302.l9.fatigue.20nov02
TRANSCRIPT
1
Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Microstructure-Properties: IIFatigue
27-302Lecture 9Fall, 2002
Prof. A. D. Rollett
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Materials Tetrahedron
Microstructure Properties
ProcessingPerformance
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Objective• The objective of this lecture is to explain the
phenomenon of fatigue and also to show how resistance to fatigue failure depends on microstructure.
• For 27-302, Fall 2002: this slide set contains more material than can be covered in the time available. Slides that contain material over and above that expected for this course are marked “*”.
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
References• Mechanical Behavior of Materials (2000), T. H.
Courtney, McGraw-Hill, Boston.• Phase transformations in metals and alloys, D.A.
Porter, & K.E. Easterling, Chapman & Hall.• Materials Principles & Practice, Butterworth
Heinemann, Edited by C. Newey & G. Weaver.• Mechanical Metallurgy, McGrawHill, G.E. Dieter, 3rd
Ed.• Light Alloys (1996), I.J. Polmear, Wiley, 3rd Ed.• Hull, D. and D. J. Bacon (1984). Introduction to
Dislocations. Oxford, UK, Pergamon.
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Notationa := Alternating stressm := Mean stressR := Stress ratio := strainNf := number of cycles to failureA := Amplitude ratio∆pl := Plastic strain amplitude∆el := Elastic strain amplitudeK’ := Proportionality constant, cyclic stress-strainn’ := Exponent in cyclic stress-strainc := Exponent in Coffin-Manson Eq.;
also, crack lengthE := Young’s modulusb := exponent in Basquin Eq.m := exponent in Paris LawK := Stress intensity∆K := Stress intensity amplitudea := crack length
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue
• Fatigue is the name given to failure in response to alternating loads (as opposed to monotonic straining).
• Instead of measuring the resistance to fatigue failure through an upper limit to strain (as in ductility), the typical measure of fatigue resistance is expressed in terms of numbers of cycles to failure. For a given number of cycles (required in an application), sometimes the stress (that can be safely endured by the material) is specified.
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue: general characteristics
• Primary design criterion in rotating parts.• Fatigue as a name for the phenomenon based on the
notion of a material becoming “tired”, i.e. failing at less than its nominal strength.
• Cyclical strain (stress) leads to fatigue failure.• Occurs in metals and polymers but rarely in
ceramics.• Also an issue for “static” parts, e.g. bridges.• Cyclic loading stress limit<static stress capability.
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue: general characteristics• Most applications of structural materials involve cyclic
loading; any net tensile stress leads to fatigue.• Fatigue failure surfaces have three characteristic
features: [see next slide, also Courtney figs. 12.1, 12.2]
– A (near-)surface defect as the origin of the crack– Striations corresponding to slow, intermittent crack growth– Dull, fibrous brittle fracture surface (rapid growth).
• Life of structural components generally limited by cyclic loading, not static strength.
• Most environmental factors shorten life.
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
S-N Curves• S-N [stress-number of cycles to failure] curve defines
locus of cycles-to-failure for given cyclic stress.• Rotating-beam fatigue test is standard; also
alternating tension-compression.• Plot stress versus the
log(number of cycles to failure), log(Nf). [see next slide, also Courtney figs. 12.8, 12.9]
• For frequencies < 200Hz, metals are insensitive to frequency; fatigue life in polymers is frequency dependent.
[Hertzberg]
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue testing, S-N curve
[Dieter]
Note the presence of afatigue limit in manysteels and its absencein aluminum alloys.
log Nf
a
mean 1
mean 2
mean 3
mean 3 > mean 2 > mean 1 The greater the number ofcycles in the loading history,the smaller the stress thatthe material can withstandwithout failure.
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CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Endurance Limits• Some materials exhibit endurance limits, i.e.
a stress below which the life is infinite: [fig. 12.8]– Steels typically show an endurance limit, = 40% of
yield; this is typically associated with the presence of a solute (carbon, nitrogen) that pines dislocations and prevents dislocation motion at small displacements or strains (which is apparent in an upper yield point).
– Aluminum alloys do not show endurance limits; this is related to the absence of dislocation-pinning solutes.
• At large Nf, the lifetime is dominated by nucleation.– Therefore strengthening the surface (shot peening) is
beneficial to delay crack nucleation and extend life.
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue fracture surface
[Hertzberg]
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue crack stagesStage 1
Stage 2[Dieter]
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CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue Crack Propagation
• Crack Nucleation stress intensification at crack tip.• Stress intensity crack propagation (growth);
- stage I growth on shear planes (45°),strong influence of microstructure [Courtney: fig.12.3a]
- stage II growth normal to tensile load (90°)weak influence of microstructure [Courtney: fig.12.3b].
• Crack propagation catastrophic, or ductile failure at crack length dependent on boundary conditions, fracture toughness.
