Matematyka - przedmiot oferowany w języku angielskim
Informacje ogólne
Kod przedmiotu: | 330-ES1-1MAT#E |
Kod Erasmus / ISCED: |
11.101
|
Nazwa przedmiotu: | Matematyka - przedmiot oferowany w języku angielskim |
Jednostka: | Wydział Ekonomii i Finansów |
Grupy: | |
Punkty ECTS i inne: |
6.00
|
Język prowadzenia: | angielski |
Rodzaj przedmiotu: | obowiązkowe |
Tryb prowadzenia przedmiotu: | mieszany: w sali i zdalnie |
Skrócony opis: |
(tylko po angielsku) The aim of the course is to present at an advanced level selected problems from mathematical analysis in the field of functions of one and two variables and linear algebra in terms of vectors, matrices, and systems of linear equations, as well as the training of creative and logical thinking, precise expression of thoughts, formulation and problem solving with the use of mathematical tools. |
Pełny opis: |
(tylko po angielsku) Educational profile: general academic Form of study: full-time Course type: basic subjects Field and discipline of science: exact and natural sciences, mathematics Year/semester: 1 year/1 semester Prerequisites: knowledge of mathematics at the level of secondary school Number of teachingc hours: 30 hours of lectures, 30 hours of exercises Teaching methods: Lectures using multimedia presentations and engaging students to actively participate in discussions during the lecture. Exercises - problem solving, group discussion, group work, individual work. ESTS points: 6 Overall student workload: participation in lectures - 30 hours participation in exercises - 30 hours participation in consultations hours - 15 hours preparation for lectures - 15 hours preparation for exercises - 40 hours preparation for the exam and participation in the exam - 20 hours Total: 150 hours Quantitative indicators Student workload related to the course: requiring direct teacher participation: 77/3,1 of a practical nature: 85/3,4 |
Literatura: |
(tylko po angielsku) 1. Anholcer M., Mathematics in economics and management : examples and exercises, Wydawnictwo Uniwersytetu Ekonomicznego w Poznaniu, Poznań 2015. 2. Hoy M., Livernois J. , McKenna C. , Rees R. , Stengos T. , Mathematics for Economics, The MIT Press, Cambridge Massachusetts, London England 2011. 3. Filipowicz M., Mathematics theoretical background and exercises, Wyższa Szkoła Finansów i Zarządzania, Białystok 2005. 4. Simon C. P., Blume L., Mathematics for Economists, W. W. Norton & Company, New York, London 1994. |
Efekty uczenia się: |
(tylko po angielsku) 1MAT_K01 Has advanced knowledge about function of one variable (including differential and integral calculus), knows how to use function one variable in socio-economic analysis, uses correctly basic properties of one variable function, is able to determine basic derivatives and integrals of one variable function KP6_WG5 1MAT_K02 Has advanced knowledge about function of two variables (mainly differential calculus), knows how to use functions of two variables in socio-economic analysis, is able to determine basic partial derivatives and solve elementary optimization problems of two variables function KP6_WG51MAT_K03 Has advanced knowledge about vectors, matrices and systems of linear equations, knows how to use them in socio-economic analysis, is able to perform matrix operations and solve the system of linear equations KP6_WG5 |
Metody i kryteria oceniania: |
(tylko po angielsku) The condition for completing the course is achieving the assumed learning outcomes. Students who have passed the exercises with a grade of at least 3.0 are admitted to the exam. The exam is written and consists of test questions. The basis for passing the exam is to obtain at least 51% of the maximum value of the sum of points (max is 21). The basis for passing the exercises is obtaining at least 51% of the maximum value of the sum of points from two tests and one homework (sum is 50). |
Zajęcia w cyklu "Rok akademicki 2022/23" (zakończony)
Okres: | 2022-10-01 - 2023-06-30 |
Przejdź do planu
PN WT ŚR WYK
CW
CZ PT |
Typ zajęć: |
Ćwiczenia, 30 godzin
Wykład, 30 godzin
|
|
Koordynatorzy: | Iwona Skrodzka | |
Prowadzący grup: | Iwona Skrodzka | |
Lista studentów: | (nie masz dostępu) | |
Zaliczenie: |
Przedmiot -
Egzamin
Ćwiczenia - Zaliczenie na ocenę |
|
Rodzaj przedmiotu: | obowiązkowe |
|
Tryb prowadzenia przedmiotu: | mieszany: w sali i zdalnie |
|
Skrócony opis: |
(tylko po angielsku) The aim of the course is to present at an advanced level selected problems from mathematical analysis in the field of functions of one and two variables and linear algebra in terms of vectors, matrices, and systems of linear equations, as well as the training of creative and logical thinking, precise expression of thoughts, formulation and problem solving with the use of mathematical tools. |
|
Pełny opis: |
(tylko po angielsku) Educational profile: general academic Form of study: full-time Course type: basic subjects Field and discipline of science: exact and natural sciences, mathematics Year/semester: 1 year/1 semester Prerequisites: knowledge of mathematics at the level of secondary school Number of teachingc hours: 30 hours of lectures, 30 hours of exercises Teaching methods: Lectures using multimedia presentations and engaging students to actively participate in discussions during the lecture. Exercises - problem solving, group discussion, group work, individual work. ESTS points: 6 Overall student workload: participation in lectures - 30 hours participation in exercises - 30 hours participation in consultations hours - 15 hours preparation for lectures - 15 hours preparation for exercises - 40 hours preparation for the exam and participation in the exam - 20 hours Total: 150 hours Quantitative indicators Student workload related to the course: requiring direct teacher participation: 77/3,1 of a practical nature: 85/3,4 |
|
Literatura: |
(tylko po angielsku) 1. Anholcer M., Mathematics in economics and management : examples and exercises, Wydawnictwo Uniwersytetu Ekonomicznego w Poznaniu, Poznań 2015. 2. Hoy M., Livernois J. , McKenna C. , Rees R. , Stengos T. , Mathematics for Economics, The MIT Press, Cambridge Massachusetts, London England 2011. 3. Filipowicz M., Mathematics theoretical background and exercises, Wyższa Szkoła Finansów i Zarządzania, Białystok 2005. 4. Simon C. P., Blume L., Mathematics for Economists, W. W. Norton & Company, New York, London 1994. |
Właścicielem praw autorskich jest Uniwersytet w Białymstoku.