[Event "Fastchess Tournament"]
[Site "?"]
[Date "2026.04.29"]
[Round "4245"]
[White "PZChessBot-dev"]
[Black "PZChessBot-base"]
[Result "0-1"]
[SetUp "1"]
[FEN "nbbqrkrn/pp1pp1pp/2p5/2N2p2/8/8/PPPPPPPP/BQ1BRKNR w HEge - 0 5"]
[Variant "Chess960"]
[GameDuration "00:00:44"]
[GameStartTime "2026-04-29T16:49:53 -0600"]
[GameEndTime "2026-04-29T16:50:38 -0600"]
[PlyCount "1024"]
[Termination "abandoned"]
[TimeControl "-"]

5. b4 {-3.52/10 0.011s, n=12295, sd=11} O-O {+3.51/9 0.020s, n=23435, sd=11}
6. e3 {-3.13/9 0.014s, n=20557, sd=11} e5 {+1.78/9 0.033s, n=39078, sd=14}
7. Ne2 {-3.11/9 0.015s, n=20017, sd=11} Nb6 {+2.00/9 0.036s, n=40561, sd=15}
8. O-O {-1.85/10 0.017s, n=20903, sd=11} Ng6 {+2.37/9 0.012s, n=15193, sd=13}
9. f4 {-2.86/9 0.013s, n=20895, sd=13} d6 {+2.88/10 0.016s, n=22937, sd=14}
10. Nb3 {-2.09/9 0.011s, n=12191, sd=12} c5 {+1.77/10 0.032s, n=41838, sd=15}
11. Na5 {-2.42/9 0.009s, n=14420, sd=13} c4 {+2.53/9 0.008s, n=12779, sd=11}
12. g3 {-2.55/9 0.020s, n=23647, sd=11} d5 {+3.06/9 0.019s, n=20261, sd=11}
13. fxe5 {-2.64/9 0.015s, n=16438, sd=10} Nxe5 {+4.40/11 0.041s, n=44773, sd=18}
14. Nf4 {-4.23/9 0.011s, n=17936, sd=13} g5 {+4.34/10 0.019s, n=21093, sd=18}
15. Qb2 {-3.57/10 0.015s, n=18002, sd=13} Qd6 {+3.74/10 0.021s, n=22701, sd=12}
16. d3 {-2.76/10 0.013s, n=14739, sd=15} Bc7 {+3.27/9 0.031s, n=31925, sd=12}
17. Qd4 {-2.46/9 0.012s, n=12641, sd=10} Re7 {+2.80/10 0.013s, n=13980, sd=13}
18. Nh5 {-1.77/10 0.009s, n=13371, sd=12} Qxb4 {+3.53/11 0.037s, n=42212, sd=15}
19. Nb3 {-2.68/10 0.016s, n=16601, sd=12} h6 {+4.38/11 0.016s, n=17720, sd=15}
20. Bc3 {-2.82/9 0.021s, n=15739, sd=12} Qd6 {+5.21/10 0.014s, n=16719, sd=14}
21. Nd2 {-5.19/9 0.016s, n=16039, sd=13} Na4 {+6.36/10 0.023s, n=27741, sd=20}
22. dxc4 {-7.13/11 0.065s, n=68478, sd=24} Bb6 {+5.97/11 0.078s, n=79061, sd=22}
23. c5 {-4.24/10 0.022s, n=21997, sd=15} Nxc5 {+6.89/10 0.012s, n=12359, sd=18}
24. Ba1 {-7.00/9 0.017s, n=23214, sd=18} Re6 {+5.63/8 0.011s, n=11449, sd=9}
25. Nc4 {-4.67/11 0.018s, n=17657, sd=16} dxc4 {+3.77/10 0.017s, n=16751, sd=18}
26. Qxd6 {-4.62/10 0.014s, n=13959, sd=23}
Rxd6 {+5.32/11 0.018s, n=19137, sd=23}
27. Bxe5 {-4.74/12 0.143s, n=141505, sd=35}
Re6 {+4.74/11 0.011s, n=13519, sd=18} 28. Bd4 {-4.55/9 0.020s, n=19775, sd=27}
Ne4 {+5.29/12 0.011s, n=12285, sd=20} 29. Bf3 {-4.08/11 0.015s, n=17125, sd=24}
Rd6 {+5.63/11 0.015s, n=16757, sd=22} 30. Be5 {-4.33/12 0.012s, n=16092, sd=26}
Re6 {+5.28/12 0.014s, n=18349, sd=18} 31. Bd4 {-4.42/12 0.013s, n=14752, sd=23}
Bxd4 {+5.71/10 0.008s, n=10691, sd=16}
32. exd4 {-5.03/12 0.026s, n=34838, sd=25} Rd6 {+4.03/9 0.014s, n=14924, sd=20}
33. Bg2 {-4.10/12 0.012s, n=15526, sd=20} Rxd4 {+4.74/11 0.009s, n=10803, sd=16}
34. Bxe4 {-4.98/12 0.029s, n=33475, sd=27}
fxe4 {+5.04/11 0.010s, n=10543, sd=18} 35. Nf6+ {-5.83/9 0.013s, n=14848, sd=20}
Kh8 {+5.76/12 0.054s, n=66628, sd=31} 36. c3 {-5.31/11 0.017s, n=19118, sd=20}
Rdd8 {+5.49/10 0.017s, n=18225, sd=22}
37. Nxe4 {-5.20/12 0.015s, n=20733, sd=18}
Rxf1+ {+5.38/11 0.017s, n=18619, sd=23}
38. Kxf1 {-5.85/12 0.024s, n=28278, sd=18} Kg7 {+5.64/11 0.006s, n=10179, sd=14}
39. Nf2 {-5.57/10 0.025s, n=26567, sd=14} Kf6 {+5.74/11 0.018s, n=22615, sd=14}
40. Rb1 {-5.64/10 0.015s, n=14696, sd=13} b6 {+6.14/10 0.023s, n=29437, sd=13}
41. Ke1 {-5.85/8 0.010s, n=10463, sd=10} Re8+ {+6.66/11 0.022s, n=26601, sd=17}
42. Kd2 {-6.60/9 0.014s, n=14248, sd=15} Re5 {+6.05/10 0.011s, n=12898, sd=14}
43. Rb4 {-6.50/10 0.026s, n=29882, sd=17} Be6 {+5.92/11 0.026s, n=28712, sd=20}
44. a4 {-6.14/10 0.009s, n=10759, sd=15} Kf5 {+6.56/10 0.013s, n=14278, sd=13}
45. Rb1 {-6.24/10 0.017s, n=18491, sd=16} h5 {+7.58/9 0.011s, n=12865, sd=17}
46. Rf1 {-5.95/10 0.009s, n=11129, sd=14} Kg6 {+6.91/9 0.010s, n=10858, sd=12}
47. Rb1 {-6.59/10 0.027s, n=33184, sd=15} Rf5 {+6.42/10 0.022s, n=25620, sd=16}
48. Ke3 {-6.61/10 0.014s, n=16034, sd=18} Re5+ {+6.65/10 0.011s, n=15961, sd=18}
49. Kd2 {-6.39/12 0.013s, n=17835, sd=17} Kf6 {+6.40/11 0.010s, n=15375, sd=19}
50. Rb4 {-6.16/11 0.021s, n=23624, sd=15} Kf5 {+6.78/11 0.007s, n=12509, sd=17}
51. Rb1 {-6.44/11 0.009s, n=15915, sd=14} Bd5 {+7.80/11 0.013s, n=13210, sd=18}
52. Rb5 {-9.11/10 0.034s, n=31201, sd=21} Bc6 {+9.32/11 0.010s, n=14794, sd=20}
53. Rxe5+ {-8.44/12 0.012s, n=22702, sd=22}
Kxe5 {+7.95/10 0.008s, n=15793, sd=15} 54. a5 {-8.75/10 0.008s, n=10486, sd=19}
bxa5 {+7.88/12 0.012s, n=23201, sd=23} 55. Kc1 {-8.59/13 0.008s, n=11113, sd=19}
Kf5 {+7.83/12 0.011s, n=15549, sd=27} 56. Kb2 {-8.57/12 0.008s, n=12036, sd=25}
Ba4 {+7.83/13 0.008s, n=11201, sd=24} 57. Ka2 {-8.45/14 0.009s, n=14252, sd=23}
Bb5 {+7.75/14 0.007s, n=10686, sd=27} 58. Kb1 {-8.43/14 0.007s, n=10228, sd=23}
Bd7 {+7.61/14 0.007s, n=14686, sd=20} 59. Ka1 {-8.43/15 0.007s, n=11145, sd=20}
Be6 {+7.61/15 0.008s, n=12336, sd=23} 60. Kb2 {-8.43/15 0.007s, n=11325, sd=27}
Bd5 {+7.48/16 0.012s, n=19353, sd=26} 61. Ka3 {-8.43/16 0.005s, n=12791, sd=27}
Bc6 {+7.48/15 0.004s, n=11855, sd=24} 62. Kb2 {-8.15/17 0.024s, n=37514, sd=32}
Bb5 {+7.48/14 0.008s, n=10509, sd=23} 63. Kb1 {-8.15/16 0.007s, n=13211, sd=25}
Bd7 {+7.48/16 0.008s, n=11954, sd=23} 64. Kb2 {-8.15/16 0.009s, n=13613, sd=26}
Ke5 {+7.46/14 0.008s, n=11893, sd=25} 65. Ka1 {-8.15/17 0.006s, n=13591, sd=29}
