24659

Properties

Appears in sequences

• Primes p such that number of primes produced according to rules stipulated in Honaker's A048853 is 3.at n=19A050665
• Irregular primes with irregularity index three.at n=34A060975
• Smallest prime larger than square of n-th prime.at n=36A062772
• Safe primes (A005385) (p and (p-1)/2 are primes) such that 12*p+1 is also prime.at n=52A075707
• Primes of the form k^2 + 10.at n=25A138355
• Primes of the form k*(k+2)/3 - 2, k > 0.at n=35A162307
• Number of binary strings of length n with no substrings equal to 0011 or 0101.at n=20A164406
• Primes q (except greater of twin primes) with result 2 under iterations of {r mod (max prime p < r)} starting at r = q.at n=32A175080
• Supersafe primes.at n=40A181841
• Smallest prime greater than n*(n+1)^2/2.at n=36A181956
• Primes of the form p^2 + 10, where p is prime.at n=13A182475
• Primes of the form k^2 - prime(k).at n=18A188831
• Lexicographically least sequence of primes (including 1) that are sum-free.at n=18A225947
• Numbers k such that Sum_{j=1..k} sigma_*(j) == 0 (mod k), where sigma_*(j) is the sum of the anti-divisors of j (A066417).at n=18A229883
• Initial primes of sets of 8 consecutive primes all different by modulo 30.at n=47A248199
• a(n) = numerator of (1/n^3)*(-1/(n+1) + 16/(n+2) + 3/(4*(2*n+1)) - 81/(4*(2*n+3))), term of a BBP-type series representation of zeta(3) by V. Adamchik and S. Wagon.at n=30A256323
• Primes p such that p^3 - 1 has 8 divisors.at n=25A341659
• Prime numbersat n=2730