39607
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- First occurrence of run of primes congruent to 3 mod 4 of exactly length n.at n=8A055624
- Primes of the form k^2+6.at n=18A056909
- Initial prime in first sequence of n primes congruent to 3 modulo 4.at n=8A057619
- Primes of the form p^2 + 6 where p is prime.at n=10A079141
- Expansion of e.g.f. sinh(x)/(1-x)^2.at n=7A088129
- Duplicate of A055624.at n=8A092568
- Primes p whose Zeckendorf-expansion A014417(p) is palindromic.at n=14A095730
- n is prime and is the sum of the first k primes for some k, start from 5.at n=12A155851
- Initial prime of exactly nine consecutive primes congruent to 3 modulo 4.at n=0A162866
- Smallest prime greater than phi^n.at n=21A171969
- Primes of the form 5*k^2 + 2, k >= 0.at n=15A201481
- Smallest prime >= n-th Lucas number.at n=22A218557
- Prime numbers (together with one) whose representation in balanced ternary are palindromes.at n=44A224502
- Primes p such that p+12, p+1234 and p+123456 are also prime.at n=14A236304
- Primes 10k + 7 at the end of the maximal gaps in A269238.at n=8A269240
- Primes p such that p+2^4, p+2^6 and p+2^8 are all primes.at n=42A269257
- Prime numbersat n=4165