Be8 {+7.45/12 0.005s, n=10336, sd=25} 66. Kb1 {-8.15/17 0.009s, n=13027, sd=27}
Kf5 {+7.42/13 0.006s, n=10621, sd=26} 67. Ka2 {-8.15/18 0.007s, n=11395, sd=29}
Bd7 {+7.42/15 0.008s, n=11117, sd=26} 68. Ka1 {-8.15/19 0.008s, n=12195, sd=26}
Ba4 {+7.42/14 0.007s, n=12386, sd=22} 69. Kb2 {-8.15/20 0.008s, n=13040, sd=29}
Ke5 {+7.42/16 0.008s, n=13836, sd=24} 70. Ka2 {-8.15/17 0.005s, n=10690, sd=21}
Bb5 {+7.42/17 0.007s, n=13785, sd=29} 71. Kb2 {-8.15/18 0.011s, n=10926, sd=25}
Be8 {+7.42/17 0.006s, n=12265, sd=27} 72. Kb1 {-8.15/18 0.005s, n=12517, sd=23}
Ba4 {+7.42/18 0.006s, n=12653, sd=24} 73. Ka2 {-8.15/17 0.004s, n=10327, sd=27}
Bb5 {+7.31/17 0.015s, n=20917, sd=20} 74. Kb2 {-8.15/17 0.007s, n=10233, sd=20}
Bc6 {+7.27/14 0.006s, n=11248, sd=29} 75. Ka3 {-8.15/18 0.004s, n=11543, sd=22}
Be8 {+7.27/15 0.007s, n=10720, sd=31} 76. Kb2 {-8.15/18 0.006s, n=10524, sd=31}
Bc6 {+7.27/17 0.007s, n=11185, sd=23} 77. Ka3 {-7.87/17 0.019s, n=26193, sd=25}
Be8 {+7.26/15 0.007s, n=10388, sd=29} 78. Kb2 {-7.87/14 0.008s, n=11087, sd=32}
Kf5 {+7.11/16 0.011s, n=16129, sd=32} 79. Ka2 {-7.87/13 0.007s, n=10579, sd=33}
Ba4 {+7.10/16 0.008s, n=12170, sd=27} 80. Ka1 {-7.70/14 0.012s, n=17463, sd=29}
Bd7 {+7.08/15 0.006s, n=11984, sd=25} 81. Kb2 {-7.66/15 0.011s, n=15861, sd=34}
Ke5 {+6.94/14 0.018s, n=26281, sd=27} 82. Ka1 {-7.37/14 0.014s, n=28648, sd=33}
Bc6 {+6.88/12 0.010s, n=12501, sd=25} 83. Kb2 {-7.22/12 0.009s, n=12147, sd=18}
Kf5 {+6.70/12 0.016s, n=20296, sd=21} 84. Ka3 {-7.08/12 0.007s, n=12326, sd=22}
Ke5 {+6.62/13 0.012s, n=17169, sd=25} 85. Kb2 {-6.94/12 0.009s, n=12131, sd=20}
Be4 {+6.64/14 0.017s, n=21471, sd=29} 86. Ka3 {-6.76/12 0.014s, n=16488, sd=20}
Bc2 {+6.62/13 0.010s, n=14184, sd=35} 87. Kb2 {-6.70/13 0.011s, n=13931, sd=22}
Bd3 {+6.57/13 0.006s, n=12675, sd=33} 88. Nh3 {-6.68/13 0.011s, n=12807, sd=29}
Kf5 {+6.57/13 0.007s, n=11691, sd=28} 89. Nf2 {-6.68/15 0.011s, n=14268, sd=35}
Be4 {+6.57/15 0.005s, n=10609, sd=31} 90. Ka3 {-6.68/14 0.010s, n=12842, sd=50}
Bc2 {+6.58/15 0.007s, n=11372, sd=29} 91. Kb2 {-6.68/16 0.009s, n=11840, sd=32}
Ba4 {+6.57/16 0.006s, n=10301, sd=27} 92. Ka1 {-6.71/14 0.011s, n=16597, sd=34}
Kg6 {+6.57/17 0.010s, n=14289, sd=25} 93. Kb2 {-6.68/14 0.009s, n=10517, sd=22}
Bc6 {+6.50/15 0.010s, n=11903, sd=23} 94. Ka3 {-6.66/13 0.011s, n=12520, sd=24}
Kf6 {+6.57/13 0.014s, n=18773, sd=24} 95. Ka2 {-6.66/14 0.010s, n=12642, sd=26}
Ba4 {+6.42/13 0.015s, n=18346, sd=27} 96. Ka3 {-6.66/14 0.005s, n=11798, sd=34}
Bd7 {+6.42/13 0.011s, n=13306, sd=37} 97. Kb2 {-6.66/16 0.011s, n=13374, sd=31}
Bf5 {+6.34/14 0.013s, n=18016, sd=23} 98. Ka3 {-6.66/16 0.005s, n=10166, sd=31}
Bd7 {+6.34/15 0.007s, n=16949, sd=35} 99. Kb2 {-6.66/18 0.010s, n=12428, sd=30}
Kg6 {+6.34/14 0.011s, n=13552, sd=22} 100. Ka2 {-6.66/16 0.007s, n=12823, sd=22}
Bc6 {+6.33/13 0.006s, n=10325, sd=27} 101. Ka3 {-6.66/16 0.011s, n=12606, sd=27}
a6 {+6.33/13 0.010s, n=11680, sd=25} 102. Ka2 {-6.66/14 0.006s, n=10640, sd=21}
Kf6 {+6.33/15 0.010s, n=12567, sd=29} 103. Ka3 {-6.66/15 0.011s, n=12181, sd=30}
Kf5 {+6.33/16 0.007s, n=10034, sd=29} 104. Kb2 {-6.66/15 0.009s, n=11141, sd=27}
Bb5 {+6.33/16 0.012s, n=13940, sd=23} 105. Ka3 {-6.66/17 0.010s, n=12133, sd=22}
Ke5 {+6.33/17 0.008s, n=10412, sd=25} 106. Ka2 {-6.66/16 0.013s, n=14106, sd=34}
Ba4 {+6.33/17 0.006s, n=12482, sd=24} 107. Nh3 {-6.66/16 0.007s, n=11735, sd=31}
Kf6 {+6.33/15 0.009s, n=10313, sd=24} 108. Nf2 {-6.66/18 0.007s, n=12013, sd=27}
Kf5 {+6.33/19 0.010s, n=12273, sd=29} 109. Kb1 {-6.66/18 0.009s, n=10926, sd=27}
Bb5 {+6.33/19 0.009s, n=11383, sd=25} 110. Kb2 {-6.66/18 0.009s, n=11822, sd=29}
Bd7 {+6.33/18 0.008s, n=10867, sd=23} 111. Ka2 {-6.66/18 0.008s, n=11093, sd=29}
Ke5 {+6.33/18 0.010s, n=10754, sd=29} 112. Ka3 {-6.66/18 0.008s, n=13246, sd=24}
Be8 {+6.33/18 0.008s, n=12058, sd=25} 113. Kb2 {-6.66/19 0.010s, n=12798, sd=24}
Bb5 {+6.33/19 0.011s, n=13233, sd=25} 114. Ka2 {-6.66/19 0.009s, n=10991, sd=25}
Ba4 {+6.33/20 0.006s, n=13244, sd=25} 115. Nh3 {-6.66/19 0.008s, n=12676, sd=27}
Kf6 {+6.33/17 0.009s, n=12767, sd=29} 116. Nf2 {-6.66/20 0.010s, n=12874, sd=27}
Kf5 {+6.33/17 0.008s, n=10323, sd=27} 117. Kb1 {-6.66/20 0.011s, n=13828, sd=23}
Bc6 {+6.33/18 0.005s, n=11341, sd=31} 118. Ka2 {-6.66/18 0.009s, n=11588, sd=35}
Bd7 {+6.33/18 0.009s, n=11538, sd=25} 119. Ka3 {-6.66/19 0.010s, n=12587, sd=31}
Ke5 {+6.33/19 0.007s, n=10161, sd=22} 120. Ka2 {-6.66/18 0.016s, n=12940, sd=32}
Be8 {+6.33/19 0.009s, n=10286, sd=24} 121. Ka3 {-6.66/19 0.010s, n=11508, sd=27}
Bc6 {+6.33/18 0.009s, n=10459, sd=26} 122. Ka2 {-6.66/19 0.012s, n=13195, sd=29}
Bd7 {+6.33/18 0.010s, n=11549, sd=20} 123. Ka3 {-6.66/19 0.008s, n=10422, sd=25}
Be8 {+6.25/20 0.012s, n=21551, sd=29} 124. Kb2 {-6.66/20 0.010s, n=12496, sd=29}
Ba4 {+6.25/16 0.004s, n=10066, sd=25} 125. Ka3 {-6.66/19 0.008s, n=10138, sd=29}
Bc6 {+6.25/17 0.006s, n=10964, sd=23} 126. Ka2 {-6.66/20 0.007s, n=12977, sd=24}
Kf6 {+6.25/17 0.011s, n=12693, sd=33} 127. Ka3 {-6.66/20 0.011s, n=13201, sd=27}
Kf5 {+6.25/17 0.010s, n=12066, sd=32} 128. Ka2 {-6.66/20 0.006s, n=11385, sd=28}
Bb5 {+5.97/14 0.016s, n=23263, sd=24} 129. Ka3 {-6.54/15 0.010s, n=12135, sd=24}
Be8 {+5.97/13 0.015s, n=23226, sd=31} 130. Kb2 {-6.54/15 0.011s, n=12245, sd=25}
