1193911
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- Palindromic primes of the form 'primemirp' resulting from A054217.at n=20A054218
- Let p = abc..k be a prime in base 10. Define mirror(p) = abc...k...cba. Sequence gives primes of the form mirror(p) for some p.at n=30A068686
- Palindromic primes with middle digit 3.at n=24A082439
- Palindromic primes p such that p-2 is also a prime: members of A083840 which are the larger member of a twin prime pair.at n=19A083842
- Palindromic primes pp such that 9876543210pp0123456789 is palindromic prime.at n=11A103834
- Primes of the form 9x^3 + x + 1.at n=12A114354
- Palindromic primes with d digits which have more than 3*d/2 distinct primes as substrings, for any d > 0.at n=9A168168
- Palindromic prime numbers == 7 (mod 9).at n=23A229880
- Prime numbersat n=92510