A067189 - cp's OEIS frontend

A067189 Numbers that can be expressed as the sum of two primes in exactly three ways.

22, 24, 26, 30, 40, 44, 52, 56, 62, 98, 128

Offset: 1

Amarnath Murthy, Jan 10 2002

Corresponds to numbers 2m such that A045917(m)=3. Subsequence of A014091. - Lekraj Beedassy, Apr 22 2004

			26 is a term as 26 = 23+3 = 19+7 = 13+13 are all the three ways to express 26 as a sum of two primes.

Index entries for sequences related to Goldbach conjecture

Cf. A023036.

Numbers that can be expressed as the sum of two primes in k ways for k=0..10: A014092 (k=0), A067187 (k=1), A067188 (k=2), this sequence (k=3), A067190 (k=4), A067191 (k=5), A066722 (k=6), A352229 (k=7), A352230 (k=8), A352231 (k=9), A352233 (k=10).

y = Select[Flatten@Table[Prime[i] + Prime[j], {i, 500}, {j, 1, i}], # < Prime[500] &]; Select[Union[y], Count[y, #] == 3 &] (* Robert Price, Apr 22 2025 *)

Extended by Peter Bertok (peter(AT)bertok.com), who finds (Jan 13 2002) that there are no other terms below 10000 and conjectures there are no further terms in this sequence and A067188, A067190, etc.

R. K. Guy (Jan 14 2002) remarks: "I believe that these conjectures follow from a more general one by Hardy & Littlewood (probably in Some problems of 'partitio numerorum' III, on the expression of a number as a sum of primes, Acta Math. 44(1922) 1-70)."

cp's OEIS Frontend

A067189 Numbers that can be expressed as the sum of two primes in exactly three ways.

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