24768
domain: N
Appears in sequences
- a(n) = (2*n - 5)n^2.at n=24A015240
- Number of partitions of n into prime power parts (1 included); number of nonisomorphic Abelian subgroups of symmetric group S_n.at n=44A023893
- A convolution triangle of numbers obtained from A036070.at n=16A030526
- "BIK" (reversible, indistinct, unlabeled) transform of 3,3,3,3...at n=7A032125
- Base 7 digits are, in order, the first n terms of the periodic sequence with initial period 1,3,2.at n=5A037614
- Number of partitions satisfying cn(0,5) + cn(1,5) + cn(4,5) < cn(2,5) + cn(3,5).at n=44A039880
- Numerators of continued fraction convergents to sqrt(201).at n=9A041372
- Numbers with multiplicative persistence value 6.at n=29A046515
- a(n) = n^3*Product_{distinct primes p dividing n} (1+1/p^3).at n=27A065959
- Number of configurations that require a minimum of n moves to be reached, starting with the empty square in one of the corners of an infinitely large extension of Sam Loyd's sliding block 15-puzzle.at n=11A090377
- Numbers k such that 13*k = A048720(29,k), where A048720 is carryless base-2 multiplication.at n=50A115805
- a(n) = number of solutions to the Diophantine equation x+y^2+z^3=n^4 with positive x,y,z all distinct.at n=21A121984
- a(n) = 1458*n - 18.at n=16A157508
- Numbers with 42 divisors.at n=22A175750
- Numbers of the form p^6*q^2*r where p, q, and r are distinct primes.at n=20A179703
- Composite numbers whose multiplicative persistence is 6.at n=27A199996
- Number of involutions (plus identity) in a fixed Sylow 2-subgroup of the symmetric group of degree n.at n=22A332759
- Number of involutions (plus identity) in a fixed Sylow 2-subgroup of the symmetric group of degree n.at n=23A332759
- Number of involutions (plus identity) in a fixed Sylow 2-subgroup of the symmetric group of degree 2n.at n=11A332868
- Number of compositions of n such that the set of parts and the set of multiplicities of parts are disjoint.at n=21A336032