MECHANICS OF COMPOSITE STRUCTURES
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1 MECHANICS OF COMPOSITE STRUCTURES LÁSZLÓ P. KOLLÁR Budapest University of Technology and Economics GEORGE S. SPRINGER Stanford University
2 PUBLISHED BY THE PRESS SYNDICATE OF THE UNIVERSITY OF CAMBRIDGE The Pitt Building, Trumpington Street, Cambridge, United Kingdom CAMBRIDGE UNIVERSITY PRESS The Edinburgh Building, Cambridge CB2 2RU, UK 40 West 20th Street, New York, NY , USA 477 Williamstown Road, Port Melbourne, VIC 3207, Australia Ruiz de Alarcón 13, Madrid, Spain Dock House, The Waterfront, Cape Town 8001, South Africa C Cambridge University Press 2003 This book is in copyright. Subject to statutory exception and to the provisions of relevant collective licensing agreements, no reproduction of any part may take place without the written permission of Cambridge University Press. First published 2003 Printed in the United States of America Typefaces Times Ten 10/13.5 pt. and Helvetica Neue Condensed System LATEX2ε [TB] A catalog record for this book is available from the British Library. Library of Congress Cataloging in Publication Data Kollar, L. Peter (Laszlo Peter), 1926 Mechanics of composite structures / László P.Kollár, George S. Springer. p. cm. Includes bibliographical references and index. ISBN Composite materials Mechanical properties. I. Springer, George S. II. Title. TA418.9.C6 K dc ISBN hardback
3 Contents Preface List of Symbols page xi xiii 1 Introduction 1 2 Displacements, Strains, and Stresses Strain Displacement Relations Equilibrium Equations Stress-Strain Relationships Generally Anisotropic Material Monoclinic Material Orthotropic Material Transversely Isotropic Material Isotropic Material Plane Strain Condition Free End Generally Anisotropic Material Free End Monoclinic Material Free End Orthotropic, Transversely Isotropic, or Isotropic Material Built-In Ends Generally Anisotropic Material Built-In Ends Monoclinic Material Built-In Ends Orthotropic, Transversely Isotropic, or Isotropic Material Plane-Stress Condition Hygrothermal Strains and Stresses Plane-Strain Condition Plane-Stress Condition Boundary Conditions Continuity Conditions Stress and Strain Transformations Stress Transformation Strain Transformation Transformation of the Stiffness and Compliance Matrices 53 v
4 vi CONTENTS 2.10 Strain Energy The Ritz Method Summary Note on the Compliance and Stiffness Matrices 56 3 Laminated Composites Laminate Code Stiffness Matrices of Thin Laminates The Significance of the [A], [B], and [D] Stiffness Matrices Stiffness Matrices for Selected Laminates 74 4 Thin Plates Governing Equations Boundary Conditions Strain Energy Deflection of Rectangular Plates Pure Bending and In-Plane Loads Long Plates Simply Supported Plates Symmetrical Layup Plates with Built-In Edges Orthotropic and Symmetrical Layup Buckling of Rectangular Plates Simply Supported Plates Symmetrical Layup Plates with Built-In and Simply Supported Edges Orthotropic and Symmetrical Layup Plates with One Free Edge Orthotropic and Symmetrical Layup Plates with Rotationally Restrained Edges Orthotropic and Symmetrical Layup Long Plates Free Vibration of Rectangular Plates Long Plates Simply Supported Plates Symmetrical Layup Plates with Built-In and Simply Supported Edges Orthotropic and Symmetrical Layup Hygrothermal Effects Change in Thickness Due to Hygrothermal Effects Plates with a Circular or an Elliptical Hole Interlaminar Stresses Sandwich Plates Governing Equations Boundary Conditions Strain Energy Stiffness Matrices of Sandwich Plates Deflection of Rectangular Sandwich Plates Long Plates Simply Supported Sandwich Plates Orthotropic and Symmetrical Layup 182
