Topology
Informacje ogólne
Kod przedmiotu: | 360-MS1-2TOPa |
Kod Erasmus / ISCED: |
11.102
|
Nazwa przedmiotu: | Topology |
Jednostka: | Wydział Matematyki |
Grupy: |
Erasmus+ sem. zimowy |
Punkty ECTS i inne: |
4.00
|
Język prowadzenia: | angielski |
Rodzaj przedmiotu: | obowiązkowe |
Wymagania (lista przedmiotów): | Wstęp do matematyki 360-MS1-1WDM |
Założenia (lista przedmiotów): | Analiza matematyczna I 0600-FS1-1AM1 |
Założenia (opisowo): | The student has basic knowledge in the field of Set Theory and Mathematical Analysis. |
Skrócony opis: |
Field of science: natural science; discipline: mathematics Course objectives: Getting to know the basic notions and methods of general topology and certain chosen topics concerning metric spaces; acquiring an ability to solve the problems and use of the relevant literature without further assistance. |
Pełny opis: |
Course profile: academic Form of study: stationary Course type: obligatory Field of science: natural science; discipline: mathematics Year: 2, semester: 3 Prerequisities: Mathematical Analysis II lecture 30 h. exercise class 30 h. Verification methods: lectures, exercises, consultations, studying literature, home works, discussions in groups. ECTS credits: 4 Balance of student workload: attending lectures15x2h = 30h attending exercise classes 7x4h + 2h(preliminary teaching) = 30h preparation for classes 7x3h = 21h completing notes after exercises and lectures 7x2h = 14h consultations 5x2h = 10h the final examination: preparation.and take 15h + 4h = 19h Quantitative description Direct interaction with the teacher: 74 h., 2 ECTS Practical exercises: 75 h., 3 ECTS |
Literatura: |
1. James R. Munkres "Topology", Pearson; Second Edition 2014. 2. Bert Mendelson "Introduction to Topology" Dover Publications; Third Edition 1990. 3. M.A. Armstrong "Basic Topology" Springer; Binding Damaged and Torn Edition 1997. 4. Lynn Arthur Steen, J. Arthur Seebach Jr. "Counterexamples in Topology" Dover Publications; New edition 1995. |
Efekty uczenia się: |
Student knows the basic concepts and methods of general topology extended with selected problems of the theory of metric spaces, explains the relationships between the learned topological concepts, applies definitions and basic theorems to study the properties of metric and topological spaces and the mappings between them - KA6_WG03, KA6_WG04, KA6_WG05, KA6_UW13, KA6_UW14, KA6_UU02 . Student acquires methodological foundations for practicing and learning mathematics: is able to comprehensively, in speech and in writing, present correct mathematical reasoning, formulate theorems and definitions from general topology, correctly use propositional calculus and quantifiers as well as elements of set theory to express notions and facts of general topology - KA6_WG01, KA6_WG02, KA6_UU01. Student understands that modern technologies are the result of scientific discoveries, including in topology, understands the need to improve their skills and qualifications, carefully sets the priorities and sequence of their activities - KP6_UU1, KP6_KK1, KA6_WK03, KA6_KR01. |
Metody i kryteria oceniania: |
Credit with a grade, which is determined on the basis of active participation in classes and the results of tests. Passing exercises on the basis of tests checking the ability to solve tasks and activity during the exercises. |
Zajęcia w cyklu "Rok akademicki 2022/23" (zakończony)
Okres: | 2022-10-01 - 2023-06-30 |
Przejdź do planu
PN WT ŚR CZ PT |
Typ zajęć: |
Ćwiczenia, 30 godzin
Wykład, 30 godzin
|
|
Koordynatorzy: | Tomasz Czyżycki, Aneta Sliżewska | |
Prowadzący grup: | (brak danych) | |
Lista studentów: | (nie masz dostępu) | |
Zaliczenie: |
Przedmiot -
Egzamin
Ćwiczenia - Zaliczenie na ocenę |
Zajęcia w cyklu "Rok akademicki 2023/24" (w trakcie)
Okres: | 2023-10-01 - 2024-06-30 |
Przejdź do planu
PN WYK
WT CW
ŚR CZ PT |
Typ zajęć: |
Ćwiczenia, 30 godzin
Wykład, 30 godzin
|
|
Koordynatorzy: | Tomasz Czyżycki, Andrew McKee, Aneta Sliżewska | |
Prowadzący grup: | Andrew McKee | |
Lista studentów: | (nie masz dostępu) | |
Zaliczenie: |
Przedmiot -
Egzamin
Ćwiczenia - Zaliczenie na ocenę |
Właścicielem praw autorskich jest Uniwersytet w Białymstoku.