92400
domain: N
Appears in sequences
- Weight distribution of [100,22,22] code associated with Hoffman-Singleton and Higman-Sims graphs.at n=30A015068
- Weight distribution of [100,22,22] code associated with Hoffman-Singleton and Higman-Sims graphs.at n=20A015068
- Weight distribution of [100,22,32] code associated with Hoffman-Singleton and Higman-Sims graphs.at n=20A015070
- Weight distribution of [100,22,32] code associated with Hoffman-Singleton and Higman-Sims graphs.at n=30A015070
- Multinomial coefficient n!/ ([n/4]!, [(n+1)/4]!, [(n+2)/4]!, [(n+3)/4]!).at n=11A022917
- a(n) is least k such that k and 6k are anagrams in base n (written in base 10).at n=36A023098
- Triangle read by rows: T(n,k) = number of paths of n upsteps U and n downsteps D that contain k UUDs.at n=40A051288
- a(n) = binomial(n+3,3)*binomial(n+8,3).at n=8A104677
- a(n) = C(5+2*n,5+n)*C(10+2*n,0+n).at n=3A114253
- a(n) = denominator of Sum_{k=1..n} k^mu(n+1-k), where mu(m) = A008683(m).at n=25A130492
- Sums of the products of n consecutive triples of numbers.at n=10A135037
- Numbers n that raised to the powers from 1 to k (with k>=1) are multiples of the sum of their digits (and n raised to k+1 must not be such a multiple). Case k=14.at n=13A135199
- a(n) = smallest k such that A141501(k) = 2*n+1.at n=30A143474
- Numbers with exactly 5 distinct prime divisors {2,3,5,7,11}.at n=28A147572
- a(n) = 64*n^2 - 16.at n=37A157913
- a(n) = 256*n^2 - 16.at n=18A158562
- Triangle read by rows: T(n,m) = A094310(n,m)*A120070(n+1,m), 1 <= m <= n.at n=23A165969
- Numbers with prime factorization pqrs^2t^4.at n=3A190384
- a(n) = (4*n)! / (n!^4 * (n+1)).at n=3A207817
- Number of n X 4 0..1 arrays avoiding 0 0 0 and 1 1 1 horizontally and 0 0 1 and 0 1 1 vertically.at n=20A208065