0,1

P. De Geest, WONplate 122

C. Rivera, Puzzle 46

The prime 83, for example, is the sum of the consecutive primes 11+13+17+19+23.

p = {}; Do[a = Table[ Prime[i], {i, n, 150}]; l = Length[a]; k = 2; While[k < l + 1, b = Plus @@@ Partition[a, k]; k++; p = Append[ p, Select[ b, PrimeQ[ # ] &]]], {n, 1, 149}]; Take[ Union[ Flatten[p]], 70]

Cf. A050936, A067372-A067381.

Sequence in context: A022141 A091209 A054997 this_sequence A044438 A101414 A105884

Adjacent sequences: A067374 A067375 A067376 this_sequence A067378 A067379 A067380

nonn

Patrick De Geest (pdg(AT)worldofnumbers.com), Feb 04 2002.