Number theory

Notes
 
¹The number line contains an "uncountable" number of numbers.  "Countable" numbers have a "cardinality" equal to the "counting numbers", i.e., the positive integers.  Uncountable numbers, like the real numbers, have a cardinality larger than this.  So it would take a "long, long time, / to walk full down / the number line".
 
²The real numbers can not be listed even in an infinite amount of time with the fastest possible computer.  So to run through all of the real numbers, you must go very fast indeed.
 
³Running through the real numbers requires the "Axiom of Choice", a postulate logically independent of Set Theory, which stipulates that there is a way to "choose" an element from any set.  This sounds simple, but consider the set of real numbers for which we have no names.  Now, try and pick a member of this set.
 
⁴Since there are "uncountable" real numbers, one cannot list them.  Hence there is no time to "greet each one".
 
⁵Prime numbers are integers divisible only by 1 and themselves.  The ancient Greeks knew that there were an infinite ("countable") number of prime numbers.  This is a play on words between the mathematical and normal definition of “prime”.
 
⁶The real numbers are “uncountable”.
 
⁷They are "uncountable".
 
⁸Real numbers include numbers beyond the integers and rational numbers (numbers which can be expressed as a fraction).
 
⁹Irrational numbers dominate the real numbers.  Georg Cantor’s “Continuum Hypothesis” postulated that the cardinality of the real numbers is the second largest infinity.  Later Kurt Godel proved that the "Continuum Hypothesis" is unprovable from the axioms of Set Theory plus the "Axiom of Choice".
 
¹⁰Georg Cantor is the father of transfinite mathematics and was an outcast in his time with mathematicians of the day discrediting his work.  Even Poincaré referred to Cantor's ideas as a "grave disease" infecting the discipline of mathematics.  His work, however, is now considered inspired and far beyond his time.
 
¹¹“Dense” is a mathematical term.  The rational numbers are "dense" on the real number line because between any two distinct numbers taken from the number line there is at least one rational number between them.
 
¹²Can you believe how complicated numbers are!?  Let's get back to this tomorrow!
 
 
 
©2008, Richard Puetter