This course is about the basic mathematics that is fundamental and essential component in all streams of undergraduate studies in sciences and engineering. The course consists of topics in complex analysis, numerical analysis, vector calculus and transform techniques with applications to various engineering problems. This course will cover the following main topics. Function of complex variables. Analytic functions. Line integrals in complex plane. Cauchy’s integral theorem, Derivatives of analytic functions. Power series, radius of convergence. Taylor’s and Laurent’s series, zeros and singularities, residue theorem.Iterative method for solution of system of linear equations. Finite differences, interpolation. Numerical integration. Solution of algebraic and transcendental equations. Vector and scalar fields. Limit, continuity, differentiability of vector functions. Directional derivative, gradient, curl, divergence. Line and surface integrals, Green, Gauss and Stokes theorem. Laplace transform and its properties. Laplace Transform of specialfunction. Convolution theorem. Evaluation of integrals by Laplace Transform. Solution of initial and boundary value problems. Fourier series representation of a function. Fourier sine and cosine transforms. Fourier Transform. Properties of Fourier Transform.Applications to boundary value problems.
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