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue Crack Nucleation• Flaws, cracks, voids can all act as crack nucleation
sites, especially at the surface.• Therefore, smooth surfaces increase the time to
nucleation; notches, stress risers decrease fatigue life.
• Dislocation activity (slip) can also nucleate fatigue cracks.
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Dislocation Slip Crack Nucleation• Dislocation slip -> tendency to localize slip in bands.
[see slide 10, also Courtney fig. 12.3]
• Persistent Slip Bands (PSB’s) characteristic of cyclic strains.
• Slip Bands -> extrusion at free surface. [see next slide for fig. from Murakami et al.]
• Extrusions -> intrusions and crack nucleation.
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Objective
CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Slip steps and the
stress-strain loop
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CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
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Design
Design Philosophy: Damage Tolerant Design
• S-N (stress-cycles) curves = basic characterization.• Old Design Philosophy = Infinite Life design: accept
empirical information about fatigue life (S-N curves); apply a (large!) safety factor; retire components or assemblies at the pre-set life limit, e.g. Nf=107.
• *Crack Growth Rate characterization ->• *Modern Design Philosophy (Air Force, not Navy
carriers!) = Damage Tolerant design: accept presence of cracks in components. Determine life based on prediction of crack growth rate.
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Objective
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S-N curves
Cyclic stress-strnCrackPropagate
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Design
Definitions: Stress Ratios• Alternating Stress• Mean stress m = (max +min)/2.• Pure sine wave Mean stress=0.• Stress ratio R = max/min.
• For m = 0, R=-1• Amplitude ratio A = (1-R)/(1+R).• Statistical approach shows significant
distribution in Nf for given stress.• See Courtney fig. 12.6; also following slide.
a
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Cyclic stress-strnCrackPropagate
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Design
Alternating Stress Diagrams
[Dieter]
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Design
Mean Stress• Alternating stress a = (max-min)/2.• Raising the mean stress (m) decreases Nf. [see slide 19,
also Courtney fig. 12.9]
• Various relations between R = 0 limit and the ultimate (or yield) stress are known as Soderberg (linear to yield stress), Goodman (linear to ultimate) and Gerber (parabolic to ultimate). [Courtney, fig. 12.10, problem 12.3]
a
mean
tensile strength
endurance limit at zero mean stress
a fat 1 mean
tensile strength
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S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Cyclic strain vs. cyclic stress• Cyclic strain control complements cyclic
stress characterization: applicable to thermal fatigue, or fixed displacement conditions.
• Cyclic stress-strain testing defined by a controlled strain range, ∆pl. [see next slide, Courtney, figs. 12.24,12.25]
• Soft, annealed metals tend to harden; strengthened metals tend to soften.
• Thus, many materials tend towards a fixed cycle, i.e. constant stress, strain amplitudes.
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S-N curves
Cyclic stress-strnCrackPropagate
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Design
Cyclic stress-strain curve
[Courtney]
• Large number of cycles typically needed to reach asymptotic hysteresis loop (~100).• Softening or hardening possible. [fig. 12.26]
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S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Cyclic stress-strain• Wavy-slip materials
generally reach asymptote in cyclic stress-strain: planar slip materials (e.g. brass) exhibit history dependence.
• Cyclic stress-strain curve defined by the extrema, i.e. the “tips” of the hysteresis loops. [Courtney fig. 12.27]
• Cyclic stress-strain curves tend to lie below those for monotonic tensile tests.
• Polymers tend to soften in cyclic straining.
[Courtney]
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CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Cyclic Strain Control• Strain is a more logical independent variable
for characterization of fatigue. [fig. 12.11]
• Define an elastic strain range as ∆el = ∆/E.• Define a plastic strain range, ∆pl.• Typically observe a change in slope between
the elastic and plastic regimes. [fig. 12.12]
• Low cycle fatigue (small Nf) dominated by plastic strain: high cycle fatigue (large Nf) dominated by elastic strain.
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S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Strain control of fatigue
[Courtney]
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S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Cyclic Strain control: low cycle• Constitutive relation
for cyclic stress-strain:• n’ ≈ 0.1-0.2• Fatigue life: Coffin Manson relation:
• f ~ true fracture strain; close to tensile ductility
• c ≈ -0.5 to -0.7• c = -1/(1+5n’); large n’ longer life.
K n
p
2 f 2N f c
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S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Cyclic Strain control: high cycle
• For elastic-dominated strains at high cycles, adapt Basquin’s equation:
• Intercept on strain axis of extrapolated elastic line = f/E.
• High cycle = elastic strain control: slope (in elastic regime) = b = -n’/(1+5n’) [Courtney, fig. 12.13]
• The high cycle fatigue strength, f, scales with the yield stress high strength good in high-cycle
a E e2
f 2N b
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CrackInitiation
S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Strain amplitude - cycles
[Courtney]
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S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Total strain (plastic+elastic) life• Low cycle = plastic control: slope = c• Add the elastic and plastic strains.
