46619

Properties

Appears in sequences

• Primes of the form 666*k - 1.at n=23A063472
• Primes of the form p*q - p - q, where p and q are two successive primes.at n=14A096345
• Prime Friedman numbers.at n=30A112419
• Primes of the form k^3 - k - 1.at n=16A116581
• Largest prime < 10*a(n-1), a(1)=5.at n=4A124267
• a(n) = n^3 - n - 1.at n=35A126420
• Numbers which contain only the digit 5 in their base-6 representation, with at most one exception. If the exception is the most-significant digit, it must be the digit 1, 2, 3, or 4, otherwise the exception must be the digit 4.at n=41A188532
• Numbers n such that n^1+n+1, n^2+n+1, n^3+n+1 and n^4+n+1 are all prime.at n=23A219117
• Smaller of two consecutive primes whose product of digits is equal and nonzero.at n=18A230083
• Primes p such that p^1+p+1, p^2+p+1, p^3+p+1, and p^4+p+1 are all prime.at n=7A236045
• Sum of the areas of all bargraphs of site-perimeter n.at n=18A274208
• Primes p congruent to 1 modulo 13 such that x^13 = 2 has a solution modulo p.at n=27A275773
• Primes of the form (k - 1) * k * (k + 1) +- 1, k >= 1.at n=31A293861
• a(n) = 3*a(n-1) + 10*a(n-2), n >= 2; a(0)=-1, a(1)=23.at n=6A321133
• Least prime p such that the decimal expansion of p^2 contains exactly n distinct primes as substrings.at n=20A385709
• Primes that are (product minus sum) of a sequence of consecutive primes.at n=18A390933
• Prime numbersat n=4817