French translation for "cousin prime"
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- nombres premiers cousins
- Example Sentences:
| 1. | It follows from the first Hardy–Littlewood conjecture that cousin primes have the same asymptotic density as twin primes. Il découle de la première Conjecture de Hardy-Littlewood que les nombres premiers cousins ont la même densité asymptotique que les nombres premiers jumeaux. | | 2. | As of May 2009 the largest known cousin prime was (p, p + 4) for p = (311778476 · 587502 · 9001# · (587502 · 9001# + 1) + 210)·(587502 · 9001# − 1)/35 + 1 where 9001# is a primorial. En mai 2009, le plus grand nombre premier cousin découvert (p, p + 4) était p = (311778476 · 587502 · 9001# · (587502 · 9001# + 1) + 210)·(587502 · 9001# − 1)/35 + 1 où 9001# est un primorielle. | | 3. | An analogue of Brun's constant for twin primes can be defined for cousin primes, called Brun's constant for cousin primes, with the initial term (3, 7) omitted, bu the convergent sum: B 4 = ( 1 7 + 1 11 ) + ( 1 13 + 1 17 ) + ( 1 19 + 1 23 ) + ⋯ . {\displaystyle B_{4}=\left({\frac {1}{7}}+{\frac {1}{11}}\right)+\left({\frac {1}{13}}+{\frac {1}{17}}\right)+\left({\frac {1}{19}}+{\frac {1}{23}}\right)+\cdots .} Using cousin primes up to 242, the value of B4 was estimated by Marek Wolf in 1996 as B4 ≈ 1.1970449. On peut définir, pour les nombres premiers cousins, un analogue de la constante de Brun associée aux nombres premiers jumeaux, en omettant le terme initial (3, 7) : B 4 = ( 1 7 + 1 11 ) + ( 1 13 + 1 17 ) + ( 1 19 + 1 23 ) + ⋯ | | 4. | An analogue of Brun's constant for twin primes can be defined for cousin primes, called Brun's constant for cousin primes, with the initial term (3, 7) omitted, bu the convergent sum: B 4 = ( 1 7 + 1 11 ) + ( 1 13 + 1 17 ) + ( 1 19 + 1 23 ) + ⋯ . {\displaystyle B_{4}=\left({\frac {1}{7}}+{\frac {1}{11}}\right)+\left({\frac {1}{13}}+{\frac {1}{17}}\right)+\left({\frac {1}{19}}+{\frac {1}{23}}\right)+\cdots .} Using cousin primes up to 242, the value of B4 was estimated by Marek Wolf in 1996 as B4 ≈ 1.1970449. On peut définir, pour les nombres premiers cousins, un analogue de la constante de Brun associée aux nombres premiers jumeaux, en omettant le terme initial (3, 7) : B 4 = ( 1 7 + 1 11 ) + ( 1 13 + 1 17 ) + ( 1 19 + 1 23 ) + ⋯ | | 5. | An analogue of Brun's constant for twin primes can be defined for cousin primes, called Brun's constant for cousin primes, with the initial term (3, 7) omitted, bu the convergent sum: B 4 = ( 1 7 + 1 11 ) + ( 1 13 + 1 17 ) + ( 1 19 + 1 23 ) + ⋯ . {\displaystyle B_{4}=\left({\frac {1}{7}}+{\frac {1}{11}}\right)+\left({\frac {1}{13}}+{\frac {1}{17}}\right)+\left({\frac {1}{19}}+{\frac {1}{23}}\right)+\cdots .} Using cousin primes up to 242, the value of B4 was estimated by Marek Wolf in 1996 as B4 ≈ 1.1970449. On peut définir, pour les nombres premiers cousins, un analogue de la constante de Brun associée aux nombres premiers jumeaux, en omettant le terme initial (3, 7) : B 4 = ( 1 7 + 1 11 ) + ( 1 13 + 1 17 ) + ( 1 19 + 1 23 ) + ⋯ |
- Similar Words:
- "cousin cousine" French translation, "cousin island" French translation, "cousin joe" French translation, "cousin kevin" French translation, "cousin marriage" French translation, "cousin skeeter" French translation, "cousin-german" French translation, "cousin-montauban ministry" French translation, "cousin\'s theorem" French translation
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