Products p*q*r of three distinct primes such that s=(p*q) mod r, t=(p*r) mod q and u=(q*r) mod p, and s+t+u are all prime.

A338705

Products p*q*r of three distinct primes such that s=(p*q) mod r, t=(p*r) mod q and u=(q*r) mod p, and s+t+u are all prime.

Terms

    a(0) =1885a(1) =4433a(2) =13949a(3) =30709a(4) =39479a(5) =41287a(6) =53627a(7) =55709a(8) =56173a(9) =61957a(10) =63779a(11) =64897a(12) =78217a(13) =79553a(14) =85951a(15) =90097a(16) =92983a(17) =97679a(18) =99517a(19) =101491a(20) =101803a(21) =102131a(22) =103621a(23) =107821a(24) =115915a(25) =119153a(26) =121481a(27) =121619a(28) =128573a(29) =135439

External references