16868 3-Spliced Bob Major
| 2345678 |
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Methods |
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| 45236 |
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a |
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P.P.PPPPPPP.LPP.GP.PPPGP.LPP.P. |
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| 64352 |
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b |
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P.P.LPP.PPPPPPP.PPPP.LPP.P |
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| 56342 |
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3 |
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P.P.PPPPPPP.LPP.PPPPP |
(7,3,7) |
| 45362 |
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3 |
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P.P.PPPPPPP.PPPPPPP.L |
(7,7,3) |
| 34256 |
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P.PPPPP.P |
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| 2763548 |
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c |
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P.P.PPPPPPP.LPP.GP.G.L |
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| 6354278 |
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– |
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– |
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– |
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PP.PPL.GP.P |
(8) |
| 34562 |
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3 |
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P.LPP.P.PPPPPPP.LPP.PPPPP |
(3,7,3,7) |
| 53246 |
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– |
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P.L.P |
(3) |
| 25634 |
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3 |
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P.P.PPPPPPP.LPP.PPPP.P |
(7,3,7) |
| 65432 |
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3 |
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– |
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PP.PPPPPPP.PPPPPPP.PPPP.P |
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| 36452 |
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3 |
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P.P.LPP.LPP.L |
(3,3,3) |
| 53462 |
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d |
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P.P.PLP.PPL.PPPPP |
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| 24536 |
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e |
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P.P.PPPPPPP.PPPPPPP.PPPP.P. |
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| 5467328 |
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f |
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P.P.PPPPPPP.LPP.PPPP.G.GPG.L |
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| 6234578 |
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PP.GP.P |
(5) |
| 46325 |
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2 |
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– |
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P.P.LPP.GPG.PPPPP |
(3,10) |
| 24365 |
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3 |
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P.P.PPPPPPP.LPP.PPPPP |
(7,3,7) |
| 32546 |
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3 |
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– |
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P.P.PPPPPPP.LPP.PPPP.P |
(7,3,7) |
| 53624 |
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g |
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P.P.LPP.PLP.GP.P |
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| 63425 |
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– |
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PPPPPP.P |
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| 2347568 |
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– |
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– |
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P.P.PLP.L |
(6) |
| 2643578 |
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PP.L |
(3) |
| 43526 |
2 |
– |
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P.LPP.L.P |
(3,3) |
| 64235 |
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– |
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P.PPG.LPP.P |
(8) |
| 43265 |
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h |
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P.LPP.P.PLP.PPL.L |
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| 52436 |
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P.L.P. |
(3) |
| 4765328 |
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P.PPPPP.G.L |
(8) |
| 3542678 |
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i |
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PP.PPPGP.GP.LPP.P |
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| 43652 |
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3 |
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– |
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P.P.PPPPPPP.PPPPPPP.PPPP.P |
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| 63254 |
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3 |
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– |
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PP.PPPPPPP.PPPPPPP.PPPP.P |
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| 5327468 |
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– |
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– |
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P.P.PLP.L |
(6) |
| 5623478 |
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PP.L |
(3) |
| 35264 |
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3 |
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P.P.PPPPPPP.GPPPP.PPPPP |
(7,5,7) |
| 42356 |
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j |
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P.P.PPPPPPP.PLP.PPPP.P. |
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| 34625 |
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3 |
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– |
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P.P.PPPPPPP.LPP.PPPP.P |
(7,3,7) |
| 64523 |
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3 |
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– |
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PP.GPPPP.LPP.GP.P |
(5,3,5) |
| 26543 |
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2 |
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– |
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P.P.PPPPPPP.GPG.PPPPP |
(7,10) |
| 54326 |
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3 |
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P.PPPPPPP.P.PPPPPPP.LPP.PPPP.P |
(7,7,3,7) |
| 65243 |
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k |
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P.P.LPP.GPPPP.GP.LPP.P |
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| 46253 |
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l |
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P.P.GPG.GPG.GPP |
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| 25346 |
2 |
– |
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P.LPP.L.P |
(3,3) |
| 62453 |
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b |
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P.P.LPP.PPPPPPP.PPPP.LPP.P |
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| 43256 |
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m |
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P.LPP.P.PPPPPPP.PPPGP.PPPG.L.P. |
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| 25436 |
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n |
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P.P.PPPPPPP.LPP.GP.GPG.LPP.P. |
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| 42653 |
– |
3 |
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– |
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P.P.LPP.PPPPPPP.PPPP.P |
(3,7,7) |
| 62354 |
