Capri (Mare) | 3x + 3xm |
Speedy Crown | 3y + 4 |
Peter the Great | 1496 paths, 78 crosses (closest: 8) |
Speedster | (5+5y) + (6+6) |
Bemecourt | 420 paths, 43 crosses (closest: 7) |
Intermede | 112 paths, 22 crosses (closest: 7) |
Peter Scott | 72 paths, 17 crosses (closest: 7) |
Fuschia | 1512 paths, 83 crosses (closest: 8) |
Scotland | 30 paths, 11 crosses (closest: 6) |
Sam Williams | (6+7+7x) + (6+7+7x) |
Javari | (6+7) + (5+7) |
Guy Axworthy | 720 paths, 54 crosses (closest: 8) |
Belle Poule (Mare) | 176 paths, 27 crosses (closest: 8) |
Axworthy | 1610 paths, 81 crosses (closest: 8) |
Hambletonian | 152928 paths, 786 crosses (closest: 11) |
James Watt | 476 paths, 45 crosses (closest: 9) |
Quo Vadis | (7+8x+8) + (6+8x+8+8+9) |
George Wilkes | 53922 paths, 467 crosses (closest: 10) |
Peter Volo | 72 paths, 17 crosses (closest: 8) |
Enoch | 28 paths, 11 crosses (closest: 7) |
Dean Hanover | (6+7+7) + (8+8+8) |
McKinney | 425 paths, 42 crosses (closest: 8) |
Volomite | (7+7+8) + (8+8+8+9) |
Hoot Mon | 5 + 7 |
Victory Song | (6+6) + 7 |
Junon (Mare) | (7+8+9x+9) + (7+9x+9+9+10) |
Salam | (7x+8) + (7x+8+8+10) |
Darnley | 6 + (7+8) |
Axtell | 1692 paths, 83 crosses (closest: 9) |
Dillon Axworthy | (7+8+8+8+9+9) + (9+9+9+10) |
Princess Royal (Mare) | 90 paths, 19 crosses (closest: 8) |
Worthy Boy | 7 + (7+7+8) |
Benjamin | 35 paths, 12 crosses (closest: 7) |
Phaeton | 665 paths, 54 crosses (closest: 9) |
Happy Medium | 1656 paths, 82 crosses (closest: 10) |
The Great McKinney | 6 + 7 |
Guy McKinney | (7+8+8) + (8+9+9) |
Uranie (Mare) | 6x + 7 |
Koenigsberg | (8x+8) + (7+8x+8) |
Jongleur | (7+8+8) + (8+8) |
Guy Wilkes | 1224 paths, 70 crosses (closest: 10) |
Spencer | (7+8+9+9) + (8+10+10+10) |
Nervolo Belle (Mare) | 108 paths, 21 crosses (closest: 9) |
Electioneer | 4278 paths, 131 crosses (closest: 10) |
Mr McElwyn | (7+8) + (8+9+10) |
Walnut Hall | (8+9+9x+10+11) + (8+9+9x+11+12) |
Lady Bunker (Mare) | 5810 paths, 153 crosses (closest: 11) |
Valentino | (8x+8) + (8x+8) |
Beaumanoir | (9+9) + (7x+8+9+9) |
Kalmouk | (8+9) + (8+9+9+9+11) |
San Francisco | 28 paths, 11 crosses (closest: 9) |
Lee Axworthy | 63 paths, 16 crosses (closest: 9) |
Bingen | 504 paths, 45 crosses (closest: 9) |
Chimes | 110 paths, 21 crosses (closest: 9) |
Sebastopol | (9+10x+10+10+10) + (8+10x+10+10+10) |
Narquois | (9+10+10) + (8+9+9+10+10+11+11) |
Zombro | 55 paths, 16 crosses (closest: 10) |
Emily Ellen (Mare) | 36 paths, 12 crosses (closest: 9) |
Esther (Mare) | 56 paths, 15 crosses (closest: 10) |
Oriflamme (Mare) | 8 + (8+9) |
Beautiful Bells (Mare) | 440 paths, 42 crosses (closest: 10) |
Todd | 64 paths, 16 crosses (closest: 10) |
Princess Gay (Mare) | 8 + (9+10+10) |
May King | 594 paths, 49 crosses (closest: 10) |
Young Miss (Mare) | 594 paths, 49 crosses (closest: 10) |
Baron Wilkes | 195 paths, 28 crosses (closest: 10) |
Almont | 182 paths, 27 crosses (closest: 11) |
Alcantara | 180 paths, 27 crosses (closest: 10) |
Expressive (Mare) | (9+10+10+10) + (11+11+11+11) |
Bellini | (9+10+10+10) + (11+11+11+11) |
Belwin | (8+9) + (11+11+11) |
Minnehaha (Mare) | 675 paths, 52 crosses (closest: 11) |
Red Wilkes | 1540 paths, 79 crosses (closest: 10) |
Kalmia | 9 + (10+10+10+10x) |
Guy Day | 7 + 10 |
Dakota | 8 + 9 |
Onward | 266 paths, 33 crosses (closest: 10) |
Verluisant | 9x + (9+10+11x) |
The Gaiety Girl (Mare) | 96 paths, 20 crosses (closest: 11) |
Elyria | (10+10+11+11x) + (10+11+11x) |
Harley | (11+12) + (8+9+11+12+12+12+14) |
The Harvester | (9+10) + (10+11) |
Maggie H. (Mare) | 170 paths, 27 crosses (closest: 11) |
Moko | (10+10+11+11+12) + (11+12+12+13+13) |
Notelet (Mare) | (10+10+11) + (11+11+12+12) |
Arion | 144 paths, 24 crosses (closest: 12) |
Wilton | 40 paths, 13 crosses (closest: 10) |
Wilkes Boy | (10+10+11+11) + (12+12+12) |
Adbell | (10+11+11+11) + (12+12+13+13+13) |
The Widow (Mare) | (10+11) + (11+12+12+12+13) |
Madam Thompson (Mare) | (9+10+10) + 11 |
Expectation (Mare) | (11+11+11) + (12+12+12+13+13) |
Mamie (Mare) | (10+11+14+14) + (11+14+15+15) |
Baronmore | (10+12) + (11+13+14+14) |
Eva (Mare) | (10+11+11+11) + (12+13) |
Harold | (11+12+13+13) + (12+14+14+14+16) |