![[at]](/mwf/v12/flags/at.png "Austria")
Hello
[Event "Kh2"]
[Site "?"]
[Date "2011.??.??"]
[Round "?"]
[White "Rusz, Arpad"]
[Black "_"]
[Result "1-0"]
1. Kh2!! 1-0
How much time does your programm need, to find this winning move?
Happy new Year 2012 Anton
[Event "Kh2"]
[Site "?"]
[Date "2011.??.??"]
[Round "?"]
[White "Rusz, Arpad"]
[Black "_"]
[Result "1-0"]
6b1/5p2/1p3Bp1/1P3pP1/5P2/pp1B2K1/pr4P1/k7 w - - 0 1
1. Kh2!! 1-0
How much time does your programm need, to find this winning move?
Happy new Year 2012 Anton
![[de]](/mwf/v12/flags/de.png "Germany")
Do you have analysis that demonstrates that 1. Kh2 is, in fact, a winning move? Every engine I've looked at it with sees a draw by repetition after 1...Bh7 2. Kg3. Can White force anything here?
hi
the best move is not 2.Kg3??, but .........!!
regards Anton
the best move is not 2.Kg3??, but .........!!
regards Anton
![[nl]](/mwf/v12/flags/nl.png "Netherlands")
Houdini finds the following, which is not a complete pv btw.
8192 MB Large Page Hash
Nalimov 5 men EGTB available - 32 MB cache
Engine: Houdini 2.0c Pro x64 (8192 MB)
by Robert Houdart
26/47 0:01 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (15.377.603) 13941
27/53 0:01 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (26.224.518) 14175
28/53 0:03 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (48.174.617) 14380
29/55 0:05 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (86.878.293) 14528
30/57 0:10 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (156.744.638) 14624
31/65 0:25 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (379.853.666) 15040 TB:24
32/68 0:46 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (699.281.055) 15075 TB:24
33/74 1:32 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (1.396.183.056) 15110 TB:29
34/74 1:57 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (1.769.777.337) 15048 TB:33
35/74 2:53 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (2.597.162.728) 15002 TB:104
36/74 4:35 0.00 1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 (4.137.484.057) 15043 TB:159
36/78 9:04 +0.04++ 1.Kh2 (8.286.407.901) 15209 TB:552
36/78 9:04 +0.14++ 1.Kh2 (8.286.418.660) 15209 TB:552
36/78 9:04 +0.35++ 1.Kh2 (8.286.429.489) 15209 TB:552
36/78 9:04 +1.11++ 1.Kh2 (8.286.442.791) 15209 TB:552
36/78 9:04 +4.03++ 1.Kh2 (8.286.454.164) 15209 TB:552
36/85 9:04 +11.71++ 1.Kh2 (8.287.661.811) 15208 TB:552
36/85 9:07 +M22 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 6.Kd1 Bg8 7.Kc1 Bh7 8.Bc4 Bg8 9.Bxb3 Bh7 10.Bc2 Bg8 11.Kd2 Bh7 12.Kd3 Bg8 13.Kc4 Bh7 14.Kd5 (8.334.528.836) 15223 TB:552
37/85 9:07 +M22 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 6.Kd1 Bg8 7.Kc1 Bh7 8.Bc4 Bg8 9.Bxb3 Bh7 10.Bc2 Bg8 11.Kd2 Bh7 12.Kd3 Bg8 13.Kc4 Bh7 14.Kd5 (8.336.037.681) 15223 TB:552
38/85 9:10 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 6.Kd1 Bg8 7.Kc1 Bh7 8.Bc4 Bg8 9.Bxb3 Bh7 10.Bc2 Bg8 11.Kd2 Bh7 12.Kd3 Bg8 13.Kc4 Bh7 14.Kd5 (8.396.644.804) 15241 TB:552
39/85 9:17 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 6.Kd1 Bg8 7.Kc1 Bh7 8.Bc4 Bg8 9.Bxb3 Bh7 10.Bc2 Bg8 11.Kd2 Bh7 12.Kd3 Bg8 13.Kc4 Bh7 14.Kd5 (8.508.086.518) 15273 TB:552
40/85 9:26 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 6.Kd1 Bg8 7.Kc1 Bh7 8.Bc4 Bg8 9.Bxb3 Bh7 10.Bc2 Bg8 11.Kd2 Bh7 12.Kd3 Bg8 13.Kc4 Bh7 14.Kd5 (8.680.866.164) 15323 TB:554
