Similarly to Joe Ross in the Galileo Thread. This is an iterative ranks result. The team list was cycled 256 times and then using the OPR the winners of each match were determined. Then using FIRST's ranking criteria the ranks were generated for each iteration. What you see here is the summary report for all 256 runs of this process.
the data is in this format
Team numbers (sorted by highest percent of being #1 seed)
Highest rank achieved throughout all the cycles
lowest rank achieved throughout all the cycles
Average rank
Median rank (the middle)
Mode (most common rank)
Times a team was the #1 seed (out of 256 cycles)
Times a team was in the top 8 (out of 256 cycles)
% a team was in the top 8 (out of 256 cycles)
Now I would like to note that this is based solely on the OPR which is past performance and while there are teams that don't show they can make the top 8 statistically in real life anything can happen. Basically don't think that I was attacking your team if you are lower than you think you should be as this doesn't take into account defense, robots breaking, penalties, etc. This all for fun anyway.
Thanks to Joe Ross for the code to do this, my way was not nearly as elegant as his.
Code:
Teams Min Max average median mode #1 seed top 8 %top 8
67 1 47 10 6 1 40 155 60.5%
1126 1 47 9 7 1 28 148 57.8%
368 1 61 13 9 6 19 124 48.4%
2171 1 48 9 8 2 18 134 52.3%
16 1 63 16 12 6 18 95 37.1%
33 1 56 14 11 5 16 113 44.1%
191 1 65 15 12 4 15 97 37.9%
100 1 64 16 13 5 13 88 34.4%
395 1 63 14 11 3 12 107 41.8%
326 1 76 21 18 8 9 58 22.7%
126 1 67 17 14 5 8 92 35.9%
2337 1 67 14 11 5 7 96 37.5%
501 1 74 22 20 12 7 47 18.4%
1511 1 65 19 16 9 6 64 25.0%
237 1 76 21 17 14 6 60 23.4%
118 1 65 23 22 18 6 40 15.6%
358 1 78 21 17 17 5 56 21.9%
1477 1 61 19 17 9 4 57 22.3%
768 1 77 21 17 8 4 58 22.7%
2590 1 83 28 27 21 3 27 10.5%
703 1 79 19 17 8 2 62 24.2%
1592 1 77 22 20 19 2 51 19.9%
45 1 81 28 28 29 2 25 9.8%
1649 1 75 32 29 21 1 16 6.3%
2344 1 85 36 36 36 1 11 4.3%
231 1 83 43 45 64 1 4 1.6%
173 1 85 46 46 44 1 3 1.2%
1939 1 85 54 56 55 1 1 0.4%
1418 2 83 31 28 21 0 20 7.8%
435 2 81 33 31 31 0 16 6.3%
1350 2 82 35 33 28 0 10 3.9%
294 3 85 40 40 46 0 8 3.1%
57 2 80 38 39 45 0 9 3.5%
573 3 78 37 34 34 0 6 2.3%
223 5 84 44 44 48 0 1 0.4%
108 5 84 42 43 19 0 7 2.7%
2609 2 83 40 37 24 0 4 1.6%
903 3 84 43 42 63 0 6 2.3%
1732 4 85 42 41 23 0 4 1.6%
1747 2 84 43 44 65 0 3 1.2%
155 6 84 45 46 43 0 4 1.6%
486 2 83 46 47 46 0 5 2.0%
1386 2 84 46 44 52 0 3 1.2%
2520 4 85 51 53 66 0 3 1.2%
138 5 85 49 50 64 0 3 1.2%
1989 4 85 47 46 38 0 3 1.2%
75 4 85 49 50 63 0 2 0.8%
178 2 82 49 50 50 0 5 2.0%
1802 7 85 52 53 75 0 1 0.4%
418 8 84 50 50 63 0 1 0.4%
1025 6 85 50 51 78 0 2 0.8%
271 4 85 52 54 51 0 2 0.8%
2474 3 85 51 54 37 0 3 1.2%
1013 8 84 52 52 35 0 1 0.4%
1699 11 84 53 54 68 0 0 0.0%
2053 5 84 52 53 51 0 2 0.8%
1860 2 84 54 56 71 0 1 0.4%
340 12 85 55 55 76 0 0 0.0%
1566 10 85 52 53 66 0 0 0.0%
967 6 85 54 57 69 0 2 0.8%
1245 12 85 56 57 54 0 0 0.0%
527 5 85 56 58 38 0 1 0.4%
2410 2 84 53 56 38 0 2 0.8%
2556 9 85 56 58 38 0 0 0.0%
462 3 85 57 59 59 0 3 1.2%
304 5 85 58 60 80 0 1 0.4%
1311 9 85 58 61 54 0 0 0.0%
1533 10 85 57 59 57 0 0 0.0%
2038 11 85 59 64 71 0 0 0.0%
86 10 85 59 62 47 0 0 0.0%
1102 10 85 62 65 72 0 0 0.0%
830 7 85 50 50 39 0 3 1.2%
2115 10 85 62 66 85 0 0 0.0%
1156 7 85 62 67 80 0 1 0.4%
858 2 85 63 67 79 0 1 0.4%
1071 12 85 63 69 72 0 0 0.0%
1266 9 85 64 67 80 0 0 0.0%
2629 4 85 63 66 57 0 2 0.8%
1599 16 85 69 73 81 0 0 0.0%
2454 14 85 68 73 83 0 0 0.0%
4 13 85 67 71 80 0 0 0.0%
604 22 85 71 74 83 0 0 0.0%
2429 29 85 73 77 85 0 0 0.0%
203 24 85 73 78 84 0 0 0.0%
677 35 85 78 81 85 0 0 0.0%