83537

Properties

Appears in sequences

• Quartan primes: primes of the form x^4 + y^4, x > 0, y > 0.at n=30A002645
• Sum of 4th powers of primes dividing n.at n=33A005065
• Sum of 4th powers of primes = 2 mod 3 dividing n.at n=33A005077
• Sum of 4th powers of primes = 2 mod 3 dividing n.at n=67A005077
• a(n) = next prime after n^4.at n=16A053786
• Primes of the form n^k + n - 1, where k>0 is minimal.at n=15A076846
• a(n) is the smallest prime of the form n^k + n - 1 with k >= 2.at n=15A078179
• Smallest prime of the form n^j+(n+1)^k, with j,k integer > 0.at n=15A093574
• Smallest prime of the form n^j+(n+1)^k, with j,k integer > 0, max(j,k)>1.at n=15A093575
• Primes of form 2^j + 17^j.at n=3A094476
• Primes of the form p^4 + 16 where p is also a prime.at n=4A094479
• Primes of the form x^4 + y^4 with x^2 + y^2 and x+y also prime.at n=13A100268
• a(n) = a(n-1)^4 + a(n-2)^4 for n >= 2 with a(0) = 0, a(1) = 1.at n=5A112969
• a(0)=1, a(1)=1, a(n) = 17*a(n/2) for n=2,4,6,..., a(n) = 16*a((n-1)/2) + a((n+1)/2) for n=3,5,7,....at n=17A116523
• Sums of two distinct prime 4th powers.at n=15A130873
• Number of binary strings of length n with no substrings equal to 0010 or 1001.at n=15A164403
• Primes of the form p(i)*p(i+1)+p(i+2)+p(i+3) where p(i) is a prime.at n=21A180947
• Primes which are sums of two or more distinct 4th powers of primes.at n=8A193411
• Primes of the form n^2 + 16.at n=41A243451
• Primes of the form 4^x + y^4 with x, y > 0.at n=21A250717