58241
domain: N
Appears in sequences
- Numbers n such that A048767(n+1)=A048767(n).at n=36A048769
- A partial product representation of A006131 and A072265.at n=27A072270
- a(1) = 1, a(2n) = smallest composite number > (2n-1)-th partial sum of the sequence itself and a(2n+1) = smallest prime > 2n-th partial sum of the sequence.at n=15A076975
- Numbers n such that A229964(n) = 3.at n=30A229966
- a(n) is the minimal odd odious k>1, such that k^i, i=2,...,n, all are evil, and a(n)=0, if there is no such k.at n=12A230498
- a(n) is the minimal odd odious k>1, such that k^i, i=2,...,n, all are evil, and a(n)=0, if there is no such k.at n=13A230498
- a(n) is the minimal odd odious k>1, such that k^i, i=2,...,n, all are evil, and a(n)=0, if there is no such k.at n=14A230498
- Expansion of Product_{k>=1} 1/(1 - Sum_{j=1..k} x^(j*k)).at n=30A319758
- Intersection of A099011 and A327651.at n=33A327652
- NSW pseudoprimes: odd composite numbers k such that A002315((k-1)/2) == 1 (mod k).at n=39A330276