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| − | + | ==개요== | |
| − | * | + | * 페르마소수란 <math>F_n= 2^{2^n}+1</math> 형태의 소수 |
** 3,5,17,257, 65537 다섯 가지만 알려져 있음. | ** 3,5,17,257, 65537 다섯 가지만 알려져 있음. | ||
| + | * 페르마는 <math>F_n= 2^{2^n}+1</math> 가 모두 소수일 것이라 추측하였으나, 후에 [[오일러(1707-1783)|오일러]]는 반례를 발견:<math>F_5=641 \times 6700417</math> | ||
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| − | + | ==정다각형의 작도== | |
| − | + | * 정n각형이 자와 컴파스로 작도가능 <math>\iff</math> <math>n=2^k p_1 p_2 \cdots p_r</math> (k ,r은 0이상의 정수, <math>p_1, p_2, \cdots, p_r</math> 은 서로 다른 페르마소수) | |
| + | * [[정다각형의 작도]]와 [[가우스와 정17각형의 작도]] 항목을 참조 | ||
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| − | + | ==역사== | |
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| − | + | * [[수학사 연표]] | |
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| − | + | ==관련된 항목들== | |
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* [[정다각형의 작도]] | * [[정다각형의 작도]] | ||
* [[메르센 소수]] | * [[메르센 소수]] | ||
| − | + | [[분류:소수]] | |
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| − | + | == 노트 == | |
| − | < | + | ===말뭉치=== |
| + | # In fact, it is known that numbers of this form are not prime for values of n from 5 through 30, placing doubt on the existence of any Fermat primes for values of n > 4.<ref name="ref_edbed968">[https://www.britannica.com/science/Fermat-prime Fermat prime | mathematics]</ref> | ||
| + | # Fermat conjectured in 1650 that every Fermat number is prime and Eisenstein in 1844 proposed as a problem the proof that there are an infinite number of Fermat primes (Ribenboim 1996, p. 88).<ref name="ref_21863434">[https://mathworld.wolfram.com/FermatPrime.html Fermat Prime -- from Wolfram MathWorld]</ref> | ||
| + | # Based on these results, one might conjecture (as did Fermat) that all Fermat numbers are prime.<ref name="ref_77005ae2">[https://artofproblemsolving.com/wiki/index.php/Fermat_prime Art of Problem Solving]</ref> | ||
| + | # To find the Fermat number F n for an integer n , you first find m = 2 n , and then calculate 2 m + 1.<ref name="ref_7c2c701e">[https://www.techtarget.com/whatis/definition/Fermat-prime Definition from WhatIs.com]</ref> | ||
| + | # Surprisingly, Fermat primes arise in deciding whether a regular n-gon (a convex polygon with n equal sides) can be constructed with a compass and a straightedge.<ref name="ref_a529a8a6">[https://sites.millersville.edu/bikenaga/number-theory/fermat-numbers/fermat-numbers.pdf Fermat numbers]</ref> | ||
| + | # No fermat primes beyond (cid:8)4 have been found.<ref name="ref_a8ac433d">[http://www.math.ualberta.ca/~isaac/math324/s12/fermat_numbers.pdf Math 324 summer 2012]</ref> | ||
| + | # There are in(cid:12)nitely many distinct Fermat numbers, each of which is divisible by an odd prime, and since any two Fermat numbers are relatively prime, these odd primes must all be distinct.<ref name="ref_a8ac433d" /> | ||
| + | # + 1 is a Fermat number; such primes are called Fermat primes.<ref name="ref_44f407e6">[https://en.wikipedia.org/wiki/Fermat_number Fermat number]</ref> | ||
| + | # From the second equation, we can deduce Goldbach's theorem (named after Christian Goldbach): no two Fermat numbers share a common integer factor greater than 1.<ref name="ref_44f407e6" /> | ||
| + | # The sum of the reciprocals of all the Fermat numbers (sequence A051158 OEIS) is irrational.<ref name="ref_44f407e6" /> | ||
| + | # Indeed, the first five Fermat numbers F 0 , ..., F 4 are easily shown to be prime.<ref name="ref_44f407e6" /> | ||
