Advanced Engineering Mathematics
Advanced Engineering Mathematics provides comprehensive and contemporary coverage of key mathematical ideas, techniques, and their widespread applications, for students majoring in engineering, computer science, mathematics and physics. Using a wide range of examples throughout the book, Jeffrey illustrates how to construct simple mathematical models, how to apply mathematical reasoning to select a particular solution from a range of possible alternatives, and how to determine which solution has physical significance. Jeffrey includes material that is not found in works of a similar nature, such as the use of the matrix exponential when solving systems of ordinary differential equations. The text provides many detailed, worked examples following the introduction of each new idea, and large problem sets provide both routine practice, and, in many cases, greater challenge and insight for students. Most chapters end with a set of computer projects that require the use of any CAS (such as Maple or Mathematica) that reinforce ideas and provide insight into more advanced problems.
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analytic function applied arbitrary constants Bessel functions boundary conditions boundary value problem called Cauchy characteristic circle coefficients column complex numbers contour convergence coordinates corresponding cosh cosine curve defined definition derivatives detA determined diagonal differential equation eigenvalues eigenvectors elements equilibrium point example Exercises expression finite follows Fourier series Fourier series representation Fourier transform function f(x given gives grad homogeneous improper integral initial conditions initial value problem integrand interval inverse involving Laplace transform Laurent series line integral linear linearly independent mapping matrix matrix exponential multiplication nonhomogeneous obtained odd function order equation orthogonal parameter point x0 polynomial power series proof properties radius real axis real number region result satisfies scalar second order Section series expansion shown in Fig shows sinh ſº solve Sturm–Liouville substituting theorem variable wave z-plane zero