What does ZFC do that Peano arithmetic can't do?
What does ZFC do that Peano arithmetic can't do?
More precisely, is there a "natural" statement (a statement that isn't deliberately constructed to be an example) that can be stated in PA, proved in ZFC, but not provable in PA?
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mo. abbr. please
Plz!
To be fair these abbreviations are ubiquitously used.
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