Let a,b be prime numbers satisfying the Diophantine equation a^3+b^3=(a+b)*(a^2-a*b+b^2)=c^2. Then the second factor a^2-a*b+b^2 is 3*e^2 for some integer e. This sequence tabulates the 'e' values, sorted by magnitude of c.

A099809

Let a,b be prime numbers satisfying the Diophantine equation a^3+b^3=(a+b)*(a^2-a*b+b^2)=c^2. Then the second factor a^2-a*b+b^2 is 3*e^2 for some integer e. This sequence tabulates the 'e' values, sorted by magnitude of c.

Terms

    a(0) =19a(1) =4513a(2) =14689a(3) =32401a(4) =26929a(5) =48019a(6) =44641a(7) =72739a(8) =124099a(9) =179683a(10) =211249a(11) =288979a(12) =395089a(13) =386131a(14) =587233a(15) =905059a(16) =1040419a(17) =1410049a(18) =2237011a(19) =1919779a(20) =2078209a(21) =2220451a(22) =2950963a(23) =2767489a(24) =4919971a(25) =5582449a(26) =5019889a(27) =5255761

External references