[Event "Fastchess Tournament"]
[Site "?"]
[Date "2026.05.19"]
[Round "4349"]
[White "PZChessBot-dev"]
[Black "PZChessBot-base"]
[Result "0-1"]
[SetUp "1"]
[FEN "r1bq1b1r/pppp1kp1/8/3n4/1n4pN/1P1B4/P1P2P1P/RNBQK2R w KQ - 3 5"]
[GameDuration "00:01:27"]
[GameStartTime "2026-05-19T23:02:29 +0000"]
[GameEndTime "2026-05-19T23:03:56 +0000"]
[PlyCount "1024"]
[Termination "abandoned"]
[TimeControl "-"]

5. Ng6 {-6.03/10 0.065s, n=25967, sd=13} Nxd3+ {+6.42/11 0.143s, n=56427, sd=19}
6. Qxd3 {-5.85/12 0.178s, n=69861, sd=23} Rh5 {+6.09/12 0.125s, n=65824, sd=23}
7. Nxf8 {-5.96/11 0.056s, n=29626, sd=14} Qxf8 {+5.50/11 0.063s, n=42524, sd=20}
8. Be3 {-5.94/10 0.071s, n=21421, sd=14} Qb4+ {+6.42/11 0.068s, n=20749, sd=15}
9. Nd2 {-5.42/10 0.070s, n=23520, sd=15} Nf6 {+6.14/10 0.102s, n=29979, sd=16}
10. a3 {-4.58/10 0.048s, n=21094, sd=14} Qa5 {+5.83/10 0.061s, n=29314, sd=17}
11. O-O-O {-5.86/11 0.123s, n=42269, sd=18}
Qxa3+ {+5.30/11 0.081s, n=30770, sd=18}
12. Kb1 {-4.40/12 0.050s, n=29919, sd=18} Qa6 {+5.58/10 0.033s, n=25559, sd=18}
13. Qxa6 {-4.64/11 0.047s, n=26553, sd=18} bxa6 {+4.21/9 0.031s, n=20167, sd=18}
14. f3 {-4.43/11 0.028s, n=23231, sd=19} Rh3 {+4.55/11 0.028s, n=24672, sd=15}
15. Bf4 {-3.26/10 0.052s, n=24117, sd=17} Bb7 {+3.63/11 0.059s, n=46358, sd=16}
16. Rhf1 {-4.47/12 0.041s, n=38190, sd=20} gxf3 {+3.36/9 0.031s, n=23405, sd=17}
17. Bg3 {-2.84/11 0.022s, n=21357, sd=18} d6 {+3.37/10 0.032s, n=22215, sd=16}
18. Nxf3 {-3.66/10 0.109s, n=44765, sd=22} Rh5 {+3.30/11 0.056s, n=36173, sd=14}
19. Kb2 {-3.15/10 0.036s, n=29817, sd=17} Kg8 {+3.57/10 0.042s, n=20020, sd=13}
20. Nd4 {-2.91/10 0.041s, n=20385, sd=15} Re8 {+3.09/11 0.041s, n=36932, sd=16}
21. Rfe1 {-2.80/12 0.074s, n=57442, sd=17} Ne4 {+2.83/11 0.081s, n=47672, sd=16}
22. Re3 {-2.36/11 0.056s, n=26613, sd=14} c5 {+3.23/11 0.118s, n=72053, sd=18}
23. Ne2 {-3.41/12 0.111s, n=48567, sd=16} d5 {+4.12/12 0.070s, n=50711, sd=26}
24. Nf4 {-4.56/10 0.052s, n=33967, sd=16} Rf5 {+4.64/13 0.090s, n=34663, sd=25}
25. Ra1 {-3.83/11 0.035s, n=25851, sd=17} Ref8 {+3.05/9 0.058s, n=39716, sd=14}
26. Ng6 {-3.57/12 0.055s, n=38462, sd=18} Re8 {+3.52/10 0.052s, n=38844, sd=22}
27. Nf4 {-3.41/11 0.134s, n=77006, sd=27} Kf7 {+4.21/11 0.026s, n=23466, sd=19}
28. Ra5 {-3.47/12 0.021s, n=20098, sd=25} d4 {+3.51/11 0.124s, n=50597, sd=23}
29. Re1 {-4.04/12 0.125s, n=73323, sd=22} Nxg3 {+3.54/11 0.029s, n=20125, sd=20}
30. Rxe8 {-3.73/12 0.031s, n=25170, sd=19}
Kxe8 {+3.40/14 0.021s, n=22038, sd=24}
31. hxg3 {-3.57/13 0.026s, n=25305, sd=20} Bc8 {+3.89/14 0.019s, n=20509, sd=19}
32. c4 {-3.18/12 0.047s, n=36777, sd=21} dxc3+ {+4.02/15 0.066s, n=34008, sd=25}
33. Kxc3 {-3.62/13 0.048s, n=25017, sd=25} Kd7 {+3.64/12 0.021s, n=24460, sd=28}
34. Kc4 {-4.05/13 0.019s, n=24459, sd=26} Kc6 {+3.90/14 0.042s, n=24340, sd=29}
35. b4 {-4.13/12 0.017s, n=21519, sd=35} cxb4 {+3.85/14 0.026s, n=21707, sd=26}
36. Rxf5 {-4.12/13 0.024s, n=23590, sd=30}
Bxf5 {+3.65/14 0.040s, n=32784, sd=49}
37. Kxb4 {-3.82/16 0.052s, n=48194, sd=43} Kd6 {+3.62/15 0.032s, n=21085, sd=38}
38. Ka5 {-3.77/11 0.016s, n=22974, sd=33} Bc8 {+3.62/17 0.016s, n=22990, sd=39}
39. Nh5 {-3.74/14 0.032s, n=30525, sd=35} g5 {+3.62/17 0.029s, n=27874, sd=38}
40. Nf6 {-3.64/17 0.019s, n=24598, sd=33} Ke5 {+3.62/20 0.019s, n=24223, sd=37}
41. Nh7 {-3.64/21 0.032s, n=26200, sd=31} Kf5 {+3.62/22 0.016s, n=20904, sd=35}
42. Nxg5 {-3.64/22 0.014s, n=20582, sd=30}
Kxg5 {+3.59/13 0.019s, n=29153, sd=27} 43. Kb4 {-3.64/22 0.013s, n=21660, sd=32}
Bg4 {+3.62/17 0.016s, n=26584, sd=33} 44. Ka5 {-3.64/21 0.025s, n=22404, sd=35}
Be2 {+3.61/18 0.025s, n=22383, sd=31} 45. Ka4 {-3.64/20 0.025s, n=23020, sd=36}
Bf3 {+3.61/17 0.015s, n=20398, sd=32} 46. Ka5 {-3.64/21 0.011s, n=21387, sd=28}
Bb7 {+3.61/20 0.013s, n=21803, sd=33} 47. Ka4 {-3.64/19 0.027s, n=20485, sd=32}
Bc8 {+3.60/17 0.014s, n=22628, sd=34} 48. Kb4 {-3.64/24 0.029s, n=23943, sd=42}
Bd7 {+3.59/16 0.038s, n=28253, sd=30} 49. g4 {-3.64/20 0.019s, n=20824, sd=33}
Be6 {+3.58/16 0.018s, n=21338, sd=36} 50. Ka3 {-3.64/22 0.022s, n=21436, sd=25}
Bg8 {+3.54/14 0.026s, n=20387, sd=26} 51. Kb4 {-3.64/22 0.013s, n=20804, sd=32}
Ba2 {+3.54/18 0.021s, n=21036, sd=27} 52. Ka3 {-3.64/24 0.052s, n=22993, sd=41}
Bg8 {+3.54/20 0.020s, n=21901, sd=37} 53. Kb4 {-3.64/27 0.024s, n=22697, sd=41}
Ba2 {+3.54/21 0.033s, n=25235, sd=34} 54. Ka3 {-3.64/25 0.022s, n=22845, sd=41}
Bd5 {+3.54/22 0.022s, n=25585, sd=38} 55. Ka4 {-3.64/21 0.033s, n=24768, sd=33}
Be6 {+3.54/23 0.015s, n=24577, sd=35} 56. Ka3 {-3.64/24 0.012s, n=20058, sd=35}
Bf7 {+3.54/22 0.017s, n=20458, sd=31} 57. Kb4 {-3.64/24 0.014s, n=20888, sd=33}
Bd5 {+3.54/21 0.026s, n=22914, sd=42} 58. Ka3 {-3.64/27 0.014s, n=23590, sd=35}
Bf7 {+3.54/24 0.028s, n=28330, sd=40} 59. Kb4 {-3.64/26 0.012s, n=20607, sd=33}
Bd5 {+3.54/22 0.025s, n=21136, sd=40} 60. Ka3 {-3.64/22 0.014s, n=23185, sd=48}
Bb7 {+3.54/21 0.024s, n=20561, sd=32} 61. Kb3 {-3.64/21 0.024s, n=20581, sd=46}
Bf3 {+3.54/22 0.022s, n=20979, sd=37} 62. Ka3 {-3.64/24 0.015s, n=24186, sd=32}
Bd5 {+3.54/23 0.062s, n=24162, sd=32} 63. Ka4 {-3.64/24 0.032s, n=22590, sd=33}
Bc4 {+3.54/22 0.014s, n=23604, sd=37} 64. Kb4 {-3.64/23 0.016s, n=21737, sd=41}
Be2 {+3.54/23 0.026s, n=24041, sd=35} 65. Kb3 {-3.64/24 0.026s, n=21318, sd=36}
