Universität Wien FIND

Get vaccinated to work and study safely together in autumn.

To enable a smooth and safe start into the semester for all members of the University of Vienna, you can get vaccinated without prior appointment on the Campus of the University of Vienna from Saturday, 18 September, until Monday, 20 September. More information: https://www.univie.ac.at/en/about-us/further-information/coronavirus/.

Warning! The directory is not yet complete and will be amended until the beginning of the term.

270050 UE Laboratory course: Mathematics for Biol.Chemists (2020S)

2.00 ECTS (2.00 SWS), SPL 27 - Chemie
Continuous assessment of course work

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

max. 15 participants
Language: German

Lecturers

Classes (iCal) - next class is marked with N

Mandatory initial meeting on 04.03.2020 at 08:15 Hörsaal 2 (before first lecture)!

Estimated dates, changes are eventually possible

Thursday 05.03. 13:00 - 14:00 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 19.03. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 26.03. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 02.04. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 23.04. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 30.04. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 07.05. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 14.05. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 28.05. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 04.06. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 18.06. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP
Thursday 25.06. 12:00 - 13:30 Kleiner Hörsaal 3 Chemie Boltzmanngasse 1 HP

Information

Aims, contents and method of the course

Practical work based on the contence of the accompanying lecture.

Assessment and permitted materials

Continous evalution of student's participation and final written exam.

Minimum requirements and assessment criteria

Achieving the ability to practically apply the methods presented in the lecture.

Examination topics

Differential calculus including implicit derivatives, integral calculus, curve integrals, multiple integrals, differential equations (first and second order, Legendre and Hermite polynomials), linear algebra, Taylor series, Fourier series, Laplace transform, Fourier transform

Reading list


Association in the course directory

IMA I-1

Last modified: Mo 07.09.2020 15:21