Board is 2 2 2 2 NORMAL Solitaire problem (no diagonal moves) ... ... .....x. ....... ....... ... ... Class of final board is 10 Backward symmetry: None; reduction=1 Forward symmetry: None; reduction=1 USESYMMETRY FALSE Full board is 1073741823 7 Finishing pattern is 2048 0 ---------------------------------------------- Starting location 2 1 Finishing location 2 1 xxx xxx xxxxx.x xxxxxxx xxxxxxx xxx xxx Solution catalog in #:(Longest sweep, final move) format: 4(8,RR), 4(8,DR), 19(7,UULDRRU), 4(7,UUR), 4(7,LUR), 4(7,RR), 26(7,DR), 9(6,DLDRRU), 54(6,DLDRUR), 27(6,ULURR), 10(6,LLURR), 4(6,RUR), 109(6,RR), 6(6,DR), 937(5,ULURR), 513(5,LLURR), 2(5,DDRU), 10(5,URU), 32(5,UUR), 71(5,RUR), 25(5,LUR), 177(5,RR), 281(5,DR), 2(4,DRRU), 1(4,LDRU), 23(4,UUR), 15(4,RUR), 12(4,LUR), 52(4,RR), 92(4,DR), The longest sweep possible for a 16 move solution is 8. Boards with this 8-sweep: xxx | xx. xxx | xx. ..x.x.. | ..x.x.. .x.xxx. | .x.x.x. ..x.x.. | ..x.x.. .xx | .x. .xx | .x. ->d0: 826754367 289752347 ->d1: 6 2 Pegs: 18 13 RC: 1 1 The longest finishing sweep possible for a 16 move solution is 7. Number of possible solution moves (including symmetry clones): 200 Number of solution sequences (including symmetry clones): 2529 Number of distict solution sequences: 2529 The longest shortest sweep was found to be 4 The number of possible final moves is 14 Elapsed time 0.0 minutes