| Z(n) Rep Sequence no. 1 | ||||||||||||||
| Casey Mongoven | ||||||||||||||
| October 12, 2005 | ||||||||||||||
| PARAMETERS | GRAPH | SEQUENCE VALUES | ||||||||||||
| description of sequence: number of unique representations of n | ||||||||||||||
| possible using sums of distinct elements of the Fibonacci | ||||||||||||||
| sequence beginning 4, 1, 5, 6, 11, … | ||||||||||||||
| number of members in sequence used: 1309 | ||||||||||||||
| 1 0 0 1 2 2 1 0 1 2 3 2 0 0 2 3 3 2 0 1 3 4 3 1 0 2 3 4 3 0 0 3 5 4 2 0 2 4 5 3 0 0 3 4 4 3 0 1 4 6 5 2 0 3 5 6 4 0 0 4 6 5 3 0 2 5 6 4 1 0 3 4 5 4 0 0 4 7 6 3 0 3 6 8 5 0 0 5 7 6 4 0 2 6 8 6 2 0 4 6 7 5 0 0 5 8 6 3 0 3 6 7 4 0 0 4 5 5 4 0 1 5 8 7 3 0 4 7 9 6 0 0 6 9 8 5 0 3 8 10 7 2 0 5 7 8 6 0 0 6 10 8 4 0 4 8 10 6 0 0 6 8 7 5 0 2 7 10 8 3 0 5 8 9 6 0 0 6 9 7 4 0 3 7 8 5 1 0 4 5 6 5 0 0 5 9 8 4 0 4 8 11 7 0 0 7 10 9 6 0 3 9 12 9 3 0 6 9 11 8 0 0 8 13 10 5 0 5 10 12 7 0 0 7 9 8 6 0 2 8 12 10 4 0 6 10 12 8 0 0 8 12 10 6 0 4 10 12 8 2 0 6 8 9 7 0 0 7 12 10 5 0 5 10 13 8 0 0 8 11 9 6 0 3 9 12 9 3 0 6 9 10 7 0 0 7 11 8 4 0 4 8 9 5 0 0 5 6 6 5 0 1 6 10 9 4 0 5 9 12 8 0 0 8 12 11 7 0 4 11 14 10 3 0 7 10 12 9 0 0 9 15 12 6 0 6 12 15 9 0 0 9 12 11 8 0 3 11 16 13 5 0 8 13 15 10 0 0 10 15 12 7 0 5 12 14 9 2 0 7 9 10 8 0 0 8 14 12 6 0 6 12 16 10 0 0 10 14 12 8 0 4 12 16 12 4 0 8 12 14 10 0 0 10 16 12 6 0 6 12 14 8 0 0 8 10 9 7 0 2 9 14 12 5 0 7 12 15 10 0 0 10 15 13 8 0 5 13 16 11 3 0 8 11 12 9 0 0 9 15 12 6 0 6 12 15 9 0 0 9 12 10 7 0 3 10 14 11 4 0 7 11 12 8 0 0 8 12 9 5 0 4 9 10 6 1 0 5 6 7 6 0 0 6 11 10 5 0 5 10 14 9 0 0 9 13 12 8 0 4 12 16 12 4 0 8 12 15 11 0 0 11 18 14 7 0 7 14 17 10 0 0 10 13 12 9 0 3 12 18 15 6 0 9 15 18 12 0 0 12 18 15 9 0 6 15 18 12 3 0 9 12 14 11 0 0 11 19 16 8 0 8 16 21 13 0 0 13 18 15 10 0 5 15 20 15 5 0 10 15 17 12 0 0 12 19 14 7 0 7 14 16 9 0 0 9 11 10 8 0 2 10 16 14 6 0 8 14 18 12 0 0 12 18 16 10 0 6 16 20 14 4 0 10 14 16 12 0 0 12 20 16 8 0 8 16 20 12 0 0 12 16 14 10 0 4 14 20 16 6 0 10 16 18 12 0 0 12 18 14 8 0 6 14 16 10 2 0 8 10 11 9 0 0 9 16 14 7 0 7 14 19 12 0 0 12 17 15 10 0 5 15 20 15 5 0 10 15 18 13 0 0 13 21 16 8 0 8 16 19 11 0 0 11 14 12 9 0 3 12 18 15 6 0 9 15 18 12 0 0 12 18 15 9 0 6 15 18 12 3 0 9 12 13 10 0 0 10 17 14 7 0 7 14 18 11 0 0 11 15 12 8 0 4 12 16 12 4 0 8 12 13 9 0 0 9 14 10 5 0 5 10 11 6 0 0 6 7 7 6 0 1 7 12 11 5 0 6 11 15 10 0 0 10 15 14 9 0 5 14 18 13 4 0 9 13 16 12 0 0 12 20 16 8 0 8 16 20 12 0 0 12 16 15 11 0 4 15 22 18 7 0 11 18 21 14 0 0 14 21 17 10 0 7 17 20 13 3 0 10 13 15 12 0 0 12 21 18 9 0 9 18 24 15 0 0 15 21 18 12 0 6 18 24 18 6 0 12 18 21 15 0 0 15 24 18 9 0 9 18 21 12 0 0 12 15 14 11 0 3 14 22 19 8 0 11 19 24 16 0 0 16 24 21 13 0 8 21 26 18 5 0 13 18 20 15 0 0 15 25 20 10 0 10 20 25 15 0 0 15 20 17 12 0 5 17 24 19 7 0 12 19 21 14 0 0 14 21 16 9 0 7 16 18 11 2 0 9 11 12 10 0 0 10 18 16 8 0 8 16 22 14 0 0 14 20 18 12 0 6 18 24 18 6 0 12 18 22 16 0 0 16 26 20 10 0 10 20 24 14 0 0 14 18 16 12 0 4 16 24 20 8 0 12 20 24 16 0 0 16 24 20 12 0 8 20 24 16 4 0 12 16 18 14 0 0 14 24 20 10 0 10 20 26 16 0 0 16 22 18 12 0 6 18 24 18 6 0 12 18 20 14 0 0 14 22 16 8 0 8 16 18 10 0 0 10 12 11 9 0 2 11 18 16 7 0 9 16 21 14 0 0 14 21 19 12 0 7 19 24 17 5 0 12 17 20 15 0 0 15 25 20 10 0 10 20 25 15 0 0 15 20 18 13 0 5 18 26 21 8 0 13 21 24 16 0 0 16 24 19 11 0 8 19 22 14 3 0 11 14 15 12 0 0 12 21 18 9 0 9 18 24 15 0 0 15 21 18 12 0 6 18 24 18 6 0 12 18 21 15 0 0 15 24 18 9 0 9 18 21 12 0 0 12 15 13 10 0 3 13 20 17 7 0 10 17 21 14 0 0 14 21 18 11 0 7 18 22 15 4 0 11 15 16 12 0 0 12 20 16 8 0 8 16 20 12 0 0 12 16 13 9 0 4 13 18 14 5 0 9 14 15 10 0 0 10 15 11 6 0 5 11 12 7 1 0 6 7 8 |
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