Bd3 {+3.54/21 0.037s, n=21622, sd=37} 66. Ka4 {-3.64/24 0.030s, n=20646, sd=29}
Be2 {+3.54/22 0.029s, n=21858, sd=31} 67. Kb3 {-3.64/25 0.014s, n=22299, sd=38}
Bd3 {+3.54/22 0.020s, n=27861, sd=47} 68. Ka4 {-3.64/26 0.040s, n=24640, sd=39}
Be4 {+3.54/22 0.029s, n=22395, sd=47} 69. Kb4 {-3.64/21 0.016s, n=21397, sd=36}
Bc6 {+3.54/22 0.013s, n=20719, sd=39} 70. Ka3 {-3.64/24 0.025s, n=23722, sd=33}
Kf6 {+3.54/23 0.015s, n=20014, sd=32} 71. Kb4 {-3.64/24 0.024s, n=20548, sd=29}
Bd5 {+3.54/24 0.034s, n=22436, sd=34} 72. Ka4 {-3.64/22 0.034s, n=20815, sd=25}
Be6 {+3.54/24 0.013s, n=20015, sd=35} 73. Ka3 {-3.64/22 0.026s, n=20823, sd=39}
Bc4 {+3.54/24 0.029s, n=21171, sd=33} 74. Ka4 {-3.64/26 0.013s, n=21135, sd=33}
Be2 {+3.54/24 0.020s, n=24317, sd=33} 75. Ka3 {-3.64/25 0.019s, n=23773, sd=29}
Kg6 {+3.54/22 0.024s, n=22314, sd=48} 76. Ka4 {-3.64/24 0.035s, n=21128, sd=47}
Bf3 {+3.54/22 0.017s, n=21319, sd=46} 77. Ka3 {-3.64/25 0.025s, n=21209, sd=35}
Bd5 {+3.54/26 0.016s, n=23983, sd=33} 78. Kb4 {-3.64/24 0.015s, n=21391, sd=36}
Kf6 {+3.54/24 0.024s, n=20179, sd=28} 79. Ka4 {-3.64/25 0.031s, n=23425, sd=35}
Be6 {+3.54/23 0.015s, n=20604, sd=39} 80. Ka3 {-3.64/25 0.016s, n=23616, sd=30}
Bc4 {+3.54/25 0.013s, n=20373, sd=32} 81. Ka4 {-3.64/25 0.015s, n=21058, sd=35}
Be2 {+3.54/25 0.035s, n=27811, sd=36} 82. Ka3 {-3.64/26 0.034s, n=25018, sd=35}
Kg6 {+3.54/23 0.018s, n=24431, sd=32} 83. Ka4 {-3.64/26 0.027s, n=20544, sd=31}
Bf3 {+3.54/23 0.034s, n=21354, sd=32} 84. Ka3 {-3.64/25 0.059s, n=21221, sd=31}
Bd5 {+3.54/23 0.016s, n=20759, sd=30} 85. Kb4 {-3.64/26 0.026s, n=23066, sd=29}
Bb7 {+3.54/23 0.023s, n=23278, sd=28} 86. Ka3 {-3.64/25 0.032s, n=22921, sd=27}
Bf3 {+3.54/24 0.028s, n=23382, sd=26} 87. Ka2 {-3.64/23 0.030s, n=20830, sd=25}
Kg5 {+3.54/24 0.041s, n=26603, sd=24} 88. Kb3 {-3.64/24 0.026s, n=20807, sd=24}
Bd1+ {+3.54/23 0.035s, n=22732, sd=22} 89. Ka3 {-3.64/22 0.073s, n=37417, sd=32}
Kf6 {+3.50/19 0.024s, n=30865, sd=20} 90. Kb4 {-3.43/20 0.062s, n=54915, sd=19}
Bc2 {+3.50/18 0.029s, n=21171, sd=18} 91. Ka3 {-3.60/15 0.029s, n=20850, sd=17}
Be4 {+3.50/16 0.021s, n=21463, sd=16} 92. Kb3 {-2.57/15 0.068s, n=52315, sd=23}
Bf3 {+2.40/14 0.041s, n=56663, sd=14} 93. Ka3 {-2.52/11 0.045s, n=40190, sd=22}
Bg2 {+2.37/12 0.038s, n=21836, sd=13} 94. Kb4 {-1.55/12 0.048s, n=32822, sd=16}
Bc6 {+2.58/11 0.029s, n=24611, sd=18} 95. Ka3 {-2.66/13 0.039s, n=21866, sd=23}
Kg5 {+2.71/16 0.020s, n=23116, sd=19} 96. Kb4 {-2.66/18 0.020s, n=25335, sd=28}
Be8 {+2.71/20 0.034s, n=27819, sd=31} 97. Kb3 {-2.66/18 0.023s, n=20733, sd=26}
Kxg4 {+2.71/19 0.048s, n=20549, sd=27} 98. Ka3 {-2.66/19 0.015s, n=20485, sd=31}
Bc6 {+2.71/21 0.029s, n=21555, sd=41} 99. Kb3 {-2.66/21 0.014s, n=23380, sd=31}
Kf3 {+2.71/21 0.029s, n=22187, sd=35} 100. Kb4 {-2.66/22 0.036s, n=23310, sd=36}
Ke2 {+2.71/22 0.051s, n=24907, sd=46} 101. Kb3 {-2.66/20 0.015s, n=20490, sd=37}
Ke1 {+2.71/22 0.024s, n=23857, sd=40} 102. Kb4 {-2.66/18 0.015s, n=21687, sd=45}
Bb5 {+2.71/23 0.030s, n=26302, sd=34} 103. Kb3 {-2.66/21 0.058s, n=24063, sd=43}
Be8 {+2.71/23 0.044s, n=23578, sd=29} 104. Ka2 {-2.66/22 0.019s, n=22886, sd=41}
Ke2 {+2.71/23 0.015s, n=21136, sd=45} 105. Kb3 {-2.66/23 0.016s, n=20300, sd=41}
Kf2 {+2.71/25 0.036s, n=23407, sd=38} 106. Kb4 {-2.66/26 0.019s, n=23320, sd=35}
Bb5 {+2.71/24 0.022s, n=21507, sd=32} 107. Kb3 {-2.66/26 0.025s, n=24549, sd=37}
Ke1 {+2.71/25 0.033s, n=24046, sd=32} 108. Ka2 {-2.66/22 0.022s, n=22181, sd=41}
Bc6 {+2.71/26 0.021s, n=23987, sd=40} 109. Kb3 {-2.66/25 0.031s, n=23318, sd=32}
Be8 {+2.71/26 0.015s, n=24524, sd=38} 110. Ka2 {-2.66/26 0.030s, n=23903, sd=38}
Ke2 {+2.71/26 0.013s, n=20033, sd=36} 111. Kb3 {-2.66/25 0.017s, n=21481, sd=33}
Kf2 {+2.71/26 0.015s, n=21262, sd=34} 112. Kb4 {-2.66/27 0.037s, n=23468, sd=36}
Bb5 {+2.71/24 0.015s, n=21323, sd=33} 113. Kb3 {-2.66/27 0.036s, n=27561, sd=33}
Ke1 {+2.71/26 0.033s, n=24543, sd=33} 114. Ka2 {-2.66/24 0.032s, n=22510, sd=41}
Bc6 {+2.71/23 0.016s, n=20939, sd=29} 115. Kb3 {-2.66/24 0.017s, n=21597, sd=33}
Kf2 {+2.71/25 0.022s, n=22382, sd=39} 116. Kb4 {-2.66/22 0.018s, n=23307, sd=33}
Kf3 {+2.71/25 0.031s, n=20246, sd=33} 117. Ka5 {-2.66/21 0.025s, n=20200, sd=40}
Bb5 {+2.71/25 0.025s, n=23409, sd=32} 118. Kb4 {-2.66/24 0.018s, n=21558, sd=46}
Ke2 {+2.71/23 0.034s, n=24235, sd=37} 119. Ka3 {-2.66/24 0.044s, n=20692, sd=32}
Bc6 {+2.71/23 0.015s, n=24950, sd=35} 120. Ka2 {-2.66/25 0.019s, n=22616, sd=30}
Bb5 {+2.71/20 0.021s, n=20136, sd=43} 121. Ka3 {-2.66/25 0.022s, n=20051, sd=30}
Bc6 {+2.71/23 0.017s, n=23977, sd=50} 122. Ka2 {-2.66/21 0.031s, n=20549, sd=33}
Bd7 {+2.71/19 0.016s, n=21041, sd=42} 123. Ka3 {-2.66/22 0.018s, n=22740, sd=50}
Be6 {+2.71/21 0.017s, n=22593, sd=33} 124. Kb2 {-2.66/21 0.036s, n=20559, sd=48}
Ke1 {+2.71/24 0.033s, n=22952, sd=35} 125. Ka3 {-2.66/22 0.019s, n=22826, sd=46}
Ke2 {+2.71/23 0.038s, n=23005, sd=41} 126. Kb2 {-2.66/24 0.039s, n=23155, sd=44}
Ke1 {+2.71/25 0.025s, n=22942, sd=43} 127. Ka3 {-2.66/25 0.015s, n=21209, sd=42}
Bd7 {+2.71/20 0.024s, n=23560, sd=40} 128. Kb2 {-2.66/22 0.016s, n=22629, sd=38}
Ke2 {+2.71/21 0.015s, n=20337, sd=31} 129. Ka3 {-2.66/25 0.021s, n=22697, sd=35}
Bg4 {+2.71/22 0.024s, n=24985, sd=35} 130. Ka4 {-2.66/18 0.038s, n=22216, sd=36}
