94849

Properties

Appears in sequences

• Lucky numbers that are both palindromic and prime.at n=14A031881
• Lesser of two consecutive palindromes, both of which are prime.at n=21A032593
• Palindromes expressible as the sum of 3 consecutive palindromic primes.at n=2A046491
• Palindromic primes expressible as the sum of 3 consecutive palindromic primes.at n=2A046492
• Primes expressible as the sum of 3 consecutive palindromic primes.at n=26A046493
• Primes whose consecutive digits differ by 4 or 5.at n=38A048416
• Palindromic primes with middle digit 8.at n=9A082444
• Palindromic primes using only nonprime digits (0,1,4,6,8,9).at n=16A083185
• Palindromic primes which are a member of a twin prime pair.at n=34A083840
• 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=13A083842
• Palindromic primes that yield a prime when sandwiched between two 3's. (Prefixing and suffixing a -three' on both sides yields another pal prime).at n=36A088270
• Smallest palindromic prime p, larger than previous term, such that concatenation of n and p is a prime.at n=14A103836
• Minimal set of palindrome prime-strings in base 10 in the sense of A071062.at n=8A114835
• Palindromic primes that start and end with 9.at n=10A128375
• Palindromic primes with only composite digits (i.e.,4,6,8,9).at n=1A128376
• Palindromic primes with squareful neighbors.at n=27A130870
• Primes that become squares when prefixed with a 2.at n=27A167735
• Palindromic prime numbers == 7 (mod 9).at n=18A229880
• First prime in set of 3 palindromic primes in arithmetic progression ordered by the largest term in the progression.at n=35A244247
• Primes whose proper substrings of consecutive digits are all composite.at n=22A279366