Mathematical Methods of Physics 1
Module PH9110
Basic Information
PH9110 is a semester module in German language at Bachelor’s level which is offered in winter semester.
This Module is included in the following catalogues within the study programs in physics.
 Physics Modules for Students of Education
If not stated otherwise for export to a nonphysics program the student workload is given in the following table.
Total workload  Contact hours  Credits (ECTS) 

180 h  75 h  6 CP 
Responsible coordinator of the module PH9110 is Dietrich Einzel.
Content, Learning Outcome and Preconditions
Content
Differential and integral calculus for functions with one variable: Differentiation rules, Taylor expansion, BernoulliL’Hospital rule, curve sketching, numerical differentiation, integration rules, numerical integration, elliptical integration.
Differential and integral calculus for functions with multiple variables: Recapitulation of vector calculus, scalar fields, vector fields, partial differentiation, gradient, total differential, directional derivative, expanded chain rule, Taylor expansion, relative extreme values of functions with multiple variables, curves in Rⁿ, line integral, path independency and antiderivative, double and surface integrals, trifold and volume integrals, fundamentals of vector analysis (gradient, divergence, rotation).
Learning Outcome
After the successful participation in the module the student is able to:
 master and apply the most important rules of differential calculus
 know and apply the most important rules of integral calculus
 know the possibilities of numerical integration
 master the fundamentals of vector calculus
 apply differentiation and integration to functions with multiple variables
 describe the fundamentals of vector analysis.
Preconditions
none
Courses, Learning and Teaching Methods and Literature
Courses and Schedule
Type  SWS  Title  Lecturer(s)  Dates  Links 

VO  3  Mathematical Methods of Physics 1  Einzel, D. 
Mon, 14:00–16:00, WMI 143 

UE  2  Tutorial to Mathematical Methods of Physics 1  Einzel, D.  dates in groups 
Learning and Teaching Methods
lecture: teachercentred teaching
Exercise: The exercise is held in small groups. In the weekly session exercises are presented by the students and the tutor. They also provide room for discussions and additional explanations to the lectures.
Media
writing on blackboard, presentation
Literature
Mathematische Hilfsmittel der Physik, W. Kuhn, H. Stöckel und H. Glaßl, Johann Ambrosius Barth Verlag, Heidelberg, Leipzig, 1995
Mathematische Methoden in der Physik, C. B. Lang, N. Pucker, Spektrum Akademischer Verlag, Heidelberg, Berlin, 1998
Der mathematische Werkzeugkasten – Anwendungen in der Natur und Technik, G. Glaeser, Spektrum Akademischer Verlag, Heidelberg, Berlin, 2004
Module Exam
Description of exams and course work
There will be a written exam of 90 minutes duration. Therein the achievement of the competencies given in section learning outcome is tested exemplarily at least to the given cognition level using calculation problems and comprehension questions.
For example an assignment in the exam might be:
 Differentiation and Integration of a given function f(x).
 Taylor expansion and calculation of the integral to a given function f(x), integration using Taylor expansion.
 Calculation of gradient and total differential of a given skalar field Φ(x,y,z).
 Give a criterion for the path independence of line integrals over a given vektor field V(x,y,z).
 Calculation of center of mass for curved lines, surfaces, and 3D bodies (e.g. a line segment, a segment of the surface of a sphere, a segment of a solid sphere).
Participation in the exercise classes is strongly recommended since the exercises prepare for the problems of the exam and rehearse the specific competencies.
Current exam dates
Currently TUMonline lists the following exam dates. In addition to the general information above please refer to the current information given during the course.
Title  

Time  Location  Info  Registration 
Exam to Mathematical Methods of Physics 1  
Fri, 20210319, 9:30 till 11:00  Prüfungsort: Seminarraum 143 WaltherMeißnerInstitut  till 20210312 