Mathematical Analysis II
Informacje ogólne
Kod przedmiotu: | 0600-MS1-1AM2#a |
Kod Erasmus / ISCED: |
11.101
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Nazwa przedmiotu: | Mathematical Analysis II |
Jednostka: | Wydział Matematyki i Informatyki |
Grupy: | |
Punkty ECTS i inne: |
(brak)
|
Język prowadzenia: | angielski |
Rodzaj przedmiotu: | obowiązkowe |
Założenia (lista przedmiotów): | Linear Algebra I 0600-MS1-1AL1#a |
Skrócony opis: |
(tylko po angielsku) Course objectives: Knowledge of material related to presented contents: a) understanding introduced notions and theorems b) knowledge of presented proofs c) giving appropriate examples d) solving computational problems |
Pełny opis: |
(tylko po angielsku) Course profile: academic Form of study: stationary Course type: obligatory Academic discipline: Mathematics, field of study in the arts and science: mathematics Year: 1, semester: 2 Prerequisities: Mathematical Analysis I, Linear Algebra I lecture 60 h. exercise class 90 h. Verification methods: lectures, exercises, consultations, studying literature, home works, discussions in groups. ECTS credits: 10 Balance of student workload: attending lectures15x4h = 60h attending exercise classes 15x6h = 90h preparation for classes 7x3h = 21h completing notes after exercises and lectures 7x2h = 14h consultations 5x1h = 5h home works: solving exercises 15x3h = 45h the final examination: preparation.and take 12h + 4h = 16h Quantitative description Direct interaction with the teacher: 159 h., 5 ECTS Practical exercises: 175 h., 6 ECTS |
Efekty uczenia się: |
(tylko po angielsku) Learning outcomes: Understands the notion of Riemann integral of function of one variable and has mastered basic techniques of integration.K_U09, K_U10, K_U13, K_U14, K_W02, K_W04, K_W05, K_W07 Can define all elementary functions and knows their basic properties.K_U09, K_U10, K_U11, K_U12, K_U14, K_W02, K_W04, K_W05 Knows the notion of a sequence of mappings and understands relationships between the notions of pointwise convergence, uniform convergence, and almost uniform convergence.K_U09, K_U10, K_W02, K_W04, K_W05 Knows how to use notions, theorems and methods of differential calculus of functions of one variable to the analysis of function giving rationalizations of correctness of his solutions.K_U12, K_W02, K_W03, K_W04, K_W05, K_W07 |
Metody i kryteria oceniania: |
(tylko po angielsku) The overall form of credit for the course: final exam |
Właścicielem praw autorskich jest Uniwersytet w Białymstoku.