151-0007/03 – Master's Mathematics for Economists (IME)

Gurantor department	Department of Mathematical Methods in Economics	Credits	5
Subject guarantor	doc. Ing. Petr Seďa, Ph.D.	Subject version guarantor	doc. Ing. Petr Seďa, Ph.D.
Study level	undergraduate or graduate	Requirement	Choice-compulsory type B
Year	1	Semester	winter
		Study language	English
Year of introduction	2024/2025	Year of cancellation
Intended for the faculties	EKF	Intended for study types	Follow-up Master

Instruction secured by
Login	Name	Tuitor	Teacher giving lectures
SED02	doc. Ing. Petr Seďa, Ph.D.

Extent of instruction for forms of study
Form of study	Way of compl.	Extent
Full-time	Graded credit	2+2

Subject aims expressed by acquired skills and competences

The main aim of the course is to teach students how to use mathematics effectively and to increase knowledge and understanding of microeconomic and macroeconomic problems. Students will get the following knowledge, skills and abilities: • will be able to use mathematics as a tool for deeper understanding of microeconomics and macroeconomics, • will be able to study economics effectively, • will learn how to apply methods and procedures of mathematical analysis to solve practical economic problems at the microeconomic and macroeconomic level, • will be able to describe solutions of selected economic problems using mathematical tools, check individual steps of given solution, generalize conclusions and evaluate the correctness of results with respect to given conditions.

Teaching methods

Lectures
Tutorials
Other activities

Summary

This course connects the existing knowledge of mathematics and economics obtained at bachelor level of study so that students apply the knowledge of mathematics in the area of microeconomics and macroeconomics. The aim of this course is to enable students to understand the benefits of using mathematics as a very useful tool for understanding objective economic reality using mathematical abstraction. Students should discover connections and relationships by comparing economic phenomena having different content but same formal description. This approach allows students to achieve a deeper knowledge of economics.

Compulsory literature:

CHIANG, Alpha C. and Kevin WAINWRIGHT. Fundamental Methods of Mathematical Economics. McGraw-Hill/Irwin, 2013. ISBN 978-1259097348. MAVRON, Vassilis C. and Timothy N. PHILLIPS. Elements of Mathematics for Finance. Springer, 2023. ISBN 978-3-031-43909-4. PENA-LEVANO, Luis Moises. Schaum's Outline of Calculus for Business, Economics and Finance. McGraw-Hill, 2023. ISBN 978-1264266852.

Recommended literature:

PEMBERTON, Malcom and Nicholas RAU. Mathematics for economists: An introductory textbook. Manchester University Press, 2023. ISBN 978-1526173539. PENA-LEVANO, Luis Moises. Schaum's Outline of Mathematical Methods for Business, Economics and Finance. McGraw-Hill, 2021. ISBN 978-1264266876. SYDSAETER, Knut and Peter HAMMOND. Essential Mathematics for Economic Analysis. Prentice Hall, 2013. ISBN 978-0-273-76068-9.

Way of continuous check of knowledge in the course of semester

Knowledge is controlled through 2 written tests and tasks according to specification of teachers.

E-learning

The course is supported by on-line LMS (Learning Management System).

Other requirements

Not required by teachers.

Prerequisities

Subject has no prerequisities.

Co-requisities

Subject has no co-requisities.

Subject syllabus:

1. Introduction. Mathematical modelling in economics. Classification of economic and mathematical models. Functional dependency. 2. Approximation of real functions. Interpolation by algebraic polynomials. Lagrange interpolation method. Approximation by the least squares method. 3. Differential calculus of functions of one variable in economic applications. Economic functions and their properties, the slope of a function. Total, average and marginal variables in economics, elasticity of a function. 4. Differential calculus of multivariable functions in economic applications I. The methods of optimizing the multivariable functions in economics - the substitution method, the method of Lagrange multipliers, the method of comparison of marginal rates of substitutions. 5. Differential calculus of multivariable functions in economic applications II. Constrained extrema of multivariable functions in economics. Model with multiply inputs. Evaluation of efficiency. 6. Differential calculus of multivariable functions in economic applications III. The methods of optimization in imperfect models markets. 7. Integral calculus in economics. Application of definite and indefinite integrals in economics. Flow quantities in economics and their accumulation over time. 8. Functional dependence as a tool for modelling static economic phenomena. Models of static equilibrium. Models of comparative statics in economics. 9. Mathematical basis of discrete linear dynamic models in economics I. Difference equation – a mathematical tool for modelling the discrete macroeconomic dynamic processes in economics. 10. Mathematical basis of continuous linear dynamic models in economics I. Analogy of discrete and continuous models. Differential equations - a mathematical tool for modelling the continuous macroeconomic dynamic processes in economics. 11. Mathematical basis of discrete linear dynamic models in economics II. Difference equations - mathematical tool for modelling the discrete microeconomic dynamic processes in economics. 12. Mathematical basis of continuous linear dynamic models in economics II. Differential equations – a mathematical tool for modelling the continuous microeconomic dynamic processes in economics.

Conditions for subject completion

Full-time form (validity from: 2024/2025 Winter semester)

Task name	Type of task	Max. number of points (act. for subtasks)	Min. number of points	Max. počet pokusů
Graded credit	Graded credit	100 (100)	51	3
Test 1	Written test	50	26	2
Test 2	Written test	50	26	2

Mandatory attendence participation: Attendance at lectures is recommended. Attendance at seminars is at least 80%.

Show history

Conditions for subject completion and attendance at the exercises within ISP: Participation in lectures and seminars is recommended. It is necessary to pass 2 written tests, just like in the case of students without ISP.

Show history

Occurrence in study plans

Academic year	Programme	Branch/spec.	Form	Study language	Tut. centre	Year	Type of duty
2024/2025	(N0412A050005) Finance		P	English	Ostrava	1	Compulsory	study plan
2024/2025	(N0413A050014) Economics and Management	(S03) Economics and Law in Business	P	Czech	Ostrava	1	Compulsory	study plan
2024/2025	(N0413A050014) Economics and Management	(S01) Business Administration	P	Czech	Ostrava	1	Compulsory	study plan
2024/2025	(N0413A050014) Economics and Management	(S02) Management	P	Czech	Ostrava	1	Compulsory	study plan
2024/2025	(N0414A050002) Marketing and Business		P	English	Ostrava	1	Choice-compulsory type B	study plan
2024/2025	(N0311A050013) Applied Economics	(S02) International Economic Relations	P	English	Ostrava	1	Compulsory	study plan
2024/2025	(N0311A050013) Applied Economics	(S01) Economic Development	P	English	Ostrava	2	Compulsory	study plan

Occurrence in special blocks

Block name	Academic year	Form of study	Study language	Year	W	S	Type of block	Block owner

Assessment of instruction

Předmět neobsahuje žádné hodnocení.