FATIGUE BEHAVIOR AND STRUCTURAL STRESS ANALYSIS OF
COACH-PEEL AND LAP-SHEAR FRICTION STIR WELDED JOINTS OF
AZ31 MAGNESIUM ALLOY
by
MOHAMMED HAROON SHEIKH
J.B. JORDON, COMMITTEE CHAIR
M. BARKEY
Y. GUO
A THESIS
Submitted in partial fulfillment of the requirements for the degree of
Master of Science in the Department of Mechanical Engineering
in the
Graduate School of
The University of Alabama
TUSCALOOSA, ALABAMA
2014
Copyright Mohammed Haroon Sheikh 2014
ALL RIGHTS RESERVED
ii
ABSTRACT
In this work the fatigue behavior of coach-peel and lap-shear friction stir linear welded joints
of AZ31 magnesium alloy sheet were evaluated under different loads and the results were
compared using structural stress analysis. Lap-shear coupons of 30 mm in width were obtained
from a welded overlap configuration. However, since coach-peel configuration coupons were
not available, aluminum L-shaped brackets were adhesed weld to create the coach-peel
configured specimen. The experimental fatigue life results showed an inverse relationship
between applied load and the number of cycles to failure for both types of coupons. However,
due to differences in the configuration of the joint leading to higher applied stress, coach-peel
coupons failed at comparatively lower loads than lap-shear coupons. In order to correlate the
fatigue data with stresses developed at the weld, finite element analysis, using shell/plate
elements, was employed to model the joints under cyclic loading. The modeling effort focused
on several post-process techniques including equivalent stress and structural stress methods.
While the structural stress approach has merits over conventional nominal equivalent stress
approach for welded joints including accuracy of the results and mesh insensitivity, it could
not correlate the lap-shear and coach-peel fatigue results into a master design curve. As such,
a fatigue damage parameter (FDP) was introduced to correlate the fatigue results of both the
joints, thus establishing a basic relation to account for differences in stress at the weld for lap-
shear and coach-peel welded configurations.
iii
DEDICATION
This thesis is dedicated to my awesome family.
iv
LIST OF ABBREVIATIONS AND SYMBOLS
FSW Friction Stir Welding
FSSW Friction Stir Spot Welding
DOF Degree of Freedom
F,f Force
M Moment
σ Stress
τ Shear Stress
E Young’s Modulus of Elasticity
G Shear Modulus
Rho Density
Nu Poisson’s Ratio
SS Structural Stress
R Load Ratio
t Sheet Thickness
CP Coach Peel
LS Lap Shear
TIG Tungsten Inert Gas
MIG Metal Inert Gas
Mg Magnesium
Al Aluminum
Zn Zinc
Mn Manganese
v
ACKNOWLEDGMENTS
I would like to express my gracious gratitude to Dr. J. Brian Jordon, the chairman of the thesis
committee for selecting me to work on this project and for his continued guidance, support and
encouragement which played a phenomenal role in success of this project.
Additional appreciation is given to my committee which consists of Dr. Mark Barkey and Dr.
Yuebin Guo for guidance and for sharing their lab facility. Also I would like to thank all of the
graduate students working with Dr. Jordon: Harish, Bobby, Rogie and Joao for their help and
co-operation.
Also I would like to take this opportunity to thank all of my friends, UA students and faculty
for their extended support and necessary encouragement. Also Johnny Goodwin and Rob
Holler at UA central analytical facility deserve special thanks for their kind co-operation.
The greatest thanks of all goes to my family for their unconditional love, continuous support
and un-wearying faith in me from a distance of thousands of miles.
vi
CONTENTS
ABSTRACT ..............................................................................................................................ii
DEDICATION .........................................................................................................................iii
LIST OF ABBREVIATIONS AND SYMBOLS ....................................................................iv
ACKNOWLEDGMENTS..........................................................................................................v
LIST OF TABLES .................................................................................................................viii
LIST OF FIGURES ..................................................................................................................ix
1. INTRODUCTION
1.1 Need for Lightweight Materials ……...................................................................................1
1.2 Friction Stir Welding…………………….……………............................……...................1
1.3 Merits of Magnesium Alloy..................................................................................................3
1.4 Fatigue Behavior of Friction Stir Welding..……………............................……..................4
2. MATERIALS AND EXPERIMENTAL APPROACH
2.1 Materials and Specimen Preparation.....................................................................................7
2.2 Experimental Setup……………….......................................................................................9
3. FINITE ELEMENT ANALYSIS
3.1 Finite Element Analysis …………….................................................................................10
3.2 Structural Stress ……….....................................................................................................11
3.3 Finite Element Setup…………………...............................................................................15
3.4 Fatigue Data Correlation Using Equivalent Stress Approach .............................................17
4. RESULTS AND DISCUSSIONS
4.1 Microstructure of FSW …………….…………….............................................................19
4.2 Fatigue Test Results.……………………………..............................................................21
4.3 Fracture Behavior …………..............................................................................................22
vii
4.4 Structural Stress Results………………….........................................................................25
4.5 Conclusions………………................................................................................................29
REFERENCES………………………………………………….…………………….……...31
APPENDIX A1………………………………………………….……………………….…..36
APPENDIX A2………………………………………………….…………………………...37
viii
LIST OF TABLES
Table 2.1: Chemical Composition of AZ31 (mass%) ….…….…………………...…………..7
Table 3.1: Material Properties ……………..…...…………….…………………...…………17
ix
LIST OF FIGURES
Figure 1.1 Schematic Drawing of Friction Stir Welding Process………...………………….....2
Figure 1.2 Comparison of specific Young’s Modulus and Strength of Different Materials…....4
Figure 2.1 Preparation Steps: Coach Peel Specimen ………………..........……..….....……….8
Figure 2.2 Prepared: Coach Peel Specimen ……………………..……............……....…....…..8
Figure 2.3 Coach Peel Specimen before test…………………….....……...……………....…...9
Figure 2.4 Coach Peel Specimen after test…………………………….…...……………...…...9
Figure 3.1 Structural Stress Definition at the Weld Toe….........……………..…...……..…....12
Figure 3.2 Structural Stress Procedure for Shell/plate FE model………..……………..….…..14
Figure 3.3 Finite Element Model Set………………………..………….....……...……...……16
Figure 4.1 Macro and Micro- structure of FSW AZ31 Lap Joint...............................................20
Figure 4.2 Cycles to Failure variation with load applied for CP and LS Specimens.……...…..22
Figure.4.3 Failed lap shear specimens loaded on the advancing side........................................23
Figure.4.4 Coach Peel Failed specimens loaded on the advancing side.....................................24
Figure.4.5 Cycles to Failure variation with VonMises Stress....................................................25
Figure.4.6 Cycles to Failure variation with Equivalent Stress...................................................26
Figure.4.7 Bending Component variation along the weld line ..................................................27
Figrue.4.8 Membrane Component variation along the weld line..............................................27
Figrue.4.9 Maximum Shear Stress variation along the weld line..............................................28
Figure.4.10 FDP versus Cycles to Failure for Coach Peel.........................................................28
1
CHAPTER 1
INTRODUCTION
1.1 Need for Lightweight Materials
Due to continually increasing fuel prices and stringent pollution norms enforced by
governments all across the globe, the transportation industry, which includes automotive,
aerospace and ship-building is showing huge interest in manufacturing lightweight and
environment friendly products (e.g. cars, aircrafts, ships etc.). The process of light weighting
designs is essential to reducing fuel consumption and gas emission of vehicles [1,2]. This
motive has been further strengthened by the need to lower the cost of manufacturing without
compromising the strength and quality of the structures. The eco-friendly lightweight vehicles
can only be produced by replacing conventional iron-based metals and alloys with high strength
lightweight materials such as aluminum, magnesium and reinforced polymer composites [3-5].