Be6 {+2.71/20 0.038s, n=23318, sd=34} 131. Ka3 {-2.66/23 0.032s, n=22939, sd=34}
Kf2 {+2.71/22 0.028s, n=24174, sd=31} 132. Kb4 {-2.66/22 0.015s, n=20156, sd=32}
Bd7 {+2.71/21 0.017s, n=20169, sd=31} 133. Ka5 {-2.66/22 0.015s, n=20592, sd=30}
Bc8 {+2.71/23 0.017s, n=22632, sd=29} 134. Ka4 {-2.66/20 0.032s, n=20164, sd=28}
Bd7+ {+2.71/24 0.029s, n=25078, sd=27}
135. Ka5 {-2.66/23 0.042s, n=28275, sd=26} Bc8 {+2.71/19 0.031s, n=23312, sd=25}
136. Ka4 {-2.66/23 0.023s, n=29002, sd=24} Be6 {+2.71/18 0.016s, n=23046, sd=23}
137. Ka5 {-2.66/20 0.039s, n=24164, sd=22} Bc4 {+2.71/19 0.023s, n=22341, sd=21}
138. Kb4 {-2.62/20 0.050s, n=58648, sd=20} Be2 {+2.58/19 0.058s, n=43886, sd=19}
139. Ka4 {-2.52/18 0.098s, n=84351, sd=18}
Ke3 {+4.70/16 0.234s, n=180786, sd=43}
140. Kb3 {-2.52/15 0.037s, n=23943, sd=16} Bb5 {+4.74/20 0.022s, n=22304, sd=36}
141. Kb4 {-1.96/14 0.100s, n=81976, sd=14} Ke4 {+4.59/19 0.036s, n=21215, sd=33}
142. Kb3 {-1.70/12 0.029s, n=30580, sd=12} a5 {+4.45/20 0.034s, n=21131, sd=32}
143. Ka2 {-4.28/9 0.044s, n=20019, sd=19} Kd5 {+4.38/22 0.044s, n=28956, sd=33}
144. Ka1 {-3.55/18 0.025s, n=28214, sd=29} Kd6 {+4.31/20 0.020s, n=24075, sd=30}
145. Kb2 {-3.24/13 0.020s, n=20898, sd=34} Kc6 {+4.31/22 0.016s, n=21357, sd=31}
146. Ka3 {-3.24/17 0.018s, n=22761, sd=30} Kd5 {+4.31/23 0.015s, n=20706, sd=27}
147. Ka2 {-3.24/21 0.019s, n=23853, sd=30} Bc6 {+4.31/23 0.015s, n=20290, sd=27}
148. Kb2 {-3.24/22 0.020s, n=21033, sd=43} Kd6 {+4.31/24 0.017s, n=23493, sd=30}
149. Ka3 {-3.24/23 0.018s, n=22869, sd=28} Kc7 {+4.31/25 0.017s, n=22800, sd=34}
150. Kb3 {-3.24/23 0.023s, n=23166, sd=31} Kb7 {+4.31/24 0.016s, n=22165, sd=35}
151. Ka3 {-3.24/24 0.022s, n=23120, sd=35} Kb8 {+4.31/26 0.016s, n=21398, sd=39}
152. Kb3 {-3.24/25 0.021s, n=23645, sd=35} Kc8 {+4.31/27 0.015s, n=20342, sd=31}
153. Ka2 {-3.24/25 0.016s, n=21978, sd=33} Bb5 {+4.31/26 0.021s, n=23597, sd=34}
154. Ka3 {-3.24/24 0.018s, n=21716, sd=35} Bc6 {+4.31/27 0.021s, n=22542, sd=31}
155. Kb3 {-3.24/26 0.017s, n=22082, sd=37} Kb8 {+4.19/27 0.044s, n=45284, sd=38}
156. Kb2 {-3.24/27 0.017s, n=22777, sd=33} Kb7 {+4.19/25 0.026s, n=24027, sd=38}
157. Ka2 {-3.24/26 0.019s, n=23379, sd=32} Ba4 {+4.19/25 0.022s, n=20355, sd=35}
158. Ka3 {-3.24/27 0.018s, n=23246, sd=33} Bb5 {+4.19/25 0.046s, n=37055, sd=38}
159. Ka2 {-3.24/28 0.018s, n=22675, sd=33} Kb8 {+4.19/26 0.044s, n=21769, sd=32}
160. Kb3 {-3.24/27 0.024s, n=20555, sd=33} Bd7 {+4.19/26 0.018s, n=21463, sd=35}
161. Ka3 {-3.24/25 0.037s, n=20645, sd=36} Kb7 {+4.19/26 0.017s, n=20449, sd=35}
162. Ka2 {-3.24/25 0.024s, n=22022, sd=35} Ba4 {+4.19/27 0.028s, n=21271, sd=31}
163. Ka3 {-3.24/29 0.038s, n=22268, sd=39} Bb5 {+4.19/28 0.058s, n=20152, sd=29}
164. Ka2 {-3.24/28 0.033s, n=21727, sd=37} Bd7 {+4.19/28 0.037s, n=24645, sd=35}
165. Kb3 {-3.24/26 0.040s, n=20769, sd=40} Kb8 {+4.19/25 0.035s, n=21500, sd=30}
166. Ka3 {-3.24/25 0.030s, n=20040, sd=35} Kb7 {+4.19/26 0.024s, n=22629, sd=32}
167. Ka2 {-3.24/27 0.027s, n=21225, sd=33} Be8 {+4.19/25 0.026s, n=22644, sd=35}
168. Kb2 {-3.24/27 0.036s, n=21984, sd=39} Bc6 {+4.19/25 0.029s, n=23508, sd=32}
169. Ka2 {-3.24/26 0.021s, n=21946, sd=34} Kb8 {+4.09/26 0.038s, n=31765, sd=30}
170. Ka3 {-3.24/26 0.034s, n=20705, sd=29} Kc7 {+4.09/25 0.021s, n=23381, sd=34}
171. Kb3 {-3.24/25 0.033s, n=20666, sd=33} Kc8 {+4.09/25 0.026s, n=21740, sd=30}
172. Ka2 {-3.24/26 0.023s, n=22923, sd=37}
Kb8 {+2.85/27 0.128s, n=105829, sd=41}
173. Ka3 {-3.24/27 0.057s, n=22087, sd=37} Bb5 {+2.85/23 0.035s, n=21457, sd=39}
174. Kb3 {-3.24/27 0.019s, n=20305, sd=33} Kc7 {+2.85/21 0.017s, n=20234, sd=35}
175. Ka2 {-3.24/27 0.021s, n=22921, sd=32} Kd8 {+2.85/23 0.026s, n=22350, sd=35}
176. Ka3 {-3.24/26 0.029s, n=20412, sd=34} Be8 {+2.85/25 0.046s, n=22145, sd=33}
177. Ka2 {-3.24/25 0.038s, n=22722, sd=32} Kc7 {+2.85/27 0.040s, n=22852, sd=31}
178. Kb2 {-3.24/25 0.020s, n=20324, sd=30} Kb8 {+2.85/27 0.022s, n=22219, sd=29}
179. Ka2 {-3.24/25 0.036s, n=21435, sd=28} Ba4 {+2.85/26 0.052s, n=24486, sd=27}
180. Kb2 {-3.24/25 0.037s, n=26555, sd=26} Kc8 {+2.82/24 0.063s, n=33966, sd=25}
181. Ka3 {-2.25/24 0.162s, n=110331, sd=47}
Be8 {+2.71/18 0.044s, n=21439, sd=23} 182. Ka2 {-2.25/21 0.040s, n=21767, sd=34}
Kc7 {+2.82/19 0.108s, n=79001, sd=21} 183. Kb3 {-2.21/24 0.095s, n=40243, sd=37}
Bf7+ {+2.80/18 0.021s, n=24109, sd=19}
184. Ka4 {-2.21/16 0.030s, n=27983, sd=34} Kb6 {+2.53/14 0.074s, n=44767, sd=23}
185. Ka3 {-2.17/20 0.041s, n=32251, sd=34} Kb5 {+3.31/15 0.072s, n=25241, sd=26}
186. Kb2 {-2.16/13 0.034s, n=25352, sd=23} Bg8 {+3.31/12 0.065s, n=50564, sd=33}
187. Kc1 {-2.16/16 0.027s, n=21026, sd=21} Kb4 {+3.30/13 0.028s, n=24019, sd=23}
188. Kb2 {-1.69/12 0.035s, n=30300, sd=16} a4 {+2.88/11 0.038s, n=37168, sd=27}
189. Kb1 {-2.17/11 0.063s, n=38481, sd=28} Kb3 {+2.88/12 0.029s, n=35884, sd=33}
190. Ka1 {-2.55/11 0.071s, n=38948, sd=30} Bc4 {+2.88/14 0.025s, n=31405, sd=23}
191. Kb1 {-2.55/11 0.062s, n=28538, sd=40} Bf7 {+2.88/17 0.044s, n=23656, sd=25}
192. Ka1 {-2.55/12 0.032s, n=20193, sd=32} Ka3 {+2.88/20 0.031s, n=20113, sd=25}
193. Kb1 {-2.55/15 0.063s, n=34017, sd=42} Kb4 {+2.96/22 0.061s, n=21933, sd=35}
194. Ka1 {-2.58/14 0.020s, n=20081, sd=38} Bc4 {+2.96/20 0.033s, n=26434, sd=49}
