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${\displaystyle E_{\nu -1}}$ are not equivalent, and accordingly their cardinal numbers ${\displaystyle \mu ={\overline {\overline {E}}}_{\mu -1}}$ and ${\displaystyle \nu ={\overline {\overline {E}}}_{\nu -1}}$ are not equal.

Proof of B.—If of the two finite cardinal numbers ${\displaystyle \mu }$ and ${\displaystyle \nu }$ the first is the earlier and the second the later, then ${\displaystyle \mu <\nu }$. For consider the two aggregates ${\displaystyle M=E_{\mu -1}}$ and ${\displaystyle N=E_{\nu -1}}$; for them each of the two conditions in § 2 for ${\displaystyle {\overline {\overline {M}}}<{\overline {\overline {N}}}}$ is fulfilled. The condition (a) is fulfilled because, by theorem E, a part of ${\displaystyle M=E_{\mu -1}}$ can only have one of the cardinal numbers ${\displaystyle 1,2,3,...,\mu -1}$, and therefore, by theorem A, cannot be equivalent to the aggregate ${\displaystyle N=E_{\mu -1}}$. The condition (b) is fulfilled because ${\displaystyle M}$ itself is a part of ${\displaystyle N}$.

Proof of C.— Let ${\displaystyle {\mathfrak {a}}}$ be a cardinal number which is less than ${\displaystyle \nu +1}$. Because of the condition (b) of §2, there is a part of ${\displaystyle E_{\nu }}$ with the cardinal number ${\displaystyle {\mathfrak {a}}}$. By theorem E, a part of ${\displaystyle E_{\nu }}$ can only have one of the cardinal numbers ${\displaystyle 1,2,3,...,\nu }$. Thus ${\displaystyle {\mathfrak {a}}}$ is equal to one of the cardinal numbers ${\displaystyle 1,2,3,...,\nu }$. By theorem B, none of these is greater than ${\displaystyle \nu }$. Consequently there is no cardinal number ${\displaystyle {\mathfrak {a}}}$ which is less than ${\displaystyle \nu +1}$ and greater than ${\displaystyle \nu }$.

Of importance for what follows is the following theorem:

F. If ${\displaystyle K}$ is any aggregate of different finite cardinal numbers, there is one, ${\displaystyle \kappa _{1}}$, amongst them which is smaller than the rest, and therefore the smallest of all.

[492] Proof—The aggregate ${\displaystyle K}$ either contains