THEORY OF PLATES AND SHELLS S.TIMOSHENKO Professor Emeritus of Engineering Mechanics Stanford Universily S.WOINOWSKY-KRIEGER Professor of Engineering Mechanics Laval Universily SECOND EDITION MONOGRAPHS MCGRAW-HILL BOOK COMPANY Auckland Bogota Guatemala Hamburg Lisbon London Madrid Mexico New Delhi Panama Paris San Juan Sao Paulo Singapore Sydney Tokyo
THEORY OF PLATES AND SHELLS S. TIMOSHENKO Professor Emeritus of Engineering Mechanics Stanford University S. WOINOWSKY-KRIEGER Professor of Engineering Mechanics Laval University SECOND EDITION MCGRAW-HILL BOOK COMPANY Auckland Bogota Guatemala Hamburg Lisbon London Madrid Mexico New Delhi Panama Paris San Juan SSo Paulo Singapore Sydney Tokyo
PREFACE Since the publication of the first edition of this book,the application of the theory of plates and shells in practice has widened considerably, and some new methods have been introduced into the theory.To take these facts into consideration,we have had to make many changes and additions.The principal additions are (1)an article on deflection of plates due to transverse shear,(2)an article on stress concentrations around a circular hole in a bent plate,(3)a chapter on bending of plates resting on an elastic foundation,(4)a chapter on bending of anisotropic plates,and (5)a chapter reviewing certain special and approximate methods used in plate analysis.We have also expanded the chapter on large deflections of plates,adding several new cases of plates of variable thickness and some numerical tables facilitating plate analysis. In the part of the book dealing with the theory of shells,we limited ourselves to the addition of the stress-function method in the membrane theory of shells and some minor additions in the flexural theory of shells. The theory of shells has been developing rapidly in recent years,and several new books have appeared in this field.Since it was not feasible for us to discuss these new developments in detail,we have merely referred to the new bibliography,in which persons specially interested in this field will find the necessary information. S.Timoshenko S.Woinowsky-Krieger
PREFACE Since the publication of the first edition of this book, the application of the theory of plates and shells in practice has widened considerably, and some new methods have been introduced into the theory. To take these facts into consideration, we have had to make many changes and additions. The principal additions are (1) an article on deflection of plates due to transverse shear, (2) an article on stress concentrations around a circular hole in a bent plate, (3) a chapter on bending of plates resting on an elastic foundation, (4) a chapter on bending of anisotropic plates, and (5) a chapter reviewing certain special and approximate methods used in plate analysis. We have also expanded the chapter on large deflections of plates, adding several new cases of plates of variable thickness and some numerical tables facilitating plate analysis. In the part of the book dealing with the theory of shells, we limited ourselves to the addition of the stress-function method in the membrane theory of shells and some minor additions in the flexural theory of shells. The theory of shells has been developing rapidly in recent years, and several new books have appeared in this field. Since it was not feasible for us to discuss these new developments in detail, we have merely referred to the new bibliography, in which persons specially interested in this field will find the necessary information. S. Timoshenko S. Woinowsky-Krieger
NOTATION x,y,a Rectangular coordinates r,Polar coordinates ra,ry Radii of curvature of the middle surface of a plate in xz and yz planes, respectively h Thickness of a plate or a shell g Intensity of a continuously distributed load p Pressure P Single load Weight per unit volume ,Normal components of stress parallel to y,and z axes Normal component of stress parallel to n direction Ur Radial stress in polar coordinates ,o Tangential stress in polar coordinates Shearing stress Tav:Tan Tuz Shearing stress components in rectangular coordinates u,v,w Components of displacements eUnit elongation Unit elongations in z,y,and z directions Er Radial unit elongation in polar coordinates a,se Tangential unit elongation in polar coordinates Unit elongations of a shell in meridional direction and in the direetion of parallel circle,respectively Y,Y,Yy Shearing strain components in rectangular coordinates r Shearing strain in polar coordinates E Modulus of elasticity in tension and compression G Modulus of elasticity in shear y Poisson's ratio V Strain energy D Flexural rigidity of a plate.or shell M,M Bending moments per unit length of sections of a plate perpendicular to x and y axes,respectively M Twisting moment per unit length of section of a plate perpendicular to x axis Ma,M Bending and twisting moments per unit length of a section of a plate perpendicular to n direction Q,Q Shearing forces parallel to z axis per unit length of sections of a plate perpendicular to x and y axes,respectively Q Shearing force parallel to a axis per unit length of section of a plate perpendicular to n direction Na,N Normal forces per unit length of sections of a plate perpendicular to x and y directions,respectively xiii
NOTATION x, y, z Rectangular coordinates r, 0 Polar coordinates rx, ry Radii of curvature of the middle surface of a plate in xz and yz planes, respectively h Thickness of a plate or a shell q Intensity of a continuously distributed load p Pressure P Single load 7 Weight per unit volume (Tx, <rV) (Tt Normal components of stress parallel to x, y, and z axes (Tn Normal component of stress parallel to n direction o> Radial stress in polar coordinates at, (re Tangential stress in polar coordinates r Shearing stress Txy, Txz, Tyz Shearing stress components in rectangular coordinates u, v, w Components of displacements e Unit elongation «*, «•/, fz Unit elongations in x, y, and z directions er Radial unit elongation in polar coordinates et , eo Tangential unit elongation in polar coordinates ttp, eo Unit elongations of a shell in meridional direction and in the direction of parallel circle, respectively yxy, Vxz, jyz Shearing strain components in rectangular coordinates 7r0 Shearing strain in polar coordinates E Modulus of elasticity in tension and compression G Modulus of elasticity in shear v Poisson's ratio V Strain energy D Flexural rigidity of a plate or shell Mx, My Bending moments per unit length of sections of a plate perpendicular to x and y axes, respectively Mxy Twisting moment per unit length of section of a plate perpendicular to x axis Mn, Mnt Bending and twisting moments per unit length of a section of a plate perpendicular to n direction Qx, Qy Shearing forces parallel to z axis per unit length of sections of a plate perpendicular to x and y axes, respectively Qn Shearing force parallel to z axis per unit length of section of a plate perpendicular to n direction JVx, Ny Normal forces per Unit length of sections of a plate perpendicular to x and y directions, respectively
xiv NOTATION N Shearing force in direction of y axis per unit length of section of a plate perpendicular to x axis M,M,M Radial,tangential,and twisting moments when using polar coordinates Q,Q.Radial and tangential shearing forces N,N:Normal forces per unit length in radial and tangential directions ri,r:Radii of curvature of a shell in the form of a surface of revolution in meridional plane and in the normal plane perpendicular to meridian, respectively xe,xe Changes of curvature of a shell in meridional plane and in the plane perpendicular to meridian,respectively XO Twist of a shell X,Y,2 Components of the intensity of the external load on a shell,parallel to x,y,and z axes,respectively Ne,Ne,Ne Membrane forces per unit length of principal normal sections of a shell Ma,M.Bending moments in a shell per unit length of meridional section and a section perpendicular to meridian,respectively x=,xe Changes of curvature of a cylindrical shell in axial plane and in a plane perpendicular to the axis,respectively Ne,N=,N Membrane forces per unit length of axial section and a section perpen- dicular to the axis of a cylindrical shell M,M:Bending moments per unit length of axial section and a section perpen- dicular to the axis of a cylindrical shell,respectively M Twisting moment per unit length of an axial section of a cylindrical shell Shearing forces parallel to z axis per unit length of an axial section and a section perpendicular to the axis of a cylindrical shell,respectively log Natural logarithm logio,Log Common logarithm
