J. Shaw-Vector Calculus - With Applns to Physics-Van Nostrand (1922)
Microstructure*Properties:....
Transcript of Microstructure*Properties:....
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
1!
Microstructure*Properties:.Composites.
Microstructure! Properties!
Processing!
Performance!27#301'A.'D.'Rolle/,''M.'De'Graef'
Last modified: 2nd Nov. ‘15
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
2!
Lecture Objectives: Composites!• The'main'objec?ve'of'this'lecture'is'to'introduce'you'to'
microstructure#property'rela?onships'in'composite'materials.'
• Composite'materials'cons?tute'a'huge'class'of'materials.''The'objec?ve'of'this'lecture'will'therefore'be'to'provide'some'defini?ons'and'describe'some'of'the'basic'rela?onships.'
• Cellular'materials'will'be'emphasized'because'of'their'connec?on'to'natural'materials'(biomaterials)'and'especially'wood,'which'some'of'you'will'study'in'the'second'Lab.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Questions & Answers for Part 1!1. What'are'the'general'advantages'of'composite'
materials'over'monolithic'materials?''Give'both'biomaterial'and'man#made'examples.''Composites'generally'have'higher'specific'proper?es.''Wood'and'carbon#fiber'reinforced'plas?cs'are'examples.'
2. What'is'the'rule%of%mixtures'as'applied'to'composites?'Integrate'the'property'of'interest'over'the'volume'of'the'composite.'
3. What'do'the'terms'isostress'and'isostrain'mean?'As'implied,'iso#stress'means'same'stress'in'all'materials;'iso#strain'means'same'strain'in'all'materials.'For'iso#stress'you'can'think'of'the'phases'as'being'connected'in'series'between'the'planes'across'which'the'load'is'transmi/ed'(and'vice'versa'for'iso#strain).'
4. Derive'the'isostrain'model.'See'the'notes;'deriva?on'relies'on'averaging'the'stresses'in'the'different'phases.''
5. Derive'the'isostress%model.'See'the'notes;'deriva?on'relies'on'averaging'the'strains'in'the'different'phases.'
6. Sketch'the'varia?ons'in'modulus'expected'for'composites'in'which'the'components'have'strongly'different'moduli.'See'the'notes;'iso#strain'model'gives'linear'varia?on'(same'as'Rule'of'Mixtures'in'this'case)'whereas'iso#stress'model'gives'non#linear'varia?on.'
7. Explain'what'is'meant'by'the'Voigt,'Reuss'and'Hill'average'moduli.'Voigt=iso#strain,'Reuss=iso#stress,'Hill'averages'these'two.'
8. Which'model'for's?ffness'applies'to'a'composite'material'with'a'compliant'matrix'and'a'well'dispersed'par?culate'second'phase'that'is's?ffer'(than'the'matrix)?'In'this'case,'the'Reuss'(iso#stress)'model'applies'because'the'individual'par?cles'are'not'connected'and'thus'there'is'li/le'load'transfer'between'them.'
9. Which'model'for's?ffness'applies'to'a'composite'material'with'a'compliant'matrix'and'a'well'dispersed,'parallel,'s?ff'fibers'that'is'loaded'along'the'fiber'direc?on?'In'this'case,'the'Voigt'(iso#strain)'model'applies'because'the'individual'fibers'are'strained'equally'with'the'matrix.'
10. Why'are'cellular'or'foam'materials'useful'for'achieving'low'modulus?'By'making'a'substan?al'frac?on'of'the'“material”'empty'space'(air'or'trapped'gas),'one'can'reduce'the'modulus'to'the'volume'average'of'the'solid'material'and'gas.''This'accesses'modulus'values'that'are'inaccessible'to'fully'dense'materials.'
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!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
4!
Key points!• Composites'are'regarded'as'ar?ficial'(man#made)'mixtures%of%
phases.'• Classifica?on'of'composites'by'reinforcement'type'(dimensionality)'#'
par1cles,%fibers%and%laminated.'• Applica?on'of'the'Rule%of%Mixtures.'• Dependence'of'composite'proper?es'on'the'spa?al'arrangement'of'
the'phases.'• Upper'and'lower'bounds'on'proper?es'#'example'of'elas?c'modulus,'
Voigt%and%Reuss%approxima?ons.'• High'property:density%ra1os%achievable'with'composites.'• Engineering'with'residual%stress%in'composites.'• Anisotropy%of'composite'proper?es,'e.g.'elas?c'modulus.'• Proper?es'of'wood%as'a'cellular'material.'• Cellular/foam'materials'as'shock%absorbers.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
5!
Examples!
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
6!
What are Composites?!• Composite'materials'contain'more'than'one'phase.'• Almost'all'materials'contain'more'than'one'phase,'so'
what’s'the'difference?'• The'term'composite'is'typically'applied'to'a'material'when'
the'mul?#phase'structure'is'constructed'by'direct'interven?on'(external'to'the'material).'''''
• Composite'Material'Examples:'glass'fiber'reinforced'plas?c'(GRP),'wood,'clam'shell,'Mars'bar.'
• Mul?#phase'Material'Examples:'precipita?on'strengthened'aluminum'alloys,'Ti#6Al#4V,'dual#phase'steel,'transforma?on'toughened'alumina'(Al2O3#CeO2).'
• Cau?on!''There'is'some'overlap'between'the'categories!'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
7!
Properties!• It'is'useful'to'review'the'basic'proper?es'of'the'different'
types'of'materials'that'are'used'in'composites.'• Polymers'#'long'[carbon]'chain'molecules'with'anything'
from'van'der'Waals'bonding'between'the'chains'(thermoplas?cs)'to'covalent'links'(thermosets).''Low'density,'low'modulus'compared'to'other'materials.'Onen'highly'formable'(duc?le).'
• Ceramics'#'ionic'or'covalent'bonding,'lower'symmetry'crystal'structures,'high'mel?ng'point'and'modulus,'resistant'to'degrada?on,'bri/le,'high'modulus.'
• Metals'#'metallic'bonding,'symmetric'crystal'structures,'medium'mel?ng'point,'medium'modulus,'duc?le,'formable,'variable'resistance'to'degrada?on.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
8!
Why Use Composites? [Biomaterials]!• In'nature,'the'basic'materials'tend'to'be'weak'and/or'bri/le.''
Evolu?on'has'resulted'in'structures'that'combine'materials'together'for'proper?es'that'far'exceed'those'that'could'be'obtained'in'the'basic'materials.'''
• The'basic'inorganic'cons?tuent'of'bone,'for'example,'is'calcium'phosphate'in'the'form'of'crystalline'Ca10(PO4)6(OH)'and'amorphous'CaPO3.'This'ceramic'is'bri/le'and'not'par?cularly's?ff.'The'matrix'of'fibrous'collagen'is'tough'but'even'less's?ff.'When'embedded'arranged'in'the'form'of'a'cellular'material,'however,'remarkable'values'of's?ffness:density'and'toughness:density'are'achieved'(and'land#based'mul?#tonne'creatures'are'possible'such'as'elephants).'
• A'similar'situa?on'exists'in'wood'where'the'basic'materials'are'quite'compliant'but'arranged'in'the'mul?#level'composite'forms'that'we'know,'high'values'of'strength:density'and'toughness:density'result.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
9!
Why Use Composites? [Man-made]!• The'basic'reason'for'the'use'of'composites'is'always'the'
same:'some'combina?on'of'proper?es'can'be'achieved'that'is'impossible'in'a'monolithic'material'[for'a'given'cost].'
• In'SiC#reinforced'aluminum'for'brake'rotors,'for'example,'the'combina?on'of'light'weight,'toughness'(from'the'Al'matrix'at'~'2.7'Mgm/m3),'and's?ffness'(from'the'SiC'addi?ons)'is'not'possible'in'either'cons?tuent'by'itself.'
• In'Cu#Nb'for'high'strength'electrical'conductors,'the'combina?on'of'>1'GPa'yield'strength'and'high'electrical'conduc?vity'(in'the'Cu)'could'never'be'achieved'in'either'cons?tuent'by'itself.''In'this'case'the'high'strength'is'a'synergis?c'property'of'the'composite.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
10!
Key aspects of composites!
• Composites'are'expensive'to'make,'as'compared'to'monolithic'materials,'especially'if'the'shape'and'arrangement'of'the'phases'must'be'controlled.'
• Therefore'there'must'be'a'strong'mo?va?on'for'making'a'composite'structure'to'offset'the'cost.'
• The'simplest'composites'are'par?culate'composites.''Laminates'are'next,'followed'by'fiber'composites.''Woven'structures'are'the'most'complex.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
11!
Typical Microstructures!
• We'show'next'some'typical'microstructures.'• In'biomaterials,'many'are'cellular'composites'at'some'length'scale'(typically'around'1'µm).'
• Man#made'composites'are'more'onen'fully'dense.''The'three'major'[structural]'material'types'are'all'used'so'the'abbrevia?ons'MMC'[metal'matrix'composite],'CMC'[ceramic'matrix'composite],'and'PMC'[polymer'matrix'composite]'are'commonly'used.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
12! Cellular Biomaterials!
Gibson & Ashby: Cellular Solids!
Note'the'varia?on'in'density;'also'the'presence'of'dis?nct'layers'of'cells'in'some'woods,'and'in'bone.''Note'also'that'the'shape%of'the'cells'and'their'walls'makes'a'difference'to'their'proper?es.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
13!
Man-made Examples!
SiC'fibers'in'Ti3Al'matrix'
SiC'fibers'in'a'CAS'ceramic'matrix'Dowling: Mech. Behavior Materials!
Note'the'typical'length'scale'of'~100µm,'and'the'use'of'fibers'for'reinforcement.''This'basic'type'of''fiber#reinforced'composite'is'strongly'anisotropic.''The'toughness'of'such'composites'and'the'need'for'limited'adhesion'between'fiber'and'matrix'is'discussed'in'the'lecture'on'Fracture.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
14!
Food!!
