40832
domain: N
Appears in sequences
- Coordination sequence for root lattice B_4.at n=11A022146
- Numbers that are the sum of 3 positive cubes in exactly 3 ways.at n=26A025397
- Numbers that are the sum of 3 positive cubes in 3 or more ways.at n=28A025398
- Numbers that are the sum of 3 distinct positive cubes in exactly 3 ways.at n=23A025401
- Numbers that are the sum of 3 distinct positive cubes in 3 or more ways.at n=25A025402
- Numbers n such that n divides the (right) concatenation of all numbers <= n written in base 15 (most significant digit on right).at n=18A029508
- Numbers of the form n!+n^3.at n=7A080668
- Number of nX3 binary arrays with each sum of a(1..i,1..j) no greater than i*j/2.at n=5A183404
- T(n,k)=Number of nXk binary arrays with each sum of a(1..i,1..j) no greater than i*j/2.at n=30A183407
- T(n,k)=Number of nXk binary arrays with each sum of a(1..i,1..j) no greater than i*j/2.at n=33A183407
- Number of (w,x,y,z) with all terms in {1,...,n} and w<=|x-y|+|y-z|.at n=16A212673
- Numbers that can be expressed as the sum of three nonnegative cubes in three ways.at n=32A219329
- Number of (n+4) X 9 0..1 matrices with each 5 X 5 subblock idempotent.at n=16A224687
- a(n) = n*(7*n^2 + 15*n + 8)/6.at n=32A245301
- a(n) is the smallest number m such that binomial(m,n) is nonzero and is divisible by n!.at n=8A320920
- a(n) = 4^n * n! * binomial(7*n/4,n) * Sum_{k=1..n} 1/(3*n+4*k).at n=3A384172