These materials exhibit a combination of high strength properties with low density which
accounts for substantial weight reduction and improved vehicle performance by reducing
energy required for acceleration and rolling resistance, thus reducing the fuel consumption
which results in lower greenhouse emissions [6-8].
1.2 Friction Stir Welding
Some commonly employed metal joining techniques include fusion welding and resistance
spot welding which produce strong joints for ferrous based alloys. However to join non-ferrous
materials, these techniques have some limitations in the form of added process complexity,
drastic change in mechanical properties and poor mechanical performance [9-11]. In 1991 one
of the most significant developments in metal joining process took place in the form of a new
2
welding technique known as friction stir welding (FSW). FSW is a new versatile solid-state
joining technique with high energy efficiency and is environmentally friendly. In FSW, a
rotating tool pin is embedded into the interfacial material surfaces of plates to be joined with a
pre-determined tilt angle and then it is moved along the welded joint. Hence, materials are
joined by the frictional heat generated by the rotating tool at the interfacing material surfaces.
This generated heat along with the penetrating force applied on the tool causes plastic
deformation at the welding zone leading to joint formation. Fig. 1.1 [12] shows the general
arrangement of the FSW process. The amount of penetration of the tool varies according to the
thickness of the specimens, however for a lap-joint at full penetration, the tool shoulder makes
contact with the top surface of the bottom sheet of the specimen [13,14].
The FSW process has several advantages over conventional fusion welding techniques like
metal inert gas (MIG) and tungsten inert gas (TIG). Due to its low process temperature, below
the melting point, FSW is suited for joining thin or difficult to weld materials [15]. The most
important ability is the capacity to join dissimilar materials with high mechanical performance
[16,17]. With no melting issues regarding microstructure formation, issues like weld zone
shrinking from solidification and high risk of porosity in weld zone normally found in fusion
welds are thus avoided. The FSW joint is formed by friction heating with simultaneous severe
plastic deformation of the weld zone material. This stirring of the tool minimizes the risk of
Fig. 1.1. Schematic Drawing of Friction Stir Lap Linear Welding Process [12]
AS: Advancing Side
RS: Retreating Side
Pin
Tool Shoulder
3
having excessive local amounts of inclusions, resulting in a homogenous weld. The heat
distortions due to excessive heat normally found in fusion welding processes are avoided which
reduces the amount of residual stresses, and as such the deformation is easier to control. Thus
FSW requires lower resources, generates no emission, offers better controllability and produces
better quality joints when compared to conventional joining techniques like TIG and MIG
processes. Hence FSW has been gaining tremendous interest to replace conventional welding
techniques and has been used widely since its invention. With regard to the quality of the joints,
it is found that FSW specimens are usually stronger and have higher fatigue resistance than
specimens welded by TIG and MIG processes [18-23]. Also the welds formed using FSW
possess little distortion, low residual stresses and few weld defects [24]. This accounts in
general for higher life of friction stir welded joints.
Application of FSW ranges from small-scale component production such as cooling elements
and electric engines to welding to large panels used in ship building, in train wagons, offshore
structures and in bridge constructions.
1.3 Merits of Magnesium Alloy
As explained by factors like strict legislative rules, an increasing demand for fuel efficient
lightweight vehicles and lower manufacturing costs have driven automotive sector towards
stronger and lighter materials for vehicle manufacturing. The selection of an appropriate
material apart from weight and strength depends on economic feasibility. Mg alloys with its
good strength to weight ratio is a potential candidate offering a combination of lightweight
construction and desired strength. Hence, Mg alloys can be used in applications where low
mass and high specific properties are required. Also when Young’s modulus and high specific
strength magnitudes were compared, Mg alloys exhibited similar or even better values than
aluminum alloys and many commercial steels as shown in Fig. 1.2. Also, due to its increasing
4
uses, the cost per ton of Mg alloys are decreasing, thus making it more competitive from an
economic point of view [6].
1.4 Fatigue Behavior of Friction Stir Welding
The issue of fatigue in friction stir welded overlap joints is complex. This is in part due to
factors including variation in welding and loading configuration. Thus regarding overlap
friction stir welded fatigue results, literature primarily focuses on a variation of FSW: friction
stir spot welding (FSSW). In order to provide a thorough understand of fatigue in FSW in
magnesium alloys, a brief review of fatigue of FSSW is presented. Yin et al. [25,26] explained
that the hook formation and the overlap shear strength properties of AZ31 FSSW joints and
found that fatigue load strength of AZ31 is a function of dwell time of the tool. Also it is
concluded that stir zone microstructure and mechanical properties govern the fatigue life of the
AZ31 and AZ91 magnesium alloys. Furthermore, Jordon et al. [27] analyzed the fatigue
performance and failure mechanisms of FSSW in AZ31 alloy and presented the modeling
comparison with the experimental results. Mallick et al. [28] studied and discussed the fatigue
behaviors of FSSW joints in lap shear specimens of AM60 magnesium alloy and AA5754
aluminum alloy and analyzed the stress distribution and the location of maximum stresses in
Fig. 1.2. Comparison of specific Young’s modulus and strength of different materials [6]
5
FSSW joints in Mg-Mg specimens by using FEM. Luo et al. [29] investigated fatigue behavior
of FSSW specimens for AZ31 magnesium alloy sheet, and the fatigue strength, fatigue crack
propagation characteristic and failure mechanism is discussed in detail. It is reported that all
fatigue failures occurred in the stir zone of FSSW AZ31 magnesium alloy sheet joints. It was
also found that failure modes were different for high load and low load fatigue tests. The
magnitude of applied force also governed the crack initiation and propagation.
