29243

Properties

Appears in sequences

• Primes p such that number of primes produced according to rules stipulated in Honaker's A048853 is 3.at n=25A050665
• Smallest number m such that m == i (mod prime(i)) for all 1<=i<=n.at n=5A053664
• Primes of the form k^2 + 2.at n=17A056899
• Smallest number m > 1 with m == k mod k-th prime for k = 1 to n.at n=5A075307
• Prime means of 12 horizontal, vertical and main diagonal sums associated with primes in A094458.at n=12A094459
• Primes of the form m^k+k, with m and k > 1.at n=22A099227
• a(n) = Sum_{k=0..floor(n/5)} C(n-4k,k+1).at n=35A099559
• Primes that are equal to the mean of 5 consecutive squares.at n=15A129388
• Primes of the form k^2 - prime(k).at n=20A188831
• a(n) = floor((n+1/n)^4).at n=12A197603
• Primes that are the sum of 51 consecutive primes.at n=19A215992
• Numerator of Sum_{i=1..n} 1/(prime(i)*prime(i+1)).at n=5A241189
• a(1) = 2; a(n + 1) = smallest prime > a(n) such that a(n + 1) - a(n) is the product of 8 primes.at n=31A285693
• One of the two successive approximations up to 2^n for 2-adic integer sqrt(-3/5). This is the 3 (mod 4) case.at n=13A341601
• Primes p such that p^6 - 1 has 384 divisors.at n=19A341666
• Discriminants of imaginary quadratic fields with class number 33 (negated).at n=39A351671
• Prime numbersat n=3179