5 CONTENTS vii 5.3 Buckling of Rectangular Sandwich Plates Long Plates Simply Supported Plates Orthotropic and Symmetrical Layup Face Wrinkling Free Vibration of Rectangular Sandwich Plates Long Plates Simply Supported Plates Orthotropic and Symmetrical Layup Beams Governing Equations Boundary Conditions Stiffness Matrix Compliance Matrix Replacement Stiffnesses Rectangular, Solid Beams Subjected to Axial Load and Bending Displacements Symmetrical Layup Displacements Unsymmetrical Layup Stresses and Strains Thin-Walled, Open-Section Orthotropic or Symmetrical Cross-Section Beams Subjected to Axial Load and Bending Displacements of T-Beams Displacements of L-Beams Displacements of Arbitrary Cross-Section Beams Stresses and Strains Thin-Walled, Closed-Section Orthotropic Beams Subjected to Axial Load and Bending Torsion of Thin-Walled Beams Thin Rectangular Cross Section Open-Section Orthotropic Beams Closed-Section Orthotropic Beams Single Cell Closed-Section Orthotropic Beams Multicell Restrained Warping Open-Section Orthotropic Beams Restrained Warping Closed-Section Orthotropic Beams Thin-Walled Beams with Arbitrary Layup Subjected to Axial Load, Bending, and Torsion Displacements of Open- and Closed-Section Beams Stresses and Strains in Open- and Closed-Section Beams Centroid Restrained Warping Transversely Loaded Thin-Walled Beams Beams with Orthotropic Layup or with Symmetrical Cross Section Beams with Arbitrary Layup Shear Center Stiffened Thin-Walled Beams 288
6 viii CONTENTS 6.9 Buckling of Beams Beams Subjected to Axial Load (Flexural Torsional Buckling) Lateral Torsional Buckling of Orthotropic Beams with Symmetrical Cross Section Local Buckling Free Vibration of Beams (Flexural Torsional Vibration) Doubly Symmetrical Cross Sections Beams with Symmetrical Cross Sections Beams with Unsymmetrical Cross Sections Summary Beams with Shear Deformation Governing Equations Strain Displacement Relationships Force Strain Relationships Equilibrium Equations Summary of Equations Boundary Conditions Stiffnesses and Compliances of Beams Shear Stiffnesses and Compliances of Thin-Walled Open-Section Beams Shear Stiffnesses and Compliances of Thin-Walled Closed-Section Beams Stiffnesses of Sandwich Beams Transversely Loaded Beams Buckling of Beams Axially Loaded Beams with Doubly Symmetrical Cross Sections (Flexural and Torsional Buckling) Axially Loaded Beams with Symmetrical or Unsymmetrical Cross Sections (Flexural Torsional Buckling) Lateral Torsional Buckling of Beams with Symmetrical Cross Section Summary Free Vibration of Beams Beams with Doubly Symmetrical Cross Sections Beams with Symmetrical or Unsymmetrical Cross Sections Summary Effect of Shear Deformation Shells Shells of Revolution with Axisymmetrical Loading Cylindrical Shells Membrane Theory Built-In Ends Temperature Built-In Ends Springback Springback of Cylindrical Shells Doubly Curved Shells 384
7 CONTENTS ix 8.4 Buckling of Shells Buckling of Cylinders Finite Element Analysis Three-Dimensional Element Plate Element Beam Element Sublaminate Step 1. Elements of [J] due to In-Plane Stresses Step 2. Elements of [J] due to Out-of-Plane Normal Stresses Step 3. Elements of [ J] due to Out-of-Plane Shear Stresses Step 4. The Stiffness Matrix Failure Criteria Quadratic Failure Criterion Orthotropic Material Transversely Isotropic Material Isotropic Material Plane-Strain and Plane-Stress Conditions Proportional Loading Stress Ratio Maximum Stress Failure Criterion Maximum Strain Failure Criterion Plate with a Hole or a Notch Plate with a Circular Hole Plate with a Notch Characteristic Length Micromechanics Rule of Mixtures Longitudinal Young Modulus E Transverse Young Modulus E Longitudinal Shear Modulus G Transverse Shear Modulus G Longitudinal Poisson Ratio ν Transverse Poisson Ratio ν Thermal Expansion Coefficients Moisture Expansion Coefficients Thermal Conductivity Moisture Diffusivity Specific Heat Modified Rule of Mixtures Note on the Micromechanics Models 449 Appendix A. Cross-Sectional Properties of Thin-Walled Composite Beams 453 Appendix B. Buckling Loads and Natural Frequencies of Orthotropic Beams with Shear Deformation 461 Appendix C. Typical Material Properties 464 Index 469