To the best of the author’s knowledge, no fatigue data exists for FSW overlap welds. However,
some work has been carried out on FSW butt-welded joints. Ericsson et al. and others
[18,30,31] have shown that the fatigue performance of FSW joints in aluminum alloys such as
5082/5083 Al alloys are far superior than that of MIG or TIG welded joints. Tsujikawa et al.
[32] studied and analyzed the factors affecting the fatigue strength of the welded commercial
magnesium alloys welded (FSW and TIG) joints. Joint efficiencies for static tensile strength
and fatigue strength were measured. They reported joint efficiencies value of 60% for fatigue
strength tests of AZ61 and 80% for AZ31 Mg alloy. The fatigue test results of welds prepared
using FSW is limited due to the recent invention of this welding method. Among the available
literature, the majority of the studies reporting fatigue behavior of the FSW have been limited
to constant amplitude loading [22]. Chowdhury et al. [33] evaluated lap shear strength and
fatigue properties of friction stir spot welded AZ31B-H24 Mg alloy and 5754-O Al alloy in
three different combinations: Mg-Mg, Al-Al and Al-Mg. They reported that both similar welds
had significantly higher lap shear strength, failure energy, and fatigue life compared to the Al-
Mg dissimilar weld. Furthermore, three different types of failure modes were observed. In
similar welds, higher cyclic loads resulted in nugget pullout due to fatigue crack propagation
circumferentially around the nugget, while at lower cyclic loads fatigue failure occurred
perpendicular to the loading direction caused by the opening of keyhole through crack
initiation.
6
While the primary focus of this thesis is related to FSW overlap welded joints, it is pertinent to
briefly discuss the fatigue behavior of coach-peel configured data for spot welds since data
does not exist for linear overlap joints. Coach peel specimens are primarily selected to evaluate
monotonic and fatigue strengths of joints (including riveted, welded) subjected to shear and
bending loads. Badarinarayan [34] has demonstrated fatigue failure of coach peel joint made
with different plate thickness in context with automotive closure panel. During fatigue tests it
was found that the loaded thin sheet of the coach-peel joint developed cracks which resulted in
pullout of thin sheet around circumference of nugget followed by joint failure where top sheet
broke free. When compared to lap-shear specimens, coach-peel specimens failed at lower
fatigue amplitudes for the same number of cycles to failure. In spite of the fact that the need of
coach-peel joint testing and evaluations exists, no investigation of deformation or fatigue
strength of friction stir welded joints of magnesium alloy in coach peel configuration exists.
Therefore the primary objective of this research is to investigate and evaluate fatigue strength
of coach-peel configuration of friction stir welded joints and determine appropriate FEA
modeling techniques.
7
CHAPTER 2
MATERIALS AND EXPERIMENTAL APPROACH
2.1 Materials and Specimen Preparation
In this research magnesium AZ31 alloy sheets of thickness 2 mm were used to prepare FSW
joints for fatigue testing. Table 2.1 presents the nominal chemical composition of AZ31
magnesium alloy. Prior to welding two magnesium sheets 700 mm long and 75 mm were
overlapped along the width and were tightly clamped on the worktable by the welding fixture.
The overlap along the longitudinal direction of the plate was 30 mm wide. The FSW tool used
was made of standard tool steel (H13) material and has shoulder diameter of 12 mm, pin length
of 3.2 mm with left hand threads and 10-degree concave shoulder. During FSW process tool
speed was maintained at 1000 RPM, tool plunge speed was kept at 20 mm/ min, shoulder
plunge depth was 0.1 mm.
The obtained lap-shear coupon was machined from the welded plate and contained the
following dimensions: total length of 120 mm, with overlap length 30 mm and width 30 mm.
In order to obtain coach-peel configuration coupons from the existing lap-shear coupons, the
following modification was made; 1) The legs of the overlap coupons were removed as shown
in Fig. 2.1; 2) 1/8 inch thick aluminum 6061 L-brackets were adhesed to the remaining FSW
joint. The aluminum brackets were joined to the FSW weld using 3M DP125 peel resistant
Al Zn Mn Fe Si Ni Cu Mg
2.92 0.85 0.46 0.002 0.006 <0.001 0.001 Bal.
Table 2.1 Chemical composition of AZ31 Alloy (mass %)
8
epoxy adhesive as shown in Fig. 2.1. (Please refer Appendix A1 for preparation steps detail).
Figure 2.2 shows a prepared coach peel sample before fatigue testing. Through trial-and-error,
it was determined that a minimum of 0.5 mm thick layer of adhesive was needed for optimal
strength. Prior to testing, the FSW joints were sectioned to characterize the microstructure and
geometrical features of the weld.
Fig. 2.2 Prepared Coach Peel Specimen
Weld Coupon
Epoxy
Glue
L-Bracket
CP Specimen Al-Brackets LS Specimen
Fig. 2.1 Preparation Steps: Coach Peel Specimen
9
2.2 Experimental Setup
The ultimate tensile load obtained during the tensile testing was subsequently used for
determining the maximum load to be used in the load controlled fatigue tests. Fatigue failure
tests for both types of specimen: coach-peel (CP) and lap-sheer (LS), were performed on fully
computerized MTS servo-hydraulic testing system with hydraulic grips, as shown in Fig. 2.3.
The grip-to-grip distance was 45 mm and 60 mm for coach-peel and lap-shear specimen,
respectively. For each load amplitude two specimens of same configuration and type were
tested. Load controlled constant amplitude fatigue tests were conducted according to ASTM
Standard E466 (“Standard Practice for Conducting Force Controlled Constant Amplitude Axial
Fatigue Tests of Metallic Materials”) where applicable. The load ratio (R=Pmin/Pmax) was kept
constant through the tests at 0.1. The applied cyclic loading waveform was sinusoidal and the
frequency of loading used varied from 2 Hz to 5 Hz, where most tests were conducted at 5 Hz.
Failure due to fatigue was defined as the complete separation of the specimens into two parts
as shown in Fig. 2.4.
Fig. 2.3. Coach-peel specimen before fatigue
testing.
Fig. 2.4 Coach-peel specimen after fatigue
testing.
10
CHAPTER 3
FINITE ELEMENT ANALYSIS: STURCTURAL STRESS DEFINITION
& FORMULATION
3.1 Finite Element Analysis
It is evident that while experimental work in the form of fatigue static testing etc., provides the
necessary physical insight about the behavior of the welded joints, predictive tasks such as
design, analysis and evaluation of the welded structures is often carried out by computational
methods. Stress estimation for a structure under a specific application is critical because a 10%
variation in stress value could translate into number of cycles to failure that varies by as much
as 100- 200%. Hence stress analysis is used to primarily ascertain structural viability and
integrity of structures such as ships, automobiles, aircrafts etc., under their respective operating
conditions. This type of analysis often involves use of an abstract or mathematical model for
the representation of the structural system and loads, e.g. partial differential equations are
employed to achieve classical analytical idealization. As complexity of the structural geometry
limits application of partial differential equations for structural mechanics analysis, numerical
approximation methods are often sought instead.
