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Lecture
Trigonometric Integrals: Residues Method
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Analyse IV: Laurent Series and Singularities
Covers Laurent series, singularities, and meromorphic functions, addressing convergence, holomorphicity, and residue theorem applications.
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Covers the analysis of complex functions, focusing on convergence and poles.
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Covers the concept of the generalized integral and main value, including singularities, principal value at infinity, and residues.
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Explores the convergence and divergence of generalized integrals using comparison methods and variable transformations.
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Discusses the residue theorem and its applications in calculating complex integrals.
