96000
domain: N
Appears in sequences
- Triangle of coefficients in expansion of (4 + 5*x)^n.at n=23A013628
- Number of divisors of n!.at n=22A027423
- Number of k's such that A002034(k) = n.at n=22A038024
- Triangle whose (i,j)-th entry is binomial(i,j)*5^(i-j)*4^j.at n=25A038246
- Numbers that can be written as k/d(k) in four or more ways, where d(k) = number of divisors of k.at n=9A051346
- Duplicate of A051346.at n=9A051520
- Triangle of coefficients of polynomials (rising powers) useful for convolutions of A000204(n+1), n >= 0 (Lucas numbers).at n=15A061189
- a(n) is the largest number such that all of a(n)'s length-n substrings are distinct and divisible by 40.at n=2A093240
- a(n) is the largest number such that all of a(n)'s length-n substrings are distinct and divisible by 60.at n=2A093260
- Number of divisors of n! that are coprime to n.at n=22A095997
- Numbers k such that k and k^2 use only the digits 0, 1, 2, 6 and 9.at n=34A136830
- Terminal point of a repeated reduction of usigma starting at 2^n.at n=18A146891
- a(n) = 2^(n-1)*(n-1)!*(4*n+1).at n=5A158455
- A triangular array distributing the values of sequence A120380.at n=25A160645
- Alternately sum and multiply with a(1) = 2 and a(2) = 3.at n=7A174418
- Fast "exotic addition" a o b = [ a[1]+b[1], a[1]*b[2]+a[2]*b[1] ].at n=39A175841
- Floor(1/{(9+n^4)^(1/4)}), where {} = fractional part.at n=59A184633
- a(0) = 1 and a(n) = A180000(n)*a(floor(n/2))^2 for n > 0.at n=21A205958
- Numbers n such that n = k/d(k) has exactly 4 solutions, where d(k) = number of divisors of k.at n=7A217125
- Number of distinct values of the sum of 4 products of three 0..n integers.at n=29A225261