[Event "Fastchess Tournament"]
[Site "?"]
[Date "2026.04.25"]
[Round "14514"]
[White "PZChessBot-base"]
[Black "PZChessBot-dev"]
[Result "0-1"]
[SetUp "1"]
[FEN "r1nkbbr1/pqpppnpp/1p3p2/8/7P/N4P2/PPPPP1PB/Q1RBNK1R w HCga - 4 5"]
[Variant "Chess960"]
[GameDuration "00:00:42"]
[GameStartTime "2026-04-25T16:08:04 +0000"]
[GameEndTime "2026-04-25T16:08:47 +0000"]
[PlyCount "1024"]
[Termination "abandoned"]
[TimeControl "-"]

5. c4 {+1.14/8 0.019s, n=13490, sd=9} e5 {-1.72/8 0.020s, n=15557, sd=9}
6. O-O {+1.05/10 0.104s, n=55492, sd=14} g5 {-1.00/8 0.017s, n=10647, sd=9}
7. h5 {+2.49/11 0.067s, n=41077, sd=13} Bxa3 {-1.97/9 0.073s, n=38671, sd=13}
8. bxa3 {+1.67/9 0.042s, n=21332, sd=19} d6 {-1.45/9 0.024s, n=15062, sd=12}
9. Bc2 {+1.48/10 0.047s, n=24116, sd=14} Ne7 {-2.17/9 0.034s, n=19056, sd=14}
10. g4 {+1.32/10 0.056s, n=27507, sd=14} O-O-O {-1.95/9 0.022s, n=13644, sd=15}
11. d4 {+1.72/9 0.019s, n=14282, sd=10} c5 {-1.83/9 0.018s, n=10259, sd=10}
12. dxc5 {+1.97/9 0.017s, n=11380, sd=15} dxc5 {-1.75/10 0.030s, n=17205, sd=19}
13. Bxh7 {+1.54/9 0.041s, n=22963, sd=12} Rh8 {-1.56/9 0.021s, n=10149, sd=15}
14. Qb1 {+1.77/9 0.039s, n=17283, sd=17} Nh6 {-2.19/9 0.016s, n=14001, sd=12}
15. Bd3 {+0.73/10 0.065s, n=30533, sd=18} Nc6 {-2.07/11 0.177s, n=102342, sd=19}
16. Ng2 {+3.37/10 0.036s, n=20571, sd=12} Nd4 {-3.97/9 0.066s, n=35555, sd=15}
17. Ne3 {+3.97/9 0.047s, n=23747, sd=15} Bc6 {-2.60/11 0.026s, n=15742, sd=13}
18. Rf2 {+2.75/10 0.043s, n=23619, sd=15} Bxf3 {-1.28/11 0.066s, n=45487, sd=25}
19. Rxf3 {+1.95/12 0.083s, n=51883, sd=23}
Nxf3+ {-1.76/11 0.053s, n=34372, sd=25}
20. exf3 {+2.10/9 0.033s, n=22343, sd=22} Qxf3 {-2.09/10 0.018s, n=11662, sd=24}
21. Bf5+ {+2.06/12 0.048s, n=23706, sd=27}
Nxf5 {-1.77/11 0.037s, n=24940, sd=23}
22. Qxf5+ {+2.13/12 0.038s, n=22429, sd=21}
Qxf5 {-1.61/11 0.019s, n=13953, sd=21}
23. Nxf5 {+1.84/10 0.041s, n=20305, sd=21} Rd2 {-1.92/11 0.038s, n=26620, sd=21}
24. Bg3 {+2.37/12 0.033s, n=18931, sd=18} Rhd8 {-1.59/10 0.013s, n=11066, sd=18}
25. Ne7+ {+2.56/9 0.033s, n=13809, sd=14} Kd7 {-1.40/12 0.093s, n=49246, sd=24}
26. Nd5 {+1.06/11 0.076s, n=57667, sd=29} Rd4 {-1.04/11 0.019s, n=11047, sd=18}
27. Nxf6+ {+1.03/12 0.048s, n=30864, sd=30}
Ke6 {-0.34/11 0.019s, n=12708, sd=16} 28. Rf1 {+1.10/9 0.032s, n=16418, sd=28}
Rxc4 {-0.31/10 0.036s, n=15736, sd=23} 29. h6 {+1.08/11 0.016s, n=11567, sd=26}
Rcd4 {-1.16/10 0.030s, n=13069, sd=16} 30. h7 {+1.33/9 0.025s, n=12121, sd=23}
Rh8 {-0.96/11 0.023s, n=15587, sd=17} 31. Re1 {+1.33/11 0.024s, n=19304, sd=22}
Kxf6 {-1.12/9 0.016s, n=11964, sd=19}
32. Bxe5+ {+1.55/11 0.019s, n=12039, sd=24}
Kg6 {-1.41/10 0.063s, n=32138, sd=22} 33. Bxh8 {+1.52/10 0.018s, n=13460, sd=20}
Rxg4+ {-1.12/11 0.020s, n=11721, sd=18}
34. Kf2 {+1.56/12 0.022s, n=12713, sd=21} Kxh7 {-1.12/11 0.031s, n=16149, sd=18}
35. Be5 {+1.74/14 0.048s, n=27312, sd=21} Kg6 {-1.67/10 0.022s, n=18483, sd=16}
36. Bb8 {+1.54/12 0.018s, n=11579, sd=19} Ra4 {-1.62/11 0.041s, n=24078, sd=16}
37. Re3 {+1.71/12 0.018s, n=14499, sd=17} g4 {-1.51/10 0.046s, n=28096, sd=14}
38. Ke1 {+1.08/11 0.133s, n=76669, sd=21} Kf5 {-1.92/11 0.036s, n=20181, sd=15}
39. Ke2 {+1.50/11 0.018s, n=11018, sd=18} b5 {-1.13/9 0.022s, n=16532, sd=13}
40. Bd6 {+1.53/11 0.024s, n=14823, sd=19} Re4 {-1.25/10 0.017s, n=11358, sd=15}
41. Bxc5 {+1.60/12 0.019s, n=10852, sd=18}
Rxe3+ {-1.60/10 0.036s, n=25648, sd=22}
42. Kxe3 {+1.47/11 0.020s, n=13388, sd=18} a6 {-1.84/11 0.016s, n=14502, sd=15}
43. Bd6 {+1.55/11 0.017s, n=11783, sd=18} Ke6 {-1.97/10 0.012s, n=11817, sd=28}
44. Bg3 {+1.55/13 0.018s, n=14162, sd=20} Kd5 {-1.97/10 0.019s, n=18894, sd=21}
45. Be1 {+1.83/12 0.018s, n=12253, sd=16} Ke5 {-2.02/12 0.021s, n=19717, sd=20}
46. Bc3+ {+1.92/12 0.037s, n=19527, sd=17} Kd5 {-2.17/12 0.029s, n=19012, sd=23}
47. Kf4 {+2.72/12 0.017s, n=12746, sd=14} g3 {-2.47/10 0.016s, n=11128, sd=21}
48. Kxg3 {+2.78/13 0.022s, n=18718, sd=32} Ke4 {-2.93/11 0.022s, n=15253, sd=23}
49. Ba5 {+2.97/13 0.010s, n=11628, sd=22} Kd3 {-2.06/10 0.020s, n=13883, sd=27}
50. Kf4 {+4.64/13 0.026s, n=21998, sd=26} Kd4 {-4.35/10 0.020s, n=12554, sd=23}
51. Bb4 {+5.18/12 0.018s, n=12490, sd=20} Kd5 {-5.28/10 0.013s, n=14869, sd=25}
52. Kf5 {+5.48/13 0.010s, n=11067, sd=22} Kc6 {-5.39/12 0.012s, n=10715, sd=23}
53. Ke5 {+6.42/13 0.018s, n=13886, sd=20} Kb6 {-8.11/13 0.030s, n=22132, sd=29}
54. Kd6 {+7.49/13 0.009s, n=11519, sd=22} Kb7 {-8.47/13 0.007s, n=11330, sd=28}
55. Ba5 {+8.35/15 0.012s, n=10126, sd=23} Kb8 {-8.29/12 0.008s, n=11948, sd=27}
56. Kc6 {+8.91/13 0.007s, n=10811, sd=38} Ka7 {-8.90/16 0.010s, n=15253, sd=36}
57. Bb4 {+7.07/15 0.014s, n=22532, sd=37} Kb8 {-8.52/14 0.013s, n=15488, sd=46}
58. Kb6 {+7.07/14 0.014s, n=12221, sd=47} a5 {-9.65/13 0.008s, n=11680, sd=44}
59. Bxa5 {+6.98/15 0.012s, n=12412, sd=55} Ka8 {-7.73/15 0.012s, n=11657, sd=44}
60. Ka6 {+6.48/16 0.013s, n=23212, sd=53} Kb8 {-7.73/16 0.007s, n=10485, sd=48}
61. Bb6 {+6.95/14 0.014s, n=14145, sd=59} Ka8 {-7.73/19 0.009s, n=12211, sd=38}
62. Bd4 {+6.32/12 0.013s, n=14008, sd=63} Kb8 {-16.36/15 0.019s, n=18772, sd=48}
63. Bc5 {+6.32/12 0.010s, n=10208, sd=64} Ka8 {-16.36/15 0.013s, n=10302, sd=42}
64. Be7 {+6.38/12 0.008s, n=10603, sd=50} Kb8 {-16.36/18 0.007s, n=12145, sd=32}
