Description
Calculus and Analysis in Euclidean Space, 1st ed. 2016
Undergraduate Texts in Mathematics Series
Author: Shurman Jerry
Language: EnglishSubject for Calculus and Analysis in Euclidean Space:
Keywords
derivative; implicit functions; integration of differential forms; linear mappings; multivariable differentiable calculus; multivariable integral calculus; parameterized curves; textbook adoption calculus; textbook adoption analysis; single-variable calculus; Euclidean space; inverse functions; approximation smooth functions; parametrized curves
Approximative price 68.56 €
In Print (Delivery period: 15 days).
Add to cart the print on demand of Shurman JerryPublication date: 07-2018
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Publication date: 12-2016
Support: Print on demand
Description
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The graceful role of analysis in underpinning calculus is often lost to their separation in the curriculum. This book entwines the two subjects, providing a conceptual approach to multivariable calculus closely supported by the structure and reasoning of analysis. The setting is Euclidean space, with the material on differentiation culminating in the inverse and implicit function theorems, and the material on integration culminating in the general fundamental theorem of integral calculus. More in-depth than most calculus books but less technical than a typical analysis introduction, Calculus and Analysis in Euclidean Space offers a rich blend of content to students outside the traditional mathematics major, while also providing transitional preparation for those who will continue on in the subject.
The writing in this book aims to convey the intent of ideas early in discussion. The narrative proceeds through figures, formulas, and text, guiding the reader to do mathematics resourcefully by marshaling the skills of
- geometric intuition (the visual cortex being quickly instinctive)
- algebraic manipulation (symbol-patterns being precise and robust)
- incisive use of natural language (slogans that encapsulate central ideas enabling a large-scale grasp of the subject).
Thinking in these ways renders mathematics coherent, inevitable, and fluid.
The prerequisite is single-variable calculus, including familiarity with the foundational theorems and some experience with proofs.