Board is 2 2 2 2 NORMAL Solitaire problem (no diagonal moves) ... ... ......x ....... ....... ... ... Class of final board is 20 Backward symmetry: None; reduction=1 Forward symmetry: Lateral (X-axis); reduction=2 USESYMMETRY FALSE Full board is 1073741823 7 Finishing pattern is 4096 0 ---------------------------------------------- Starting location 0 -2 Finishing location 3 1 xxx xxx xxxxxxx xxxxxxx xxxxxxx x.x xxx Solution catalog in #:(Longest sweep, final move) format: 2(7,DRURDRU), 3(7,URUR), 3(7,DR), 1(6,RDRURU), 4(6,UURDRU), 1(6,LDRU), 1(6,URU), 1(6,UUR), 4(6,DR), 10(5,DRDRU), 1(5,DDRUR), 5(5,RDDRU), 11(5,UURR), 18(5,LDRU), 35(5,DDRU), 104(5,URU), 35(5,UUR), 20(5,RDR), 27(5,DRR), 109(5,DR), 1(4,RURU), 1(4,RUUR), 4(4,UURR), 11(4,UUR), 17(4,DRR), 31(4,DR), The longest sweep possible for a 17 move solution is 7. Boards with this 7-sweep: .xx | ... .xx | ... ..x.x.. | x..x... .x..xx. | x.x.x.x ..x.x.. | .x...x. xx. | ... xx. | ... ->d0: 424035638 36348480 ->d1: 3 0 Pegs: 15 8 RC: 1 1 The longest finishing sweep possible for a 17 move solution is 7. Number of possible solution moves (including symmetry clones): 167 Number of solution sequences (including symmetry clones): 460 Number of distict solution sequences: 460 The longest shortest sweep was found to be 4 The number of possible final moves is 17 Elapsed time 0.0 minutes