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Table of Contents Part I Ordinary Differential Equations 1 Introduction to Differential Equations 1 2 First-Order Differential Equations 22 3 Higher-Order Differential Equations 99 4 The Laplace Transform 198 5 Series Solutions of Linear Differential Equations 252 6 Numerical Solutions of Ordinary Differential Equations 317 Part II Vectors, Matrices, and Vector Calculus 7 Vectors 339 8 Matrices 373 9 Vector Calculus 438 Part III Systems of Differential Equations 10 Systems of Linear Differential Equations 551 11 Systems of Nonlinear Differential Equations 604 Part IV Fourier Series and Partial Differential Equations 12 Orthogonal Functions and Fourier Series 634 13 Boundary-Value Problems in Rectangular Coordinates 680 14 Boundary-Value Problems in Other Coordinate Systems 755 15 Integral Transform Method 793 16 Numerical Solutions of Partial Differential Equations 832 Part V Complex Analysis 17 Functions of a Complex Variable 854 18 Integration in the Complex Plane 877 19 Series and Residues 896 20 Conformal Mappings 919 Appendices Appendix II Gamma function 942 Projects 3.7 Road Mirages 944 3.10 The Ballistic Pendulum 946 8.1 Two-Ports in Electrical Circuits 947 8.2 Traffic Flow 948 8.15 Temperature Dependence of Resistivity 949 9.16 Minimal Surfaces 950 14.3 The Hydrogen Atom 952 15.4 The Uncertainity Inequality in Signal Processing 955 15.4 Fraunhofer Diffraction by a Circular Aperture 958 16.2 Instabilities of Numerical Methods 960
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