From'len'to'right,'top'to'bo/om:'a)'Bread'b)'Meringue'c)'Chocolate'bar'd)'Chip'e)'Malteser'(Candy)'f)'Jaffa'cake'(cookie,'see'below)'
Gibson & Ashby: Cellular Solids!Maltesers'image:'commons.wikimedia.org/MaltesersOpen.jpg
Jaffa:'thetas?ngbuds.com
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
15!
Food for Thought!!
• How'does'ice%cream%represent'a'material'in'which'the'thermal#mechanical'history'is'cri?cal'to'its'microstructure'which,'in'turn,'controls'its'proper?es?'
• Hint:'this'involves'both'the'proper?es'of'composite'materials'(ice,'cream,'voids)'and'par?cle'coarsening'(the'ice).'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
16!
Examples of composites!• The'classical'example'of'a'composite'is'concrete.'• It'is'more'complex'than'it'appears.''There'are'typically'coarse'
and'fine'par?cles'(rocks!)'embedded'in'a'matrix'of'silicates'and'sulfates.''There'is'a'high'frac?on'of'pores'of'all'sizes.''This'is'an'example'of'a'par1culate%composite.'
• Ordinary'concrete'(properly'made)'has'excellent'compressive'strength'but'poor'tensile'strength.''Thus'reinforced'concrete'was'invented'to'combine'the'tensile'strength'of'steel'with'the'compressive'strength'of'concrete.''This'is'an'example'of'a'mul?scale'par1culate%and'fiber%reinforced%composite.''It'is'par1culate%because'the'aggregate'(coarse'gravel)'reinforces'the'cement,'and'fiber'because'the'steel'rods'reinforce'the'concrete.'
• A'subtle'but'very'important'variant'of'reinforced'concrete'is'pre@stressed%concrete'in'which'the'reinforcing'rods'are'placed'in'tension'before'the'concrete'is'allowed'to'set.''See'following'slides'on'residual%stresses.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
17!
Glass-ceramics!
• Glass'ceramics'are'useful'materials'that'combine'chemical'inertness'with'thermal'stability.''They'typically'are'stronger'than'amorphous'glasses.'
• This'material'class'was'invented'(by'the'Sandia'Na?onal'Laboratories)'for'the'specific'purpose'of'making'a'material'(insulator)'that'would'have'a'good'match'for'the'thermal'expansion'characteris?cs'of'metals'(stainless'steel,'nickel'alloys),'i.e.'a'rela?vely'high'CTE'with'values'intermediate'between'ceramics'(typically'low)'and'metals'(typically'high).'
• Typical'phase'mixture'includes'lithium'silicate(s),'cristobalite'and'residual'glass'phase.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
18!
Property Ranges!
A'much'wider'range'of'proper?es'is'possible'in'composites'than'in'monolithic'materials.''Foams%
permit'much'smaller'moduli'and'densi?es'than'fully'dense'materials.''The'following'chart'illustrates'a'few'basic'proper?es.'
Gibson & Ashby: Cellular Solids!
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
19!
Notation!A, B, C' ' 'phases'A'and'B,'Composite'VA ' 'volume'frac?on'of'phase'A'PA ' 'property'of'phase'A'EA ' '(Young’s)'modulus'of'phase'A'εC% ' '(average)'strain'in'composite'σA% ' 'stress'in'phase'A'K ' 'bulk'modulus''G ' 'shear'modulus''α ' 'coefficient'of'thermal'expansion'(CTE)''ρs,%ρcell% ' 'cell'wall'density'ρ* ' 'rela?ve'density'(cellular'material)'l ' 'length'(of'a'beam)'t ' 'thickness'b' ' 'depth'δ' ' 'displacement'KIC' ' 'fracture'toughness'[plane'strain]'P ' 'load'x ' 'posi?on'(or'loca?on,'in'a'material)''
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
20!
Simple Models: Rule of Mixtures!• What'is'the'simplest'model'that'can'be'used'to'predict'a'
material'property'in'a'composite?'Answer:'Rule'of'Mixtures'
• Define'the'volume'frac?ons,'V,'of'the'various'materials'comprising'the'composite.''The'average'property'of'the'composite'is'then'given'by,'%discrete:'''''''PC = VAPA + VBPB + … =%Σ%ViPi%%
%con1nuum:%%%PC = ∫ P(x)dV%• The'Rule%of%Mixtures%is'an'acceptable'first'approxima?on'
for'es?ma?ng'composite'material'proper?es.''It'is,'however,'onen'considerably'in'error'and'be/er'methods'are'required.%
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
21!
Limits, bounds!• There'are'some'circumstances'under'which'one'would'
like'to'be'able'to'make'quan?ta?ve'predic?ons'of'the'proper?es'of'a'composite'but'an'exact'solu?on'is'not'available.'
• Under'these'circumstances,'it'is's?ll'possible'to'set'limits'on'the'property.''In'a'formal'sense'these'limits'are'known'as'bounds'because'they'are'the'result'of'analysis'using'the'principles'of'solid'mechanics.''Such'analysis'can'demonstrate'that'an'either'an'upper'or'a'lower'(or'both)'bound'exists'for'a'given'structure'and'loading.'
• An'upper%bound'means'that'the'value'of'the'property'cannot'go'any'higher'than'a'certain'value'and'vice'versa'for'a'lower%bound.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
22!
Exact versus bounds!
• Exact'solu?ons'are'usually'available'for'simple'geometries.''Reinforced'concrete'with'parallel'rods'is'such'an'example.'
• Complex'geometries'are'almost'always'limited'to'approximate'solu?ons'and'bounds'provide'the'best'es?mate.''Most'par?culate'composites,'especially'those'with'cracks'fall'in'this'category.'
• The'most'interes?ng'proper?es'for'this'lecture'are'those'associated'with'mechanical'behavior'such'as's?ffness,'strength,'thermal'expansion.'
• In'the'most'general'sense,'we'are'seeking'methods'for'averaging'a'property'over'the'heterogeneous'elements'of'the'microstructure.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
23!
Isostress, isostrain!
• “Iso#”'is'a'prefix'meaning'“same”.''Isostress'is'an'assump?on'that'the'phases'experience'the'same'stress.''By'contrast,'isostrain'makes'the'assump?on'that'the'phases'are'subject'to'the'same'strain.'
• Each'assump?on'leads'to'very'different'results,'especially'when'the'proper?es'of'each'phase'are'divergent,'as'we'see'from'the'example'of'the'brick'and'the'foam.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
24!
Isostrain!• Imagine'parallel'slabs'of'material'
between'platens'that'apply'a'load.'
• Phase'A'has'volume'frac?on'VA'and'modulus'EA;'Phase'B'has'volume'frac?on'VB'and'modulus'EB.'
• Composite'modulus,'EC?'• We'assume'isostrain'because'
each'phase'sees'the'same'change'in'length.'
• The'strain,'ε='εC,'is'therefore'the'field;'the'stress'is'the'response'(and'the's?ffness'is'the'property).'
Phase B!Phase A!
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
25!
Isostrain: 2!• Each'phase'gives'a'different'stress:''
σA=EA%εC; σB=EB%εC.'• We'average'the'stresses'over'the'
composite'in'propor?on'to'the'volume'frac?on'of'the'phase:'''σC=VAσA+ VBσB = VAEA%εC + VBEB εC.'
• The'modulus'is'the'ra?o'of'the'stress'to'the'strain'in'the'composite:'''EC =%σC/ εC%= VAEA + VBEB '
• This'modulus'is'thus'the'arithme1c%mean%
of'the'moduli'of'each'phase,'weighted'by'the'volume'frac?ons.''In'effect,'the'rule%of%mixtures'has'been'applied'to'the's?ffnesses.'
• Exercise:'prove'to'yourself'that'this'can'be'extended'to'any'number'of'phases.'
Phase B!Phase A!
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
26!
Isostress!• Imagine'parallel'slabs'of'material'
between'platens'that'apply'a'load.'
• Phase'A'has'volume'frac?on'VA'and'modulus'EA;'Phase'B'has'volume'frac?on'VB'and'modulus'EB.'
• Composite'modulus,'EC?'• We'assume'isostress'because'
each'phase'sees'the'same%stress'(assuming'same'cross#sec?onal'area).'
• The'stress,'σ'='σC,'is'therefore'
the'field;'the'strain'is'the'response'(and'the'compliance'is'the'property).'
Phase B!
Phase A!
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
27!
Isostress: 2!• Each'phase'gives'a'different'strain:''εA= σC/EA;'εB= σC/EB.'
• We'average'the'strains'over'the'composite'in'propor?on'to'the'volume'frac?on'of'the'phase:'''εC=VAεA+ VB%εB = VAσC/EA + VBσC/EB.'
• The'modulus'of'the'composite'is'the'ra?o'of'the'stress'to'the'strain'in'the'composite'as'before,'except'that'it'is'easier'to'work'with'inverse'moduli,'i.e.'compliances:'''1/EC =%εC/σC%= VA/EA + VB/EB '
• The'composite'modulus'is'thus'the'harmonic%mean%of'the'moduli'of'each'phase,'weighted'by'the'volume'frac?ons.'In'effect,'the'rule%of%mixtures'has'been'applied'to'the'compliances.'
Phase B!
Phase A!
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
28!
Example of Cu-W Composites!
• The'graphs'show'(a)'examples'of'the'difference'in'the'calculated'modulus'based'on'the'2'different'assump?ons'[parallel'is'equivalent'to'isostrain,'and'series%to'isostress];'(b)'an'example'of'the'measured'difference'in'modulus'of'Cu#W'composites,'contras?ng'wire'[=fiber]'with'par?cle'reinforcement.''The'fiber'composite'corresponds'very'closely'to'the'isostrain'es?mate;'the'par?culate'composite'is'close'to'the'isostress,'although'not'quite'so'precisely.'
• Note'how'the'isostress'and'isostrain'es?mates'are'similar'when'the'moduli'differ'by'only'a'factor'of'two.''When'the'moduli'differ'by'an'order'of'magnitude,'however,'the'two'es?mates'differ'widely.'
