Anselmian Ontological Argument

 ...Anselmian ontological argument ...John konnor...


1) exists an x, x exists in the understanding and x does not admit of more greatness, x=g.


2) for all x, if x exists in the understanding and x does not admit of more greatness then x exists actually


C) God exists actually


Let:


g=God

U!x=df=x exists in the understanding

@E!x=df= x exists actually

~Gx=df=x does not admit of more greatness


Proof:


1)(∃!x)U!x∧~Gx∧(x=g)

2)(∀x)(U!x∧~Gx)⊃@E!x

3)U!g∧~Gg.                          1 EI

4)(U!g∧~Gg)⊃@E!g.            2 UI

5)@E!g.                                  3,4 MP

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