8 List of Symbols We have used, wherever possible, notation standard in elasticity, structural analysis, and composite materials. We tried to avoid duplication, although there is some repetition of those symbols that are used only locally. In the following list we have not included those symbols that pertain only to the local discussion. Below, we give a verbal description of each symbol and, when appropriate, the number of the equation in which the symbol is first used. Latin letters A area A iso tensile stiffness of an isotropic laminate (Eq. 3.42) [A], A ij tensile stiffness of a laminate (Eqs. 3.18, 3.19) [a], a ij inverse of the [A] matrix for symmetric laminates (Eq. 3.29) [B], B ij stiffness of a laminate (Eqs. 3.18, 3.19) [C], C ij 3D stiffness matrix in the x 1, x 2, x 3 coordinate system (Eq. 2.22) [C], C ij 3D stiffness matrix in the x, y, z coordinate system (Eq. 2.19) c moisture concentration (Eq ); core thickness (Fig. 5.2) [D], D ij bending stiffness of a laminate (Eqs. 3.18, 3.19) [D], Dij reduced bending stiffness of a laminate (Eq. 4.1) D iso bending stiffness of an isotropic laminate (Eq. 3.42) D, D, D parameters (Table 6.2, page 222, Eq ) [d], d ij inverse of the [D] matrix for symmetrical laminates (Eq. 3.30) d, d t, d b distances for sandwich plates (Fig. 5.2) E 1, E 2, E 3 Young s moduli in the x 1, x 2, x 3 coordinate system (Table 2.5) [E] stiffness matrix in the FE calculation (Eq. 9.4) ÊA tensile stiffness of a beam (Eq. 6.8) ÊI bending stiffness of a beam (Eq. 6.8) ÊI ω warping stiffness of a beam (Eq ) F i, F ij strength parameters in the quadratic failure criterion (Eq. 10.2) xiii
9 xiv LIST OF SYMBOLS f ij constants in the quadratic failure criterion (Eq ) f, f ij frequency (Eq ) f x, f y, f z, body forces per unit volume (Eq. 2.13) G 23, G 13, G 12 shear moduli in the x 1, x 2, x 3 coordinate system (Table 2.5) ĜI t torsional stiffness of a beam (Eq. 6.8) h plate thickness h b, h t distances of the bottom and top surfaces of a plate from the reference plane (Eq. 3.9) i ω polar radius of gyration (Eq ) [J] inverse of the material stiffness matrix [E] (Eq. 9.16) K number of layers in a laminate; number of wall segments; stiffness parameter of a plate (Eq ) k rotational spring constant (Eq ) k equivalent length factor (Eq ) L x, L y dimensions of a plate L length; number of cells in a multicell beam (Eq ) L i, Li f load and failure load (Eq ) l x, lx o half buckling length (Eq ), half buckling length corresponding to the lowest buckling load of a long plate (Eq ) M x, M y, M xy bending and twist moments per unit length acting on a laminate (Eq. 3.9) Mx ht, Mht y, Mht xy hygrothermal moments per unit length (Eq ) M y, M z bending moments acting on a beam (Fig. 6.2) M ω bimoment acting on a beam (Eq ) N x, N y, N xy in-plane forces per unit length acting on a laminate (Eq. 3.9) N x0, N y0, N xy0 in-plane compressive forces per unit length (Eq ) Nx ht, Nht y, Nht xy hygrothermal forces per unit length (Eq ) N x, cr buckling load of a uniaxially loaded plate (Eq ) N axial force acting on a beam (Fig. 6.2) N cr, N B cr buckling load and buckling load due to bending deformation (Eq ) N cry, N crz buckling load in the x z and x y planes, respectively (Eqs , 7.110) N crψ buckling load under torsional buckling (Eqs , 7.110) [P], [P] stiffness matrix of a beam (Eqs. 6.2, 6.250). Without bar refers to the centroid; with bar to an arbitrarily chosen coordinate system p transverse load per unit area; distance between the origin and the tangent of the wall of a beam (Eq ) p x, p y, p z axial and transverse loads (per unit length) acting on a beam (Fig. 6.1); surface forces per unit area (Eq ) [Q], Q ij 2D plane-stress stiffness matrix in the x 1, x 2 coordinate system (Eq )
