2764800
domain: N
Appears in sequences
- Maximal number of divisors of any n-digit number.at n=25A066150
- Sorted number of vertices of distinct solutions in the mix of 2 or 3 regular convex 4-polytopes.at n=31A199807
- Sorted number of edges of distinct solutions in the mix of 2 or 3 regular convex 4-polytopes.at n=21A199808
- Duplicate of A199807.at n=32A199810
- Sorted orders of automorphism groups of distinct solutions in the mix of 2 or 3 regular convex 4-polytopes.at n=8A199811
- Sorted orders of automorphism groups of distinct solutions in the mix of 2 or 3 regular convex 4-polytopes.at n=9A199811
- Sorted orders of automorphism groups of distinct solutions in the mix of 2 or 3 regular convex 4-polytopes.at n=10A199811
- Sorted orders of automorphism groups of distinct solutions in the mix of 2 or 3 regular convex 4-polytopes.at n=11A199811
- (n-1)-st elementary symmetric function of the first n terms of (1,2,3,4,1,2,3,4,1,2,3,4,...) = A010883.at n=15A203163
- (n-1)-st elementary symmetric function of the first n terms of the periodic sequence (4,1,2,3,4,1,2,3,...).at n=15A203164
- (n-1)-st elementary symmetric function of the first n terms of the periodic sequence (3,4,1,2,3,4,1,2,...).at n=15A203165
- Number of elements of order n in the Tits group TF4(2)'.at n=12A284952
- Triangle of numbers of squares {i^2}, i = 0,1..ceiling(n/2), in permutations of {1..n} in A293857.at n=42A293783
- a(n) = 3*(n - 1)^2*n^3.at n=16A300846
- a(n) is the lowest nonnegative exponent k such that n!^k is the product of the divisors of n!.at n=31A344687
- a(n) = [x^(3*n)] Product_{k=0..n-1} (1 + k*x)^4.at n=5A384027