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  1. Bernoulli's equation (article) | Fluid flow | Khan Academy

    Learn how Bernoulli's equation describes the conservation of mechanical energy in ideal fluid flow. Explore consequences of Bernoulli's equation, including Torricelli's theorem.

  2. Khan Academy

    Learn about Bernoulli's equation and its applications in fluid dynamics on this educational platform.

  3. Bernoulli's equation (article) | 2nd quarter | Khan Academy

    Learn how Bernoulli's equation describes the conservation of mechanical energy in ideal fluid flow. Explore consequences of Bernoulli's equation, including Torricelli's theorem.

  4. Mean and variance of Bernoulli distribution example

    Calculating the mean and variance of a distribution, including Bernoulli, helps us understand the distribution's central tendency (where most values cluster) and variability (how spread out the …

  5. Derivación de la ecuación de Bernoulli parte 1 - Khan Academy

    Este es el primero de dos videos donde derivamos la ecuación de Bernoulli. Creado por Sal Khan.

  6. Khan Academy

    Sal continues on from the previous video to derive the mean and variance formulas for the Bernoulli distribution.

  7. Khan Academy | Khan Academy

    Oups. Il y a eu un problème. S'il vous plaît, veuillez reessayer. Oups, on dirait qu'il y a eu une erreur ! Vous devez actualiser. Si le problème persiste, dites-nous.

  8. Fluids | AP®︎/College Physics 1 | Science | Khan Academy

    Discover how forces and conservation laws are used to analyze the behavior of ideal fluids. Learn about density and pressure, and how the relationship between pressure and depth in a fluid …

  9. O que é a equação de Bernoulli? (artigo) | Khan Academy

    A equação de Bernoulli é, em sua essência, uma forma mais geral e matemática do princípio de Bernoulli que também leva em consideração variações na energia potencial gravitacional.

  10. Bernoulli's equation derivation part 1 (video) | Khan Academy

    Bernoulli's equation is an equation from fluid mechanics that describes the relationship between pressure, velocity, and height in an ideal, incompressible fluid.