96469

Properties

Appears in sequences

• Lucky numbers that are both palindromic and prime.at n=15A031881
• Difference between length (A005341) and sum of digits (A004977) of n-th term in Look and Say Sequence (A005150).at n=42A056635
• Palindromic primes with strictly decreasing digits up to the middle and then strictly increasing.at n=22A062352
• Palindromic primes with middle digit 4.at n=9A082440
• Palindromic prime units W appearing four times in second-order fractal palindromic primes WxWmWxW, where part WxW is also a palindromic prime.at n=34A082599
• Palindromic prime units W appearing eight times in third-order fractal palindromic primes WvWxWvWmWvWxWvW, where parts WvWxWvW, WvW are also palindromic primes.at n=10A082600
• Palindromic primes using only nonprime digits (0,1,4,6,8,9).at n=18A083185
• Palindromic primes with nonincreasing digits up to the middle and then nondecreasing.at n=27A084837
• Primes having only {4, 6, 9} as digits.at n=26A107666
• Minimal set of palindrome prime-strings in base 10 in the sense of A071062.at n=10A114835
• Palindromic primes that start and end with 9.at n=14A128375
• Palindromic primes with only composite digits (i.e.,4,6,8,9).at n=3A128376
• Primes of the form a^a + b^b + c^c + d^d + e^e + f^f.at n=41A136294
• Palindromic primes that are the average of the members of emirp pairs.at n=25A178583
• Palindromic prime numbers == 7 (mod 9).at n=19A229880
• First prime in set of 3 palindromic primes in arithmetic progression ordered by the largest term in the progression.at n=34A244247
• The number of irreducible zero-sum subsets of T(n) = {-2*n+1, -2*n+3, ..., -3, -1, 1, 3, ..., 2*n-3, 2*n-1} that contain -2*n+1 but not 2*n-1.at n=22A390083
• Prime numbersat n=9291