10 LIST OF SYMBOLS xv [Q], Q ij 2D plane-stress stiffness matrix in the x, y coordinate system (Eq ) Q cr buckling load resulting in lateral buckling (Eq ) q shear flow (Eq ). R stiffness parameter (Eq. 3.46) R stress ratio (Eq ) R x, R y, R xy radii of curvatures of a shell (Eq. 8.1) [R], R ij compliance matrix under plane-strain condition in the x 1, x 2 coordinate system (Eq. 2.79) [R], R ij compliance matrix under plane-strain condition in the x, y coordinate system (Eq. 2.65) [S], S ij 3D compliance matrix in the x 1, x 2, x 3 coordinate system (Eq. 2.23) [S], S ij 3D compliance matrix in the x, y, z coordinate system (Eq. 2.21) Ŝ ij shear stiffness of a beam, i, j = z, y,ω(eqs. 7.13, 7.36) S ij shear stiffness of a plate, i, j = 1, 2 (Eq. 5.15) ŝ ij shear compliance of a beam, i, j = z, y,ω(eq. 7.38) s + 1, s+ 2, s+ 3 tensile strengths (Eq ) s 1, s 2, s 3 compression strengths (Eq ) s 23, s 13, s 12 shear strengths (Eq ) T torque acting on a beam (Fig. 6.2) T ω restrained warping-induced torque (Eq ) T sv Saint-Venant torque (Eq ) [T σ ] 2D stress transformation matrix (Eq ) [ ˆT σ ] 3D stress transformation matrix (Eq ) [T ɛ ] 2D strain transformation matrix (Eq ) [ ˆT ɛ ] 3D strain transformation matrix (Eq ) t torque load acting on a beam (Fig. 6.1) t t, t b thicknesses of the top and bottom facesheets (Eq. 5.26) U strain energy (Eq ) U displacement in the x direction; varies with the x and y coordinates only (Eq. 2.50) u displacement in the x direction u o displacement of the reference surface in the x direction u 1, u 2, u 3 displacements in the x 1, x 2, and x 3 direction V displacement in the y direction; varies with the x and y coordinates only (Eq. 2.51) V f, V m, V v volume of fibers, matrix, and void V x, V y out-of-plane shear forces per unit length (Eq. 3.10) V y, V z transverse shear forces acting on a beam (Fig. 6.2) v displacement in the y direction v o displacement of the reference surface in the y direction v f,v m,v v volume fraction of fibers, matrix, and void
11 xvi LIST OF SYMBOLS W displacement in the z direction; varies with the x and y coordinates only (Eq. 2.52) [W], [W] compliance matrix of a beam (Eq. 6.17). No bar refers to the centroid; bar to an arbitrarily chosen coordinate system w deflection in the z direction w maximum deflection in the z direction (Eq. 4.29) w o deflection of the reference surface in the z direction w B,w S deflections due to bending and shear deformations (Eq. 7.85) y c, z c coordinates of the centroid of a beam (Eqs. 6.54, 6.73) y sc, z sc coordinates of the shear center of a beam (Eq ) z k, z k 1 coordinates of the top and bottom surfaces of the kth ply in a laminate (Eq. 3.20) Greek letters ɛ o,ht x α parameter describing shear deformation (Eq ) α i parameter describing shear deformation, i = w, ψ, N, ω (Eq ) [α],α ij compliance matrix of a laminate (Eq. 3.23) α, β parameters describing buckled shape of a shell (Eq. 8.78) α ij compliances for closed-section beams (Eq ) α i, α ij thermal expansion coefficients (Eqs , 2.158) β, λ parameters in the displacements of a cylinder (Eq. 8.30) [β],β ij compliance matrix of a laminate (Eq. 3.23) β ij compliance of symmetrical cross-section beams (Table 6.2) β ij compliance of closed-section beams (Eq ) β i, β ij moisture expansion coefficients in the x, y, z directions (Eqs , 2.159) β 1 property of the cross section (Eq ) γ y,γ z shear strain in a beam in the x y and x z planes (Eq. 7.2) γ yz, γ xz, γ xy engineering shear strain in the x, y, z