65. Bb4 {+6.25/14 0.018s, n=19550, sd=58} Ka8 {-16.36/14 0.012s, n=11652, sd=37}
66. Bc5 {+16.11/14 0.017s, n=12038, sd=49}
Kb8 {-16.32/16 0.006s, n=10874, sd=42} 67. Kb6 {+6.35/14 0.011s, n=11176, sd=47}
Ka8 {-16.32/16 0.009s, n=10149, sd=34} 68. Bd4 {+6.36/14 0.011s, n=10428, sd=41}
Kb8 {-16.32/17 0.009s, n=10087, sd=34} 69. Be3 {+6.25/14 0.010s, n=13153, sd=75}
Ka8 {-16.32/15 0.012s, n=12178, sd=35} 70. Ka6 {+6.49/15 0.007s, n=12554, sd=53}
Kb8 {-16.32/18 0.014s, n=11370, sd=39}
71. Bf4+ {+6.38/11 0.009s, n=10575, sd=49} Ka8 {-7.73/17 0.006s, n=10303, sd=46}
72. Bd2 {+12.99/14 0.007s, n=11061, sd=55}
Kb8 {-16.32/15 0.014s, n=11171, sd=47} 73. Bb4 {+6.18/13 0.012s, n=20160, sd=58}
Ka8 {-16.32/12 0.008s, n=11397, sd=58} 74. Bc5 {+6.18/14 0.006s, n=10753, sd=71}
Kb8 {-7.73/16 0.008s, n=12382, sd=42} 75. Ba7+ {+6.18/16 0.007s, n=10496, sd=53}
Kc7 {-15.57/17 0.019s, n=35442, sd=56}
76. Bb6+ {+6.18/15 0.006s, n=10991, sd=51} Kb8 {-6.53/12 0.007s, n=10391, sd=56}
77. Be3 {+6.18/17 0.010s, n=10995, sd=49} Ka8 {-6.53/14 0.018s, n=17552, sd=62}
78. Bc1 {+6.18/16 0.006s, n=10443, sd=45} Kb8 {-6.29/12 0.015s, n=13914, sd=58}
79. Bf4+ {+6.18/18 0.012s, n=12451, sd=45} Ka8 {-6.26/13 0.009s, n=11046, sd=52}
80. Bd2 {+6.18/15 0.015s, n=16116, sd=59} Kb8 {-6.26/15 0.006s, n=10791, sd=48}
81. Kb6 {+6.18/17 0.007s, n=10221, sd=57} Ka8 {-6.25/19 0.016s, n=23298, sd=54}
82. Bb4 {+6.56/17 0.008s, n=10915, sd=55} Kb8 {-6.25/10 0.006s, n=10781, sd=54}
83. Be7 {+6.18/12 0.007s, n=11347, sd=53} Ka8 {-10.98/14 0.007s, n=11079, sd=50}
84. Ka6 {+15.02/18 0.024s, n=23696, sd=53}
Kb8 {-11.37/15 0.007s, n=11264, sd=44}
85. Bd6+ {+6.27/12 0.011s, n=19373, sd=49} Ka8 {-7.53/17 0.008s, n=20902, sd=48}
86. Bb4 {+8.20/17 0.024s, n=24042, sd=47} Kb8 {-11.06/15 0.007s, n=17970, sd=46}
87. Be7 {+7.71/9 0.016s, n=14605, sd=41} Ka8 {-6.53/14 0.006s, n=13101, sd=44}
88. Kb6 {+8.05/13 0.007s, n=11097, sd=45} Kb8 {-10.31/16 0.013s, n=14842, sd=47}
89. Bb4 {+16.23/16 0.009s, n=14602, sd=40}
Ka8 {-16.32/16 0.006s, n=10645, sd=40} 90. Bc5 {+6.96/15 0.009s, n=13692, sd=41}
Kb8 {-6.34/16 0.000s, n=10718, sd=44} 91. Be7 {+16.28/13 0.012s, n=10363, sd=39}
Ka8 {-6.34/15 0.000s, n=13542, sd=48} 92. Bb4 {+16.28/14 0.007s, n=12997, sd=38}
Kb8 {-4.91/14 0.009s, n=15056, sd=46}
93. Bd6+ {+16.35/14 0.029s, n=29292, sd=44}
Ka8 {-16.32/17 0.000s, n=11016, sd=32}
94. Be7 {+16.56/12 0.014s, n=13271, sd=43}
Kb8 {-16.32/15 0.005s, n=10750, sd=30}
95. Bb4 {+16.74/14 0.011s, n=12477, sd=34}
Ka8 {-16.32/16 0.010s, n=13184, sd=31} 96. Ka6 {+8.74/12 0.009s, n=12055, sd=29}
Kb8 {-6.36/16 0.019s, n=25327, sd=33}
97. Bd6+ {+12.36/12 0.008s, n=10259, sd=27}
Ka8 {-15.46/13 0.001s, n=13263, sd=34}
98. Bf8 {+12.72/13 0.012s, n=16263, sd=28} Kb8 {-6.36/15 0.004s, n=10817, sd=41}
99. Bg7 {+11.43/11 0.017s, n=14050, sd=28} Ka8 {-6.36/13 0.024s, n=26682, sd=39}
100. Bf6 {+12.30/12 0.015s, n=12514, sd=26}
Kb8 {-6.27/15 0.012s, n=10774, sd=30}
101. Be5+ {+17.76/13 0.010s, n=12790, sd=25}
Ka8 {-5.60/17 0.014s, n=21551, sd=44} 102. Bf6 {+5.83/13 0.019s, n=21549, sd=29}
Kb8 {-7.76/14 0.017s, n=14628, sd=34}
103. Be5+ {+9.23/12 0.023s, n=15278, sd=28}
Ka8 {-6.20/14 0.012s, n=16422, sd=36} 104. Bd4 {+5.52/10 0.010s, n=15133, sd=23}
Kb8 {-5.34/14 0.015s, n=12045, sd=32}
105. Bb6 {+11.33/10 0.010s, n=10768, sd=20}
Ka8 {-5.51/16 0.013s, n=10395, sd=32}
106. Bf2 {+11.11/10 0.007s, n=15629, sd=20}
Kb8 {-5.51/12 0.008s, n=11220, sd=40} 107. Bc5 {+4.48/13 0.004s, n=10312, sd=19}
Kc7 {-4.52/15 0.015s, n=11714, sd=36}
108. Kxb5 {+3.78/15 0.006s, n=12465, sd=25}
Kb7 {-4.05/14 0.016s, n=13020, sd=28} 109. Be3 {+3.63/15 0.017s, n=16260, sd=39}
Kb8 {-3.98/15 0.011s, n=15419, sd=30} 110. Ka6 {+3.55/15 0.009s, n=10315, sd=43}
Ka8 {-3.57/18 0.035s, n=26831, sd=46} 111. Bg1 {+3.55/17 0.011s, n=11060, sd=37}
Kb8 {-3.57/12 0.008s, n=10954, sd=49} 112. Bc5 {+3.55/17 0.004s, n=11500, sd=47}
Ka8 {-3.57/15 0.008s, n=10662, sd=42} 113. Kb5 {+3.55/20 0.000s, n=11555, sd=49}
Kb7 {-3.57/15 0.013s, n=10678, sd=48} 114. Be3 {+3.55/20 0.001s, n=11393, sd=35}
Kb8 {-3.55/17 0.012s, n=17281, sd=64} 115. Kb6 {+3.55/19 0.002s, n=13192, sd=43}
Ka8 {-3.69/17 0.013s, n=11181, sd=46} 116. Kc6 {+3.55/20 0.006s, n=10050, sd=41}
Kb8 {-3.69/18 0.009s, n=11700, sd=45} 117. Bg1 {+3.55/20 0.010s, n=21436, sd=57}
Ka8 {-3.69/19 0.008s, n=10461, sd=50} 118. Bf2 {+3.53/17 0.012s, n=16132, sd=55}
Kb8 {-3.69/20 0.017s, n=12535, sd=50} 119. Bc5 {+3.53/17 0.000s, n=10762, sd=43}
Ka8 {-3.69/20 0.009s, n=10716, sd=44} 120. Be3 {+3.53/18 0.001s, n=10043, sd=51}
Kb8 {-3.69/18 0.008s, n=10880, sd=42} 121. Bg1 {+3.53/17 0.008s, n=12356, sd=51}
Ka8 {-3.69/20 0.006s, n=11312, sd=70} 122. Bf2 {+3.50/14 0.003s, n=12621, sd=59}
Kb8 {-3.69/18 0.014s, n=10256, sd=48} 123. Bc5 {+3.50/16 0.008s, n=10560, sd=35}
Ka8 {-3.69/17 0.008s, n=11340, sd=60} 124. Kb6 {+3.50/19 0.006s, n=10105, sd=33}
Kb8 {-3.69/19 0.010s, n=11350, sd=60} 125. Ka6 {+3.45/17 0.010s, n=14024, sd=43}
Ka8 {-3.69/19 0.006s, n=10057, sd=56} 126. Be3 {+3.49/13 0.007s, n=10492, sd=45}
Kb8 {-3.69/21 0.007s, n=11493, sd=64} 127. Kb6 {+3.45/14 0.014s, n=10792, sd=39}
Ka8 {-3.69/19 0.007s, n=10998, sd=42} 128. Bf2 {+3.45/14 0.014s, n=10021, sd=37}
Kb8 {-3.69/21 0.008s, n=10942, sd=54} 129. Kc6 {+3.45/15 0.008s, n=10606, sd=43}
