35227
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- Primes that remain prime through 3 iterations of function f(x) = 6x + 7.at n=32A023289
- Prime numbers p such that the number of partitions of p is also a prime.at n=12A038601
- Primes p(k) such that the product of digits of p(k) equals the product of digits of k.at n=22A066521
- Primes that are a concatenation of 3, 5 and a prime.at n=11A101219
- Largest of six consecutive primes the sum of the digits of each of which is prime.at n=26A106720
- Largest prime of the set of five consecutive primes whose sum of digits is a set of five distinct primes.at n=5A106815
- Primes with at least one of each prime digit.at n=22A108419
- Primes with a prime number of digits, all of them prime, that add up to a prime.at n=28A110028
- Emirps with only prime digits (i.e., 2, 3, 5, 7).at n=18A128388
- Lesser of emirps (pairs) with only prime digits (A128388).at n=11A133554
- Emirps with a prime number of only prime digits.at n=10A137833
- Lesser of emirps (pairs) with a prime number of only prime digits.at n=7A137834
- Emirps using only and all of the prime digits 2,3,5,7.at n=6A137836
- Emirps made up of a prime number of only prime digits including all of 2,3,5,7.at n=2A137837
- Primes with a prime number of digits and using all of the prime digits 2, 3, 5, 7 at least once and no other digits.at n=14A153770
- Primes whose digits are primes and reverse is prime.at n=28A160748
- Smallest primes p = p(k) with (p(k)+p(k+1)+p(k+2))/15 an integer.at n=34A168556
- Honaker primes of the form p = 2*k-1 with sum-of-digits(p) = sum-of-digits(k).at n=16A176111
- Smallest of three consecutive primes whose average is a triangular number.at n=2A226150
- Primes p such that 2*p + 1 is abundant.at n=41A267476