22307
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- a(n) = prime(100*n).at n=24A031921
- Numbers whose base-3 representation has exactly 10 runs.at n=25A043590
- Numbers n such that number of runs in the base 3 representation of n is congruent to 0 mod 10.at n=25A043815
- Numbers n such that 241*2^n-1 is prime.at n=14A050879
- Primes for which the five closest primes are smaller.at n=11A075037
- Primes for which the six closest primes are smaller.at n=4A075038
- Cardinality of set of sets of parts of all partitions of n.at n=49A088314
- Smallest prime(k) such that prime(k)-prime(k-n) is equal to prime(k+1)-prime(k).at n=6A089344
- 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=26A109564
- Primes p that remain prime through at least 2 iterations of the function f(p) = p^2 + 4.at n=35A116886
- Numbers appearing in A122072 at least four times.at n=11A122390
- Primes arising in A093483.at n=25A127903
- Primes p such that q-p = 36, where q is the next prime after p.at n=6A134117
- Least prime P such that 3*p(n)*P*(3*p(n)*P+1)-1, 3*p(n)*P*(3*p(n)*P+1)+1,3*p(n)*P*(3*p(n)*P+3)-1,3*p(n)*P*(3*p(n)*P+3)+1 are all primes with p(i) = i-th prime.at n=5A137839
- Prime numbers where the last digit is the sum of all the previous digits.at n=35A156617
- a(n) = 676*n - 1.at n=32A158393
- Numbers n with property that n^2 starts and ends with 49.at n=12A159815
- Primes p such that 2p + 3, 4p + 9, 3p + 2 and 9p + 8 are also primes.at n=13A176619
- Primes p such that p^2 - 8, p^2 - 6 and p^2 - 2 are prime.at n=11A176960
- The Riemann primes of the psi type and index 2.at n=43A197186