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Course detail

Mathematical Analysis I

Course unit code: FSI-SA1
Academic year: 2016/2017
Type of course unit: compulsory
Level of course unit: Bachelor's (1st cycle)
Year of study: 1
Semester: winter
Number of ECTS credits:
Learning outcomes of the course unit:
Use of calculus methods in physical and technical disciplines.
Mode of delivery:
90 % face-to-face, 10 % distance learning
Secondary school mathematics knowledge.
Not applicable.
Recommended optional programme components:
Not applicable.
Course contents (annotation):
A subject area main content consists in the differential and integral calculus of a one variable function. The acquired knowledge is a starting point for further study of mathematical analysis and related mathematical disciplines, and it serves as a theoretical background for study of physical and technical disciplines as well.
Recommended or required reading:
V. Jarník: Diferenciální počet I, Academia, 1984. (CS)
V. Novák: Diferenciální počet v R, 2. vyd., Masarykova univerzita, 1997. (CS)
V. Jarník: Integrální počet I, Academia, 1984. (CS)
V. Novák: Integrální počet v R, 3. vyd., Masarykova univerzita, 2001. (CS)
G. Strang: Calculus, 2nd ed., Wellesley–Cambridge Press, 2010 (EN)
J. Škrášek, Z. Tichý: Základy aplikované matematiky I a II, SNTL Praha, 1989. (CS)
Planned learning activities and teaching methods:
The course is lectured through lessons supported by exercises at seminars. The content of lessons is focused on a theoretical background of the subject. The exercises have a practical/computational character.
Assesment methods and criteria linked to learning outcomes:
Course-unit credit: active attendance at the seminars, successful passing through two written tests (i.e., from each of them, it is necessary to reach at least one half of all possible points).

Exam: will have both a written part as well as an oral part, a condition for admission to the oral part is receiving at least one half of all possible points from the written part).
Language of instruction:
Work placements:
Not applicable.
Course curriculum:
Not applicable.
The goal is to acquire knowledge of fundamentals of differential and integral calculus of one real variable functions. Beside theoretical background, students should be able to apply the calculus tools various technical problems.
Specification of controlled education, way of implementation and compensation for absences:
Seminars: obligatory.
Lectures: recommended.

Type of course unit:

Lecture: 52 hours, optionally
Teacher / Lecturer: doc. Ing. Luděk Nechvátal, Ph.D.
Syllabus: 1. Introduction to mathematical logic, logical essentials of mathematics;
2. Sets, relations between sets;
3. Mappings, real numbers;
4. Real sequences;
5. Function of a real variable, elementary functions;
6. Limit and continuity of a function;
7. Derivative and differential of a function, higher order derivatives and differentials;
8. l'Hospital rule, Taylor polynomial;
9. Curve sketching;
10. Indefinite integral, basic types of integrals;
11. Methods of computing indefinite integrals;
12. Riemann integral, Newton-Leibniz formula;
13. Improper integrals, applications of Riemann integrals.
seminars: 33 hours, compulsory
Teacher / Lecturer: Mgr. Aleš Návrat, Ph.D.
doc. Ing. Luděk Nechvátal, Ph.D.
Syllabus: Seminars are related to the lectures in the previous week.
seminars in computer labs: 6 hours, compulsory
Teacher / Lecturer: doc. Ing. Luděk Nechvátal, Ph.D.
Syllabus: This seminar is supposed to be computer assisted.

The study programmes with the given course