph.D. (lecturer)

Guaranteed by

prof. RNDr. Michal Lenc, Ph.D.
Department of Theoretical Physics and Astrophysics – Physics Section – Faculty of Science
Contact Person: Mgr. Lenka Czudková, Ph.D.
Supplier department: Department of Theoretical Physics and Astrophysics – Physics Section – Faculty of Science

Timetable

Thu 15:00–17:50 F1 6/1014

Prerequisites

Differential and integral calculus of functions of one variable, theoretical background and practical calculus.

Course Enrolment Limitations

The course is also offered to the students of the fields other than those the course is directly associated with.

fields of study / plans the course is directly associated with

• Physics (programme PřF, B-FY)

Course objectives

The course gives the basic review of fundamental mathematical procedures used in physical theories, mainly those of mathematical analysis (differential and integral calculus of the many variables functions, vector analysis, surface integrals, integral theorems) and algebra (basic tensor calculus). The understanding of fundamental concepts, calculus, and physical applications are emphasized. The main objectives can be summarized as follows: to get prompt review of basic terms of mathematical analysis and algebra. Routine numerical skills necessary for bachelor course of general physics are obtained in seminar F2423.

Syllabus

• 1. Double integral, methods of calculation (Fubini theorem, transformation of coordinates), physical and geometric applications (mass, centre of mass, moment of inertia of a surface).
• 2. Triple integral, methods of calculation (Fubini theorem, transformation of coordinates), physical and geometric applications (mass, centre of mass, moment of inertia of a body).
• 3. Surfaces in threedimensional euclidean space: parametrizations, cartesian equations.
• 4. Surface integral of the first type, physical characteristics of bodies (mass, center of mass, tensor of inertia).
• 5. Surface integral of the second type, physical applications (flow of a vector field).
• 6. Calculus of surface integrals.
• 7. Integral theorems.
• 8. Physical applications of integrals and integral theorems: Integral and differential form of Maxwell equations.
• 9. Applications of integral theorems in fluid mechanics.
• 10. Series of functions: Taylor series, physical applications (estimations).
• 11. Series of functions: Fourier series, applications (Fourier analysis of a signal).
• 12. Elements of tensor algebra.

Literature

required literature
• MUSILOVÁ, Jana and Pavla MUSILOVÁ. Matematika II pro porozumění i praxi (Mathematics II for understanding and praxis). první. Brno: VUTIUM (Vysoké učení technické v Brně), 2012, 697 pp. ISBN 978-80-214-4071-5. info

recommended literature
• KVASNICA, Jozef. Matematický aparát fyziky. Vyd. 2., opr. Praha: Academia, 1997, 383 s. ISBN 8020000887. info
• MUSILOVÁ, Jana and Pavla MUSILOVÁ. Matematika pro porozumění i praxi I (Mathematics for understanding and praxis I). Vydání druhé, doplněné. Brno: VUTIUM, VUT Brno, 2009, 339 pp. Vysokoškolské učebnice. ISBN 978-80-214-3631-2. info

Teaching methods

Lectures: theoretical explanation with practical examples.

Assessment methods

Oral examination. During individual discussion student demonstrate his theoretical knowledge of the topics of this course, and the ability do apply them to the concrete practical mathematics and physical situations.

Language of instruction

Czech

Further Comments

The course is taught annually.

• Enrolment Statistics (Spring 2015, recent)
  
• Permalink: https://is.muni.cz/course/sci/spring2015/F2422