| + | # The only known Fermat primes are the first five Fermat numbers: F 0 =3, F 1 =5, F 2 =17, F 3 =257, and F 4 =65537.<ref name="ref_fbf82f86">[https://primes.utm.edu/glossary/xpage/FermatNumber.html The Prime Glossary: Fermat number]</ref> | ||
| + | # It only takes two trial divisions to find this factor because Euler showed that every divisor of a Fermat number F n with n greater than 2 has the form k.2n+1+1 (exponent improved to n+2 by Lucas).<ref name="ref_fbf82f86" /> | ||
| + | # Now we know that all of the Fermat numbers are composite for the other n less than 31.<ref name="ref_fbf82f86" /> | ||
| + | # In other words, every prime of the form 2k + 1 (other than 2 = 20 + 1 ) is a Fermat number, and such primes are called Fermat primes.<ref name="ref_e81de8fb">[http://www.scientificlib.com/en/Mathematics/LX/FermatNumber.html Fermat number]</ref> | ||
| + | # From the last equation, we can deduce Goldbach's theorem (named after Christian Goldbach): no two Fermat numbers share a common integer factor greater than 1.<ref name="ref_e81de8fb" /> | ||
| + | # The sum of the reciprocals of all the Fermat numbers (sequence A051158 in OEIS) is irrational.<ref name="ref_e81de8fb" /> | ||
| + | # Indeed, the first five Fermat numbers F 0 ,...,F 4 are easily shown to be prime.<ref name="ref_e81de8fb" /> | ||
| + | # Indeed, even today, no other Fermat numbers are known to be prime!<ref name="ref_c596120d">[https://johncarlosbaez.wordpress.com/2019/02/05/fermat-primes-and-pascals-triangle/ Fermat Primes and Pascal’s Triangle]</ref> | ||
| + | # Also show that every product of distinct Fermat numbers corresponds to a row of Pascal’s triangle mod 2.<ref name="ref_c596120d" /> | ||
| + | # Now, Gauss showed that we can construct a regular n-gon using straight-edge and compass if n is a prime Fermat number.<ref name="ref_c596120d" /> | ||
| + | # Wantzel went further and showed that if n is odd, we can construct a regular n-gon using straight-edge and compass if and only if n is a product of distinct Fermat primes.<ref name="ref_c596120d" /> | ||
| + | # There are two definitions of the Fermat number.<ref name="ref_25205313">[https://mathworld.wolfram.com/FermatNumber.html Fermat Number -- from Wolfram MathWorld]</ref> | ||
| + | # The much more commonly encountered Fermat numbers are a special case, given by the binomial number of the form .<ref name="ref_25205313" /> | ||
| + | # Fermat conjectured in 1650 that every Fermat number is prime and Eisenstein proposed as a problem in 1844 the proof that there are an infinite number of Fermat primes (Ribenboim 1996, p. 88).<ref name="ref_25205313" /> | ||
| + | # At present, however, only composite Fermat numbers are known for .<ref name="ref_25205313" /> | ||
| + | # In other words, every prime of the form 2 n +1 is a Fermat number, and such primes are called Fermat primes.<ref name="ref_17d186c1">[https://www.rieselprime.de/ziki/Fermat_number Fermat number]</ref> | ||
| + | # From the last equation, we can deduce Goldbach's theorem: no two Fermat numbers share a common factor.<ref name="ref_17d186c1" /> | ||
| + | # Indeed, the first five Fermat numbers F 0 ,..., F 4 are easily shown to be prime.<ref name="ref_17d186c1" /> | ||
| + | # Although it is widely believed that there are only finitely many Fermat primes, it should be noted that there are some experts who disagree (John Cosgrave: "Fermat 6").<ref name="ref_17d186c1" /> | ||
