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Hydrodynamic influence on trapping (view source)
Revision as of 16:22, 23 February 2016
, 16:22, 23 February 2016no edit summary
:<math>\Phi_{\rm h} = \rho_{\rm h}\mbox{gH}_{\rm h} = \rho_{\rm w}\mbox{gH}_{\rm w} - (\rho_{\rm w} - \rho_{\rm h})\mbox{gZ}</math>
:<math>\Phi_{\rm h} = \rho_{\rm h}\mbox{gH}_{\rm h} = \rho_{\rm w}\mbox{gH}_{\rm w} - (\rho_{\rm w} - \rho_{\rm h})\mbox{gZ}</math>
Dividing through by g (ρ<sub>w</sub> – ρ<sub>h</sub>)/ρ<sub>h</sub> to simplify gives (in a uniformly flat gravity field)
Dividing through by g (ρ<sub>w</sub> – ρ<sub>h</sub>)/ρ<sub>h</sub> to simplify gives (in a uniformly flat [[gravity]] field)
:<math>\left(\frac{\rho_{\rm h}}{\rho_{\rm w} - \rho_{\rm h}}\right) \mbox{H}_{\rm h} = \left(\frac{\rho_{\rm w}}{\rho_{\rm w} - \rho_{\rm h}}\right)\mbox{H}_{\rm w} - \mbox{Z}</math>
:<math>\left(\frac{\rho_{\rm h}}{\rho_{\rm w} - \rho_{\rm h}}\right) \mbox{H}_{\rm h} = \left(\frac{\rho_{\rm w}}{\rho_{\rm w} - \rho_{\rm h}}\right)\mbox{H}_{\rm w} - \mbox{Z}</math>