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Matheology § 186
Posted:
Jan 8, 2013 1:43 AM


Axiom 1: It is possible to choose every subset of a given set and to choose a first element of this subset, unless the chosen subset is empty.
Axiom 2: It is possible to select a subset of natural numbers with cardinality larger than 10 and sum of elements less than 10.
What is the epistemological difference of these axioms which are equally true?
Regards, WM



