35459

Appears in sequences

• Indices of primes in sequence defined by A(0) = 77, A(n) = 10*A(n-1) - 3 for n > 0. Numbers n such that (690*10^n + 3)/9 is prime.at n=10A056260
• Pell pseudoprimes: odd composite numbers n such that P(n)-Kronecker(2,n) is divisible by n.at n=36A099011
• a(n) = least k such that the remainder when 22^k is divided by k is n.at n=34A128362
• Composite numbers k such that Pell(k) == -1 (mod k).at n=5A319043
• Intersection of A099011 and A327651.at n=21A327652
• NSW pseudoprimes: odd composite numbers k such that A002315((k-1)/2) == 1 (mod k).at n=25A330276