32261
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- Numbers k such that k^6 == 1 (mod 7^5).at n=10A056103
- Primes p(k) such that the product of digits of p(k) equals the product of digits of k.at n=18A066521
- Index k in A095773 where a string of n identical values occurs.at n=34A096183
- a(n) = prime(A096475(n)).at n=16A096476
- prime(k) for those k where floor((2*(prime(k+1)-prime(k))*PrimePi(k) mod (8*k))/k) = m with m = 10.at n=33A109564
- a(n) is the smallest prime p such that 7^n divides p^6 - 1.at n=4A125611
- Smallest odd prime base q such that p^5 divides q^(p-1) - 1, where p = prime(n).at n=3A125646
- Primes p such that q-p = 36, where q is the next prime after p.at n=12A134117
- Emirps of the form k^2 + k + 41.at n=30A155953
- Honaker emirps: terms in A033548 that are emirps.at n=31A161118
- A006005 (shifted) convolved with all of its regularly "aerated" variants.at n=16A161993
- Primes of the form 2*k^2 + 3.at n=27A201473
- a(n) = prime(prime(n^2)).at n=21A217623
- Primes of the form (2^n - 1)*(2^(m+3)) + 5 where n >= 1, m >= 1.at n=13A225214
- Primes congruent to 5 (mod 504).at n=24A228093
- Primes p with same last two digits as k, where prime(k) = p.at n=35A232102
- a(n) = A273059(4n+2).at n=31A275918
- Primes having square prime gaps to both neighbor primes.at n=6A353088
- a(n) is the least prime p such that q-p = n*(r-q) where p,q,r are consecutive primes.at n=17A358974
- Expansion of (1/x) * Series_Reversion( x*(1-x)^2/(1+x)^3 ).at n=5A365842