hijack from The proving of the GoldBach conjecture by using the Zermelo Fraenkel axioms

[jnana]

colin leslie dean proves

 

ZFC is inconsistent:thus ALL mathematics falls into meaninglessness

The Foundations of Mathematics end in meaningless jibbering nonsense

A)

Mathematics ends in contradiction-6 proofs

http://gamahucherpress.yellowgum.com/wp-content/uploads/MATHEMATICS.pdf

 

and

https://www.scribd.com/document/40697621/Mathematics-Ends-in-Meaninglessness-ie-self-contradiction

Proof 5

ZFC is inconsistent:thus ALL mathematics falls into meaninglessness

https://brilliant.org/wiki/zfc/

ZFC. ZFC, or Zermelo-Fraenkel set theory, is an axiomatic system used to formally define set theory (and thus mathematics in general).

but

ZFC is inconsistent:thus ALL mathematics falls into meaninglessness

proof

it all began with Russells paradox

and to get around the consequences of it

Modern set theory just outlaws/blocks/bans this Russells paradox by the introduction of the ad hoc axiom the Axiom schema of specification ie axiom of separation

which wiki says

http://en.wikipedia.org/wiki/Zermelo%E2%80%93Fraenkel_set_theory

"The restriction to z is necessary to avoid Russell's paradox and its variants. "

http://en.wikipedia.org/wiki/Zermelo%E2%80%93Fraenkel_set_theory

"Axiom schema of specification (also called the axiom schema of separation or of restricted comprehension): If z is a set, and \phi! is any property which may characterize the elements x of z, then there is a subset y of z containing those x in z which satisfy the property. The "restriction" to z is necessary to avoid Russell's paradox and its variant"

now Russell's paradox is a famous example of an impredicative construction, namely the set of all sets which do not contain themselves

the axiom of separation is used to outlaw/block/ban impredicative statements like Russells paradox

but this axiom of separation is itself impredicative

http://math.stanford.edu/~feferman/papers/predicativity.pdf

"in ZF the fundamental source of impredicativity is the seperation axiom which asserts that for each well formed function p(x)of the language ZF the existence of the set x : x } a ^ p(x) for any set a Since the formular p may contain quantifiers ranging over the supposed "totality" of all the sets this is impredicativity according to the VCP this impredicativity is given teeth by the axiom of infinity"

thus

ZFC

thus it outlaws/blocks/bans itself

thus ZFC contradicts itself and 1)ZFC is inconsistent 2) that the paradoxes it was meant to avoid are now still valid and thus mathematics is inconsistent Now we have paradoxes like

Russells paradox

Banach-Tarskin paradox

Burili-Forti paradox

with the axiom of seperation banning itself

ZFC is thus inconsistent

and thus

ALL mathematics is just rubbish meaningless jibbering nonsense

 

[swansont]

!

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