Continuum

The nondenumerable set of Real Numbers, denoted . It satisfies

$\begin{displaymath} \aleph_0+C=C \end{displaymath}$

(1)

and

$\begin{displaymath} C^r=C, \end{displaymath}$

(2)

where $\aleph_0$ is Aleph-0. It is also true that

$\begin{displaymath} {\aleph_0}^{\aleph_0}=C. \end{displaymath}$

(3)

However,

$\begin{displaymath} C^C=F \end{displaymath}$

(4)

is a Set larger than the continuum. Paradoxically, there are exactly as many points

on a Line (or Line Segment) as in a Plane, a 3-D Space, or finite Hyperspace, since all these Sets can be put into a One-to-One correspondence with each other.

The Continuum Hypothesis, first proposed by Georg Cantor, holds that the Cardinal Number of the continuum is the same as that of Aleph-1. The surprising truth is that this proposition is Undecidable, since neither it nor its converse contradicts the tenets of Set Theory.