# G_{11,t,v}^{(i)}: number of bond animals of size 11 # with perimeter t and v vertices that are proper in dimension i # i t v G_{11,t,v}^{(i)} 1 2 12 1 2 26 12 268350 2 25 12 662424 2 24 12 912378 2 23 12 755936 2 22 12 435330 2 22 11 42012 2 21 12 111112 2 21 11 98596 2 20 12 4830 2 20 11 102660 2 19 11 56496 2 18 11 6032 2 18 10 3008 2 17 10 4920 2 16 10 2000 2 14 9 72 2 13 9 12 3 50 12 257091447 3 49 12 568629480 3 48 12 624866154 3 47 12 467409000 3 46 12 238715907 3 45 12 80060424 3 44 12 19650432 3 44 11 17740860 3 43 12 4958880 3 43 11 32773380 3 42 11 30367248 3 41 12 94500 3 41 11 15154164 3 40 11 4208376 3 39 11 1151064 3 38 11 148008 3 38 10 479952 3 37 10 698808 3 36 10 315738 3 35 10 90744 3 34 10 25608 3 32 9 5328 3 31 9 1872 3 30 9 1584 3 25 8 12 4 74 12 22494953744 4 73 12 39420410688 4 72 12 33669058848 4 71 12 19535663616 4 70 12 7457884848 4 69 12 1932787968 4 68 12 394406080 4 67 12 71993664 4 66 12 3443136 4 66 11 755437872 4 65 12 756000 4 65 11 1060971144 4 64 11 735484416 4 63 11 261507552 4 62 11 57870624 4 61 11 11783232 4 60 11 1184064 4 58 10 9062784 4 57 10 9351648 4 56 10 2819616 4 55 10 678464 4 54 10 102432 4 50 9 35968 4 49 9 7488 4 48 9 4224 5 98 12 507201540240 5 97 12 691805061120 5 96 12 452798848800 5 95 12 195805808000 5 94 12 52407897360 5 93 12 9325311360 5 92 12 1352772160 5 91 12 135333120 5 88 11 8844012400 5 87 11 9187994080 5 86 11 4468344240 5 85 11 999695680 5 84 11 142520640 5 83 11 17157120 5 78 10 47677760 5 77 10 30820800 5 76 10 4505760 5 75 10 678400 5 68 9 48640 6 122 12 4548861718272 6 121 12 4758841658880 6 120 12 2326927299840 6 119 12 710854571520 6 118 12 119621445120 6 117 12 12373857792 6 116 12 1021870080 6 110 11 41293532640 6 109 11 30190824960 6 108 11 9246453120 6 107 11 981461760 6 106 11 63191040 6 98 10 89376000 6 97 10 27340800 7 146 12 19903875199488 7 145 12 15525985886208 7 144 12 5383330219008 7 143 12 1042574561280 7 142 12 83366115840 7 141 12 2972712960 7 132 11 88752861120 7 131 11 41074268928 7 130 11 5992694400 7 118 10 53760000 8 170 12 46672464052224 8 169 12 25712480747520 8 168 12 5672976777216 8 167 12 526170193920 8 154 11 88050271232 8 153 11 19520083968 9 194 12 59894730326016 9 193 12 20886790864896 9 192 12 2215265697792 9 176 11 32653412352 10 218 12 39627113103360 10 217 12 6604518850560 11 242 12 10567230160896