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Emendatio ex 23:05, 16 Iunii 2021

Acus Buffonius π computari per probabilitatem permittit.

Probabilitas est ea occasio in qua aliquid accidat vel sit casus. Theoria probabilitatum in chemia, mathematica, medicina, meteorologia, philosophia, ratio aeraria, scientia, statistica, aliisque disciplinis adhibetur, ut conclusiones de probabilitate eventuum potentialium et de mechanica substanti systematum complicium trahantur.

In mathematica, probabilitates semper inter 0 et 1 iacent. Eventus qui fieri non potest 0 probabilitatem habet, et eventus certus 1 habet.

Aliae regulae sunt ad quantificandam incertitudinem, sicut id Theorema Dempster-Shafer idque Theorema Possibilitatis, quae necessario sunt dissimilia nec legibus probabilitatis, ut intellectae sunt, potest conferri.

Nexus interni

Bibliographia

Aslangul, Claude. 2004. Mathématiques pour physiciens. Université Pierre et Marie Curie, La science à Paris.
Courtebras, Bernard. 2008. Mathématiser le hasard. Vuibert.
Kallenberg, Olav. 2002. Foundations of Modern Probability. Ed. 2a. Series in Statistics. Novi Eboraci: Springer. ISBN 0-387-95313-2.
Kallenberg, Olav. 2005. Probabilistic Symmetries and Invariance Principles. Novi Eboraci: Springer-Verlag. ISBN 0-387-25115-4.
Olofsson, Peter. 2005. Probability, Statistics, and Stochastic Processes. Wiley-Interscience. ISBN 0-471-67969-0.
Saporta, Gilbert. 2006. Probabilités, Analyse des données et Statistiques. Lutetiae: Éditions Technip.

Nexus externi

Ross, Sheldon. "Problemas selectos de Probabilidad del libro A First Couse in Probability . . . Capitulo 7 (8° Edición): Propiedades de Expectativa." Textus ab Erika Canon inoneratus.

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