Ke5 {+5.75/14 0.015s, n=17224, sd=31} 131. Ka1 {-6.54/18 0.009s, n=12700, sd=24}
Bg6 {+5.96/13 0.010s, n=11479, sd=23} 132. Ka2 {-6.54/17 0.007s, n=11846, sd=25}
Bf5 {+5.75/13 0.006s, n=10283, sd=31} 133. Kb2 {-6.54/16 0.009s, n=11115, sd=22}
Be4 {+5.75/15 0.016s, n=13303, sd=32} 134. Nh3 {-6.54/13 0.010s, n=10488, sd=20}
Kf6 {+5.84/13 0.010s, n=11149, sd=25} 135. Nf2 {-6.54/13 0.015s, n=15880, sd=34}
Bf5 {+5.75/15 0.008s, n=10114, sd=33} 136. Ka1 {-6.54/14 0.009s, n=10103, sd=32}
Bd7 {+5.75/15 0.010s, n=10484, sd=27}
137. Ne4+ {-6.54/13 0.011s, n=13406, sd=30}
Kf5 {+5.59/15 0.019s, n=22785, sd=29} 138. Nf2 {-6.54/15 0.009s, n=10221, sd=28}
Be8 {+5.45/14 0.012s, n=12848, sd=31} 139. Kb2 {-6.54/17 0.011s, n=12297, sd=25}
Bd7 {+5.31/11 0.012s, n=13225, sd=25} 140. Ka2 {-5.90/12 0.011s, n=13207, sd=22}
Bc6 {+5.17/11 0.011s, n=12376, sd=23} 141. Kb2 {-5.63/12 0.019s, n=21689, sd=22}
Kg6 {+5.17/12 0.006s, n=11052, sd=21} 142. Ka3 {-5.49/13 0.020s, n=19610, sd=22}
Bd7 {+5.17/12 0.011s, n=11662, sd=19} 143. Ka2 {-5.21/11 0.012s, n=13066, sd=18}
Bf5 {+4.96/13 0.021s, n=21301, sd=22} 144. Ka3 {-5.45/12 0.011s, n=11008, sd=18}
Bd7 {+4.84/12 0.008s, n=10445, sd=24} 145. Ka2 {-5.34/13 0.013s, n=13802, sd=22}
h4 {+4.99/11 0.014s, n=13884, sd=21} 146. Ka3 {-5.57/11 0.010s, n=11101, sd=21}
Kf5 {+4.99/11 0.017s, n=14015, sd=21} 147. Kb2 {-5.53/14 0.010s, n=10387, sd=24}
Kf6 {+4.99/14 0.012s, n=12383, sd=19}
148. Ne4+ {-5.53/13 0.011s, n=11320, sd=25}
Kg6 {+4.99/14 0.009s, n=11272, sd=21} 149. Ka3 {-5.53/14 0.009s, n=10327, sd=27}
Bb5 {+4.99/14 0.013s, n=13109, sd=31} 150. Nf2 {-5.53/16 0.010s, n=12064, sd=28}
Kf5 {+4.99/15 0.013s, n=12709, sd=38} 151. Kb2 {-5.53/17 0.008s, n=10955, sd=25}
Ke5 {+4.99/14 0.012s, n=11792, sd=45} 152. Nh3 {-5.53/16 0.012s, n=12251, sd=22}
Kf6 {+4.99/15 0.009s, n=13014, sd=29} 153. Nf2 {-5.53/18 0.008s, n=10325, sd=22}
Bd7 {+4.99/17 0.010s, n=11954, sd=39} 154. Ka3 {-5.53/17 0.008s, n=11200, sd=28}
Ke5 {+4.99/15 0.013s, n=12824, sd=31} 155. Ka2 {-5.53/16 0.008s, n=11113, sd=23}
Bc6 {+4.99/15 0.013s, n=12924, sd=29} 156. Kb2 {-5.53/16 0.011s, n=12626, sd=20}
Kf5 {+4.99/14 0.008s, n=10037, sd=18} 157. Ka3 {-5.53/19 0.009s, n=11691, sd=25}
Bd7 {+4.99/17 0.009s, n=13470, sd=27} 158. Kb2 {-5.53/20 0.011s, n=11719, sd=27}
Ke5 {+4.99/17 0.013s, n=14565, sd=29} 159. Ka2 {-5.53/15 0.010s, n=10130, sd=23}
Bc6 {+4.99/16 0.014s, n=14046, sd=26} 160. Ka3 {-5.53/15 0.016s, n=15644, sd=21}
Kf5 {+4.99/16 0.011s, n=11827, sd=21} 161. Ka2 {-5.36/13 0.012s, n=12187, sd=26}
Bb5 {+4.99/16 0.010s, n=12346, sd=27} 162. Ka3 {-5.36/16 0.012s, n=13011, sd=26}
Be8 {+4.99/18 0.009s, n=12003, sd=20} 163. Ka2 {-5.36/16 0.012s, n=12058, sd=26}
Ba4 {+4.99/17 0.007s, n=12448, sd=36} 164. Ka1 {-5.36/17 0.011s, n=14601, sd=25}
Bc6 {+4.96/18 0.017s, n=24511, sd=28} 165. Ka2 {-5.36/17 0.010s, n=10972, sd=31}
Bb5 {+4.95/16 0.007s, n=11501, sd=21} 166. Ka3 {-5.36/16 0.007s, n=10406, sd=29}
Ke5 {+4.95/18 0.012s, n=12582, sd=31} 167. Nh3 {-5.23/14 0.008s, n=11972, sd=29}
Kf6 {+4.81/18 0.009s, n=17357, sd=29} 168. Nf2 {-5.23/15 0.012s, n=12580, sd=38}
Kf5 {+4.82/17 0.011s, n=12317, sd=27} 169. Ka2 {-5.09/13 0.006s, n=12397, sd=22}
Ba4 {+4.73/14 0.013s, n=13032, sd=27} 170. Ka1 {-5.09/14 0.018s, n=17506, sd=28}
Bb5 {+4.72/11 0.011s, n=10285, sd=26} 171. Ka2 {-5.08/14 0.017s, n=16046, sd=30}
Ke5 {+4.73/13 0.012s, n=11798, sd=32} 172. Ka3 {-5.08/11 0.010s, n=10899, sd=34}
Bc6 {+4.65/13 0.011s, n=11534, sd=38} 173. Ka2 {-5.08/14 0.016s, n=14676, sd=20}
Bf3 {+4.65/12 0.011s, n=11516, sd=24} 174. Ka3 {-5.08/14 0.012s, n=13979, sd=28}
Bc6 {+4.65/15 0.008s, n=13403, sd=27} 175. Kb2 {-5.05/16 0.023s, n=28383, sd=28}
Ba4 {+4.55/11 0.018s, n=14423, sd=32} 176. Ka3 {-5.00/14 0.009s, n=10167, sd=34}
Bc2 {+4.55/13 0.015s, n=12440, sd=34} 177. Kb2 {-5.06/13 0.010s, n=10058, sd=30}
Bd3 {+4.55/12 0.010s, n=11633, sd=22} 178. Nh3 {-5.06/13 0.010s, n=10816, sd=30}
Kf6 {+4.55/13 0.014s, n=10540, sd=24} 179. Nf2 {-5.06/15 0.018s, n=15736, sd=25}
Kf5 {+4.53/13 0.006s, n=10129, sd=33} 180. Ka3 {-5.06/14 0.010s, n=10745, sd=28}
Bc2 {+4.53/15 0.011s, n=11160, sd=28} 181. Kb2 {-5.06/16 0.011s, n=10557, sd=30}
Bb3 {+4.52/16 0.018s, n=16721, sd=25} 182. Ka3 {-5.06/16 0.011s, n=11672, sd=33}
Ke6 {+4.34/13 0.010s, n=14902, sd=27} 183. Ne4 {-4.92/15 0.010s, n=13314, sd=26}
Kf5 {+4.52/13 0.018s, n=21709, sd=25} 184. Nf2 {-4.15/14 0.024s, n=23183, sd=29}
Ke5 {+4.38/12 0.009s, n=10326, sd=24} 185. Nh3 {-4.04/9 0.014s, n=13313, sd=32}
Kf6 {+3.82/12 0.031s, n=28858, sd=46} 186. Nf2 {-3.99/12 0.012s, n=11300, sd=26}
Kf5 {+3.82/12 0.013s, n=13611, sd=35} 187. Kb2 {-3.84/11 0.014s, n=13748, sd=31}
Ke5 {+3.82/15 0.007s, n=13389, sd=36} 188. Nh3 {-3.84/10 0.010s, n=13958, sd=30}
Kf6 {+3.82/12 0.012s, n=10541, sd=26} 189. Ka3 {-3.84/13 0.012s, n=13063, sd=36}
Kg6 {+3.82/11 0.015s, n=13226, sd=27} 190. Nf2 {-3.84/12 0.009s, n=13674, sd=31}
Kh5 {+3.82/14 0.031s, n=34721, sd=25} 191. Kb2 {-3.84/12 0.016s, n=14687, sd=20}
Ba4 {+3.82/16 0.012s, n=13096, sd=24} 192. Ka3 {-3.84/14 0.012s, n=10713, sd=17}
Be8 {+3.82/17 0.016s, n=14641, sd=33} 193. Ka2 {-3.84/15 0.012s, n=10977, sd=21}
a4 {+3.86/14 0.011s, n=12053, sd=27} 194. Ka3 {-3.84/15 0.007s, n=11078, sd=28}