| + | # A019434 List of Fermat primes: primes of form, for someIt is conjectured that there are only 5 terms.<ref name="ref_b3f9ea5b">[https://oeis.org/wiki/Fermat_primes Fermat primes]</ref> | ||
| + | # Numbers of the form F n =22n+1 are now called Fermat numbers*, and when they’re prime, they’re called Fermat primes.<ref name="ref_bfc52e99">[https://blogs.scientificamerican.com/roots-of-unity/extrapolation-gone-wrong-the-case-of-the-fermat-primes/ Extrapolation Gone Wrong: the Case of the Fermat Primes]</ref> | ||
| + | # Fermat conjectured that all Fermat numbers are prime.<ref name="ref_bfc52e99" /> | ||
| + | # In 1732, about 70 years after Fermat's death, Leonhard Euler factored the 5th Fermat number into 641×6,700,417, disproving Fermat’s conjecture.<ref name="ref_bfc52e99" /> | ||
| + | # So far, the only known Fermat primes are the ones that were known to Fermat.<ref name="ref_bfc52e99" /> | ||
| + | # Is there a formula or a way to know which of the Fermat numbers are prime?.<ref name="ref_dc7c427d">[https://math.stackexchange.com/questions/563390/fermat-numbers-are-they-all-prime Fermat numbers. Are they all prime?]</ref> | ||
| + | # Prologue What are the known Fermat primes?<ref name="ref_b2c9d49a">[https://arxiv.org/pdf/1605.01371 This is the extended version of a paper that has appeared in the Mathematical Intelligencer. The final publication is available]</ref> | ||
| + | # Taking Fermat prime to mean prime of the form 2n + 1, there are six known Fermat primes, namely those for n = 0, 1, 2, 4, 8, 16.<ref name="ref_b2c9d49a" /> | ||
| + | # We shall pronounce the last letter of Fermats name, as he did, when we include 2 among the Fermat primes, as he did.<ref name="ref_b2c9d49a" /> | ||
| + | # The Fermat number Fn is either prime or not prime: the question of how to approximate the probability of primality for a general n is delicate.<ref name="ref_b2c9d49a" /> | ||
| + | # Fb;n = b2n + 1 and are particularly interesting since they have many characteristics of the heavily studied standard Fermat numbers Fn = F2;n.<ref name="ref_a10cb56f">[https://www.ams.org/journals/mcom/2002-71-238/S0025-5718-01-01350-3/S0025-5718-01-01350-3.pdf Mathematics of computation]</ref> | ||
| + | # The \Proth" program was created in 1997 to extend the search for large factors of Fermat numbers.<ref name="ref_a10cb56f" /> | ||
| + | # They are called Fermat numbers, named after the French mathematician Pierre de Fermat (1601 1665) who first studied numbers in this form.<ref name="ref_8f117ada">[https://wstein.org/edu/2010/414/projects/tsang.pdf Fermat]</ref> | ||
| + | # We will not be able to answer this question in this paper, but we will prove some basic properties of Fermat numbers and discuss their primality and divisibility.<ref name="ref_8f117ada" /> | ||
| + | # Primes in this form are called Fermat primes.<ref name="ref_8f117ada" /> | ||
| + | # Up-to-date there are only five known Fermat primes.<ref name="ref_8f117ada" /> | ||
| + | # Moreover, no other Fermat number is known to be prime for n > 4 , so now it is conjectured that those are all prime Fermat numbers.<ref name="ref_6428f90c">[https://planetmath.org/fermatnumbers Fermat numbers]</ref> | ||
| + | # In honour of the inspired pioneers, the numbers of the form 2n-1 are now called the Mersenne numbers and the numbers of the form 2n+1 the Fermat numbers.<ref name="ref_e35d89c0">[http://yves.gallot.pagesperso-orange.fr/primes/ Generalized Fermat Primes Search]</ref> | ||
