Credit requirements:

Passing control tests and achieving at least 55% points or passing a comprehensive written work and achieving at least 55% points.
Awarding credit is a necessary condition for taking the exam.

Exam requirements:

The exam has a written and an oral part, with the focus of the exam being the oral part.

For all tasks in the written part, the calculation must be written down, or the procedure must be described, or the result must be justified verbally. The examples are divided into thematic groups. If the student does not achieve at least 50% of the total number of achievable points in each thematic group of examples, the written part and the entire exam are graded "F" (unsatisfactory) and the student does not proceed to the oral part.
If the student does not achieve at least 55% of the total number of achievable points in the written work, the written part and the entire exam are graded "F" (unsatisfactory) and the student does not proceed to the oral part.
The oral part, focused on knowledge of the theory, follows the written part, and also serves to resolve any ambiguities in the written part.

Completion of the subject for students with individual study:
Passing the comprehensive control test and achieving at least 55% points.
Awarding credit is a necessary condition for taking the exam.
The exam has a written and an oral part, with the focus of the exam being the oral part.
For all tasks in the written part, the calculation must be written down, or the procedure must be described, or the result must be justified verbally. The examples are divided into thematic groups. If the student does not achieve at least 50% of the total number of achievable points in each thematic group of examples, the written part and the entire exam are graded "F" (unsatisfactory) and the student does not proceed to the oral part.
If the student does not achieve at least 55% of the total number of achievable points in the written work, the written part and the entire exam are graded "F" (unsatisfactory) and the student does not proceed to the oral part.
The oral part, focused on knowledge of the theory, follows the written part, and also serves to resolve any ambiguities in the written part.

1. Mathematical logic (statements, operations and laws, Boolean algebras and functions, representations, applications)
2. Relations (between sets and on a set, properties, tolerances, equivalence, arrangement)
3. Matrices (properties, matrix operations, rank calculation and inverse matrices)
4. Determinants (properties, rules and calculation of determinants)
5. Systems of linear equations (solvability, GEM and Cramer's rule)
6. Functions of one variable, polynomials (basic characteristics of functions, properties, rational operations with functions, compound, simple, inverse functions, polynomial roots and their determination, Horner's scheme)
7. Summary (fundamentals of mathematics, linear algebra)
8. Elementary functions (basic properties, constructions and displacements of graphs)
9. Limit and continuity (eigen and non-eigen limits at an eigen and non-eigen point, basic properties and rules for calculation, continuity at a point and on an interval, properties and rules for calculating with continuous functions)
10. Sequences (bounded and monotonic sequences of real numbers, sequence limit)
11. Derivation of the 1st order (meaning, basic properties and rules, derivation of elementary functions)
12. Summary (properties of functions, polynomials, limits and continuity of functions)
13. Differential and derivatives of higher orders (differential and its use, derivatives of higher orders, l'Hospital's rule)

Attendance at exercises (seminars) is  controlled.

• Programme BAK-MIn Bachelor's, 1. year of study, winter semester, compulsory
  

• Programme BAK-MIn-D Bachelor's

  branch BAK-MIn , 1. year of study, winter semester, compulsory
  

1. Reviewing high school math
2. Mathematical logic (statements, operations and laws, Boolean algebras and functions, representations, applications)
3. Relations (between sets and on a set, properties, tolerances, equivalence, arrangement)
4. Matrices (properties, matrix operations, rank calculation and inverse matrices)
5. Determinants (properties, rules and calculation of determinants)
6. Systems of linear equations (solvability, GEM and Cramer's rule)
7. Functions of one variable, polynomials (basic characteristics of functions, properties, rational operations with functions, compound, simple, inverse function)
8. Roots of a polynomial and their determination, Horner's scheme
9. Elementary functions (basic properties, constructions and displacements of graphs)
10. Limit and continuity (eigen and non-eigen limits at an eigen and non-eigen point, basic properties and rules for calculation, continuity at a point and on an interval, properties and rules for calculating with continuous functions)
11. Sequences (bounded and monotonic sequences of real numbers, sequence limit)
12. Derivation of the 1st order (meaning, basic properties and rules)
13. Derivation of elementary functions