Similarly, analysis of any welding process includes a coupling of different mathematical
models used to address the static and dynamic behavior of the system. Numerical methods have
been used to implement these models. The use of finite element method (FEM) is a well-
established method for product development and manufacturing process improvement. FEM
offers efficient and economical product development thus aiding in productivity and quality of
products by offering better understanding of the influence of different process parameters.
11
Similarly FEM has been proved to be a powerful tool in welding analysis for the prediction of
welding deformations and residual stresses. Due to the versatility and economic benefits in
terms of costs and capital spent, FE has been used to predict fatigue life and failure
characteristics of the welded joints extensively. The FEM requires discretization of the domain
(structure) or boundary of interest into a large number of small elements connected via nodes.
By retrieving nodal forces and displacements from the model, these parameters can be used to
calculate different factors like structural stresses, principle stresses, and VonMises stresses etc.
to predict failure behavior of the structure or structural joint. This can be easily achieved while
using two and three-dimensional solid element models.
3.2 Structural Stress
Traditionally the fatigue life of a structural component (e.g. welded structures) is predicted
using nominal stress approach along with S-N curves generated using fatigue tests results. This
approach is relatively simple but sometimes is very difficult to apply for welded structures
because of the often challenge in determining nominal stress in complicated structures and
complex loading conditions. Furthermore, local stress concentration due to macro and micro
geometric effects of welded joints and residual stress effect due to different manufacturing
processes is not taken into account which can lead erroneous predictions [35,36].
Local stresses which occur in front of the weld toe or weld end notch (or on the inside of the
plate in front of the weld spot) is designated as structural stress [37]. The structural stress
approach is useful for calculating stresses where the structure contains geometric
discontinuities, e.g., welded joints, notches, ridges, bends, sharp corners, etc. As it considers
influence of all the global geometric parameters structural stress is also referred as “geometric
stress” and the maximum value of structural stress is known as ‘hot-spot stress’. This structural
stress can be considered as largely identical to the surface stress which can be calculated at the
12
hot spot in according with structural theories used in engineering by neglecting the notch effect
[38-40]. This type of stress approach has the capability to describe the macro-structural
behavior of welded structures and has been widely used to assess fatigue life of welded
structures. Because the stress concentration caused by a change in structural geometry is
included, the structural stress approach is considered more accurate than the nominal stress
approach [37]. Accordingly the structural stress in a localized fatigue-prone region of a
structure is defined in terms of the bending and membrane components. The stress values
within some distance from the weld toe can change significantly as the finite element mesh size
changes which is known as mesh-size sensitivity. The local stresses near a notch are mesh-size
sensitive due to the asymptotic singularity behavior as a notch position is approached. However
structural stress approach eliminates or minimizes the mesh-size sensitivity in stress
calculations due to the fact that the local stress concentration close to a notch is dominated by
self-equilibrating stress distribution [41-43].
The structural stress approach uses a definition of stress based on an idealized distribution in
the thickness of the members in proximity of the welds where the stress component orthogonal
to the weld line (which is also responsible for crack propagation) is reduced to a linearized
Fig. 3.1. Structural Stress Definition at the weld toe [44]
Weld Toe
13
distribution to find the weld stress levels. As a result of this linearization, the structural stress
σs at the weld toe is composed by a membrane component σm, constant in thickness and a
bending component σb, as depicted in Fig. 3.1 [44,45] . The remaining self-equilibrated non-
linear σnl is not considered, hence the structural stress includes only the effects of gross
structural discontinuities but disregards the local notch effect due to weld geometry.
In general, linear elastic finite element analysis cannot calculate the stresses at the edge of the
welded joints even if the finely meshed models are used mainly because of the considerable
plastic deformation at the edge of the weld nugget. In finite element modeling of a weld used
to calculate structural stresses, shell elements are used to represent the weld nugget and welded
elements. Based on the forces and moments obtained from the FE model, structural stresses are
calculated using linear elastic equation of beam and plate theory. The use of nodal forces and
moments has the distinctive advantage of providing a structural stress fairly insensitive to the
mesh element size and type in the areas corresponding to the weld toes. The typical mesh-
dependence is found in the traditional surface extrapolation method and partly in the through
thickness linearization is hence overcome. The stresses extrapolated to the nodes bear influence
from the element formulation and by the geometric characteristics of the FE, whereas nodal
forces are derived directly from the equilibrium of the structure. Using this approach the nodal
forces and moments for each element are calculated from the stiffness matrices and the nodal
displacements and rotations [42,46-49]. This structural stress is caused by the bending moment
along the weld line and by the normal force perpendicular to the weld line in the element plane
as shown in Fig. 3.2 below [42,46,50]. For the local through thickness stress distribution near
weld toe, it’s found that there exists a corresponding simple structural stress distribution, well
documented by Dong et al. [42]. This structural stress distribution has been represented by
14
membrane and bending components that are equilibrium-equivalent to the local stress
distribution.
Shell and plate element models of complex structures are widely used to perform stress and
fatigue analysis, where help of shell and plate theory is sought to obtain converged FE
solutions. In this study a shell and plate element model is used to represent coach-peel and lap-
shear joints and nodal forces and moments have been utilized to calculate the normal stress
acting on each FE element which is essentially a structural stress as for welded thin-sheet
structures cracks are most often located at the weld toes and is oriented along the weld line
[50]. Referring to Fig. 3.2, the weld line is oriented along Y-axis, while weld lies in plane XY.
Also it should be noted that in the present analysis, global and local coordinate systems have
the same orientation, hence no transformation of nodal forces and moments is required as
suggested by Dong et al. and others [42,51,52]. The procedure presented by Dong et al. to
calculate structural stress has been proven to provide consistent characterization of stress
concentration effects at the weld toe while achieving a good mesh-size and element type low
Fz
my
Fig. 3.2 Structural Stress Procedure for Shell/Plate FE Model
15
sensitivity for continuous welds. Hence it’s been widely used to determine structural stress.