• Cross-over between elastic and plastic control is
typically at Nf = 103 cycles.• Ductility useful for low-cycle; strength for high cycle• Examples of Maraging steel for high cycle
endurance, annealed 4340 for low cycle fatigue strength.
2
el
2
pl
2
fE
2N f b f 2N f c
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Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue Crack Propagation• Crack Length := a.
Number of cycles := NCrack Growth Rate := da/dNAmplitude of Stress Intensity := ∆K = ∆√c.
• Define three stages of crack growth, I, II and III, in a plot of da/dN versus ∆K.
• Stage II crack growth: application of linear elastic fracture mechanics.
• Can consider the crack growth rate to be related to the applied stress intensity.
• Crack growth rate somewhat insensitive to R (if R<0) in Stage II [fig. 12.16, 12.18b]
• Environmental effects can be dramatic, e.g. H in Fe, in increasing crack growth rates.
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S-N curves
Cyclic stress-strnCrackPropagate
Microstr.effects
Design
Fatigue Crack Propagation• Three stages of crack
growth, I, II and III.• Stage I: transition to a
finite crack growth rate from no propagation below a threshold value of ∆K.
• Stage II: “power law” dependence of crack growth rate on ∆K.
• Stage III: acceleration of growth rate with ∆K, approaching catastrophic fracture.
da/dN
∆K∆Kth
∆Kc
III
III
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S-N curves
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Design
*Paris Law• Paris Law:
• m ~ 3 (steel); m ~ 4 (aluminum).• Crack nucleation ignored!• Threshold ~ Stage I• The threshold represents an endurance
limit.• For ceramics, threshold is close to KIC.• Crack growth rate increases with R (for
R>0). [fig. 12.18a]
dcdN
A(K)m
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Design
*Striations- mechanism• Striations occur by development of slip bands
in each cycle, followed by tip blunting, followed by closure.
• Can integrate the growth rate to obtain cycles as related to cyclic stress-strain behavior. [Eqs. 12.6-12.8]
NII dc
Am c mc0
c f
NII dc
dc / dNc0
c f
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S-N curves
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*Striations, contd.
• Provided that m>2 and is constant, can integrate.
• If the initial crack length is much less than the final length, c0<cf, then approximate thus:
• Can use this to predict fatigue life based on known crack
NII A 1 m
(m / 2) 1c0
1 m / 2 c f1 m / 2
NII A 1 m
(m / 2) 1c0
1 m / 2
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S-N curves
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Design
*Damage Tolerant Design• Calculate expected growth rates from dc/dN
data. • Perform NDE on all flight-critical components.• If crack is found, calculate the expected life of
the component.• Replace, rebuild if too close to life limit.• Endurance limits.
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S-N curves
Cyclic stress-strnCrackPropagate
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Design
Geometrical effects• Notches decrease fatigue life through stress
concentration.• Increasing specimen size lowers fatigue life.• Surface roughness lowers life, again through stress
concentration.• Moderate compressive stress at the surface
increases life (shot peening); it is harder to nucleate a crack when the local stress state opposes crack opening.
• Corrosive environment lowers life; corrosion either increases the rate at which material is removed from the crack tip and/or it produces material on the crack surfaces that forces the crack open (e.g. oxidation).
• Failure mechanisms
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Design
Microstructure-Fatigue Relationships• What are the important issues in microstructure-
fatigue relationships?• Answer: three major factors.
1: geometry of the specimen (previous slide); anything on the surface that is a site of stress concentration will promote crack formation (shorten the time required for nucleation of cracks).
2: defects in the material; anything inside the material that can reduce the stress and/or strain required to nucleate a crack (shorten the time required for nucleation of cracks).
3: dislocation slip characteristics; if dislocation glide is confined to particular slip planes (called planar slip) then dislocations can pile up at any grain boundary or phase boundary. The head of the pile-up is a stress concentration which can initiate a crack.
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Cyclic stress-strnCrackPropagate
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Design
Microstructure affects Crack Nucleation• The main effect of
microstructure (defects, surface treatment, etc.) is almost all in the low stress intensity regime, i.e. Stage I. Defects, for example, make it easier to nucleate a crack, which translates into a lower threshold for crack propagation (∆Kth).
• Microstructure also affects fracture toughness and therefore Stage III.
da/dN
∆K∆Kth
∆Kc
III
III
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Design
Defects in Materials• Descriptions of defects in materials at the sophomore level
focuses, appropriately on intrinsic defects (vacancies, dislocations). For the materials engineer, however, defects include extrinsic defects such as voids, inclusions, grain boundary films, and other types of undesirable second phases.
• Voids are introduced either by gas evolution in solidification or by incomplete sintering in powder consolidation.