195. Kb1 {-2.58/17 0.063s, n=22203, sd=38} Kb3 {+2.96/20 0.042s, n=20546, sd=41}
196. Ka1 {-2.58/17 0.034s, n=20279, sd=33} Bf7 {+2.96/18 0.040s, n=20821, sd=48}
197. Kb1 {-2.58/21 0.059s, n=26276, sd=43} Bg8 {+3.07/20 0.032s, n=24757, sd=51}
198. Ka1 {-2.52/17 0.047s, n=22144, sd=40} Be6 {+2.99/18 0.019s, n=23210, sd=39}
199. Kb1 {-2.52/10 0.035s, n=27243, sd=28} Bf7 {+2.99/17 0.021s, n=23449, sd=43}
200. Ka1 {-2.52/14 0.060s, n=30856, sd=30} Bd5 {+2.99/19 0.024s, n=24293, sd=45}
201. Kb1 {-2.52/15 0.030s, n=23302, sd=32} Ka3 {+2.91/17 0.109s, n=50187, sd=45}
202. Ka1 {-2.52/16 0.040s, n=25013, sd=42} Bg8 {+2.91/15 0.025s, n=32484, sd=42}
203. Kb1 {-2.52/17 0.035s, n=25701, sd=42}
Ba2+ {+2.91/14 0.051s, n=26702, sd=69}
204. Ka1 {-2.52/18 0.041s, n=30147, sd=46} Be6 {+4.71/17 0.018s, n=20204, sd=47}
205. Kb1 {-2.63/17 0.017s, n=21340, sd=46} Kb3 {+2.96/16 0.035s, n=27693, sd=51}
206. Ka1 {-2.63/20 0.040s, n=35390, sd=65} Bf7 {+3.42/16 0.025s, n=20876, sd=71}
207. Kb1 {-2.63/16 0.020s, n=24858, sd=68} Bc4 {+3.02/13 0.053s, n=46269, sd=55}
208. Ka1 {-2.63/17 0.040s, n=24195, sd=56} Bg8 {+2.91/16 0.047s, n=27526, sd=46}
209. Kb1 {-2.71/15 0.022s, n=20600, sd=42} Be6 {+3.49/13 0.052s, n=37779, sd=49}
210. Ka1 {-2.68/23 0.080s, n=60657, sd=54} Bc4 {+2.99/13 0.027s, n=31519, sd=65}
211. Kb1 {-2.71/17 0.031s, n=20312, sd=60} Ka3 {+3.26/13 0.028s, n=22342, sd=53}
212. Ka1 {-2.76/17 0.050s, n=27691, sd=54} Bf7 {+3.68/11 0.056s, n=30127, sd=51}
213. Kb1 {-2.73/19 0.055s, n=26221, sd=80}
Ba2+ {+4.37/11 0.145s, n=115040, sd=59}
214. Ka1 {-2.73/17 0.038s, n=20522, sd=70} Be6 {+2.31/15 0.034s, n=35845, sd=57}
215. Kb1 {-2.77/18 0.047s, n=23611, sd=62} Bf7 {+2.16/12 0.169s, n=88084, sd=67}
216. Ka1 {-2.77/23 0.066s, n=30922, sd=66} Bc4 {+2.16/14 0.094s, n=46119, sd=73}
217. Kb1 {-2.77/18 0.020s, n=21962, sd=88}
Bd3+ {+2.16/12 0.032s, n=22112, sd=37}
218. Ka1 {-2.78/15 0.044s, n=25784, sd=62} Bf1 {+2.16/14 0.089s, n=59707, sd=41}
219. Kb1 {-3.37/18 0.051s, n=52289, sd=62} Bh3 {+2.16/15 0.069s, n=38083, sd=49}
220. Ka1 {-3.15/15 0.038s, n=24660, sd=42} Bg4 {+2.16/14 0.043s, n=21425, sd=37}
221. Kb1 {-3.79/19 0.037s, n=37512, sd=50} Kb3 {+2.16/14 0.025s, n=24590, sd=67}
222. Ka1 {-3.40/15 0.021s, n=20062, sd=38} Be6 {+2.16/15 0.064s, n=27929, sd=49}
223. Kb1 {-3.44/19 0.045s, n=22694, sd=54} Bd5 {+2.16/12 0.043s, n=37781, sd=35}
224. Ka1 {-3.40/20 0.037s, n=22530, sd=50} Ka3 {+2.16/15 0.044s, n=42937, sd=29}
225. Kb1 {-3.72/16 0.031s, n=30763, sd=36} Bg8 {+2.16/14 0.040s, n=26566, sd=27}
226. Ka1 {-3.15/17 0.042s, n=37503, sd=42} Bc4 {+4.75/14 0.077s, n=70395, sd=69}
227. Kb1 {-2.51/11 0.047s, n=24510, sd=50} Bf7 {+2.29/15 0.102s, n=68406, sd=47}
228. Ka1 {-2.68/11 0.023s, n=22194, sd=24} Bg8 {+2.42/14 0.039s, n=23223, sd=45}
229. Kb1 {-2.71/13 0.016s, n=20408, sd=24} Bc4 {+1.85/15 0.044s, n=40497, sd=63}
230. Ka1 {-2.69/15 0.062s, n=31289, sd=50} Bf1 {+1.82/10 0.022s, n=21738, sd=41}
231. Kb1 {-2.55/12 0.037s, n=33349, sd=48} Bg2 {+1.92/13 0.048s, n=24960, sd=47}
232. Ka1 {-2.55/18 0.047s, n=26996, sd=60} Bb7 {+1.84/14 0.031s, n=33812, sd=53}
233. Kb1 {-2.49/16 0.057s, n=44794, sd=64}
Be4+ {+1.97/12 0.033s, n=33793, sd=59}
234. Ka1 {-3.25/16 0.038s, n=38144, sd=84} Bd5 {+1.90/16 0.064s, n=50038, sd=47}
235. Kb1 {-2.68/14 0.027s, n=29727, sd=32} a6 {+1.90/15 0.021s, n=21491, sd=47}
236. Ka1 {-2.68/20 0.019s, n=21672, sd=76} Bf7 {+1.90/15 0.031s, n=26350, sd=57}
237. Kb1 {-2.68/20 0.029s, n=20632, sd=54} Be6 {+1.90/15 0.018s, n=22330, sd=49}
238. Ka1 {-2.68/19 0.022s, n=22355, sd=66} Bh3 {+1.90/17 0.016s, n=20288, sd=65}
239. Kb1 {-2.68/19 0.023s, n=22074, sd=64}
Bf1 {+1.94/19 0.163s, n=102237, sd=139}
240. Ka1 {-2.68/20 0.027s, n=24614, sd=80} Kb3 {+1.94/17 0.022s, n=21056, sd=81}
241. Kb1 {-2.68/18 0.016s, n=21302, sd=80} Bg2 {+1.94/16 0.021s, n=24363, sd=71}
242. Ka1 {-2.68/19 0.020s, n=21382, sd=66} Ba8 {+1.94/18 0.028s, n=20655, sd=59}
243. Kb1 {-2.68/22 0.033s, n=30452, sd=72} Bd5 {+1.99/14 0.028s, n=30010, sd=71}
244. Ka1 {-2.68/19 0.038s, n=22043, sd=78} Ka3 {+2.05/15 0.026s, n=26426, sd=77}
245. Kb1 {-2.68/22 0.015s, n=20866, sd=80} Bf7 {+2.05/16 0.044s, n=20358, sd=51}
246. Ka1 {-2.68/24 0.034s, n=21522, sd=80} Be6 {+2.30/19 0.035s, n=23471, sd=79}
247. Kb1 {-2.68/22 0.016s, n=20529, sd=76} Bd7 {+2.09/12 0.031s, n=35009, sd=51}
248. Ka1 {-2.68/23 0.016s, n=20639, sd=60} Be6 {+2.67/16 0.047s, n=27508, sd=57}
249. Kb1 {-2.68/22 0.022s, n=21686, sd=74} Bf7 {+3.54/16 0.025s, n=26059, sd=47}
250. Ka1 {-2.68/20 0.060s, n=21428, sd=72} Bb3 {+2.16/12 0.036s, n=20051, sd=75}
251. Kb1 {-2.68/20 0.021s, n=20181, sd=60} Bd1 {+2.26/14 0.024s, n=23109, sd=45}
252. Ka1 {-2.68/22 0.033s, n=22058, sd=58}
Bg4 {+2.60/16 0.039s, n=25113, sd=107}
253. Kb1 {-2.68/22 0.022s, n=21388, sd=62} Kb3 {+2.60/15 0.047s, n=20188, sd=67}
254. Ka1 {-2.68/23 0.029s, n=21849, sd=62} Bf3 {+2.46/17 0.034s, n=32435, sd=71}
255. Kb1 {-4.26/22 0.031s, n=20906, sd=62} Bh1 {+2.50/17 0.027s, n=22284, sd=69}
256. Ka1 {-2.68/15 0.016s, n=21162, sd=48} Bc6 {+2.50/17 0.047s, n=27323, sd=79}
257. Kb1 {-2.68/18 0.021s, n=20307, sd=56} Bf3 {+2.50/18 0.037s, n=26621, sd=55}
258. Ka1 {-2.68/24 0.026s, n=22345, sd=66} Bd5 {+4.11/18 0.047s, n=25331, sd=55}
