[ Help | Earliest Comments | Latest Comments ][ List All Subjects of Discussion | Create New Subject of Discussion ][ List Latest Comments Only For Pages | Games | Rated Pages | Rated Games | Subjects of Discussion ]Rated Comments for a Single ItemLater ⇩Reverse Order⇧ Earlier ABC Chess. A variant with 8 armies of pieces generated by combining 1, 2 or 3 simpler pieces. (8x8, Cells: 64) [All Comments] [Add Comment or Rating]Shi Ji wrote on 2010-12-10 UTCGood ★★★★I think the rules should allow players set up positions of major pieces freely. Let players find out best setup for each army. Tutti-Frutti has a ABC combination of rook bishop and knight, which is much too powerful. Armies in ABC chess are less powerful than that of tutti-frutti, which is better for cwda design. Players can define more armies with balanced power for ABC chess. Daniel wrote on 2007-05-09 UTCExcellent ★★★★★Cavebear Stroud is one of my teachers, and you know he taught me everything i needed to know about chess. Mr Stroud has always been for me in the good time and the bad times. Now let me tell you people this variant is quite awesome, even though it might sound very sketchy. Mr Stroud was born in California, and moved to Canada, and then Switzerland, and then Japan. One day he asked his friend to buy him a 9000-yen chessboard. But instead his friend bought him a chessboard that's worth 90000-yen chessboard. This chessboard was made out of the finest Japanese wood. Mr Stroud has thought of many new and awesome variants with simpler army building strategies. He's a man of his genius. Mr Stroud is one of my business teachers, and write now we're doing many database assignments. I think that Mr Stroud is one of the best teachers in the world. I had a lot of other comments on this page, and he told me to delete them, but i couldn't because I’m not a member. P.S Mr Stroud is rated 2200, which is quite awesome. Your Student Daniel Rozin Anonymous wrote on 2006-11-16 UTCGood ★★★★Is F2 (FnA) or (FA)? 3 comments displayedLater ⇩Reverse Order⇧ EarlierPermalink to the exact comments currently displayed.