coordinate system (Eq. 2.9) γ 23, γ 13, γ 12 engineering shear strain in the x 1, x 2, x 3 coordinate system h change in thickness (Eq ) T temperature change (Eq ) [δ], δ ij compliance matrix of a laminate (Eq. 3.23) δ ij compliance of closed-section beams (Eq ) ɛ x,... average strains in a sublaminate (Eq. 9.14) ɛ x, ɛ y, ɛ z engineering normal strains in the x, y, z coordinate system ɛ 1, ɛ 2, ɛ 3 engineering normal strains in the x 1, x 2, x 3 coordinate system ɛx o,ɛo y,γo xy strains of the reference surface,ɛy o,ht,γxy o,ht hygrothermal strains in a laminate (Eq ) ζ parameter of restraint (Eq ) polar moment of mass (Eq )
12 LIST OF SYMBOLS xvii k ply orientation ϑ rate of twist (Eq. 6.1) ϑ B,ϑ S rate of twist due to bending and shear deformation (Eq. 7.5) κ x,κ y,κ xy curvatures of the reference surface (Eq. 3.8) κx ht,κht y,κht xy hygrothermal curvatures of a laminate (Eq ) λ, λ cr,λ ij load parameter (Eq ); buckling load parameter (Eq ); eigenvalue (Eq ) µ Bi,µ Gi,µ Si parameters in the calculation of natural frequencies (Eqs , 6.400, 7.203) ν ij Poisson s ratio ξ,η,ζ coordinates attached to the wall of a beam (Fig. 6.13) ξ,ξ parameters in the expressions of the buckling loads of plates with rotationally restrained edges (Eq ) π p potential energy (Eq ) ρ x,ρ y,ρ z radius of curvature in the y z, x z, and x y planes (Eq. 2.45) ρ 1,ρ 2,ρ 3 radius of curvature in the x 2 x 3, x 1 x 3, and x 1 x 2 planes (Eq. 2.53) ρ comp,ρ f,ρ m densities of composite, fiber, and matrix ρ mass per unit area or per unit length σ 1, σ 2, σ 3 normal stresses in the x 1, x 2, x 3 coordinate system σ x, σ y, σ z normal stresses in the x, y, z coordinate system σ average stress τ 23, τ 13, τ 12 shear stresses in the x 1, x 2, x 3 coordinate system τ yz, τ xz, τ yx shear stresses in the x, y, z coordinate system χ xz,χ yz rotation of the normal of a plate in the x z and x y planes (Eqs. 3.2 and 5.1) χ y,χ z rotation of the cross section of a beam in the x y and x z planes (Eq. 7.2) ψ angle of rotation of the cross section about the beam axis (twist) (Fig. 6.3) bending stiffness of an unsymmetrical long plate (Eq. 4.52) potential energy of the external loads (Eq ) ω circular frequency (Eq ) ω B,ω S circular frequency of a beam due to bending and shear deformation (Eq ) ω y, ω z circular frequency of a freely vibrating beam in the x z and x y planes, respectively (Eq ) ω ψ circular frequency of a freely vibrating beam under torsional vibration (Eq ) ϱ, ϱ, ϱ, ϱ distances between the new and the old reference surfaces (Eqs. 3.47, 6.105, 6.107, A.3)
13 CHAPTER TWO Displacements, Strains, and Stresses We consider composite materials consisting of continuous or discontinuous fibers embedded in a matrix. Such a composite is heterogeneous, and the properties vary from point to point. On a scale that is large with respect to the fiber diameter, the fiber and matrix properties may be averaged, and the material may be treated as homogeneous. This assumption, commonly employed in macromechanical analyses of composites, is adopted here. Hence, the material is considered to be quasi-homogeneous, which implies that the properties are taken to be the same at every point. These properties are not the same as the properties of either the fiber or the matrix but are a combination of the properties of the constituents. In this chapter, equations are presented for calculating the displacements, stresses, and strains when the structure undergoes only small deformations and the material behaves in a linearly elastic manner. Continuous fiber-reinforced composite materials (and structures made of such materials) often have easily identifiable preferred directions associated with fiber orientations or symmetry planes. It is therefore convenient to employ two coordinate