280318 UE PM-Math-4 Exercises in Mathematical Methods for Meteorologists I (PI) (2016S)
Continuous assessment of course work
Labels
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).
- Registration is open from We 10.02.2016 00:00 to We 24.02.2016 23:59
- Registration is open from Tu 01.03.2016 00:00 to Th 17.03.2016 00:00
- Deregistration possible until Th 17.03.2016 00:00
Details
max. 30 participants
Language: English
Lecturers
Classes (iCal) - next class is marked with N
In principle, the teaching dates will last 90 minutes and will be held on:
07.03.2016, 14.03.2016, 04.04.2016, 11.04.2016, 18.04.2016, 25.04.2016, 02.05.2016, 09.05.2016, 23.05.2016, 30.05.2016, 06.06.2016, 13.06.2016, 20.06.2016, 27.06.2016.
Monday
07.03.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
14.03.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
04.04.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
11.04.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
18.04.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
25.04.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
02.05.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
09.05.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
23.05.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
30.05.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
06.06.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
13.06.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
20.06.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Monday
27.06.
14:00 - 15:30
Seminarraum Geochemie 2C193 1.OG UZA II
Information
Aims, contents and method of the course
Identify different types of Differential Equations (DE), like Ordinary (ODE), as well as understand the usefulness of solving them in order to interpret properly a specific and real case within the Meteorology field. Basic knowledge of the Fourier Series and Fourier Integrals as well as of the Elementary Theory of Distributions and Method of Green Functions. With respect to Complex Analysis, knowledge of Analytical functions and of the Cauchy Integral in order to calculate properly the Residue with its respective Theorem.
Assessment and permitted materials
Tests x2 (60%),
Homework exercises (20%),
Participation in Blackboard and Discussions (20%).
There will be no allowed material for the execution of the Tests, that is, they will be fully feasible without any additional help.
Homework exercises (20%),
Participation in Blackboard and Discussions (20%).
There will be no allowed material for the execution of the Tests, that is, they will be fully feasible without any additional help.
Minimum requirements and assessment criteria
Tests: A 50% of well-solved proposed exercises for each must be reached.
Homework: each week will be given some exercises to be solved and should be presented in the next teaching date.
Blackboard Participation: some students who presented the homework will be called to solve them on the blackboard.
Mandatory Condition: To proceed with the evaluation criteria above mentioned, a minimum presence of 80% must be reached, on the contrary, the final note will not be positive.
Homework: each week will be given some exercises to be solved and should be presented in the next teaching date.
Blackboard Participation: some students who presented the homework will be called to solve them on the blackboard.
Mandatory Condition: To proceed with the evaluation criteria above mentioned, a minimum presence of 80% must be reached, on the contrary, the final note will not be positive.
Examination topics
For the Tests, similar exercises as those done during the teaching will be prepared.
Reading list
The basic knowledge for the execution of the exercises should be obtained from the Skriptum given in the Theory part, as well as with the recommended books for advanced knowledge.
Association in the course directory
Last modified: Sa 02.04.2022 00:25