33329

Properties

Appears in sequences

• Numerators of continued fraction convergents to cube root of 7.at n=9A005484
• Primes p such that 2^j+p^j are primes for j=0,1,4,16.at n=8A094492
• Integer part of the area of circles with prime radii.at n=26A097427
• Primes in A103377.at n=17A103387
• Primes p such that googol - p is prime.at n=22A108252
• Primes of the form floor(Pi*p^2) where p is a prime.at n=5A134075
• Primes p such that p^3 +- (p+1) are primes.at n=29A137472
• Let m = A002445(n); then a(n) = largest member of A001359 (the lesser twin primes sequence) <= m.at n=8A156053
• Number of binary strings of length n with equal numbers of 00010 and 10101 substrings.at n=16A164223
• Primes containing the string 333.at n=19A166581
• The lesser of twin primes p such that p*q+a+b+c are also the lesser of twin primes, (p and q are twin primes, p+2=q, a=p-1,b=(p+q)/2,c=q+1).at n=27A168536
• List of primes p1 such that (p1,p2) are twin primes where both 2*p1+p2 and p1+2*p2 are primes.at n=16A174920
• Primes of the form 7n^2 + 2.at n=4A201603
• Number of incidences in the poset of conjugacy classes of subgroups of the alternating group.at n=11A218922
• Primes of the form floor(Pi*k^2).at n=14A227794
• Number of n X 1 0..2 arrays of the median of the corresponding element, the element to the east and the element to the south in a larger (n+1) X 2 0..2 array without adjacent equal elements in the latter.at n=11A229514
• The lesser of twin primes p1 such that 2*p1 + p2 is a prime number (A174913) and also the lesser of other twin primes in A174913.at n=3A242772
• a(0) = 0, a(n) = previous term + repunit of length of previous term for n > 0.at n=39A247107
• Primes p such that A001175(p) = (p-1)/8.at n=10A308793
• Prime numbersat n=3568