34883

Properties

Appears in sequences

• Numbers n such that 265*2^n-1 is prime.at n=27A050891
• Primes p such that there is no Carmichael number pqr, p<q<r q, r primes.at n=32A051663
• Numbers k such that the smoothly undulating palindromic number (78*10^k - 87)/99 is a prime.at n=10A062225
• a(n) = smallest prime p_k such that the n successive differences between the primes p_k through p_(k+n) are all distinct.at n=11A079007
• Primes indexed by A078515; i.e., primes which start record runs of consecutive primes with distinct first differences.at n=9A079889
• Numerator of partial sums of a certain series.at n=3A101627
• Numbers k such that the first 9 decimal digits of the k-th Fibonacci number is 1-9 pandigital.at n=21A112516
• Primes p such that continued fraction of (1 + sqrt(p))/2 has period 14: primes in A146337.at n=18A146359
• Primes p such that 2p+1, 3p+2 and 5p-2 are also primes.at n=28A178068
• Primes having only {3, 4, 8} as digits.at n=15A199348
• Primes that can be generated by the concatenation in base 8, in descending order, of two consecutive integers read in base 10.at n=13A287311
• Number of nX3 0..1 arrays with every element equal to 0, 1, 3, 4 or 6 horizontally, vertically or antidiagonally adjacent elements, with upper left element zero.at n=14A300939
• Primes that do not divide any 3-Carmichael numbers.at n=27A369777
• Primes such that the next 10 prime gaps are all distinct.at n=5A372550
• Primes having only {0, 3, 4, 8} as digits.at n=26A386059
• Primes having only {3, 4, 5, 8} as digits.at n=33A386171
• Primes having only {3, 4, 6, 8} as digits.at n=34A386174
• Prime numbersat n=3724