Ka8 {-4.18/21 0.009s, n=13339, sd=47} 130. Bc5 {+3.45/16 0.014s, n=11305, sd=43}
Kb8 {-3.69/15 0.007s, n=11717, sd=34} 131. Be3 {+4.27/17 0.014s, n=10647, sd=57}
Ka8 {-3.99/19 0.007s, n=10412, sd=48} 132. Bc5 {+3.47/12 0.022s, n=14843, sd=43}
Kb8 {-3.69/18 0.008s, n=10023, sd=46} 133. Be3 {+3.65/13 0.015s, n=21787, sd=41}
Ka8 {-4.02/21 0.009s, n=11083, sd=50} 134. Kb6 {+3.35/14 0.011s, n=15074, sd=41}
Kb8 {-4.02/20 0.011s, n=11185, sd=48} 135. Bf2 {+3.44/14 0.007s, n=10674, sd=33}
Ka8 {-3.98/18 0.013s, n=10868, sd=46} 136. Bc5 {+3.35/15 0.014s, n=10910, sd=37}
Kb8 {-3.89/18 0.008s, n=10855, sd=40}
137. Bd6+ {+3.35/14 0.008s, n=10178, sd=39}
Ka8 {-4.36/19 0.007s, n=10635, sd=42} 138. Be7 {+3.35/17 0.016s, n=14440, sd=48}
Kb8 {-3.89/17 0.012s, n=10108, sd=32} 139. Ka6 {+3.33/14 0.009s, n=13331, sd=39}
Ka8 {-3.69/19 0.017s, n=16875, sd=48} 140. Bc5 {+3.35/15 0.017s, n=13108, sd=57}
Kb8 {-4.86/14 0.009s, n=13566, sd=36} 141. Bb6 {+3.35/13 0.009s, n=13109, sd=69}
Ka8 {-3.62/14 0.010s, n=15355, sd=42} 142. Bf2 {+3.38/18 0.019s, n=15798, sd=69}
Kb8 {-3.69/14 0.012s, n=12031, sd=58} 143. Bd4 {+3.76/15 0.012s, n=10350, sd=55}
Ka8 {-3.69/15 0.004s, n=10633, sd=52} 144. Bg1 {+3.38/12 0.011s, n=16523, sd=55}
Kb8 {-3.69/16 0.006s, n=11368, sd=56} 145. Be3 {+3.29/14 0.012s, n=18656, sd=55}
Ka8 {-3.64/15 0.003s, n=10486, sd=54} 146. Kb6 {+3.34/12 0.010s, n=15341, sd=47}
Kb8 {-3.64/13 0.004s, n=10736, sd=32} 147. Bc5 {+3.34/11 0.007s, n=11943, sd=45}
Ka8 {-3.64/14 0.005s, n=11061, sd=44} 148. Be7 {+3.33/16 0.019s, n=15863, sd=49}
Kb8 {-3.64/13 0.017s, n=13316, sd=48} 149. Ka6 {+3.39/13 0.008s, n=12848, sd=47}
Ka8 {-3.65/17 0.001s, n=11592, sd=54} 150. Bd8 {+3.35/15 0.033s, n=48296, sd=51}
Kb8 {-3.64/16 0.001s, n=11950, sd=40} 151. Bg5 {+3.28/15 0.009s, n=13624, sd=51}
Ka8 {-3.64/18 0.000s, n=10655, sd=54} 152. Be3 {+3.28/13 0.009s, n=12593, sd=49}
Kb8 {-4.05/16 0.000s, n=10355, sd=72} 153. Bb6 {+3.19/15 0.009s, n=13448, sd=57}
Ka8 {-4.12/18 0.000s, n=11025, sd=50} 154. Bf2 {+3.07/12 0.012s, n=18420, sd=55}
Kb8 {-4.78/19 0.000s, n=10815, sd=48} 155. Bg1 {+3.07/11 0.008s, n=10962, sd=41}
Ka8 {-4.05/19 0.000s, n=11118, sd=46} 156. Kb6 {+3.07/13 0.016s, n=11097, sd=49}
Kb8 {-3.83/20 0.012s, n=15223, sd=48} 157. Bd4 {+3.07/13 0.016s, n=10292, sd=49}
Ka8 {-4.43/16 0.000s, n=10610, sd=52} 158. a4 {+3.07/17 0.017s, n=11894, sd=43}
Kb8 {-4.78/16 0.004s, n=11070, sd=42} 159. Ka6 {+3.07/16 0.013s, n=10056, sd=47}
Ka8 {-3.99/17 0.000s, n=10173, sd=40} 160. Bc5 {+3.44/19 0.014s, n=15258, sd=43}
Kb8 {-3.81/17 0.009s, n=12620, sd=38}
161. Bd6+ {+3.26/11 0.014s, n=16293, sd=51}
Ka8 {-4.12/17 0.001s, n=13980, sd=45} 162. Bc5 {+3.07/18 0.018s, n=22866, sd=39}
Kb8 {-4.78/18 0.008s, n=12259, sd=36}
163. Bd6+ {+3.10/15 0.009s, n=11052, sd=42}
Ka8 {-3.74/17 0.006s, n=11142, sd=44} 164. Bf8 {+3.13/16 0.009s, n=10741, sd=45}
Kb8 {-3.60/20 0.018s, n=17533, sd=56} 165. Bc5 {+3.07/17 0.014s, n=16729, sd=47}
Ka8 {-3.60/17 0.015s, n=10753, sd=46} 166. Be7 {+3.08/14 0.023s, n=13136, sd=53}
Kb8 {-3.60/16 0.009s, n=10448, sd=54} 167. Kb6 {+3.07/12 0.011s, n=13870, sd=65}
Ka8 {-3.60/19 0.014s, n=13468, sd=56} 168. Bc5 {+3.41/13 0.015s, n=10068, sd=39}
Kb8 {-3.60/18 0.010s, n=10479, sd=50} 169. Kc6 {+3.50/14 0.015s, n=10190, sd=39}
Ka8 {-3.60/16 0.016s, n=11278, sd=42} 170. Bb6 {+3.55/12 0.016s, n=10712, sd=34}
Kb8 {-3.60/20 0.018s, n=12618, sd=68} 171. Bf2 {+3.45/12 0.017s, n=11564, sd=36}
Ka8 {-3.60/17 0.009s, n=10946, sd=52} 172. Bd4 {+3.37/14 0.012s, n=10767, sd=39}
Kb8 {-3.60/16 0.014s, n=10319, sd=52} 173. Bb6 {+3.31/11 0.015s, n=10492, sd=45}
Ka8 {-3.60/21 0.014s, n=10730, sd=52} 174. Bf2 {+3.77/14 0.014s, n=12278, sd=45}
Kb8 {-3.60/17 0.016s, n=10091, sd=52} 175. Bc5 {+3.40/11 0.008s, n=11046, sd=37}
Ka8 {-3.60/19 0.011s, n=10391, sd=54} 176. Bb6 {+3.22/12 0.008s, n=10175, sd=33}
Kb8 {-3.75/17 0.017s, n=11685, sd=56} 177. Bg1 {+3.10/11 0.014s, n=16946, sd=39}
Ka8 {-3.60/18 0.011s, n=10312, sd=52} 178. Kb6 {+3.10/11 0.014s, n=11350, sd=25}
Kb8 {-3.60/19 0.009s, n=10402, sd=48} 179. Bf2 {+3.10/13 0.009s, n=10050, sd=32}
Ka8 {-3.60/21 0.012s, n=10594, sd=44} 180. Bc5 {+3.49/14 0.015s, n=10177, sd=37}
Kb8 {-3.73/22 0.008s, n=11147, sd=46} 181. Bg1 {+3.10/12 0.016s, n=10218, sd=39}
Ka8 {-3.65/22 0.014s, n=15576, sd=52} 182. Kc6 {+3.10/15 0.011s, n=15404, sd=41}
Kb8 {-3.78/19 0.009s, n=12142, sd=52} 183. Bf2 {+3.10/15 0.017s, n=10837, sd=51}
Ka8 {-3.78/20 0.009s, n=11259, sd=50} 184. Bd4 {+3.58/14 0.013s, n=12025, sd=41}
Kb8 {-3.65/17 0.009s, n=10996, sd=48} 185. Kb6 {+3.20/11 0.012s, n=10369, sd=31}
Ka8 {-3.70/20 0.008s, n=11795, sd=44} 186. Ka6 {+3.08/13 0.049s, n=33367, sd=41}
Kb8 {-3.70/19 0.010s, n=14114, sd=44} 187. Bf2 {+3.08/15 0.009s, n=11356, sd=44}
Ka8 {-4.78/18 0.007s, n=10598, sd=42} 188. Bg1 {+3.08/18 0.009s, n=11961, sd=51}
Kb8 {-3.75/17 0.010s, n=11141, sd=40} 189. Kb6 {+3.13/18 0.019s, n=12093, sd=59}
Ka8 {-3.45/19 0.028s, n=35078, sd=38} 190. Bd4 {+3.11/18 0.008s, n=10984, sd=59}
Kb8 {-3.45/12 0.010s, n=10491, sd=36} 191. Bc5 {+3.08/16 0.019s, n=13566, sd=45}
Ka8 {-3.44/14 0.015s, n=18708, sd=34} 192. Be3 {+3.08/17 0.009s, n=10763, sd=43}
Kb8 {-3.47/13 0.008s, n=10693, sd=32} 193. Ka6 {+3.08/18 0.017s, n=19939, sd=31}
Ka8 {-3.47/18 0.012s, n=10939, sd=30} 194. Bd4 {+3.08/18 0.010s, n=11794, sd=48}
