− Fundamentals: mathematical notation, structure of the number system, laws of arithmetic, equations and inequalities, trigonometric quantities;
− Vectors and matrices: vectors, matrices and determinants, arithmetic operations, linear equation systems, solvability;
− Functions in a real variable: basic concepts and representation of functions, combination of functions, rational functions, exponential functions, logarithmic functions, trigonometric functions and arc functions;
− Differential calculus for functions in a real variable: limits of functions, continuity;
− Differentiability, differentiation rules, curve discussions, extreme value problems;
− Integral calculus for functions in a real variable: definite and indefinite integrals.