• Inclusions are second phases entrained in a material during solidification. In metals, inclusions are generally oxides from the surface of the metal melt, or a slag.
• Grain boundary films are common in ceramics as glassy films from impurities.
• In aluminum alloys, there is a hierachy of names for second phase particles; inclusions are unwanted oxides (e.g. Al2O3); dispersoids are intermetallic particles that, once precipitated, are thermodynamically stable (e.g. AlFeSi compounds); precipitates are intermetallic particles that can be dissolved or precipiated depending on temperature (e.g. AlCu compounds).
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Metallurgical Control: fine particles• Tendency to localization of flow is deleterious to the
initiation of fatigue cracks, e.g. Al-7050 with non-shearable vs. shearable precipitates (Stage I in a da/dN plot). Also Al-Cu-Mg with shearable precipitates but non-shearable dispersoids, vs. only shearable ppts.
graph courtesy of J. Staley, Alcoa
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Design
Coarse particle effect on fatigue• Inclusions nucleate cracks cleanliness (w.r.t.
coarse particles) improves fatigue life, e.g. 7475 improved by lower Fe+Si compared to 7075: 0.12Fe in 7475, compared to 0.5Fe in 7075; 0.1Si in 7475, compared to 0.4Si in 7075.
graph courtesy of J. Staley, Alcoa
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Design
Alloy steel heat treatment• Increasing hardness tends to raise the endurance
limit for high cycle fatigue. This is largely a function of the resistance to fatigue crack formation (Stage I in a plot of da/dN).
[Dieter]
Mobile solutes that pin dislocations fatigue limit, e.g. carbon in steel
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Design
Casting porosity affects fatigue
• Casting tends to result in porosity. Pores are effective sites for nucleation of fatigue cracks. Castings thus tend to have lower fatigue resistance (as measured by S-N curves) than wrought materials.
• Casting technologies, such as squeeze casting, that reduce porosity tend to eliminate this difference.
[Polmear]
Gravity cast versussqueeze castversuswroughtAl-7010
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Design
Titanium alloys
• For many Ti alloys, the proportion of hcp (alpha) and bcc (beta) phases depends strongly on the heat treatment. Cooling from the two-phase region results in a two-phase structure, as Polmear’s example, 6.7a. Rapid cooling from above the transus in the single phase (beta) region results in a two-phase microstructure with Widmanstätten laths of (martensitic) alpha in a beta matrix, 6.7b.
• The fatigue properties of the two-phase structure are significantly better than the Widmanstätten structure (more resistance to fatigue crack formation).
• The alloy in this example is IM834, Ti-5.5Al-4Sn-4Zr-0.3Mo-1Nb-0.35Si-0.6C.
[Polmear]
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Design
*Design Considerations• If crack growth rates are normalized by the elastic
modulus, then material dependence is mostly removed! [Courtney fig. 12.20]
• Can distinguish between intrinsic fatigue [use Eq. 12.4 for combined elastic, plastic strain range] for small crack sizes and extrinsic fatigue [use Eq. 12.6 for crack growth rate controlled] at longer crack lengths. [fig. 12.21….]
• Inspection of design charts, fig. 12.22, shows that ceramics sensitive to crack propagation (high endurance limit in relation to fatigue threshold).
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*Design Considerations: 2• Metals show a higher fatigue threshold in
relation to their endurance limit. PMMA and Mg are at the lower end of the toughness range in their class. [Courtney fig. 12.22]
• Also interesting to compare fracture toughness with fatigue threshold. [Courtney fig. 12.23]
• Note that ceramics are almost on ratio=1 line, whereas metals tend to lie well below, i.e. fatigue is more significant criterion.
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Design
*Fatigue property map
[Courtney]
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Design
*Fatigue property map
[Courtney]
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Design
*Variable Stress/Strain Histories
• When the stress/strain history is stochastically varying, a rule for combining portions of fatigue life is needed.
• Palmgren-Miner Rule is useful: ni is the number of cycles at each stress level, and Nfi is the failure point for that stress. [Ex. Problem 12.2]
niN fi
1i
* Courtney’s Eq. 12.9 is confusing; he has Nf in the numerator also
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*Fatigue in Polymers• Many differences from metals• Cyclic stress-strain behavior often exhibits
softening; also affected by visco-elastic effects; crazing in the tensile portion produces asymmetries, figs. 12.34, 12.25.
• S-N curves exhibit three regions, with steeply decreasing region II, fig. 12.31.
• Nearness to Tg results in strong temperature sensitivity, fig. 12.42
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Fatigue: summary• Critical to practical use of structural materials.• Fatigue affects most structural components,
even apparently statically loaded ones.• Well characterized empirically.• Connection between dislocation behavior and
fatigue life offers exciting research opportunities, i.e. physically based models are lacking!