Math Philosopher's Definiton of Ungettability
Kurt
Gödel was a logician and philosppher who proved mathematically that any
sufficiently complex system will contain axioms which can nether be
proved nor disproved. Furthermore, if you prove an axiom there will be
others that are not provable. ... Very much a definition of
ungettability -- which seems to appear in numerous ways (whether you
know math or not). Strangely, his real contention was that there IS an ultimate truth underlying everything. Find his books through our Ungettable Stuff Store.
Gödel was a logician and philosppher who proved mathematically that any
sufficiently complex system will contain axioms which can nether be
proved nor disproved. Furthermore, if you prove an axiom there will be
others that are not provable. ... Very much a definition of
ungettability -- which seems to appear in numerous ways (whether you
know math or not). Strangely, his real contention was that there IS an ultimate truth underlying everything. Find his books through our Ungettable Stuff Store.
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Ungettablog-too
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