Pedigree complete in | 2
gen |
Pedigree depth |
17
gen |
Pedigree Completeness Index (5 gen) |
0,00
|
Generation interval (average, 4 gen) | Not available |
Ancestor birthyear (average, 4 gen) | Not available |
French Trotter |
0,00
% |
Russian Trotter |
0,00
% |
Standardbred |
100,00
% |
|
Inbreeding Coefficient (The Blood Bank ) | (3,687 %) |
Inbreeding Coefficient (STC) | Not available |
|
Peter the Great | 165 paths, 26 crosses (closest: 6) | Hoot Mon | 4 + 4 | Guy Axworthy | 72 paths, 17 crosses (closest: 6) | Hambletonian | 18354 paths, 271 crosses (closest: 9) | Axworthy | 140 paths, 24 crosses (closest: 7) | Scotland | 5 + (5+6) | George Wilkes | 6240 paths, 158 crosses (closest: 9) | McKinney | 52 paths, 17 crosses (closest: 7) | Peter Volo | (5+6+6y) + (7x+7) | Peter Scott | (6+6) + (6+7) | Roya Mckinney (Mare) | (6+6) + (6+7) | Sandy Flash | 5 + 6x | Happy Medium | 192 paths, 28 crosses (closest: 8) | Spencer | 7 + (5+7+7) | Guy Wilkes | 132 paths, 23 crosses (closest: 8) | Nervolo Belle (Mare) | (6+7+7+9) + (8x+8) | Princess Royal (Mare) | (7+7+9) + (7+8+9) | Electioneer | 496 paths, 47 crosses (closest: 8) | Hollyrood Nimble (Mare) | (7+8) + 6x | Bingen | 78 paths, 19 crosses (closest: 8) | Lady Bunker (Mare) | 546 paths, 47 crosses (closest: 9) | Dillon Axworthy | (6+6+7) + 8x | Lee Tide | 8 + (6+7x+8+8) | Belwin | (6+7+8+8) + 8 | Baron Wilkes | 45 paths, 14 crosses (closest: 8) | Beautiful Bells (Mare) | 99 paths, 20 crosses (closest: 9) | Chimes | (8+8+9+10) + (8+9+9+10) | Lee Axworthy | (8+9) + (7+8+9+9) | Emily Ellen (Mare) | 9 + (7+7+8x+8+9+9) | May King | 91 paths, 20 crosses (closest: 9) | Young Miss (Mare) | 91 paths, 20 crosses (closest: 9) | Minnehaha (Mare) | 132 paths, 23 crosses (closest: 10) | Baronmore | (8+9) + (8x+9x) | Alcantara | (9+9+11) + (9+9+10+11+11) | Todd | 10 + (8+8+9x+9+9+9+10+10) | Onward | (8+8+9+10+10+10+10+12) + (11+11) | Maggie H. (Mare) | (9+9+10+11+12) + (10+11+12+12) | Wilton | (9+9+10) + (10x+10) | Red Wilkes | 153 paths, 26 crosses (closest: 10) | Harold | (10+11+12+13) + (9+11+11+11) | Lord Russell | (9+11+12) + 10 |
|