Difference between revisions of "18.41 derivation"
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So: | So: | ||
| − | :<math> \frac{[ | + | :<math> \frac{[m^3]}{[day]} \frac{86400}{1000000} = - \frac{[mD][m^2]}{[cP]} \frac{[atm]}{[m]} \frac{1000 \times 100}{10000}</math> |
And: | And: | ||
| − | :<math> \frac{[ | + | :<math> \frac{[m^3]}{[day]} = - C_{LF} \frac{[mD][m^2]}{[cP]} \frac{[atm]}{[m]}</math> |
where | where | ||
| − | :<math> C_{LF} = \frac{1000\ | + | :<math> C_{LF} = \frac{1000 \times 100}{10000} \frac{1000000}{86400} = \frac{10000000}{86400} = 115.7407407</math> |
For the radial flow: | For the radial flow: | ||
| − | :<math> C_{RF} = \frac{C_{LF}}{2\pi} = \frac{ | + | :<math> C_{RF} = \frac{C_{LF}}{2\pi} = \frac{115.7407407}{2\pi} = 18.42 </math> |
| − | + | Note that the published<ref name=DW/> and commonly used constant in '''18.41'''. | |
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== Nomenclature == | == Nomenclature == | ||
:<math> A </math> = [[Darcy's law]] cross-sectional area, cm<sup>2</sup> | :<math> A </math> = [[Darcy's law]] cross-sectional area, cm<sup>2</sup> | ||
| − | :<math> B_o </math> = oil formation volume factor, | + | :<math> B_o </math> = oil formation volume factor, m^3/m^3 |
:<math> C_{LF} </math> = linear flow units conversion constant | :<math> C_{LF} </math> = linear flow units conversion constant | ||
:<math> C_{RF} </math> = radial flow units conversion constant | :<math> C_{RF} </math> = radial flow units conversion constant | ||
| − | :<math> h</math> = effective feet of oil pay, | + | :<math> h</math> = effective feet of oil pay, m |
:<math> J_D </math> = dimensionless productivity index, dimensionless | :<math> J_D </math> = dimensionless productivity index, dimensionless | ||
:<math> k</math> = [[Darcy's law]] permeability, d | :<math> k</math> = [[Darcy's law]] permeability, d | ||
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:<math> L </math> = [[Darcy's law]] length, cm | :<math> L </math> = [[Darcy's law]] length, cm | ||
:<math> P </math> = [[Darcy's law]] pressure, atm | :<math> P </math> = [[Darcy's law]] pressure, atm | ||
| − | :<math> \Delta P </math> = drawdown, | + | :<math> \Delta P </math> = drawdown, atm |
:<math> q </math> = [[Darcy's law]] flow rate, cm<sup>3</sup>/sec | :<math> q </math> = [[Darcy's law]] flow rate, cm<sup>3</sup>/sec | ||
| − | :<math> q_o </math> = oil flow rate, | + | :<math> q_o </math> = oil flow rate, m^3/d |
===Greek symbols=== | ===Greek symbols=== | ||
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:<math> \mu </math> = [[Darcy's law]] oil viscosity, cp | :<math> \mu </math> = [[Darcy's law]] oil viscosity, cp | ||
:<math> \mu_o </math> = oil viscosity, cp | :<math> \mu_o </math> = oil viscosity, cp | ||
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| + | ==See Also== | ||
| + | [[Darcy's law]]<BR/> | ||
| + | [[141.2 derivation]]<BR/> | ||
| + | [[18.41 derivation]] | ||
==References== | ==References== | ||
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|description=18.41 is the well know constant which is used for converting from the Darcy's law units to the metric units in the well's inflow equations. | |description=18.41 is the well know constant which is used for converting from the Darcy's law units to the metric units in the well's inflow equations. | ||
}} | }} | ||
| + | <div style='text-align: right;'>By Mikhail Tuzovskiy on {{REVISIONTIMESTAMP}}</div> | ||
Latest revision as of 12:32, 12 July 2023
Brief
18.41 is the well know constant which is used for converting from the Darcy's law units to the metric units in the well's inflow equations.
For example Darcy's law for the single-phase flow is as follows[1]:
The derivation of the 18.41 constant is given below.
Math and Physics
In Darcy's units:
![\frac{[cm^3]}{[sec]} = - \frac{[D][cm^2]}{[cP]} \frac{[atm]}{[cm]}](/images/math/5/5/5/555b9dc7f65e6db7f1cd05153aaae770.png)
Converting to the metric units:
![\frac{[cm^3] \frac{[m^3]}{[1000000 cm^3]}}{[sec] \frac{[day]}{[86400 sec]}} = - \frac{[D] \frac{[1000 mD]}{[D]}[cm^2] \frac{[m^2]}{[10000 cm^2]}}{[cP]} \frac{[atm]}{[cm] \frac{[m]}{[100 cm]}}](/images/math/a/f/f/aff7f8a69e17996a0603dfdb3d10146d.png)
So:
![\frac{[m^3]}{[day]} \frac{86400}{1000000} = - \frac{[mD][m^2]}{[cP]} \frac{[atm]}{[m]} \frac{1000 \times 100}{10000}](/images/math/1/9/a/19a0f2857c17986a841f1a1aef5d6fc0.png)
And:
![\frac{[m^3]}{[day]} = - C_{LF} \frac{[mD][m^2]}{[cP]} \frac{[atm]}{[m]}](/images/math/9/4/b/94bc5860b563656c7f4601c8fb7b4b52.png)
where
For the radial flow:
Note that the published[1] and commonly used constant in 18.41.
Nomenclature
= Darcy's law cross-sectional area, cm2
= oil formation volume factor, m^3/m^3
= linear flow units conversion constant 
= radial flow units conversion constant
= effective feet of oil pay, m
= dimensionless productivity index, dimensionless
= Darcy's law permeability, d
= effective permeability to oil, md
= Darcy's law length, cm
= Darcy's law pressure, atm
= drawdown, atm
= Darcy's law flow rate, cm3/sec
= oil flow rate, m^3/d
Greek symbols
= Darcy's law oil viscosity, cp
= oil viscosity, cp
See Also
Darcy's law
141.2 derivation
18.41 derivation
References
- ↑ 1.0 1.1
Wolcott, Don (2009). Applied Waterflood Field Development
. Houston: Energy Tribune Publishing Inc.
By Mikhail Tuzovskiy on 20230712123245
