Complex Analysis | Laurent’s series | Taylor’s Series

In this lecture, we will learn how to expand any complex function in Laurent’s or Taylor’s series. This has been explained with the help of examples for different regions. For other previous lectures in this series- For the basics of the complex, you can watch—    • Complex Analysis | Basics of complex varia...   For derivatives of complex functions, you can refer    • Complex Analysis | Derivative of complex f...   For the definition of analytic functions and C-R equations    • Complex Analysis | Analytic Functions| C R...   For question Cauchy Reimann equations are satisfied but 𝑓′(0) does not exist    • Complex Analysis | Analytic Functions| C R...   For harmonic conjugate    • Complex Analysis | Harmonic conjugate | Fi...   For Milne-Thomson theorem    • Complex Analysis |Harmonic conjugate 2 | F...   For Complex line integral    • Complex Analysis | Complex Integration | L...   For Cauchy Integral Theorem and Cauchy Integral formula    • Complex Analysis | Complex Integration| Ca...   Thanks Please post your comments in case of any doubt. Complex analysis, Complex integration, Engineering mathematics, Higher mathematics, Complex analysis, Mathematics for GATE, Taylor Series, Taylor Theorem, Laurent series, Laurent Expansion, Laurent Theorem, Solved example of Taylor Series, Solved example for Laurent series, Important topic for GATE,