Numbers n such that 2*P(n)+1, 2*P(n+1)+1, and 2*P(n+2)-1 are also consecutive primes with P(n+1)=P(n)+6 and P(n+2)=P(n+1)+2 with P(i)=i-th prime.

A103852

Numbers n such that 2*P(n)+1, 2*P(n+1)+1, and 2*P(n+2)-1 are also consecutive primes with P(n+1)=P(n)+6 and P(n+2)=P(n+1)+2 with P(i)=i-th prime.

Terms

    a(0) =119a(1) =372a(2) =814a(3) =4350a(4) =9797a(5) =16625a(6) =16729a(7) =48121a(8) =63137a(9) =71520a(10) =83264a(11) =103551a(12) =111283a(13) =113690a(14) =232363a(15) =268661a(16) =302024a(17) =333947a(18) =334725a(19) =340910a(20) =352997a(21) =381169a(22) =404828a(23) =414097a(24) =565240a(25) =606243a(26) =607228a(27) =613165a(28) =660386a(29) =724426

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