195507094 1 Casing Desain Pengeboran

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TUBING AND CASING DESIGN

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Transcript of 195507094 1 Casing Desain Pengeboran

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TUBING AND CASING DESIGN

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Definisi

• Casing adalah serangkaian pipa / tubular yang dipasang pada sumur pemboran dan membentuk profile dari suatu sumur. Secara umum disemen ditempat.

• Tubing adalah serangkaian pipa /tubular yang dipasang pada suatu sumur sebagai media mengalirnya fluida formasi ke permukaan. Secara umum tergantikan.

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Tujuan String Design

• Memastikan integritas mekanis semua tubular yang digunakan pada suatu sumur selama masa produksi.

• Memberikan :1. Design string yang aman2. Optimasi biaya3. Dokumentasi yang lengkap dari berbagai beban yang

diterima.

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Oil Country Tubular Goods

In-Well Service – Below the wellhead Steel and Alloy Pipe

– Casing• API Spec 5CT w/ API Std 5B for threads• API Spec 5L for large diameter >16”

– Tubing• API Spec 5CT w/ API Std 5B for threads

– Drill Pipe• API Spec 5D w/ API Spec 7 for tool joints

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Identifikasi

Casing dan Tubing di identifikasi oleh 4 parameter :•Size (Ukuran – OD)•Weight (Berat – lb/ft)•Grade•End Finish (type thread – ulir)

Contoh : 9-5/8” 47.00 #/ft P-110 BTC

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Grade Material (API)

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Parameter Design

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• Stress• Strain• Modulus Elastisitas• Hooke’s Law• Poisson’s Ratio

Basic Design

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Stress

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Stress

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Strain

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Strain

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Hooke’s Law

σ = Eε•Stress is proportional to strain•E is the proportionality constant called Young’s Modulus

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Poisson Ratio

r = radial (sometimes referred to as transverse) strain

a = axial strain

a

r

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Kurva Stress-Strain

0

20

40

60

80

100

120

0 0.002

0.004

0.006

0.008

0.010

Stressσ (ksi)

Strain - ε (in/in)

0.22

0.24

Plastic Region

Ultimate Strength

Ela

stic

Reg

ion

Yield Strength

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Material Strength

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Yield StrengthThe stress beyond which the material will permanently deform.

Ultimate (Tensile Strength)The stress required to part the material

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Material Strength

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Elastic Region

At stress below yield, the material will return to its original shape after the load is removed.

Plastic Region

At stress above yield (and below ultimate) the material is permanently deformed after the load has been removed.

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Stress-Strain Curve

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0

20

40

60

80

100

120

0 0.002

0.004

0.006

0.008

0.010

Stressσ (ksi)

Strain - ε (in/in)

0.22

0.24

Yield Strength (API method)

Ultimate Strength

Proportional Limit

Yield Strength (ASTM method)

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Minimum Internal Yield

Minimum Internal Yield Pressure

(Burst)

Onset of yielding of the internal wall.

NOT RUPTURE

Ld

D

Pi

Pi

t

h

h

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2020

Minimum Internal Yield

Barlow equation for thin wall cylinders:

Solving for internal pressure:

The pressure which causes yield is:

)L)(t)(2()L)(d(P hi

d

t2P h

i

d

tY2P p

y

Pi = inside pressure, d = outside diameter, L = arbitrary length,

t = wall thickness, h = hoop stress, Py = yield pressure Yp = yield stress20

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Minimum Internal Yield

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minimum specified wall

nominal OD

minimum specified

yield

D

t 2Y 0.875 = P p

y

nominal wall thickness

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Estimated Rupture Pressure

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ultimate strength

nominal OD

nominal ID

dD

U = P pr ln Based on Tresca

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API Collapse Pressure

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Function of:– Pipe OD to Wall Thickness Ratio (D/t)– Yield Strength– Axial Stress– Internal Pressure– Ovality– Eccentricity– Residual Stress– Modulus of Elasticity– Poisson’s Ratio– Stress-Strain Curve Shape

Not part of the traditional API collapse equations.

