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Buongiorno a tutti,
validati i seguenti sistemi ortogonali 49,13,3,3=87 ex 88 Jan de Heer and Steve Muir 51,13,3,3=97 ex 98 Jan de Heer and Steve Muir 54,13,3,3=122 ex 125 Jan de Heer and Steve Muir 55,13,3,3=131 ex 133 Jan de Heer and Steve Muir 49,14,3,3=76 ex 78 Jan de Heer and Steve Muir 50,14,3,3=77 ex 80 Jan de Heer and Steve Muir 59,14,3,3=128 ex 131 Alessandro Jurcovich 60,14,3,3=134 ex 139 Giovanni Acerbi Wheeling Systems Checker 4 39,15,3,3=33 ex 34 LJCR Multiple of (13,5,3) covering 41,15,3,3=36 ex 37 Jan de Heer and Steve Muir 48,15,3,3=54 ex 55 Jan de Heer and Steve Muir 50,15,3,3=66 ex 68 LJCR Simple construction from (51,15,3) 52,15,3,3=76 ex 77 Jan de Heer and Steve Muir 53,15,3,3=77 ex 79 Jan de Heer and Steve Muir 59,15,3,3=90 ex 93 Jan de Heer and Steve Muir 64,15,3,3=134 ex 137 Jan de Heer and Steve Muir 65,15,3,3=141 ex 144 Alessandro Jurcovich 50,16,3,3=53 ex 54 Flavio Perona 51,16,3,3=55 ex 57 Jan de Heer and Steve Muir 57,16,3,3=80 ex 81 Jan de Heer and Steve Muir 47,17,3,3=37 ex 38 LJCR Simple construction from (48,17,3) 54,17,3,3=57 ex 59 Jan de Heer and Steve Muir 55,17,3,3=59 ex 62 Jan de Heer and Steve Muir 67,17,3,3=89 ex 90 Jan de Heer and Steve Muir 40,18,3,3=20 ex 21 LJCR Multiple of (20,9,3) covering 49,18,3,3=36 ex 37 Jan de Heer and Steve Muir 50,18,3,3=37 ex 38 LJCR Multiple of (25,9,3) covering 61,19,3,3=57 ex 58 Jan de Heer and Steve Muir 64,20,3,3=57 ex 59 Jan de Heer and Steve Muir 65,20,3,3=61 ex 63 Jan de Heer and Steve Muir 59,21,3,3=38 ex 39 LJCR Simple construction from (60,21,3) alcuni purtroppo rimangono senza nome per errore mio, ho chiesto la correzione. Ho in lavorazione altri sistemi ortogonali anche se devo ammettere che i tempi di elaborazione per i sistemi con molti numeri sono scoraggianti ciao Franco |