Using the analytical model presented by Fermer et al. [50] and the structural stress model for
shell and plate elements using nodal forces and moments established by Dong et al., the method
to calculate structural (normal) stresses for the weld joint shown in Fig. 3.2 can be presented
as follows:
𝜎𝑛 = 𝜎𝑚 + 𝜎𝑏.....................................................(3.1)
𝜎𝑛 =𝑓𝑧
𝑡± 6
𝑚𝑦
𝑡2…………………………………………………(3.2)
3.3 Finite Element Setup
In the presented FE analysis of the lap-Shear and coach-Peel joints, welded joints are modeled
as a combination of shell elements where continuous linear friction stir weld is modeled as
shell element with thickness (13.5 mm) pertaining to the width of the weld nugget aligned in
the direction of weld line (along y-axis) as shown in Fig. 3.3. The weld plates are assigned a
thickness value of 2 mm. The end-to-end distance for lap-shear and coach-peel specimens was
kept at 60 mm and 45 mm respectively with the bottom end completely fixed (zero DOF) and
the top end free to move along z-axis (1 DOF) which is consistent with the experimental fatigue
test setup. As explained earlier, coach-peel specimens were prepared using lap-shear joints with
the aid of epoxy. Hence the epoxy joint is modeled with shell elements with a thickness of 0.5
mm along with corresponding material properties to represent thickness of epoxy layer. The
modeling and simulation was performed using Hypermesh 11.0 and optistruct solver was used
for calculating nodal forces, moments and stresses. Table 3.1 shows the material properties
used for the FE calculations.
16
Coach Peel
Lap-Shear
Fig. 3.3 Finite Element Model set
17
* Refer appendix A2 for source details
3.4 Fatigue Data Correlation Using Equivalent Stress Approach
In order to correlate the fatigue test data with the stress experienced by the specimens, an
equivalent structural stress (𝜎𝑒𝑞) approach is employed, where a combination of maximum
shear stress (𝜏𝑚𝑎𝑥) and corresponding normal stress (𝜎𝑛) are included [53]
𝜎𝑒𝑞 = 𝑘1𝜎𝑛 + 𝜏𝑚𝑎𝑥 (3.3)
𝜎𝑛 = 𝜎𝑚 + 𝜎𝑏 (3.4)
where,
𝜎𝑛 =𝑓𝑥
𝑡± 6
𝑚𝑦
𝑡2 For coach-peel specimen…………………………………. (3.5)
𝜎𝑛 =𝑓𝑧
𝑡± 6
𝑚𝑦
𝑡2 For lap-shear specimen………………………………….... (3.6)
According to the forces transferred by weld nugget for lap-shear specimen, stresses at the
nugget include both in-plane tensile loading and bending. However for the coach-peel
specimen, stresses at the nugget is dominated by bending. Also for the welded thin-sheet
structures, cracks are most often located at the weld toes and oriented along the weld line.
Hence in order to incorporate the stress induced on the welded joint due to different forces,
normal stress 𝜎𝑛 is defined as a combination of tensile and bending loads as shown in equation
Property Aluminum 6061 Magnesium AZ31 DP 125
E (MPa) 6.9 x 104 4.5 x 104 18.96
G (MPa) 7 x 104 5 x 104 17.56
Nu 0.3 0.35 0.32
Rho(t/mm3) 2.72 x 10-9 1.77 x 10-9 1.05 x 10-9
Table 3.1 Material Properties *
18
3.5 and 3.6, where bending moment along the weld line and normal force perpendicular to the
weld line in the plane of element were considered.
In order to correlate fatigue results of coach-peel and lap-shear tests a parameter is defined
which is referred as fatigue damage parameter (FDP),
𝐹𝐷𝑃 = 𝜎𝑒𝑞𝑒𝑘2𝜎𝑚𝑎𝑥
𝜎𝑚𝑖𝑛
(3.7)
where , 𝜎𝑚𝑖𝑛 Minimum normal stress
𝜎𝑚𝑎𝑥 Maximum normal stress
The FDP is calculated for specimens with two different geometries i.e. coach –peel and lap-
shear involving different loading conditions and fatigue loads are calculated and applied to
correlate experimental data. The model parameters k1 and k2 are optimized to obtain a good
correlation between the coach-peel and lap-shear test results. The equivalent structural stress
is calculated along the weld line at the weld nugget edge which bears the maximum stress as
evident from the FE model. The maximum equivalent stress magnitude is determined by
comparing the stress values for all the elements at mentioned location. The element with a
maximum 𝜎𝑒𝑞 is considered to be the critical location for crack initiation and the corresponding
𝜎𝑒𝑞 is used for FDP calculation.
19
CHAPTER 4
RESULTS AND DISCUSSIONS
4.1 Microstructure of FSW
Using optical imaging, microstructural variation in different zones of a FSW joint can be
identified which exists primarily due to differences in plastic deformation and frictional heat
generated during FSW process [54,55]. A macroscale view of cross-sectional plane of the FSW
is shown in Fig. 4.1 (a) Higher magnification images at various locations of the top and bottom
weld sheet in a FSW AZ31 lap joint shown in Fig. 4.1(a) are presented in Fig. 4.1 (b-g).
As shown in Fig.4.1 the microstructure of the weld can be generally classified into three distinct
regions namely: stir zone (SZ), the thermo mechanically affected zone (TMAZ) and the heat
affected zone (HAZ). The microstructure of the cross section in the retreating side and
advancing side is different, which is relative to the flow field of weld. The tunnel defect usually
can be seen near the RS zone [56]. As reported [57-59], due to FSW coarse grains in the base
metal turns into equiaxed and fine grains in the SZ resulting from the dynamic recrystallization
as a result of severe plastic deformation and frictional heat generated during FSW process. It
is also reported that pin geometry of the tool greatly affects the grain formation in SZ,
discussion of which is out of scope of this study. Typically the TMAZ, which is adjacent to
nugget, has deformed grains mainly due to high temperature during FSW. However the grain
structure in HAZ remains same as that of BM.
20
In several previous researches [60,61], authors have concluded that during FSW process, the
SZ gets exposed to a temperature higher than the recrystallization temperature but lower than
the melting point. This effect in association with the stirring effect of the tool, produces fine
and equiaxed grains in SZ as evident from Fig. 4.1 (d), hence it can be concluded that the SZ
underwent dynamic recrystallization (DRX). Furthermore, it is found that within nugget, the
grain size differs significantly, where grains in the SZ are finer than the ones at the top part of
the nugget next to top weld surface (Fig. 4.1 (d) and (e)) Fig. 4.1 (c) can be identified as HAZ
where grain structure is slightly different than that of BM. The microstructure of BM is shown
in Fig. 4.1 (b) and (g) it is mainly composed of granular magnesium solid solution grains.
TMAZ can be identified at location Fig. 4.1 (f) where nearly equiaxed grains are found which
HAZ TMAZ FLOW ARM HAZ TMAZ
AS RS
WELD NUGGET
(SZ)
Fig. 4.1 Macro and Micro- structure of FSW AZ31 Lap Joint
(a)
(b)
(c) (d)
(e) (g)
(f)
21
are finer than HAZ but coarser than SZ. Therefore based on the grain microstructures in the
TMAZs of the presented joint, it can be concluded that DRX occurred in TMAZs as well under
the combined effects of heating and deformation which resulted in the generation of nearly
equiaxed grains.