259. Kb1 {-2.68/19 0.042s, n=21211, sd=54} Ka3 {+2.63/15 0.042s, n=20794, sd=41}
260. Ka1 {-2.75/21 0.034s, n=23736, sd=74} Bc6 {+2.50/16 0.033s, n=21510, sd=43}
261. Kb1 {-3.07/20 0.029s, n=26600, sd=54}
Be8 {+4.36/17 0.075s, n=50309, sd=155}
262. Ka1 {-4.63/19 0.037s, n=22933, sd=48} Bh5 {+4.11/14 0.028s, n=22923, sd=59}
263. Kb1 {-2.79/21 0.021s, n=23263, sd=62} Bf3 {+2.47/15 0.036s, n=30792, sd=75}
264. Ka1 {-2.79/20 0.028s, n=24863, sd=54} Bh1 {+2.47/15 0.028s, n=21336, sd=41}
265. Kb1 {-2.79/20 0.029s, n=22564, sd=108}
Kb3 {+2.62/16 0.030s, n=28697, sd=99}
266. Ka1 {-2.79/18 0.040s, n=31033, sd=100}
Ba8 {+2.71/14 0.024s, n=28139, sd=87} 267. Kb1 {-2.96/14 0.025s, n=33937, sd=66}
Bd5 {+2.86/15 0.020s, n=21500, sd=53} 268. Ka1 {-2.72/13 0.053s, n=44781, sd=52}
Bc6 {+2.83/16 0.038s, n=27678, sd=59} 269. Kb1 {-2.16/12 0.048s, n=36270, sd=34}
Ba8 {+2.76/14 0.056s, n=43369, sd=43} 270. Ka1 {-2.30/13 0.033s, n=22983, sd=50}
Bd5 {+3.09/12 0.019s, n=20990, sd=45} 271. Kb1 {-3.72/14 0.028s, n=24074, sd=70}
Bf3 {+1.89/13 0.135s, n=101965, sd=65}
272. Ka1 {-3.45/16 0.056s, n=28390, sd=50}
Bg2 {+2.33/14 0.117s, n=100162, sd=65}
273. Kb1 {-3.52/17 0.032s, n=20215, sd=66} Bc6 {+2.43/12 0.045s, n=24835, sd=59}
274. Ka1 {-3.04/15 0.058s, n=26863, sd=68} Bb7 {+2.44/13 0.022s, n=22882, sd=41}
275. Kb1 {-3.04/18 0.025s, n=25922, sd=64} Ba8 {+2.48/11 0.103s, n=74091, sd=74}
276. Ka1 {-3.04/17 0.024s, n=20792, sd=72} Bb7 {+2.43/13 0.033s, n=23654, sd=61}
277. Kb1 {-3.02/14 0.033s, n=24363, sd=40} Bc6 {+2.51/15 0.054s, n=25623, sd=57}
278. Ka1 {-3.02/16 0.053s, n=23574, sd=56} Bf3 {+2.49/12 0.025s, n=24527, sd=47}
279. Kb1 {-3.72/14 0.037s, n=22772, sd=64} Bg2 {+2.51/14 0.078s, n=33578, sd=43}
280. Ka1 {-3.14/16 0.085s, n=48948, sd=58} a3 {+2.56/14 0.050s, n=20410, sd=37}
281. Kb1 {-1.92/11 0.031s, n=33980, sd=18} Bc6 {+3.44/15 0.026s, n=27789, sd=53}
282. Ka1 {-3.06/15 0.022s, n=23034, sd=48} Bf3 {+3.41/20 0.040s, n=27289, sd=49}
283. Kb1 {-1.94/15 0.093s, n=59292, sd=33} Be2 {+2.85/17 0.090s, n=57446, sd=51}
284. Ka1 {-1.94/15 0.033s, n=28504, sd=38} Kc2 {+3.44/15 0.035s, n=21091, sd=41}
285. Ka2 {-1.94/14 0.044s, n=29236, sd=42} Kc1 {+2.97/13 0.041s, n=24183, sd=31}
286. Ka1 {-1.94/15 0.044s, n=21973, sd=50} Bd1 {+2.85/16 0.022s, n=24233, sd=41}
287. Ka2 {-1.94/17 0.062s, n=26431, sd=62} Bh5 {+2.85/16 0.054s, n=23077, sd=41}
288. Ka1 {-2.04/18 0.045s, n=21348, sd=62} Kc2 {+3.89/18 0.082s, n=52560, sd=63}
289. Ka2 {-2.04/15 0.029s, n=24267, sd=52} Bg6 {+3.11/15 0.037s, n=31775, sd=77}
290. Ka1 {-2.04/18 0.030s, n=20997, sd=42} Bd3 {+3.44/17 0.026s, n=26708, sd=63}
291. Ka2 {-2.04/17 0.023s, n=24368, sd=51}
Bc4+ {+3.17/14 0.023s, n=25759, sd=59}
292. Ka1 {-2.09/19 0.019s, n=22841, sd=52} Kb3 {+4.11/17 0.039s, n=20109, sd=55}
293. Kb1 {-2.09/20 0.020s, n=21264, sd=58} Bg8 {+3.65/16 0.052s, n=20911, sd=65}
294. Ka1 {-2.70/20 0.017s, n=21125, sd=52} Bc4 {+3.90/16 0.044s, n=21101, sd=45}
295. Kb1 {-2.20/18 0.050s, n=25416, sd=46} Be2 {+4.36/15 0.035s, n=27365, sd=47}
296. Ka1 {-2.20/18 0.054s, n=22214, sd=58} Bh5 {+4.26/15 0.062s, n=21681, sd=57}
297. Kb1 {-2.22/21 0.031s, n=28351, sd=62}
Bg6+ {+3.90/17 0.029s, n=21044, sd=77}
298. Ka1 {-2.60/17 0.026s, n=21360, sd=57} Kc2 {+4.36/15 0.089s, n=27181, sd=49}
299. Ka2 {-2.30/20 0.023s, n=22476, sd=52}
Bf7+ {+3.05/14 0.066s, n=40300, sd=61}
300. Ka1 {-2.30/20 0.029s, n=21243, sd=61} Kc3 {+4.36/20 0.063s, n=26588, sd=57}
301. Kb1 {-3.27/16 0.024s, n=23576, sd=40} Bg8 {+3.23/14 0.021s, n=20192, sd=57}
302. Ka1 {-2.48/15 0.023s, n=21708, sd=58} Bc4 {+4.37/18 0.035s, n=25336, sd=51}
303. Kb1 {-2.48/14 0.035s, n=23790, sd=44} Kb3 {+3.23/15 0.033s, n=27617, sd=55}
304. Ka1 {-2.48/16 0.066s, n=32366, sd=48} Be2 {+2.85/20 0.045s, n=41197, sd=52}
305. Kb1 {-2.48/17 0.040s, n=20998, sd=52}
Bd3+ {+2.87/17 0.036s, n=24480, sd=49}
306. Ka1 {-2.48/18 0.037s, n=20916, sd=50} Kc2 {+4.36/18 0.028s, n=20579, sd=49}
307. Ka2 {-3.70/21 0.058s, n=48367, sd=48} Be2 {+4.09/16 0.023s, n=21276, sd=49}
308. Ka1 {-2.59/13 0.025s, n=21978, sd=37} Bh5 {+4.36/16 0.035s, n=31009, sd=45}
309. Ka2 {-2.59/14 0.063s, n=32725, sd=44} Kc1 {+2.85/18 0.044s, n=30374, sd=49}
310. Ka1 {-2.59/17 0.025s, n=20659, sd=42} Bg6 {+2.84/19 0.081s, n=43325, sd=63}
311. Ka2 {-2.59/19 0.064s, n=26979, sd=64} Bh7 {+2.81/16 0.069s, n=49227, sd=51}
312. Ka1 {-2.57/20 0.094s, n=57190, sd=68} Bf5 {+2.90/16 0.057s, n=23330, sd=59}
313. Ka2 {-2.57/16 0.036s, n=21062, sd=68} Bc2 {+2.81/16 0.023s, n=20076, sd=35}
314. Ka1 {-2.01/16 0.088s, n=61668, sd=40} Bh7 {+2.81/14 0.022s, n=20323, sd=33}
315. Ka2 {-2.01/16 0.116s, n=86727, sd=48} Bd3 {+2.81/16 0.114s, n=62721, sd=55}
316. Ka1 {-2.01/15 0.050s, n=31622, sd=30} Bf1 {+2.81/15 0.034s, n=30228, sd=45}
317. Ka2 {-2.47/15 0.042s, n=22510, sd=28} Be2 {+2.81/13 0.048s, n=20037, sd=31}
318. Ka1 {-1.45/13 0.121s, n=48336, sd=26} Kc2 {+1.86/14 0.097s, n=63448, sd=43}
319. Ka2 {-1.45/11 0.084s, n=26074, sd=22} Bh5 {+1.78/11 0.076s, n=45772, sd=28}
320. Ka1 {-1.45/15 0.084s, n=61876, sd=36} Kd2 {+2.04/13 0.049s, n=26971, sd=33}
321. Kb1 {-2.37/15 0.030s, n=20969, sd=56} Bf7 {+2.06/12 0.048s, n=23547, sd=19}
322. Ka1 {-1.96/15 0.059s, n=33476, sd=46} Kd3 {+2.53/11 0.045s, n=25711, sd=17}
323. Kb1 {-1.82/13 0.031s, n=28365, sd=18} Bc4 {+1.70/10 0.056s, n=30651, sd=15}
