Course objectives:
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The aim of the final state examination Mathematical Analysis is to verify that a student successfully passed the part of the degree course Mathematics, that he/she can actively use and apply basic mathematical methods and knowledge of functional analysis, theory of partial differential equations, theory of measure and integral and modern mathematical methods. Furthermore that he/she gained the necessary expert skills and knowledge to move into professional practice, or to further PhD studies. In addition, presentation and argumentation skills are also aimed.
The choice of this state exam determines the profile of degree course Mathematics and the scope of the student?s Master Thesis.
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Requirements on student
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To fulfill all prerequisites.
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Content
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Final state examination is the oral examination in front of the jury and the usual duration is approximately 30-45 minutes. The rules are given by the Department of Mathematics according to the Study and Examination statuses of the University of West Bohemia. Main topics of this examination are announced by the Department of Mathematics annually. Content is given by prerequisites.
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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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Recommended:
Literatura je dána literaturou podmiňujících předmětů a doporučením garanta oboru./ Literature as given by the conditional courses and recommended by the course guarantor..
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On-line library catalogues
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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: |
Student must meet all prerequisites of the course guaranteed by the Department of Mathematics and all conditions set by the Study and Examination Regulations of the University of West Bohemia in Pilsen. |
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Learning outcomes
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Knowledge - knowledge resulting from the course: |
Passing the final state examination Mathematical Analysis will ensure that students of the degree course Mathematics obtained knowledge, skills and competences in functional analysis, theory of partial differential equations, theory of measure and integral and modern mathematical methods.
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Assessment methods
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Knowledge - knowledge achieved by taking this course are verified by the following means: |
Oral exam |
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Teaching methods
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