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Solving Problems in Mathematical Analysis, Part III: Curves and Surfaces, Conditional Extremes, Curvilinear Integrals, Complex Functions, Singularities and Fourier Series de Tomasz Radożycki

Solving Problems in Mathematical Analysis, Part III: Curves and Surfaces, Conditional Extremes, Curvilinear Integrals, Complex Functions, Singularities and Fourier Series: Problem Books in Mathematics

Autor Tomasz Radożycki
en Limba Engleză Hardback – 25 feb 2020
This textbook offers an extensive list of completely solved problems in mathematical analysis. This third of three volumes covers curves and surfaces, conditional extremes, curvilinear integrals, complex functions, singularities and Fourier series. The series contains the material corresponding to the first three or four semesters of a course in Mathematical Analysis.


Based on the author’s years of teaching experience, this work stands out by providing detailed solutions (often several pages long) to the problems. The basic premise of the book is that no topic should be left unexplained, and no question that could realistically arise while studying the solutions should remain unanswered. The style and format are straightforward and accessible. In addition, each chapter includes exercises for students to work on independently. Answers are provided to all problems, allowing students to check their work.


Though chiefly intended for early undergraduatestudents of Mathematics, Physics and Engineering, the book will also appeal to students from other areas with an interest in Mathematical Analysis, either as supplementary reading or for independent study.


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Specificații

ISBN-13: 9783030385958
ISBN-10: 3030385957
Pagini: 378
Ilustrații: IX, 378 p. 76 illus.
Dimensiuni: 155 x 235 x 30 mm
Greutate: 0.72 kg
Ediția:1st ed. 2020
Editura: Springer International Publishing
Colecția Springer
Seria Problem Books in Mathematics

Locul publicării:Cham, Switzerland

Cuprins

Examining Curves and Surfaces.- Investigating Conditional Extremes.- Investigating Integrals with Parameters.- Examining Unoriented Curvilinear Integrals.- Examining Differential Forms.- Examining Oriented Curvilinear Integrals.- Studying Functions of Complex Variable.- Investigating Singularities of Complex Functions.- Dealing with Multi-Valued Functions.- Studying Fourier Series.

Notă biografică

Tomasz Radożycki is a Professor at the Faculty of Mathematics and Natural Sciences, Cardinal Stefan Wyszyński University in Warsaw, Poland. He is also a former lecturer at both the University of Warsaw and the Warsaw University of Technology. His primary research interest is in Theoretical and Mathematical Physics.

Textul de pe ultima copertă

This textbook offers an extensive list of completely solved problems in mathematical analysis. This third of three volumes covers curves and surfaces, conditional extremes, curvilinear integrals, complex functions, singularities and Fourier series. The series contains the material corresponding to the first three or four semesters of a course in Mathematical Analysis.

Based on the author’s years of teaching experience, this work stands out by providing detailed solutions (often several pages long) to the problems. The basic premise of the book is that no topic should be left unexplained, and no question that could realistically arise while studying the solutions should remain unanswered. The style and format are straightforward and accessible. In addition, each chapter includes exercises for students to work on independently. Answers are provided to all problems, allowing students to check their work.

Though chiefly intended for early undergraduate students of Mathematics, Physics and Engineering, the book will also appeal to students from other areas with an interest in Mathematical Analysis, either as supplementary reading or for independent study.


Caracteristici

Offers an extensive list of completely solved problems in mathematical analysis Covers curves and surfaces, conditional extremes, curvilinear integrals, complex functions, singularities and Fourier series Additional exercises at the end of each chapter provide rich material for independent study