Gurantor department | Department of Mathematics and Descriptive Geometry | Credits | 4 |

Subject guarantor | Ing. Petra Schreiberová, Ph.D. | Subject version guarantor | Ing. Petra Schreiberová, Ph.D. |

Study level | undergraduate or graduate | Requirement | Compulsory |

Year | 1 | Semester | summer |

Study language | Czech | ||

Year of introduction | 2019/2020 | Year of cancellation | |

Intended for the faculties | FS | Intended for study types | Bachelor |

Instruction secured by | |||
---|---|---|---|

Login | Name | Tuitor | Teacher giving lectures |

H1O40 | Mgr. Iveta Cholevová, Ph.D. | ||

DOL30 | doc. RNDr. Jarmila Doležalová, CSc. | ||

KOT31 | RNDr. Jan Kotůlek, Ph.D. | ||

OTI73 | Mgr. Petr Otipka | ||

KAH14 | Mgr. Marcela Rabasová, Ph.D. | ||

SKN002 | Ing. Petra Schreiberová, Ph.D. |

Extent of instruction for forms of study | ||
---|---|---|

Form of study | Way of compl. | Extent |

Full-time | Credit and Examination | 2+2 |

Combined | Credit and Examination | 11+0 |

Mathematics is essential part of education on technical universities.
It should be considered rather the method in the study of technical
courses than a goal. Thus the goal of mathematics is train logical
reasoning than mere list of mathematical notions, algorithms and
methods.
Students should learn how to
analyze problems,
distinguish between important and unimportant,
suggest a method of solution,
verify each step of a method,
generalize achieved results,
analyze correctness of achieved results with respect to given conditions,
apply these methods while solving technical problems,
understand that mathematical methods and theoretical advancements
outreach the field mathematics.

Lectures

Individual consultations

Tutorials

Other activities

Integral calculus of function of one real variable: the indefinite and definite
integrals, properties of the indefinite and definite integrals, application in
the geometry and physics. Differential calculus of functions of several
independent variables. Ordinary differential equations of the first and the
second order.

Kreml, P.: Mathematics II, VŠB – TUO, Ostrava 2005, ISBN 80-248-0798-X

Harshbarger, R.J.-Reynolds, J.J.: Calculus with Applications.
D.C.Heath and Company, Lexington1990, ISBN 0-669-21145-1
James, G.: Modern Engineering Mathematics. Addison-Wesley, 1992.
ISBN 0-201-1805456

Course-credit
-participation on tutorials is obligatory, 20% of absence can be apologized,
-elaborate programs,
-pass the written tests,
Point classification: 5-20 points.
Exam
Practical part of an exam is classified by 0 - 60 points. Practical part is successful if student obtains at least
25 points.
Theoretical part of the exam is classified by 0 - 20 points. Theoretical part is successful if student obtains
at least 5 points.
Point quantification in the interval 100 - 91 90 - 81 80 - 71 70 - 61 60 - 51 50 - 0
ECTS grade A B C D E F
Point quantification in the interval 100 - 86 85 - 66 65 - 51 51 - 0
National grading scheme excellent very good satisfactory failed

http://mdg.vsb.cz/portal/m2/index.php

more requierements are not

Subject code | Abbreviation | Title | Requirement |
---|---|---|---|

310-2110 | ZM | Basics of Mathematics | Recommended |

310-2111 | MI | Mathematics I | Recommended |

Subject has no co-requisities.

1 Integral calculus of functions of one variable. Antiderivatives and indefinite integral. Integration of elementary functions.
2 Integration by substitutions, integration by parts.
3 Integration of rational functions.
4 Definite integral and methods of integration.
5 Geometric application of definite integrals.
6 Differential calculus of functions of two or more real variables. Functions of two or more variables, graph,
7 Partial derivatives of the 1-st and higher order.
8 Total differential of functions of two variables, tangent plane and normal to a surface, extrema of functions.
9 Ordinary differential equations. General, particular and singular solutions. Separable homogeneous equations.
10 Homogeneous equations. Linear differential equations of the first order, method of variation of arbitrary constant.
11 2nd order linear differential equations with constant coefficients, linearly independent solutions, Wronskian,fundamental system of solutions.
12 2nd order LDE with constant coefficients - method of variation of arbitrary constants.
13 2nd order LDE with constant coefficients - method of undetermined coefficients.
14 Application of differential equations

Task name | Type of task | Max. number of points
(act. for subtasks) | Min. number of points |
---|---|---|---|

Credit and Examination | Credit and Examination | 100 (100) | 51 |

Credit | Credit | 20 | 5 |

Examination | Examination | 80 (80) | 30 |

Praktická část | Written examination | 60 | 25 |

Teoretická část | Written examination | 20 | 5 |

Show history

Academic year | Programme | Field of study | Spec. | Form | Study language | Tut. centre | Year | W | S | Type of duty | |
---|---|---|---|---|---|---|---|---|---|---|---|

2019/2020 | (B2341) Engineering | P | Czech | Ostrava | 1 | Compulsory | study plan | ||||

2019/2020 | (B2341) Engineering | P | Czech | Šumperk | 1 | Compulsory | study plan | ||||

2019/2020 | (B3712) Air Transport Technology | (3708R037) Aircraft Operation Technology | P | Czech | Ostrava | 1 | Compulsory | study plan | |||

2019/2020 | (B3712) Air Transport Technology | (3708R038) Aircraft Maintenance Technology | P | Czech | Ostrava | 1 | Compulsory | study plan | |||

2019/2020 | (B0715A270011) Engineering | P | Czech | Ostrava | 1 | Compulsory | study plan | ||||

2019/2020 | (B0715A270011) Engineering | K | Czech | Ostrava | 1 | Compulsory | study plan | ||||

2019/2020 | (B0715A270011) Engineering | P | Czech | Šumperk | 1 | Compulsory | study plan | ||||

2019/2020 | (B0715A270011) Engineering | K | Czech | Šumperk | 1 | Compulsory | study plan | ||||

2019/2020 | (B0715A270011) Engineering | K | Czech | Uherský Brod | 1 | Compulsory | study plan |

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