Bb5 {+3.94/14 0.007s, n=10016, sd=21} 195. Kb2 {-3.84/16 0.013s, n=13990, sd=39}
Kg6 {+3.94/15 0.011s, n=11811, sd=23} 196. Ka2 {-3.84/17 0.009s, n=12178, sd=35}
Be8 {+3.94/16 0.012s, n=11413, sd=21} 197. Kb2 {-3.84/15 0.013s, n=10968, sd=33}
Kf5 {+3.94/16 0.012s, n=11687, sd=21} 198. Ka2 {-3.84/17 0.016s, n=14624, sd=32}
Bc6 {+3.94/14 0.012s, n=11713, sd=26} 199. Ka3 {-3.84/16 0.012s, n=11223, sd=24}
Bb5 {+3.89/16 0.015s, n=15088, sd=23} 200. Ka2 {-3.84/19 0.010s, n=10939, sd=27}
Bc6 {+3.89/15 0.010s, n=10774, sd=25} 201. Ka3 {-3.84/19 0.013s, n=12317, sd=28}
Bb5 {+3.89/17 0.014s, n=12749, sd=26} 202. Ka2 {-3.84/18 0.012s, n=12512, sd=28}
Be8 {+3.75/15 0.014s, n=12638, sd=31} 203. Ka3 {-3.84/18 0.010s, n=11325, sd=32}
Bc6 {+3.72/14 0.010s, n=11112, sd=18} 204. Ka2 {-3.84/17 0.010s, n=12788, sd=27}
Bd7 {+3.58/13 0.014s, n=12609, sd=19} 205. Ka3 {-3.84/18 0.015s, n=13699, sd=28}
Ke5 {+3.58/13 0.006s, n=10213, sd=20} 206. Kb2 {-3.84/18 0.012s, n=13460, sd=25}
Bc6 {+3.45/15 0.021s, n=19102, sd=25} 207. Ka2 {-3.84/17 0.012s, n=10687, sd=26}
Be8 {+3.45/14 0.015s, n=13096, sd=22} 208. Kb2 {-3.84/17 0.014s, n=12337, sd=26}
Kf6 {+3.45/15 0.010s, n=12809, sd=25}
209. Ng4+ {-3.84/16 0.011s, n=12875, sd=26}
Kf5 {+3.45/16 0.016s, n=13493, sd=30} 210. Nf2 {-3.84/18 0.012s, n=11873, sd=27}
Bd7 {+3.45/16 0.009s, n=10404, sd=29} 211. Ka3 {-3.84/18 0.011s, n=10916, sd=28}
Ke5 {+3.45/14 0.013s, n=10119, sd=33} 212. Kb2 {-3.84/18 0.012s, n=11399, sd=23}
Bc6 {+3.45/17 0.019s, n=21942, sd=27} 213. Ka3 {-3.84/18 0.013s, n=12026, sd=23}
Kf5 {+3.45/16 0.017s, n=15048, sd=22} 214. Ka2 {-3.84/18 0.010s, n=11688, sd=28}
Ke6 {+3.45/16 0.012s, n=10985, sd=19} 215. Ka3 {-3.84/16 0.008s, n=10990, sd=23}
Ke5 {+3.45/16 0.012s, n=12371, sd=19} 216. Kb2 {-3.84/17 0.014s, n=12973, sd=24}
Kf6 {+3.45/16 0.015s, n=12849, sd=29} 217. Ka2 {-3.84/16 0.012s, n=10116, sd=20}
Bd7 {+3.45/16 0.014s, n=12649, sd=19}
218. Ne4+ {-3.84/15 0.011s, n=10228, sd=28}
Kg6 {+3.45/13 0.014s, n=12373, sd=32} 219. Nf2 {-3.84/17 0.013s, n=12115, sd=25}
Be8 {+3.45/16 0.015s, n=13366, sd=28} 220. Ka3 {-3.84/18 0.008s, n=10372, sd=26}
Bb5 {+3.45/14 0.007s, n=10328, sd=25} 221. Ng4 {-3.84/18 0.009s, n=11974, sd=25}
Kf5 {+3.45/17 0.013s, n=11622, sd=31} 222. Nf2 {-3.84/17 0.012s, n=15858, sd=25}
Bd7 {+3.45/18 0.041s, n=43414, sd=35} 223. Kb2 {-3.73/16 0.018s, n=16249, sd=26}
Ke6 {+3.45/17 0.011s, n=11350, sd=27} 224. Ne4 {-3.73/13 0.014s, n=12521, sd=26}
Kf5 {+3.35/13 0.012s, n=10493, sd=28} 225. Nf2 {-3.84/13 0.023s, n=16981, sd=20}
Kg6 {+3.38/16 0.015s, n=13099, sd=29} 226. Ka2 {-3.58/14 0.016s, n=14062, sd=26}
Kh6 {+3.34/14 0.011s, n=15044, sd=28} 227. Ka3 {-3.58/11 0.026s, n=20898, sd=28}
Kh5 {+3.35/17 0.015s, n=13678, sd=29} 228. Kb2 {-3.45/14 0.011s, n=12517, sd=26}
Be8 {+3.35/17 0.017s, n=15668, sd=25} 229. Ka2 {-3.59/13 0.012s, n=11399, sd=32}
Bb5 {+3.34/15 0.015s, n=13281, sd=29} 230. Kb2 {-3.73/13 0.013s, n=10654, sd=22}
Kg6 {+3.31/15 0.019s, n=16608, sd=27} 231. Ng4 {-3.30/13 0.016s, n=18900, sd=21}
Kf5 {+3.31/15 0.013s, n=12101, sd=25} 232. Nf2 {-3.70/14 0.013s, n=14533, sd=24}
Kf6 {+3.29/15 0.021s, n=18899, sd=23}
233. Ng4+ {-3.70/14 0.013s, n=10864, sd=20}
Ke6 {+3.29/13 0.027s, n=21316, sd=21} 234. Ka3 {-3.49/13 0.018s, n=14991, sd=20}
Kd5 {+3.16/13 0.013s, n=10295, sd=19} 235. Nf2 {-3.57/12 0.013s, n=10057, sd=23}
Ke5 {+3.13/13 0.015s, n=12591, sd=19} 236. Ka2 {-3.15/13 0.013s, n=16125, sd=20}
Kf5 {+3.03/14 0.018s, n=17071, sd=18} 237. Ka3 {-3.11/12 0.016s, n=12825, sd=16}
Ke5 {+1.91/11 0.056s, n=58909, sd=17} 238. Ka2 {-2.86/11 0.017s, n=13406, sd=18}
Be8 {+1.94/9 0.044s, n=37575, sd=19} 239. Ng4+ {-2.84/11 0.013s, n=11807, sd=19}
Ke6 {+1.59/9 0.014s, n=10543, sd=15} 240. Ka3 {-2.18/11 0.023s, n=21335, sd=21}
Bc6 {+1.59/9 0.018s, n=14255, sd=15} 241. Ne3 {-2.26/11 0.014s, n=13297, sd=20}
Ke5 {+1.89/11 0.037s, n=26944, sd=20}
242. Nxc4+ {-2.06/12 0.028s, n=23064, sd=18}
Kf5 {+2.34/11 0.010s, n=13146, sd=21}
243. Nd6+ {-2.19/11 0.013s, n=10303, sd=17}
Ke6 {+2.05/11 0.021s, n=14778, sd=19} 244. Nc4 {-2.19/10 0.016s, n=13094, sd=20}
Kf5 {+1.90/13 0.019s, n=17429, sd=23}
245. Nd6+ {-2.15/12 0.015s, n=15798, sd=20}
Kg4 {+1.90/11 0.021s, n=16790, sd=22} 246. Nf7 {-1.85/11 0.014s, n=11095, sd=18}
Be8 {+1.92/12 0.018s, n=15410, sd=24}
247. Ne5+ {-1.74/11 0.017s, n=13169, sd=18}
Kh3 {+1.89/11 0.017s, n=13062, sd=23}
248. gxh4 {-2.04/11 0.026s, n=19570, sd=20}
gxh4 {+2.03/13 0.015s, n=13717, sd=26}
249. Nf3 {-2.04/14 0.014s, n=10837, sd=21} Kg4 {+2.17/14 0.013s, n=14264, sd=26}
250. Nxh4 {-2.03/15 0.015s, n=10084, sd=24}
Kxh4 {+2.17/15 0.014s, n=10431, sd=23} 251. c4 {-2.07/16 0.015s, n=12954, sd=23}
Kh3 {+2.17/14 0.009s, n=10350, sd=22} 252. c5 {-2.43/13 0.015s, n=13643, sd=26}
Bc6 {+2.17/16 0.014s, n=13061, sd=23} 253. Kb2 {-3.65/13 0.015s, n=17457, sd=23}
Kxh2 {+2.84/14 0.015s, n=11390, sd=24}
254. Kb1 {-3.99/11 0.007s, n=11478, sd=25} Kg2 {+3.45/13 0.014s, n=12243, sd=25}
255. Kc2 {-3.50/14 0.038s, n=29514, sd=28} Kg3 {+3.45/10 0.016s, n=12234, sd=22}
256. Kc3 {-3.34/13 0.019s, n=22750, sd=35} Kg2 {+3.66/11 0.013s, n=10942, sd=21}
257. Kc2 {-3.60/13 0.014s, n=14191, sd=30} Kg3 {+3.71/12 0.022s, n=22075, sd=29}
258. Kc3 {-4.34/14 0.011s, n=13939, sd=35} Kf4 {+3.48/12 0.020s, n=18148, sd=31}
