Page:Cantortransfinite.djvu/115

[488] We see how pregnant and far-reaching these simple formulæ extended to powers are by the following example. If we denote the power of the linear continuum ${\displaystyle X}$ (that is, the totality ${\displaystyle X}$ of real numbers ${\displaystyle x}$ such that ${\displaystyle x\geq }$ and ${\displaystyle \leq 1}$) by ${\displaystyle {\mathfrak {o}}}$, we easily see that it may be represented by, amongst others, the formula:

where § 6 gives the meaning of ${\displaystyle \aleph _{0}}$. In fact, by (4), ${\displaystyle 2^{\aleph _{0}}}$ is the power of all representations

(where ${\displaystyle f(\nu )=0}$ or ${\displaystyle 1}$)

of the numbers ${\displaystyle x}$ in the binary system. If we pay attention to the fact that every number ${\displaystyle x}$ is only represented once, with the exception of the numbers ${\displaystyle x={\frac {2\nu +1}{2^{\mu }}}<1}$, which are represented twice over, we have, if we denote the "enumerable" totality of the latter by ${\displaystyle {s_{\nu }}}$,

${\displaystyle 2^{\aleph _{0}}=({\overline {\overline {\{s_{\nu }\},X}}})}$.

If we take away from ${\displaystyle X}$ any "enumerable" aggregate ${\displaystyle {t_{\nu }}}$ and denote the remainder by ${\displaystyle X_{1}}$, we have:

${\displaystyle X=(\{t_{\nu }\},X_{1})=(\{t_{2\nu -1}\},\{t_{2\nu }\},X_{1})}$,

${\displaystyle (\{s_{\nu }\},X)=(\{s_{\nu }\},\{t_{\nu }\},X_{1})}$,

${\displaystyle \{t_{2\nu -1}\}\sim \{s_{\nu }\},\quad \{t_{2\nu }\}\sim \{t_{\nu }\},\quad X_{1}\sim X_{1}}$;

so

${\displaystyle X\sim (\{s_{\nu }\},X)}$,