Difference between revisions of "4/π stimulated well potential"

From wiki.pengtools.com
Jump to: navigation, search
(Math & Physics)
(Math & Physics)
Line 20: Line 20:
 
:<math>dP=\frac{q B \mu}{2ky_eh} dx</math>
 
:<math>dP=\frac{q B \mu}{2ky_eh} dx</math>
  
Integration gives:
+
Integration gives: <math>P-P_{wf}=\frac{q B \mu}{2ky_eh} x</math>
 
 
:<math>P-P_{wf}=\frac{q B \mu}{2ky_eh} x</math>
 
 
 
Since average pressure is:
 
 
 
:<math>\bar P = \frac{\int P dx}{\int dx}</math>
 
  
 +
Since average pressure is: <math>\bar P = \frac{\int P dx}{\int dx}</math>
  
 +
:<math></math>
  
  

Revision as of 09:38, 10 September 2018

Brief

Stimulated well drainage

4/π is the maximum possible stimulation potential for steady state linear flow in a square well spacing.

Math & Physics

Steady state flow boundary conditions:

P |_{x=x_e/2} = P |_{x=-x_e/2} = P_i
\frac{dp}{dt} =0\ for \ \forall x

From Darcy's law:

\frac{q}{2}=\frac{kA}{B \mu}\ \frac{dP}{dx}
A =y_e*h
dP=\frac{q B \mu}{2ky_eh} dx

Integration gives: P-P_{wf}=\frac{q B \mu}{2ky_eh} x

Since average pressure is: \bar P = \frac{\int P dx}{\int dx}

Retrieved from "https://wiki.pengtools.com/index.php?title=4/π_stimulated_well_potential&oldid=4682"