• Here,'isostrain'happens'to'be'the'same'as'the'Rule'of'Mixtures.'
“Structural Materials”, Weidemann, Lewis and Reid
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
29!
Voigt, Reuss, Hill!• These'simple'es?mates'of'modulus'have'names'associated'with'them.'• The'isostress'approach'is'known'as'the'Reuss'modulus.'• The'isostrain'approach'is'known'as'the'Voigt'modulus.'• Hill'proposed'that'a'reasonable'average'of'the'two'would'be'
appropriate'in'materials'where'the'loading'is'intermediate'between'the'two'extreme'cases.''Hence'the'average'of'the'Isotress'and'Isostrain'values'is'known'as'the'Hill'Average'Modulus.'
• We'can'also'treat'the'composite'property'(for'elas?c'modulus)'in'terms'of'an'arithme1c%mean'(isostrain)'versus'a'harmonic%mean%
(isostress),'which'is'the'reciprocal'of'the'average'of'the'reciprocal'values.'
• Are'there'be/er'es?mates?''Yes,'look'in'the'Supplemental'slides'for'a'descrip?on'of'the'Hashin#Shtrikman'es?mates'of'modulus.''There'are'also'textbooks'by'Mura,'Nemat#Nasser,'Milton'and'several'others.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Homework Questions!• No'worked'example'is'provided'here'on'the'iso#strain'and'iso#stress'
models.'• Examples'were'quoted'of'theore?cal'combina?ons'of'materials'and'
for'Cu#W.'• Homework/exam'ques?ons'are'likely'to'ask'you'to'calculate'modulus'
values'at'different'volume'frac?ons'(of'two'phases),'to'plot'the'results'(linear'or'log'scale)'and'to'compare'against'experimental'data.'
• You'may'be'asked'to'ra?onalize'devia?ons'of'measured'modulus'values'from'calculated'ones'by'considering'microstructure.''For'example,'if'a'par?culate'composite'(with's?ff'par?cles'in'a'compliant'matrix,'e.g.'SiC'in'Al)'has'higher'modulus'than'you'compute'from'the'iso#stress'model,'then'this'may'be'because'the'par?cles'are'not'perfectly'dispersed'and'they'form'networks'through'inter#par?cle'contacts.''
30! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Summary: Part 1!• Composites'are'man#made'mixtures'of'phases,'onen'with'
different'material'types,'e.g.'glass'(ceramic)'as'a's?ffening'reinforcement'in'epoxy'(polymer).'
• The'simplest'way'to'es?mate'proper?es'is'to'use'the'Rule%of%Mixtures.''Such'simple'volume'averaging'is'also'valid'for'field'quan??es'such'as'stress'or'strain,'depending'on'boundary'condi?ons.'
• The'next'simplest'approach'to'compu?ng'the'proper?es'of'a'composite'is'to'look'for'upper'and'lower'bounds.''For'the'example'of'elas?c'modulus,'the'iso#strain'and'iso#stress'models'were'developed.''The'iso#strain'model'happens'to'give'the'same'result'as'the'Rule'of'Mixtures'but'has'a'physical'basis.'
31! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Part 2!
• In'this'Part,'we'consider'the'proper?es'of'wood.'• Wood'is'a'mul?scale'composite'material,'in'the'sense'that'it'is'self#evidently'a'cellular'material'but'the'cell'walls'are'themselves'composite'structures.'
• Wood'is'a'natural'example'of'a'cellular'material.'• We'also'examine'the'anisotropy'of'composite'materials,'partly'as'a'way'of'tying'together'what'we'learned'about'anisotropy'with'what'we'learn'about'composite'structures.'
32! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Questions & Answers for Part 2!1. What'makes'wood'a'mul?scale'composite'material?'Wood'is'
a'mul?scale'composite'material'because'there'is'iden?fiable'structure'at'the'scale'of'filaments,''microfibrils,'cell'wall'layers'and'cell'organiza?on'(“grain”).'
2. What'are'the'main'chemical'components'of'wood?'Wood'contains'mostly'cellulose'(in'various'forms)'and'lignin.'
3. What'dis?nguishes'wood'from'other'plants?'The'main'difference'between'wood'and'other'plants'is'that'its'cell'walls'contain'lignin,'which'makes'it'stronger'and'more'resistant'to'pests.'
4. What'is'the'macrostructure'of'wood?'Wood'contains'highly'elongated'cells,'that'define'the'“grain”'of'wood.''Cells'are'deposited'on'a'nearly'con?nuous'basis'but'their'diameter'varies'during'the'year'with'larger'diameter'cells'during'?mes'of'rapid'growth.''There'are'also'radial'structures'known'as'“rays”.''
5. What'is'the'structure'of'the'cell'walls?'There'are'several'layers.''There'is'a'Primary'outer'layer'(P),'outside'of'which'there'is'a'“middle'lamella”'that'contains'most'of'the'lignin.''Inside'the'P'layer,'there'are'the'S1,'S2'&'S3'layers,'with'different'layups'of'the'microfibrils.'
6. What'are'“rings”'in'wood?'As'noted'above,'the'cell'size'varies'on'an'annual'basis'which'means'that'a'cross#sec?on'through'a'trunk'reveals'what'look'like'rings'in'the'structure;'each'ring'corresponds'to'one'year,'which'permits'the'age'of'a'tree'to'be'es?mated'with'good'reliability.''The'varia?ons'in'cell'size'also'reveal'changes'in'local'climate.'
7. What'microstructural'characteris?c'correlates'most'strongly'with'the'mechanical'proper?es'of'wood?'Proper?es'such'as'modulus,'strength'and'fracture'toughness'correlate'most'strongly'with'density.'
8. How'does'elas?c'modulus'depend'on'density'in'wood?'The'elas?c'modulus'varies'either'in'propor?on'to'density'for'the'axial/longitudinal'direc?on'or'with'the'density'squared'across'the'grain'(radial'or'circumferen?al).'
9. Explain'the'structure'and'components'of'micro#fibrils.'Each'microfibril'is'a'bundle'of'cellulose'fibers'in'a'matrix'of'hemicellulose'and'lignin.''
10. Explain'the'structure'of'cell'walls'in'wood.'See'the'notes;'Several'layers'are'present'in'the'cell'wall,'each'with'its'own'characteris?c'lay#up'angle'of'the'micro#fibrils.'In'par?cular,'the'angle'between'the'microfibrils'and'the'axial'direc?on'in'the'S2'layer'is'strongly'an?#correlated'with's?ffness.'
11. Describe'the'anisotropy'of'the'mechanical'proper?es'of'wood.'Wood'is'much's?ffer,'stronger'and'tough'parallel'to'the'grain'than'across'the'grain.'
12. Based'on'the'chemistry'of'wood,'comment'on'its'sensi?vity'to'moisture.'Certain'components'of'the'wood'(esp.'cellulose)'are'hydrophilic'and'absorb'water.''Increased'moisture'content'increases's?ffness'and'strength.'
13. Why'does'the'modulus'vary'faster'than'linear'across'the'grain?'Crucially,'wood'is'a'cellular'material'and'deforms'primarily'via'bending'of'the'cell'walls.'
33!
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
34!
• Note'the'varia?on'in'cell'size'during'the'year'from'Earlywood'(spring#summer)'to'Latewood'(summer#autumn).''This'varia?on'in'cell'size'produces'the'characteris?c'“rings”'that'indicate'the'age'of'the'wood'because'of'the'yearly'cycle'in'cell'size'(and'the'magnitudes'of'the'cell'sizes'correlate'with'clima?c'condi?ons).''The'“Rays”'are'aligned'with'the'radial%direc1on.'The'long'direc?on'of'the'cells'is'the'axial%or%longitudinal%direc1on.'Follow'a'ring'around'the'trunk'and'this'is'the'circumferen1al%or%tangen1al%direc1on.'
Wood: Macro-structure!Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
35!
Wood: Microstructure!
• Columbian'pine'#''3'orthogonal''sec?ons'
• T:'transverse'R:'radial'L:'longitudinal'(ver?cal'in'both'images)'
T#L'
T#R'
R#L'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
36!
It'is'important'to'understand'wood'as'a'cellular,'composite'structure.''It'is'one,'however,'that'has'several'different'length'scales'from'that'of'the'cellulose'molecule'to'the'macrostructure'of'lumber'as'we'accustomed'to'looking'at'it'at'the'visual'scale.''The'figure''illustrates'the'hierarchy'of'length'scales'from'the'atomic'structure'of'cellulose'(A)'to'the'structure'of'a'tree'trunk'(E).''The'basic'building'block'of'wood'is'the'polymer'of'glucose'known'as'cellulose,'which'occurs'as'a'(mostly)'crystalline'fiber.''The'other'cri?cal'component'of'wood'is'lignin,'which'is'a'complex,'amorphous'material'containing'phenyl'groups.''Lignin'sets'wood'apart'from'other'plants;'its'occurrence'in'the'outer'and'inner'linings'of'the'cell'walls'is'cri?cal'for'both'structural'proper?es'and'for'wood’s'(rela?ve)'insensi?vity'to'environment.'
A' B'
C'
D'
E'
F'
Wood: multiscale!Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
37!
Wood: cell structure!• Each'cell'wall'contains'microfibrils,'each'of'which'is'a'bundle'of'
cellulose'fibers'in'a'matrix'of'hemicellulose'and'lignin.''Therefore'it'is'a'fiber@reinforced%composite!''The'P'layer'is'5'%'of'the'thickness'with'random'fiber'direc?ons;'the'S
1'layer'is'9'%'with'fibers'at'50#70°'w.r.t.'
the'axis;'the'S2'layer'is'85'%,'fibers'at'10#30°;'the'S
3'layer'is'1'%,'with'
fibers'at'90°'to'the'axis.'Note'the'dependence'of'the'tensile'strength'on'the'microfibril'angle'in'the'Outer'Wall,'labeled'“S1”.''Each'cell'is'a'long'tube,'some'of'which'are'used'for'transpor?ng'water'(but'not'all).'
