94049

Properties

Appears in sequences

• Palindromic in bases 10 and 16.at n=20A029731
• Primes that are palindromic in bases 10 and 16.at n=7A046484
• Primes whose consecutive digits differ by 4 or 5.at n=36A048416
• Smallest sets of 3 consecutive palindromic primes (palprimes) in arithmetic progression. The first prime of each set is listed.at n=4A059120
• Palindromic primes with strictly decreasing digits up to the middle and then strictly increasing.at n=19A062352
• Palindromic primes with at least one zero digit.at n=20A071783
• Primes which can be represented as the sum of a square and its reverse.at n=14A072383
• Palindromic primes with middle digit 0.at n=8A082435
• Smallest palindromic prime that ends (the least significant side) in (2n-1) the n-th odd number, or 0 if no such number exists, e.g., for 2n-1 = 10k + 5, k>0.at n=24A082626
• a(n) = smallest palindromic prime that begins with A082768(n), or 0 if no such number exists.at n=38A082769
• Palindromic primes using only nonprime digits (0,1,4,6,8,9).at n=14A083185
• Palindromic primes with nonincreasing digits up to the middle and then nondecreasing.at n=24A084837
• Least palindromic prime beginning with A089743(n).at n=40A089744
• The 10^n-th palindromic prime.at n=2A103404
• Palindromic primes pp such that 9876543210pp0123456789 is palindromic prime.at n=7A103834
• Smallest palindromic prime p, larger than previous term, such that concatenation of n and p is a prime.at n=13A103836
• Minimal set of palindrome prime-strings in base 10 in the sense of A071062.at n=6A114835
• Palindromic primes that start and end with 9.at n=7A128375
• Palindromic primes with squareful neighbors.at n=24A130870
• Prime palindromic cyclops numbers.at n=8A136098