A077792 Numbers k such that (10^k - 1)/3 + 5*10^floor(k/2) is a palindromic wing prime (a.k.a. near-repdigit palindromic prime).
3, 15, 171, 189, 547, 713, 2155, 3595, 13517, 60465
Offset: 1
Examples
15 is a term because (10^15 - 1)/3 + 5*10^7 = 333333383333333.
References
- C. Caldwell and H. Dubner, "Journal of Recreational Mathematics", Volume 28, No. 1, 1996-97, pp. 1-9.
Links
- Patrick De Geest, World!Of Numbers, Palindromic Wing Primes (PWP's)
- Makoto Kamada, Prime numbers of the form 33...33833...33
- Index entries for primes involving repunits.
Crossrefs
Programs
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Mathematica
Do[ If[ PrimeQ[(10^n + 15*10^Floor[n/2] - 1)/3], Print[n]], {n, 3, 13600, 2}] (* Robert G. Wilson v, Dec 16 2005 *)
Formula
a(n) = 2*A183177(n) + 1.
Extensions
a(10) from Robert Price, Apr 21 2016
Name corrected by Jon E. Schoenfield, Oct 31 2018
Comments