38083

Properties

Appears in sequences

• Palindromic reflectable primes.at n=15A007616
• a(n) = floor(Gamma(n+1/12)/Gamma(1/12)).at n=10A020049
• Previous palindromic prime concatenated with this palindromic prime is prime.at n=4A030463
• Lesser of two consecutive palindromes, both of which are prime.at n=16A032593
• Palindromic and prime Fibonacci-lucky numbers.at n=28A039679
• Numerators of b(n) = (1/16^n)*(4/(8*n+1) - 2/(8*n+4) - 1/(8*n+5) - 1/(8*n+6)).at n=35A048581
• Palindromic primes with at least one zero digit.at n=12A071783
• Primes which can be represented as the sum of a prime and its reverse.at n=33A072385
• Palindromic primes with nonprime middle digit.at n=31A076613
• Palindromic primes with middle digit 0.at n=4A082435
• a(n) = smallest palindromic prime that begins with A082768(n) and contains more than twice the number of digits in A082768(n), or 0 if no such number exists.at n=22A082770
• Palindromic primes p with property that another palindromic prime with as many digits can be obtained by using all the digits of p with a different frequency >=1 (every digit is used at least once).at n=24A082807
• Diagonal of A083464.at n=21A083465
• 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=24A088270
• Numbers p such that p = (prime(n)+ prime(n+3))/2 is prime for prime indices n=2, 3, 5...at n=32A098039
• Palindromic primes that are not Chen primes.at n=35A118494
• Prime palindromic cyclops numbers.at n=4A136098
• Palindromic cyclops numbers.at n=35A138131
• Palindromic primes with multiplicative persistence value 1.at n=20A159613
• Primes of the form 2n^2 - 5.at n=21A201713