| + | # The search for Mersenne and Fermat primes has been greatly extended since the 17th century.<ref name="ref_e35d89c0" /> | ||
| + | # Today, all the Mersenne primes having less than 2,000,000 digits are known and all the Fermat primes up to 2,000,000,000 digits!<ref name="ref_e35d89c0" /> | ||
| + | # In 1994, R. Crandall and B. Fagin discovered that the Discrete Weighted Transforms could be used to double the speed of the search for Mersenne and Fermat numbers.<ref name="ref_e35d89c0" /> | ||
| + | # Those are the only primes below 100,000 that I could show must be primitive for all but finitely many Fermat primes.<ref name="ref_9d437e74">[https://www.ocf.berkeley.edu/~wwu/cgi-bin/yabb/YaBB.cgi?board=riddles_putnam;action=display;num=1204796915 Fermat Primes and the number 7]</ref> | ||
| + | # Fermat numbers are named after Pierre de Fermat.<ref name="ref_a462b554">[https://kids.kiddle.co/Fermat_number Fermat number facts for kids]</ref> | ||
| + | # Every prime of the form 2n + 1 is a Fermat number, and such primes are called Fermat primes.<ref name="ref_a462b554" /> | ||
| + | # Fermat numbers can be calculated recursively: To get the Nth number, multiply all Fermat numbers before it, and add two to the result.<ref name="ref_a462b554" /> | ||
| + | # Two previous posts (here and here) present an alternative proof that there are infinitely many prime numbers using the Fermat numbers.<ref name="ref_e5ed5592">[https://exploringnumbertheory.wordpress.com/2016/10/25/fermat-numbers/ Exploring Number Theory]</ref> | ||
| + | # Specifically, the proof is accomplished by pointing out that the prime factors of the Fermat numbers form an infinite set.<ref name="ref_e5ed5592" /> | ||
| + | # The numbers grow very rapidly since each Fermat number is obtained by raising 2 to a power of 2.<ref name="ref_e5ed5592" /> | ||
| + | # He demonstrated that the first 5 Fermat numbers , , , , are prime and conjectured that all Fermat numbers are prime.<ref name="ref_e5ed5592" /> | ||
| + | # Chapter 4 Fermat and Mersenne Primes 4.1 Fermat primes Theorem 4.1.<ref name="ref_7befcda2">[https://www.maths.tcd.ie/pub/Maths/Courseware/NumberTheory/FermatMersenne.pdf Chapter 4]</ref> | ||
| + | # Fermat conjectured that the Fermat numbers are all prime.<ref name="ref_7befcda2" /> | ||
| + | # We will come back to their solution shortly as we must first introduce the notion of a Fermat prime!<ref name="ref_62f9f1ec">[https://vrs.amsi.org.au/fermat-primes-gauss-wantzel/ Fermat Primes and the Gauss-Wantzel Theorem]</ref> | ||
| + | # In the 1600s, a mathematician and lawyer named Pierre de Fermat studied numbers of the form 2^n+1 (where n=2^k) which are now called Fermat numbers.<ref name="ref_62f9f1ec" /> | ||
| + | # So, he conjectured that all Fermat numbers are prime.<ref name="ref_62f9f1ec" /> | ||
| + | # Funnily enough, it was shown by Leonhard Euler in 1732 (another famous mathematician), that only the next Fermat number is not prime.<ref name="ref_62f9f1ec" /> | ||
| + | # It is still open whether there exist innitely many Fermat primes or innitely many composite Fermat numbers.<ref name="ref_0b05fdb4">[https://arxiv.org/pdf/2204.08302 MINIMALITY CONDITIONS EQUIVALENT TO THE FINITUDE OF FERMAT AND MERSENNE PRIMES]</ref> | ||
| + | # Especially, the formula for modulo Fermat primes is given. MSC2010: 11A07.<ref name="ref_9c963bc5">[https://arxiv.org/pdf/1601.06509 The largest cycles consist by the quadratic residues and Fermat primes]</ref> | ||