259. Kc2 {-4.34/18 0.014s, n=14876, sd=36} Ke4 {+3.68/14 0.024s, n=21817, sd=31}
260. Kd2 {-4.25/18 0.009s, n=12311, sd=28} Kd4 {+3.44/11 0.027s, n=18274, sd=35}
261. Kc2 {-3.64/18 0.039s, n=41985, sd=32} Ke4 {+3.44/10 0.014s, n=10602, sd=31}
262. Kd2 {-3.70/12 0.014s, n=13227, sd=36} Kd4 {+3.43/11 0.014s, n=11348, sd=31}
263. Kc2 {-3.30/13 0.021s, n=23217, sd=30} Kc4 {+3.05/11 0.030s, n=30166, sd=31}
264. Kb1 {-3.07/11 0.016s, n=14463, sd=30} Kb3 {+3.05/14 0.023s, n=19952, sd=32}
265. Ka1 {-3.02/13 0.010s, n=12616, sd=30} Kc2 {+3.05/13 0.016s, n=15262, sd=35}
266. Ka2 {-3.02/15 0.026s, n=19960, sd=33} Kd3 {+3.05/13 0.013s, n=10932, sd=33}
267. Ka1 {-3.02/15 0.016s, n=16838, sd=31} Kc3 {+3.05/15 0.015s, n=12926, sd=25}
268. Kb1 {-3.02/17 0.008s, n=11865, sd=37} Kb4 {+3.05/14 0.013s, n=10756, sd=35}
269. Ka1 {-3.02/12 0.014s, n=10921, sd=32} Ka3 {+3.00/14 0.013s, n=12282, sd=25}
270. Kb1 {-3.02/16 0.009s, n=11818, sd=32} Kb3 {+2.88/12 0.019s, n=15516, sd=39}
271. Ka1 {-3.02/18 0.019s, n=15101, sd=36} Kc2 {+2.61/11 0.031s, n=23951, sd=37}
272. Ka2 {-3.02/18 0.017s, n=10872, sd=34} Kd3 {+2.69/11 0.018s, n=13735, sd=21}
273. Ka1 {-3.02/17 0.009s, n=10847, sd=40} Kc3 {+2.60/11 0.013s, n=12767, sd=34}
274. Kb1 {-3.02/18 0.015s, n=12143, sd=41} Kc4 {+2.59/12 0.016s, n=12004, sd=27}
275. Ka2 {-3.02/16 0.013s, n=12976, sd=27} Kd4 {+2.51/15 0.014s, n=15062, sd=41}
276. Ka1 {-3.02/15 0.009s, n=11596, sd=38} Kd3 {+2.51/13 0.012s, n=11029, sd=35}
277. Kb1 {-3.02/17 0.011s, n=10398, sd=35} Kd2 {+2.51/14 0.009s, n=10783, sd=29}
278. Kb2 {-2.90/14 0.014s, n=12252, sd=27} Ke2 {+2.51/16 0.013s, n=11451, sd=30}
279. Ka2 {-3.02/15 0.022s, n=15734, sd=36} Kf3 {+2.51/17 0.025s, n=13471, sd=35}
280. Kb2 {-3.02/18 0.014s, n=10745, sd=32} Kf4 {+2.51/17 0.024s, n=16210, sd=31}
281. Kc2 {-3.00/15 0.014s, n=10232, sd=27} Kf3 {+2.51/15 0.012s, n=11553, sd=25}
282. Kd3 {-2.93/15 0.015s, n=16066, sd=26} a5 {+2.51/11 0.011s, n=10831, sd=21}
283. Kc2 {-2.54/12 0.018s, n=20988, sd=25} Ke2 {+2.46/14 0.014s, n=13974, sd=21}
284. Kb1 {-1.91/12 0.015s, n=13320, sd=23} Kd3 {+2.45/11 0.015s, n=10749, sd=22}
285. Ka2 {-1.74/12 0.017s, n=12217, sd=19} Kc4 {+2.30/12 0.044s, n=32499, sd=20}
286. Ka3 {-2.38/13 0.015s, n=11052, sd=24} Kc3 {+2.21/11 0.016s, n=12005, sd=23}
287. Ka2 {-2.37/17 0.018s, n=11529, sd=24} Kc4 {+2.02/11 0.007s, n=11186, sd=21}
288. Ka3 {-2.37/20 0.016s, n=11806, sd=24} Kd3 {+1.77/10 0.014s, n=11009, sd=21}
289. Kb2 {-2.37/17 0.011s, n=11768, sd=34} Kd2 {+1.71/11 0.014s, n=11054, sd=25}
290. Ka1 {-2.37/15 0.008s, n=11976, sd=35} Kc3 {+1.80/11 0.012s, n=10415, sd=28}
291. Ka2 {-2.37/19 0.007s, n=11212, sd=34} Kb4 {+1.80/13 0.018s, n=16655, sd=34}
292. Kb2 {-2.37/20 0.012s, n=13473, sd=28}
Kxc5 {+1.80/14 0.011s, n=10640, sd=30}
293. Ka2 {-2.37/20 0.014s, n=10617, sd=27} Kd6 {+1.79/14 0.021s, n=14420, sd=27}
294. Kb2 {-2.31/21 0.033s, n=23865, sd=28} Ke7 {+2.91/14 0.020s, n=13068, sd=25}
295. Ka3 {-2.31/18 0.015s, n=10279, sd=27} Kf7 {+3.18/15 0.015s, n=10721, sd=21}
296. Ka2 {-2.31/18 0.016s, n=10429, sd=26} Kg8 {+2.90/15 0.017s, n=12635, sd=32}
297. Ka3 {-2.31/21 0.011s, n=10139, sd=25} Kh7 {+2.90/18 0.017s, n=13482, sd=35}
298. Kb2 {-2.31/21 0.015s, n=10702, sd=25} Bd5 {+2.90/18 0.013s, n=11488, sd=39}
299. Ka3 {-2.31/17 0.016s, n=11022, sd=37} Bb3 {+2.90/19 0.012s, n=11628, sd=35}
300. Kb2 {-2.31/19 0.013s, n=10040, sd=35} Kh8 {+2.90/19 0.015s, n=10991, sd=37}
301. Ka3 {-2.31/21 0.010s, n=10602, sd=34} Kg8 {+2.90/21 0.013s, n=10396, sd=25}
302. Kb2 {-2.31/23 0.016s, n=10889, sd=34} Kg7 {+2.90/23 0.016s, n=11800, sd=31}
303. Ka1 {-2.31/19 0.016s, n=10883, sd=40} Bd5 {+2.90/20 0.008s, n=10857, sd=25}
304. Kb1 {-2.31/20 0.013s, n=10278, sd=29} Kh7 {+2.90/19 0.010s, n=11911, sd=31}
305. Kb2 {-2.31/22 0.016s, n=11144, sd=34} Bc6 {+2.90/22 0.017s, n=12207, sd=33}
306. Ka3 {-2.31/21 0.017s, n=12124, sd=38} Be8 {+2.90/22 0.015s, n=10833, sd=37}
307. Kb2 {-2.31/22 0.015s, n=10695, sd=38} Bb5 {+2.90/23 0.011s, n=12708, sd=35}
308. Ka2 {-2.31/21 0.014s, n=10675, sd=41}
Bc4+ {+2.90/22 0.012s, n=10276, sd=35}
309. Ka3 {-2.31/20 0.018s, n=11949, sd=37} Bb3 {+2.90/22 0.013s, n=11302, sd=33}
310. Kb2 {-2.31/22 0.014s, n=12715, sd=42} Kh8 {+2.90/21 0.013s, n=11038, sd=31}
311. Ka3 {-2.31/22 0.017s, n=11686, sd=35} Kg7 {+2.90/20 0.011s, n=10647, sd=29}
312. Kb2 {-2.31/22 0.018s, n=11690, sd=28} Kg8 {+2.90/22 0.011s, n=12798, sd=29}
313. Ka3 {-2.31/23 0.015s, n=11934, sd=30} Kh8 {+2.90/22 0.015s, n=11264, sd=37}
314. Kb2 {-2.31/23 0.007s, n=10492, sd=32} Kh7 {+2.90/23 0.010s, n=10430, sd=36}
315. Ka3 {-2.31/22 0.010s, n=11197, sd=39} Kg7 {+2.90/21 0.015s, n=10193, sd=31}
316. Kb2 {-2.31/22 0.018s, n=12375, sd=36} Kg8 {+2.90/21 0.016s, n=11046, sd=36}
317. Ka3 {-2.31/21 0.016s, n=10717, sd=34} Kh8 {+2.90/21 0.012s, n=12163, sd=29}
318. Kb2 {-2.31/24 0.018s, n=12991, sd=36} Kh7 {+2.90/22 0.009s, n=12556, sd=31}
319. Ka3 {-2.31/23 0.017s, n=11849, sd=38} Kg8 {+2.90/21 0.011s, n=11425, sd=33}
320. Kb2 {-2.31/23 0.009s, n=11135, sd=36} Bd5 {+2.90/21 0.016s, n=11281, sd=31}
321. Ka3 {-2.31/20 0.010s, n=10932, sd=29} Bc6 {+2.90/19 0.014s, n=10328, sd=25}
322. Kb2 {-2.31/21 0.014s, n=10018, sd=27} Kh8 {+2.90/19 0.013s, n=10286, sd=24}
323. Ka3 {-2.31/21 0.009s, n=10046, sd=34} Kg8 {+2.90/19 0.014s, n=10339, sd=34}
