Monographic Lecture IV
Some basic information about the module
Cycle of education: 2019/2020
The name of the faculty organization unit: The faculty Mathematics and Applied Physics
The name of the field of study: Mathematics
The area of study: sciences
The profile of studing:
The level of study: first degree study
Type of study: full time
discipline specialities : Applications of Mathematics in Economics
The degree after graduating from university: bachelor's degree
The name of the module department : Departament of Topology and Algebra
The code of the module: 12449
The module status: mandatory for teaching programme with the posibility of choice Applications of Mathematics in Economics
The position in the studies teaching programme: sem: 6 / W30 C15 / 3 ECTS / Z
The language of the lecture: Polish
The name of the coordinator: Paweł Witowicz, PhD
semester 6: Prof. Dov Bronisław Wajnryb, DSc, PhD
The aim of studying and bibliography
The main aim of study: Presentation of chosen mathematical topic to the students.
The general information about the module: The particular topic is chosen by the students at the end the fifth term,
others: Literatura wykorzystywana podczas zajęć zostanie podana po wybraniu tematyki zajęć.
Bibliography required to complete the module
Basic requirements in category knowledge/skills/social competences
Formal requirements: The student satisfies the formal requirements set out in the study regulations
Basic requirements in category knowledge:
Basic requirements in category skills:
Basic requirements in category social competences:
Module outcomes
| MEK | The student who completed the module | Types of classes / teaching methods leading to achieving a given outcome of teaching | Methods of verifying every mentioned outcome of teaching | Relationships with KEK | Relationships with PRK |
|---|---|---|---|---|---|
| 01 | knows basic theorems of chosen branch of mathematics | lecture, solving classes | observation of work |
K_W02++ K_W04+++ K_K01+ |
P6S_KK P6S_WG P6S_WK |
| 02 | knows basic examples concerning the subject | lecure, solving classes, problem classes | observation of work |
K_W03+ K_W05+++ K_K01+ |
P6S_KK P6S_WG P6S_WK |
| 03 | can present issues of presented subject orally on in writing | lectue, sovig classes, problem classes | writing test, oral test, observation of work, presentation, projects |
K_W01+ K_W06++ K_U01+++ K_K01+ |
P6S_KK P6S_UK P6S_WG P6S_WK |
Attention: Depending on the epidemic situation, verification of the achieved learning outcomes specified in the study program, in particular credits and examinations at the end of specific classes, can be implemented remotely (real-time meetings).
The syllabus of the module
| Sem. | TK | The content | realized in | MEK |
|---|---|---|---|---|
| 6 | TK01 | wykład, ćwiczenia | MEK01 MEK02 MEK03 |
The student's effort
| The type of classes | The work before classes | The participation in classes | The work after classes |
|---|---|---|---|
| Lecture (sem. 6) | contact hours:
30.00 hours/sem. |
complementing/reading through notes:
6.00 hours/sem. |
|
| Class (sem. 6) | The preparation for a Class:
10.00 hours/sem. |
contact hours:
15.00 hours/sem. |
Finishing/Studying tasks:
4.00 hours/sem. |
| Advice (sem. 6) | The participation in Advice:
2.00 hours/sem. |
||
| Credit (sem. 6) | The preparation for a Credit:
10.00 hours/sem. |
The written credit:
2.00 hours/sem. |
The way of giving the component module grades and the final grade
| The type of classes | The way of giving the final grade |
|---|---|
| Lecture | Attendance at the lectures. Test. |
| Class | A mark is given on the basis of problems solved and projects presented. |
| The final grade | A mark corresponds to results of the test covering lecture content and a grade obtained from classes. |
Sample problems
Required during the exam/when receiving the credit
(-)
Realized during classes/laboratories/projects
(-)
Others
(-)
Can a student use any teaching aids during the exam/when receiving the credit : no
The contents of the module are associated with the research profile: yes
| 1 | P. Witowicz | Parallel Locally Strictly Convex Surfaces in Four-Dimensional Affine Space Contained in Hyperquadrics | 2021 |