Sale!

An Introduction to Proof through Real Analysis

Download An Introduction to Proof through Real Analysis written by Daniel J. Madden, Jason A. Aubrey in PDF format. This book is under the category Mathematics and bearing the isbn/isbn13 number 1119314720/9781119314721. You may reffer the table below for additional details of the book.

$19.99

Specifications

book-author

Daniel J. Madden, Jason A. Aubrey

publisher

Wiley

file-type

PDF

pages

414 pages

language

English

asin

B074VFCRH8

isbn10

1119314720

isbn13

9781119314721


Book Description

An accessible and engaging introduction to mathematical proof integrating ideas from a real study

A mathematical proof is an inferential argument for a mathematical statement. Since the time of the earliest Greek mathematicians; the proof has been a keystone of the science of mathematics. The purpose of this ebook is to help college students learn to understand and follow the structure and function of mathematical proof and to deliver proofs of their own.

An Introduction to Proof through Real Analysis; (PDF) is based on course material developed and improved over thirty years by Professor Daniel J. Madden and was designed to serve as a complete text for both first analysis and first proofs courses. Authored in an accessible and engaging narrative style; this ebook systematically includes the basic techniques of proof writing; beginning with real numbers and transitioning to logic; topology; set theory and continuity. The ebook proceeds from natural numbers to rational numbers in an acquainted way and justifies the need for an exact definition of real numbers. The mathematical climax of the story it tells is the Intermediate Value Theorem; which validates the notion that the real numbers are adequate for solving all geometric problems.

  • Uses a particular mathematical idea as the stress of each type of proof presented
  • Written in an appealing narrative style to tell the story of proof and its meaning; function; and construction
  • Proceeds from traditional guides to proofs by including elements of both real analysis and algebraic representation
  • Developed from information that has been class-tested and fine-tuned over thirty years in university introductory courses
  • Focuses solely on designing proofs by placing instruction on proof writing on top of discussions of specific mathematical subjects

This ebook is the perfect introductory textbook to proofs for second and third-year undergraduate mathematics students; particularly students learning real analysis for the first time; those who have completed a calculus sequence; and those learning proofs for the first time.

NOTE: The product only includes the ebook An Introduction to Proof through Real Analysis;  in PDF. No access codes are included.

book-author

Daniel J. Madden, Jason A. Aubrey

publisher

Wiley

file-type

PDF

pages

414 pages

language

English

asin

B074VFCRH8

isbn10

1119314720

isbn13

9781119314721

Reviews

There are no reviews yet.

Be the first to review “An Introduction to Proof through Real Analysis”

Your email address will not be published. Required fields are marked *

Recent Posts

5 tips for a good business blog

Are you also looking for a good structure for your business blogs? That you finally have a serious and good structure for all your texts that are online? On your website but also on social media. In this review you will find 5 tips from Susanna Florie from her book: How do you…

Study tips from a budding engineer

“Why engineering?” is a question I get often. The answer for me is simple: I like to solve problems. Engineering is a popular field for many reasons. Perhaps this is because almost everything around us is created by engineers in one way or another, and there are always new, emerging and exciting technologies impacting…

How do I study mathematics and pass my exam?

Not sure how best to study math ? Are you perhaps someone who starts studying the day before the exam? Then you know yourself that your situation is not the most ideal. Unfortunately, there is no magic bullet to make you a maths crack or pass your exam in no time . It is important to know that mathematics always builds on…