Kb8 {-3.47/15 0.010s, n=13489, sd=53} 195. Bg1 {+3.26/17 0.009s, n=10707, sd=57}
Ka8 {-3.47/16 0.010s, n=12029, sd=46} 196. Bb6 {+3.24/15 0.016s, n=14588, sd=49}
Kb8 {-3.47/16 0.018s, n=10012, sd=38}
197. Ba7+ {+3.11/12 0.023s, n=22169, sd=47}
Ka8 {-3.47/17 0.009s, n=11059, sd=52} 198. Bb6 {+3.08/11 0.010s, n=11978, sd=43}
Kb8 {-3.47/15 0.013s, n=11839, sd=50} 199. a5 {+3.08/14 0.019s, n=10743, sd=49}
Ka8 {-3.47/17 0.008s, n=10575, sd=54} 200. Bd4 {+3.08/14 0.009s, n=10979, sd=71}
Kb8 {-3.47/19 0.009s, n=10217, sd=76} 201. Bc5 {+3.08/17 0.016s, n=11113, sd=73}
Ka8 {-3.74/18 0.019s, n=10978, sd=64}
202. Be7 {+3.08/16 0.009s, n=11103, sd=123}
Kb8 {-4.17/19 0.010s, n=10198, sd=66}
203. Bd8 {+3.08/13 0.013s, n=14674, sd=117}
Ka8 {-3.47/16 0.009s, n=12915, sd=40} 204. Bb6 {+3.08/13 0.013s, n=11975, sd=93}
Kb8 {-3.47/19 0.015s, n=10109, sd=50} 205. Bd4 {+3.08/16 0.013s, n=10468, sd=68}
Ka8 {-3.47/21 0.008s, n=10131, sd=45} 206. Kb6 {+3.08/16 0.008s, n=10991, sd=62}
Kb8 {-3.47/21 0.009s, n=10478, sd=58} 207. Bc5 {+3.08/16 0.008s, n=10687, sd=41}
Ka8 {-3.47/20 0.015s, n=10245, sd=58} 208. Be3 {+3.08/18 0.008s, n=10969, sd=45}
Kb8 {-4.25/22 0.007s, n=10282, sd=60} 209. Ka6 {+3.08/19 0.014s, n=12491, sd=59}
Ka8 {-3.70/16 0.008s, n=10035, sd=41} 210. Bg1 {+3.08/19 0.012s, n=14465, sd=55}
Kb8 {-3.83/17 0.010s, n=10366, sd=42} 211. Bb6 {+3.08/18 0.018s, n=12770, sd=70}
Ka8 {-3.56/19 0.011s, n=11929, sd=50} 212. Be3 {+3.18/18 0.022s, n=13875, sd=92}
Kb8 {-3.63/20 0.008s, n=10590, sd=54} 213. Bg1 {+3.19/18 0.009s, n=11349, sd=71}
Ka8 {-3.63/19 0.010s, n=10443, sd=58} 214. Bd4 {+3.19/16 0.022s, n=13544, sd=65}
Kb8 {-3.63/20 0.020s, n=11223, sd=66} 215. Kb6 {+3.19/16 0.008s, n=10371, sd=65}
Ka8 {-3.63/20 0.012s, n=10569, sd=68} 216. Bc5 {+3.19/16 0.011s, n=10519, sd=63}
Kb8 {-3.63/21 0.017s, n=11287, sd=60} 217. Be3 {+3.19/16 0.010s, n=11272, sd=79}
Ka8 {-3.63/22 0.011s, n=12815, sd=61} 218. Kc6 {+4.12/19 0.014s, n=13872, sd=59}
Kb8 {-3.63/19 0.018s, n=11296, sd=62} 219. Bf2 {+4.12/16 0.016s, n=10610, sd=41}
Ka8 {-3.63/22 0.018s, n=11365, sd=56} 220. Bc5 {+3.91/14 0.020s, n=11598, sd=49}
Kb8 {-3.63/20 0.009s, n=11032, sd=54} 221. Be3 {+3.37/11 0.016s, n=12174, sd=51}
Ka8 {-3.63/18 0.010s, n=11635, sd=56} 222. Bc5 {+3.62/15 0.011s, n=10076, sd=42}
Kb8 {-3.63/17 0.016s, n=13914, sd=54} 223. Be3 {+3.41/13 0.012s, n=13654, sd=43}
Ka8 {-3.63/17 0.008s, n=10216, sd=52} 224. Bf2 {+3.29/15 0.010s, n=10056, sd=47}
Kb8 {-3.63/17 0.017s, n=10945, sd=50} 225. Bc5 {+3.38/12 0.011s, n=11817, sd=45}
Ka8 {-3.63/17 0.010s, n=10255, sd=48} 226. Bd4 {+3.35/14 0.009s, n=11013, sd=33}
Kb8 {-3.63/18 0.016s, n=11314, sd=46} 227. Kb6 {+3.38/12 0.016s, n=15817, sd=55}
Ka8 {-3.55/16 0.008s, n=10711, sd=44} 228. Bf2 {+3.32/14 0.011s, n=11995, sd=41}
Kb8 {-3.56/15 0.024s, n=11491, sd=38} 229. Bc5 {+3.19/15 0.016s, n=10239, sd=59}
Ka8 {-3.54/18 0.029s, n=19483, sd=40} 230. Bd4 {+3.19/12 0.017s, n=11576, sd=49}
Kb8 {-3.54/12 0.025s, n=19143, sd=26} 231. Ka6 {+3.19/15 0.010s, n=10456, sd=57}
Ka8 {-3.52/13 0.021s, n=10855, sd=26} 232. Bc5 {+3.19/15 0.009s, n=10407, sd=49}
Kb8 {-3.51/14 0.009s, n=11234, sd=40} 233. Bg1 {+3.19/17 0.015s, n=12207, sd=49}
Ka8 {-3.51/16 0.020s, n=14719, sd=54} 234. Kb6 {+3.19/18 0.012s, n=12446, sd=65}
Kb8 {-3.51/13 0.015s, n=18497, sd=34} 235. Kc6 {+3.19/16 0.011s, n=11557, sd=65}
Ka8 {-3.43/15 0.009s, n=10186, sd=42} 236. Be3 {+3.19/14 0.011s, n=11738, sd=53}
Kb8 {-3.43/13 0.011s, n=12767, sd=32} 237. a6 {+3.19/16 0.011s, n=10477, sd=47}
Ka8 {-3.43/15 0.010s, n=12441, sd=44} 238. Kb6 {+3.19/17 0.018s, n=10884, sd=49}
Kb8 {-3.54/13 0.029s, n=13768, sd=52} 239. Bg1 {+3.19/16 0.010s, n=11436, sd=57}
Ka8 {-3.54/14 0.024s, n=13387, sd=50} 240. Ka5 {+3.19/17 0.010s, n=10429, sd=49}
Kb8 {-3.53/16 0.012s, n=12259, sd=48} 241. Bf2 {+3.19/18 0.012s, n=12130, sd=53}
Ka8 {-3.53/19 0.011s, n=12527, sd=50} 242. Be3 {+3.19/18 0.010s, n=11218, sd=53}
Kb8 {-3.53/17 0.010s, n=12051, sd=68} 243. Ka4 {+3.19/18 0.011s, n=11557, sd=45}
Ka8 {-3.53/18 0.018s, n=10732, sd=72} 244. Bc5 {+3.19/19 0.011s, n=11208, sd=55}
Kb8 {-3.53/19 0.011s, n=10663, sd=68} 245. Kb4 {+3.19/19 0.010s, n=10854, sd=57}
Ka8 {-3.53/17 0.014s, n=10565, sd=56} 246. Bf2 {+3.19/20 0.014s, n=11633, sd=55}
Kb8 {-3.53/18 0.020s, n=11928, sd=52} 247. Ka4 {+3.27/20 0.011s, n=11198, sd=59}
Ka8 {-3.53/20 0.020s, n=12310, sd=53} 248. Ka5 {+3.27/20 0.011s, n=11945, sd=63}
Kb8 {-3.53/18 0.017s, n=10806, sd=53} 249. Kb6 {+3.27/18 0.010s, n=10078, sd=63}
Ka8 {-3.53/20 0.020s, n=11086, sd=76} 250. Bg1 {+3.27/19 0.010s, n=11033, sd=53}
Kb8 {-3.53/19 0.015s, n=10457, sd=54} 251. Bc5 {+3.27/19 0.012s, n=11906, sd=65}
Ka8 {-3.53/20 0.009s, n=10678, sd=56} 252. Ka5 {+3.27/18 0.010s, n=10476, sd=65}
Kb8 {-3.56/21 0.011s, n=13571, sd=74} 253. Ka4 {+3.27/18 0.013s, n=11892, sd=59}
Ka8 {-3.56/17 0.013s, n=10216, sd=82} 254. Bb6 {+3.27/17 0.010s, n=10921, sd=57}
Kb8 {-3.56/19 0.012s, n=11693, sd=60} 255. Bg1 {+3.27/17 0.012s, n=11084, sd=57}
Ka8 {-3.56/18 0.011s, n=10559, sd=64} 256. Kb4 {+3.27/17 0.011s, n=10844, sd=63}
Kb8 {-3.56/19 0.010s, n=10152, sd=62} 257. Bf2 {+3.27/17 0.012s, n=11092, sd=61}
Ka8 {-3.56/18 0.009s, n=10703, sd=48} 258. Ka4 {+3.27/17 0.013s, n=10790, sd=59}