324. Ka1 {-1.51/13 0.082s, n=39989, sd=28} Kd2 {+2.67/11 0.098s, n=30960, sd=46}
325. Kb1 {-1.80/13 0.099s, n=36037, sd=21} Be2 {+1.56/12 0.097s, n=64788, sd=39}
326. Ka2 {-1.80/11 0.060s, n=40674, sd=42}
Bc4+ {+1.66/11 0.034s, n=20476, sd=29}
327. Ka1 {-1.80/14 0.045s, n=27974, sd=46} Bf7 {+2.27/12 0.046s, n=29635, sd=37}
328. Kb1 {-1.80/14 0.078s, n=25896, sd=34} Bc4 {+1.73/12 0.078s, n=32015, sd=21}
329. Ka1 {-1.80/16 0.063s, n=44581, sd=28} a2 {+2.67/12 0.093s, n=50658, sd=71}
330. Kb2 {-1.60/11 0.032s, n=31440, sd=28} Kd3 {+1.86/12 0.049s, n=24794, sd=31}
331. Ka1 {-1.60/13 0.150s, n=54015, sd=26} Be6 {+2.67/16 0.031s, n=28530, sd=41}
332. Kb2 {-1.60/15 0.086s, n=41059, sd=40}
a1=Q+ {+1.99/14 0.035s, n=25832, sd=35}
333. Kxa1 {-1.67/11 0.044s, n=20825, sd=32}
Kc3 {+2.13/15 0.020s, n=21752, sd=37} 334. Kb1 {-1.67/13 0.038s, n=27314, sd=32}
Bc4 {+2.82/16 0.018s, n=20286, sd=49} 335. Ka1 {-1.67/19 0.055s, n=27964, sd=42}
Kb3 {+2.19/15 0.033s, n=24845, sd=41} 336. Kb1 {-2.98/16 0.055s, n=30612, sd=77}
Bf7 {+2.15/15 0.065s, n=30567, sd=43} 337. Ka1 {-1.67/18 0.022s, n=25688, sd=58}
Bd5 {+3.06/16 0.035s, n=22853, sd=65} 338. Kb1 {-1.67/18 0.048s, n=24366, sd=54}
Bg8 {+2.67/13 0.041s, n=42554, sd=99} 339. Ka1 {-1.67/20 0.047s, n=23056, sd=78}
Bc4 {+3.60/15 0.028s, n=20011, sd=49} 340. Kb1 {-1.67/18 0.037s, n=27772, sd=62}
Bd3+ {+3.40/15 0.022s, n=21896, sd=55}
341. Ka1 {-1.67/20 0.049s, n=22333, sd=60} Be2 {+2.70/14 0.057s, n=34267, sd=49}
342. Kb1 {-1.67/22 0.052s, n=21552, sd=59} Bd1 {+2.81/15 0.041s, n=20419, sd=49}
343. Ka1 {-2.35/22 0.033s, n=20411, sd=68} Kc2 {+2.89/18 0.023s, n=21490, sd=59}
344. Ka2 {-1.98/21 0.055s, n=24219, sd=79} Bf3 {+2.82/19 0.028s, n=23014, sd=49}
345. Ka1 {-3.40/23 0.044s, n=20931, sd=52} Be2 {+2.84/18 0.055s, n=26026, sd=69}
346. Ka2 {-2.32/17 0.053s, n=23970, sd=45} Bf1 {+2.84/16 0.025s, n=21261, sd=49}
347. Ka1 {-2.26/20 0.026s, n=21511, sd=65} Kb3 {+2.84/20 0.056s, n=23088, sd=53}
348. Kb1 {-1.98/22 0.056s, n=22570, sd=56} Bg2 {+3.40/19 0.041s, n=23702, sd=53}
349. Ka1 {-2.07/18 0.056s, n=24218, sd=58} Kc2 {+3.07/17 0.023s, n=21389, sd=68}
350. Ka2 {-2.07/21 0.041s, n=20980, sd=61} Kc1 {+2.84/20 0.054s, n=28287, sd=57}
351. Ka1 {-2.07/22 0.051s, n=20633, sd=58} Bh3 {+2.84/18 0.041s, n=25322, sd=53}
352. Ka2 {-2.07/23 0.042s, n=21887, sd=63}
Be6+ {+2.84/19 0.029s, n=20663, sd=61}
353. Ka1 {-2.07/24 0.020s, n=20684, sd=61} Bg4 {+2.80/21 0.028s, n=22084, sd=60}
354. Ka2 {-2.07/23 0.032s, n=22377, sd=59} Be2 {+2.94/18 0.032s, n=22968, sd=58}
355. Ka1 {-2.07/22 0.035s, n=21329, sd=57} Bd1 {+3.18/18 0.052s, n=29527, sd=56}
356. Ka2 {-2.18/24 0.030s, n=22327, sd=55} Kc2 {+3.18/18 0.051s, n=22152, sd=53}
357. Ka1 {-2.31/22 0.024s, n=20535, sd=53} Bf3 {+2.84/22 0.094s, n=68347, sd=63}
358. Ka2 {-2.18/21 0.028s, n=20736, sd=51} Be2 {+3.00/18 0.083s, n=26211, sd=53}
359. Ka1 {-2.18/21 0.039s, n=22305, sd=50} Bd3 {+2.99/17 0.091s, n=23901, sd=48}
360. Ka2 {-2.95/22 0.029s, n=22202, sd=47} Bf1 {+2.99/16 0.024s, n=21156, sd=45}
361. Ka1 {-2.18/19 0.044s, n=21921, sd=45} Bg2 {+3.15/18 0.038s, n=21864, sd=44}
362. Ka2 {-2.18/20 0.028s, n=22579, sd=43} Bf3 {+2.25/17 0.088s, n=42624, sd=45}
363. Ka1 {-2.18/20 0.030s, n=22428, sd=41} Bg4 {+3.22/15 0.045s, n=36022, sd=49}
364. Ka2 {-2.18/20 0.041s, n=20666, sd=39} Be2 {+2.26/15 0.080s, n=52125, sd=45}
365. Ka1 {-2.18/21 0.069s, n=26670, sd=37} Bf1 {+3.29/15 0.053s, n=28234, sd=37}
366. Ka2 {-2.18/18 0.033s, n=20492, sd=35} Bg2 {+1.81/15 0.072s, n=39648, sd=49}
367. Ka1 {-3.83/19 0.083s, n=27849, sd=33} Bb7 {+1.81/14 0.077s, n=55905, sd=41}
368. Ka2 {-2.78/17 0.026s, n=21756, sd=30} Be4 {+1.96/14 0.061s, n=43098, sd=59}
369. Ka1 {-2.26/17 0.050s, n=22848, sd=29} Bh7 {+3.29/14 0.056s, n=23421, sd=59}
370. Ka2 {-1.99/15 0.033s, n=22578, sd=27} Bg6 {+2.86/13 0.051s, n=21176, sd=26}
371. Ka1 {-1.67/17 0.089s, n=36831, sd=25} Be4 {+1.68/13 0.085s, n=32464, sd=24}
372. Ka2 {-1.94/15 0.030s, n=21999, sd=23}
Bd5+ {+1.63/14 0.115s, n=53841, sd=55}
373. Ka1 {-2.20/17 0.053s, n=23553, sd=21} Bb7 {+1.60/13 0.049s, n=21834, sd=37}
374. Ka2 {-1.67/15 0.034s, n=26371, sd=19} Bg2 {+1.40/12 0.114s, n=54508, sd=45}
375. Ka1 {-1.21/14 0.050s, n=36923, sd=24} Bf1 {+1.37/14 0.046s, n=33359, sd=31}
376. Ka2 {-1.50/12 0.070s, n=32056, sd=30}
Bc4+ {+1.26/10 0.053s, n=32742, sd=31}
377. Ka1 {-1.00/12 0.044s, n=22996, sd=18} Bb5 {+1.30/12 0.030s, n=24718, sd=35}
378. Ka2 {-0.72/13 0.071s, n=39909, sd=30} Be8 {+1.20/13 0.132s, n=86299, sd=61}
379. Ka1 {-0.72/12 0.083s, n=46419, sd=53} Kb3 {+1.64/10 0.078s, n=22047, sd=55}
380. Kb1 {-0.72/14 0.064s, n=25820, sd=38} Bh5 {+1.36/12 0.082s, n=36125, sd=73}
381. Ka1 {-0.71/12 0.090s, n=36498, sd=32} a5 {+1.44/15 0.037s, n=29068, sd=63}
382. Kb1 {-0.71/13 0.051s, n=25576, sd=38}
Bg6+ {+2.04/14 0.152s, n=124426, sd=83}
383. Ka1 {-0.71/15 0.060s, n=25860, sd=74} Be8 {+1.03/13 0.026s, n=26659, sd=77}
384. Kb1 {-0.71/16 0.025s, n=25517, sd=50} Bc6 {+1.03/15 0.053s, n=22364, sd=57}
385. Ka1 {-0.71/18 0.024s, n=21137, sd=53} Bf3 {+1.03/19 0.048s, n=24008, sd=61}
386. Kb1 {-0.71/19 0.037s, n=20792, sd=62} Bd5 {+2.17/18 0.042s, n=21066, sd=61}
387. Ka1 {-0.71/22 0.039s, n=25272, sd=62}
Be6 {+0.79/16 0.174s, n=112959, sd=93}
