Proof for the Existence of God

A Logical-Metaphysical Proof for the Existence of God

The following is the first step in a metaphysical argument for the existence of God. It proves that there is at least one unconditioned reality in the set of all reality. Steps II through IV (which are not given here) prove that an unconditioned reality has to be unrestricted in its power, and that an unrestricted reality can only be one (and only one). This means that there must be one (and only one) unrestricted and unconditioned reality in the set of all reality. Step V proves that this one unrestricted, unconditioned reality must be the continuous Creator of all else that is. Readers wishing to see steps II through V may want to read NPEG Chapter Three. Those who would prefer a lecture presentation will want to consult lectures of PID number 6 through number 11 -- www.physicsindialogue.org.