6846840
domain: N
Appears in sequences
- Increasing values of A000793 (largest order of permutation of n elements).at n=41A002809
- Maximal order of element of alternating group A_{2n}.at n=37A057742
- Maximal order of element of alternating group A_{2n+1}.at n=37A057743
- One-sixth of the area of some primitive Heronian triangles with a distance of 2n+1 between the median and altitude points on the longest side.at n=18A074076
- Composite numbers requiring increasingly larger bases to become prime by base reversal.at n=30A075243
- a(n) = lcm(A000793(n),p1,p2,...,pk) for such a partition {p1+p2+...+pk} of n that maximizes this value among all partitions of n.at n=38A225627
- a(n) = lcm(A000793(n),p1,p2,...,pk) for such a partition {p1+p2+...+pk} of n that maximizes this value among all partitions of n.at n=39A225627
- a(n) = lcm(A225627(n),p1,p2,...,pk) for such a partition {p1+p2+...+pk} of n which maximizes this value among all partitions of n.at n=28A225628
- Noncubefree numbers k such that A073185(k) > 2*k.at n=23A357700
- Largest order of element in direct product S_n * S_n where S_n is the symmetric group.at n=36A358070
- Largest order of element in direct product S_n * S_n where S_n is the symmetric group.at n=37A358070
- For n > 1, if n appears in the sequence, a(n) = a(n-1) - n if nonnegative and not already in the sequence, otherwise a(n) = a(n-1) + n. Otherwise a(n+1) = a(n)/(n+1) if (n+1)|a(n), otherwise a(n)*(n+1), a(1) = 1 and a(2) = 1*2.at n=12A362698
- The smallest number k for which exactly n of its divisors are digitally balanced numbers in base 3 (A049354).at n=26A372146