1074701

Properties

Appears in sequences

• Palindromic primes in which parity of digits alternates.at n=35A030150
• Palindromic prime lengths of factorials: see A035067.at n=36A035068
• Palindromic Sophie Germain primes.at n=15A051835
• Palindromic primes with at least one zero digit.at n=30A071783
• Primes p such that the differences between the 5 consecutive primes starting with p are (6,2,4,6).at n=31A078958
• Palindromic primes with middle digit 4.at n=10A082440
• a(n) = smallest palindromic prime that begins with A082768(n), or 0 if no such number exists.at n=51A082769
• Palindromic primes whose digit permutation yields at least one other palindromic prime.at n=23A082808
• Smallest palindromic prime beginning with the n-th prime, or 0 if no such prime exists.at n=27A088249
• Palindromic primes that yield a prime when sandwiched between two 1's. (Prefixing and suffixing a 1 on both sides yields another palindromic prime.)at n=14A088269
• Palindromic primes that yield a prime when sandwiched between two 7's. (Prefixing and suffixing a 'seven' on both sides yields another pal prime).at n=21A088271
• Primes arising in A099744.at n=10A099746
• Palindromic primes with digit sum 20.at n=8A109184
• Palindromic primes p such that p's 10's complement is also a prime.at n=33A109862
• Palindromic prime numbers == 2 (mod 9).at n=22A229876
• Smaller of two consecutive palindromic primes with equal digital sum.at n=6A230220
• Undulating alternating palindromic primes.at n=29A343675
• Regular triangle read by rows, T(n,k) is the number of derangements of [n] with exactly k right-to-left minima, for n >= 2 and 1 <= k <= n-1.at n=49A344437
• Palindromic primes having at least one different anagram that is also a palindromic prime.at n=9A345869
• Prime numbersat n=83879