260224 VO Analysis for Physicists I (2021W)

REMOTE

Moodle

Registration/Deregistration

Note: The time of your registration within the registration period has no effect on the allocation of places (no first come, first served).

Details

Language: German

Examination dates

Thursday 27.01.2022 12:30 - 14:00 Lise-Meitner-Hörsaal, Boltzmanngasse 5, 1. Stk., 1090 Wien
Thursday 03.03.2022 12:30 - 14:00 Lise-Meitner-Hörsaal, Boltzmanngasse 5, 1. Stk., 1090 Wien
Friday 08.04.2022 13:15 - 14:45 Lise-Meitner-Hörsaal, Boltzmanngasse 5, 1. Stk., 1090 Wien
Friday 01.07.2022 12:30 - 14:00 Lise-Meitner-Hörsaal, Boltzmanngasse 5, 1. Stk., 1090 Wien

Lecturers

Günther Hörmann
Ralf Stoiber (Student Tutor)

Classes (iCal) - next class is marked with N

The digital lectures will be delivered synchronously via Moodle (with recording).

Tuesday 05.10. 10:45 - 12:15 Digital
Thursday 07.10. 10:45 - 12:15 Digital
Tuesday 12.10. 10:45 - 12:15 Digital
Thursday 14.10. 10:45 - 12:15 Digital
Tuesday 19.10. 10:45 - 12:15 Digital
Thursday 21.10. 10:45 - 12:15 Digital
Thursday 28.10. 10:45 - 12:15 Digital
Thursday 04.11. 10:45 - 12:15 Digital
Tuesday 09.11. 10:45 - 12:15 Digital
Thursday 11.11. 10:45 - 12:15 Digital
Tuesday 16.11. 10:45 - 12:15 Digital
Thursday 18.11. 10:45 - 12:15 Digital
Tuesday 23.11. 10:45 - 12:15 Digital
Thursday 25.11. 10:45 - 12:15 Digital
Tuesday 30.11. 10:45 - 12:15 Digital
Thursday 02.12. 10:45 - 12:15 Digital
Tuesday 07.12. 10:45 - 12:15 Digital
Thursday 09.12. 10:45 - 12:15 Digital
Tuesday 14.12. 10:45 - 12:15 Digital
Thursday 16.12. 10:45 - 12:15 Digital
Tuesday 11.01. 10:45 - 12:15 Digital
Thursday 13.01. 10:45 - 12:15 Digital
Tuesday 18.01. 10:45 - 12:15 Digital
Thursday 20.01. 10:45 - 12:15 Digital

Information

Aims, contents and method of the course

The course topics are: Foundations (Sets, numbers, and maps), sequences, elementary functions, infinite sums, continuity, differentiability, Taylor series and power series, integrals, Fourier series.

The course content is based on material from the books [FK], with minor additions along the way. In detail we will discuss [FK], Band 1, §§ 1-3, §4: 1-3 und 9.1-3, §5: 8-10, §§ 7-9, §10: 1-3, §§ 11-12; and [FK], Band 2, §6: 2.

This lecture course is supported by weekly companion tutorial sessions (with tutor Ralf Stoiber), where students can discuss questions about the course content in an informal way.

Understanding the key notions and working knowledge of new methods is often fostered by consulting additional sources, where the same material is viewed under a somewhat different angle and more illustrations or explanations are given. A very recommendable "reading book" for additional independent study is [A1] and [A2] provides plenty of exercises along with solution hints and details. Alternatively, a concise and slightly more theoretical treatment is [KW]

Assessment and permitted materials

Written exam with multiple choice questions (90 minutes).

Minimum requirements and assessment criteria

To pass the exam at least half of the grading points overall have to be achieved.

Examination topics

All content discussed in the lectures.

Reading list

All books in this list are available for students via the university library http://bibliothek.univie.ac.at/ also as ebook.

[A1] T. Arens, F. Hettlich, Ch. Karpfinger, U. Kockelkorn, K. Lichtenegger und H. Stachel: Mathematik; Springer Spektrum (4. Auflage 2018).

[A2] T. Arens, F. Hettlich, Ch. Karpfinger, U. Kockelkorn, K. Lichtenegger und H. Stachel: Arbeitsbuch Mathematik: Aufgaben, Hinweise, Lösungen und Lösungswege; Springer Spektrum (4. Auflage 2018).

[FK] H. Fischer und H. Kaul: Mathematik für Physiker; Springer Spektrum, Band 1 (8. Auflage 2018), Band 2 (4. Auflage 2014).

[KW] H. Kerner und W. von Wahl: Mathematik für Physiker, Springer Spektrum (3. Auflage 2013).

Association in the course directory

ANA I, P 2

Last modified: Tu 14.11.2023 00:23