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Juggling Patterns Visualization
Jašek, Roman ; Maršík, Lukáš (referee) ; Kajan, Rudolf (advisor)
This thesis deals with the known possibilities according to the 3D visualization of juggling patterns. It presents some of the libraries that may be used for this issue and the whole concept of juggling patterns and their notation. In the next part there is an analysis of existing software dealing with juggling patterns visualization. A chapter about designing and implementing graphical user interface follows. The next part contains a predesign of the applicatin itself using XNA framework. The last part of the thesis is aimed at creating an online page presenting the program using Microsoft Silverlight.
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Circus pedagogy and possibilities of use of it in physical education classes for primary school
Šťastný, Benjamin ; Kainová, Lucie (advisor) ; Hájková, Jana (referee)
This bachelor theses focuses on circus pedagogy and evolution of circus itself with the main focus on new circus and educational forms of circus. Furthermore, it explores the possibilities of use of the circus pedagogy in physical education classes in primary school. It describes how to teach elected disciplines of circus in the environment of classical gym, which is not specially equipped for circus activities. As the main disciplines it chooses ground, paired or group acrobatics, equilibristic and juggling. The practical part of the thesis presents an education plan based on methods and practices of circus pedagogy and interviews with experts in the field of New circus education and circus pedagogy. Furthermore, the practical part presents a record of passed lessons with four classes from the first grade on elementary school in PE lessons held according to the education plane presented in the practical part and also a reflection and evaluation of the passed lessons. Keywords acrobatics, circus pedagogy, circus, juggling, new circus, pedagogy
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The mathematical theory of juggling
Búzik, Michal ; Slavík, Antonín (advisor) ; Karger, Adolf (referee)
Title: The mathematical theory of juggling Author: Michal Búzik Department: Department of Mathematics Education Supervisor: RNDr. Antonín Slavík, Ph.D. Abstract: This bachelor thesis is concerned with methods of mathematical descrip- tion of juggling. The main part deals with notation of simulation of throwing balls using integer sequences, so-called siteswaps. It indicates generating, mutual relations and ways of graphic interpretation of these sequences in diagrams. Summarized re- sults with generalization of all possible calculations of juggling sequences according to restrictive aspects are provided in this thesis. Beside usage of combinatorics and graph theory, there are also relations between juggling and braid theory, and change ringing interpreted. Keywords: juggling, sequence, siteswap
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The mathematical theory of juggling
Zamboj, Michal ; Slavík, Antonín (advisor) ; Halas, Zdeněk (referee)
Title: The mathematical theory of juggling Author: Bc. Michal Zamboj Department: Department of Mathematics Education Supervisor: RNDr. Antonín Slavík, Ph.D. Abstract: This diploma thesis extends the bachelor thesis of the same name. It deals with the graphic representation of juggling sequences by the cyclic diagram. Using the Burnside theorem and cyclic diagrams, we calculate the number of all genera- tors of juggling sequences. The relation between juggling and the theory of braids is described as well. The mathematical model of inside and outside throws is made from an empirical observation of trajectories of balls. Braids of juggling sequences and their attributes are provided using a real model of ladder. A sketch of the proof of the theorem that any braid is juggleable is given as well.
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The mathematical theory of juggling
Zamboj, Michal ; Slavík, Antonín (advisor) ; Halas, Zdeněk (referee)
Title: The mathematical theory of juggling Author: Bc. Michal Zamboj Department: Department of Mathematics Education Supervisor: RNDr. Antonín Slavík, Ph.D. Abstract: This diploma thesis extends the bachelor thesis of the same name. It deals with the graphic representation of juggling sequences by the cyclic diagram. Using the Burnside theorem and cyclic diagrams, we calculate the number of all genera- tors of juggling sequences. The relation between juggling and the theory of braids is described as well. The mathematical model of inside and outside throws is made from an empirical observation of trajectories of balls. Braids of juggling sequences and their attributes are provided using a real model of ladder. A sketch of the proof of the theorem that any braid is juggleable is given as well.
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The mathematical theory of juggling
Búzik, Michal ; Slavík, Antonín (advisor) ; Karger, Adolf (referee)
Title: The mathematical theory of juggling Author: Michal Búzik Department: Department of Mathematics Education Supervisor: RNDr. Antonín Slavík, Ph.D. Abstract: This bachelor thesis is concerned with methods of mathematical descrip- tion of juggling. The main part deals with notation of simulation of throwing balls using integer sequences, so-called siteswaps. It indicates generating, mutual relations and ways of graphic interpretation of these sequences in diagrams. Summarized re- sults with generalization of all possible calculations of juggling sequences according to restrictive aspects are provided in this thesis. Beside usage of combinatorics and graph theory, there are also relations between juggling and braid theory, and change ringing interpreted. Keywords: juggling, sequence, siteswap
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