Fig. 4.1 (g) presents the bottom sheet weld microstructure at location which can be classified
as zone outside of the HAZ. The images presented can be used to compare grain size and
orientation at different locations as one moves away from the center of the weld. A close
observation shows that grain size increases from SZ to BM, which is in accordance with the
results published elsewhere [54-56,62-64].
4.2 Fatigue Test Results
Figure 4.2 presents the fatigue test results for coach-peel and lap-shear specimens where cycles
to failure is plotted against load applied (N). For comparison purpose fatigue tests were
designed in a way that, under the application of load for both types of specimen, the number of
cycles to failure fell in the range of 103 to 106. Initial fatigue tests of coach-peel specimens
revealed failure of joint occurred at lower loads when compared to loads applied during fatigue
tests of lap-shear specimens. Due to their geometry, coach-peel specimens were required to be
subjected to lower magnitude of loads as compared to lap-shear specimen which can bear
higher loads. Hence different load magnitudes were selected to test coach-peel and lap-shear
specimens. This is evident from Fig. 4.2, which shows that the coach-peel specimen failed at
lower loads for the same number of cycles to failure as that of lap-shear specimens.
22
4.3 Fracture Behavior of Lap-shear and Coach-peel Specimens
Figure. 4.3 shows cross-section view of two failed lap-shear samples which were loaded at
advancing side: (a) low cycle loading, where the specimen was subjected to maximum load of
2069 N which resulted in fatigue failure after 503 cycles, and (b) high cycle loading, where the
specimen was subjected to maximum load of 371 N which caused fatigue failure after 353,589
cycles. It is clear that the failure resulted along the line of the interfacial hook that existed
between the two plates which terminated in the form of upward facing hook as shown in Fig.
4.3 (marked with a circle). At a higher magnitude of fatigue loading the upward facing hook at
the nugget boundary travels approximately in a normal direction to the top weld surface in the
form of crack as shown in Fig. 4.3a. This resulted in crack propagation through the weld nugget
edge, which later resulted in final rupture through the top of weld thickness, resulting in weld
failure. However in case of lower magnitude of fatigue loading, the crack initiated (marked
with a circle) at the end of interfacial hook and travels along the nugget boundary as shown in
Fig. 4.3b. It is anticipated that due to lower load application, the developed cracks propagated
rather slowly when compared to the higher fatigue load crack propagation. It should be noted
Fig. 4.2 Cycles to failure variation with load applied for coach-peel (CP) and lap-shear (LS) specimens.
1
10
100
1,000
10,000
1.0E+02 1.0E+03 1.0E+04 1.0E+05 1.0E+06 1.0E+07 1.0E+08
LO
AD
(N
)
CYCLES TO FAILURE
CP LS
23
that in this case the crack propagation followed a path along the nugget boundary without
rupturing the nugget, as this is primarily due to the lower magnitude of the fatigue load. It
important to note that the weld nugget in Mg alloys has the highest hardness and strength level
compared to the TMAZ, HAZ and BM [56,65-67]. Hence it takes higher stresses to rupture
weld nugget as observed in low cycle higher fatigue load test.
Figure 4.4 summarizes the crack propagation and final failure for high cycle and low cycles
coach-peel specimen during fatigue testing. Figure 4.4a shows high cycle (low load) fatigue
failure where the crack initiates at half weld thickness location next to nugget boundary
(marked with circle) where two sheets merge due to FSW. It should be noted that, this is also
the location of upward facing interfacial hook. After initiation and crossing the interfacial hook
location, the crack propagates along the nugget boundary away from the weld center in an
upward-right direction and final failure occurred due to the travel of the crack through the weld
Fig. 4.3 Failed specimens loaded on the advancing side: a) fatigue at 503 cycles and
maximum load of 2069 N, b) fatigue at 353589 cycles and maximum load of 371 N.
AS RS
(a)
RS AS
(b)
24
top surface where, due to lower thickness of the weld the crack changed the propagation
direction to an upward-left direction. Due to the higher number of cycles to failure it can be
concluded that, in this case, the crack propagated at a slower rate till it reached the minimum
weld thickness, where it the traveled faster. In the case of the low cycle (high load) shown in
Fig. 4.4b, the crack initiated at the location of interfacial hook, hence the initiation of the crack
was the same as that of high cycle case. However unlike in the high cycle failure case, the crack
changed direction of propagation towards the center of the weld. During each successive cycle
to failure, the crack propagated more closely to the nugget center and follows an upward and
left direction of propagation as shown. It should also be noted that the crack appears to follow
a steeper leftward path just before final failure which is mainly due to lower thickness of weld
at the center, where under application of same magnitude of fatigue load, the crack took less
energy to travel. As the failure occurred at lower number of cycles, it can be deduced that the
crack propagation was faster when compared to low cycle application primarily due to higher
load magnitude. Furthermore, the difference in crack propagation and final failure can be
attributed to the magnitude of applied force and difference in microstructures at various zones.
Similar failure modes have been reported by Yang et al. for AZ31 linear FSW lap joints [68].
(a)
(b)
Fig.4.4 Failed coach-peel specimens loaded on the advancing side: a) fatigue life at 193,330 cycles
for a maximum load of 178 N., b) fatigue life at 4,548 cycles for a maximum load of 400 N.
(AS)
(AS)
(RS)
(RS)
25
4.4 Structural Stress Results
Figure 4.5 shows the variation of number of cycles to failure with maximum von Mises stress
acting on the lap-shear and coach-peel joints during the fatigue tests. It is evident that coach-
peel specimen experienced higher von Mises stress compared to the lap-shear specimens.
Figure 4.6 shows the result of the structural stress determined from the FEA associated with
the applied remote loading during the experimental fatigue tests. Similar to the von Mises stress
analysis, the equivalent structural stress for the coach-peel specimen is of higher magnitude
when compared to lap-shear specimen. As equivalent SS is a combination of normal stress and
shear stress, it can be deduced that stress levels due to normal and shear forces in the coach-
peel specimen are higher. This is primarily attributed to the different orientation of coach-peel
weld with respect to line of loading during the fatigue tests. In case of the lap-shear fatigue
tests, the weld plane is parallel and in the line of action of the fatigue loads. However in the
case of the coach-peel tests, the fatigue load acts normal to the weld plane. Hence it can be
concluded that weld orientation and load application of the coach-peel joints underwent higher
Fig. 4.5 Cycles to Failure variation with VonMises Stress for Coach Peel (CP) and
Lap-Shear (LS) Specimen
1
10
100
1,000
10,000
1.0E+02 1.0E+03 1.0E+04 1.0E+05 1.0E+06 1.0E+07 1.0E+08
MA
X V
ON
MIS
ES
(M
PA
)
CYCLES TO FAILURE
CP
LS
26
stresses for a comparatively lower magnitudes of applied load. This also explains the higher
equivalent SS in coach-peel specimen and lower equivalent SS levels in lap-shear welds.
