Chap 4 Laplace Transform . 中華大學 資訊工程系 Fall 2002. Outline. Basic Concepts Laplace Transform Definition, Theorems, Formula Inverse Laplace Transform Definition, Theorems, Formula Solving Differential Equation Solving Integral Equation. Basic Concepts. 微分方程式. 代數方程式. Laplace Transform.

ByAugustin Louis Cauchy 1789 – 1857 A Great Mathematician. MCS193 Term Project Prepared by : Koray ÖZSOY May 2013. Agenda. Introduction Biography Studies Theorems References. Introduction. Augustin -Louis Cauchy was one of the greatest mathematicians during the nineteenth century.

ByFunctions of A Complex Variables. Functions of a complex variable provide us some powerful and widely useful tools in in theoretical physics. • Some important physical quantities are complex variables (the wave-function ) • Evaluating definite integrals.

By14. CHAPTER. Complex Integration. 14.1 Line Integral in the Complex Plane. 14.2 Cauchy’s Integral Theorem. 14.3 Cauchy’s Integral Formula. 14.4 Derivatives of Analytic Functions.

ByRESIDUE THEOREM. Presented By Osman Toufiq Ist Year Ist SEM. RESIDUE THEOREM Calculus of residues. Suppose an analytic function f ( z ) has an isolated singularity at z 0 . Consider a contour integral enclosing z 0. z 0.

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