992436543
domain: N
Appears in sequences
- a(n) = (3*n)^5.at n=21A016769
- a(n) = (4n+3)^5.at n=15A016841
- a(n) = (5n+3)^5.at n=12A016889
- a(n) = (6*n + 3)^5.at n=10A016949
- a(n) = (7n)^5.at n=9A016985
- a(n) = (8*n + 7)^5.at n=7A017153
- a(n) = (9*n)^5.at n=7A017165
- a(n) = (10*n + 3)^5.at n=6A017309
- a(n) = (11*n + 8)^5.at n=5A017489
- a(n) = (12*n + 3)^5.at n=5A017561
- Let H_n = n-th Hilbert matrix; sequence gives 1 / ( det(H_n) * denominator(permanent(H_n)) ).at n=12A061914
- Number of n-tuples where each entry is chosen from the subsets of {1,2,3,4,5} such that the intersection of all n entries is empty.at n=5A128833
- a(n) = (2^(n+1) - 1)^n.at n=5A180602
- Numbers k = p_i^e_i *...* p_r^e_r such that i/e_i +...+ r/e_r = 1 for e_i,..., e_r >= 1; p_i,..., p_r distinct prime numbers (A000040).at n=22A388006