1153152
domain: N
Appears in sequences
- Highest degree of an irreducible representation of symmetric group S_n of degree n.at n=15A003040
- a(n) = 2*(n^2)!* Product_{k = 1..n-1} k!/(n+k)!.at n=4A033542
- Highest degree of an irreducible representation of the alternating group A_n of degree n.at n=15A060955
- a(n) = sigma(A067651(n)).at n=25A107816
- a(n) = n*(n+1)*(n+2)*(n+3)*(n+4)*(n+5)/5.at n=11A162669
- 4-quantum transitions in systems of N>=4 spin 1/2 particles, in columns by combination indices.at n=27A213346
- Number of standard Young tableaux for partitions of n into exactly 5 distinct parts.at n=1A219318
- a(n) = 8^n * binomial(n * 3/2, n).at n=5A358367
- a(n) is the smallest number with exactly n divisors that are n-gonal numbers.at n=9A358539