40/85 9:29 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 6.Kd1 Bg8 7.Kc1 Bh7 8.Bc4 Bg8 9.Bxb3 Bh7 10.Bc2 Bg8 11.Kd2 Bh7 12.Kd3 Bg8 13.Kc4 Bh7 14.Kd5 (8.728.575.623) 15340 TB:554
best move: Kg3-h2 time: 9:29.419 min n/s: 15.340.000 CPU 99.6% n/s(1CPU): 15.401.606 nodes: 8.728.575.623 TB: 554
![[us]](/mwf/v12/flags/us.png "United States")
Ernst try these settings with your Houdini, mate search, fiftymovedistance
12 processor(s) found, POPCNT available
NUMA configuration with 2 node(s), offset 0
Houdini 2.0c Pro x64 (4096 MB)
Mate Search=20
FiftyMoveDistance=25
35/41 1:50 +0.04++ 1.Kh2 (3.108.623.510)
35/41 1:50 +0.14++ 1.Kh2 (3.108.627.527)
35/41 1:50 +0.35++ 1.Kh2 (3.108.631.142)
35/41 1:50 +1.11++ 1.Kh2 (3.108.636.234)
35/41 1:50 +4.03++ 1.Kh2 (3.108.642.524)
35/41 1:50 +11.71++ 1.Kh2 (3.108.864.464)
35/41 1:53 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 (3.166.859.974)
36/41 1:53 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 (3.172.338.511)
37/41 1:54 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 (3.200.200.457)
38/41 1:58 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (3.286.359.700)
39/41 2:05 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (3.471.382.413)
40/41 2:19 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (3.839.486.163)
41/41 2:44 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (4.516.204.980)
42/41 3:25 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (5.682.198.860)
42/41 4:02 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (6.752.949.190)
6b1/5p2/1p3Bp1/1P3pP1/5P2/pp1B2K1/pr4P1/k7 w - -
12 processor(s) found, POPCNT available
NUMA configuration with 2 node(s), offset 0
Houdini 2.0c Pro x64 (4096 MB)
Mate Search=20
FiftyMoveDistance=25
35/41 1:50 +0.04++ 1.Kh2 (3.108.623.510)
35/41 1:50 +0.14++ 1.Kh2 (3.108.627.527)
35/41 1:50 +0.35++ 1.Kh2 (3.108.631.142)
35/41 1:50 +1.11++ 1.Kh2 (3.108.636.234)
35/41 1:50 +4.03++ 1.Kh2 (3.108.642.524)
35/41 1:50 +11.71++ 1.Kh2 (3.108.864.464)
35/41 1:53 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 (3.166.859.974)
36/41 1:53 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 (3.172.338.511)
37/41 1:54 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 (3.200.200.457)
38/41 1:58 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (3.286.359.700)
39/41 2:05 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (3.471.382.413)
40/41 2:19 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (3.839.486.163)
41/41 2:44 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (4.516.204.980)
42/41 3:25 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (5.682.198.860)
42/41 4:02 +M20 1.Kh2 Bh7 2.Kg1 Bg8 3.g3 Bh7 4.Kf1 Bg8 5.Ke1 Bh7 (6.752.949.190)
![[sk]](/mwf/v12/flags/sk.png "Slovakia")
Actually it is mate in 19, 3.g3 is useless.
The key moves:
..Kc1..Bc2..b6..
Happy New Year 2012
Mário
..Kc1..Bc2..b6..
Happy New Year 2012
Mário
![[ru]](/mwf/v12/flags/ru.png "Russian Federation")
Thanks. I've solved it with you and Rybka
1. Kh2 Bh7 2. Kg1 Bg8 3. Kf1 Bh7 4. Ke1 Bg8 5. Kd1 Bh7 6. Kc1 Bg8 7. Bc4 Bh7 8.
Bxb3 Bg8 9. Bc2 Bh7 10. Kd2 Bg8 11. Kd3 Bh7 12. Kc4 Bg8 13. Kd5 Bh7 14. Kc6 Bg8
15. Kxb6 Bh7 16. Ka5 Bg8 17. Ka4 Bh7 18. Kxa3 Bg8 19. Bxb2# 1-0
Analysis by Deep Rybka 4.1 w32:
1.Kg3-h2 Bg8-h7 2.Kh2-g1 Bh7-g8 3.Kg1-f1™ Bg8-h7 4.Kf1-e1™ Bh7-g8 5.Ke1-d1™ Bg8-h7 6.Kd1-c1™ Bh7-g8 7.Bd3-c4 Bg8-h7 8.Bc4xb3 Bh7-g8 9.Bb3-c2 Bg8-h7 10.Kc1-d2 Bh7-g8 11.Kd2-d3 Bg8-h7 12.Kd3-c4 Bh7-g8 13.Kc4-d5 Bg8-h7 14.Kd5-c6 Bh7-g8 15.Kc6xb6 Bg8-h7 16.Kb6-a5