In order to quantify the lower fatigue life of the coach-peal specimen and higher stress levels,
it is imperative to analyze the induced maximum stress level. As explained earlier, equations
3.5 and 3.6, as per definition, the structural stress or normal stress consists of a bending
component (BC) and a membrane component (MC). Hence the effect of the BC and MC along
the weld line at the maximum stress location (i.e. adjacent to weld nugget) requires an
investigation. Being a contributing factor for equivalent stress (equation 3.3), maximum shear
stress variation along the weld line is also studied. Figure 4.7, 4.8 and 4.9 show variation of
BC and MC and shear stress respectively at a maximum stress location along the weld line for
coach-peel and lap-shear specimens. Comparing the BC components for both types of
specimens it is found that coach-peel specimen underwent large positive bending stresses
whereas the lap-shear specimen experienced lower negative bending stresses. However it is
found that the MC played dominant role in lap-shear specimen deformation and had a positive
magnitude unlike the coach-peel specimen which experienced a negative membrane/normal
Fig.4.6 Cycles to failure variation with equivalent stress for coach-peel (CP) and lap-shear (LS) specimen
1
10
100
1,000
10,000
1.0E+02 1.0E+03 1.0E+04 1.0E+05 1.0E+06 1.0E+07 1.0E+08
EQ
_S
S (
MP
A)
CYCLES TO FAILURE
CP
27
stress of lower magnitude. As anticipated, the coach-peel specimen experienced greater shear
stress compared to the lap-shear specimen as indicated in Fig. 4.9. Hence it can be concluded
that deformation of coach-peel specimen includes contribution from both the shear and bending
stresses, however the bending stress is of higher magnitude which suggests, fatigue failure is
thus largely dominated by bending moments. Similarly from Fig. 4.8 it can be concluded that
deformation in lap-shear specimen is dominated by the MC or force component of the structural
stress definition. The higher magnitudes of the BC and shear stress in coach-peel specimen also
leads to higher equivalent stress developed as shown in Fig. 4.6.
-0.10
0.00
0.10
0.20
0.30
0.40
0.50
-15 -10 -5 0 5 10 15
Ben
din
g C
om
p
Weld Line Dist (mm)
CP
LS
Fig. 4.7 Bending Component variation along the weld line for CP and LS specimen
Fig. 4.8 Membrane Component variation along the weld line for CP and LS specimen
-4.0E-03
0.0E+00
4.0E-03
8.0E-03
1.2E-02
1.6E-02
2.0E-02
-15 -10 -5 0 5 10 15
Mem
bra
ne
Co
mp
Weld Line Dist (mm)
CP
LS
28
Thus, the large variation of BC and MC of the FSW overlap joint suggests that the structural
stress approach alone cannot collapse the fatigue data into a single line without significant
modifications. Hence, the use of a FDP parameter that accounts for the large discrepancy has
been shown to provide a similitude approach for welded joints. The FDP correlation to number
of cycles to failure is presented in Fig.4.10. Using optimized values of k1 and k2 of 0.94 and
1.35, respectively, the FDP values for the coach-peel and lap-shear specimen data collapse onto
0.0E+00
3.0E-02
6.0E-02
9.0E-02
1.2E-01
1.5E-01
1.8E-01
-15 -10 -5 0 5 10 15
Max
Shea
r S
tres
s
Weld Line Dist (mm)
CP
LS
Fig. 4.9 Maximum Shear Stress variation along the weld line for CP and LS specimen
Fig. 4.10 FDP versus Cycles to Failure for Coach Peel (CP) and Lap-Shear (LS) Specimen
1
10
100
1,000
10,000
1.0E+02 1.0E+03 1.0E+04 1.0E+05 1.0E+06 1.0E+07 1.0E+08
FD
P
CYCLES TO FAILURE
CP LS
29
a single curve. This kind of behavior primarily exist due to the formulation of FDP where a
relation between equivalent stress and maximum and minimum induced stress is expressed
exponentially. This result suggests that the FDP parameter can be used to establish the relation
between fatigue data and cycles to failure for different types of loading configurations for the
FSW fabricated from Mg AZ31 alloy sheets.
The fatigue prone location in FE model for coach-peel and lap-shear coupons, calculations and
all the relevant data used to plot the results is presented in Appendix A2.
4.5 Conclusions
In this study fatigue performance of linear friction stir welded coach-peel and lap-shear
specimens of AZ31 magnesium alloy sheets of 2 mm thickness are experimentally and
numerically investigated. An equivalent stress approach is utilized to calculate stresses and a
fatigue parameter referred as FDP is used to take into account the effect of specimen geometry
and loading types. By analyzing the results, the following conclusions are drawn:
1. For the same number of cycles to failure the coach-peel specimen failed at lower loads
when compared to lap-shear specimen. This is primarily attributed to the higher level
of induced shear and bending stress components. Due to the geometry of the specimen
and loading conditions, the friction stir weld nugget in the coach-peel is subjected to
higher bending stress and shear stress which led to its lower fatigue strength when
compared to lap-shear specimen.
2. A new procedure is developed to convert and test lap-shear welds into coach-peel
configuration. This is achieved by gluing L-shaped aluminum brackets to the
overlapped weld plates.
3. Failure analysis revealed that for lap-shear specimen at lower fatigue loads, cracks
propagated slowly and followed a path along the periphery of the weld nugget. This
30
resulted in higher number of cycles to failure and failure occurred by fracture through
weld top sheet. The presence of the initial upward facing hook and lower thickness of
weld side sheet is concluded as the reason for this type of failure behavior. At higher
loads (low cycles), the same type of failure took place, however due to higher fatigue
load, the crack propagated through part of the nugget. Similar behavior is observed for
coach-peel specimen.
4. FE analysis was done to calculate structural stress in coach-peel and lap-sheer
specimens. Based on the SS magnitude calculated using nodal forces and moments it
was found that coach-peel specimen bears higher SS values than lap-sheer specimen.
Further investigation revealed stresses due to bending and shear in the coach-peel
specimen is higher compared to the lap-shear specimen. However due to the bending
and shear stresses acting on the lap-shear specimen, the stresses are of very low
magnitude and the dominant component of the stress (membrane stress) has a
comparatively low magnitude. This resulted in the coach-peel specimens failing
quickly whereas the lap-shear specimen was capable of enduring higher loads for longer
time period resulting in higher number of fatigue cycles.
