--- In FairfieldLife@yahoogroups.com, "Nelson" <[EMAIL PROTECTED]> wrote: > > --- In FairfieldLife@yahoogroups.com, "authfriend" <jstein@> wrote: > > > > --- In FairfieldLife@yahoogroups.com, "Nelson" <nelsonriddle2001@> > > wrote: > > > > > > --- In FairfieldLife@yahoogroups.com, "authfriend" <jstein@> wrote: > > > > > > > > --- In FairfieldLife@yahoogroups.com, "Nelson" > > <nelsonriddle2001@> > > > > wrote: > > > > > > > > > > --- In FairfieldLife@yahoogroups.com, "authfriend" <jstein@> > > wrote: > > > > > > > > > > > > --- In FairfieldLife@yahoogroups.com, "Irmeli Mattsson" > > > > > > <Irmeli.Mattsson@> wrote: > > > > > > <snip> > > > > > > > Although I think that also God makes mistakes and learns > > > > > > > through and from them. > > > > > > > > > > > > Question on this one point: By what standard can it > > > > > > be said that God makes mistakes? > > > > > > > > > > > ++++ I recall reading somewhere that he said that he was > > > > > evolving which would mean not so much making mistakes as doing > > > > > things differently. N. > > > > > > > > Evolving toward what? > > > > > > > ++++ He didn't say but I would guess that being at level, he would > > > be pretty well qualified to decide. > > > > If he recognizes that ultimate toward which he is evolving, > > such that he can see that something he did was a mistake, > > or that he needed to do things differently, what is the > > nature of that ultimate? > > > > If what we're calling God is not the ultimate, what is? > > > +++Whatever you are seeking, possibly the same. > Maybe the ultimate is upgraded from time to time-infinity plus one > you know. >
Nyah, Aleph[i+1]. Aleph[0] is the level of infinitity that the countable numbers possess: 1, 2, 3, .... . It is the smallest infinity. Aleph[1] is the level of infinity found when you combine all the numbers of the countable infinity in every possible combination, also called the Power Set P(Aleph[0]). Aleph[i+1] is the Power Set: P(Aleph[i]). Aleph[i+2] is the Power Set of the Power Set: P(P(Aleph[i])). Aleph[R] is the level of infinitity of the real number line. It may or may not fit in with the series given above, but by Cantor's Transfinite Arithmatic, P(Aleph[0]) < P(Aleph[R]) < P(P(Aleph[R])). Cantor, by the way, died in an insane asylum, but his Transfinite Arithmatic is considered one of the most important advances in mathematics in history. ------------------------ Yahoo! Groups Sponsor --------------------~--> Join modern day disciples reach the disfigured and poor with hope and healing http://us.click.yahoo.com/lMct6A/Vp3LAA/i1hLAA/UlWolB/TM --------------------------------------------------------------------~-> To subscribe, send a message to: [EMAIL PROTECTED] Or go to: http://groups.yahoo.com/group/FairfieldLife/ and click 'Join This Group!' Yahoo! Groups Links <*> To visit your group on the web, go to: http://groups.yahoo.com/group/FairfieldLife/ <*> To unsubscribe from this group, send an email to: [EMAIL PROTECTED] <*> Your use of Yahoo! Groups is subject to: http://docs.yahoo.com/info/terms/