| dc.contributor.advisor | Haman, Jiří | |
| dc.creator | Rušin, Ján | |
| dc.date.accessioned | 2017-05-06T20:16:33Z | |
| dc.date.available | 2017-05-06T20:16:33Z | |
| dc.date.issued | 2012 | |
| dc.identifier.uri | http://hdl.handle.net/20.500.11956/40432 | |
| dc.description.abstract | Táto bakalárska práca sa zaoberá prehl'adom a popisom vybraných pa- radoxov z teórie pravdepodobnosti. Menovite uvedieme paradox Montyho Halla, Bertrandov paradox a Petrohradský paradox. Čitatel' je v každej kapitole najprv oboznámený so zadaním paradoxu a s jeho podstatou. Potom je k uvedenému paradoxu predvedených niekol'ko prístupov k jeho riešeniu. V pôvodnom zadaní Monty Hallovho paradoxu existuje len jedno riešenie, ku ktorému nás privedú dva rôzne postupy. Tento paradox doplníme tiež jednoduchými modifikáciami. Zada- nie Bertrandovho paradoxu je vo svojej podstate nejednoznačné, čo ukážeme na štyroch vybraných prístupoch. Podobná situácia sa vyskytne aj v Petrohradskom paradoxe, ktorý vyriešime tromi vybranými prístupmi. 1 | cs_CZ |
| dc.description.abstract | The Bachelor's thesis present an overview and description of selected probability theory paradoxes, namely the paradox of Monty Hall, the Bertrand's paradox and the St. Peterburg paradox. In every chapter the reader is at first apprised of the formulation and the essence of the paradox. Then we show some possible solutions of this paradox. In original formulation of Monty Hall paradox there exists just one solution which can be reached by using two different ways. We add also some simple modifications to this particular paradox. The formula- tion of Bertrand's paradox is ambiguous which we show by using four selected approaches. And very similar situation arises in St. Peterburg paradox which we resolve by using three different approaches. 1 | en_US |
| dc.language | Slovenčina | cs_CZ |
| dc.language.iso | sk_SK | |
| dc.publisher | Univerzita Karlova, Matematicko-fyzikální fakulta | cs_CZ |
| dc.subject | Monty Hallov paradox | cs_CZ |
| dc.subject | Bertrandov paradox | cs_CZ |
| dc.subject | Petrohradský paradox | cs_CZ |
| dc.subject | úžitková funkcia | cs_CZ |
| dc.subject | Monty Hall paradox | en_US |
| dc.subject | Bertrand's paradox | en_US |
| dc.subject | St. Peterburg paradox | en_US |
| dc.subject | utility function | en_US |
| dc.title | Paradoxy v teorii pravděpodobnosti | sk_SK |
| dc.type | bakalářská práce | cs_CZ |
| dcterms.created | 2012 | |
| dcterms.dateAccepted | 2012-06-29 | |
| dc.description.department | Department of Probability and Mathematical Statistics | en_US |
| dc.description.department | Katedra pravděpodobnosti a matematické statistiky | cs_CZ |
| dc.description.faculty | Faculty of Mathematics and Physics | en_US |
| dc.description.faculty | Matematicko-fyzikální fakulta | cs_CZ |
| dc.identifier.repId | 96072 | |
| dc.title.translated | Paradoxes in Probability Theory | en_US |
| dc.title.translated | Paradoxy v teorii pravděpodobnosti | cs_CZ |
| dc.contributor.referee | Dostál, Petr | |
| dc.identifier.aleph | 001483406 | |
| thesis.degree.name | Bc. | |
| thesis.degree.level | bakalářské | cs_CZ |
| thesis.degree.discipline | Financial Mathematics | en_US |
| thesis.degree.discipline | Finanční matematika | cs_CZ |
| thesis.degree.program | Mathematics | en_US |
| thesis.degree.program | Matematika | cs_CZ |
| uk.thesis.type | bakalářská práce | cs_CZ |
| uk.taxonomy.organization-cs | Matematicko-fyzikální fakulta::Katedra pravděpodobnosti a matematické statistiky | cs_CZ |
| uk.taxonomy.organization-en | Faculty of Mathematics and Physics::Department of Probability and Mathematical Statistics | en_US |
| uk.faculty-name.cs | Matematicko-fyzikální fakulta | cs_CZ |
| uk.faculty-name.en | Faculty of Mathematics and Physics | en_US |
| uk.faculty-abbr.cs | MFF | cs_CZ |
| uk.degree-discipline.cs | Finanční matematika | cs_CZ |
| uk.degree-discipline.en | Financial Mathematics | en_US |
| uk.degree-program.cs | Matematika | cs_CZ |
| uk.degree-program.en | Mathematics | en_US |
| thesis.grade.cs | Velmi dobře | cs_CZ |
| thesis.grade.en | Very good | en_US |
| uk.abstract.cs | Táto bakalárska práca sa zaoberá prehl'adom a popisom vybraných pa- radoxov z teórie pravdepodobnosti. Menovite uvedieme paradox Montyho Halla, Bertrandov paradox a Petrohradský paradox. Čitatel' je v každej kapitole najprv oboznámený so zadaním paradoxu a s jeho podstatou. Potom je k uvedenému paradoxu predvedených niekol'ko prístupov k jeho riešeniu. V pôvodnom zadaní Monty Hallovho paradoxu existuje len jedno riešenie, ku ktorému nás privedú dva rôzne postupy. Tento paradox doplníme tiež jednoduchými modifikáciami. Zada- nie Bertrandovho paradoxu je vo svojej podstate nejednoznačné, čo ukážeme na štyroch vybraných prístupoch. Podobná situácia sa vyskytne aj v Petrohradskom paradoxe, ktorý vyriešime tromi vybranými prístupmi. 1 | cs_CZ |
| uk.abstract.en | The Bachelor's thesis present an overview and description of selected probability theory paradoxes, namely the paradox of Monty Hall, the Bertrand's paradox and the St. Peterburg paradox. In every chapter the reader is at first apprised of the formulation and the essence of the paradox. Then we show some possible solutions of this paradox. In original formulation of Monty Hall paradox there exists just one solution which can be reached by using two different ways. We add also some simple modifications to this particular paradox. The formula- tion of Bertrand's paradox is ambiguous which we show by using four selected approaches. And very similar situation arises in St. Peterburg paradox which we resolve by using three different approaches. 1 | en_US |
| uk.file-availability | V | |
| uk.publication.place | Praha | cs_CZ |
| uk.grantor | Univerzita Karlova, Matematicko-fyzikální fakulta, Katedra pravděpodobnosti a matematické statistiky | cs_CZ |
| dc.identifier.lisID | 990014834060106986 | |