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c,Y pa 2pP = 2Y(D t) 1

(D t )

For Low D/t Ratio Pipe3.5" 12.95 lb/ft P110

Yield Collapse

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For Moderate D/t Ratio Pipe7" 32 lb/ft T95

c,PP = Y A

B CpaD t

Plastic Collapse

Refer to API RP5C3 for values of A, B and C – formulas are on next slide25

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Factors A B and C

Values for selected yield strength is as follows:Grade A B C

K-55 2.991 0.0541 1206N-80 3.071 0.0667 1955P-110 3.181 0.0819 2852

x

x

x

x

x

x x

x

x

x

x

x

x

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For High D/t Ratio Pipe13.375" 72 lb/ft N80

c,T pP = Y F

G aD t

Transition Collapse

Refer to API RP5C3 for values of F and G – formulas are on next slide27

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Factors F and G

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For Very High D/t Ratio Pipe16" 84 lb/ft N80

1)( )tD(

1095.46 = P 2

6

Ec,tD

x

Elastic Collapse

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High Collapse Pipe

Collapse Resistance is a function of: The average D/t ratio in cross-section The API yield strength of the material The shape of the stress/strain curve The ovality of the pipe The residual stresses in the material The eccentricity of the pipe wall Modulus of elasticity and Poisson’s ratio

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Collapse With Axial Load

An axial load affects the resistance of the pipe to collapse.

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ppa2/12

paap Y} )Y/( 0.5] )Y/( 0.751 [ { = Y

Ypa = Yield strength available for collapse.

The more tension the less collapse strength.

Collapse With Axial Load

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Po= 10,000 psiPi = 0 psi

Po = 11,000 psiPi = 1,000 psi

Case A Case B

The collapse capabilities are different for these two cases.

Collapse With Internal Pressure

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API:Pe = equivalent collapse pressure

ioe PtDPP ))//(21(

Collapse With Internal Pressure

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For D/t = 10:

Case A:Pe = 10000 - (1 – 2/10) 0 = 10,000 psi

Case B:Pe = 11000 – (1 - 2/10) 1000 = 10,200 psi

ioe PtDPP ))//(21(

Collapse With Internal Pressure

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Ppb = (pipe) body yield strength, lbf

Tension Strength

pppb Y= AP

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Tension Strength

API tension strength formulas use: Minimum Specified Yield Strength Nominal Pipe Body OD Nominal Pipe Body Wall Thickness

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API does not rate pipe and connection in compression or

bending.

Compression Strength

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7.000 in 32.00 lb/ft T95 Collapse Comparison

-12000

-11000

-10000

-9000

-8000

-7000

-6000

-5000

-4000

-3000

-2000

-1000

0

-1200 -1000 -800 -600 -400 -200 0 200 400 600 800 1000

TENSION (COMPRESSION) - 1000 LBS

CO

LL

AP

SE

PR

ES

SU

RE

- P

SI

API 5C3 ISO

ISO 10400 Collapse Pressure

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Material Density

ALLOY DENSITY (lb/in3) RATIO TO CARBON STEEL

Steel 0.283 1.000

Cr13 0.280 0.989

Duplex 0.289 1.021

Austenitic 0.290 1.025

Ni-3Mo 0.294 1.039

Ni-6Mo 0.300 1.060

C-276 0.321 1.134

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API Grades Manufacture and Heat Treatment

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Tensile and Hardness Requirements

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Lo

ad

/ X

-se

ctio

n

Change in Length

Slop

e =

Mod

ulus

of E

last

. (E)

0.2%

Offs

et

Total Extension Under Load0.5% H40 – T950.6% P1100.65% Q12

Stress Strain Curve-Yield Stress API and ASTM

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Chemical Composition

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Heat Treat

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Tensile and HardnessSo

ur S

ervi

ce M

ater

ials

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Sour Service

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Inspection

Electromagnetic Ultrasonic Gamma Ray Eddy Current Magnetic Particle Pressure Test Full Length Drift

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Well Site Visual Inspections

Pipe Body Drift (Rabbit) Thread Couplings

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Exercise

Stress/Strain Exercise

You are looking at a stress-strain curve from a tension test just pulled on casing considered for your well. Find the following information from the attached stress-strain curve (see attached):

a) Elastic limit = __________________ psi.

b) Yield point (per ASTM method) = ____________________ psi.

c) Yield point (per API method) = ____________________ psi.

d) Ultimate strength = ___________________ psi.

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0

20

40

60

80

100

120

0 0.002 0.004 0.006 0.008 0.010

Stre

ss (

1,00

0 ps

i)

Strain (in/in)

0.22 0.24

Stress - Strain Diagram for Problem 6

Exercise

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