London, March, 1668
Dear Fulanitus: the previous year I received a Menganeus letter dated in August, 1664, where it receives geometrically the extract of the movement of the fluid bodies. With big pleasure I verify that it obtains the same results to which I had already come approximately twelve years earlier, and I am useful now to communicate them to him.
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1760 (in French):
Note presented in the Academy of Sciences of Paris, pair Monsieur Fou L'Anneaux et Monsieur Mainganau.
In this note we analyze the movement of a fluid in case it remains in absolute rest (and we will demonstrate that it does not move), or that it is in rest as regards a receptacle that contains it but that translada (we will demonstrate that translada with him). As the remaining cases were already analyzed by Euler and the Bernoulli, we put this way a golden brooch to the theory of the hydraulics and the hidrodinamia.
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1860 (in German)
Herr Doktor Proffessors Vulanner und Menkganniten demonstrated the continuity and difereciabilidad of the flow of a particle inside a fluid and analyzed the distinguishing equation that it satisfies. We will re-write here these way results vectorial.
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1960 (in English)
In the works of Fulanov and Menganiev there was analyzed the probability of which a particle inside a fluid was following a family of curves given inside a space of functions so generally that it includes those of Sobolev, Besov, and Orlicz. Here, we are going to restrict ourselves to a grafo of ten nodes, faced, and the set of discreet ways between his nodes when it is chosen at random and with uniform probability the nearby node to which it will go.
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2060 (in???)
We translate here the last article that Ning came to our hands of Fu-Lan Oh and Meng Ah. We omit the previous definitions, and the demonstration of some of the most used mottoes, since they were published in the journal of certain university of a province that we could not identify in the map.
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