KTU S3 Partial Differential Equation And Complex Analysis Maths Notes

Looking for KTU S3 Partial Differential Equation And Complex Analysis PDEC notes and study materials? The KTU S3 Maths course is required for all 2019 scheme EC, EE, Mech, and Civil majors. We are available to help you with your Partial Differential Equation and Complex Analysis MAT 201 coursework so that you can successfully ace the exam using PDEC notes. For the MAT 201 Partial Differential Equation and Complex Analysis course, we provide you the latest study resources, including PDF files of the whole course on the subject of your choice. The most crucial information from each unit is included in these documents. They are grouped in accordance with the college syllabus and derived from recent exam-relevant sources in accordance with the most recent KTU PDEC 2019 Scheme.

With the support of available solved study materials for partial differential equations and complex analysis, it's time to make sure you grasp everything. This course covers the fundamental concepts of partial differential equations, which have applications in all areas of engineering and are frequently utilized in the modelling and analysis of a wide range of physical events. to comprehend residue integration, conformal transformation, and the fundamental theory of complex variable functions.

Board	KTU
Scheme	2019 New Scheme
Year	Second Year
Semester	S3
Subject	MAT 201 | Partial Differential Equation And Complex Analysis Notes
Credit	4 Credit
Category	KTU S3

KTU S3 Partial Differential Equation And Complex Analysis | MAT 201 Notes (2019 Scheme)

One of the major papers at KTU S3 is the PDEC course since Ordinary differential equations have derivatives taken with regard to just one variable. Consequently, there is just one independent variable. Equations with partial derivatives of many variables are termed partial differential equations. Complex analysis is the study of calculus when you have complex-valued functions, to greatly simplify it. Lev Borisov is right when he says that one of the most beautiful aspects of mathematics is the fundamental theory of complex analysis. Apparently, complex-valued functions

Module 1

Module 1 - Syllabus

Partial Differential Equations: Partial differential equations, Formation of partial differential equations –elimination of arbitrary constants-elimination of arbitrary functions, Solutions of partial differential equations, Equations solvable by direct integration, Linear equations of the first order- Lagrange’s linear equation, Non-linear equations of the first order -Charpit’s method, Solution of the equation by the method of separation of variables.

Module 1 - Notes

Module 1 Partial Differential Equation And Complex Analysis | MAT 201 HANDWRITTEN Notes

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Module 2

Module 2 - Syllabus

Applications of Partial Differential Equations: One dimensional wave equation- vibrations of a stretched string, derivation, solution of the wave equation using method of separation of variables, D’Alembert’s solution of the wave equation, One dimensional heat equation, derivation, solution of the heat equation

Module 2 - Notes

Module 2 Partial Differential Equation And Complex Analysis | MAT 201 HANDWRITTEN Notes

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Module 3

Module 3 - Syllabus

Complex Variable – Differentiation : Complex function, limit, continuity, derivative, analytic functions, Cauchy-Riemann equations, harmonic functions, finding harmonic conjugate, Conformal mappings- mappings. Linear fractional transformation, fixed points, Transformation 

Module 3 - Notes

Module 3 Partial Differential Equation And Complex Analysis | MAT 201 HANDWRITTEN Notes

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Module 4

Module 4 - Syllabus

Complex Variable – Integration: Complex integration, Line integrals in the complex plane, Basic properties, First evaluation method-indefinite integration and substitution of limit, second evaluation method-use of a representation of a path, Contour integrals, Cauchy integral theorem (without proof) on the simply connected domain, Cauchy integral theorem (without proof) on multiply connected domain Cauchy Integral formula (without proof), Cauchy Integral formula for derivatives of an analytic function, Taylor’s series and Maclaurin series.

Module 4 - Notes

Module 4 Partial Differential Equation And Complex Analysis | MAT 201 HANDWRITTEN Notes

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Module 5

Module 5 - Syllabus

Complex Variable – Residue Integration: Laurent’s series(without proof ), zeros of analytic functions, singularities, poles, removable singularities, essential singularities, Residues, Cauchy Residue theorem (without proof), Evaluation of definite integral using residue theorem, Residue integration of real integrals – integrals of rational functions, integrals of improper integrals of the form with no poles on the real axis.

Module 5 - Notes

Module 5 Partial Differential Equation And Complex Analysis | MAT 201 HANDWRITTEN Notes

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If your course is included, it will be almost identical to the Partial Differential Equation And Complex Analysis course offered by the APJ Abdul Kalam Technological University (KTU). APJ Abdul Kalam Technological University (KTU) PDEA Notes are already available here.

After learning this Course you can 

• Recognize the idea behind and how to solve a partial differential equation.
• Analyze and resolve the heat equation and the wave equation in one dimension.
• Recognize complex functions and their continuity and differentiability using Cauchy-Riemann equations.
• Utilize Cauchy's integral theorem and formula to evaluate complex integrals, and be aware of the series expansion of analytic functions.
• Recognize the complex function's series expansion around a singularity and use the residue theorem to construct various real integrals of various types.

These KTU S3 Partial Differential Equation And Complex Analysis Notes will be a massive help to those who find it difficult to comprehend the lectures and lessons. It will be easier for students to keep up with the course if they have notes to handle questions. If you're looking for KTU S3 PDEC Notes, you've come to the right place since you can download them for free in pdf format. It helps pupils acquire knowledge and get ready for exams.

Students get access to prior years' question papers, assignments, lecture slides, and textbooks via download. Anyone studying for their semester exams in engineering will find these notes to be of great assistance.

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KTU S3 EC Related Links

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KTU S3 Reference Textbook	Click Here
KTU S3 Previous Year Solved Questions	Click Here
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