Pseudotwinprimes p+2 for primes p such that p+2 divides p^(p+2)+2 and p+2 is composite.

Terms

a(0) =645a(1) =1105a(2) =2701a(3) =2821a(4) =4681a(5) =6601a(6) =10261a(7) =12801a(8) =14491a(9) =16705a(10) =18721a(11) =19951a(12) =25761a(13) =29341a(14) =30121a(15) =31609a(16) =33153a(17) =39865a(18) =41041a(19) =42799a(20) =49141a(21) =52633a(22) =55245a(23) =62745a(24) =68101a(25) =72885a(26) =83665a(27) =85489a(28) =90751a(29) =104653