C'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
38!
Wood: Microfibril structure!• The'filaments'or'fibers'of'cellulose,'(C6H10O5)n,'where'n~104,'are'
organized'in'bundles'(together'with'lignin'surrounding'the'fibers)'called'microfibrils'whose'size'is'about'10'nm.''Each'set'of'microfibrils'forms'a'bundle'that'is'itself'a'structural'member'of'the'wall'of'a'cell'(next'slide).'
• Son'woods'have'longer'cellulose'fibers'than'hardwoods'(which'ma/ers'to'the'manufacture'of'paper).'
A'B'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
39!
Wood: Constituents: Cellulose!• Cellulose:'a'high'molecular'weight,'stereoregular,'and'linear'polymer'
of'repea?ng'beta#D#glucopyranose'units.'It'is'the'main'structural'element'and'major'cons?tuent'of'the'cell'wall'of'trees'and'plants.'The'empirical'formula'for'cellulose'is'(C6H10O5)n'where''n''is'degree'of'polymeriza?on'(DP).'[h/p://www.paperonweb.com/wood.htm]'
Substance Degree of Polymerization (DP)
Molecular Weight
Native Cellulose >3500 >570,000 Purified Cotton 1000 - 3000 150,000 - 500,000 Wood Pulp 600 - 1000 90,000 - 150,000 Commercial Regenerated Cellulose (e.g. Rayon)
200 - 600 30,000 - 150,000
Cellulose 15 - 90 3000 - 15,000 Y Cellulose <15 <3000 Dynamite Nitro-Cellulose 3000 - 5000 750,000 - 875,000 Plastic Nitro-Cellulose 500 - 600 125,000 - 150,000 Commercial Cellulose Acetate
175 - 360 45,000 - 100,000
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
40!
• Taking'wood'as'an'example,'it'is'found'empirically'that'the'moduli'vary'with'(rela?ve)'density'anisotropically.' %
%
%
'• Note'the'discrepancy'between'the'
empirical'equa?on'and'the'slope'in'the'plot.''The'theore?cal'predic?on'goes'as'(ρ/ρcell)3.'
[Gibson & Ashby: Cellular Materials]!
€
Eaxial ∝ Ecellρρcell
E transverse ∝ Ecellρρcell
$
% &
'
( )
2
Cellular Materials: Young’s Modulus !Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
41!
Wood: Young’s Modulus!
(1)
(2)'
• 'The'first'equa?on'quan?fies'the'idea'that'the'tensile'modulus'of'wood'parallel'to'the'grain'is'just'the'volume'average'of'the'area'frac?on'occupied'by'cell'wall.!
€
Eaxial ∝ Ecellρρcell
E transverse ∝ Ecellρρcell
$
% &
'
( )
2
• 'To'understand'what'controls'the'elas?c'modulus'(Young’s'modulus)'of'wood,'we'have'to'consider'bending'of'the'cell'walls'in'the'microstructure.!
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
42!
Wood: Modulus, contd.!
• The'second'equa?on'(modulus'transverse'to'the'grain)'is'more'subtle'and'states'that'the'elas?c'modulus'varies'more'rapidly'#'with'the'square'of'the'density'#'than'the'axial'modulus.''The'reason'for'this'can'be'understood'very'simply'in'terms'of'the'cellular'structure.''When'wood'is'loaded'across'the'grain,'the'cell'walls'bend'like'miniature'beams.''This'response'can'be'quan?fied'by'use'of'beam'theory'to'arrive'at'the'func?onal'dependence'of'equa?on'2.'''
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
43!
Summary: Part 2A!• Wood'can'be'understood'as'a'composite'material'or,'
more'usefully,'as'a'cellular/material.'• Wood'is'a'mul?#scale'composite'material.'• The'cell'walls'of'wood'are'themselves'composite'
structures.'• Even'the'fibers'in'the'cell'walls'are'also'composites.'• The'elas?c'proper?es'of'wood'are'highly'anisotropic:'
wood'is's?ffer'in'the'axial'direc?on'and'more'compliant'in'the'transverse'direc?on.'
• The'varia?on'in'modulus'with'rela?ve'density'is'linear'in'the'axial'direc?on'but'varies'as'the'square'of'the'rela?ve'density'in'the'transverse'direc?on.'
• In'part'2B,'we'introduce'beam'bending'theory'to'quan?fy'these'effects.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
44!
2B: Introduction to beam theory!
€
Δll0
=(R + y)θ − Rθ
Rθ but ε =
Δll0
∴ε =yR
=8δmaxyl2
=3FlyEwt 3
€
Moment of Inertia, I :
I = y 2dAy= 0
y= t∫ =
wt 3
12Moment on the beam, M :
M = σ ydAy= 0
y= t∫
Stress varies linearly with strain :σy
=Eεy
=E(y /R)
y=ER
This shows that stress varies linearly with yso σ/y is a constant :
M =σ y y 2dAy= 0
y= t∫ =σ y I
Thus this double equality is true :MI
=σy
=ER
For a force, F, at the center of the beamthe maximum deflection, δmax is :
δmax =l2
8R=l2M8EI
=l2Fl /48EI
=l3F
32EI=
3Fl3
8Ewt 3
w'
t'δmax'
• Consider'a'3#point'beam'with'length,'l:'supported'at'either'end'and'loaded'in'the'center'with'a'force,'F.''The'most'important'point'is'that'there'is'a'neutral'point'in'the'beam,'n,'at'which'the'stress'is'zero;'above'this'it'is'compressive,'and'below'it'is'tensile.''The'stress'is'propor?onal'to'distance'from'the'neutral'plane.'
[Dowling]
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
45!
Beam theory applied to wood!• The'mechanical'behavior'can'be'modeled'by'a'framework'of'beams.''
The'deflec?on,'δ,'of'a'beam'of'length'l'and'thickness't,'under'a'load'F,'is'given'by'standard'beam'theory'(see'previous'slide)'as'''δ'= F l3/ 32EcellI,'''where'Ecell'is'the'Young’s'modulus'of'the'beam'material'(i.e.'the'cell'wall)'and'I'is'the'bending'moment'which'is'propor?onal'to't4%(recall'that'I = wt3/12 ,'so'for'w=t,'I = t4/12).''The'force'is'stress,'σ,'mul?plied'by'area,'= l2,'i.e. F = σ l2. The'strain, ε,'is'the'displacement,'δ, divided'by'the'cell'length, ε = δ / l = F l3/ 32 l EcellI = F l2 / 32 EcellI.'''
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
46!
Wood: modulus, contd.!• Thus'we'can'obtain'Eq.'2'as'the'ra?o'of'stress'to'strain.'
€
E transverse =σε
= σFl3 32EcellIl( )
= σσl2 l3 32EcellIl( )
= 32EcellIl4( )
E transverse = 8 3Ecelltl( )
4 for'w=t,'I = t4/12
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
47!
Wood: modulus, contd.!• But'we'also'relate'the'density'to'the'cell'dimensions'by'wri?ng
ρ ∝ (t/l)2'and'obtain'Eq.'2'(where'the'propor?onality'constant,'C”~1,'based'on'experimental'data),''Etransverse = C” Ecell ρ2.!'
• Note'that'this'deriva?on'is'a'general'one'for'open@celled%foams'and'happens'to'be'a'simple,'easy#to#understand'approach.''Woods'have'more'complex'structures'than'the'open'cell'model'which'helps'to'explain'the'sca/er'in'the'data.'
• Note'that'the'theory'for'closed@celled%foams'(see'supplemental'slides),'which'is'closer'to'the'actual'structure'of'wood,'shows'a'dependence'on'(ρ/ρcell)3,/not'(ρ/ρcell)2/as'derived'here.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
48!
Wood: strength!
• Here,'the'story'is'very'similar'to'that'of'modulus.''The'axial'modulus'is'determined'by'the'area'frac?on'of'cell'wall'material,'hence'the'linear'dependence'on'density.''The'transverse'strength,'however,'is'limited'by'bending'and'plas?c'hinge'behavior'of'the'cellular'structure,'hence'the'quadra?c'dependence'on'density.''The'difference'between'axial'and'transverse'proper?es'is'so'great'for'both'modulus'and'most'other'mechanical'proper?es'that'it'is'always'necessary'to'be'aware'of'the'anisotropy%of'wood,'i.e.'that'the'proper?es'vary'markedly'with'direc?on.''More'succinctly,'wood'is'much'stronger'and's?ffer'along'the'grain'than'across'the'grain.''The'lower'the'density,'the'more'obvious'the'difference.'
€
σ axial ∝σ cellρρcell
σ transverse ∝σ cellρρcell
%
& '
(
) *
2
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
49! Wood: fracture toughness!
'KIC:axial ∝'KICcell (ρ/ρcell)3/2''KICtransverse'∝'KICcell'(ρ/ρcell)3/2''KICtransverse'»'KIC:axial'''
• For'fracture'toughness,'the'result'is'given'without'proof'that'the'cellular'structure'leads'to'a'3/2'exponent'in'the'density'dependence,'regardless'of'direc?on.''The'crucial'point'is'that'propaga?ng'a'crack'parallel'to'the'grain'is'much'easier'than'transverse,'by'a'factor'of'~'10!''More'than'one'microstructural'feature'contributes'to'the'high'transverse'toughness,'including'fiber'pull#out,'propaga?on'of'secondary'cracks'perpendicular'to'the'primary'crack,'and'elonga?on'of'the'polymer'chains'in'the'cell'walls.''Again,'there'are'many'different'direc?ons'and'planes'for'crack'propaga?on'in'this'anisotropic'material'which'further'increases'the'variability'of'the'toughness.'
More detailed figure available in Gibson & Ashby, fig. 10.17
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
50!
Wood: moisture content!
• Water'is'found'in'wood'both'in'chemically'bound'form,'and'stored'in'vessels'(“lumin”).'''