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3 |
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– |
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PP.LPP.PPPPPPP.PPPP.P |
(3,7,7) |
| 25364 |
2 |
3 |
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P.LPP.P.PPPPPPP.LPP.L |
(3,7,3,3) |
| 32456 |
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– |
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P.L.P |
(3) |
| 4763528 |
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c |
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P.P.PPPPPPP.LPP.GP.G.L |
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| 5342678 |
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o |
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PP.PLP.GP.LPP.P |
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| 2347658 |
– |
– |
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– |
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P.P.PLP.L |
(6) |
| 6523478 |
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– |
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– |
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– |
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PP.GP.LPP.P |
(8) |
| 36254 |
– |
3 |
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P.P.GPPPP.PPPPPPP.GPP |
(5,7,5) |
| 53264 |
– |
2 |
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– |
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P.P.LPP.PLP.L |
(3,6) |
| 6327458 |
– |
– |
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– |
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P.P.PLP.L |
(6) |
| 4253678 |
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– |
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– |
– |
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PP.GP.P. |
(5) |
| 5267348 |
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p |
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P.P.GPPPP.LPP.GP.G.PPPGP.L |
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| 6432578 |
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– |
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– |
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PP.PPPP.P |
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| 26345 |
– |
3 |
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P.P.LPP.PPPPPPP.L |
(3,7,3) |
| 42365 |
– |
3 |
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P.P.LPP.PPPPPPP.GPP |
(3,7,5) |
| 6237548 |
– |
– |
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– |
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P.P.GPG.L |
(6) |
| 3452678 |
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– |
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– |
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PP.GP.P |
(5) |
| 63245 |
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q |
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P.P.LPP.PPL.GP.LPP.P |
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| 4327568 |
– |
– |
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– |
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P.P.PPL.L |
(6) |
| 3426578 |
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– |
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– |
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PP.PL.LP |
(6) |
| 23546 |
– |
– |
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P.L.P |
(3) |
| 5762438 |
– |
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– |
– |
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P.PGP.G.L |
(6) |
| 6243578 |
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2 |
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– |
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PP.PPPPPPP.GP.P |
(7,5) |
| 23465 |
2 |
2 |
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– |
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P.LPP.P.LPP.PLP.L |
(3,3,6) |
| 54236 |
– |
– |
– |
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P.L.P. |
(3) |
| 2765348 |
– |
– |
– |
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P.L.G.L |
(4) |
| 3524678 |
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o |
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PP.GPG.GP.LPP.P |
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| 4527638 |
– |
– |
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– |
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P.P.PLP.PPPPP |
(10) |
| 6345278 |
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– |
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– |
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– |
PP.PPPP.LPP.P |
(10) |
| 5347268 |
– |
– |
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– |
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P.P.PPL.PPPPP |
(10) |
| 37452 |
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– |
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– |
– |
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PP.PL.P.PPPPP |
(10) |
| 3546278 |
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2 |
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PP.LPP.L |
(3,3) |
| 24356 |
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r |
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P.P.PLP.PPL.GP.P. |
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| 32645 |
– |
3 |
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– |
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P.P.PPPPPPP.LPP.GP.P |
(7,3,5) |
| 62543 |
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3 |
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– |
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PP.LPP.LPP.GP.P |
(3,3,5) |
| 46523 |
– |
3 |
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P.P.LPP.PPPPPPP.L |
(3,7,3) |
| 6457328 |
2 |
– |
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– |
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P.GPPPP.P.GPG.PPPPP |
(5,10) |
| 5234678 |
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– |
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– |
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PP.GP.P |
(5) |
| 3765428 |
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t |
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P.P.LPP.GPG.GP.G.PPPPP |
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| 6542378 |
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2 |
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– |
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PP.PPPPPPP.GP.P |
(7,5) |
| 52463 |
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u |
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P.P.PPPGP.PPPGP.PPPG.LP |
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| 45326 |
– |
3 |
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– |
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P.P.PPPPPPP.PPPPPPP.GP.P |
(7,7,5) |
| 64253 |
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b |
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P.P.LPP.PPPPPPP.PPPP.LPP.P |
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| 56243 |
– |
3 |
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P.P.PPPPPPP.LPP.L |
(7,3,3) |
| 45263 |
– |
3 |
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P.P.PPPPPPP.PPPPPPP.GPP |
(7,7,5) |
| 2345678 |
– |
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– |
s |
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P.PPPPP.P. |
|
a = 1.2.2.2.4.4.7.8 (7,3,5,8)
b = 1.2.2.2.6.9 (3,7,10)
c = 1.2.2.2.4.5 (7,3,6)
d = 1.2.5.8 (13)
e = 1.2.2.2.6.7
f = 1.2.2.2.6.7.10 (7,3,11)
g = 1.2.2.5.7 (3,8)
h = 1.1.2.5.8 (3,9)
i = 2.7.9.12 (13)
j = 1.2.2.5.9.10 (7,10)
k = 1.2.2.2.4.7 (3,5,8)
l = 1.2.5.8 (11)
m = 1.1.2.2.7.11.12.s13 (3,7,13)
n = 1.2.2.2.4.7.10.11 (7,3,11)
o = 2.5.7.10 (11)
p = 1.2.2.2.4.5.10 (5,3,11)
q = 1.2.2.5.7.10 (3,11)
r = 1.2.5.8.10.11 (11)
t = 1.2.2.5.7.8 (3,13)
u = 1.2.7.12.16 (18)
170 crus (56f,114b), 48 5678s (24f,24b), 29 6578s (7f,22b), 480 4-bell runs (240f,240b), 708 5678 combinations (336f,372b), 48 8765s (24f,24b), Queens, Tittums, Reverse Waterfall, Waterfall, Backrounds.