Difference between revisions of "Mobility Ratio"

Revision as of 13:57, 25 March 2022

Brief

Mobility Ratio determines the relative rate of one fluid to another (etc. water to oil). The waterflood is driven by pore volumes of injected fluid. Everything that is of practical interest occurs between zero to three pore volumes injected ^[1].

Equation

Failed to parse (syntax error): M = \frac{k_w/ \mu_w}{k_o/ \mu_o}=\frac{k_{rw}}/ \mu_w}{k_{ro}}/ \mu_o}=\frac{q_w B_w{q_o B_o}

where

A

= Area, m2

B_{wi}

= Injected water formation oil factor, m3/m3

h

= Net pay, oil saturated thickness, m

HCPV

= Hydrocarbon pore volume, m3

HCPV_{inj}

= Injected hydrocarbon pore volumes, fraction

W_i

= Cumulative water injection volume, m3

\phi

= Porosity, fraction

S_o

= Oil saturation, fraction

Related definitions

Dimensionless injected pore volume:

W_{iD} = \frac{W_i * B_{wi}}{PV} = \frac{W_i * B_{wi}}{A * h * \phi}

Injected movable pore volume:

MOPV_{inj} = \frac{W_i * B_{wi}}{MOPV} = \frac{W_i * B_{wi}}{A * h * \phi *(1-S_{wc}-S_{orw})}

where

S_{wc}

= Connate water saturation, fraction

S_{orw}

= Residual oil saturation to water, fraction

References

↑ Wolcott, Don (2009). Applied Waterflood Field Development. Houston: Energy Tribune Publishing Inc.

[DW-1] Wolcott, Don (2009). Applied Waterflood Field Development. Houston: Energy Tribune Publishing Inc.

[1]

@@ Line 7: / Line 7: @@
 ===Equation===
-:<math> M = \frac{k_w/ \mu_w}{k_o/ \mu_o}=\frac{k_{rw}/ \mu_w}{k_{ro}/ \mu_o}=\frac{q_w B_w{q_o B_o}</math>
+:<math> M = \frac{k_w/ \mu_w}{k_o/ \mu_o}=\frac{k_{rw}}/ \mu_w}{k_{ro}}/ \mu_o}=\frac{q_w B_w{q_o B_o}</math>
 where

Navigation menu

Navigation

Categories

Products