Kb8 {-3.56/17 0.009s, n=10752, sd=50} 259. Ka5 {+3.27/17 0.010s, n=10290, sd=45}
Ka8 {-3.56/17 0.011s, n=12166, sd=52} 260. Bb6 {+3.27/19 0.018s, n=14757, sd=55}
Kb8 {-3.56/19 0.010s, n=11922, sd=54} 261. Ka4 {+3.27/16 0.010s, n=11469, sd=51}
Ka8 {-3.56/18 0.012s, n=13797, sd=52} 262. Be3 {+3.27/17 0.016s, n=10011, sd=47}
Kb8 {-3.56/18 0.010s, n=11177, sd=64} 263. Kb4 {+3.27/19 0.012s, n=11734, sd=49}
Ka8 {-3.56/18 0.009s, n=10467, sd=72} 264. Bf2 {+3.27/18 0.029s, n=15538, sd=47}
Kb8 {-3.56/18 0.015s, n=11496, sd=56} 265. Ka4 {+3.29/17 0.022s, n=24157, sd=45}
Ka8 {-3.56/19 0.012s, n=11398, sd=52} 266. Ka5 {+3.27/14 0.012s, n=11798, sd=43}
Kb8 {-3.56/18 0.009s, n=11357, sd=68} 267. Bc5 {+3.42/16 0.027s, n=13012, sd=41}
Ka8 {-3.56/18 0.010s, n=10703, sd=56} 268. Bd4 {+3.38/14 0.017s, n=15263, sd=39}
Kb8 {-3.56/18 0.012s, n=12334, sd=58} 269. Ka4 {+3.42/13 0.025s, n=11822, sd=37}
Ka8 {-3.56/17 0.016s, n=10301, sd=52} 270. Kb4 {+3.38/13 0.021s, n=11536, sd=29}
Kb8 {-3.56/16 0.012s, n=10781, sd=46} 271. Kc3 {+3.38/15 0.013s, n=11598, sd=33}
Ka8 {-3.56/15 0.021s, n=10061, sd=50} 272. Kd2 {+3.36/16 0.013s, n=13242, sd=49}
Kb8 {-3.56/13 0.029s, n=11218, sd=60} 273. Bf2 {+3.36/13 0.036s, n=17961, sd=41}
Ka8 {-3.56/15 0.027s, n=11997, sd=56} 274. Kc3 {+3.36/16 0.011s, n=10856, sd=43}
Kb8 {-3.56/14 0.015s, n=10484, sd=48} 275. Kb2 {+3.36/13 0.013s, n=12918, sd=43}
Ka8 {-3.98/14 0.019s, n=15427, sd=52} 276. Bg1 {+2.51/14 0.035s, n=33765, sd=35}
Kb8 {-3.34/12 0.014s, n=13154, sd=22} 277. Kc1 {+2.51/13 0.011s, n=10075, sd=21}
Ka8 {-4.41/13 0.011s, n=10303, sd=24} 278. Kd2 {+2.39/12 0.009s, n=10408, sd=29}
Kb8 {-3.36/14 0.032s, n=23544, sd=36} 279. Bd4 {+2.49/11 0.036s, n=23859, sd=31}
Ka8 {-3.31/14 0.015s, n=12305, sd=16} 280. Bb6 {+2.96/11 0.017s, n=11495, sd=19}
Kb8 {-3.19/13 0.020s, n=10418, sd=16} 281. Ke3 {+2.28/10 0.030s, n=16751, sd=25}
Ka8 {-3.19/15 0.022s, n=10811, sd=38} 282. Kd2 {+2.27/13 0.011s, n=12614, sd=27}
Kb8 {-2.91/14 0.019s, n=11360, sd=28} 283. Bg1 {+2.12/10 0.020s, n=11388, sd=35}
Ka8 {-2.44/13 0.020s, n=15685, sd=38} 284. Bd4 {+2.10/12 0.012s, n=13398, sd=25}
Kb8 {-2.30/11 0.027s, n=11642, sd=24} 285. Kc1 {+3.91/10 0.018s, n=12908, sd=31}
Ka8 {-2.30/13 0.024s, n=11620, sd=28} 286. a4 {+2.09/12 0.020s, n=17491, sd=39}
Kb8 {-2.70/12 0.032s, n=12782, sd=28} 287. Kd1 {+2.09/11 0.015s, n=15032, sd=37}
Ka8 {-2.58/15 0.028s, n=14955, sd=30} 288. Bc5 {+2.09/11 0.021s, n=10913, sd=69}
Kb8 {-2.67/13 0.020s, n=16918, sd=28} 289. Bd4 {+2.09/11 0.019s, n=11568, sd=58}
Ka8 {-2.67/13 0.017s, n=11336, sd=44} 290. Bc5 {+2.09/14 0.014s, n=11389, sd=37}
Kb8 {-2.67/14 0.025s, n=12395, sd=42} 291. Bf2 {+2.09/15 0.005s, n=11838, sd=43}
Ka8 {-2.67/16 0.022s, n=10459, sd=46} 292. a5 {+2.09/14 0.014s, n=10955, sd=41}
Kb8 {-2.33/14 0.012s, n=11334, sd=31} 293. Bd4 {+2.09/15 0.003s, n=11251, sd=41}
Ka8 {-2.33/15 0.012s, n=10295, sd=32} 294. Bc5 {+2.63/16 0.004s, n=11796, sd=43}
Kb8 {-2.33/16 0.022s, n=11715, sd=38} 295. Kd2 {+2.63/14 0.006s, n=10212, sd=35}
Ka8 {-2.33/16 0.011s, n=10275, sd=49} 296. Bf2 {+2.63/16 0.007s, n=10471, sd=45}
Kb8 {-2.33/17 0.024s, n=11100, sd=46} 297. Kc2 {+2.63/16 0.002s, n=11169, sd=45}
Ka8 {-2.33/18 0.023s, n=11286, sd=48} 298. Kb1 {+2.63/18 0.008s, n=12866, sd=49}
Kb8 {-2.33/17 0.012s, n=10624, sd=48} 299. Be3 {+2.63/18 0.009s, n=10153, sd=49}
Ka8 {-2.33/19 0.011s, n=10847, sd=50} 300. Bd4 {+2.63/19 0.005s, n=11943, sd=51}
Kb8 {-2.33/17 0.010s, n=10212, sd=48} 301. Kc1 {+2.63/18 0.008s, n=10186, sd=49}
Ka8 {-2.33/18 0.022s, n=10753, sd=46} 302. Kd1 {+2.63/19 0.017s, n=11956, sd=53}
Kb8 {-2.33/18 0.011s, n=11489, sd=48} 303. Bg1 {+2.48/17 0.021s, n=15953, sd=53}
Ka8 {-2.33/18 0.011s, n=10968, sd=46} 304. Bf2 {+2.48/20 0.015s, n=10315, sd=47}
Kb8 {-2.33/16 0.011s, n=11414, sd=50} 305. Be3 {+2.91/20 0.012s, n=11133, sd=71}
Ka8 {-2.33/16 0.012s, n=11327, sd=45} 306. Kc2 {+2.68/14 0.011s, n=10214, sd=53}
Kb8 {-2.33/17 0.011s, n=10837, sd=50} 307. Bc5 {+2.68/17 0.013s, n=11870, sd=49}
Ka8 {-2.41/20 0.016s, n=14867, sd=56} 308. Bd4 {+2.68/18 0.025s, n=11525, sd=46}
Kb8 {-2.41/15 0.013s, n=11269, sd=37} 309. Kb1 {+2.68/18 0.021s, n=11452, sd=49}
Ka8 {-2.41/20 0.016s, n=14576, sd=58} 310. Be3 {+2.72/19 0.011s, n=11199, sd=55}
Kb8 {-2.45/20 0.015s, n=14350, sd=62} 311. Bc5 {+3.26/19 0.023s, n=12868, sd=63}
Ka8 {-2.41/19 0.011s, n=10913, sd=56} 312. Bd4 {+2.76/16 0.020s, n=14526, sd=49}
Kb8 {-2.41/19 0.020s, n=10175, sd=52} 313. Bf2 {+2.72/16 0.011s, n=11917, sd=49}
Ka8 {-2.41/19 0.013s, n=10534, sd=58} 314. Kc1 {+2.94/17 0.021s, n=10089, sd=37}
Kb8 {-2.41/17 0.026s, n=10579, sd=50} 315. Kc2 {+2.73/16 0.016s, n=11203, sd=43}
Ka8 {-2.41/19 0.022s, n=10501, sd=54} 316. Kd2 {+2.73/17 0.023s, n=10039, sd=41}
Kb8 {-2.41/18 0.025s, n=11007, sd=52} 317. Bg1 {+2.73/19 0.016s, n=10425, sd=49}
Ka8 {-2.41/20 0.029s, n=12661, sd=50} 318. Kc2 {+2.73/18 0.010s, n=10477, sd=49}
Kb8 {-2.41/21 0.025s, n=10035, sd=48} 319. Kc1 {+2.73/16 0.010s, n=10602, sd=47}
Ka8 {-2.41/23 0.044s, n=19829, sd=46} 320. Be3 {+2.73/18 0.024s, n=11459, sd=45}
Kb8 {-2.41/18 0.023s, n=10009, sd=44} 321. Kd2 {+2.76/19 0.027s, n=13366, sd=43}
Ka8 {-2.41/19 0.029s, n=13201, sd=42} 322. Bg1 {+3.83/19 0.029s, n=12469, sd=41}
Kb8 {-2.41/19 0.034s, n=15635, sd=40} 323. Kc2 {+2.71/15 0.018s, n=13308, sd=39}
