262147
domain: N
Properties
Primality
- Prime
- yes
Appears in sequences
- Numbers that are the sum of 4 positive 9th powers.at n=15A003393
- Numbers that are the sum of at most 4 positive 9th powers.at n=38A004888
- Next prime after 2^n.at n=18A014210
- Numerators of continued fraction convergents to sqrt(214).at n=11A041398
- Numerators of continued fraction convergents to sqrt(856).at n=11A042652
- Primes p+2^n arising in A056206.at n=18A056208
- Primes of the form 2^k + 3.at n=9A057733
- a(n) = 2^n + 3.at n=18A062709
- Smallest prime >= 8^n.at n=6A063768
- Smallest prime containing n zeros in its binary expansion.at n=16A066195
- Primes of form 2^x + 2^y + 1.at n=40A070739
- Primes of the form 2^i + 2^j + 1, i > j > 0.at n=35A081091
- Primes that can be written as 1+p+p^k, p prime and k > 1.at n=30A084444
- Smallest prime with exactly n consecutive zeros in the longest run of zeros in its binary expansion.at n=16A090587
- Primes whose representation in base 512 can be interpreted as a decimal prime.at n=10A090720
- Smallest prime between 2^n and 2^(n+1), having a minimal number of 1's in binary representation.at n=17A091936
- A006530(x)=2 is a local minimum if x=2^n. Running upward with argument x, the largest prime divisor should increase. The value of first peak is a(n).at n=17A102643
- Smallest prime >= 2^n.at n=18A104080
- Smallest prime >= 4^n.at n=9A104082
- Prime nearest to 2^n. In case of a tie, choose the smaller.at n=18A117387