Hello, engineers right now you are preparing for sem2 exams but as per the government circular, all the universities should give mass promotion for the current semester2,4 &6. You need to wait for the official circulars from gtu and all other universities.
As an engineer, you have to be prepared for the upcoming events. So you should be prepared with the new semester textbooks. But keeping the current situations in mind all of us should stay at home.
We are ready to handle every situation. As per the syllabus of gtu sem 3 mechanical engineering you have cvpd as a scoring subject.
Here we are sharing with you a copy of CVPD mc graw hill publication book.
OVERVIEW:
Link:-
https://drive.google.com/file/d/1wvwAtwCIzZEcPU4RhUw9i1eqWsg3oO4a/view?usp=drivesdk
This book is a revision of the seventh edition, which was published in 2004. That edition has served, just as the earlier ones did, as a textbook for a one-term introductory course in the theory and application of functions of a complex variable. This new edition preserves the basic content and style of the earlier editions, the f irst two of which were written by the late Ruel V. Churchill alone. The first objective of the book is to develop those parts of the theory that are prominent in applications of the subject. The second objective is to furnish an introduction to applications of residues and conformal mapping. With regard to residues, special emphasis is given to their use in evaluating real improper integrals, finding inverse Laplace transforms, and locating zeros of functions. As for conformal mapping, considerable attention is paid to its use in solving boundary value problems that arise in studies of heat conduction and fluid flow. Hence the book may be considered as a companion volume to the authors’ text “Fourier Series and Boundary Value Problems,” where another classical method for solving boundary value problems in partial differential equations is developed. The first nine chapters of this book have for many years formed the basis of a three-hour course given each term at The University of Michigan. The classes have consisted mainly of seniors and graduate students concentrating in mathematics, engineering, or one of the physical sciences. Before taking the course, the students have completed at least a three-term calculus sequence and a first course in ordinary differential equations. Much of the material in the book need not be covered in the lectures and can be left for self-study or used for reference. If mapping by elementary functions is desired earlier in the course, one can skip to Chap. 8 immediately after Chap. 3 on elementary functions.
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