62244
domain: N
Appears in sequences
- a(n) = (6^n/n!) * Product_{k=0..n-1} (6*k + 7).at n=3A004997
- Theta series of A_13 lattice.at n=3A023904
- Least sum of 4 positive cubes in exactly n ways.at n=11A025420
- Theta series of 14-dimensional lattice M14,3 with minimal norm 6.at n=8A047636
- Numbers k such that k^6 + 1091 is prime.at n=31A066386
- a(n) = (2n+1)*(2n+2)*(2n+6)*(2n+7).at n=6A069080
- Least common multiple of {d-1: d > 1 and d divides n}.at n=39A084190
- Numbers n such that n^3 is the sum of three or more consecutive positive cubes.at n=16A097811
- Define an array by d(m, 0) = 1, d(m, 1) = m; d(m, k) = (m - k + 1) d(m+1, k-1) - (k-1) (m+1) d(m+2, k-2). Sequence gives d(n,4).at n=18A126958
- "Stapled" intervals are defined in A090318. Call a stapled interval "maximal" if it is not a proper subinterval of any other stapled interval. Sequence gives starting points of maximal stapled intervals.at n=4A130170
- "Stapled" intervals are defined in A090318. Call a stapled interval "minimal" if it does not contain any proper stapled subinterval. Sequence gives starting points of minimal stapled intervals.at n=4A130171
- Starting points of stapled intervals.at n=6A130173
- Multiples of 1729, the Hardy-Ramanujan number.at n=36A138129
- Numbers n > 0 such that n^6 + 1091 and n^6 + 1093 are both prime.at n=0A181114
- Starting points of stapled intervals of length 17.at n=4A194585
- For n>=0, let n!^(3) = A202368(n+1) and, for 0<=m<=n, C^(3)(n,m) = n!^(3)/(m!^(3)*(n-m)!^(3)). The sequence gives triangle of numbers C^(3)(n,m) with rows of length n+1.at n=24A203484
- Sigma(n) values in A115920.at n=23A216372
- Sigma(n) values in A115920.at n=27A216372
- Numbers c whose cubes are equal to the sum of m^3 consecutive cubes for m^3 not divisible by 3 (A118719).at n=8A253779
- Expansion of Hypergeometric function F(1/12, 7/12; 1; 1728*x) in powers of x.at n=2A289557