• The'bound'form'of'water'strongly'affects'proper?es'of'all'kinds.'
• The'free'water'has'only'a'minor'effect.'• The'“fiber'satura?on'point”'is'the'water'content'that'corresponds'to'satura?on'of'the'bound'water.''The'FSP'is'about'28'%'of'the'fully'dry'wood.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Bone • Similar'strong'
sensi?vity'of'proper?es'to'moisture'content'as'observed'for'wood.'
• Dependence'of'modulus'on'density'is'less'clear'even'than'for'wood.'
• Compressive'strength'varies'as'the'square'of'the'density
51!
Note:'bone'varies'considerably'in'structure,'depending'on'the'local'loading'that'the'body'puts'on'it.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
52!
Future Composites!
“Carbon'nanotube'composites”,'PJ.F.'Harris,'Intl.'Matls.'Reviews,'49,'31'(2004)'
• Carbon'nanotube'composites:'currently'based'on'polymer#nanotube'materials,'but'combina?ons'of'nanotubes'with'ceramics'are'being'fabricated.'
• (a)'Nanotube'types'''(b)'TEM'micrograph'of'nanotubes'(note'fringes'in'the'walls'indica?ng'mul?ple'walls);'(c)'TEM'image'of'mul?walled'nanotube'(MWNT)#polystyrene'thin'film'composite.'''
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
53!
Impact Protection for Space Vehicles!
• h/p://hi|.jsc.nasa.gov/hi|pub/main/index.html'• h/p://see.msfc.nasa.gov/mod/modtech.htm'#'shield'design.'
• h/p://oea.larc.nasa.gov/PAIS/MISSE.html'#'materials'tes?ng.'
• h/p://www.nasa.gov/lb/missions/science/spinoff9_nextel_f.html''use'of'Nextel'as'a'shield'material.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
54!
Summary: Part 2B!• Wood'can'be'understood'as'a'composite'material'or,'
more'usefully,'as'a'cellular/material.'• Wood'is'a'mul?#scale'composite'material.'• The'cell'walls'of'wood'are'themselves'composite'
structures.'• Even'the'fibers'in'the'cell'walls'are'also'composites.'• We'can'es?mate'their'proper?es'based'on'the'
applica?on'of'beam'bending'theory'to'the'way'in'the'cell'walls'deform'under'load.'
• Bone'has'proper?es'that'resemble'wood'in'some'respects'i.e.'a'similar'dependence'of'modulus'on'density.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Part 3!
• In'this'Part,'we'consider'the'basic'characteris?cs'of'fibers'for'fiber'composites.'
• We'examine'how'to'engineer'composite'proper?es'by'exploi?ng'residual'stress.'
• We'also'examine'the'anisotropy'of'the'proper?es'of'composite'proper?es,'which'builds'on'what'we'learned'about'tensor'proper?es.'
55! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
56!
Fiber Composites!• An'important'class'of'composites'is'that'of'fiber%composites.'• The'materials'involved'may'be'metal,'ceramic'or'polymer.''Glass#fiber'composite'is'
typical'in'low#cost'structures'such'as'boat'hulls.''Carbon#fiber'composites'are'used'in'higher'performance'structures'such'as'airplanes'where'their'higher'cost'is'jus?fied'by'the'requirements.''Ceramic'composites'are'used'typically'for'high'temperature'service,'such'as'heat'exchangers.'
• The'basic'idea'is'to'take'advantage'of'high'strength'and's?ffness'of'the'fibers'and'to'obtain'damage'tolerance'(and'specific'shapes)'by'embedding'them'in'a'suitable'matrix.''More'specifically,'the'fiber'material'(e.g.'graphite,'glass)'is'a'material'that'would'not'generally'be'considered'to'be'a'structural'material.'
• Solid'mechanics'of'fiber'composites:'the'key'to'understanding'the'mechanical'proper?es'of'fiber'composites'(for'fibers'whose'length'is'short'compared'to'the'size'of'the'component)'is'load%transfer'between'the'matrix'and'the'fibers.''This'means'that'the'stress'on'each'fiber'varies'along'its'length.'Also,'the'composite'materials'are'strongly'anisotropic'(so'tensors'are'useful'again).'See'discussion'in'the'supplemental'slides.'
• Modern'developments:'carbon'nanotubes'offer'excep?onal's?ffness'and'strength,'not'to'men?on'interes?ng'electrical'proper?es'in'some'cases.''If'we'can'figure'out'how'to'separate'out'the'various'different'conforma?ons'and'how'to'align'the'nanotubes,'there'should'be'a'wide'range'of'exci?ng'materials'possible.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
57!
Fibers for Polymer Matrix Composites!
• Many'types'of'fibers'are'available:'carbon,%glass,%aramid,'quartz,'polyethylene,'boron,'silicon'carbide,'alumina,'aluminosilicate.''
• ''The'polymer'matrix'composite'business'is'dominated'by'volume'by'carbon,%glass%and%
aramid%fibers'because'they'offer'the'best'performance:price'ra?o.'
“Mechanics'of'Fibrous'Composites”,'C.T.'Herakovich'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
58!
Carbon Fibers!• Modulus'ranges'from'200#750'GPa''
(compare'with'steel:'210'GPa)'• Strength'ranges'from'2#6'GPa'• Breaking'strain'ranges'from'0.2'#'2'%'• Density'ranges'from'1.76#'2.15'• Highest'cost'compared'to'glass'or'aramid,'but'greatest'
range'of'proper?es.'• Internal'structure'consists'of'radially#aligned'graphite'
platelets,'which'leads'to'some'anisotropy'in'proper?es'in'the'fibers.''Both'thermal'and'electrical'conduc?vity'are'generally'good'(but'then'insula?on'required'where'metals'might'be'in'contact'for'carbon#fiber'composite).'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
59!
Glass Fibers!• Glass'fibers'produced'by'spinning'liquid'glass'directly'to'
fine'fibers.''Just'as'in'the'Griffith'experiments,'the'strength'is'based'on'small'diameter.''
• Modulus'ranges'from'70#'90'GPa.'• Strength'ranges'from'1.7#5'GPa'• Breaking'strain'from'2'to'5%'• Density'~'2.5'gm/cc.'• “E'glass”'[electrical,'borosilicate'glass]'is'the'cheapest'and'
most'common.''“R'glass”'and'“S'glass”'is'more'expensive'but'more'corrosion'resistant,'for'example'and'higher'strength.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
60!
Aramid Fibers!• Aramid'fibers'are'produced'by'drawing'liquid'crystal'polymers'based'
on,'e.g.'polyparabenzamide'or'polyparaphenylene'terephthalamide.'• Polymer'chains'arranged'in'radially'oriented,'kinked'sheets.''
Bonding'between'the'molecules'is'largely'hydrogen'bonding'so'the'transverse'proper?es'are'weak'compared'to'on#axis.''Therefore'difficult'to'propagate'a'crack'along'a'fiber.'
• Modulus'ranges'from'55#120'GPa'• Strength'ranges'from'3'to'3.6'GPa'• Breaking'strain'ranges'from'2.5'to'4%'• Density'~'1.45'gm/cc.'• Aramid'fibers'vulnerable'to'environmental'degrada?on'(sunlight).'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
61!
Residual Stresses and Composites!• In'a'sta?onary'body'that'is'free'of'external'loads,'the'average'stress'(and'moment)'must'be'zero'
because'(Newton’s'Laws)'there'must'be'no'net'force'on'it.'• The'stress'state'inside'the'body,'however,'can'vary'arbitrarily.''Such'variable'internal'stresses'are'
onen'know'as'residual%stresses'because'they'are'the'len#over'from'previous'processing.''• The'simplicity'of'elas?c'stresses'is'that'they'can'be'superimposed.''Therefore'one'can'assume'in'beam'
loading'that'the'stresses'imposed'by'external'loading'can'be'added%'to'the'internal'varia?ons.'• As'with'all'phenomena,'there'are'engineering'applica?ons.''Reinforced'concrete,'for'example,'is'a'
fiber#reinforced'composite'with'a'bri/le'matrix'(concrete)'and'a'duc?le'fiber'reinforcement'(steel'bars'or'cable).''The'steel'is'typically'held'in'tension'during'the'se~ng#up'of'the'concrete,'resul?ng'in'a'composite'for'which'the'steel'is'in'a'state'of'tension'and'the'concrete'is'in'compression.'
• For'fiber#reinforced'materials,'for'example,'a'difference'in'thermal'expansion'coefficient'can'produce'a'residual'stress'state'in'a'composite.''For'example,'if'the'fiber'has'a'smaller%CTE'and'the'composite'is'cooled'from'a'zero'stress'state'at'high'temperature,'then'the'matrix'shrinks'more'than'the'reinforcing'fibers,'pu~ng'the'matrix'in'tension'and'the'fibers'in'compression.'
• Safety%Glass'as'commonly'used'for'the'windshields'of'cars'rely'on'residual'stress'developed'through'heat'treatment.''A'compressive'residual'stress'near'the'surface(s)'is'balanced'by'a'tensile'residual'stress'in'the'center.''Furthermore,'the'heat'treatment'is'done'in'such'a'fashion'as'to'develop'a'fine'pa/ern'so'that,'if'the'windshield'does'break,'it'sha/ers'into'many'small'but'compact'pieces'that'are'far'less'hazardous'than'the'typical'shards'of'window'glass.%
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
62!
Reinforced Concrete!• Steps'required:'
1. Stretch'reinforcing'steel'cables''(i.e.'place'them'in'tension)'2. Pour'concrete'around'the'cables;'allow'concrete'to'set'3. Remove'tensioning'force'from'steel'cables'4. The'steel'cables'contract'elas?cally'but'the'concrete'matrix'resists'the'
contrac?on'5. Steel'remains'in'tension'(did'not'shrink'back'to'zero'strain)'whereas'the'
concrete'is'in'compression'to'balance'the'tensile'stress'in'the'steel'cables'• Ques?on:'is'there'an'op?mum'loca?on'for'the'reinforcement'within'the'
beam?''At'the'top?''Bo/om?'• Loading'of'Reinforced'Concrete'Beams:'
– As'the'beam'is'loaded'(e.g.'3#point'bending),'the'concrete'underneath'the'loading'point'experiences'the'sum'of'its'residual'compressive'stress,'plus'the'tensile'stress'from'the'bending'load.''For'moderate'loads,'the'stress'remains'compressive,'protec?ng'against'bri/le'failure.'
