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This comprehensive text explores the fascinating interplay between complex function theory and integral transforms, providing both theoretical foundations and practical applications. Beginning with the fundamental principles of complex analysis-including analytic functions, contour integration, and residue theory-the book builds a rigorous framework for understanding how complex-valued functions behave in ways that extend and enrich real analysis.The text then transitions to integral transforms, demonstrating how the Laplace, Fourier, and other transforms serve as powerful tools for solving differential equations and analyzing signals. Special attention is given to the elegant connection between these transforms and complex function theory, particularly through contour integration techniques and the residue theorem. Later chapters delve into advanced topics such as conformal mapping, asymptotic methods, and applications across physics, engineering, and signal processing. Throughout, carefully selected examples and exercises guide readers from basic principles to sophisticated applications, making this an essential resource for students and researchers in mathematics and physics.