+- (#19) Depth: 37 00:00:07 879kN
1. Kh2 Bh7 2. Kg1 Bg8 3. Kf1 Bh7 4. Ke1 Bg8 5. Kd1 Bh7 6. Kc1 Bg8 7. Bc4 Bh7 8.
Bxb3 Bg8 9. Bc2 Bh7 10. Kd2 Bg8 11. Kd3 Bh7 12. Kc4 Bg8 13. Kd5 Bh7 14. Kc6 Bg8
15. Kxb6 Bh7 16. Ka5 Bg8 17. Ka4 Bh7 18. Kxa3 Bg8 19. Bxb2# 1-0
Analysis by Deep Rybka 4.1 w32:
1.Kg3-h2 Bg8-h7 2.Kh2-g1 Bh7-g8 3.Kg1-f1™ Bg8-h7 4.Kf1-e1™ Bh7-g8 5.Ke1-d1™ Bg8-h7 6.Kd1-c1™ Bh7-g8 7.Bd3-c4 Bg8-h7 8.Bc4xb3 Bh7-g8 9.Bb3-c2 Bg8-h7 10.Kc1-d2 Bh7-g8 11.Kd2-d3 Bg8-h7 12.Kd3-c4 Bh7-g8 13.Kc4-d5 Bg8-h7 14.Kd5-c6 Bh7-g8 15.Kc6xb6 Bg8-h7 16.Kb6-a5
+- (#19) Depth: 37 00:00:07 879kN
6b1/5p2/1p3Bp1/1P3pP1/5P2/pp1B2K1/pr4P1/k7 w - - 0 1
Analysis by Houdini 2.0c Pro x64:
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Bc4 Bh7 8.Bd5 Bg8 9.Kd4
= (0.00) depth: 7/18 00:00:00
= (0.00) depth: 30/60 00:00:07 59046
1.Kh2 Bh7 2.Kg1 Bg8 3.Kf1 Bh7 4.Ke1 Bg8 5.Kd1 Bh7 6.Kc1 Bg8 7.Bc4 Bh7 8.Bxb3 Bg8 9.Bc2 Bh7 10.Kd2 Bg8 11.Kd3 Bh7 12.Kc4 Bg8 13.Bd3 Bh7 14.g3 Bg8 15.Kd5 Bh7 16.Kc6 Bg8 17.Kxb6 Bh7 18.Kc5 Bg8 19.b6 Bh7 20.b7 Bg8 21.b8Q Bh7 22.Qb7 Bg8 23.Qh1#
= (0.04 ++) depth: 30/60 00:00:24
+- (#23) depth: 37/60 00:01:17
FiftyMoveDistance=8
Analysis by The King 3.50: (selective search = 6)
1.Kg3-f3 Bg8-h7 2.Kf3-e3 Bh7-g8 3.Ke3-f3
= (0.00) Depth: 6 00:00:00 18kN
= (0.00) Depth: 15 00:00:17 39844kN
1.Kg3-h2 Bg8-h7 2.Kh2-g1 Bh7-g8 3.Kg1-f1 Bg8-h7 4.Kf1-e1 Bh7-g8 5.Ke1-d1 Bg8-h7 6.Kd1-c1 Bh7-g8 7.Bd3-c4 Bg8-h7 8.Bc4xb3 Bh7-g8 9.Bb3-c2 Bg8-h7 10.Kc1-d2 Bh7-g8 11.Kd2-d3 Bg8-h7 12.Kd3-c4 Bh7-g8 13.Kc4-d5 Bg8-h7 14.Kd5-c6 Bh7-g8 15.Kc6xb6 Bg8-h7 16.Kb6-a5 Bh7-g8 17.Ka5-a4 Bg8-h7 18.Ka4xa3 Bh7-g8 19.Bf6xb2#
= (0.11) Depth: 15 00:00:27 61526kN
+- (99.63) Depth: 19 00:07:41 994mN
1.Kg3-f3 Bg8-h7 2.Kf3-e3 Bh7-g8 3.Ke3-f3
= (0.00) Depth: 6 00:00:00 18kN
= (0.00) Depth: 15 00:00:17 39844kN
1.Kg3-h2 Bg8-h7 2.Kh2-g1 Bh7-g8 3.Kg1-f1 Bg8-h7 4.Kf1-e1 Bh7-g8 5.Ke1-d1 Bg8-h7 6.Kd1-c1 Bh7-g8 7.Bd3-c4 Bg8-h7 8.Bc4xb3 Bh7-g8 9.Bb3-c2 Bg8-h7 10.Kc1-d2 Bh7-g8 11.Kd2-d3 Bg8-h7 12.Kd3-c4 Bh7-g8 13.Kc4-d5 Bg8-h7 14.Kd5-c6 Bh7-g8 15.Kc6xb6 Bg8-h7 16.Kb6-a5 Bh7-g8 17.Ka5-a4 Bg8-h7 18.Ka4xa3 Bh7-g8 19.Bf6xb2#
= (0.11) Depth: 15 00:00:27 61526kN
+- (99.63) Depth: 19 00:07:41 994mN
![[tr]](/mwf/v12/flags/tr.png "Turkey")
New game
Analysis by Deep Rybka 4.1 SSE42 x64:
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 6 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 7 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 8 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 9 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 10 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 11 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 12 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 13 00:00:00 1kN
1.Kf3 Bh7 2.Ke3[] Bg8 3.Kf3 Bh7 4.Ke3[] Bg8 5.Kf3 Bh7 6.Ke3[] Bg8 7.Kf3 Bh7 8.Ke3[] Bg8 9.Kf3 Bh7 10.Ke3[] Bg8 11.Kf3 Bh7 12.Ke3[] Bg8 13.Kf3 Bh7 14.Ke3[] Bg8 15.Kf3 Bh7 16.Ke3[]
= (0.00) Depth: 14 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 15 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 16 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 17 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 18 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 19 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 20 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 21 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 22 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 23 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 24 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 25 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 26 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 27 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 28 00:00:00 14kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 29 00:00:00 14kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 30 00:00:00 39kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 31 00:00:00 83kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 32 00:00:00 140kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 33 00:00:00 272kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 34 00:00:01 495kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 35 00:00:06 2422kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 36 00:01:21 36180kN, tb=67