388. Kb1 {-0.71/21 0.029s, n=20195, sd=72}
Bc4 {+2.04/11 0.105s, n=36957, sd=113}
389. Ka1 {-0.71/24 0.047s, n=22496, sd=70} Bf1 {+1.18/14 0.066s, n=26307, sd=51}
390. Kb1 {-0.71/22 0.055s, n=21048, sd=65}
Be2 {+2.90/12 0.049s, n=25923, sd=199}
391. Ka1 {-0.71/24 0.043s, n=31308, sd=72}
Bg4 {+2.11/10 0.026s, n=20949, sd=106}
392. Kb1 {-0.71/22 0.072s, n=20683, sd=62}
Bf3 {+2.11/11 0.117s, n=77471, sd=155}
393. Ka1 {-0.71/23 0.021s, n=21411, sd=70} Be2 {+1.21/12 0.022s, n=24762, sd=69}
394. Kb1 {-0.71/24 0.024s, n=21012, sd=72}
Bh5 {+2.02/11 0.085s, n=82426, sd=145}
395. Ka1 {-0.71/24 0.022s, n=22515, sd=74} Be2 {+1.02/10 0.030s, n=20767, sd=85}
396. Kb1 {-0.71/25 0.025s, n=20124, sd=68}
Bb5 {+2.01/13 0.036s, n=24102, sd=135}
397. Ka1 {-0.71/23 0.027s, n=21217, sd=70} Be8 {+1.09/11 0.029s, n=23140, sd=77}
398. Kb1 {-0.71/23 0.022s, n=20325, sd=68} Bf7 {+1.08/13 0.031s, n=24161, sd=49}
399. Ka1 {-0.71/22 0.030s, n=21596, sd=66} Ka3 {+1.08/15 0.029s, n=20779, sd=63}
400. Kb1 {-0.71/23 0.029s, n=23514, sd=64}
Be6 {+0.80/13 0.104s, n=69339, sd=199}
401. Ka1 {-0.71/23 0.044s, n=28654, sd=74}
Bg4 {+0.80/12 0.031s, n=20625, sd=199}
402. Kb1 {-0.71/23 0.029s, n=20870, sd=60} Bh5 {+0.80/15 0.028s, n=20498, sd=61}
403. Ka1 {-0.71/23 0.032s, n=21490, sd=70} Be8 {+1.25/18 0.034s, n=24006, sd=85}
404. Kb1 {-0.71/24 0.029s, n=21641, sd=66} Kb3 {+2.17/11 0.044s, n=32632, sd=75}
405. Ka1 {-0.71/22 0.030s, n=22929, sd=64} Bc6 {+0.80/16 0.033s, n=20430, sd=37}
406. Kb1 {-0.72/20 0.036s, n=27969, sd=80}
Bd5 {+0.80/10 0.028s, n=20950, sd=163}
407. Ka1 {-2.56/25 0.049s, n=24762, sd=84}
Bf7 {+1.05/12 0.063s, n=43105, sd=199}
408. Kb1 {-0.76/18 0.019s, n=21026, sd=58} Be8 {+1.01/13 0.031s, n=20592, sd=39}
409. Ka1 {-1.25/20 0.031s, n=20901, sd=90} Bc6 {+0.86/11 0.060s, n=37589, sd=31}
410. Kb1 {-0.82/17 0.027s, n=22680, sd=44} Bb7 {+0.86/14 0.046s, n=31285, sd=79}
411. Ka1 {-0.79/18 0.101s, n=66249, sd=140}
Ka3 {+2.02/14 0.268s, n=164216, sd=177}
412. Kb1 {-0.80/17 0.029s, n=21446, sd=88} a4 {+0.84/11 0.022s, n=24805, sd=88}
413. Ka1 {-1.02/16 0.023s, n=22494, sd=42} Bf3 {+0.83/15 0.034s, n=20702, sd=39}
414. Kb1 {-1.04/19 0.024s, n=22265, sd=69}
Bh5 {+0.82/14 0.026s, n=23351, sd=113}
415. Ka1 {-1.04/21 0.061s, n=21508, sd=60}
Bd1 {+1.68/13 0.045s, n=25584, sd=107}
416. Kb1 {-2.95/23 0.090s, n=25404, sd=94} Bh5 {+1.46/12 0.052s, n=20265, sd=91}
417. Ka1 {-1.05/19 0.063s, n=24704, sd=56} Bd1 {+1.07/12 0.075s, n=37712, sd=81}
418. Kb1 {-1.05/19 0.054s, n=20872, sd=74} Bf3 {+0.96/15 0.063s, n=33881, sd=99}
419. Ka1 {-1.05/22 0.062s, n=20696, sd=78} Bc6 {+1.03/17 0.034s, n=26053, sd=51}
420. Kb1 {-1.05/21 0.061s, n=20569, sd=80} Bd5 {+0.95/18 0.094s, n=38302, sd=61}
421. Ka1 {-1.05/23 0.055s, n=22632, sd=62} Bb7 {+0.95/16 0.049s, n=22245, sd=53}
422. Kb1 {-1.05/19 0.034s, n=20009, sd=68} Kb3 {+0.98/16 0.042s, n=31157, sd=53}
423. Ka1 {-1.05/19 0.025s, n=20422, sd=70} Bf3 {+1.97/16 0.088s, n=42636, sd=39}
424. Kb1 {-1.05/19 0.046s, n=22211, sd=72} Bd5 {+0.95/16 0.038s, n=26386, sd=78}
425. Ka1 {-1.05/22 0.028s, n=20440, sd=76} Bf3 {+0.67/15 0.093s, n=52578, sd=73}
426. Kb1 {-1.05/20 0.030s, n=20800, sd=66}
Bd5 {+1.37/16 0.038s, n=26991, sd=119}
427. Ka1 {-1.05/22 0.036s, n=20456, sd=64}
Ka3 {+1.37/14 0.039s, n=28466, sd=101}
428. Kb1 {-1.05/21 0.044s, n=20876, sd=66} Ba8 {+1.09/14 0.063s, n=21243, sd=71}
429. Ka1 {-1.25/20 0.029s, n=24150, sd=68} Bg2 {+0.75/12 0.060s, n=28324, sd=83}
430. Kb1 {-1.25/21 0.067s, n=20205, sd=60} Bd5 {+0.75/14 0.035s, n=23279, sd=49}
431. Ka1 {-1.25/24 0.057s, n=27057, sd=64} Bg8 {+0.75/13 0.039s, n=22882, sd=49}
432. Kb1 {-1.25/23 0.028s, n=24407, sd=62} Bf7 {+0.75/17 0.062s, n=21287, sd=99}
433. Ka1 {-1.25/21 0.037s, n=22795, sd=60} Bd5 {+0.75/18 0.028s, n=20202, sd=59}
434. Kb1 {-1.25/21 0.036s, n=20722, sd=58}
Be6 {+1.10/14 0.057s, n=22841, sd=123}
435. Ka1 {-1.12/23 0.043s, n=28295, sd=56} Kb3 {+1.07/14 0.043s, n=22413, sd=73}
436. Kb1 {-1.12/21 0.030s, n=20992, sd=54} Bg4 {+0.87/13 0.045s, n=28415, sd=77}
437. Ka1 {-2.03/23 0.104s, n=33852, sd=52} Be6 {+0.87/15 0.056s, n=21351, sd=57}
438. Kb1 {-2.03/18 0.046s, n=21057, sd=48} Bc8 {+0.96/10 0.035s, n=21162, sd=49}
439. Ka1 {-1.07/20 0.050s, n=36334, sd=48} Ba6 {+1.02/14 0.140s, n=39098, sd=63}
440. Kb1 {-1.73/18 0.066s, n=21921, sd=46} Bc4 {+1.19/15 0.048s, n=25958, sd=59}
441. Ka1 {-3.02/20 0.075s, n=49560, sd=44} Kc3 {+1.17/16 0.060s, n=25059, sd=47}
442. Kb1 {-1.90/18 0.065s, n=27658, sd=41} Be6 {+1.15/12 0.026s, n=20180, sd=51}
443. Ka1 {-3.02/18 0.083s, n=41862, sd=88} Bc4 {+1.18/13 0.056s, n=32276, sd=77}
444. Kb1 {-1.11/16 0.032s, n=21287, sd=64}
Be6 {+0.91/14 0.087s, n=49162, sd=101}
445. Ka1 {-1.25/17 0.060s, n=22516, sd=36}
Bf7 {+0.77/13 0.080s, n=20399, sd=111}
446. Kb1 {-0.97/17 0.174s, n=71124, sd=100}
Kb3 {+0.85/13 0.056s, n=26273, sd=107}
447. Ka1 {-0.97/15 0.034s, n=20049, sd=60} Bc4 {+1.58/14 0.028s, n=25531, sd=99}
448. Kb1 {-0.97/15 0.158s, n=65092, sd=74} Ba6 {+0.82/10 0.095s, n=45084, sd=59}
449. Ka1 {-1.01/18 0.071s, n=31899, sd=52}
Ka3 {+0.43/14 0.210s, n=115428, sd=115}
450. Kb1 {-1.81/14 0.055s, n=33982, sd=50}
Bb5 {+0.72/13 0.039s, n=24543, sd=109}
451. Ka1 {-1.25/14 0.021s, n=20004, sd=42} Be8 {+0.72/14 0.080s, n=24501, sd=75}
