36353

Properties

Appears in sequences

• Primes of the form 512*k+1.at n=13A076339
• Starting positions of strings of three 6's in the decimal expansion of Pi.at n=29A083625
• Primes p such that 2*p-27, 2*p+27, 2*p-33 and 2*p+33 are primes or -1 times primes.at n=30A103807
• Primes of the form 1024n + 513.at n=7A105132
• Primes p of Erdos-Selfridge class 5+ with largest prime factor of p+1 not of class 4+.at n=3A129473
• Primes of the form k * m^m + 1 with k < m^m.at n=35A180362
• Pythagorean primes p such that for all primes q < p, p XOR q is not equal to p - q.at n=31A197918
• Primes of the form 256*k + 1.at n=26A208178
• Larger of pairs of emirps (A006567) whose difference with the (smaller) reversal is a triangular number (A000217).at n=29A217286
• Primes of the form 384*k + 257.at n=28A229856
• Primes of the form q(m) + 1 with m - 1 and m + 1 both prime, where q(.) is the strict partition function (A000009).at n=4A235356
• Starting with a(1) = 3, a(2) = 5, a(n+1) is the smallest prime number greater than the previous term a(n) such that there exists k satisfying 1<=k<n, a(n+1) = 2*a(n) - a(k).at n=24A238137
• Primes having only {3, 5, 6} as digits.at n=20A260225
• Primes p whose last digit is the same as that of both its predecessor prime and its successor prime.at n=37A298075
• Partial sums of A299896.at n=42A299897
• Expansion of (1 - x^2)*Product_{k>=2} (1 + x^k)^k.at n=24A303902
• Primes p such that p=prime(k), prime(k+1), and prime(k+2) end in the same digit.at n=38A328452
• a(n) = Sum_{k=0..floor(n/8)} (-1)^k * binomial(n-4*k,4*k).at n=26A348309
• Primes having only {0, 3, 5, 6} as digits.at n=30A386061
• Primes having only {3, 4, 5, 6} as digits.at n=39A386169