32808
domain: N
Appears in sequences
- Numbers that are the sum of 8 nonzero 8th powers.at n=35A003386
- Numbers having four 0's in base 8.at n=18A043424
- a(n) = Sum_{i=0..floor(n/2)} T(2i,n-2i), array T as in A049735.at n=31A049738
- Number of positive integers <= 2^n of form x^2 + 19 y^2.at n=18A054232
- a(n) = 1728*n - 24.at n=18A157287
- a(n) = n^5 + 5n.at n=8A180355
- a(n) = 8^n + 8*n.at n=5A221910
- Number of integers in n-th generation of tree T(2/3) defined in Comments.at n=40A274145
- Number of partitions of n with even minimal part and odd maximal part.at n=43A325344
- Table T(n,k) read by upward antidiagonals. T(n,k) is the minimum value of Sum_{i=1..n} Product_{j=1..k} r[(i-1)*k+j] among all permutations r of {1..kn}.at n=25A331889
- a(n) = Sum_{d|n, d odd} (n/d)^d.at n=39A333823
- Position of first appearance of 2n in the run-compression (A037201) of the first differences (A001223) of the prime numbers (A000040).at n=36A376520
- Sorted positions of first appearances in the run-compression (A037201) of the first differences (A001223) of the prime numbers (A000040).at n=44A376521
- Numbers k such that the cumulative sums of the k-th composition in graded reverse lexicographic order ("standard order", see A066099) do not cover all residue classes modulo p for any prime p; i.e., such that (0, x_1, ..., x_1+...+x_j) is an admissible prime tuple pattern, where (x_1, ..., x_j) is the k-th composition.at n=44A387383