33479
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- Numbers whose least quadratic nonresidue (A020649) is 17.at n=27A025026
- Primes with 17 as smallest positive primitive root.at n=31A061329
- Prime numbers p such that 2*p+1, p*(p + 1) - 1 and p*(p + 1) + 1 are also primes.at n=18A136015
- a(n) is the smallest prime factor of (n-1)^n - n^(n-1).at n=8A174380
- Expansion of exp(x^2*cos(x))=1+sum(n>0, a(n)*x^(2*n)/(2*n-2)!).at n=6A191297
- Primes of the form n^2 - 10.at n=15A201313
- Primes p such that both prevprime(p^2) - 2 and nextprime(p^2) + 2 are also primes.at n=14A226986
- Triangle read by rows. T(n, k) = k^n * BellPolynomial(n, -1/k) for k > 0, if k = 0 then T(n, k) = k^n.at n=33A350261
- Triangle read by rows. T(n, k) = B(n, n - k + 1) where B(n, k) = k^n * BellPolynomial(n, -1/k) for k > 0, if k = 0 then B(n, k) = k^n.at n=31A350262
- Prime numbersat n=3584