324. Kb2 {-2.31/23 0.015s, n=10082, sd=32} Kh8 {+2.88/17 0.014s, n=10146, sd=29}
325. Ka3 {-2.31/23 0.013s, n=11097, sd=32} Be8 {+2.88/18 0.012s, n=10188, sd=30}
326. Ka2 {-2.31/22 0.015s, n=10877, sd=34} Kh7 {+2.88/19 0.007s, n=10801, sd=25}
327. Ka3 {-2.31/22 0.015s, n=10012, sd=32} Bc6 {+2.88/22 0.013s, n=10852, sd=27}
328. Ka2 {-2.31/24 0.015s, n=11971, sd=30} Bb5 {+2.88/22 0.015s, n=11929, sd=28}
329. Kb2 {-2.31/23 0.016s, n=10949, sd=28} Kg8 {+2.88/22 0.012s, n=10121, sd=27}
330. Ka2 {-2.31/23 0.022s, n=14262, sd=26} Be8 {+2.88/22 0.013s, n=10014, sd=25}
331. Kb2 {-2.31/22 0.018s, n=12611, sd=24} Kh7 {+2.88/22 0.015s, n=10321, sd=23}
332. Ka2 {-2.31/20 0.018s, n=12008, sd=22} Kg7 {+2.74/19 0.014s, n=10044, sd=21}
333. Ka3 {-1.83/20 0.086s, n=72629, sd=39} Kh8 {+0.49/18 0.089s, n=68268, sd=25}
334. Kb2 {-1.61/15 0.024s, n=15284, sd=25} Kg7 {+0.35/13 0.067s, n=40552, sd=23}
335. Ka3 {-1.75/13 0.019s, n=12060, sd=16} Kf7 {+2.31/15 0.023s, n=12088, sd=24}
336. Kb2 {-1.19/14 0.035s, n=21678, sd=30} Ke7 {+2.67/17 0.027s, n=15797, sd=35}
337. Ka3 {-0.99/11 0.013s, n=14381, sd=16} Kd6 {+2.95/17 0.015s, n=10186, sd=32}
338. Kb2 {-2.21/11 0.010s, n=11733, sd=20} Kc5 {+3.02/16 0.019s, n=16556, sd=26}
339. Ka3 {-3.38/12 0.016s, n=11167, sd=26} Kc4 {+2.46/17 0.079s, n=56108, sd=41}
340. Kb2 {-3.65/14 0.019s, n=14243, sd=28} Kb4 {+3.04/16 0.024s, n=19098, sd=39}
341. Ka2 {-3.65/14 0.016s, n=12075, sd=31}
Bf7+ {+2.71/15 0.026s, n=24164, sd=36}
342. Kb2 {-3.65/13 0.014s, n=11167, sd=35} a3+ {+2.74/16 0.013s, n=13158, sd=34}
343. Ka1 {-3.65/13 0.021s, n=25117, sd=32} Bc4 {+2.74/14 0.017s, n=11873, sd=29}
344. Kb1 {-3.65/11 0.010s, n=12867, sd=27} Kb5 {+2.74/13 0.014s, n=13696, sd=33}
345. Ka1 {-3.65/14 0.016s, n=13057, sd=31} Kb4 {+2.74/11 0.047s, n=38165, sd=37}
346. Kb1 {-3.65/14 0.012s, n=13501, sd=32} Kb5 {+2.58/9 0.024s, n=17672, sd=35}
347. Ka1 {-3.65/14 0.007s, n=11573, sd=32} Be6 {+2.30/10 0.012s, n=15958, sd=25}
348. Kb1 {-3.65/13 0.009s, n=10218, sd=37} Kb6 {+2.30/9 0.015s, n=15382, sd=23}
349. Ka1 {-3.65/13 0.016s, n=11023, sd=38} Kc5 {+2.30/10 0.032s, n=19445, sd=25}
350. Kb1 {-3.65/13 0.018s, n=13547, sd=37} Kb6 {+2.90/11 0.026s, n=21858, sd=45}
351. Ka1 {-3.65/13 0.009s, n=10766, sd=36} Kc5 {+2.36/11 0.031s, n=23124, sd=31}
352. Kb1 {-2.66/10 0.014s, n=15403, sd=24} Bb3 {+2.36/11 0.029s, n=21858, sd=37}
353. Ka1 {-2.98/11 0.029s, n=18710, sd=25} Bg8 {+2.36/13 0.013s, n=12400, sd=29}
354. Kb1 {-2.98/12 0.023s, n=14895, sd=34} Kb5 {+2.39/12 0.017s, n=11446, sd=45}
355. Ka1 {-2.98/12 0.013s, n=11219, sd=37} Bd5 {+2.36/13 0.088s, n=85885, sd=59}
356. Kb1 {-2.98/12 0.019s, n=13691, sd=30} Kb4 {+2.36/13 0.019s, n=12929, sd=37}
357. Ka1 {-2.98/15 0.017s, n=13564, sd=38} Bf7 {+2.36/12 0.014s, n=12738, sd=29}
358. Kb1 {-3.00/13 0.016s, n=11470, sd=37} Kc5 {+2.36/11 0.010s, n=12518, sd=40}
359. Ka1 {-2.99/15 0.013s, n=12142, sd=35} Kb5 {+2.36/14 0.008s, n=10093, sd=37}
360. Kb1 {-2.99/14 0.023s, n=14430, sd=38} Kb4 {+2.36/13 0.018s, n=11861, sd=65}
361. Ka1 {-2.99/16 0.023s, n=15992, sd=49} Be6 {+2.36/14 0.022s, n=14856, sd=45}
362. Kb1 {-2.99/15 0.017s, n=12387, sd=34} Bd5 {+2.36/12 0.017s, n=11327, sd=47}
363. Ka1 {-2.99/15 0.015s, n=10823, sd=42} Bg8 {+2.36/13 0.016s, n=10759, sd=40}
364. Kb1 {-2.99/15 0.016s, n=11101, sd=44} Kb3 {+2.36/13 0.020s, n=13135, sd=51}
365. Ka1 {-2.99/14 0.015s, n=10488, sd=42} Bf7 {+2.36/15 0.019s, n=13228, sd=43}
366. Kb1 {-2.99/15 0.016s, n=13242, sd=42}
Bg6+ {+2.36/13 0.019s, n=16714, sd=47}
367. Ka1 {-2.99/16 0.014s, n=14677, sd=46} Ka4 {+2.43/14 0.020s, n=13470, sd=51}
368. Ka2 {-2.99/15 0.016s, n=11509, sd=38} Kb4 {+2.43/16 0.011s, n=15668, sd=29}
369. Ka1 {-2.99/16 0.013s, n=10759, sd=47} Bh7 {+2.43/16 0.014s, n=12546, sd=43}
370. Ka2 {-2.99/17 0.020s, n=10688, sd=46} Bd3 {+2.43/18 0.016s, n=10951, sd=45}
371. Ka1 {-2.99/17 0.013s, n=10012, sd=44} Be4 {+2.43/17 0.014s, n=13383, sd=35}
372. Ka2 {-3.05/17 0.014s, n=11579, sd=42} Ka4 {+2.43/14 0.013s, n=10667, sd=41}
373. Ka1 {-3.05/18 0.015s, n=12515, sd=40} Bd5 {+2.43/14 0.019s, n=10852, sd=39}
374. Kb1 {-3.05/20 0.015s, n=10860, sd=37} Be6 {+2.43/15 0.017s, n=10573, sd=37}
375. Ka1 {-3.05/20 0.009s, n=11966, sd=36} Kb4 {+2.43/19 0.021s, n=17368, sd=35}
376. Kb1 {-3.05/16 0.015s, n=10075, sd=34} Bg8 {+2.43/18 0.019s, n=12531, sd=33}
377. Ka1 {-3.05/18 0.023s, n=15203, sd=32} Bf7 {+2.43/19 0.031s, n=20480, sd=31}
378. Kb1 {-3.05/14 0.015s, n=10156, sd=30} Kc5 {+2.43/18 0.010s, n=10143, sd=29}
379. Ka1 {-3.14/15 0.016s, n=14036, sd=28} Bg8 {+2.43/13 0.020s, n=14872, sd=27}
380. Kb1 {-3.12/14 0.011s, n=15662, sd=26} Kb5 {+2.82/13 0.017s, n=16696, sd=25}
381. Ka1 {-3.28/13 0.018s, n=11497, sd=24} Kb4 {+2.30/12 0.017s, n=12584, sd=23}
382. Kb1 {-3.10/13 0.020s, n=14503, sd=22} Kc5 {+2.33/13 0.029s, n=17413, sd=21}
383. Ka1 {-2.00/13 0.018s, n=13873, sd=20} Bd5 {+2.32/10 0.021s, n=12967, sd=19}
384. Kb1 {-2.71/12 0.026s, n=15516, sd=18} Bg8 {+2.28/11 0.013s, n=11165, sd=17}
385. Ka1 {-2.08/11 0.012s, n=10205, sd=16} Bd5 {+1.93/11 0.016s, n=14515, sd=15}
386. Kb1 {-2.18/12 0.028s, n=21358, sd=20} Kb6 {+1.67/9 0.019s, n=13839, sd=13}
387. Ka1 {-2.18/12 0.021s, n=14351, sd=24} Kb5 {+1.39/10 0.013s, n=10256, sd=11}
