Difference between revisions of "Hagedorn and Brown correlation"
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:<math> N_{D} = 120.872\ D \sqrt{\frac{\rho_L}{\sigma}} </math> | :<math> N_{D} = 120.872\ D \sqrt{\frac{\rho_L}{\sigma}} </math> | ||
− | :<math> H = \frac{N_{LV}{N_{GV}^ | + | :<math> H = (\frac{N_{LV}{N_{GV})^0.575\ (\frac{P}{14.7})^0.1 /frac{CN_L}{N_D} </math> |
:<math> \frac{H_L}{\psi} </math> | :<math> \frac{H_L}{\psi} </math> |
Revision as of 12:20, 21 March 2017
Contents
Brief
Hagedorn and Brown is an empirical two-phase flow correlation published in 1965.
It doesn't distinguish between the flow regimes.
The heart of the Hagedorn and Brown method is a correlation for the liquid holdup :.
Math & Physics
Following the law of conservation of energy the basic steady state flow equation is:
where
Colebrook–White equation for the Darcy's friction factor:
Reynolds two phase number:
Discussion
Block Diagram
Workflow
- Failed to parse (syntax error): H = (\frac{N_{LV}{N_{GV})^0.575\ (\frac{P}{14.7})^0.1 /frac{CN_L}{N_D}
corr p2