Infinite Sets Infinite Sets

Infinite Sets

An Introduction

    • 4.1 • 20 Ratings

Publisher Description

The theory of infinite sets is my favorite subject in mathematics.  The results are very counterintuitive - where would you get intuition about infinite things?  As such, they are quite delightful; at least they are to me.  This is a theoretical subject, the kind of math done by mathematicians, rather than the applied subjects taught in secondary school and the first two years of college.  Sometimes a little theory is covered in those courses, but usually not much.  Some high schools teach significant theory in geometry, but that comes before most students have developed much mathematical maturity, and I'm afraid the enjoyment and significance of theory are lost on most.

The main topics of the book are (1) countably infinite sets of "words", (2) countably infinite sets of numbers, (3) uncountably infinite sets of strings, numbers, functions, and sets, including Cantor's theorem, (4) paradoxes of set theory, including Russell's paradox, and (5) computable functions.

Along the way related topics are touched on, including base numeral systems, representations of rational and irrational numbers, polynomial equations and algebraic numbers, transcendental numbers, the cubic formula, the irrationality of the square root of two and other integers, functions (onto, 1-1), self-descriptive sequences, discrete dynamical systems, including chaotic systems, semantic paradoxes, Euclid’s theorem, the twin-prime conjecture, limits, continuity, the Fibonacci sequence, inductive/recursive definitions, and proofs by induction.

There are about 100 problems with solutions to almost all.

Request for feedback:  Most teachers want feedback, and when teaching it is plentiful and immediate.  I would like feedback to this book; please send corrections, comments, and questions to tomschaffter@mac.com.

RELEASED
2012
August 31
LANGUAGE
EN
English
LENGTH
76
Pages
PUBLISHER
Thomas Schaffter
SELLER
Thomas Schaffter
SIZE
6
MB
AUDIENCE
Grades 10-17
Enjoying Mathematics Enjoying Mathematics
2013
An Adventurer's Guide to Number Theory An Adventurer's Guide to Number Theory
2012
Playing with Infinity Playing with Infinity
2012
Numbers Numbers
2011
Mathematical Fallacies and Paradoxes Mathematical Fallacies and Paradoxes
2012
The Largest Number Smaller Than Five The Largest Number Smaller Than Five
2011
Analytic Geometry Analytic Geometry
2014
Systems of Linear Equations Systems of Linear Equations
2013
Advances in Discrete Differential Geometry Advances in Discrete Differential Geometry
2016
Mathematical Analysis Mathematical Analysis
2012
Get Ready for Calculus Get Ready for Calculus
2014
First Order Differential Equations First Order Differential Equations
2014