| + | # For the Fermat primes, i.e., the prime numbers of the form p 22k ` 1, we have Lppq 1. Proof.<ref name="ref_9c963bc5" /> | ||
| + | # We have veried it for k 0, 1, 2, 3, 4, the known Fermat primes.<ref name="ref_9c963bc5" /> | ||
| + | # As of 2021, the only known Fermat primes are F0 = 3, F1 = 5, F2 = 17, F3 = 257, and F4 = 65537.<ref name="ref_49cdcbc7">[https://arxiv.org/pdf/1912.12088 MINIMALITY OF TOPOLOGICAL MATRIX GROUPS AND FERMAT PRIMES]</ref> | ||
| + | # For an odd prime p the following conditions are equivalent: (1) p is a Fermat prime; (2) SL(p 1, (Q, p)) is minimal; (3) SL(p 1, Q(i)) is minimal.<ref name="ref_49cdcbc7" /> | ||
| + | # We determine all the Carmichael numbers m with a Fermat prime factor such that L = 2P 2, where k N and P is an odd prime number.<ref name="ref_f1f90697">[https://arxiv.org/pdf/1710.01321 On the finiteness of Carmichael numbers with Fermat factors and L = 2αP 2.]</ref> | ||
| + | # We assume that m is divisible by at least one of the known Fermat prime numbers.<ref name="ref_f1f90697" /> | ||
| + | # If m is divisible by one of the known Fermat primes, then m must be one of the following 11 Carmichael numbers.<ref name="ref_f1f90697" /> | ||
| + | # Let 2 R R 22, there exists a generalized Fermat prime p = r2 2 be an integer.<ref name="ref_25a71c73">[https://arxiv.org/pdf/1502.02800 FAST INTEGER MULTIPLICATION USING GENERALIZED FERMAT PRIMES]</ref> | ||
| + | # The key concept of our algorithm is the use of a chain of generalized Fermat primes (of the form r2 +1) to handle recursive calls.<ref name="ref_25a71c73" /> | ||
| + | # First, we encode integers to be multiplied as integers modulo generalized Fermat primes, and not as polynomials.<ref name="ref_25a71c73" /> | ||
| + | # Section 4 studies generalized Fermat primes, and their relation to the Bateman-Horn conjecture.<ref name="ref_25a71c73" /> | ||
| + | # 1. Introduction + 1 for n The Fermat numbers are given by Fn = 22n 0.<ref name="ref_4a2a6fd4">[https://arxiv.org/pdf/2102.00906 ON UPPER BOUNDS FOR THE COUNT OF ELITE PRIMES Matthew Just]</ref> | ||
| + | # Notice that the rst ve Fermat numbers are prime, and it was initially conjectured (by Fermat) that all such num- bers are prime.<ref name="ref_4a2a6fd4" /> | ||
| + | # The sixth Fermat number is not prime, and no other Fermat primes are known.<ref name="ref_4a2a6fd4" /> | ||
| + | # An ecient test exists to determine whether or not a Fermat number is prime, called Pepins test.<ref name="ref_4a2a6fd4" /> | ||
| + | # This characterization uses uniquely values at most equal to tested Fermat number.<ref name="ref_bca905b7">[https://arxiv.org/pdf/2104.04875 A NEW CHARACTERIZATION OF PRIME FERMAT’S NUMBERS]</ref> | ||
| + | # We actually are able to establish the direct implication which is a real important result in the primality tests for Fermat numbers.<ref name="ref_bca905b7" /> | ||
| + | # Condition 2m + = pn requires p to be either a Mersenne or Fermat prime.<ref name="ref_4393ff84">[https://arxiv.org/pdf/1809.03328 On Upper Bounds with ABC = 2mpn and ABC = 2mpnqr with p and q as Mersenne or Fermat]</ref> | ||
| − | + | ===소스=== | |
| − | + | <references /> | |
| − | |||
| − | |||
| − | + | == 메타데이터 == | |
| − | * | + | ===위키데이터=== |
| + | * ID : [https://www.wikidata.org/wiki/Q207264 Q207264] | ||
| + | ===Spacy 패턴 목록=== | ||
| + | * [{'LOWER': 'fermat'}, {'LEMMA': 'prime'}] | ||
| + | * [{'LOWER': 'fermat'}, {'LEMMA': 'number'}] | ||
2022년 9월 16일 (금) 02:47 기준 최신판
개요
- 페르마소수란 \(F_n= 2^{2^n}+1\) 형태의 소수
- 3,5,17,257, 65537 다섯 가지만 알려져 있음.
