User:Luciolemgruber/sandbox

Is possible prove a existence, self cause and perfection of God, if we use a naive set theory.

Let G, be a set formed by all subsets whith a property "possibilities of existence":

G{x e G| x belongs the all subsets whith a property "possibilities of existence"}

Theorem: first cause:

" If exists G, not is subset of none other set, by be selfcause, so, him is perfect and finit"

Let's proof by contradiction:

supose, G not a subset of none other set, but is imperfect. So, exist a element x, because of the imperfection of G, whith if join a G, let see G became a subset of another set. absurd(contradiction). And other way, let be G be a subset of set "I", but perfect, implies set "I" is a impossibilitie, because out of G, just only impossibilities.absurd(contradiction). Q.E.D.

post by

Lucio Marcos Lemgruber