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Reservoir Geomechanics Homework No. 7 – Development of a Geomechanical Model Solved

In this homework assignment, you will constrain a maximum horizontal stress in a site of the Barnett shale of the first, third, and fifth homework assignments. The relationship for faults in frictional equilibrium modified from (Zoback, 2007) is,

 

S1 −Pp 2 +1) +µ)2 ≤( (µ

S3 −Pp                                                                

 

if a tensile fracture does not occur, the condition in the wellbore wall in a vertical well modified from (Zoback, 2007) when a thermal stress is ignored is,

 

Shmin +SH max −2(SH max −Shmin )−2Pp −(Pm −Pp)≥To

 

if a breakout of a certain width does not occur, modified from (Barton et al., 1988), it may be assumed that a circumferential stress is smaller than an unconfined compressive rock strength,

 

Shmin +SH max −2(SH max −Shmin )cos(π−wbo)−2Pp −(Pm −Pp)≤Co

 

from (Angelier, 1979), a f is,

 

S2 −S3

φ=

S1 −S3
 

from (Simpson, 1997), an Af parameter, which scales relative stress magnitudes from 0 to 3 based on faulting style, is given by,

 

Aφ= (n+0.5)+(−1)n(φ−0.5)

 

in which S1 is a maximum principal stress, S3 is a minimum principal stress, Pp is a pore pressure, µ is a coefficient of sliding friction, Shmin is a minimum horizontal stress, SHmax is a maximum horizontal stress, Pm is a mud pressure, To is a tensile strength, wbo is a breakout width, Co is an unconfined compressive strength, S2 is an intermediate principal stress, and n = 0, 1, and 2 for normal, strike-slip, and reverse faulting types, respectively.

 

I.                    Constrain the magnitude of the maximum horizontal stress

 

In the site at a depth of 5725 feet, the minimum principal stress gradient estimated from an instantaneous shut in pressure at the end of a fracturing stage is about 0.65 psi/ft, the lower bound of a pore pressure gradient is determined from mud weight as 0.48 psi/ft, a coefficient of sliding friction is 0.75, and a mud pressure gradient is 0.53 psi/ft (Vermylen, 2011). For this homework assignment, use 0.48 psi/ft as the pore pressure gradient. At the depth of 5725 feet, the image log from which natural fractures were picked in the fifth homework assignment shows no signs of drilling induced tensile fractures or wellbore breakouts. For this homework assignment, assume that a tensile strength is 0 psi, and assume that a breakout width is 0°. An overburden stress versus depth of the site was calculated in the first homework assignment, and an unconfined compressive strength versus depth of the site was calculated from a sonic log in the third homework assignment. Calculate an upper bound of an Af of the site at the depth of 5725 feet.

 

II.                  Answer the questions on the page below

 

Numerical entry responses have a range of acceptable values and are graded electronically. Adhere to the values given here.

 

 

Zoback, M. (2007). Reservoir Geomechaincs. Cambridge: Cambridge University Press.

doi:10.1017/CBO9780511586477

 

Barton, C. A., Zoback, M. D., and Burns, K. L. (1988). In-situ stress orientation and magnitude at the Fenton

Geothermal Site, New Mexico, determined from wellbore breakouts. Geophysical Research Letters, Volume 15,

Issue 5, doi: 10.1029/GL015i005p00467

 

Vermylen, J. (2011). Geomechanical studies of the Barnett shale, Texas, USA (Doctoral dissertation). Retrieved from https://stacks.stanford.edu/file/druid:zf098jx2047/Vermylen%20Dissertation%20%28Registrar%29augmented.pdf

 

J. Angelier. Determination of the mean principal directions of stresses for a given fault population.

Tectonophysics, 56 (1979), pp. T17-T26, doi: 10.1016/0040-1951(79)90081-7

 

R.W. Simpson. Quantifying Anderson's fault types. Journal of Geophysical Research, 102 (1997), pp. 17909-17919, doi: 10.1029/97JB01274

 

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