Ka8 {-2.41/20 0.032s, n=13277, sd=38} 324. Kd1 {+2.32/17 0.023s, n=16935, sd=37}
Kb8 {-2.41/19 0.045s, n=18323, sd=36} 325. Be3 {+2.32/18 0.021s, n=10796, sd=35}
Ka8 {-2.41/19 0.027s, n=11580, sd=34} 326. Kc1 {+2.18/18 0.035s, n=18300, sd=33}
Kb8 {-2.76/20 0.043s, n=20039, sd=32} 327. Kd2 {+2.17/14 0.013s, n=11139, sd=31}
Ka8 {-2.48/15 0.027s, n=11972, sd=30} 328. Bc5 {+2.18/14 0.012s, n=11348, sd=29}
Kb8 {-2.41/18 0.034s, n=16841, sd=28} 329. Kc1 {+2.18/16 0.014s, n=12150, sd=27}
Ka8 {-2.38/15 0.025s, n=12944, sd=26} 330. Bd4 {+2.18/14 0.020s, n=10380, sd=25}
Kb8 {-2.38/14 0.024s, n=11959, sd=24} 331. Bg1 {+2.18/14 0.051s, n=23646, sd=23}
Ka8 {-2.36/14 0.011s, n=10749, sd=22} 332. Kd1 {+1.79/12 0.025s, n=21466, sd=21}
Kb8 {-1.78/13 0.016s, n=11006, sd=20} 333. Bd4 {+1.37/12 0.050s, n=20892, sd=25}
Ka8 {-1.64/12 0.021s, n=18134, sd=18} 334. Bb6 {+1.37/14 0.028s, n=12640, sd=24}
Kb8 {-1.07/12 0.024s, n=14889, sd=16} 335. Bf2 {+1.63/14 0.017s, n=12458, sd=35}
Ka8 {-1.06/12 0.019s, n=14569, sd=14} 336. Kc2 {+2.14/13 0.035s, n=13545, sd=36}
Kb8 {-0.85/11 0.011s, n=10632, sd=20} 337. Bd4 {+2.93/15 0.014s, n=11211, sd=36}
Ka8 {-1.73/12 0.035s, n=14818, sd=20} 338. Bb6 {+2.32/14 0.020s, n=14737, sd=39}
Kb8 {-1.91/11 0.038s, n=15874, sd=30} 339. a7+ {+2.32/12 0.021s, n=10011, sd=39}
Kb7 {-2.36/11 0.026s, n=11319, sd=24} 340. Kc3 {+2.32/13 0.016s, n=13446, sd=45}
Ka8 {-2.36/12 0.025s, n=12035, sd=28} 341. Bd4 {+2.32/14 0.024s, n=11515, sd=41}
Kb7 {-2.36/13 0.027s, n=14086, sd=32} 342. Kb2 {+2.32/17 0.017s, n=14323, sd=51}
Ka8 {-2.36/14 0.007s, n=10940, sd=32} 343. Kc1 {+2.32/16 0.018s, n=10601, sd=57}
Kb7 {-2.36/15 0.010s, n=10598, sd=38} 344. Bg1 {+2.45/17 0.012s, n=11343, sd=73}
Ka8 {-2.36/15 0.018s, n=10017, sd=36} 345. Bb6 {+2.45/17 0.014s, n=11788, sd=55}
Kb7 {-2.36/16 0.013s, n=11513, sd=40} 346. Kb2 {+2.45/16 0.015s, n=10588, sd=53}
Ka8 {-2.36/16 0.014s, n=10649, sd=48} 347. Bc5 {+2.45/16 0.013s, n=10749, sd=55}
Kb7 {-2.36/16 0.011s, n=11384, sd=46} 348. Kc3 {+2.45/17 0.033s, n=15160, sd=57}
Ka8 {-2.36/18 0.019s, n=11935, sd=48} 349. Kb4 {+2.49/18 0.024s, n=12194, sd=55}
Kb7 {-2.36/16 0.014s, n=10838, sd=48} 350. Kc4 {+2.60/16 0.026s, n=14586, sd=43}
Ka8 {-2.36/18 0.016s, n=10694, sd=50} 351. Kc3 {+2.48/14 0.012s, n=11388, sd=33}
Kb7 {-2.36/16 0.009s, n=10366, sd=45} 352. Bd4 {+2.52/13 0.012s, n=11640, sd=29}
Ka8 {-2.36/17 0.021s, n=11636, sd=52} 353. Kc4 {+2.46/15 0.011s, n=10336, sd=43}
Kb7 {-2.36/15 0.025s, n=10658, sd=48} 354. Bb6 {+2.46/17 0.025s, n=11451, sd=45}
Ka8 {-2.36/17 0.009s, n=12317, sd=44} 355. Bg1 {+2.46/18 0.014s, n=13801, sd=57}
Kb7 {-2.36/17 0.008s, n=10535, sd=46} 356. Bc5 {+2.66/18 0.011s, n=10599, sd=53}
Ka8 {-2.36/16 0.010s, n=10031, sd=50} 357. Kc3 {+2.46/17 0.019s, n=10175, sd=43}
Kb7 {-2.36/17 0.012s, n=11610, sd=52} 358. Kb2 {+2.46/17 0.017s, n=10337, sd=59}
Ka8 {-2.40/16 0.022s, n=10768, sd=56} 359. Kc1 {+2.46/17 0.021s, n=10119, sd=57}
Kb7 {-2.36/17 0.019s, n=12454, sd=58} 360. Bg1 {+2.66/17 0.024s, n=11263, sd=51}
Ka8 {-2.36/17 0.022s, n=10090, sd=56} 361. Bb6 {+2.46/16 0.025s, n=10992, sd=47}
Kb7 {-2.36/16 0.012s, n=10287, sd=56} 362. Kb2 {+2.46/16 0.027s, n=10998, sd=51}
Ka8 {-2.36/17 0.013s, n=10829, sd=40} 363. Bc5 {+2.46/16 0.013s, n=11467, sd=53}
Kb7 {-2.36/17 0.024s, n=10794, sd=44} 364. Kc3 {+2.46/16 0.012s, n=11684, sd=51}
Ka8 {-2.36/18 0.014s, n=10061, sd=42} 365. Bb6 {+2.00/14 0.070s, n=31012, sd=47}
Kb7 {-2.36/17 0.012s, n=10866, sd=42} 366. Kb4 {+2.00/12 0.011s, n=10130, sd=47}
Ka8 {-2.36/19 0.024s, n=15897, sd=46} 367. Bc5 {+2.00/15 0.023s, n=10212, sd=39}
Kb7 {-2.36/15 0.014s, n=12586, sd=44} 368. Bd4 {+2.00/16 0.030s, n=14176, sd=43}
Ka8 {-2.36/17 0.027s, n=11263, sd=42} 369. Kc4 {+2.00/14 0.023s, n=10733, sd=41}
Kb7 {-2.36/17 0.013s, n=10228, sd=40} 370. Bb6 {+2.00/16 0.016s, n=14282, sd=39}
Ka8 {-2.36/18 0.021s, n=14979, sd=38} 371. Kb4 {+2.00/16 0.029s, n=19521, sd=37}
Kb7 {-2.83/17 0.064s, n=34113, sd=36} 372. Kc3 {+2.00/14 0.012s, n=11141, sd=35}
Ka8 {-2.64/12 0.025s, n=10439, sd=34} 373. Kb2 {+2.00/15 0.015s, n=12840, sd=33}
Kb7 {-2.64/15 0.014s, n=11369, sd=32} 374. Bg1 {+2.00/13 0.020s, n=11235, sd=31}
Ka8 {-2.65/16 0.014s, n=11028, sd=30} 375. Kc3 {+2.98/15 0.083s, n=46114, sd=41}
Kb7 {-3.07/15 0.023s, n=17546, sd=28} 376. Kc4 {+1.53/10 0.022s, n=12428, sd=27}
Ka8 {-2.37/14 0.031s, n=12906, sd=26} 377. Kd3 {+1.82/12 0.013s, n=10466, sd=28}
Kb7 {-2.09/14 0.061s, n=26317, sd=24} 378. Bb6 {+1.82/11 0.035s, n=13699, sd=23}
Ka8 {-2.09/13 0.032s, n=15094, sd=22} 379. Kc3 {+1.20/12 0.045s, n=30746, sd=25}
Kb7 {-2.09/12 0.017s, n=14633, sd=20} 380. Kb4 {+1.20/11 0.014s, n=11921, sd=28}
Ka8 {-1.98/13 0.039s, n=23022, sd=18} 381. Ka4 {+1.22/13 0.044s, n=25148, sd=31}
Kb7 {-1.89/12 0.034s, n=24933, sd=16} 382. Bf2 {+1.22/11 0.086s, n=41154, sd=29}
Ka8 {-2.03/12 0.032s, n=13684, sd=14} 383. Ka3 {+1.24/14 0.014s, n=11511, sd=33}
Kb7 {-0.88/11 0.024s, n=12433, sd=18} 384. Kb3 {+2.67/17 0.034s, n=15686, sd=53}
Ka8 {-0.83/12 0.047s, n=18402, sd=20} 385. Kc4 {+2.67/17 0.032s, n=15377, sd=51}
Kb7 {-1.07/12 0.027s, n=13468, sd=19} 386. Kb5 {+1.62/15 0.019s, n=10375, sd=43}
Ka8 {-1.20/13 0.024s, n=10808, sd=28} 387. Bg1 {+3.07/17 0.021s, n=10304, sd=57}
Kb7 {-1.20/15 0.013s, n=11140, sd=38}
