33487

Properties

Appears in sequences

• a(n) is the first prime p from A031924 such that A052180(primepi(p)) = prime(n).at n=25A052229
• Largest right-truncatable prime number in base n if 1 is considered as a prime (written in base 10).at n=5A094335
• Primes p such that 8*p^2-2*p-1 divides Fibonacci(p).at n=28A159231
• Primes of the form k^2 - prime(k).at n=22A188831
• Primes of the form 9n^2 - 2.at n=13A201860
• E.g.f. satisfies: A(x) = Sum_{n>=0} x^n * exp(n*x*A(x)^n) / n!.at n=6A214933
• Primes p such that q = p^2 + 10 and q^2 + 10 are also prime.at n=38A243368
• Number of partitions of n into 10 parts such that every i-th smallest part (counted with multiplicity) is different from i.at n=17A244246
• Prime p such that sqrt(p+2) is semiprime (A001358).at n=17A257933
• Numbers that are the smallest of four consecutive primes, no three of which sum to a nonprime.at n=13A298763
• Prime numbersat n=3585