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Analysis with Ultrasmall Numbers

Karel Hrbacek | Olivier Lessmann | Richard O'Donovan
€132.99
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A01=Karel Hrbacek
A01=Olivier Lessmann
A01=Richard O'Donovan
Age Group_Uncategorized
Age Group_Uncategorized
Author_Karel Hrbacek
Author_Olivier Lessmann
Author_Richard O'Donovan
automatic-update
calculus course at the undergraduate or high school level
calculus foundations
Category1=Non-Fiction
Category=AKP
Category=PBK
Category=TBC
Category=TQ
closure
Closure Principle
context
Continuous Function
COP=United States
Definite Integral
Delivery_Delivery within 10-20 working days
Dense
Dense Open Sets
differential equations introduction
eq_isMigrated=0
eq_isMigrated=2
eq_nobargain
extended
Extended Context
Extreme Value Theorem
Holds
Increment Equation
Induction
infinitesimal methods
interval
intuitive calculus learning
Language_English
mathematical rigor
mathematics using ultrasmall numbers
modern approach to infinitesimals
Natural Numbers
neighbor
Nonnegative Integer
nonstandard analysis
Oblique Asymptote
observable
Observable Neighbor
Observable Relative
open
Open Interval
PA=Available
Price_€100 and above
principle
prove fundamental results from axioms
PS=Active
Quadratic Polynomial
real analysis techniques
Real Numbers
relative
Riemann Integrable
Rolle's Theorem
Set A
Smooth
softlaunch
T- 1
Ultrasmall Numbers
undergraduate mathematics
Uniform Continuity
uniformly
Vertical Asymptote

Product details

  • ISBN 9781498702652
  • Weight: 600g
  • Dimensions: 156 x 234mm
  • Publication Date: 01 Dec 2014
  • Publisher: Taylor & Francis Inc
  • Publication City/Country: US
  • Product Form: Hardback
  • Language: English
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Description

Analysis with Ultrasmall Numbers presents an intuitive treatment of mathematics using ultrasmall numbers. With this modern approach to infinitesimals, proofs become simpler and more focused on the combinatorial heart of arguments, unlike traditional treatments that use epsilon–delta methods. Students can fully prove fundamental results, such as the Extreme Value Theorem, from the axioms immediately, without needing to master notions of supremum or compactness.

The book is suitable for a calculus course at the undergraduate or high school level or for self-study with an emphasis on nonstandard methods. The first part of the text offers material for an elementary calculus course while the second part covers more advanced calculus topics.

The text provides straightforward definitions of basic concepts, enabling students to form good intuition and actually prove things by themselves. It does not require any additional "black boxes" once the initial axioms have been presented. The text also includes numerous exercises throughout and at the end of each chapter.
About Karel Hrbacek | Olivier Lessmann | Richard O'Donovan
Karel Hrbacek, Olivier Lessmann, Richard O'Donovan

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