388. Kb1 {-2.18/12 0.020s, n=14767, sd=34} Be6 {+4.22/12 0.017s, n=10010, sd=17}
389. Ka1 {-2.18/14 0.025s, n=15158, sd=32} Kb6 {+1.79/12 0.048s, n=34775, sd=33}
390. Kb1 {-2.18/13 0.010s, n=10110, sd=42} Kc6 {+1.62/10 0.023s, n=13379, sd=25}
391. Ka1 {-2.18/14 0.025s, n=14830, sd=40} a4 {+1.62/11 0.020s, n=11729, sd=41}
392. Kb1 {-2.18/15 0.020s, n=12289, sd=44} Bg8 {+1.62/10 0.033s, n=18991, sd=47}
393. Ka1 {-2.18/15 0.014s, n=11225, sd=42} Kc7 {+1.62/12 0.021s, n=14350, sd=45}
394. Kb1 {-2.18/15 0.020s, n=10511, sd=44} Bb3 {+1.62/11 0.021s, n=17106, sd=75}
395. Ka1 {-2.18/15 0.014s, n=11071, sd=40} Kd8 {+1.62/12 0.014s, n=13201, sd=87}
396. Kb1 {-2.18/15 0.013s, n=10223, sd=50} Bg8 {+1.62/12 0.019s, n=12894, sd=65}
397. Ka1 {-2.18/17 0.016s, n=12005, sd=38} Kc7 {+1.68/14 0.019s, n=11538, sd=51}
398. Kb1 {-2.18/14 0.014s, n=10741, sd=52} Kb8 {+1.68/13 0.010s, n=11281, sd=37}
399. Ka1 {-2.18/14 0.017s, n=10436, sd=44} Bc4 {+1.67/11 0.058s, n=53638, sd=95}
400. Kb1 {-2.18/15 0.012s, n=11807, sd=46} Ka7 {+1.67/9 0.017s, n=11281, sd=71}
401. Ka1 {-2.18/18 0.015s, n=12899, sd=50} Be6 {+1.67/12 0.014s, n=12285, sd=55}
402. Kb1 {-2.18/15 0.019s, n=11468, sd=64}
Bb3 {+1.23/11 0.134s, n=102212, sd=87}
403. Ka1 {-2.18/16 0.011s, n=10797, sd=62} Bg8 {+1.23/11 0.018s, n=15113, sd=44}
404. Kb1 {-2.18/16 0.018s, n=11135, sd=54} Bc4 {+1.23/10 0.019s, n=11413, sd=47}
405. Ka1 {-2.18/16 0.019s, n=12090, sd=64}
Bd5 {+1.23/11 0.160s, n=119095, sd=53}
406. Kb1 {-2.18/15 0.020s, n=12628, sd=72} Be6 {+1.23/10 0.016s, n=13647, sd=42}
407. Ka1 {-2.18/13 0.014s, n=12189, sd=66} Bf7 {+1.23/12 0.016s, n=10305, sd=51}
408. Kb1 {-2.18/14 0.014s, n=11062, sd=68} Bd5 {+1.23/12 0.029s, n=22010, sd=43}
409. Ka1 {-2.18/15 0.008s, n=10442, sd=62} Kb6 {+1.40/11 0.010s, n=13281, sd=37}
410. Kb1 {-2.18/16 0.011s, n=11693, sd=61} Kb5 {+1.40/13 0.024s, n=13905, sd=45}
411. Ka1 {-2.18/16 0.014s, n=13429, sd=60} Bg8 {+1.26/11 0.026s, n=18084, sd=47}
412. Kb1 {-2.18/14 0.012s, n=13636, sd=60} Bd5 {+1.26/10 0.027s, n=23293, sd=59}
413. Ka1 {-2.18/15 0.014s, n=10718, sd=58} Bg8 {+1.26/11 0.012s, n=11302, sd=44}
414. Kb1 {-2.18/15 0.011s, n=10232, sd=56} Bf7 {+1.26/12 0.017s, n=11870, sd=55}
415. Ka1 {-2.18/16 0.022s, n=13458, sd=54} Bd5 {+1.26/14 0.009s, n=10095, sd=45}
416. Kb1 {-2.18/15 0.011s, n=10265, sd=52} Kb6 {+1.26/12 0.019s, n=10534, sd=45}
417. Ka1 {-2.18/15 0.011s, n=11557, sd=50} Bg8 {+1.26/14 0.016s, n=13230, sd=43}
418. Kb1 {-2.18/17 0.015s, n=10113, sd=48} Ka7 {+1.90/13 0.027s, n=17717, sd=37}
419. Ka1 {-2.18/17 0.022s, n=13712, sd=46} Kb8 {+2.01/12 0.021s, n=12566, sd=41}
420. Kb1 {-2.18/17 0.019s, n=11215, sd=40} Bd5 {+2.01/12 0.018s, n=11022, sd=37}
421. Ka1 {-2.18/17 0.018s, n=10703, sd=36} Ka7 {+1.45/13 0.057s, n=35155, sd=53}
422. Kb1 {-2.18/18 0.016s, n=10876, sd=40} Bb3 {+1.45/14 0.015s, n=11402, sd=39}
423. Ka1 {-2.18/18 0.018s, n=11864, sd=38} Kb8 {+1.45/13 0.019s, n=12720, sd=37}
424. Kb1 {-2.18/17 0.058s, n=37096, sd=36} Bg8 {+1.45/11 0.017s, n=12371, sd=35}
425. Ka1 {-2.18/16 0.021s, n=13408, sd=34} Bd5 {+1.50/12 0.021s, n=12836, sd=31}
426. Kb1 {-2.18/16 0.039s, n=22666, sd=32} Bb3 {+1.48/13 0.036s, n=25351, sd=40}
427. Ka1 {-2.18/16 0.026s, n=18590, sd=30} Kc7 {+1.48/14 0.022s, n=16813, sd=29}
428. Kb1 {-2.59/12 0.021s, n=14053, sd=28} Be6 {+1.50/14 0.014s, n=13068, sd=29}
429. Ka1 {-2.37/13 0.025s, n=12286, sd=26} Bc4 {+1.22/14 0.060s, n=45350, sd=29}
430. Kb1 {-2.21/13 0.019s, n=14567, sd=24} Bf7 {+1.32/12 0.023s, n=15589, sd=33}
431. Ka1 {-2.21/13 0.014s, n=13218, sd=22} Bb3 {+1.39/13 0.032s, n=20716, sd=21}
432. Kb1 {-2.29/12 0.014s, n=12045, sd=20} Kb8 {+1.36/12 0.038s, n=20615, sd=19}
433. Ka1 {-2.21/13 0.016s, n=10983, sd=18} Bf7 {+0.96/12 0.037s, n=29773, sd=17}
434. Kb1 {-2.20/13 0.018s, n=14840, sd=16} Kc7 {+0.97/10 0.015s, n=10254, sd=24}
435. Ka1 {-2.15/12 0.011s, n=11266, sd=14} Kb8 {+0.97/10 0.032s, n=19718, sd=18}
436. Kb1 {-2.01/11 0.020s, n=10522, sd=12} Ka8 {+0.94/10 0.037s, n=24391, sd=27}
437. Ka1 {-2.17/11 0.023s, n=14275, sd=10} Ka7 {+0.56/9 0.015s, n=10164, sd=23}
438. Kb1 {-1.21/12 0.042s, n=27959, sd=26} Ka8 {+1.03/10 0.021s, n=14118, sd=31}
439. Ka1 {-2.46/11 0.050s, n=31974, sd=29} Bc4 {+1.23/12 0.046s, n=37089, sd=42}
440. Kb1 {-2.33/10 0.011s, n=13307, sd=34} Bd5 {+1.59/13 0.026s, n=21108, sd=67}
441. Ka1 {-1.69/9 0.016s, n=14686, sd=30} a2 {+1.45/13 0.082s, n=64157, sd=45}
442. Kb2 {-2.19/10 0.038s, n=30267, sd=30} Kb7 {+1.45/14 0.035s, n=30956, sd=91}
443. Ka1 {-2.19/11 0.034s, n=21958, sd=17} Bg8 {+1.45/12 0.029s, n=27534, sd=91}
444. Kb2 {-2.19/12 0.019s, n=12352, sd=24}
Bc4 {+1.40/11 0.176s, n=110335, sd=65}
445. Ka1 {-2.19/14 0.042s, n=25293, sd=46} Kb6 {+1.40/12 0.040s, n=21046, sd=23}
446. Kb2 {-2.19/13 0.028s, n=15107, sd=34} Bd5 {+1.40/11 0.057s, n=32350, sd=35}
447. Ka1 {-2.19/14 0.025s, n=13191, sd=52} Kc6 {+1.40/13 0.044s, n=23497, sd=71}
448. Kb2 {-2.19/14 0.019s, n=10707, sd=45} Kb5 {+1.43/9 0.019s, n=14649, sd=43}
449. Ka1 {-2.19/15 0.028s, n=20394, sd=40} Bc4 {+1.40/10 0.032s, n=19939, sd=25}
450. Kb2 {-2.19/15 0.024s, n=18134, sd=46} Ka6 {+1.40/12 0.031s, n=20743, sd=35}
451. Ka1 {-2.19/16 0.015s, n=12777, sd=46} Bd5 {+1.40/12 0.055s, n=34409, sd=33}
452. Kb2 {-2.19/15 0.029s, n=17163, sd=68} Kb7 {+1.40/11 0.012s, n=10897, sd=45}