452. Kb1 {-0.97/14 0.154s, n=91076, sd=72} Bf7 {+0.72/9 0.040s, n=20994, sd=41}
453. Ka1 {-1.44/14 0.046s, n=20591, sd=59} Kb3 {+0.57/13 0.131s, n=69406, sd=37}
454. Kb1 {-0.97/12 0.093s, n=51326, sd=50} Bc4 {+0.57/13 0.047s, n=31959, sd=71}
455. Ka1 {-0.97/14 0.059s, n=23925, sd=44} Bd5 {+0.57/14 0.092s, n=20342, sd=53}
456. Kb1 {-0.97/14 0.086s, n=21984, sd=43} Bf3 {+0.67/14 0.051s, n=22632, sd=65}
457. Ka1 {-1.06/15 0.068s, n=20702, sd=62} Bg4 {+0.69/14 0.056s, n=20340, sd=49}
458. Kb1 {-0.80/10 0.129s, n=48216, sd=62} a3 {+0.72/13 0.027s, n=21538, sd=73}
459. Ka1 {-0.97/13 0.044s, n=28900, sd=75} Bh3 {+0.66/14 0.072s, n=25992, sd=55}
460. Kb1 {-0.97/14 0.049s, n=24021, sd=50} Bc8 {+0.62/12 0.037s, n=24370, sd=59}
461. Ka1 {-0.97/16 0.041s, n=24973, sd=48} Be6 {+0.67/15 0.028s, n=22261, sd=47}
462. Kb1 {-0.97/16 0.021s, n=20183, sd=70} Kb4 {+0.68/13 0.061s, n=26895, sd=71}
463. Ka1 {-0.97/21 0.039s, n=25507, sd=48} Bd5 {+0.68/16 0.059s, n=23994, sd=55}
464. Kb1 {-0.97/22 0.059s, n=22192, sd=56} Bb3 {+1.86/14 0.046s, n=24997, sd=57}
465. Ka1 {-0.97/25 0.034s, n=22352, sd=56} Kc5 {+0.97/13 0.042s, n=20193, sd=45}
466. Kb1 {-2.24/20 0.044s, n=20981, sd=62} Kb6 {+1.29/13 0.022s, n=21704, sd=79}
467. Ka1 {-0.97/18 0.020s, n=20087, sd=62} Be6 {+1.29/14 0.064s, n=28767, sd=47}
468. Kb1 {-0.97/21 0.054s, n=20036, sd=56} Kb5 {+2.24/15 0.059s, n=23708, sd=55}
469. Ka1 {-0.97/21 0.024s, n=22591, sd=60} Kc5 {+1.30/17 0.032s, n=25032, sd=55}
470. Kb1 {-0.97/22 0.055s, n=22282, sd=65} Kb4 {+0.74/14 0.120s, n=54958, sd=55}
471. Ka1 {-0.97/22 0.046s, n=21502, sd=66} Kb3 {+0.74/16 0.084s, n=30024, sd=75}
472. Kb1 {-0.97/22 0.041s, n=21135, sd=58} Bh3 {+1.01/14 0.073s, n=27325, sd=73}
473. Ka1 {-1.09/22 0.032s, n=20794, sd=58} Bf1 {+0.74/13 0.111s, n=39591, sd=67}
474. Kb1 {-1.09/22 0.037s, n=23533, sd=64}
Bb5 {+0.46/13 2.082s, n=112172, sd=61}
475. Ka1 {-1.09/21 0.073s, n=20720, sd=52} Be8 {+0.46/11 0.045s, n=25940, sd=67}
476. Kb1 {-1.09/22 0.039s, n=21701, sd=66} Bh5 {+0.46/14 0.040s, n=28550, sd=49}
477. Ka1 {-1.09/22 0.048s, n=20101, sd=64} Bf7 {+0.44/15 0.193s, n=87250, sd=43}
478. Kb1 {-1.09/23 0.032s, n=24486, sd=62} Kb4 {+0.44/13 0.047s, n=22506, sd=51}
479. Ka1 {-1.09/23 0.056s, n=29639, sd=60} Bc4 {+0.44/15 0.063s, n=29358, sd=59}
480. Kb1 {-1.09/22 0.086s, n=24394, sd=58} Kb3 {+0.52/14 0.061s, n=22026, sd=57}
481. Ka1 {-1.23/24 0.084s, n=24480, sd=56} Bf1 {+0.52/18 0.050s, n=30892, sd=55}
482. Kb1 {-1.09/20 0.038s, n=20479, sd=54} Ba6 {+0.52/15 0.859s, n=64427, sd=53}
483. Ka1 {-2.41/21 0.061s, n=22237, sd=52} Bb5 {+0.52/16 0.037s, n=21448, sd=51}
484. Kb1 {-1.09/18 0.030s, n=20246, sd=46} Be8 {+0.52/16 0.032s, n=22598, sd=49}
485. Ka1 {-2.58/20 0.042s, n=25336, sd=48} Bf7 {+0.52/16 0.036s, n=22554, sd=46}
486. Kb1 {-1.31/17 0.045s, n=20860, sd=46} Bd5 {+0.52/18 0.090s, n=41388, sd=53}
487. Ka1 {-1.09/19 0.080s, n=26890, sd=44} Bc4 {+0.52/17 0.096s, n=35805, sd=43}
488. Kb1 {-1.09/18 0.040s, n=23120, sd=42} Bf7 {+0.52/16 0.057s, n=28093, sd=48}
489. Ka1 {-1.09/18 0.063s, n=34535, sd=40} Bd5 {+0.52/18 0.045s, n=28070, sd=39}
490. Kb1 {-1.09/17 0.055s, n=23474, sd=38} Bf3 {+0.52/16 0.231s, n=46807, sd=37}
491. Ka1 {-1.09/18 0.040s, n=25361, sd=36} Bb7 {+0.52/16 0.031s, n=24710, sd=35}
492. Kb1 {-0.67/16 0.190s, n=96406, sd=34} Bc6 {+0.30/16 0.330s, n=84934, sd=55}
493. Ka1 {-0.14/16 0.145s, n=84677, sd=32} Bd5 {+0.45/14 0.866s, n=24044, sd=31}
494. Kb1 {-0.14/15 0.166s, n=55859, sd=30} Bf3 {+0.35/12 0.527s, n=20344, sd=30}
495. Ka1 {0.00/16 0.062s, n=24012, sd=28} Kc3 {+0.29/14 0.553s, n=20947, sd=27}
496. Ka2 {-0.01/30 1.272s, n=63988, sd=26} Kb4 {+0.30/17 0.519s, n=28468, sd=55}
497. Ka1 {-0.01/17 0.072s, n=24642, sd=24} Kb3 {+0.30/16 1.550s, n=36560, sd=33}
498. Kb1 {-0.01/16 0.115s, n=30995, sd=22} Bg2 {+0.35/12 0.159s, n=21637, sd=39}
499. Ka1 {-0.01/21 0.076s, n=27329, sd=20} Kb4 {+0.35/19 1.720s, n=29989, sd=37}
500. Kb1 {-0.01/20 0.227s, n=23316, sd=18} Bc6 {+0.35/18 0.732s, n=36419, sd=47}
501. Ka2 {-0.01/17 0.080s, n=24932, sd=16} Bf3 {+0.69/18 0.992s, n=21783, sd=51}
502. Kb1 {0.00/18 0.268s, n=22446, sd=14} Be4+ {+0.45/16 0.175s, n=22507, sd=41}
503. Ka2 {0.00/23 0.079s, n=21250, sd=12} Bc2 {+0.45/15 0.196s, n=24501, sd=47}
504. Ka1 {0.00/41 0.079s, n=20565, sd=10} Bb3 {+0.33/10 1.307s, n=33377, sd=45}
505. Kb1 {0.00/35 0.102s, n=20913, sd=8} Kb5 {+0.44/11 0.325s, n=20796, sd=43}
506. Ka1 {0.00/40 0.364s, n=22333, sd=5} Bc4 {+0.42/12 0.388s, n=35301, sd=67}
507. Kb1 {0.00/40 0.702s, n=21074, sd=4} Bg8 {+0.42/12 0.756s, n=30598, sd=44}
508. Ka1 {0.00/46 1.066s, n=20305, sd=2} a2 {+0.40/9 0.293s, n=45139, sd=27}
509. Kb2 {0.00/36 0.540s, n=27206, sd=4} Kb6 {+0.48/14 2.354s, n=40437, sd=35}
510. Ka1 {0.00/36 0.601s, n=22205, sd=6} Bb3 {+0.48/13 0.652s, n=21859, sd=38}
511. Kb2 {0.00/36 3.526s, n=70732, sd=8} Kb5 {+0.86/17 1.210s, n=20021, sd=53}
512. Ka1 {0.00/39 3.145s, n=46548, sd=5} Kc5 {+0.28/14 3.872s, n=114110, sd=93}
513. Kb2 {0.00/39 1.291s, n=25164, sd=3} Kb5 {+0.45/11 0.697s, n=26663, sd=63}
514. Ka1 {0.00/83 0.925s, n=20839, sd=5} Kc4 {+0.45/16 1.294s, n=22133, sd=45}
515. Kb2 {0.00/37 1.406s, n=50736, sd=2} Kd4 {+0.45/11 0.019s, n=22028, sd=87}
516. Ka1 {0.00/43 1.037s, n=25039, sd=4}
Bc4 {+0.49/14 0.046s, n=33428, sd=69, White disconnects} 0-1