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Search: id:A102332
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| A102332 |
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Initial prime p introducing a prime sextuplet of consecutive primes as follows:{p,p+10,p+18,p+28,p+36,p+46} with the corresponding prime-difference-pattern:{10,8,10,8,10,8}. |
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+0
4
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| 37861, 39181, 324763, 692743, 810391, 945331, 1047961, 1429573, 1513573, 1540813, 1799071, 3463573, 3861223, 3979201, 4536121, 4641001, 5154343, 5445403, 5874853, 7851583, 8820793, 8961373, 8976403, 9302113, 9673351
(list; graph; listen)
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OFFSET
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1,1
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COMMENT
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A generalization of primes displayed in A022008.
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MATHEMATICA
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tm=TimeUsed[]; ta={{0}}; Do[g=n; d1=10; d2=8; d3=10; d4=8; d5=10; s1=Prime[n+1]-Prime[n]; s2=Prime[n+2]-Prime[n+1]; s3=Prime[n+3]-Prime[n+2]; s4=Prime[n+4]-Prime[n+3]; s5=Prime[n+5]-Prime[n+4]; If[Equal[s1, d1]&&Equal[s2, d2]&& Equal[s3, d3]&&Equal[s4, d4]&&Equal[s5, d5], Print[{Prime[n], s1, s2, s3, s4, s5}]; ta=Append[ta, Prime[n]]], {n, 1, 10000000}] {ta=Delete[ta, 1], {d1, d2}} {g, TimeUsed[]-tm}
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CROSSREFS
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Cf. A001223, A022008, A052162-A052168, A047078, A067140, A067141.
Sequence in context: A165284 A092682 A048526 this_sequence A168628 A068077 A094427
Adjacent sequences: A102329 A102330 A102331 this_sequence A102333 A102334 A102335
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KEYWORD
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nonn
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AUTHOR
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Labos E. (labos(AT)ana.sote.hu), Jan 06 2005
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