systems: a local coordinate system aligned, at a point, either with the fibers or with axes of symmetry, and a global coordinate system attached to a fixed reference point (Fig. 2.1). In this book the local and global Cartesian coordinate systems are designated respectively by x 1, x 2, x 3 and the x, y, z axes. In the x, y, z directions the displacements at a point Aare denoted by u, v, w, and in the x 1, x 2, x 3 directions by u 1, u 2, u 3 (Fig. 2.2). In the x, y, z coordinate system the normal stresses are denoted by σ x, σ y, and σ z and the shear stresses by τ yz, τ xz, and τ xy (Fig. 2.3). The corresponding normal and shear strains are ɛ x, ɛ y, ɛ z and γ yz, γ xz, γ xy, respectively. In the x 1, x 2, x 3 coordinate system the normal stresses are denoted by σ 1, σ 2, and σ 3 and the shear stresses by τ 23, τ 13, and τ 12 (Fig. 2.3). The corresponding normal and shear strains are ɛ 1, ɛ 2, ɛ 3, and γ 23, γ 13, γ 12, respectively. The symbol γ represents engineering shear strain that is twice the tensorial shear strain, γ ij = 2ɛ ij (i, j = x, y, z or i, j = 1, 2, 3). 3
14 4 DISPLACEMENTS, STRAINS, AND STRESSES zx, 3 x 2 y x x 1 Figure 2.1: The global x, y, z and local x 1, x 2, x 3 coordinate systems. A stress is taken to be positive when it acts on a positive face in the positive direction. According to this definition, all the stresses shown in Figure 2.3 are positive. The preceding stress and strain notations, referred to as engineering notations, are used throughout this book. Other notations, most notably tensorial and contracted notations, can frequently be found in the literature. The stresses and strains in different notations are summarized in Tables 2.1 and Strain Displacement Relations We consider a x long segment that undergoes a change in length, the new length being denoted by x. From Figure 2.4 it is seen that ( u + x = x + u + u ) x x, (2.1) where u and u + u x are the displacements of points A and B, respectively, in x the x direction. Accordingly, the normal strain in the x direction is ɛ x = x x = u x x. (2.2) Similarly, in the y and z directions the normal strains are ɛ y = v (2.3) y ɛ z = w z, (2.4) where v and w are the displacements in the y and z directions, respectively. z A' x 3 A' A u w u 1 A u3 v y u 2 x 1 x Figure 2.2: The x, y, z and x 1, x 2, x 3 coordinate systems and the corresponding displacements. x 2
15 2.1 STRAIN DISPLACEMENT RELATIONS 5 z σ z x 3 τ zx τ zy τ yz σ 3 x σ x τ xz τ xy τ yx σ y y x 1 σ 1 τ 13 τ 31 τ 32 τ 12 τ 23 τ 21 σ 2 x 2 Figure 2.3: The stresses in the global x, y, z and the local x 1, x 2, x 3 coordinate systems. For angular (shear) deformation the tensorial shear strain is the average change in the angle between two mutually perpendicular lines (Fig. 2.5) ɛ xy = α + β. (2.5) 2 For small deformations we have ( v + v x α tan α = x) v = v x x. (2.6) Similarly β = u/ y, and the xy component of the tensorial shear strain is ɛ xy = 1 2 ( u y + v ). (2.7) x In a similar manner we obtain the following expressions for the ɛ yz and ɛ xz components of the tensorial shear strains: ɛ yz = 1 2 ( v z + w ) y ɛ xz = 1 2 ( u z + w ). (2.8) x Table 2.1. Stress notations Normal stress Shear stress x, y, z coordinate system Tensorial stress σ xx σ yy σ zz σ yz σ xz σ xy Engineering stress σ x σ y σ z τ yz τ xz τ xy Contracted notation σ x σ y σ z σ q σ r σ s x 1, x 2, x 3 coordinate system Tensorial stress σ 11 σ 22 σ 33 σ 23 σ 13 σ 12 Engineering stress σ 1 σ 2 σ 3 τ 23 τ 13 τ 12 Contracted notation σ 1 σ 2 σ 3 σ 4 σ 5 σ 6
