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number of ${\displaystyle N_{1}}$ is equal to one of the preceding numbers ${\displaystyle 1,2,3,...,\nu -1}$.

Proof of D. Suppose that the aggregate ${\displaystyle (M,e)}$ is equivalent to one of its parts which we will call ${\displaystyle N}$. Then two cases, both of which lead to a contradiction, are to be distinguished:

(a) The aggregate ${\displaystyle N}$ contains ${\displaystyle e}$ as element; let ${\displaystyle N=(M_{1},e)}$; then ${\displaystyle M_{1}}$ is a part of ${\displaystyle M}$ because ${\displaystyle N}$ is a part of ${\displaystyle (M,e)}$. As we saw in § 1, the law of correspondence of the two equivalent aggregates ${\displaystyle (M,e)}$ and ${\displaystyle (M_{1},e)}$ can be so modified that the element ${\displaystyle e}$ of the one corresponds to the same element ${\displaystyle e}$ of the other; by that, then, ${\displaystyle M}$ and ${\displaystyle M_{1}}$ are referred reciprocally and univocally to one another. But this contradicts the supposition that ${\displaystyle M}$ is not equivalent to its part ${\displaystyle M_{1}}$.

(b) The part ${\displaystyle N}$ of ${\displaystyle (M,e)}$ does not contain ${\displaystyle e}$ as element, so that ${\displaystyle N}$ is either ${\displaystyle M}$ or a part of ${\displaystyle M}$. In the law of correspondence between ${\displaystyle (M,e)}$ and ${\displaystyle N}$, which lies at the basis of our supposition, to the element ${\displaystyle e}$ of the former let the element ${\displaystyle f}$ of the latter correspond. Let ${\displaystyle N=(M_{1},f)}$; then the aggregate ${\displaystyle M}$ is put in a reciprocally univocal relation with ${\displaystyle M_{1}}$. But ${\displaystyle M_{1}}$ is a part of ${\displaystyle N}$ and hence of ${\displaystyle M}$. So here too ${\displaystyle M}$ would be equivalent to one of its parts, and this is contrary to the supposition.

Proof of E.—We will suppose the correctness of the theorem up to a certain ${\displaystyle \nu }$ and then conclude its validity for the number ${\displaystyle \nu +1}$ which immediately follows, in the following manner:—We start from the aggregate ${\displaystyle E_{\nu }=(e_{0},e_{1},...,e_{\nu })}$ as an aggregate