Description:

Basics of linear algebra - vectors, vector spaces, linear dependence and independence of vectors, dimension, basis.
Matrix, operation, rank. Determinant. Regular and singular matrices, inverse matrix.
Systems of linear equations, Frobeni's theorem, Gaussian elimination method.
Eigenvalues and eigenvectors of a matrix.
Differential calculus of functions of one variable. Sequences, monotonicity, limit.
Limit and continuity of a function. Derivation, geometric and physical meaning.
Monotonicity of a function, inflection point. Asymptotes, examination of course of a function, graph of a function.
Taylor polynomial, the remainder after the nth power. Approximate solution of the equation f(x)=0.
Integral calculus of functions of one variable ? indefinite integral, integration per-partes, substitutions.
Definite integral, calculation.
Application of a definite integral: area surface, volume of a rotating body, length of a curve, application in mechanics.
Numerical calculation of the integral.
Improper integral.

Contents:

Basics of linear algebra - vectors, vector spaces, linear dependence and independence of vectors, dimension, basis.
Matrix, operation, rank. Determinant. Regular and singular matrices, inverse matrix.
Systems of linear equations, Frobeni's theorem, Gaussian elimination method.
Eigenvalues and eigenvectors of a matrix.
Differential calculus of functions of one variable. Sequences, monotonicity, limit.
Limit and continuity of a function. Derivation, geometric and physical meaning.
Monotonicity of a function, inflection point. Asymptotes, examination of course of a function, graph of a function.
Taylor polynomial, the remainder after the nth power. Approximate solution of the equation f(x)=0.
Integral calculus of functions of one variable ? indefinite integral, integration per-partes, substitutions.
Definite integral, calculation.
Application of a definite integral: area surface, volume of a rotating body, length of a curve, application in mechanics.
Numerical calculation of the integral.
Improper integral.

Recommended literature:

Engineering mathematics Eighth edition, Red Globe Press, Macmillan International Higher Education, London 2020

Abbreviations used:

Semester:

• W ... winter semester (usually October - February)
• S ... spring semester (usually March - June)
• W,S ... both semesters

Mode of completion of the course:

• A ... Assessment (no grade is given to this course but credits are awarded. You will receive only P (Passed) of F (Failed) and number of credits)
• GA ... Graded Assessment (a grade is awarded for this course)
• EX ... Examination (a grade is awarded for this course)
• A, EX ... Examination (the award of Assessment is a precondition for taking the Examination in the given subject, a grade is awarded for this course)

Weekly load (hours per week):

• P ... lecture
• C ... seminar
• L ... laboratory
• R ... proseminar
• S ... seminar