Main page | Study Branches | Groups of Courses | All Courses | Roles | Explanatory Notes               Instructions

A | B | C | D | E | L | M | O | P | S
A group consists of courses that have the same role in a study plan. A group thus facilitates the requirement on credits to be acquired in a prescribed structure for a study plan. Hence, a student just cannot accumulate the required amount of credits required by the study plan; s/he must meet the requirements of each group of courses of a given study plan.
       Each student has to complete either at least a prescribed minimum (amount of) credits or to successfully complete a prescribed minimum (amount of) courses for a given group.
If a group has defined a minimum amount of credits = total amount of credits that can be obtained from the group, the student must successfully complete all the courses of the group. Such a group of courses has its role marked as 'compulsory'. If a group has defined a minimum amount of credits < total amount of credits obtainable from the group, such a situation is referred to as a group with an obligation to choose and complete at least the minimally set amount of credits. Similarly for courses.
If a group has defined a minimum amount of credits = 0 and a minimum number of courses = 0 at the same time, then the courses in the given group are elective.
Ifa a group has defined a minimum amount of credits < maximum amount of credits < total amount of credits obtainable from the group, then credits earned earned above the minimum amount of credits are seen as elective and credits above the maximum amount of credits from a given group do not count.
For ease of reference, each group has a role of the courses in the given study plan assigned next to its name.
The list is sorted alphabetically by the Department code and Course title.
Group: Compulsory Courses od Study Program Infomatics, Presented in English, Version 2015
Min. credits: 119   Credits total: 119   Min. courses: 21 Role: PP - Compulsory Modules of Programme
Course Course title Extend of
BIE-PA1 Programming and Algorithmics 1 2P+2R+2C Z,ZK Z 1 6 Trávníček J., Vagner L. 18101
BIE-PAI Law and Informatics 2P ZK Z 1 3 Krausová A., Kučera Z., Matějka M., Myška M. 18102
BIE-CAO Digital and Analog Circuits 2P+2C Z,ZK Z 1 5 Hyniová K. 18103
BIE-PS1 Programming in Shell 1 2P+2C KZ Z 1 5 Trdlička J. 18104
BIE-ZMA Elements of Calculus 3P+2C Z,ZK Z 1 6 Rybníčková J. 18105
BIE-MLO Mathematical Logic 2P+2C Z,ZK Z 1 5 Trlifajová K. 18105
BIE-PA2 Programming and Algorithmics 2 2P+1R+1C Z,ZK L 2 7 Trávníček J. 18101
BIE-DBS Database Systems 3L Z,ZK Z,L 2 6 Pavlíček J., Trofimova Y. 18102
BIE-SAP Computer Structures and Architectures 2P+1R+2C Z,ZK L 2 6 Douša J. 18103
BIE-LIN Linear Algebra 4P+2C Z,ZK L 2 7 Hrabák P. 18105
BIE-AG1 Algorithms and Graphs 1 2P+2C Z,ZK Z 3 6 Scholtzová J., Tvrdík P. 18101
BIE-AAG Automata and Grammars 2P+2C Z,ZK Z 3 6 Holub J., Trávníček J. 18101
BIE-ZDM Elements of Discrete Mathematics 2P+2C Z,ZK Z 3 5 Kolář J. 18105
BIE-SI1.2 Software Engineering I 2P+1C Z,ZK Z,L 4 5 Rybola Z. 18102
BIE-PSI Computer Networks 2P+1R+1C Z,ZK L 4 5 Smotlacha V., Trofimova Y. 18104
BIE-OSY Operating Systems 2P+1R+1L Z,ZK L 4 5 Tvrdík P. 18104
BIE-BEZ Security 2P+1R+1C Z,ZK L 4 6 Buček J., Lórencz R. 18106
BIE-BPR Bachelor Project Z Z 5 2 18000
BIE-PST Probability and Statistics 2P+1R+1C Z,ZK Z 5 5 Novák P. 18105
BIE-BAP Bachelor Thesis Z L,Z 6 14 18000
BIE-DPR Document., Presentation, Rhetorics KZ L 6 4 Vynikarová D. 18102

Page updated 21. 4. 2020, semester: L/2020-1, Z,L/2019-20, Z/2020-1, Send comments to the content presented here toAdministrator of study plans Design and implementation: J. Novák, I. Halaška