• The'composite'is'highly'anisotropic,'of'course.'• Famous'example'(local'to'Pi/sburgh):'the'can?levered'terraces'of'Frank'
Lloyd'Wright’s'house,'Fallingwater'(image'above).'• h/p://structsource.com/analysis/types/concrete.htm'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Pre-stressed Reinforced Concrete!Remember:/in/the/absence/of/external/loads/
(trac;ons)/the/net/stress/in/the/material/must/be/zero./
63!
Steel rod: large tensile stress from external load
Add concrete, allow to set, no stress in concrete
Remove external load on steel; compressive stress in concrete increases to balance the decreased tensile stress in the steel
€
0 = σdVVolume∫
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Homework Questions!• A'worked'example'is'very'simple'in'this'case.'• If'the'fracture'toughness,'KIC,'of'concrete'is'measured'to'be'2 MPa√m,'and'
the'maximum'flaw'size'is'5 mm (based'on'the'aggregate'sizes),'what'is'the'maximum'tensile'stress'that'it'can'withstand?''Answer:'apply'the'Griffith'Eq.'with'the'maximum'flaw'size'as'the'crack'size'(since'this'represents'the'weak'link'in'the'material),'which'suggests'that'the'breaking'stress'='√{KIc/πc} = √{2.106 / π / 5.10-3} = 11.28 kPa,'which'is'very'small'indeed.
• If'the'volume'frac?on'of'reinforcing'steel'in'concrete'is'limited'to'10%,'its'yield'stress'is'1.5 GPa and'you'can'stress'the'steel'to'80%'of'its'yield'(represen?ng'the'safety'factor),'what'approximate'tensile'strength'can'you'develop'in'the'concrete'via'pre#stressing?''Answer:'assume'that'you'can'neglect'the'inherent'tensile'strength.''Assume'that'you'can'apply'1500 * 0.8 MPa tensile'stress'in'the'steel,'which'is'balanced'by'1500*0.8*0.1/0.9 = 133 MPa'compressive'stress'in'the'concrete.''This'residual'compressive'stress'in'the'concrete'represents'the'maximum'tensile'stress'that'you'can'apply'before'you'expect'the'concrete'to'break.'
64! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Anisotropy of Cell Wall!65!
cij =
0
BBBBBB@
16 11 11 0 0 011 16 11 0 0 011 11 16 0 0 00 0 0 1 0 00 0 0 0 1 00 0 0 0 0 1
1
CCCCCCA
De Graef HW 4 2009 (adapted)
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Cell Wall: Young’s Modulus: Anisotropy!
• The'first'decision'is'which'model'to'use.'• In'this'context'it'means,'do'we'use'iso#strain'or'iso#stress?'''
• Since'we'are'looking'at'loading'the'material'in'the'plane'of'the'layers,'then'it'is'appropriate'to'use'the'iso#strain'model.'
• This'means'that'we'can'use'the'rule'of'mixtures'for'the'3'phases'that'contribute'to'the'Young’s'modulus:'σC= V1σ1 + V2σ2 + V3σ3 = V1E!εC + V2E2εC + V3E3εC.'
• The'next'step'is'to'compute'the'moduli.'
66! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
67!
S in terms of C!In'order'to'compute'Young’s'modulus,'we'need'to'use'the'
reciprocal'compliances.'The'rela?onships'for's'(compliance)'in'terms'of'c'(s?ffness)'
are'symmetrical'to'those'for's?ffnesses'in'terms'of'compliances'(a'simple'exercise'in'algebra!).''s11 = (c11+c12)/{(c11-c12)(c11+2c12)}!
= (16+11)/{(16-11)(16+22)}" = 0.1421 "s12 = -c12/{(c11-c12)(c11+2c12)}!
= -11/{(16-11)(16+22)}" = -0.05789 "s44 = 1/c44" = 1/1 = 1.!
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
68!
Rotated compliance (matrix)!• The'standard'rela?onship'is'as'follows:'
'''''
• Now'we'just'need'to'specify'the'direc?on'cosines,'of'which'only'the'1st'term,'(α1α2)2,'is'non#zero.''For'the'S3'layer,'it'is'easy'because'the'value'is'zero,'so'only's11'is'used!''For'S2'(α1α2)2'='cos2(20)'cos2(70)'='0.1033;'for'S1'the'(α1α2)2'='cos2(60)'cos2(30)'='0.1875.''The'combina?on'of'compliances'='2*(0.1421+0.05789-0.5)='#0.3001.'
! s 11 = s11 −
2 s11 − s12 − 12s44( ) α12α22 +α 22α3
2 +α32α1
2{ }
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Compliance values; Young’s Modulus!
• s11'for'S1:'0.1421'• s11'for'S2:'0.1421'+'0.1033*#0.3001'='0.1111'• s11'for'S3:'0.1421'+'0.1875*#0.3001'='0.08583'• Make'the'volume#based'average:'• 1/Ecell'='0.1*0.1421'+'0.8*0.1111'+'0.1*0.08585'='0.111675'
• Ecell'='1'/'0.111675'='8.954'
69! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Cell Wall: Young’s Modulus: Anisotropy!
• What'if'the'fibers'have,'say'tetragonal'symmetry,'as'is'more'likely'than'cubic?''Then'the's?ffness'tensor'will'take'the'following'form.'''''
• Here'the'challenge'is'to'invert'the'proper?es'of'a'tetragonal'material'so'that'we'ought'to'use'compliances'rather'than's?ffnesses.'
70!
cij =
0
BBBBBB@
16 5 11 0 0 05 16 11 0 0 011 11 4 0 0 00 0 0 1 0 00 0 0 0 1 00 0 0 0 0 3
1
CCCCCCA
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Tetragonal Fibers
• Let’s'further'assume'that'the'4#fold'symmetry'axis'is'parallel'to'the'long'direc?on'of'the'fibers.'
• Inver?ng'the'compliance#s?ffness'rela?on,'however,'is'non#trivial'for'non#cubics.''This'is'found'in'Nye'or'Newnham.''The'rela?onships'are'wri/en'out'for'c'in'terms'of's,'but'they'are'symmetrical'so's'can'be'subs?tuted'for'c,'and'vice'versa.'
• c11+ c12= s33 / s ; c11- c12=1/(s11- s12); c13 = -s13/s33 c33 = (s11 + s12) /s ; c44 = 1 / s44 ; s = s33 (s11 + s12) - 2s2
13 . • Next'we'need'to'find'the'formulae'for'the'varia?on'in's11'
with'direc?on.
71!
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Tetragonal Fibers, contd.
• Again,'as'found'in'Nye:'
72!
€
" s 11 = s11 α14 +α2
4( ) + s33α34 + s12 + s44( )α12α2
2
+α22 1−α3
2( ) s13 + s44( ) + 2s16α1α2 α12 −α2
2( ){ }• The'computa?on'is'then'similar'but'longer'and'more'detailed.'
• What'emerges'is'the'conclusion'that'the'cell'wall'can'be's?ffer,'or'more'compliant,'than'is'possible'by'aligning'the'fibers'in'only'one'direc?on.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Summary: Part 3!
• In'this'part,'we'learned'about'the'proper?es'of'fiber@reinforced%composites.'
• We'also'learned'about'how'important'the'anisotropy%of%composites%onen'is,'and'how'to'represent'that'anisotropy'in'terms'of'tensor'proper?es'of'materials.''Further'informa?on'on'anisotropy'of'composites'can'be'found'in'the'supplemental'slides.'
73! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Part 4!
• In'this'Part,'we'consider'the'basic'characteris?cs'of'cellular'materials.'
• We'examine'the'problem'of'shock'absorbing'materials'as'an'example'of'the'applica?on'of'composite'proper?es'for'foams'(cellular'materials).'
74! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
75!
Cellular Materials!
• This'next'sec?on'provides'some'basic'informa?on'on'cellular'materials.'
• Why'study'cellular'materials?''Answer:'cellular'materials'provide'a'range'of'proper?es'that'are'not%achievable%in%bulk%materials.''Especially'when'load%carrying%capacity%at%very%low%densi1es%is'required,'only'cellular'materials'can'sa?sfy'the'requirements.''Shock%resistance%is'also'a'vital'characteris?c'of'cellular'materials.'
• Cellular'structures'are'feasible'(and'used'for'engineering'applica?ons)'with'all'materials'types.''Metal'honeycombs'are'used'in'transport'applica?ons.''Ceramic'foams'are'used'in'insula?on.''Cellular'structures'are'ubiquitous'in'biomaterials'(wood,'bone,'shells…).'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
76!
Honeycombs: properties!
[Gibson & Ashby: Cellular Materials]!
• Note'the'contrast'between'tension'and'compression'(plateau'present),'4.2a'vs.'4.2b.'
• Even'bri/le'wall'materials'exhibit'progressive'failure'in'compression,'4.2e.'
• The'stress#strain'curves'are'labeled'by'their'characteris?c'stages.'
• Very'important'consequences'for'energy'absorbing'structures'(see'later'slides)'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
77!
Energy Absorption!
• Why'are'foams'useful?!''One'reason'is'their'capacity'to'absorb'energy.'
[Gibson]!
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
78!
Energy Absorption: 2!• How'do'these'two'graphs'connect?'Each'line'on'the'2nd'graph'correspond'to'a'
locus'of'points'from'the'1st'graph,'for'a'par?cular'rela?ve'density.''Note'the'turn#over'in'the'curve'of'energy'versus'stress:'this'is'the'most'efficient'use'of'the'material.'