453. Ka1 {-2.19/13 0.027s, n=15147, sd=52} Bc4 {+1.40/11 0.016s, n=10899, sd=35}
454. Kb2 {-2.19/14 0.020s, n=10972, sd=44} Ka6 {+1.50/13 0.024s, n=15491, sd=61}
455. Ka1 {-2.19/15 0.015s, n=10109, sd=46} Bd5 {+1.50/14 0.011s, n=10271, sd=45}
456. Kb2 {-2.19/13 0.010s, n=10001, sd=36} Kb6 {+1.46/9 0.011s, n=11176, sd=33}
457. Ka1 {-2.19/13 0.014s, n=10212, sd=38} Kb5 {+1.46/10 0.022s, n=11801, sd=29}
458. Kb2 {-2.19/13 0.018s, n=11840, sd=32} Ka5 {+1.46/11 0.019s, n=13637, sd=33}
459. Ka1 {-2.19/15 0.018s, n=10308, sd=34} Bg8 {+1.46/11 0.022s, n=12045, sd=28}
460. Kb2 {-2.20/16 0.021s, n=11680, sd=37} Ka6 {+1.46/10 0.026s, n=14864, sd=41}
461. Ka1 {-2.20/15 0.015s, n=11794, sd=40} Bc4 {+1.46/10 0.009s, n=10607, sd=43}
462. Kb2 {-2.20/16 0.016s, n=13095, sd=46} Bd5 {+1.46/12 0.028s, n=14963, sd=33}
463. Ka1 {-2.20/15 0.015s, n=10562, sd=44}
Be6 {+0.98/14 0.270s, n=186549, sd=43}
464. Kb2 {-2.20/13 0.022s, n=13244, sd=50} Kb6 {+0.98/11 0.014s, n=11145, sd=43}
465. Ka1 {-2.20/15 0.016s, n=12057, sd=52} Kb7 {+0.98/12 0.013s, n=10249, sd=41}
466. Kb2 {-2.20/15 0.014s, n=11587, sd=52} Ka6 {+0.98/12 0.041s, n=21419, sd=57}
467. Ka1 {-2.20/15 0.017s, n=12743, sd=50} Bc4 {+0.98/14 0.047s, n=31518, sd=41}
468. Kb2 {-2.20/15 0.020s, n=10785, sd=48} Kb7 {+0.98/13 0.021s, n=10878, sd=37}
469. Ka1 {-2.20/16 0.028s, n=14496, sd=46} Bd5 {+0.98/14 0.015s, n=12193, sd=47}
470. Kb2 {-2.20/14 0.018s, n=10612, sd=41}
a1=Q+ {+0.98/12 0.013s, n=11638, sd=47}
471. Kxa1 {-0.98/10 0.018s, n=10008, sd=16} a3 {+0.98/14 0.019s, n=10711, sd=43}
472. Kb1 {-1.20/11 0.032s, n=19943, sd=21} Bb3 {+0.98/12 0.022s, n=12055, sd=39}
473. Ka1 {-1.20/11 0.013s, n=10698, sd=25} Kc6 {+0.98/13 0.024s, n=16318, sd=49}
474. Kb1 {-1.20/12 0.022s, n=12727, sd=32} Bc4 {+0.98/13 0.013s, n=13073, sd=35}
475. Ka1 {-1.20/13 0.027s, n=13335, sd=36} Kb7 {+0.98/15 0.027s, n=14282, sd=47}
476. Kb1 {-1.20/14 0.037s, n=21724, sd=48} Bf7 {+1.91/14 1.060s, n=37781, sd=57}
477. Kc2 {-1.20/12 0.024s, n=13012, sd=38} Kc6 {+1.91/11 0.011s, n=12501, sd=43}
478. Kb1 {-1.20/13 0.017s, n=11901, sd=40} Kc5 {+1.67/10 0.011s, n=12895, sd=41}
479. Ka1 {-1.20/13 0.017s, n=10456, sd=38} Bc4 {+1.67/12 0.010s, n=11318, sd=49}
480. Kb1 {-1.20/14 0.016s, n=11907, sd=37} Bb3 {+1.67/12 0.010s, n=11272, sd=35}
481. Ka1 {-1.20/16 0.021s, n=10650, sd=40} Be6 {+1.67/14 0.026s, n=14281, sd=45}
482. Kb1 {-1.20/15 0.019s, n=12838, sd=45} Bb3 {+1.67/11 0.018s, n=10245, sd=39}
483. Ka1 {-1.20/15 0.036s, n=17173, sd=40} Be6 {+1.67/12 0.017s, n=11199, sd=45}
484. Kb1 {0.00/13 0.030s, n=12397, sd=42} Bd5 {+1.59/13 0.029s, n=22933, sd=31}
485. Ka1 {-1.76/13 0.020s, n=11160, sd=37} Bb3 {+1.59/13 0.020s, n=13254, sd=45}
486. Kb1 {-1.76/15 0.021s, n=11588, sd=41} Be6 {+1.59/14 0.028s, n=16162, sd=49}
487. Ka1 {-1.76/15 0.033s, n=11306, sd=56} Kb6 {+1.59/14 0.015s, n=10301, sd=43}
488. Kb1 {-1.76/15 0.108s, n=12403, sd=68} Kc6 {+1.59/16 0.116s, n=21791, sd=45}
489. Ka1 {-1.76/15 0.021s, n=11284, sd=44} Bg8 {+1.56/17 0.281s, n=20907, sd=39}
490. Kb1 {-1.76/15 0.012s, n=10371, sd=44} Kb7 {+1.56/11 0.293s, n=10844, sd=21}
491. Ka1 {-1.76/16 0.040s, n=13222, sd=62} Bf7 {+1.06/16 0.287s, n=11263, sd=35}
492. Kb1 {-1.76/15 0.085s, n=10859, sd=60} Ka6 {+1.56/11 0.089s, n=11875, sd=35}
493. Ka1 {-1.76/16 0.280s, n=11961, sd=42} Bg8 {+1.56/13 0.009s, n=10576, sd=33}
494. Kb1 {-1.76/16 0.219s, n=11653, sd=49} Kb5 {+1.56/14 0.018s, n=10112, sd=33}
495. Ka1 {-1.76/15 0.420s, n=11950, sd=48} Be6 {+1.11/17 1.422s, n=32053, sd=35}
496. Kb1 {-1.76/18 0.926s, n=13833, sd=52} Kb6 {+1.31/13 0.121s, n=12385, sd=51}
497. Ka1 {-1.76/17 0.399s, n=11714, sd=50} Bd5 {+1.31/14 0.016s, n=11558, sd=35}
498. Kb1 {-1.76/16 0.778s, n=16128, sd=46} Bf7 {+1.19/15 0.457s, n=17436, sd=37}
499. Ka1 {-1.76/17 0.409s, n=10933, sd=46} Ka6 {+1.28/12 0.081s, n=10830, sd=33}
500. Kb1 {0.00/199 0.005s, n=498, sd=36} Ka5 {+0.58/11 1.169s, n=21042, sd=25}
501. Ka1 {-1.76/18 0.222s, n=10879, sd=42} Bg8 {+0.98/12 0.647s, n=14199, sd=36}
502. Kb1 {-1.76/17 0.410s, n=10089, sd=40} Be6 {+1.08/13 0.953s, n=26928, sd=39}
503. Ka1 {-1.76/16 0.307s, n=10113, sd=38} Bb3 {+1.08/13 0.248s, n=11013, sd=37}
504. Kb1 {-1.76/16 0.949s, n=14009, sd=36} Bc4 {+1.08/13 0.148s, n=10863, sd=35}
505. Ka1 {-1.76/16 0.661s, n=16652, sd=34} Bf7 {+0.62/10 0.676s, n=11774, sd=23}
506. Kb1 {-2.44/15 0.084s, n=11794, sd=32} Bc4 {+0.96/10 0.029s, n=25039, sd=31}
507. Ka1 {0.00/75 0.479s, n=10014, sd=20} Kb5 {+0.77/11 0.078s, n=10852, sd=29}
508. Kb1 {-1.87/13 0.648s, n=10352, sd=26} Bb3 {+0.77/11 0.385s, n=14665, sd=27}
509. Ka1 {0.00/83 0.636s, n=13628, sd=21} Bd5 {+1.15/13 0.475s, n=14415, sd=25}
510. Kb1 {0.00/199 0.027s, n=1279, sd=16} Ka5 {+0.26/10 1.156s, n=21934, sd=25}
511. Ka1 {-1.45/14 0.664s, n=17137, sd=22} a2 {+0.38/11 0.876s, n=17565, sd=22}
512. Kb2 {-1.35/13 0.072s, n=17499, sd=33} Bg8 {+0.36/11 2.047s, n=36482, sd=27}
513. Ka1 {-1.35/14 0.396s, n=10213, sd=30} Ka6 {+0.36/12 0.854s, n=16951, sd=27}
514. Kb2 {-1.35/15 0.741s, n=14557, sd=41} Bd5 {+0.36/12 0.761s, n=14918, sd=29}
515. Ka1 {-1.35/15 0.789s, n=12839, sd=49} Ka7 {+0.36/13 0.618s, n=12838, sd=36}
516. Kb2 {-1.35/14 0.636s, n=10186, sd=42}
Kb7 {+0.36/13 0.791s, n=16634, sd=37, White disconnects} 0-1