A075231 - OEIS

A075231

Numbers k such that k^8 is an interprime = average of two successive primes.

12, 111, 116, 175, 183, 205, 246, 305, 313, 406, 438, 593, 594, 620, 696, 714, 788, 824, 844, 969, 1014, 1023, 1061, 1080, 1153, 1176, 1204, 1288, 1367, 1456, 1470, 1515, 1533, 1538, 1572, 1626, 1659, 1689, 1692, 1695, 1734, 1759, 1788, 1860, 1928

(list; graph; refs; listen; history; text; internal format)

OFFSET

1,1

COMMENTS

Interprimes are in A024675, even interprimes are in A072568, odd interprimes are in A072569 n^2 as interprimes are in A075190, n^3 as interprimes are in A075191, n^4 as interprimes are in A075192, n^5 as interprimes are in A075228, n^6 as interprimes are in A075229, n^7 as interprimes are in A075230, n^9 as interprimes are in A075232, n^10 as interprimes are in A075233, a(n) such that a(n)^n = smallest interprime (of the form a^n) are in A075234.

LINKS

Amiram Eldar, Table of n, a(n) for n = 1..10000

EXAMPLE

12 is a term because 12^8 = 429981696 is the average of two successive primes 429981691 and 429981701.

MAPLE

s := 8: for n from 2 to 1000 do if prevprime(n^s)+nextprime(n^s)=2*n^s then print(n) else; fi; od;

MATHEMATICA

Select[Range[2000], 2#^8 == NextPrime[#^8, -1] + NextPrime[#^8] &]

CROSSREFS

Cf. A024675, A072568, A072569, A075190, A075191, A075192.

Cf. A075228, A075229, A075230, A075232, A075233, A075234.

Sequence in context: A037616 A048532 A049102 * A085773 A066042 A153597