$Chutes and Ladders#Ainigma8#none#01101101101101101101100011000011000011000011000110110110110110110110000001100001100001100000011011011011011011011000110000110000110000110001101101101101101101100000011000011000011000000110110110110110110110001100001100001100001100011011011011011011011000000110000110000110000001101101101101101101100011000011000011000011000110110110110110110110000001100001100001100000011011011011011011011000110000110000110000110001101101101101101101100000011000011000011000000110110110110110110110001100001100001100001100011011011011011011011000000110000110000110000001101101101101101101100011000011000011000011000110110110110110110110000001100001100001100000011011011011011011011000110000110000110000110001101101101101101101100|5^36,564!6^756,468,4,1,0,2!6^756,324,4,1,0,2!6^756,252,4,1,0,2!6^756,180,4,1,0,2!6^756,36,4,1,0,2!6^36,36,4,1,0,0!6^36,108,4,1,0,0!6^36,180,4,1,0,0!6^36,324,4,1,0,0!6^36,396,4,1,0,0!6^36,468,4,1,0,0!2^108,516,0,1!2^108,492,0,1!2^300,492,0,1!2^300,516,0,1!2^492,492,0,1!2^492,516,0,1!2^684,492,0,1!2^684,516,0,1!2^732,444,0,-1!2^732,420,0,-1!2^684,372,0,1!2^684,348,0,1!2^588,372,0,-1!2^492,348,0,1!2^492,372,0,1!2^396,372,0,-1!2^396,348,0,-1!2^300,348,0,1!2^300,372,0,1!2^204,372,0,-1!2^204,348,0,-1!2^108,348,0,1!2^108,372,0,1!2^60,420,0,-1!2^60,444,0,-1!2^252,420,0,-1!2^252,444,0,-1!2^348,420,0,1!2^348,444,0,1!2^588,492,0,-1!2^588,516,0,-1!2^396,492,0,-1!2^396,516,0,-1!2^204,492,0,-1!2^204,516,0,-1!2^636,444,0,1!2^636,420,0,1!2^156,444,0,1!2^156,420,0,1!2^540,420,0,-1!2^540,444,0,-1!2^444,444,0,1!2^444,420,0,1!2^444,300,0,-1!2^444,276,0,-1!2^348,276,0,-1!2^348,300,0,-1!2^348,156,0,1!2^348,132,0,1!2^444,132,0,1!2^444,156,0,1!2^588,348,0,-1!2^588,228,0,1!2^588,204,0,1!2^588,84,0,1!2^588,60,0,1!2^684,228,0,-1!2^684,204,0,-1!2^684,84,0,-1!2^684,60,0,-1!2^492,228,0,-1!2^492,204,0,-1!2^492,84,0,-1!2^492,60,0,-1!2^396,60,0,1!2^396,84,0,1!2^396,204,0,1!2^396,228,0,1!2^300,228,0,-1!2^300,204,0,-1!2^300,84,0,-1!2^300,60,0,-1!2^204,60,0,1!2^204,84,0,1!2^204,204,0,1!2^204,228,0,1!2^108,228,0,-1!2^108,204,0,-1!2^108,84,0,-1!2^108,60,0,-1!2^252,132,0,-1!2^252,156,0,-1!2^156,132,0,1!2^156,156,0,1!2^60,132,0,-1!2^60,156,0,-1!2^540,132,0,-1!2^540,156,0,-1!2^540,276,0,1!2^540,300,0,1!2^636,276,0,-1!2^636,300,0,-1!2^732,276,0,1!2^732,300,0,1!2^252,276,0,1!2^252,300,0,1!2^156,276,0,-1!2^156,300,0,-1!2^60,276,0,1!2^60,300,0,1!11^396,564,396,36!11^60,36,732,36!6^36,252,4,1,0,0!7^204,492,3!7^396,492,3!7^396,540,3!7^204,540,3!7^108,468,1!7^108,516,1!7^300,468,1!7^300,516,1!7^492,468,1!7^492,516,1!7^588,492,3!7^588,540,3!7^684,468,1!7^684,516,1!7^732,420,3!7^732,468,3!7^636,396,1!7^636,444,1!7^540,420,3!7^540,468,3!7^444,396,1!7^444,444,1!7^348,396,1!7^348,444,1!7^252,420,3!7^252,468,3!7^156,396,1!7^156,444,1!7^60,420,3!7^60,468,3!7^108,372,1!7^108,324,1!7^204,348,3!7^204,396,3!7^300,324,1!7^300,372,1!7^396,348,3!7^396,396,3!7^492,324,1!7^492,372,1!7^588,348,3!7^588,396,3!7^684,324,1!7^684,372,1!7^732,300,1!7^732,252,1!7^636,324,3!7^636,276,3!7^540,300,1!7^540,252,1!7^444,276,3!7^444,324,3!7^348,324,3!7^348,276,3!7^252,300,1!7^252,252,1!7^156,276,3!7^156,324,3!7^60,300,1!7^60,252,1!7^108,252,3!7^108,204,3!7^204,180,1!7^204,228,1!7^300,204,3!7^300,252,3!7^396,180,1!7^396,228,1!7^492,204,3!7^492,252,3!7^588,180,1!7^588,228,1!7^684,204,3!7^684,252,3!2^732,156,0,-1!2^732,132,0,-1!2^636,132,0,1!2^636,156,0,1!7^732,180,3!7^540,180,3!7^252,180,3!7^60,180,3!7^60,132,3!7^252,132,3!7^540,132,3!7^732,132,3!7^636,108,1!7^636,156,1!7^444,108,1!7^444,156,1!7^348,108,1!7^348,156,1!7^156,108,1!7^156,156,1!7^108,60,3!7^108,108,3!7^204,36,1!7^204,84,1!7^300,60,3!7^300,108,3!7^396,36,1!7^396,84,1!7^492,60,3!7^492,108,3!7^588,36,1!7^588,84,1!7^684,60,3!7^684,108,3#