Hi :-) Cool adjacent LL double-flip :-)
The other alg u mention flips 2 opposite edges so it's not the same. However taking (MU)(MU)(MU2)(M'U)(M'U)(M'U2) and shifting it cyclically to (MU)(MU2)(M'U)(M'U)(M'U2)(MU) and conjugating with M2 we get : (M'U)(MU2)(M'U)(M'U)(M'U2)(MU)M2 . Indeed the same as what u found, so it's not really "new" :D Cheers! -Per > --- In [email protected], "kovacic81" <[EMAIL PROTECTED]> wrote: > > Hello Again > > > > Here's an alg thats kind of fun. > I don't know if its already been found, or even if it's any good. > > But I "discovered" it on my own, trying to find a good ROUX ending for > this case. > > (M'U) (MU2) > (M'U) (M'U) (M'U2) > (M U) M2 > > > (M'U) is fast > > I think that this alg is faster than > [(M'U)(M'U)(M'd2)]2 = (MU)(MU)(MU2)(M'U)(M'U)(M'U2) > > > jason k > Yahoo! Groups Links <*> To visit your group on the web, go to: http://groups.yahoo.com/group/speedsolvingrubikscube/ <*> 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/
