A course of mathematical analysis : Vol. 1

By: S.M. NikolskyContributor(s): Translated from Russian by V.M. VolosovMaterial type: TextTextPublication details: Moscow: Mir Publishers, [c1981]Description: 460 pSubject(s): MathematicsLOC classification: QA300Online resources: E-Book from archive.org Summary: The major part of this two-volume textbook stems from the course in mathematical analysis given by the author for many years at the Moscow Physico-technical Institute. The first volume consisting of eleven chapters includes an introduction (Chapter 1) which treats of fundamental notions of mathematical analysis using an intuitive concept of a limit. With the aid of visual interpretation and some considerations of a physical character it establishes the relationship between the derivative and the integral and gives some elements of differen­ tiation and integration techniques necessary to those readers who are simultaneously studying physics. The notion of a real number is interpreted in the first volume (Chapter 2) on the basis ofits representation as an infinite deci­mal. Chapters 3-11 contain the following topics: Limit of Se­quence, Limit of Function, Functions of One Variable, Func­ tions of Several Variables, Indefinite Integral, Definite Integral, Some Applications of Integrals, Series.
List(s) this item appears in: Gift Books
Tags from this library: No tags from this library for this title. Log in to add tags.
    Average rating: 0.0 (0 votes)
Item type Current library Collection Shelving location Call number Status Date due Barcode Item holds
Book Book ICTS
Mathematics Rack No 4 QA300 (Browse shelf (Opens below)) Available 02684
Total holds: 0

The major part of this two-volume textbook stems from the course in mathematical analysis given by the author for many years at the Moscow Physico-technical Institute.
The first volume consisting of eleven chapters includes an introduction (Chapter 1) which treats of fundamental notions of mathematical analysis using an intuitive concept of a limit. With the aid of visual interpretation and some considerations of a physical character it establishes the relationship between the derivative and the integral and gives some elements of differen­ tiation and integration techniques necessary to those readers who are simultaneously studying physics. The notion of a real number is interpreted in the first volume (Chapter 2) on the basis ofits representation as an infinite deci­mal. Chapters 3-11 contain the following topics: Limit of Se­quence, Limit of Function, Functions of One Variable, Func­ tions of Several Variables, Indefinite Integral, Definite Integral, Some Applications of Integrals, Series.

There are no comments on this title.

to post a comment.