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Search: id:A101188
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| A101188 |
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Values of n for which (7n+1)(8n+1)(11n+1) is a Carmichael number. |
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| 18, 216, 24966, 228246, 299790, 403806, 413046, 446310, 514686, 760470, 948966, 1019190, 1087566, 1355526, 1374006, 1471950, 1582830, 1715886, 2159406, 2266590, 2334966, 2589990, 2833926, 3652590, 3661830, 3720966, 3874350
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OFFSET
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1,1
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COMMENT
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All values of n are even (since there are no even Carmichael numbers). Small values happen to be congruent to 18 modulo 66. This first fails for a(34)=5206142, which yields the Carmichael number 86921811895459937817345 = (3*5*29*83777)*41649137*57267563. Below this, only 4 values of n (18, 216, 299790 and 446310) correspond to Carmichael numbers with at least 4 prime factors. Other values of n must be of the form 1848k+942, with k given by A101186.
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LINKS
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G. P. Michon, Generic Carmichael Numbers.
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EXAMPLE
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a(1)=18 corresponds to a 4-factor Carmichael number: 3664585 = 127*(5*29)*199.
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CROSSREFS
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Cf. A002997 (Carmichael numbers). A101186, A101187.
Sequence in context: A009470 A111991 A081136 this_sequence A019757 A021503 A025470
Adjacent sequences: A101185 A101186 A101187 this_sequence A101189 A101190 A101191
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KEYWORD
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nonn
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AUTHOR
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Gerard P. Michon (g.michon(AT)att.net), Dec 08 2004
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