Branch Details

Mathematical Engineering

Original title in Czech: Matematické inženýrstvíFSIAbbreviation: M-MAIAcad. year: 2015/2016

Programme: Applied Sciences in Engineering

Length of Study: 2 years

Accredited from: Accredited until: 31.12.2020

Profile

The graduates will acquire more profound knowledge of mathematics and informatics that can be used to deal with sophisticated problems in engineering practice. Thus, in addition to the knowledge of the essential engineering fields acquired with the Bachelor's degree, the graduates will obtain the theoretical background needed for them to attain leading positions in research teams of various engineering specializations.

Key learning outcomes

The graduates will be equipped with profound knowledge of mathematics and informatics that can be used to deal with sophisticated problems in engineering practice. They will also acquire knowledge of the essential engineering fields, so that the graduates will obtain a good theoretical background needed to solve various engineering problems making efficient use of computers. They will be well equipped to carry out high-level developing and innovating activities in various areas of engineering as well as other areas. This will make it easy for them to find jobs after graduation.

Occupational profiles of graduates with examples

Thanks to their perfect knowledge of engineering subjects, mathematics, physics, and informatics, the graduates will be asked for in a number of areas. They will find jobs mostly as members of research, development and realization teams in various technical professions (mechanical and electrical engineering, aviation, etc.) and in software companies. A great advantage is orientation in recent computing technologies and perfect analytical thinking. They can also hold high positions in the inspection and management of organisation in both the production and non-production sphere. Their broad mathematical background will help them find jobs in commercial companies as well as in many other areas such as banking, public administration, business, etc.
The best graduates are expected to continue their study in the Doctor's degree programme, Applied Mathematics, offered by this faculty. They can, however, also continue their doctoral studies in any other study area of technical or mathematical orientation at BUT or at any other Czech university or abroad.

Guarantor


Course structure diagram with ECTS credits

1. year of study, winter semester
AbbreviationTitleL.Cr.Com.Compl.Hr. rangeGr.Op.
SFAFourier Analysiscs4CompulsoryCr,ExP - 26 / C1 - 13yes
SU2Functional Analysis IIcs3CompulsoryGCrP - 26 / C1 - 13yes
SGA-AGraphs and Algorithmsen4CompulsoryCr,ExP - 26 / C1 - 13yes
SN3Numerical Methods IIIcs3CompulsoryGCrP - 26 / CPP - 13yes
SOPOptimization Ics4CompulsoryCr,ExP - 26 / CPP - 13yes
0PPSIndustrial Project (M-MAI)cs2CompulsoryCrPX - 120yes
STMTheoretical Mechanicscs6CompulsoryCr,ExP - 39 / C1 - 26yes
VCPC and C++ Programming Languagescs4Compulsory-optionalCr,ExP - 26 / CPP - 261yes
VPWProgramming in Windowscs4Compulsory-optionalCr,ExP - 26 / CPP - 261yes
TRJQuality and Metrology - Mcs4Elective (voluntary)Cr,ExP - 26 / C2b - 26yes
S2MStochastic Modellingcs3Elective (voluntary)GCrC1 - 26yes
RZESystems Methodologycs3Elective (voluntary)GCrP - 26yes
1. year of study, summer semester
AbbreviationTitleL.Cr.Com.Compl.Hr. rangeGr.Op.
SKFComplex Variable Functionscs6CompulsoryCr,ExP - 39 / C1 - 26yes
SMLMathematical Logiccs5CompulsoryCr,ExP - 26 / C1 - 26yes
TNMNumerical Methods of Image Analysiscs4CompulsoryCr,ExP - 26 / CPP - 26yes
SP3Probability and Statistics IIIcs4CompulsoryGCrP - 26 / CPP - 13yes
SSPStochastic Processescs4CompulsoryCr,ExP - 26 / CPP - 13yes
S1MCalculus of Variationscs3CompulsoryGCrP - 26 / C1 - 13yes
VAIArtificial Intelligence Algorithmscs4Compulsory-optionalCr,ExP - 26 / CPP - 262yes
SO2Optimization IIcs4Compulsory-optionalCr,ExP - 26 / CPP - 262yes
VPNComputer Networkscs4Compulsory-optionalCr,ExP - 26 / CPP - 262yes
SF0Applications of Fourier Analysiscs0Elective (voluntary)CrP - 13 / CPP - 13yes
6KPFinite Element Method and ANSYS Computational Codecs0Elective (voluntary)CrP - 26 / CPP - 26yes
VOTOperating Systemscs4Elective (voluntary)Cr,ExP - 26 / CPP - 26yes
2. year of study, winter semester
AbbreviationTitleL.Cr.Com.Compl.Hr. rangeGr.Op.
SALMulti-valued Logic Applicationscs4CompulsoryGCrP - 26 / CPP - 13yes
SD3Diploma Project I (M-MAI)cs4CompulsoryCrVD - 65yes
SFIFinancial Mathematicscs4CompulsoryGCrP - 26 / CPP - 13yes
SFMFuzzy Sets and Applicationscs4CompulsoryCr,ExP - 26 / CPP - 13yes
SMMMathematical Methods in Fluid Dynamicscs4CompulsoryCr,ExP - 26 / CPP - 13yes
SSZDiploma Seminar I (M-MAI)cs2CompulsoryCrC1 - 13yes
SORFundamentals of Optimal Control Theorycs4CompulsoryCr,ExP - 26 / C1 - 13yes
SSJReliability and Qualitycs4Compulsory-optionalGCrP - 26 / CPP - 131yes
VTIInformation Theory and Encodingcs4Compulsory-optionalCr,ExP - 26 / CPP - 261yes
S1KContinuum Mechanicscs4Elective (voluntary)Cr,ExP - 39 / C1 - 39yes
2. year of study, summer semester
AbbreviationTitleL.Cr.Com.Compl.Hr. rangeGr.Op.
TAIAnalysis of Engineering Experimentcs4CompulsoryCr,ExP - 26 / CPP - 13yes
SD4Diploma Project II (M-MAI)cs6CompulsoryCrVD - 91yes
SSR-AMathematical Structuresen4CompulsoryGCrP - 26yes
SDRModern Methods of Solving Differential Equationscs5CompulsoryCr,ExP - 26 / C1 - 26yes
SDSDiploma Seminar II (M-MAI)cs3CompulsoryCrC1 - 26yes
SVDData Visualisationcs4CompulsoryGCrP - 13 / CPP - 26yes
SAVGeometrical Algorithms and Cryptographycs4Compulsory-optionalGCrP - 262no
VTRPolynomial Theory of Controlcs4Compulsory-optionalGCrP - 262yes
S3MMathematical Seminarcs0Elective (voluntary)CrC1 - 39yes
2. year of study, both semester
AbbreviationTitleL.Cr.Com.Compl.Hr. rangeGr.Op.
7AZEnglish - Exam B1en0CompulsoryExZ - 1yes
All the groups of optional courses
Gr. Number of courses Courses
2 1 VAI, SO2, VPN
1 1 VCP, VPW
2 1 SAV, VTR
1 1 SSJ, VTI