5. Fatigue data of both the specimen types was correlated using an equivalent stress based
FDP. The FDP considered in this study took into account differences in specimen
geometry and stresses developed, and hence was found to be effective in consolidating
a large variation of fatigue data into a narrow band. The defined FDP related forces and
moments acting on weld nugget which were transferred to a single FDP-N curve for
two different specimens. Hence based on the FDP model, the fatigue life of the FSW
overlap joints under consideration can be predicted in advance.
31
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36
APPENDIX A1
Coach Peel Coupon Preparation
The weld piece was obtained by removing legs of from the overlap weld. The contacting
surfaces of the weld and aluminum L-bracket to be joined were cleaned using sand paper and
ethanol. The advancing side (AS) edge of the weld piece was preserved using adhesive tape to
prevent epoxy glue from joining the sheets leading to erroneous results, as shown in Fig. A1.
A layer (approx. 0.5 mm thick) of DP 125 epoxy was applied on contacting surfaces of L-
brackets and weld-piece. After 2 minutes, the weld piece was aligned between the two L-
brackets forming a “coach - peel” configuration. Special care was taken to maintain the mutual
alignment of the L-brackets and their alignment with respect to weld piece as well. In order to
ensure correct alignment of all three pieces, supports were employed throughout the curing
period (7 days) as shown in Fig. A2.
Fig. A1. Preparation Steps: Coach Peel Specimen
AS
RS
Adhesive tape Edge
Fig. A2. Coach Peel Specimen with supports
AS RS
37
APPENDIX A2
FE Data & Calculation Tables
Element 20
Element 1
Coach Peel Specimen: Failure Location
Element 1 Element 20
Lap Shear Specimen: Failure Location
38
Element No.
Element Force (Fz)
El. Moment (My)
Min σn Max σn Eq.Stress MAX
Eq.Stress FDP
Max FDP
1 3.41E-02 -1.51E-02 -0.006 0.040 0.062
0.074
0.052
0.052
2 2.77E-02 -2.46E-02 -0.023 0.051 0.071 0.038
3 2.65E-02 -2.70E-02 -0.027 0.054 0.074 0.037
4 2.59E-02 -2.73E-02 -0.028 0.054 0.074 0.037
5 2.56E-02 -2.71E-02 -0.028 0.054 0.073 0.036
6 2.55E-02 -2.69E-02 -0.028 0.053 0.073 0.036
7 2.53E-02 -2.66E-02 -0.027 0.053 0.073 0.036
8 2.52E-02 -2.64E-02 -0.027 0.052 0.072 0.036
9 2.50E-02 -2.63E-02 -0.027 0.052 0.072 0.036
10 2.48E-02 -2.62E-02 -0.027 0.052 0.072 0.036
11 2.46E-02 -2.62E-02 -0.027 0.052 0.072 0.035
12 2.44E-02 -2.61E-02 -0.027 0.051 0.071 0.035
13 2.41E-02 -2.62E-02 -0.027 0.051 0.071 0.035
14 2.38E-02 -2.62E-02 -0.027 0.051 0.071 0.035
15 2.35E-02 -2.63E-02 -0.028 0.051 0.071 0.034
16 2.31E-02 -2.64E-02 -0.028 0.051 0.071 0.034
17 2.26E-02 -2.63E-02 -0.028 0.051 0.071 0.034
18 2.23E-02 -2.56E-02 -0.027 0.050 0.070 0.033
19 2.19E-02 -2.28E-02 -0.023 0.045 0.065 0.033
20 3.41E-02 -1.51E-02 -0.006 0.040 0.062 0.052
Table A1: Fatigue Data for Lap Shear Specimens
39
Element No.
Element Force (Fx)
El. Moment (My)
Min σn Max σn Eq.Stress MAX
Eq.Stress FDP
Max FDP
1 4.36E-03 1.78E-01 -0.264 0.269 0.418
0.539
0.111
0.140
2 1.90E-03 2.52E-01 -0.377 0.379 0.515 0.135
3 2.96E-04 2.68E-01 -0.401 0.402 0.538 0.140
4 -2.21E-04 2.68E-01 -0.402 0.402 0.539 0.140
5 -4.30E-04 2.66E-01 -0.400 0.399 0.536 0.139
6 -4.99E-04 2.65E-01 -0.397 0.397 0.533 0.138
7 -5.09E-04 2.63E-01 -0.395 0.394 0.530 0.137
8 -4.96E-04 2.62E-01 -0.393 0.393 0.529 0.137
9 -4.77E-04 2.61E-01 -0.392 0.392 0.527 0.136
10 -4.61E-04 2.61E-01 -0.392 0.391 0.527 0.136
11 -4.52E-04 2.61E-01 -0.392 0.391 0.527 0.136
12 -4.54E-04 2.61E-01 -0.392 0.392 0.527 0.137
13 -4.67E-04 2.62E-01 -0.393 0.393 0.529 0.137
14 -4.91E-04 2.63E-01 -0.395 0.394 0.530 0.137
15 -5.23E-04 2.65E-01 -0.397 0.396 0.533 0.138
16 -5.61E-04 2.66E-01 -0.399 0.399 0.535 0.139
17 -5.92E-04 2.67E-01 -0.401 0.400 0.537 0.139
18 -6.23E-04 2.65E-01 -0.398 0.397 0.533 0.138
19 -4.51E-04 2.46E-01 -0.370 0.369 0.506 0.131
20 4.36E-03 1.78E-01 -0.264 0.269 0.418 0.111
Table A2 Fatigue Data for Coach Peel Specimens
40
Source: Material Properties
www.matweb.com
www.makeitfrom.com
3M Scotch-Weld Epoxy Adhesives DP125 Translucent and Gray Data Sheet
(www.datasheetlib.com)
Table A4 Test Data & FDP Values for Coach Peel
Specimens
Load (N) Cycles FDP
400.4 4548 55.86
355.9 7144 49.67
355.9 9209 49.67
333.7 8691 46.56
333.7 9207 46.56
311.4 8556 43.46
266.9 10949 37.25
266.9 14827 37.25
244.7 15913 34.15
222.4 30306 31.04
200.2 35259 27.94
178.0 193330 24.83
133.5 1680000 18.63
Table A3 Test Data & FDP Values for Lap Shear
Specimens
Load (N) Cycles FDP
2069 503 106.60
2069 499 106.60
1856 814 95.62
1856 975 95.62
1392 2377 71.72
1392 2015 71.72
1392 2354 71.72
1021 6965 52.60
928 12203 47.81
928 8180 47.81
928 8529 47.81
696 25872 35.86
696 22472 35.86
580 43368 29.88
510.4 109069 26.30
464 181578 23.91
464 211253 23.91
464 212422 23.91
440.8 255165 22.71
417.6 165454 21.51
394.4 444567 20.32
394.4 298807 20.32
371.2 353589 19.12
371.2 537190 19.12
324.8 10000576 16.73