خيلي دوست دارم در بارهي اعداد صلح آميز اطلاعاتي داشته باشم پس كمكم كنيد
خيلي ممنون
اعداد صلح آميز
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anishtain-math
محل اقامت: تهران
عضویت : پنجشنبه ۱۳۸۶/۱۱/۱۱ - ۱۵:۱۰
پست: 6-
اعداد صلح آميز
سلام
خيلي دوست دارم در بارهي اعداد صلح آميز اطلاعاتي داشته باشم پس كمكم كنيد
خيلي ممنون
خيلي دوست دارم در بارهي اعداد صلح آميز اطلاعاتي داشته باشم پس كمكم كنيد
خيلي ممنون
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ساسان معرفت
عضویت : پنجشنبه ۱۳۸۶/۱۲/۲ - ۲۳:۱۶
پست: 3-
تماس:
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anishtain-math
محل اقامت: تهران
عضویت : پنجشنبه ۱۳۸۶/۱۱/۱۱ - ۱۵:۱۰
پست: 6-
Amicable numbers are two different numbers so related that the sum of the proper divisors of the one is equal to the other, one being considered as a proper divisor but not the number itself. Such a pair is (220, 284); for the proper divisors of 220 are 1, 2, 4, 5, 10, 11, 20, 22, 44, 55 and 110, of which the sum is 284; and the proper divisors of 284 are 1, 2, 4, 71, and 142, of which the sum is 220. Amicable numbers were known to the Pythagoreans, who credited them with many mystical properties.
A pair of amicable numbers constitutes an aliquot sequence of period 2.
A general formula by which these numbers could be derived was invented circa 850 by Thabit ibn Qurra (826-901): if
p = 3 × 2^(n − 1) − 1,
q = 3 × 2^n − 1,
r = 9 × 2^(2n − 1) − 1,
where n > 1 is an integer and p, q, and r are prime numbers, then (2^n)pq and (2^n)r are a pair of amicable numbers. This formula gives the amicable pair (220, 284), as well as the pair (17296, 18416) and the pair (9363584, 9437056). The pair (6232, 6368) are amicable, but they cannot be derived from this formula. In fact, this formula produces amicable numbers for n = 2, 4, and 7, but for no other values below 20000.
In every known case, the numbers of a pair are either both even or both odd. It is not known whether an even-odd pair of amicable numbers exists. Also, every known pair shares at least one common factor. It is not known whether a pair of coprime amicable numbers exists, though if any does, the product of the two must be greater than 10^67. Also, a pair of coprime amicable numbers cannot be generated by Thabit's formula (above), nor by any similar formula.
Amicable numbers have been studied by Al Madshritti (died 1007), Abu Mansur Tahir al-Baghdadi (980-1037), Al-Farisi (1260-1320), René Descartes (1596-1650), to whom the formula of Thabit is sometimes ascribed, C. Rudolphus and others. Thabit's formula was generalized by Euler. The pair (9363584; 9437056) has often been attributed to Descartes, but it was actually first discovered by Muhammad Baqir Yazdi in Iran.[1]
The first few amicable pairs are: (220, 284), (1184, 1210), (2620, 2924), (5020, 5564), (6232, 6368) (sequence A063990 in OEIS)
If a number equals the sum of its own proper divisors, it is called a perfect number
From Wikipedia.
A pair of amicable numbers constitutes an aliquot sequence of period 2.
A general formula by which these numbers could be derived was invented circa 850 by Thabit ibn Qurra (826-901): if
p = 3 × 2^(n − 1) − 1,
q = 3 × 2^n − 1,
r = 9 × 2^(2n − 1) − 1,
where n > 1 is an integer and p, q, and r are prime numbers, then (2^n)pq and (2^n)r are a pair of amicable numbers. This formula gives the amicable pair (220, 284), as well as the pair (17296, 18416) and the pair (9363584, 9437056). The pair (6232, 6368) are amicable, but they cannot be derived from this formula. In fact, this formula produces amicable numbers for n = 2, 4, and 7, but for no other values below 20000.
In every known case, the numbers of a pair are either both even or both odd. It is not known whether an even-odd pair of amicable numbers exists. Also, every known pair shares at least one common factor. It is not known whether a pair of coprime amicable numbers exists, though if any does, the product of the two must be greater than 10^67. Also, a pair of coprime amicable numbers cannot be generated by Thabit's formula (above), nor by any similar formula.
Amicable numbers have been studied by Al Madshritti (died 1007), Abu Mansur Tahir al-Baghdadi (980-1037), Al-Farisi (1260-1320), René Descartes (1596-1650), to whom the formula of Thabit is sometimes ascribed, C. Rudolphus and others. Thabit's formula was generalized by Euler. The pair (9363584; 9437056) has often been attributed to Descartes, but it was actually first discovered by Muhammad Baqir Yazdi in Iran.[1]
The first few amicable pairs are: (220, 284), (1184, 1210), (2620, 2924), (5020, 5564), (6232, 6368) (sequence A063990 in OEIS)
If a number equals the sum of its own proper divisors, it is called a perfect number
From Wikipedia.
آخرین ویرایش توسط pulsar یکشنبه ۱۳۸۶/۱۲/۵ - ۱۷:۰۹, ویرایش شده کلا 1 بار
Beauty is truth, truth beauty
That is all ye know on earth
and all ye need to know
That is all ye know on earth
and all ye need to know
