050101 VO Mathematics for Computer Science Ed. 1 (2009W)
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Details
Language: German
Examination dates
Thursday
13.01.2011
Monday
28.02.2011
Wednesday
30.03.2011
Friday
22.04.2011
Wednesday
25.05.2011
Wednesday
06.06.2012
Monday
15.10.2012
Friday
21.12.2012
Monday
24.06.2013
Wednesday
13.11.2013
Lecturers
Classes (iCal) - next class is marked with N
Monday
05.10.
10:00 - 11:15
Seminarraum
Tuesday
06.10.
10:00 - 11:00
Seminarraum
Monday
12.10.
10:00 - 11:15
Seminarraum
Tuesday
13.10.
10:00 - 11:00
Seminarraum
Monday
19.10.
10:00 - 11:15
Seminarraum
Tuesday
20.10.
10:00 - 11:00
Seminarraum
Tuesday
27.10.
10:00 - 11:00
Seminarraum
Tuesday
03.11.
10:00 - 11:00
Seminarraum
Monday
09.11.
10:00 - 11:15
Seminarraum
Tuesday
10.11.
10:00 - 11:00
Seminarraum
Monday
16.11.
10:00 - 11:15
Seminarraum
Tuesday
17.11.
10:00 - 11:00
Seminarraum
Monday
23.11.
10:00 - 11:15
Seminarraum
Tuesday
24.11.
10:00 - 11:00
Seminarraum
Monday
30.11.
10:00 - 11:15
Seminarraum
Tuesday
01.12.
10:00 - 11:00
Seminarraum
Monday
07.12.
10:00 - 11:15
Seminarraum
Monday
14.12.
10:00 - 11:15
Seminarraum
Tuesday
15.12.
10:00 - 11:00
Seminarraum
Monday
11.01.
10:00 - 11:15
Seminarraum
Tuesday
12.01.
10:00 - 11:00
Seminarraum
Monday
18.01.
10:00 - 11:15
Seminarraum
Tuesday
19.01.
10:00 - 11:00
Seminarraum
Monday
25.01.
10:00 - 11:15
Seminarraum
Tuesday
26.01.
10:00 - 11:00
Seminarraum
Information
Aims, contents and method of the course
Assessment and permitted materials
Written exam.
Minimum requirements and assessment criteria
The participants of this course shall get acquainted
with standard mathematical terminology which is necessary
for computer scientists.
with standard mathematical terminology which is necessary
for computer scientists.
Examination topics
Several fundamental concepts of mathematics
shall be explained and discussed (with several examples).
shall be explained and discussed (with several examples).
Reading list
Teschl,G./Teschl,S.(2006): Mathematik für Informatiker. Springer Verlag.
Association in the course directory
Last modified: Mo 07.09.2020 15:29
number theory, relations and functions, sequences and series, combinatorics,
recursions, vector spaces, linear mappings, linear equations,
scalar product and orthogonality, eigenvalues and eigenfunctions.