32843

Properties

Appears in sequences

• Members of A083989 whose 10's complement is also a member of A083989.at n=28A083991
• Smallest prime p > 3 such that p-1 has a prime factor > (p-1)^(n/(n+1)).at n=13A111671
• Primes p such that q-p = 26, where q is the next prime after p.at n=17A124594
• Father primes of order 11.at n=33A136080
• Primes p such that q*p +- (p mod q) are primes, for q=8.at n=38A178416
• Number of equivalence classes of S_n under transformations of positionally and numerically adjacent elements of the form abc <--> acb <--> bac where a<b<c.at n=8A212581
• Indices of primes in A141523.at n=41A235862
• (2,3,5,7)-primes (see comments for precise definition).at n=23A262728
• Primes of the form 2^x + y (x >= 0 and 0 <= y < 2^x) such that all the numbers 2^(x+a) + (y-a) (0 < a <= y) are composite.at n=34A264866
• Decimal representation of the diagonal from the corner to the origin of the n-th stage of growth of the two-dimensional cellular automaton defined by "Rule 846", based on the 5-celled von Neumann neighborhood.at n=33A290554
• a(n) = 5*n + 2^n.at n=15A297663
• Primes of the form 2^k + 5*k.at n=4A299643
• Numbers k such that 419*2^k+1 is prime.at n=20A323109
• a(n) = Sum_{k=1..A003056(n)} 2^(T(n,k)-1), where T(n,k) = k-th term in row n of A235791.at n=15A348473
• Primes p such that neither g-1 nor g+1 is prime, where g is the gap from p to the next prime.at n=29A355485
• Primes p such that the 10's complement A089186(p) and the concatenations of p and A089186(p) and of A089186(p) and p are all prime.at n=25A372082
• Prime numbersat n=3523