388. a8=R {+1.87/14 0.011s, n=10705, sd=55}
Kxa8 {-1.14/17 0.015s, n=13310, sd=52}
389. Kb6 {+3.01/17 0.020s, n=10011, sd=43} Kb8 {-1.14/15 0.019s, n=11856, sd=54}
390. Ka6 {+2.32/14 0.013s, n=10784, sd=41} Ka8 {-1.14/18 0.016s, n=15029, sd=57}
391. Bc5 {+1.66/13 0.019s, n=15935, sd=39} Kb8 {-1.14/18 0.014s, n=10774, sd=62}
392. Kb6 {+1.40/15 0.011s, n=10003, sd=37} Ka8 {-1.14/20 0.017s, n=11974, sd=69}
393. Bg1 {+1.40/17 0.023s, n=10449, sd=45} Kb8 {-1.14/20 0.023s, n=12285, sd=56}
394. Ka6 {+1.40/15 0.016s, n=11021, sd=52} Ka8 {-1.14/21 0.013s, n=11136, sd=62}
395. Bc5 {+3.07/16 0.011s, n=10490, sd=45} Kb8 {-1.14/21 0.012s, n=10283, sd=60}
396. Kb6 {+1.19/13 0.021s, n=20478, sd=35} Ka8 {-1.14/22 0.027s, n=10786, sd=56}
397. Be7 {+1.19/16 0.039s, n=16649, sd=51} Kb8 {-1.14/22 0.014s, n=11233, sd=60}
398. Ka6 {+2.23/20 0.012s, n=10759, sd=47} Ka8 {-1.14/21 0.015s, n=10334, sd=64}
399. Bf8 {+3.22/16 0.023s, n=13361, sd=71} Kb8 {-1.14/21 0.012s, n=11010, sd=66}
400. Be7 {+1.39/14 0.031s, n=14973, sd=35} Ka8 {-1.14/22 0.012s, n=10590, sd=74}
401. Bf6 {+3.07/18 0.011s, n=10884, sd=63} Kb8 {-1.14/22 0.012s, n=11090, sd=64}
402. Bb2 {+1.81/16 0.011s, n=10535, sd=45} Ka8 {-1.14/22 0.013s, n=11530, sd=64}
403. Bd4 {+1.78/15 0.014s, n=11111, sd=37} Kb8 {-1.14/22 0.012s, n=11105, sd=68}
404. Be3 {+1.78/18 0.008s, n=10264, sd=45} Ka8 {-1.14/22 0.025s, n=10638, sd=62}
405. Bf2 {+1.39/21 0.019s, n=15813, sd=65} Kb8 {-1.14/22 0.014s, n=12439, sd=67}
406. Kb6 {+1.39/20 0.024s, n=12089, sd=65} Ka8 {-1.14/21 0.015s, n=13208, sd=65}
407. Bd4 {+1.70/19 0.011s, n=13298, sd=63} Kb8 {-1.14/21 0.013s, n=11013, sd=63}
408. Bg1 {+1.86/15 0.022s, n=10500, sd=53} Ka8 {-1.14/23 0.015s, n=11406, sd=55}
409. Ka6 {+1.70/17 0.016s, n=13023, sd=49} Kb8 {-1.14/22 0.012s, n=10094, sd=59}
410. Bf2 {+1.93/17 0.016s, n=10289, sd=49} Ka8 {-1.14/22 0.012s, n=10578, sd=57}
411. Be3 {+1.87/16 0.009s, n=10551, sd=53} Kb8 {-1.14/22 0.012s, n=10198, sd=55}
412. Bg5 {+1.73/18 0.008s, n=11707, sd=47} Ka8 {-1.14/23 0.011s, n=10202, sd=53}
413. Be7 {+1.73/19 0.007s, n=10213, sd=52} Kb8 {-1.14/23 0.013s, n=11513, sd=51}
414. Bf6 {+1.73/20 0.020s, n=10683, sd=50} Ka8 {-1.14/24 0.014s, n=11455, sd=49}
415. Be7 {+1.73/20 0.019s, n=10660, sd=48} Kb8 {-1.14/22 0.018s, n=10652, sd=47}
416. Bf6 {+3.06/19 0.009s, n=12641, sd=46} Ka8 {-1.14/24 0.012s, n=11318, sd=45}
417. Bd4 {+1.52/15 0.007s, n=10132, sd=39} Kb8 {-1.14/23 0.013s, n=11097, sd=43}
418. Bc5 {+1.52/16 0.018s, n=11701, sd=42} Ka8 {-1.14/21 0.015s, n=12554, sd=41}
419. Kb6 {+1.52/16 0.019s, n=10324, sd=40} Kb8 {-1.14/19 0.024s, n=10563, sd=39}
420. Bb4 {+1.52/14 0.014s, n=10620, sd=38} Ka8 {-1.14/18 0.024s, n=12277, sd=37}
421. Bc3 {+1.31/17 0.017s, n=17156, sd=36} Kb8 {-1.14/16 0.025s, n=11173, sd=35}
422. Bg7 {+1.31/14 0.020s, n=10483, sd=34} Ka8 {-1.14/18 0.014s, n=10091, sd=33}
423. Bf6 {+1.31/15 0.009s, n=10913, sd=32} Kb8 {-1.14/20 0.035s, n=20519, sd=31}
424. Bb2 {+1.93/16 0.023s, n=10278, sd=30} Ka8 {-1.14/16 0.030s, n=15884, sd=29}
425. Ka6 {+1.37/15 0.008s, n=13057, sd=28} Kb8 {-1.14/16 0.028s, n=13944, sd=27}
426. Bg7 {+1.28/15 0.009s, n=10512, sd=26} Ka8 {-1.14/16 0.032s, n=16867, sd=25}
427. Bb2 {+1.41/14 0.008s, n=14578, sd=24} Kb8 {-1.09/15 0.015s, n=12576, sd=23}
428. Bc3 {+0.46/12 0.062s, n=34193, sd=37} Ka8 {-1.04/16 0.039s, n=15613, sd=32}
429. Be1 {+0.46/12 0.036s, n=12904, sd=30} Kb8 {-1.04/14 0.026s, n=10415, sd=32}
430. Bh4 {+0.46/13 0.014s, n=15628, sd=41} Ka8 {-1.07/17 0.017s, n=12157, sd=43}
431. Kb6 {+0.46/13 0.021s, n=10560, sd=35} Kb8 {-1.06/16 0.019s, n=13337, sd=42}
432. Bf6 {+0.46/13 0.020s, n=15117, sd=29} Ka8 {-1.06/17 0.027s, n=10588, sd=58}
433. Bc3 {+0.46/13 0.009s, n=12657, sd=41} Kb8 {-1.12/18 0.014s, n=11593, sd=52}
434. Be1 {+0.69/16 0.014s, n=12559, sd=41} Ka8 {-1.06/17 0.022s, n=10304, sd=42}
435. Bf2 {+0.61/11 0.033s, n=15607, sd=49} Kb8 {-1.87/17 0.016s, n=11689, sd=50}
436. a6 {+0.58/10 0.011s, n=12163, sd=47} Ka8 {-1.22/18 0.055s, n=23990, sd=40}
437. Be3 {+0.58/11 0.014s, n=14577, sd=33} Kb8 {-1.22/15 0.015s, n=10716, sd=36}
438. Kc6 {+0.68/11 0.017s, n=12495, sd=61} Ka8 {-1.22/16 0.014s, n=11088, sd=50}
439. Bd4 {+0.68/13 0.027s, n=12793, sd=43} Kb8 {-1.22/16 0.013s, n=10065, sd=42}
440. Kb6 {+0.68/14 0.008s, n=11312, sd=41} Ka8 {-1.22/17 0.014s, n=11199, sd=48}
441. Kb5 {+0.68/14 0.015s, n=10220, sd=47} Kb8 {-1.22/16 0.025s, n=10310, sd=42}
442. Kc4 {+0.68/15 0.010s, n=10228, sd=47} Ka8 {-1.22/18 0.015s, n=11949, sd=52}
443. Kc3 {+0.68/16 0.016s, n=12411, sd=53} Kb8 {-1.22/18 0.020s, n=10988, sd=54}
444. Kb4 {+0.68/17 0.013s, n=10692, sd=43} Ka8 {-1.22/19 0.013s, n=10637, sd=52}
445. Bf2 {+0.68/18 0.016s, n=10619, sd=45} Kb8 {-1.22/19 0.025s, n=10494, sd=56}
446. Be3 {+0.68/18 0.018s, n=12087, sd=47} Ka8 {-1.22/23 0.028s, n=10878, sd=61}
447. Bd4 {+0.68/19 0.013s, n=10955, sd=51} Kb8 {-2.11/20 0.014s, n=10154, sd=66}
448. Ka5 {+0.68/17 0.012s, n=10327, sd=71} Ka8 {-1.22/18 0.022s, n=10808, sd=58}
449. Kb5 {+0.68/18 0.018s, n=11082, sd=67} Kb8 {-1.22/20 0.023s, n=11954, sd=56}
450. Kc4 {+0.68/16 0.012s, n=10456, sd=59} Ka8 {-1.22/20 0.014s, n=11204, sd=56}
451. Kc3 {+0.68/18 0.022s, n=11944, sd=61} Kb8 {-1.36/18 0.025s, n=10383, sd=48}
452. Kb4 {+0.68/16 0.015s, n=11880, sd=61} Ka8 {-1.22/18 0.028s, n=11118, sd=50}
