Mathematics-III (BE-3001) - CE,TX
rgpv bhopal, diploma, rgpv syllabus, rgpv time table, how to get transcript from rgpv, rgpvonline,rgpv question paper, rgpv online question paper, rgpv admit card, rgpv papers, rgpv scheme
RGPV notes CBGS Bachelor of engineering
COURSE OBJECTIVE-
The objective of this course is to fulfill the needs of Engineers to understand the Applications of Fourier Series, Different Transforms, Complex Analysis & Numerical Solution of Algebraic and Transcendental Equations in order to enable young technocrats to acquire Mathematical thinking of Formulating, Analyzing and Solving a wide range of Practical Problems Appearing in Science & Engineering.
Syllabus
UNIT 1:
Fourier Series: Fourier Series for Continuous & Discontinuous Functions, Expansion of odd
and even periodic functions, Half range Fourier series, Complex form of Fourier Series.
UNIT 2:
Integral Transforms:
Fourier Transform-Complex Fourier Transform, Fourier Sine and Cosine Transforms,
Applications of Fourier Transform in Solving the Ordinary Differential Equation.
Laplace Transform- Introduction of Laplace Transform, Laplace Transform of elementary
Functions, Properties of Laplace Transform, Change of Scale Property, First and Second
Shifting Properties, Laplace Transform of Derivatives and Integrals. Inverse Laplace Transform
& its Properties, Convolution theorem, Applications of Laplace Transform in solving the
Ordinary Differential Equations
UNIT 3:
Laplace Transform- Introduction of Laplace Transform, Laplace Transform of elementary
Functions, Properties of Laplace Transform, Change of Scale Property, First and Second
Shifting Properties, Laplace Transform of Derivatives and Integrals. Inverse Laplace Transform
& its Properties, Convolution theorem, Applications of Laplace Transform in solving the
Ordinary Differential Equations
UNIT 4:
Functions of Complex Variables: Analytic functions, Harmonic Conjugate, CauchyRiemann Equations, Line Integral, Cauchy’s Theorem, Cauchy’s Integral Formula, Singular
Points, Poles & Residues, Residue Theorem , Application of Residues theorem for
Evaluation of Real Integrals.
UNIT 5:
Numerical Solution of Algebraic and Transcendental Equations: Method of Bisection,
Secant Method, Regula-Falsi Method, Fixed Point iteration Method, Newton-Raphson Method,
Graffe’s Method, Lin-Bairstow’s Method.
NOTES
- Unit 1
- Unit 2
- Unit 3
- Unit 4
- Unit 5
COURSE OUTCOMES-
The curriculum of the Department is designed to satisfy the diverse needs of students. Coursework is designed to provide students the opportunity to learn key concepts of Fourier Series, Different Transforms, Complex Analysis & Numerical Solution of Algebraic and Transcendental Equations.
EVALUATION-
Evaluation will be continuous, an integral part of the class as well as through external assessment.
Books Recommended
1. Erwin Kreyszig: Advanced Engineering Mathematics, Wiley India.
2. B.S. Grewal: Higher Engineering Mathematics , Khanna Publication.
3. Engineering Mathematics By Samnta Pal and Bhutia, Oxford Publication
4. Ramana: Advance Engg. Mathematics, TMH New Delhi
5. Numerical Methods for Engineers by Steven C. Chapra, McGraw Hill Education
6. Introductory Methods of Numerical Analysis by S. S. Sastry, PHI Learning Pvt. Ltd.
7. Numerical Methods By Shrimanta Pal, Oxford
