Chapter 1 First-Order Odes 1.1 Basic Concepts. Modeling Problem Set p.8 1.2 Geometric Meaning of y'=f(x,y). Direction Fields, Euler's Method Problem Set p.11 1.3 Separable ODEs. Modeling Problem Set p.18 1.4 Exact ODEs. Integrating Factors Problem Set p.26 1.5 Linear ODEs. Bernoulli Equation.

Population Dynamics Problem Set p.34 1.6 Orthogonal Trajectories Problem Set p.38 1.7 Existence and Uniqueness of Solutions for Initial Value Problems Problem Set p.42 Review Questions and Problems p.43 Chapter 2 Second-Order Linear Odes 2.1 Homogeneous Linear ODEs of Second Order Problem Set p.53 2.2 Homogeneous Linear ODEs with Constant Coefficients Problem Set p.59 2.3 Differential Operators Problem Set p.61 2.4 Modeling of Free Oscillations of a Mass-Spring System Problem Set p.69 2.5 Euler-Cauchy Equations Problem Set p.73 2.6 Existence and Uniqueness of Solutions. Wronskian Problem Set p.79 2.7 Nonhomogeneous ODEs Problem Set p.84 2.8 Modeling: Forced Oscillations. Resonance Problem Set p.91 2.9 Modeling: Electric Circuits Problem Set p.98 2.10 Solution by Variation of Parameters Problem Set p.102 Review Questions and Problems p.102 Chapter 3 Higher Order Linear Odes 3.1 Homogeneous Linear ODEs Problem Set p.111 3.2 Homogeneous Linear ODEs with Constant Coefficients Problem Set p.116 3.3 Nonhomogeneous Linear ODEs Problem Set p.122 Review Questions and Problems p.122 Chapter 4 Systems Of Odes. Qualitative Methods 4.1 Systems of ODEs as Models in Engineering Applications Problem Set p.136 4.3 Constant-Coefficient Systems.

Higher Engineering Mathematics, Fourth Edition, Elsevier 2004. Jain R.K., Iyengar SRK Advanced Engineering Mathematics, 2nd Edition Narosa 2003.

Phase Plane Method Problem Set p.147 4.4 Criteria for Critical Points. Stability Problem Set p.151 4.5 Qualitative Methods for Nonlinear Systems Problem Set p.159 4.6 Nonhomogeneous Linear Systems of ODEs Problem Set p.163 Review Questions and Problems p.164 Chapter 5 Series Solutions Of Odes.

Special Functions 5.1 Power Series Method Problem Set p.174 5.2 Legendre's Equation. Legendre Polynomials Pn(x) Problem Set p.179 5.3 Extended Power Series Method: Frobenius Method Problem Set p.186 5.4 Bessel's Equation. Bessel Functions Jv(x) Problem Set p.195 5.5 Bessel Functions Yv(x). General Solution Problem Set p.200 Review Questions and Problems p.200 Chapter 6 Laplace Transforms 6.1 Laplace Transform. First Shifting Theorem (s-Shifting) Problem Set p.210 6.2 Transforms of Derivatives and Integrals.

ODEs Problem Set p.216 6.3 Unit Step Function (Heaviside Function). Second Shifting Theorem (t-Shifting) Problem Set p.223 6.4 Short Impulses. Dirac's Delta Function. Partial Fractions Problem Set p.230 6.5 Convolution. Integral Equations Problem Set p.237 6.6 Differentiation and Integration of Transforms. ODEs with Variable Coefficients Problem Set p.241 6.7 Systems of ODEs Problem Set p.246 Review Questions and Problems p.251 Chapter 7 Linear Algebra: Matrices, Vectors, Determinants. Linear Systems 7.1 Matrices, Vectors: Addition and Scalar Multiplication Problem Set p.261 7.2 Matrix Multiplication Problem Set p.270 7.3 Linear Systems of Equations.

Gauss Elimination Problem Set p.280 7.4 Linear Independence. Rank of a Matrix. Vector Space Problem Set p.287 7.7 Determinants. Cramer's Rule Problem Set p.300 7.8 Inverse of a Matrix. Gauss-Jordan Elimination Problem Set p.308 7.9 Vector Spaces, Inner Product Spaces, Linear Transformations Problem Set p.318 Review Questions and Problems p.318 Chapter 8 Linear Algebra: Matrix Eigenvvalue Problems 8.1 The Matrix Eigenvalue Problem. Kpg 49d 420 download. Determining Eigenvalues and Eigenvectors Problem Set p.329 8.2 Some Applications of Eigenvalue Problems Problem Set p.333 8.3 Symmetric, Skew-Symmetric, and Orthogonal Matrices Problem Set p.338 8.4 Eigenbases. Quadratic Forms Problem Set p.345 8.5 Complex Matrices and Forms.

Problem Set p.351 Review Questions and Problems p.352 Chapter 9 Vector Differential Calculus, Grad, Div, Curl 9.1 Vectors in 2-Space and 3-Space Problem Set p.360 9.2 Inner Product (Dot Product) Problem Set p.367 9.3 Vector Product (Cross Product) Problem Set p.374 9.4 Vector and Scalar Functions and Their Fields. Vector Calculus: Derivatives Problem Set p.380 9.5 Curves. Torsion Problem Set p.390 9.7 Gradient of a Scalar Field. Directional Derivative Problem Set p.402 9.8 Divergence of a Vector Field Problem Set p.405 9.9 Curl of a Vector Field Problem Set p.408 Review Questions and Problems p.409 Chapter 10 Vector Integral Calculus.

Integral Theorems 10.1 Line Integrals Problem Set p.418 10.2 Path Independence of Line Integrals Problem Set p.425 10.3 Calculus Review: Double Integrals. Problem Set p.432 10.4 Green's Theorem in the Plane Problem Set p.438 10.5 Surfaces for Surface Integrals Problem Set p.442 10.6 Surface Integrals Problem Set p.450 10.7 Triple Integrals. Divergence Theorem of Gauss Problem Set p.457 10.8 Further Applications of the Divergence Theorem Problem Set p.462 10.9 Stokes's Theorem Problem Set p.468 Review Questions and Problems p.469 Chapter 11 Fourier Analysis 11.1 Fourier Series Problem Set p.482 11.2 Arbitrary Period. Even and Odd Functions. Half-Range Expansions Problem Set p.490 11.3 Forced Oscillations Problem Set p.494 11.4 Approximation by Trigonometric Polynomials Problem Set p.498 11.5 Sturm-Liouville Problems. Orthogonal Functions Problem Set p.503 11.6 Orthogonal Series. Generalized Fourier Series Problem Set p.509 11.7 Fourier Integral Problem Set p.517 11.8 Fourier Cosine and Sine Transforms Problem Set p.522 11.9 Fourier Transform.