[Gibson]!
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
79!
Energy Absorption: 3!
Elas?c'
Wall'Buckling'
Fully'Densified'
During'wall'buckling,'densifica?on'proceeds'at'a'approximately'constant'external'stress.'
[Gibson]!
Note'that,'once'the'foam'starts'to'densify'(steep'upturn'in'the'stress#strain'curve)'then'the'stress'rises'with'li/le'increase'in'energy'absorbed.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
80!
• As'seen'before,'the'stress#strain'(8.4a)'can'be're#plo/ed'as'energy'absorbed'versus'stress'(8.4b).''Varying'the'density'varies'the'maximum'energy'that'can'be'absorbed'at'the'plateau'stress.'
• We'can'draw'an'envelope'through'the'points'of'maximum'energy'÷'plateau'stress.'''
• Varia?ons'in'other'parameters'such'as'strain'rate'can'also'be'shown'on'such'an'energy#stress'diagram'by'plo~ng'only'these'envelopes.'
[Gibson]!
Energy Absorption: 4!Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
81!
Shock Cushions!
• Once'one'knows'the'energy#stress'characteris?c'of'a'material,'it'is'possible'to'calculate'the'op?mum'thickness.'
• Given'the'kine?c'energy'to'be'absorbed,'U,'and'the'area'of'contact'between'object'and'foam,'A,'the'thickness,'t,'is'given'by'''
' ' 't = U / W A (Eq. 1)%%
where'W'is'the'energy'absorbed'per'unit'volume'in'the'foam.'• Typically,'the'mass'of'the'object,'m,'and'the'peak'decelera?on,'a,'is'
also'specified'(as'a'mul?ple'of'gravita?onal'accelera?on,'g)'which'determines'the'maximum'stress,'σ,''
' ' ''σ = m a / A% (Eq. 2)%
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
82!
Shock Cushion: 2!• In'addi?on,'a'drop'height'is'specified'which'in'turn'sets'the'velocity,'
v,'and'the'energy,'U,'that'must'be'absorbed;''U = m v2 / 2.%%Thus'the'thickness,'t,'is'given'by'''''''''''''''''''''''''''''t = m v2 / (2 W A) (Eq. 3) #%
• This'in'turn'specifies'the'strain'rate,'dε/dt,'in'the'foam'which'affects'the'energy#stress'rela?onship'(see'Fig.'8.4c):''''''''''''''''''''''''''''''''dε/dt%='v / t (Eq. 4) #'
• A'good'place'to'start'is'to'iden?fy'the'maximum'allowable'stress'and'read'off'the'associated'energy'at'a'high'strain'rate.''The'energy'is,'however,'a'func?on'of'both'stress'and'strain'rate,'so'some'itera?on'is'required'to'iden?fy'a'suitable'thickness.'
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Shock Cushion: 3 Worked/Example/Problem/specifica;on/Mass'of'packaged'object:'500 gms.'Area'of'contact'between'object'and'foam:'A = 0.01 m2
Velocity'of'package'on'impact,'v = 4.5 m/s'(drop'height,'h'='1'm)'Energy'to'be'absorbed,'U = mv2/2 = 5 J''Max.'allowable'force'on'package'(10g'decelera?on),'F = ma = 50 N Max.'allowable'peak'stress'(Eq.'2),'σp = F/A = 5 kPa Solid'modulus'of'polyeurethane'foam,'Es = 50 MPa Max.'allowable'peak'stress,'normalized'='σp/Es = 0.0001 We'use'Gibson#Ashby,'fig.'8.8'(next'slide).
83!
Gibson & Ashby: Table 8.2, p. 231
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Shock Cushion: 4
Choice'of'thickness,'t:'''''''''''''''''1 m 0.001 m Strain'rate,'dε/dt=v/t'(Eq'4):'''''''4.5 s-1 4500 s-1
Energy/modulus'(W/Es)'at'σp/Es'= 0.0001:'(Fig.'8.8)'''''''''''''''''''''''''''''''''5.25 10-5 7.4 10-5
Energy'absorbed/unit'volume:'''2.62 kJ/m3 3.70 kJ/m3
84!
To'start'working'on'the'problem,'we'have'to'make'some'rather'arbitrary'choices'of'thickness'that'bracket'the'likely'result.
To'complete'the'problem,'we'have'to'iterate'on'the'thickness'un?l'we'converge'on'a'self#consistent'result.
Gibson & Ashby
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Shock Cushion: 5
Thickness,'t = U/WA:'''''''''''''''''0.19 m 0.14 m Strain'rate,'dε/dt=v/t'(Eq'4):''''''''24 s-1 32 s-1
Energy/modulus'(W/Es)'at'σp/Es = 0.0001: (Fig.'8.8)'''''''''''''''''''''''''''''''''6.6 10-5 6.7 10-5
Energy'absorbed/unit'volume:'''3.30 kJ/m3 3.35 kJ/m3
85!
To'con?nue'with'the'problem,'we're#calculate'the'thicknesses'from'Eq.'1.
Clearly'we'have'nearly'converged,'so'we'have'to'iterate'on'the'thickness'one'more'?me,'using't = U/WA,'which'gives't= 150 mm'and'an'op?mum'rela?ve'density'='0.01.
Gibson & Ashby
Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
Summary: Part 4!
• Foams'or'cellular'materials'are'an'example'of'composite'materials.'''
• We'developed'an'example'of'how'cellular'materials'are'useful'as'shock'cushions.'
• This'lead'to'worked'example'of'how'calculate'the'op?mum'thickness'of'such'as'shock'cushion.'
86! Examinable
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
87!
Summary: Overall!• Composite'materials'have'been'described'with'respect'to'
their'microstructure#property'rela?onships.'• Use'of'the'composite'approach'enables'much'larger'
varia?ons'in'proper?es'to'be'achieved'within'a'given'material'type.'
• Careful'op?miza?on'of'the'material'with'respect'to'all'the'property'requirements'[for'a'given'applica?on]'is'essen?al.'
• CTE'of'a'composite'can'be'es?mated'(supplementary'slides)'from'the'CTEs'of'the'cons?tuent'phases.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
88!
References!• Cellular'Solids,'Pergamon,'L.J.'Gibson'and'M.F.'Ashby'(1988),'ISBN'0#08#036607#4.'• Materials'Principles'&'Prac?ce,'Bu/erworth'Heinemann,'edited'by'C.'Newey'&'G.'
Weaver.'• Mechanical'Metallurgy,'G.E.'Dieter,'3rd'edi?on,''McGrawHill.'• Mechanical'Behavior'of'Materials,'T.'H.'Courtney'(2000),'Boston,'McGraw#Hill.'• Mechanical'Behavior'of'Materials,'N.E.'Dowling'(1999),'Pren?ce#Hall.'• Structural'Materials,'Bu/erworth'Heinemann,'edited'by'G.'Weidmann,'P.'Lewis'and'N.'
Reid.'• Physical'Ceramics,'Y.#T.'Chiang,'D.P.'Birnie'III,'W.D.'Kingery'(1997),'Wiley,'New'York,'
0#471#59873#9.'• The'New'Science'of'Strong'Materials,'J.'E.'Gordon,'Princeton.'• An'Introduc?on'of'Composite'Products,'Chapman'&'Hall,'K.'Po/er'(1997),'ISBN'
0#412#73690#X.'• An'Introduc?on'to'the'Mechanical'Proper?es'of'Solid'Polymers,'Wiley,'I.M.'Ward'and'
D.W.'Hadley'(1993),'ISBN'0#471#93887#4.'• Varia?onal'Methods'in'Mechanics,'Oxford'University'Press,'USA,'1992,'Toshio'Mura,'
ISBN0195068300.'• Plas?city:'A'Trea?se'on'Finite'Deforma?on'of'Heterogeneous'Inelas?c'Materials,'
Cambridge'University'Press,'2009,'S.'Nemat#Nasser,'ISBN'0521108063.'• The'Theory'of'Composites,'Cambridge'University'Press,'2001,'G.'F.'Milton,'
ISBN'0521781256.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
89!
Supplemental Slides!
• The'following'slides'contain'supplemental'material'that'will'be'of'interest'to'those'who'are'curious'to'obtain'more'detail.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
90!
Improved bounds!
• Upper'and'lower'bounds'for'modulus'have'been'developed'by'Hashin'&'Shtrikman'that'narrow'the'range'between'the'two'bounds.'
• Different'formulae'established'for'bulk,'K,'and'shear'moduli,'G.'
• Nota?on:'bulk'moduli'KA%and'K
B;%shear'moduli'G
A%
and'GB.'Klower = KA +
VB1
KB − KA
+3 1 −VB( )3KA + 4GA( )
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
91!
Hashin-Shtrikman!
Kupper = KB +1 − VB
1KA − KB
+3VB
3KB + 4GB( )
Gupper = GB +1− VB
1GA −GB
+6 KB + 2GB( )VB5GA 3KB + 4GB( )
Glower =GA +VB
1GB −GA
+6 KA + 2GA( ) 1 − VB( )5GA 3KA + 4GA( )
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
92!
Examples!• This'example'from'
Green’s'text'shows'how'the'bulk'and'shear'moduli'vary'with'volume'frac?on'for'two'phases'whose'moduli'differ'by'a'factor'of'10.'
• The'result'shows'that'the'H#S'bounds'are'generally'more'useful.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
93!
Anisotropy in Composites!
• The'same'methods'developed'in'lecture'4'for'describing'the'anisotropy'of'single'crystals'can'be'applied'to'composites.'
• Anisotropy'is'important'in'composites,'not'because'of'the'intrinsic'proper?es'of'the'components'but'because'of'the'arrangement'of'the'components.'
• As'an'example,'consider'(a)'a'uniaxial'composite'(e.g.'tennis'racket'handle)'and'(b)'a'flat'panel'cross#ply'composite'(e.g.'wing'surface).'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
94!
Fiber Symmetry!
x!
y!
z!
