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• Week1: Introduction to Complex Numbers, Basic Algebraic Properties
• Week 02: Introduction to Geometric representation of complex numbers
• Week 03:Introduction to Powers and roots of complex numbers
• Week 4: Introduction to Functions of Complex Variables: Definition, limit and continuity
• Week 05: Introduction to Differentiable and analytic functions
• Week 06: Introduction to Cauchy-Riemann equations, Entire functions, Harmonic functions
• Week 07: Introduction to Elementary functions: The exponential and the Logarithmic Function, Branches of Logarithmic function1
• Week 08: Introduction toTrigonometric, Hyperbolic and Inverse trigonometric and hyperbolic functions
• Week 09: Mid Term Exam
• Week 10: Introduction to Complex Integrals: Contours and contour integrals
• Week 11: Upper bounds for the moduli of Contour Integral, Introduction to Cauchy-Goursat theorem, Cauchy integral formula
• Week 12: Lioville’s theorem, Introduction to Open mapping theorem. Maximum modulus theorem
• Week 13: Power series, Radius of convergence and analyticity, Introduction to Taylor’s and Maclaurin series191
• Week 14: Laurent Series, Integration and differentiation of power series, Multiplication and division of power series
• Week 15: Isolated Singular Point, Introduction to Residues, Introduction to Cauchy’s residue theorem with applications, Residue at Infinity
• Week 16: The Three Types of Isolated Singular Points, Residue at Poles, Zero of Analytic Function,
• Week 17: Mobius transforms, Conformal mappings and transformations
• Week 18: Final Term Exam