16 6 DISPLACEMENTS, STRAINS, AND STRESSES Table 2.2. Strain notations (the engineering and contracted notation shear strains are twice the tensorial shear strain) Normal strain Shear strain x, y, z coordinate system Tensorial strain ɛ xx ɛ yy ɛ zz ɛ yz ɛ xz ɛ xy Engineering strain ɛ x ɛ y ɛ z γ yz γ xz γ xy Contracted notation ɛ x ɛ y ɛ z ɛ q ɛ r ɛ s x 1, x 2, x 3 coordinate system Tensorial strain ɛ 11 ɛ 22 ɛ 33 ɛ 23 ɛ 13 ɛ 12 Engineering strain ɛ 1 ɛ 2 ɛ 3 γ 23 γ 13 γ 12 Contracted notation ɛ 1 ɛ 2 ɛ 3 ɛ 4 ɛ 5 ɛ 6 The engineering shear strains are twice the tensorial shear strains: γ yz = 2ɛ yz = v z + w (2.9) y γ xz = 2ɛ xz = u z + w (2.10) x γ xy = 2ɛ xy = u y + v x. (2.11) In the x 1, x 2, x 3 coordinate system the strain displacement relationships are also given by Eqs. (2.2) (2.4) and (2.9) (2.11) with x, y, z replaced by x 1, x 2, x 3, the subscripts x, y, z by 1, 2, 3, and u, v, w by u 1, u 2, u Equilibrium Equations The equilibrium equations at a point O are obtained by considering force and moment balances on a small x y z cubic element located at point O. (The point O is at the center of the element, Fig. 2.6.) We relate the stresses at one face to those at the opposite face by the Taylor series. By using only the first term of the Taylor series, force balance in the x direction gives σ x z y τ zx x y τ yx x z + ( σ x + σ x ) x x z y ( + τ zx + τ ) ( zx z z x y + τ yx + τ ) yx y y x z + f x x y z= 0, (2.12) y x A x u B A B u u + x x Figure 2.4: Displacement of the AB line segment. x
17 2.2 EQUILIBRIUM EQUATIONS 7 y A C x B v β A C α B v v + x x Figure 2.5: Displacement of the ABC segment. x where f x is the body force per unit volume in the x direction. After simplification, this equation becomes σ x x + τ yx y + τ zx z + f x = 0. (2.13) By similar arguments, the equilibrium equations in the y and z directions are τ xy x + σ y y + τ zy z + f y = 0, (2.14) τ xz x + τ yz y + σ z z + f z = 0, (2.15) where f y and f z are the body forces per unit volume in the y and z directions. A moment balance about an axis parallel to x and passing through the center (point O) gives (Fig. 2.7) τ yz x z y 2 τ zy x y z ( 2 + τ yz + τ ) yz y y x z y ( 2 τ zy + τ ) zy z z x y z = 0. (2.16) 2 z z τ xy σ x σz σz + z z τzy τzy + z z τzx τzx + z z τ σ τ xz x xy σ y τ yx O τ xz τ yz τ zx τ zy σ z + τxz x x + σx x x + τxy x x x y Figure 2.6: Stresses on the x y z cubic element. x τ yz τ yz + y y σy y σy + y y τ yx τ yx + y y
18 8 DISPLACEMENTS, STRAINS, AND STRESSES z τ zy τzy + z z z τ yz O τ zy x τ yz y + τ yz y y x y Figure 2.7: Stresses on the x y z cubic element that appear in the moment balance about an axis parallel to x and passing through the center (point O). By omitting higher order terms, which vanish in the limit x 0, y 0, z 0, this equation becomes τ yz = τ zy. (2.17) Similarly, we obtain the following equalities: τ xz = τ zx τ xy = τ yx. (2.18) By virtue of Eqs. (2.17) and (2.18), the three equilibrium equations (Eqs ) contain six unknowns, namely, the three normal stresses (σ x, σ y, σ z ) and the three shear stresses (τ yz, τ xz, τ xy ). In the x 1, x 2, x 3 coordinate system the equilibrium equations are also given by Eqs. (2.13) (2.15) with x, y, z replaced by x 1, x 2, x 3 and the subscripts x, y, z by 1, 2, Stress Strain Relationships In a composite material the fibers may be oriented in an arbitrary manner. Depending on the arrangements of the fibers, the material may behave differently in different directions. According to their behavior, composites may be characterized as generally anisotropic, monoclinic, orthotropic, transversely isotropic, or isotropic. In the following, we present the stress strain relationships for these types of materials under linearly elastic conditions Generally Anisotropic Material When there are no symmetry planes with respect to the alignment of the fibers the material is referred to as generally anisotropic. A fiber-reinforced composite material is, for example, generally anisotropic when the fibers are aligned in three nonorthogonal directions (Fig. 2.8).
