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It is well known that theThe cardinality of the set of all root paths in the infinite complete binary treetree is equal to the cardinality of the Continuum. The same holds true for k-ary trees for any finite k. But what is the case for k infinite?
It is well known that the cardinality of the set of all paths in the infinite complete binary tree is equal to the cardinality of the Continuum. The same holds true for k-ary trees for any finite k. But what is the case for k infinite?
The cardinality of the set of all root paths in the infinite complete binary tree is equal to the cardinality of the Continuum. The same holds true for k-ary trees for any finite k. But what is the case for k infinite?
It is well known that the cardinality of the set of all paths in the infinite complete binary tree is equal to the cardinality of the Continuum. The same holds true for nk-ary trees for any finite nk. But what is the case when n tends towards infinityfor k infinite?
It is well known that the cardinality of the set of all paths in the infinite complete binary tree is equal to the cardinality of the Continuum. The same holds true for n-ary trees for any finite n. But what is the case when n tends towards infinity?
It is well known that the cardinality of the set of all paths in the infinite complete binary tree is equal to the cardinality of the Continuum. The same holds true for k-ary trees for any finite k. But what is the case for k infinite?
