36343

Properties

Appears in sequences

• Primes p whose period of reciprocal equals (p-1)/9.at n=27A056214
• Number of primes whose binary expansion begins '11' (A080166) in range ]2^n,2^(n+1)].at n=19A095766
• Primes for which the weight as defined in A117078 is 11 and the gap as defined in A001223 is 10.at n=35A119596
• Terms in A006512 containing the digit "6" at least once, such that changing every "6" to a "9" and vice versa yields a larger term in A006512.at n=9A123211
• Primes having only {3, 4, 6} as digits.at n=16A199346
• Primes with nonzero digits such that sum of cubes of digits equal to square of sums.at n=12A225567
• Expansion of 1/(1 + Sum_{k>=1} k^3 * x^k).at n=10A316088
• Primes p such that p=prime(k), prime(k+1), and prime(k+2) end in the same digit.at n=37A328452
• Primes dividing nonzero terms in A002065.at n=40A328704
• Primes where every other digit is 3 starting with the rightmost digit, and no other digit is 3.at n=43A348559
• a(n) is the smallest error in trying to solve n^5 = x^5 + y^5: for each n from 2 on, find positive integers x and y, x <= y < n such that |n^5 - x^5 - y^5| is minimal and let a(n) = n^5 - x^5 - y^5. In case of a tie, choose the solution with smallest y.at n=21A369855
• Primes having only {0, 3, 4, 6} as digits.at n=26A386057
• Primes having only {3, 4, 5, 6} as digits.at n=38A386169
• Primes having only {3, 4, 6, 8} as digits.at n=35A386174
• Prime numbersat n=3857