- 페르마는 \(F_n= 2^{2^n}+1\) 가 모두 소수일 것이라 추측하였으나, 후에 오일러는 반례를 발견\[F_5=641 \times 6700417\]
정다각형의 작도
- 정n각형이 자와 컴파스로 작도가능 \(\iff\) \(n=2^k p_1 p_2 \cdots p_r\) (k ,r은 0이상의 정수, \(p_1, p_2, \cdots, p_r\) 은 서로 다른 페르마소수)
- 정다각형의 작도와 가우스와 정17각형의 작도 항목을 참조
역사
관련된 항목들
노트
말뭉치
- In fact, it is known that numbers of this form are not prime for values of n from 5 through 30, placing doubt on the existence of any Fermat primes for values of n > 4.[1]
- Fermat conjectured in 1650 that every Fermat number is prime and Eisenstein in 1844 proposed as a problem the proof that there are an infinite number of Fermat primes (Ribenboim 1996, p. 88).[2]
- Based on these results, one might conjecture (as did Fermat) that all Fermat numbers are prime.[3]
- To find the Fermat number F n for an integer n , you first find m = 2 n , and then calculate 2 m + 1.[4]
- Surprisingly, Fermat primes arise in deciding whether a regular n-gon (a convex polygon with n equal sides) can be constructed with a compass and a straightedge.[5]
- No fermat primes beyond (cid:8)4 have been found.[6]
- There are in(cid:12)nitely many distinct Fermat numbers, each of which is divisible by an odd prime, and since any two Fermat numbers are relatively prime, these odd primes must all be distinct.[6]
- + 1 is a Fermat number; such primes are called Fermat primes.[7]
- From the second equation, we can deduce Goldbach's theorem (named after Christian Goldbach): no two Fermat numbers share a common integer factor greater than 1.[7]
- The sum of the reciprocals of all the Fermat numbers (sequence A051158 OEIS) is irrational.[7]
- Indeed, the first five Fermat numbers F 0 , ..., F 4 are easily shown to be prime.[7]
- The only known Fermat primes are the first five Fermat numbers: F 0 =3, F 1 =5, F 2 =17, F 3 =257, and F 4 =65537.[8]
- It only takes two trial divisions to find this factor because Euler showed that every divisor of a Fermat number F n with n greater than 2 has the form k.2n+1+1 (exponent improved to n+2 by Lucas).[8]
- Now we know that all of the Fermat numbers are composite for the other n less than 31.[8]
- In other words, every prime of the form 2k + 1 (other than 2 = 20 + 1 ) is a Fermat number, and such primes are called Fermat primes.[9]
- From the last equation, we can deduce Goldbach's theorem (named after Christian Goldbach): no two Fermat numbers share a common integer factor greater than 1.[9]
- The sum of the reciprocals of all the Fermat numbers (sequence A051158 in OEIS) is irrational.[9]
- Indeed, the first five Fermat numbers F 0 ,...,F 4 are easily shown to be prime.[9]
- Indeed, even today, no other Fermat numbers are known to be prime![10]
- Also show that every product of distinct Fermat numbers corresponds to a row of Pascal’s triangle mod 2.[10]
- Now, Gauss showed that we can construct a regular n-gon using straight-edge and compass if n is a prime Fermat number.[10]
- Wantzel went further and showed that if n is odd, we can construct a regular n-gon using straight-edge and compass if and only if n is a product of distinct Fermat primes.[10]
- There are two definitions of the Fermat number.[11]
- The much more commonly encountered Fermat numbers are a special case, given by the binomial number of the form .[11]
- Fermat conjectured in 1650 that every Fermat number is prime and Eisenstein proposed as a problem in 1844 the proof that there are an infinite number of Fermat primes (Ribenboim 1996, p. 88).[11]
- At present, however, only composite Fermat numbers are known for .[11]
- In other words, every prime of the form 2 n +1 is a Fermat number, and such primes are called Fermat primes.[12]
- From the last equation, we can deduce Goldbach's theorem: no two Fermat numbers share a common factor.[12]
- Indeed, the first five Fermat numbers F 0 ,..., F 4 are easily shown to be prime.[12]
- Although it is widely believed that there are only finitely many Fermat primes, it should be noted that there are some experts who disagree (John Cosgrave: "Fermat 6").[12]