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
95!
Fiber Symmetry!
• We'will'use'the'same'matrix%nota1on'for'stress,'strain,'s?ffness'and'compliance'as'for'single'crystals.'
• The'compliance'matrix,'s,'has'5'independent'coefficients.'
€
s11 s12 s13 0 0 0s12 s11 s13 0 0 0s13 s13 s33 0 0 00 0 0 s44 0 00 0 0 0 s44 00 0 0 0 0 2 s11 − s12( )
#
$
% % % % % % %
&
'
( ( ( ( ( ( (
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
96!
Relationships!
• For'a'uniaxial'stress'along'the'z'(3)'direc?on,'''
• This'stress'causes'strain'in'the'transverse'plane:'e11 = e22 = s12σ33.''Therefore'we'can'calculate'Poisson’s'ra?o'as:'''
• Similarly,'stresses'applied'perpendicular'to'z'give'rise'to'different'moduli'and'Poisson’s'ra?os.'
€
E3 =σ 3ε3
=1s33
=σ zz
εzz
$
% &
'
( )
€
ν13 =e1e3
=s13s33
=exxezz
#
$ %
&
' (
€
E1 =σ1ε1
=1s11, ν 21 =
−s12s11
, ν 31 =−s13s11
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
97!
Relationships, contd.!
• Similarly'the'torsional'modulus'is'related'to'shears'involving'the'z'axis,'i.e.'yz or'xz'shears:'
' ' ' '''''s44 = s55 = 1/G%
'• Shear'in'the'x-y plane'is'related'to'the'other'compliance'coefficients:'
' ' ' '' s66 = 2(s11-s12) = 1/Gxy'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
98!
Plates: Orthotropic Symmetry!
• Again,'we'use'the'same'matrix%nota1on'for'stress,'strain,'s?ffness'and'compliance'as'for'single'crystals.'
• The'compliance'matrix,'s,'has'9%independent%coefficients.'
€
s11 s12 s13 0 0 0s12 s22 s23 0 0 0s13 s23 s33 0 0 00 0 0 s44 0 00 0 0 0 s55 00 0 0 0 0 s66
"
#
$ $ $ $ $ $ $
%
&
' ' ' ' ' ' '
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
99!
Plates: 0° and 90° plies!• If'the'composite'is'a'laminate'composite'with'fibers'laid'in'
at'0°'and'90°'in'equal'thicknesses'then'the'symmetry'is'higher'because'the'x'and'y'direc?ons'are'equivalent.'
• The'compliance'matrix,'s,'has'6%independent%coefficients.'
€
s11 s12 s13 0 0 0s12 s11 s13 0 0 0s13 s13 s33 0 0 00 0 0 s44 0 00 0 0 0 s44 00 0 0 0 0 s66
"
#
$ $ $ $ $ $ $
%
&
' ' ' ' ' ' '
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
100!
Anisotropy: Practical Applications!
• The'prac?cal'applica?ons'of'anisotropy'of'composites,'especially'fiber#reinforced'composites'are'numerous.'
• The's?ffness'of'fiber'composites'varies'tremendously'with'direc?on.''Torsional'rigidity'is'very'important'in'car'bodies,'boats,'aeroplanes'etc.'
• Even'in'monolithic'polymers'(e.g.'drawn'polyethylene)'there'exists'large'anisotropy'because'of'the'alignment'of'the'long#chain'molecules.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
101!
Closed Cell Wall Bending!• LHS:'response'to'
compressive'loading'in'the'x'direc?on;''RHS:'response'to'compressive'loading'in'the'y'direc?on.'
• Consider'loading'in'the'x'direc?on:'each'oblique'segment'experiences'bending'at'each'end.''The'load,'P,'is'''P%='σ1(h%+%l'sin'θ)b%#'see'fig.'4.8b' [Gibson: Cellular Materials]!
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
102!
Modulus(relative density)!
• Treat'each'segment'as'a'beam'of'length'l,'thickness't,'depth'b,'and'Young’s'Modulus'Es.'
• The'force,'C,'resolved'on'the'y'(ver?cal)'direc?on'must'be'zero'in'order'to'sa?sfy'equilibrium.'
• The'moment,'M,'on'the'segment:'' ' ' 'M = P l%sinθ / 2'
• The'deflec?on,'δ,'of'the'segment:'' ' 'δ'= P l3 sinθ / 12EcellI'
where'I%is'the'second'moment'of'iner?a:'' ' 'I = bt3 / 12%
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
103!
Cell Geometry (general hexagonal)!
θ!
l!
t!
h!
x1!
x2 or y!€
relativedensity=ρ *ρs
=t l( ) h l + 2( )
2 cosθ h l + sinθ( )
Regular honeycomb:"h = l, θ = 30°#ρ*/ρs = 2t/√3l!
b: depth of cell"(out-of-plane)!
h+lsinθ(
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
104!
Modulus(relative density): E1!
• We'need'the'component'of'the'deflec?on'that'is'parallel'to'the'X'axis,'δ sinθ. Thus'the'strain'is:'
€
ε1 =δ sinθl cosθ
=σ1 h + l sinθ( )bl 2 sin2θ
12EsI cosθ
E1 =σ1ε1
∴E1Es
=tl'
( ) *
+ , 3 cosθh l + sinθ( ) sin2θ
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
105!
Modulus(relative density): E2!
• The'modulus'in'the'perpendicular'direc?on'is'similar.'
€
ε2 =δ cosθh + l sinθ
=σ 2bl
4 cos4 θ12EsI h + l sinθ( )
E2 =σ 2ε2
∴E2Es
=tl'
( ) *
+ , 3 h l + sinθ( )
cos3θ
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
106!
Modulus(relative density): regular hex!
For'regular'hexagons,'the'reduced'moduli'in'the'two'direc?ons'are'the'same:''''
' 'E1 / Ecell = E2 / Ecell = 2.3 (t/l)3 %
We'already'established'that'the'rela?ve'density'for'a'regular'hexagon'is''2/√3 (t / l) ~ 2.3 (t / l),'so'we'can'write:''
' ''E1 / Ecell = E2 / Ecell = 2.3 (ρ/ρcell)3'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
107!
Wood Deformation!
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
108!
Moisture, CTE!
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
109!
Wood: anisotropy!
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
110!
Strength of Fiber Composites!• Just'as'for'modulus,'the'simplest'model'for'composite'
strength'is'the'Rule%of%Mixtures,'where'σm is'the'tensile'strength'of'the'matrix.''
' %σc = σmVm + σfVf%
%
• A'be/er'model'takes'account'of'the'actual'stress#strain'characteris?cs'of'the'component'phases.'
• In'MMCs,'for'example,'the'fiber'reinforcement'is'onen'quite'bri/le'compared'to'the'matrix'(e.g.'graphite'fibers'in'Mg,'SiC'fibers'in'Ti).'
• The'bri/leness'of'the'fibers'limits'the'strain'that'can'be'applied'to'a'composite.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
111!
Ductile matrix + brittle fibers!
• If'the'composite'is'deformed'beyond'the'breaking'strain'of'the'fibers,'then'the'broken'fibers'no'longer'support'load'and'their'strengthening'contribu?on'is'lost.''In'this'case,'the'strength'is'just'this:''' ' ' ''σc = σmVm #'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
112!
Ductile matrix + brittle fibers, contd.!• At'high'enough'volume'frac?ons,'however,'the'hardening'in'
the'matrix'is'exhausted'before'the'failure'strength'of'the'fibers'is'reached.''The'matrix'then'fails'at'a'(constant)'stress, " σ*
m = Em ε*f%,'''which'corresponds'to'the'failure'strain,'ε*f%,'of'the'fibers.'Under'these'condi?ons,'the'strength'of'the'composite'is'an'average'of'the'strength'of'the'fibers'and'the'strength'of'the'matrix'at'the'failure'strain'of'the'fibers.''The'strength'of'the'composite'then'increases'with'volume'frac?on'of'reinforcing'fibers'and'is'given'by:''
! ! !σc = σ*mVm + σfVf'
'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
113!
Ductile matrix + brittle fibers, contd.!• Thus'there'is'a'cross#over'between'the'two'types'of'behavior.'• A'minimum'volume'frac?on'of'fibers'is'required'in'order'for'the'
strength'of'the'fiber'composite'to'exceed'that'of'the'matrix.'
0%%%%%%%%%%%%%%%%%%%%%%%%%Vf%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%1%
σc!
σc = σ*mVm + σfVf!
σc = σmVm!
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
114!
Coefficient of Thermal Expansion!
• The'next'sec?on'relates'the'coefficient'of'thermal'expansion'(CTE)'to'the'microstructure'of'composites,'using'glass#ceramics'as'an'example.'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
115!
CTE versus modulus!
• The'thermal'expansion'coefficient'of'a'composite,'αcomp,'can'be'related'to'the'expansion'coefficients'and'bulk'moduli'of'the'cons?tuent'phases'by'the'following.''Obviously,'the'composite'bulk'modulus'must'be'determined'by'other'means.'
αcomposite = α A +KB α B −α A( ) KA − Kcomposite( )
Kcomposite KA − KB( )
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
116!
Quartz!• The'compressibility'for'
cristobalite'is'given'as'100.10#6'K#1'(alpha#cristobalite)'and'4.8.10#6'K#1'(beta#cristobalite).'
• The'CTE'is'given'as'25.2.10#6'for'alpha#cristobalite'and'11.2'.10#6'for'beta#cristobalite.'
• Compare'to'the'range'of'12#20.10#6'K#1'claimed'for'the'glass#ceramic.'
Cristobalite structure:"[Chiang et al.]!
α'
β'
!Intro!Composite"Applns.!Properties!Voigt, "Reuss,"Hill!
Anistrpy.!CTE!Cellular"Matls.!Wood!!
117!
Li-Zn glass ceramics!
• Note'the'varia?on'in'expansion'at'the'alpha#beta'transi?on'(displacive)'in'cristobalite.'