19 2.3 STRESS STRAIN RELATIONSHIPS 9 Figure 2.8: Example of a generally anisotropic material. For a generally anisotropic linearly elastic material, in the x, y, z global coordinate system, the stress strain relationships are σ x = C 11 ɛ x + C 12 ɛ y + C 13 ɛ z + C 14 γ yz + C 15 γ xz + C 16 γ xy σ y = C 21 ɛ x + C 22 ɛ y + C 23 ɛ z + C 24 γ yz + C 25 γ xz + C 26 γ xy σ z = C 31 ɛ x + C 32 ɛ y + C 33 ɛ z + C 34 γ yz + C 35 γ xz + C 36 γ xy τ yz = C 41 ɛ x + C 42 ɛ y + C 43 ɛ z + C 44 γ yz + C 45 γ xz + C 46 γ xy τ xz = C 51 ɛ x + C 52 ɛ y + C 53 ɛ z + C 54 γ yz + C 55 γ xz + C 56 γ xy τ xy = C 61 ɛ x + C 62 ɛ y + C 63 ɛ z + C 64 γ yz + C 65 γ xz + C 66 γ xy. (2.19) Equation (2.19) may be written in the form σ x σ y σ z τ yz τ xz τ xy C 11 C 12 C 13 C 14 C 15 C 16 C 21 C 22 C 23 C 24 C 25 C 26 C 31 C 32 C 33 C 34 C 35 C 36 = C 41 C 42 C 43 C 44 C 45 C 46 C 51 C 52 C 53 C 54 C 55 C 56 C 61 C 62 C 63 C 64 C 65 C 66 ɛ x ɛ y ɛ z γ yz γ xz γ xy, (2.20) where C ij are the elements of the stiffness matrix [C ]inthex, y, z coordinate system. Inversion of Eq. (2.20) results in the following strain stress relationships: ɛ x S 11 S 12 S 13 S 14 S 15 S 16 ɛ y S 21 S 22 S 23 S 24 S 25 S 26 ɛ z S 31 S 32 S 33 S 34 S 35 S 36 = γ yz S 41 S 42 S 43 S 44 S 45 S 46 γ xz S 51 S 52 S 53 S 54 S 55 S 56 γ xy S 61 S 62 S 63 S 64 S 65 S 66 σ x σ y σ z τ yz τ xz τ xy, (2.21) where S ij are the elements of the compliance matrix [S ]inthex, y, z coordinate system and are defined in Table 2.3 (page 10). In this table tests are illustrated that, in principle, could provide means of determining the different compliance matrix elements.
20 10 DISPLACEMENTS, STRAINS, AND STRESSES Table 2.3. The elements of the compliance matrix [S] in the x, y, z coordinate system. The elements S ij (without bar) in the x 1, x 2, x 3 coordinate system are obtained by replacing x, y, z by 1, 2, 3 on the right-hand sides of the expressions. Test Elements of the compliance matrix σ x σ x S 11 = ɛ x /σ x S 21 = ɛ y /σ x S 31 = ɛ z /σ x S 41 = γ yz /σ x S 51 = γ xz /σ x S 61 = γ xy /σ x σ σ S 12 = ɛ x /σ y S 42 = γ yz /σ y y y S 22 = ɛ y /σ y S 52 = γ xz /σ y σ z σ z S 32 = ɛ z /σ y S 13 = ɛ x /σ z S 23 = ɛ y /σ z S 33 = ɛ z /σ z S 62 = γ xy /σ y S 43 = γ yz /σ z S 53 = γ xz /σ z S 63 = γ xy /σ z τ yz S 14 = ɛ x /τ yz S 44 = γ yz /τ yz S 24 = ɛ y /τ yz S 34 = ɛ z /τ yx S 54 = γ xz /τ yz S 64 = γ xy /τ yz τ xz S15 = ɛ x /τ xz S 45 = γ yz /τ xz S 25 = ɛ y /τ xz S 35 = ɛ z /τ xz S 55 = γ xz /τ xz S 65 = γ xy /τ xz τ xy S 16 = ɛ x /τ xy S 46 = γ yz /τ xy S 26 = ɛ y /τ xy S 36 = ɛ z /τ xy S 56 = γ xz /τ xy S 66 = γ xy /τ xy In the x 1, x 2, x 3 coordinate system the stress strain relationships are σ 1 C 11 C 12 C 13 C 14 C 15 C 16 ɛ 1 σ 2 C 21 C 22 C 23 C 24 C 25 C 26 ɛ 2 σ 3 C 31 C 32 C 33 C 34 C 35 C 36 ɛ 3 =, (2.22) τ 23 C 41 C 42 C 43 C 44 C 45 C 46 γ 23 τ 13 C 51 C 52 C 53 C 54 C 55 C 56 γ 13 τ 12 C 61 C 62 C 63 C 64 C 65 C 66 γ 12 where C ij are the elements of the stiffness matrix [C] inthex 1, x 2, x 3 coordinate system. By inverting Eq. (2.22) we obtain the following strain stress relationships: ɛ 1 S 11 S 12 S 13 S 14 S 15 S 16 σ 1 ɛ 2 S 21 S 22 S 23 S 24 S 25 S 26 σ 2 ɛ 3 S 31 S 32 S 33 S 34 S 35 S 36 σ 3 =, (2.23) γ 23 S 41 S 42 S 43 S 44 S 45 S 46 τ 23 γ 13 S 51 S 52 S 53 S 54 S 55 S 56 τ 13 γ 12 S 61 S 62 S 63 S 64 S 65 S 66 τ 12 where S ij are the elements of the compliance matrix [S]inthex 1, x 2, x 3 coordinate system.
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