- A019434 List of Fermat primes: primes of form, for someIt is conjectured that there are only 5 terms.[13]
- Numbers of the form F n =22n+1 are now called Fermat numbers*, and when they’re prime, they’re called Fermat primes.[14]
- Fermat conjectured that all Fermat numbers are prime.[14]
- In 1732, about 70 years after Fermat's death, Leonhard Euler factored the 5th Fermat number into 641×6,700,417, disproving Fermat’s conjecture.[14]
- So far, the only known Fermat primes are the ones that were known to Fermat.[14]
- Is there a formula or a way to know which of the Fermat numbers are prime?.[15]
- Prologue What are the known Fermat primes?[16]
- Taking Fermat prime to mean prime of the form 2n + 1, there are six known Fermat primes, namely those for n = 0, 1, 2, 4, 8, 16.[16]
- We shall pronounce the last letter of Fermats name, as he did, when we include 2 among the Fermat primes, as he did.[16]
- The Fermat number Fn is either prime or not prime: the question of how to approximate the probability of primality for a general n is delicate.[16]
- Fb;n = b2n + 1 and are particularly interesting since they have many characteristics of the heavily studied standard Fermat numbers Fn = F2;n.[17]
- The \Proth" program was created in 1997 to extend the search for large factors of Fermat numbers.[17]
- They are called Fermat numbers, named after the French mathematician Pierre de Fermat (1601 1665) who first studied numbers in this form.[18]
- We will not be able to answer this question in this paper, but we will prove some basic properties of Fermat numbers and discuss their primality and divisibility.[18]
- Primes in this form are called Fermat primes.[18]
- Up-to-date there are only five known Fermat primes.[18]
- Moreover, no other Fermat number is known to be prime for n > 4 , so now it is conjectured that those are all prime Fermat numbers.[19]
- In honour of the inspired pioneers, the numbers of the form 2n-1 are now called the Mersenne numbers and the numbers of the form 2n+1 the Fermat numbers.[20]
- The search for Mersenne and Fermat primes has been greatly extended since the 17th century.[20]
- Today, all the Mersenne primes having less than 2,000,000 digits are known and all the Fermat primes up to 2,000,000,000 digits![20]
- In 1994, R. Crandall and B. Fagin discovered that the Discrete Weighted Transforms could be used to double the speed of the search for Mersenne and Fermat numbers.[20]
- Those are the only primes below 100,000 that I could show must be primitive for all but finitely many Fermat primes.[21]
- Fermat numbers are named after Pierre de Fermat.[22]
- Every prime of the form 2n + 1 is a Fermat number, and such primes are called Fermat primes.[22]
- Fermat numbers can be calculated recursively: To get the Nth number, multiply all Fermat numbers before it, and add two to the result.[22]
- Two previous posts (here and here) present an alternative proof that there are infinitely many prime numbers using the Fermat numbers.[23]
- Specifically, the proof is accomplished by pointing out that the prime factors of the Fermat numbers form an infinite set.[23]
- The numbers grow very rapidly since each Fermat number is obtained by raising 2 to a power of 2.[23]
- He demonstrated that the first 5 Fermat numbers , , , , are prime and conjectured that all Fermat numbers are prime.[23]
- Chapter 4 Fermat and Mersenne Primes 4.1 Fermat primes Theorem 4.1.[24]
- Fermat conjectured that the Fermat numbers are all prime.[24]
- We will come back to their solution shortly as we must first introduce the notion of a Fermat prime![25]
- In the 1600s, a mathematician and lawyer named Pierre de Fermat studied numbers of the form 2^n+1 (where n=2^k) which are now called Fermat numbers.[25]
- So, he conjectured that all Fermat numbers are prime.[25]
- Funnily enough, it was shown by Leonhard Euler in 1732 (another famous mathematician), that only the next Fermat number is not prime.[25]