453. Bf2 {+0.68/15 0.024s, n=10556, sd=51} Kb8 {-1.22/19 0.026s, n=10737, sd=48}
454. Be3 {+0.68/15 0.020s, n=11002, sd=55} Ka8 {-1.39/20 0.026s, n=13464, sd=64}
455. Bd4 {+0.68/17 0.023s, n=11453, sd=57} Kb8 {-1.22/18 0.019s, n=11350, sd=46}
456. Ka5 {+0.68/17 0.015s, n=10750, sd=55} Ka8 {-1.22/20 0.016s, n=11240, sd=52}
457. Kb6 {+0.68/15 0.021s, n=10300, sd=59} Kb8 {-1.22/19 0.017s, n=11150, sd=54}
458. Be3 {+0.68/16 0.014s, n=12217, sd=45} Ka8 {-1.22/21 0.029s, n=11885, sd=52}
459. Bc5 {+0.68/18 0.027s, n=11626, sd=55} Kb8 {-1.22/19 0.021s, n=10858, sd=54}
460. Ka5 {+0.68/19 0.030s, n=11659, sd=53} Ka8 {-1.22/21 0.033s, n=19042, sd=52}
461. Bd6 {+0.68/18 0.012s, n=10240, sd=51} Ka7 {-1.22/18 0.017s, n=12281, sd=50}
462. Bg3 {+0.68/19 0.034s, n=12564, sd=49} Ka8 {-1.22/19 0.029s, n=16007, sd=48}
463. Bf2 {+0.94/15 0.023s, n=10099, sd=47} Kb8 {-1.22/19 0.046s, n=17221, sd=46}
464. Be3 {+0.83/16 0.030s, n=13645, sd=52} Ka8 {-1.22/18 0.040s, n=15360, sd=44}
465. Bd4 {+0.69/12 0.012s, n=10246, sd=39} Kb8 {-1.22/18 0.025s, n=18403, sd=42}
466. Kb5 {+0.69/14 0.051s, n=28309, sd=41} Ka8 {-1.22/18 0.027s, n=16854, sd=40}
467. Kc4 {+0.69/14 0.038s, n=13275, sd=37} Kb8 {-1.22/17 0.024s, n=13772, sd=38}
468. Be3 {+0.69/15 0.014s, n=11944, sd=37} Ka8 {-1.22/17 0.039s, n=18624, sd=36}
469. Bf2 {+0.69/15 0.031s, n=10660, sd=35} Kb8 {-1.22/15 0.023s, n=16151, sd=34}
470. Kb4 {+0.69/15 0.024s, n=17350, sd=33} Ka8 {-1.22/15 0.027s, n=16192, sd=32}
471. Kb5 {+0.69/15 0.020s, n=15422, sd=31} Kb8 {-1.22/14 0.016s, n=12318, sd=30}
472. Be3 {+0.69/13 0.014s, n=10080, sd=29} Ka8 {-1.22/14 0.018s, n=13316, sd=28}
473. Ka5 {+0.71/14 0.038s, n=23464, sd=27} Kb8 {-1.22/14 0.023s, n=17665, sd=26}
474. Bc5 {+0.71/12 0.028s, n=11716, sd=25} Ka8 {-1.15/14 0.041s, n=28381, sd=24}
475. Bb6 {+0.71/13 0.029s, n=20645, sd=23} Kb8 {-1.15/13 0.021s, n=14622, sd=22}
476. Kb4 {+0.72/12 0.026s, n=15294, sd=21} Ka8 {-1.14/12 0.017s, n=13470, sd=20}
477. Kb3 {+0.76/12 0.020s, n=10346, sd=19} Kb8 {-1.20/12 0.020s, n=14275, sd=18}
478. Bf2 {+0.72/11 0.019s, n=11711, sd=17} Ka8 {-0.98/13 0.035s, n=25687, sd=16}
479. Be3 {+0.70/11 0.029s, n=11990, sd=15} Kb8 {-0.96/11 0.022s, n=15736, sd=14}
480. Kc4 {+0.66/10 0.053s, n=16647, sd=23} Ka8 {-0.33/11 0.031s, n=22405, sd=12}
481. Bb6 {+0.52/11 0.022s, n=13566, sd=19} Kb8 {-0.51/11 0.024s, n=17200, sd=17}
482. Kd4 {+0.52/10 0.027s, n=11410, sd=19} Ka8 {-0.76/12 0.049s, n=16868, sd=36}
483. a7 {+0.55/11 0.055s, n=19394, sd=19} Kb7 {-0.76/11 0.033s, n=15506, sd=32}
484. Ke4 {+0.55/11 0.038s, n=22796, sd=29} Ka8 {-1.08/11 0.040s, n=13968, sd=22}
485. Ke5 {+0.55/11 0.042s, n=13840, sd=45} Kb7 {-1.08/12 0.038s, n=14075, sd=38}
486. Kd6 {+0.55/13 0.033s, n=13082, sd=33} Ka8 {-1.08/15 0.025s, n=10916, sd=42}
487. Ke7 {+0.55/15 0.015s, n=11181, sd=39} Kb7 {-1.08/13 0.020s, n=10003, sd=36}
488. Kf7 {+0.55/15 0.024s, n=11310, sd=43} Ka8 {-1.08/16 0.019s, n=10990, sd=36}
489. Bd4 {+0.55/17 0.029s, n=12227, sd=39} Kb7 {-1.18/19 0.020s, n=11726, sd=40}
490. Ke6 {+0.55/16 0.074s, n=12408, sd=53} Ka8 {-1.14/16 0.019s, n=12390, sd=48}
491. Kd7 {+0.55/17 0.053s, n=11025, sd=53} Kb7 {-1.14/18 0.201s, n=13328, sd=52}
492. Kd6 {+0.55/15 0.024s, n=10086, sd=83} Ka8 {-1.14/19 0.349s, n=10480, sd=62}
493. Bg1 {+0.58/17 0.266s, n=12499, sd=61} Kb7 {-1.14/18 0.655s, n=11135, sd=48}
494. Ke6 {+0.58/15 0.028s, n=10164, sd=45} Ka8 {-1.14/19 0.389s, n=10906, sd=55}
495. Bf2 {+0.58/17 0.414s, n=11826, sd=51} Kb7 {-1.14/19 0.658s, n=10229, sd=53}
496. Kf7 {+0.63/16 0.030s, n=12326, sd=75} Ka8 {-1.14/20 0.452s, n=11511, sd=70}
497. Ke7 {+0.59/16 0.475s, n=11532, sd=42} Kb7 {-1.14/19 0.871s, n=11214, sd=65}
498. Kf8 {+0.58/16 0.420s, n=10566, sd=51} Ka8 {-1.14/20 0.231s, n=10889, sd=70}
499. Kg8 {+0.58/16 0.324s, n=10818, sd=43} Kb7 {-1.14/20 0.737s, n=11148, sd=58}
500. Bd4 {+0.59/18 0.203s, n=10813, sd=49} Ka8 {-1.14/20 0.456s, n=10845, sd=66}
501. Kh7 {+0.62/17 0.289s, n=11954, sd=65} Kb7 {-1.14/20 0.738s, n=12262, sd=61}
502. Kh8 {+0.62/16 0.473s, n=11085, sd=45} Ka8 {-1.14/19 0.202s, n=12315, sd=62}
503. Be3 {+0.62/18 0.786s, n=11548, sd=47} Kb7 {-1.14/20 0.485s, n=10955, sd=60}
504. Bg1 {+0.62/19 0.750s, n=12025, sd=59} Ka8 {-1.14/21 0.175s, n=10443, sd=58}
505. Bd4 {+0.67/19 0.337s, n=10414, sd=57} Kb7 {-1.14/19 0.113s, n=10208, sd=56}
506. Be3 {+0.67/19 0.486s, n=12285, sd=55} Ka8 {-1.14/20 0.362s, n=23740, sd=54}
507. Kh7 {+0.67/17 0.614s, n=10741, sd=39} Kb7 {-1.38/13 0.086s, n=10200, sd=52}
508. Kg7 {+0.67/17 0.390s, n=10262, sd=51} Ka8 {-1.38/18 0.647s, n=11029, sd=50}
509. Kg6 {+0.67/19 0.545s, n=11613, sd=49} Kb7 {-1.38/19 0.159s, n=15117, sd=48}
510. Kh5 {+0.69/19 1.030s, n=27168, sd=47} Ka8 {-1.38/19 0.764s, n=10795, sd=46}
511. Bg1 {+0.69/13 0.669s, n=14683, sd=45} Kb7 {-1.38/17 0.330s, n=13277, sd=44}
512. Bf2 {+0.69/14 0.557s, n=12023, sd=43} Ka8 {-1.38/17 0.365s, n=10349, sd=42}
513. Be3 {+0.69/17 0.410s, n=10369, sd=41} Kb7 {-1.38/17 0.454s, n=10251, sd=40}
514. Kg6 {+0.69/14 0.448s, n=10606, sd=39} Ka8 {-1.38/17 0.713s, n=13998, sd=38}
515. Kf5 {+0.70/16 0.745s, n=17303, sd=37} Kb7 {0.00/199 0.013s, n=560, sd=36}
516. Kg5 {+0.73/15 0.887s, n=19314, sd=35}
Ka8 {0.00/72 0.325s, n=10728, sd=1, White disconnects} 0-1