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- Euclid–Mullin_sequence abstract "The Euclid–Mullin sequence is an infinite sequence of distinct prime numbers, in which each element is the least prime factor of one plus the product of all earlier elements. They are named after the ancient Greek mathematician Euclid, because their definition relies on an idea in Euclid's proof that there are infinitely many primes, and after Albert A. Mullin, who asked about the sequence in 1963.The first 51 elements of the sequence are2, 3, 7, 43, 13, 53, 5, 6221671, 38709183810571, 139, 2801, 11, 17, 5471, 52662739, 23003, 30693651606209, 37, 1741, 1313797957, 887, 71, 7127, 109, 23, 97, 159227, 643679794963466223081509857, 103, 1079990819, 9539, 3143065813, 29, 3847, 89, 19, 577, 223, 139703, 457, 9649, 61, 4357, 87991098722552272708281251793312351581099392851768893748012603709343, 107, 127, 3313, 227432689108589532754984915075774848386671439568260420754414940780761245893, 59, 31, 211... (sequence A000945 in OEIS)These are the only known elements as of September 2012. Finding the next one requires finding the least prime factor of a 335-digit number (which is known to be composite).".
- Euclid–Mullin_sequence wikiPageExternalLink showpost.php?p=60960&postcount=65.
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- Euclid–Mullin_sequence wikiPageRevisionID "635860220".
- Euclid–Mullin_sequence wikiPageWikiLink Albert_A._Mullin.
- Euclid–Mullin_sequence wikiPageWikiLink Category:Integer_sequences.
- Euclid–Mullin_sequence wikiPageWikiLink Category:Prime_numbers.
- Euclid–Mullin_sequence wikiPageWikiLink Category:Unsolved_problems_in_mathematics.
- Euclid–Mullin_sequence wikiPageWikiLink Composite_number.
- Euclid–Mullin_sequence wikiPageWikiLink Computable_function.
- Euclid–Mullin_sequence wikiPageWikiLink Constructive_proof.
- Euclid–Mullin_sequence wikiPageWikiLink Empty_product.
- Euclid–Mullin_sequence wikiPageWikiLink Euclid.
- Euclid–Mullin_sequence wikiPageWikiLink Euclid_number.
- Euclid–Mullin_sequence wikiPageWikiLink Euclids_theorem.
- Euclid–Mullin_sequence wikiPageWikiLink Prime_factor.
- Euclid–Mullin_sequence wikiPageWikiLink Prime_number.
- Euclid–Mullin_sequence wikiPageWikiLink Sylvesters_sequence.
- Euclid–Mullin_sequence wikiPageWikiLinkText "Euclid–Mullin sequence".
- Euclid–Mullin_sequence wikiPageWikiLinkText "Euclid–Mullin sequence".
- Euclid–Mullin_sequence hasPhotoCollection Euclid–Mullin_sequence.
- Euclid–Mullin_sequence title "Euclid–Mullin Sequence".
- Euclid–Mullin_sequence urlname "Euclid-MullinSequence".
- Euclid–Mullin_sequence wikiPageUsesTemplate Template:As_of.
- Euclid–Mullin_sequence wikiPageUsesTemplate Template:Harvtxt.
- Euclid–Mullin_sequence wikiPageUsesTemplate Template:MathWorld.
- Euclid–Mullin_sequence wikiPageUsesTemplate Template:OEIS.
- Euclid–Mullin_sequence wikiPageUsesTemplate Template:Reflist.
- Euclid–Mullin_sequence wikiPageUsesTemplate Template:Unsolved.
- Euclid–Mullin_sequence subject Category:Integer_sequences.
- Euclid–Mullin_sequence subject Category:Prime_numbers.
- Euclid–Mullin_sequence subject Category:Unsolved_problems_in_mathematics.
- Euclid–Mullin_sequence comment "The Euclid–Mullin sequence is an infinite sequence of distinct prime numbers, in which each element is the least prime factor of one plus the product of all earlier elements. They are named after the ancient Greek mathematician Euclid, because their definition relies on an idea in Euclid's proof that there are infinitely many primes, and after Albert A.".
- Euclid–Mullin_sequence label "Euclid–Mullin sequence".
- Euclid–Mullin_sequence sameAs Sucesión_de_Euclides-Mullin.
- Euclid–Mullin_sequence sameAs m.02qdq7m.
- Euclid–Mullin_sequence sameAs Q5406148.
- Euclid–Mullin_sequence sameAs Q5406148.
- Euclid–Mullin_sequence wasDerivedFrom Euclid–Mullin_sequence?oldid=635860220.
- Euclid–Mullin_sequence isPrimaryTopicOf Euclid–Mullin_sequence.