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Super-Poulet number
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{{Short description|Type of Poulet number}} In [[number theory]], a '''super-Poulet number''' is a [[Poulet number]], or [[pseudoprime]] to [[Radix|base]] 2, whose every [[divisor]] <math>d</math> divides <math>2^d - 2</math>. For example, 341 is a super-Poulet number: it has positive divisors (1, 11, 31, 341), and we have: :(2<sup>11</sup> β 2) / 11 = 2046 / 11 = 186 :(2<sup>31</sup> β 2) / 31 = 2147483646 / 31 = 69273666 :(2<sup>341</sup> β 2) / 341 = 13136332798696798888899954724741608669335164206654835981818117894215788100763407304286671514789484550 When <math> \frac{ \Phi_n(2)}{gcd(n, \Phi_n(2))}</math> is [[Composite number|not prime]], then it and every divisor of it are a pseudoprime to base 2, and a super-Poulet number. The super-Poulet numbers below 10,000 are {{OEIS|id=A050217}}: {| class="wikitable" |- !n ! |- | 1 | 341 = 11 × 31 |- | 2 | 1387 = 19 × 73 |- | 3 | 2047 = 23 × 89 |- | 4 | 2701 = 37 × 73 |- | 5 | 3277 = 29 × 113 |- | 6 | 4033 = 37 × 109 |- | 7 | 4369 = 17 × 257 |- | 8 | 4681 = 31 × 151 |- | 9 | 5461 = 43 × 127 |- | 10 | 7957 = 73 × 109 |- | 11 | 8321 = 53 × 157 |- |} == Super-Poulet numbers with 3 or more distinct prime divisors == It is relatively easy to get super-Poulet numbers with 3 distinct prime divisors. If you find three Poulet numbers with three common prime factors, you get a super-Poulet number, as you built the product of the three prime factors. Example: 2701 = 37 * 73 is a Poulet number, 4033 = 37 * 109 is a Poulet number, 7957 = 73 * 109 is a Poulet number; so 294409 = 37 * 73 * 109 is a Poulet number too. Super-Poulet numbers with up to 7 distinct [[prime factor]]s you can get with the following numbers: <!-- from http://www.numericana.com/answer/pseudo.htm#poulet, from Gerard Michon --> *{ 103, 307, 2143, 2857, 6529, 11119, 131071 } *{ 709, 2833, 3541, 12037, 31153, 174877, 184081 } *{ 1861, 5581, 11161, 26041, 37201, 87421, 102301 } *{ 6421, 12841, 51361, 57781, 115561, 192601, 205441 } For example, 1118863200025063181061994266818401 = 6421 * 12841 * 51361 * 57781 * 115561 * 192601 * 205441 is a super-Poulet number with 7 distinct prime factors and 120 Poulet numbers. == External links == * {{mathworld|Super-PouletNumber}} *[https://www.numericana.com/answer/pseudo.htm#super Numericana] {{Classes of natural numbers}} [[Category:Integer sequences]]
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