Tres Tanques
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El problema hidráulico de los tres tanques está referido a un
sistema que conecta tres tanques entre sà a partir de tres
tuberÃas con diámetros diferentes las cuales se intersectan a un
mismo nodo. Las tuberÃas tienen propiedades conocidas (longitudes
diámetros y rugosidades). El problema es determinar los caudales
que circulan por cada uno de los tubos para lo cual se debe
establecer una cota energética virtual en el nodo que comportante
las tres tuberÃas. Para calcular el caudal circulante por cada
tubo es necesario establecer el principio de continuidad en el
nodo. La aplicación resuelve un sistema para tres tanques con la
siguiente condición hidráulica:
Z1> Z2 > Z3 de igual forma Z1> ZJ ZJ > Z2 > Z3
Donde: Z1 (Cota del tanque 1 (m)); Z2 (Cota del tanque 2 (m)); Z3 (Cota del tanque 3 (m)); ZJ (Cota virtual (m)).
Copyright © Universidad Distrital Francisco José de Caldas.
The hydraulic problem of the three tanks refers to a system that connects three tanks to each other starting from three pipes with different diameters which intersect the same node. The pipes have known properties (lengths diameters and roughnesses). The problem is to determine the flow rates that circulate through each of the tubes for which a virtual energy level must be established in the node that involves the three pipes. To calculate the circulating flow through each tube it is necessary to establish the principle of continuity in the node. The application solves a system for three tanks with the following hydraulic condition:
Z1> Z2> Z3 similarly Z1> ZJ ZJ> Z2> Z3
Where: Z1 (Tank dimension 1 (m)); Z2 (Tank dimension 2 (m)); Z3 (Tank dimension 3 (m)); ZJ (Virtual dimension (m)).
Copyright © Francisco José de Caldas District University.
Z1> Z2 > Z3 de igual forma Z1> ZJ ZJ > Z2 > Z3
Donde: Z1 (Cota del tanque 1 (m)); Z2 (Cota del tanque 2 (m)); Z3 (Cota del tanque 3 (m)); ZJ (Cota virtual (m)).
Copyright © Universidad Distrital Francisco José de Caldas.
The hydraulic problem of the three tanks refers to a system that connects three tanks to each other starting from three pipes with different diameters which intersect the same node. The pipes have known properties (lengths diameters and roughnesses). The problem is to determine the flow rates that circulate through each of the tubes for which a virtual energy level must be established in the node that involves the three pipes. To calculate the circulating flow through each tube it is necessary to establish the principle of continuity in the node. The application solves a system for three tanks with the following hydraulic condition:
Z1> Z2> Z3 similarly Z1> ZJ ZJ> Z2> Z3
Where: Z1 (Tank dimension 1 (m)); Z2 (Tank dimension 2 (m)); Z3 (Tank dimension 3 (m)); ZJ (Virtual dimension (m)).
Copyright © Francisco José de Caldas District University.
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