- It is still open whether there exist innitely many Fermat primes or innitely many composite Fermat numbers.[26]
- Especially, the formula for modulo Fermat primes is given. MSC2010: 11A07.[27]
- For the Fermat primes, i.e., the prime numbers of the form p 22k ` 1, we have Lppq 1. Proof.[27]
- We have veried it for k 0, 1, 2, 3, 4, the known Fermat primes.[27]
- As of 2021, the only known Fermat primes are F0 = 3, F1 = 5, F2 = 17, F3 = 257, and F4 = 65537.[28]
- For an odd prime p the following conditions are equivalent: (1) p is a Fermat prime; (2) SL(p 1, (Q, p)) is minimal; (3) SL(p 1, Q(i)) is minimal.[28]
- We determine all the Carmichael numbers m with a Fermat prime factor such that L = 2P 2, where k N and P is an odd prime number.[29]
- We assume that m is divisible by at least one of the known Fermat prime numbers.[29]
- If m is divisible by one of the known Fermat primes, then m must be one of the following 11 Carmichael numbers.[29]
- Let 2 R R 22, there exists a generalized Fermat prime p = r2 2 be an integer.[30]
- The key concept of our algorithm is the use of a chain of generalized Fermat primes (of the form r2 +1) to handle recursive calls.[30]
- First, we encode integers to be multiplied as integers modulo generalized Fermat primes, and not as polynomials.[30]
- Section 4 studies generalized Fermat primes, and their relation to the Bateman-Horn conjecture.[30]
- 1. Introduction + 1 for n The Fermat numbers are given by Fn = 22n 0.[31]
- Notice that the rst ve Fermat numbers are prime, and it was initially conjectured (by Fermat) that all such num- bers are prime.[31]
- The sixth Fermat number is not prime, and no other Fermat primes are known.[31]
- An ecient test exists to determine whether or not a Fermat number is prime, called Pepins test.[31]
- This characterization uses uniquely values at most equal to tested Fermat number.[32]
- We actually are able to establish the direct implication which is a real important result in the primality tests for Fermat numbers.[32]
- Condition 2m + = pn requires p to be either a Mersenne or Fermat prime.[33]
소스
- ↑ Fermat prime | mathematics
- ↑ Fermat Prime -- from Wolfram MathWorld
- ↑ Art of Problem Solving
- ↑ Definition from WhatIs.com
- ↑ Fermat numbers
- ↑ 6.0 6.1 Math 324 summer 2012
- ↑ 7.0 7.1 7.2 7.3 Fermat number
- ↑ 8.0 8.1 8.2 The Prime Glossary: Fermat number
- ↑ 9.0 9.1 9.2 9.3 Fermat number
- ↑ 10.0 10.1 10.2 10.3 Fermat Primes and Pascal’s Triangle
- ↑ 11.0 11.1 11.2 11.3 Fermat Number -- from Wolfram MathWorld
- ↑ 12.0 12.1 12.2 12.3 Fermat number
- ↑ Fermat primes
- ↑ 14.0 14.1 14.2 14.3 Extrapolation Gone Wrong: the Case of the Fermat Primes
- ↑ Fermat numbers. Are they all prime?
- ↑ 16.0 16.1 16.2 16.3 This is the extended version of a paper that has appeared in the Mathematical Intelligencer. The final publication is available
- ↑ 17.0 17.1 Mathematics of computation
- ↑ 18.0 18.1 18.2 18.3 Fermat
- ↑ Fermat numbers
- ↑ 20.0 20.1 20.2 20.3 Generalized Fermat Primes Search
- ↑ Fermat Primes and the number 7
- ↑ 22.0 22.1 22.2 Fermat number facts for kids
- ↑ 23.0 23.1 23.2 23.3 Exploring Number Theory
- ↑ 24.0 24.1 Chapter 4
- ↑ 25.0 25.1 25.2 25.3 Fermat Primes and the Gauss-Wantzel Theorem
- ↑ MINIMALITY CONDITIONS EQUIVALENT TO THE FINITUDE OF FERMAT AND MERSENNE PRIMES
- ↑ 27.0 27.1 27.2 The largest cycles consist by the quadratic residues and Fermat primes
- ↑ 28.0 28.1 MINIMALITY OF TOPOLOGICAL MATRIX GROUPS AND FERMAT PRIMES
- ↑ 29.0 29.1 29.2 On the finiteness of Carmichael numbers with Fermat factors and L = 2αP 2.
- ↑ 30.0 30.1 30.2 30.3 FAST INTEGER MULTIPLICATION USING GENERALIZED FERMAT PRIMES
- ↑ 31.0 31.1 31.2 31.3 ON UPPER BOUNDS FOR THE COUNT OF ELITE PRIMES Matthew Just
- ↑ 32.0 32.1 A NEW CHARACTERIZATION OF PRIME FERMAT’S NUMBERS
- ↑ On Upper Bounds with ABC = 2mpn and ABC = 2mpnqr with p and q as Mersenne or Fermat
메타데이터
위키데이터
- ID : Q207264
Spacy 패턴 목록
- [{'LOWER': 'fermat'}, {'LEMMA': 'prime'}]
- [{'LOWER': 'fermat'}, {'LEMMA': 'number'}]