94932
domain: N
Appears in sequences
- a(n) = 5^n + n^5.at n=7A001593
- a(n) = 7^n + n^7.at n=5A001596
- Multiplicity of highest weight (or singular) vectors associated with character chi_140 of Monster module.at n=41A034528
- a(n) = n^(n+2) + (n+2)^n.at n=5A051489
- Leyland numbers: 3, together with numbers expressible as n^k + k^n nontrivially, i.e., n,k > 1 (to avoid n = (n-1)^1 + 1^(n-1)).at n=32A076980
- Triangle read by rows: T(n,r) = n^r + r^n (1 <= r <= n).at n=25A093898
- Numbers of the form p^5 + 5^p for p prime.at n=3A097200
- Numbers of the form 7^p + p^7 for p prime.at n=2A097317
- Numbers of the form p^q + q^p where p and q are consecutive primes.at n=2A097499
- p^q + q^p for twin primes p and q.at n=1A097501
- (2n-1)^(2n+1) + (2n+1)^(2n-1).at n=3A154682
- Numbers of the form x^y + y^x, 1 < x < y.at n=26A173054
- Numbers of the form a^b+b^a, a and b are odd primes, b > a.at n=2A173055
- Numbers of the form a^b+b^a, a and b are primes.at n=10A173056
- Numbers of the form 7^x + y^7 with x, y >= 0.at n=35A250715
- a(n) = Sum_{p|n, p prime} p^sopf(n/p).at n=34A369912
- Expansion of Sum_{p prime} p * x^p / (1 - p * x^p).at n=34A382513
- Numbers that can be written as s^x + t^y, with 1 < s < t and {s,t} = {x,y}; that is, are of the form s^s + t^t or s^t + t^s.at n=36A385232