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Course info
KMA / SPMA
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Course description
Department/Unit / Abbreviation
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KMA
/
SPMA
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Academic Year
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2023/2024
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Academic Year
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2023/2024
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Title
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Seminar Assignment in Mathematics
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Form of course completion
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Pre-Exam Credit
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Form of course completion
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Pre-Exam Credit
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Accredited / Credits
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Yes,
3
Cred.
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Type of completion
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Combined
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Type of completion
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Combined
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Time requirements
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Seminar
2
[Hours/Week]
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Course credit prior to examination
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No
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Course credit prior to examination
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No
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Automatic acceptance of credit before examination
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No
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Included in study average
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NO
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Language of instruction
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Czech, English
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Occ/max
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Automatic acceptance of credit before examination
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No
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Summer semester
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0 / -
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0 / -
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0 / -
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Included in study average
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NO
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Winter semester
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0 / -
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0 / -
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0 / -
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Repeated registration
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NO
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Repeated registration
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NO
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Timetable
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Yes
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Semester taught
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Winter + Summer
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Semester taught
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Winter + Summer
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Minimum (B + C) students
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1
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Optional course |
Yes
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Optional course
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Yes
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Language of instruction
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Czech, English
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Internship duration
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0
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No. of hours of on-premise lessons |
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Evaluation scale |
S|N |
Periodicity |
každý rok
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Periodicita upřesnění |
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Fundamental theoretical course |
No
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Fundamental course |
No
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Fundamental theoretical course |
No
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Evaluation scale |
S|N |
Substituted course
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None
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Preclusive courses
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N/A
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Prerequisite courses
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N/A
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Informally recommended courses
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N/A
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Courses depending on this Course
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N/A
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Histogram of students' grades over the years:
Graphic PNG
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XLS
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Course objectives:
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The aim of this course is to write and present an individual complex assignment in mathematics. The complexity of the assignment should correspond to the graduate studies of mathematics. The stress will be given to self-study and individual work and to correct mathematical writing and oral presentation.
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Requirements on student
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Assignment and its presentation
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Content
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The written assignment should contain complete problem description, its analysis, solution method proposal, discussion about chosen method, and qualitative as well as quantitative analysis of the solution including all numerical and practical aspects. The presentation should then clearly and briefly sum up all key points of the assignment. The literature will be specified at the beginning of the assignment according to its characteristics.
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Activities
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Fields of study
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Guarantors and lecturers
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Literature
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Time requirements
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All forms of study
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Activities
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Time requirements for activity [h]
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Contact hours
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26
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Presentation preparation (report in a foreign language) (10-15)
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12
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Individual project (40)
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40
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Total
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78
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Prerequisites
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Knowledge - students are expected to possess the following knowledge before the course commences to finish it successfully: |
Students should have a basic knowledge of mathematics on the undergraduate level. |
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Learning outcomes
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Knowledge - knowledge resulting from the course: |
By writing an individual assignment, student will learn how to
- read and comprehend a given mathematical text,
- fully describe a problem, its analysis and synthesis,
- propose and compare different methods of solution, discuss a chosen method,
- qualitatively as well as quantitatively analyse the solution including all numerical and practical aspects.
Giving a presentation of their work, students will be able to
- interpret a given mathematical texts,
- clearly and briefly describe all key points of the assignment,
- give a logical and coherent summary of their own work,
- discuss a chosen method of the solution, properties of the method and of the solution, and point out open issues,
- self-evaluate as well as asses other students.
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Assessment methods
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Knowledge - knowledge achieved by taking this course are verified by the following means: |
Seminar work |
Individual presentation at a seminar |
Project |
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Teaching methods
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Knowledge - the following training methods are used to achieve the required knowledge: |
Task-based study method |
Textual studies |
Project-based instruction |
Individual study |
Students' portfolio |
One-to-One tutorial |
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