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Definite Integrals in Maple, Matlab and TKSL
Barták, Jaroslav ; Šátek, Václav (referee) ; Kunovský, Jiří (advisor)
This thesis discourses different types of definite integrals calculations, applying Maple, Matlab and TKSL software. Additionally, the thesis compares above software in terms of usability of calculated results of each program. For verification of calculations and comparison of different interpretations, there are examples of source code attached. By virtue of this files it is possible to revise the calculations of definite integrals and compare complexity of its record. Finally, the paper also compares above programs considering their user-friendliness.
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Definite Integrals in Maple, Matlab and TKSL
Barták, Jaroslav ; Šátek, Václav (referee) ; Kunovský, Jiří (advisor)
This thesis discourses different types of definite integrals calculations, applying Maple, Matlab and TKSL software. Additionally, the thesis compares above software in terms of usability of calculated results of each program. For verification of calculations and comparison of different interpretations, there are examples of source code attached. By virtue of this files it is possible to revise the calculations of definite integrals and compare complexity of its record. Finally, the paper also compares above programs considering their user-friendliness.
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Define integral in Economics
ČERMÁK, Pavel
In thesis task there was mentioned little bit of indefinite integral theory and computation methods. After that was described the definite integral theory, its properties, computation methods, first of all the Newton-Leibniz formulary, and its connection with indefinite integral. Then was shown where is possible to use definite integral on examples in mathematics. The most important part of the thesis is the application of definite integral theory on examples in economics. Each subchapter is occupied by one application. At the beginning of each part the rough description of economics view is contained. Then is defined an equation eventually equations for computing. All of this is demonstrated on examples.
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