02925nam a22002417a 4500999001500000003000400015005001700019008004100036020002200077028001700099040002400116082002300140100001500163245004900178250000900227260006200236300000800298500145800306504074801764650001502512942001202527952014402539 c1502d1502OSt20180710124115.0180710b ||||| |||| 00| 0 eng d a978-0-07-060741-5 bDeepak Singh aBSDUbEnglishcBSDU a620.001515353bRED aReddy, J N aAn Introduction to the Finite Element Method b3rd  aNew DelhibMcGraw Hill Education (India) Pvt. Ltd. c2005 a766 aAn Introduction To The Finite Element Method, in its third edition, has the same conceptual approach to FEM as the previous versions. The ramifications of the Finite Element Method in various applications of engineering are examined with detailed mathematical explanations. All the basic concepts relating to FEM are discussed under An Introduction To The Finite Element Method. After the preliminaries are covered, the book explains variations and integral formulations. Next, finite element models as well as their applications are examined for one dimensional differential equations of the second order. There is also a chapter devoted to the computer implementation of FEM. Other practical scenarios are discussed, such as time-dependent situations, beams and frames, the flow of viscous incompressible fluids and the bending of elastic plates. FEM can be applied to all of the above situations. The chief feature of An Introduction To The Finite Element Method is the wide repertoire of solved examples. There are some problems that are meant to be solved by hand, and some on the computer. Close to 30 per cent of the problems are new or have been revised from the previous edition. There are some that are in the form of a class project, which the professor can choose to do using commercial Finite Element Method packages. Various subjects across the engineering spectrum such as fluid mechanics, heat transfer and solid mechanics are covered. aContents Chapter 1 Introduction Chapter 2 Mathematical Preliminaries, Integral Formulations, and Variational Methods Chapter 3 Second-order Differential Equations in One Dimension: Finite Element Models Chapter 4 Second-order Differential Equations in One Dimension: Applications Chapter 5 Beams and Frames Chapter 6 Eigenvalue and Time-Dependent Problems Chapter 7 Computer Implementation Chapter 8 Single-Variable Problems in Two Dimensions Chapter 9 Interpolation Functions, Numerical Integration, and Modeling Considerations Chapter 10 Flows of Viscous Incompressible Fluids Chapter 11 Plane Elasticity Chapter 12 Bending of Elastic Plates Chapter 13 Computer Implementation of Two-Dimensional Problems Chapter 14 Prelude to Advanced Topic aMechanical 2ddccBK 00102ddc4070aBSDUbBSDUcGENd2018-07-10g699.00l1o620.001515353 REDpDB0108r2021-08-13 00:00:00s2021-07-03v699.00w2018-07-10yBK