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 37 00:01:21 36187kN, tb=67
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 38 00:01:57 51165kN, tb=75
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 39 00:02:10 57339kN, tb=77
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 40 00:06:16 159mN, tb=361
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 41 00:10:06 254mN, tb=636
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 42 00:16:00 396mN, tb=1256
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 43 00:32:40 772mN, tb=4930
6b1/5p2/1p3Bp1/1P3pP1/5P2/pp1B2K1/pr4P1/k7 w - - 0 1
Analysis by Deep Rybka 4.1 SSE42 x64:
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 6 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 7 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 8 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 9 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 10 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 11 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 12 00:00:00 0kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 13 00:00:00 1kN
1.Kf3 Bh7 2.Ke3[] Bg8 3.Kf3 Bh7 4.Ke3[] Bg8 5.Kf3 Bh7 6.Ke3[] Bg8 7.Kf3 Bh7 8.Ke3[] Bg8 9.Kf3 Bh7 10.Ke3[] Bg8 11.Kf3 Bh7 12.Ke3[] Bg8 13.Kf3 Bh7 14.Ke3[] Bg8 15.Kf3 Bh7 16.Ke3[]
= (0.00) Depth: 14 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 15 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 16 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 17 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 18 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 19 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 20 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 21 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 22 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 23 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 24 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 25 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 26 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3[] Bh7 4.Ke3 Bg8 5.Kf3[] Bh7 6.Ke3 Bg8 7.Kf3[] Bh7 8.Ke3 Bg8 9.Kf3[] Bh7 10.Ke3 Bg8 11.Kf3[] Bh7 12.Ke3 Bg8 13.Kf3[] Bh7 14.Ke3 Bg8 15.Kf3[] Bh7 16.Ke3
= (0.00) Depth: 27 00:00:00 1kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 28 00:00:00 14kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 29 00:00:00 14kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 30 00:00:00 39kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 31 00:00:00 83kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 32 00:00:00 140kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 33 00:00:00 272kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 34 00:00:01 495kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 35 00:00:06 2422kN
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 36 00:01:21 36180kN, tb=67
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 37 00:01:21 36187kN, tb=67
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 38 00:01:57 51165kN, tb=75
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 39 00:02:10 57339kN, tb=77
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 40 00:06:16 159mN, tb=361
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 41 00:10:06 254mN, tb=636
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 42 00:16:00 396mN, tb=1256
1.Kf3 Bh7 2.Ke3 Bg8 3.Kf3 Bh7 4.Ke3 Bg8 5.Kf3 Bh7 6.Ke3 Bg8 7.Kf3 Bh7 8.Ke3 Bg8 9.Kf3 Bh7 10.Ke3 Bg8 11.Kf3 Bh7 12.Ke3 Bg8 13.Kf3 Bh7 14.Ke3 Bg8 15.Kf3 Bh7 16.Ke3
= (0.00) Depth: 43 00:32:40 772mN, tb=4930
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