| rdfs:comment
| - Un carré magique d'inverses de nombres premiers est un carré magique qui peut être obtenu en écrivant sur lignes successives le développement décimal des divisions de , ... . Le plus petit nombre à avoir cette propriété est le 19. (fr)
- A prime reciprocal magic square is a magic square using the decimal digits of the reciprocal of a prime number. Consider a unit fraction, like 1/3 or 1/7. In base ten, the remainder, and so the digits, of 1/3 repeats at once: 0.3333... . However, the remainders of 1/7 repeat over six, or 7−1, digits: 1/7 = 0·142857142857142857... If you examine the multiples of 1/7, you can see that each is a cyclic permutation of these six digits: 1/7 = 0·1 4 2 8 5 7...2/7 = 0·2 8 5 7 1 4...3/7 = 0·4 2 8 5 7 1...4/7 = 0·5 7 1 4 2 8...5/7 = 0·7 1 4 2 8 5...6/7 = 0·8 5 7 1 4 2... (en)
- 素数倒数幻方(prime reciprocal magic square)是指用素数倒数及其倍數的循環小數各位數組成的幻方。有些素数的倒数則可以形成對角線和也滿足條件的幻方。 考慮在十進制下的1/7,其小數為循環小數1/7 = 0·142857142857142857...,若再考慮其倍數,會看到這六個數字的: 1/7 = 0·1 4 2 8 5 7...2/7 = 0·2 8 5 7 1 4...3/7 = 0·4 2 8 5 7 1...4/7 = 0·5 7 1 4 2 8...5/7 = 0·7 1 4 2 8 5...6/7 = 0·8 5 7 1 4 2... 若用上述數字形成方陣,每一列的和是1+4+2+8+5+7,即為27,每一行的和也是27,若不考慮對角線,因此可以形成一個幻方: 1 4 2 8 5 72 8 5 7 1 44 2 8 5 7 15 7 1 4 2 87 1 4 2 8 58 5 7 1 4 2 不過其對角線不是27。 考慮1/19的倍數,下一行是上一行的二倍,而小數位數似乎右移一位: 分子乘以2會讓小數的位數右移一位: 在1/19形成的方陣中,其最大週期為18,每一行及每一列的和是81,而且對角線也是81,完全符合幻方的條件: 在各素數在不同進制下,也可能會有相同的現象,以下是列表,列出素數、進制以及幻方和 ((進制-1) 乘 (素數-1) / 2: (zh)
|
| has abstract
| - Un carré magique d'inverses de nombres premiers est un carré magique qui peut être obtenu en écrivant sur lignes successives le développement décimal des divisions de , ... . Le plus petit nombre à avoir cette propriété est le 19. (fr)
- A prime reciprocal magic square is a magic square using the decimal digits of the reciprocal of a prime number. Consider a unit fraction, like 1/3 or 1/7. In base ten, the remainder, and so the digits, of 1/3 repeats at once: 0.3333... . However, the remainders of 1/7 repeat over six, or 7−1, digits: 1/7 = 0·142857142857142857... If you examine the multiples of 1/7, you can see that each is a cyclic permutation of these six digits: 1/7 = 0·1 4 2 8 5 7...2/7 = 0·2 8 5 7 1 4...3/7 = 0·4 2 8 5 7 1...4/7 = 0·5 7 1 4 2 8...5/7 = 0·7 1 4 2 8 5...6/7 = 0·8 5 7 1 4 2... If the digits are laid out as a square, each row will sum to 1+4+2+8+5+7, or 27, and only slightly less obvious that each column will also do so, and consequently we have a magic square: 1 4 2 8 5 72 8 5 7 1 44 2 8 5 7 15 7 1 4 2 87 1 4 2 8 58 5 7 1 4 2 However, neither diagonal sums to 27, but all other prime reciprocals in base ten with maximum period of p−1 produce squares in which all rows and columns sum to the same total. Other properties of prime reciprocals: Midy's theorem The repeating pattern of an even number of digits [7-1, 11-1, 13-1, 17-1, 19-1, 23-1, 29-1, 47-1, 59-1, 61-1, 73-1, 89-1, 97-1, 101-1, ...] in the quotients when broken in half are the nines-complement of each half: 1/7 = 0.142,857,142,857 ... +0.857,142 --------- 0.999,9991/11 = 0.09090,90909 ... +0.90909,09090 ----- 0.99999,999991/13 = 0.076,923 076,923 ... +0.923,076 --------- 0.999,9991/17 = 0.05882352,94117647 +0.94117647,05882352 ------------------- 0.99999999,999999991/19 = 0.052631578,947368421 ... +0.947368421,052631578 ---------------------- 0.999999999,999999999 Ekidhikena Purvena From: Bharati Krishna Tirtha's Vedic mathematics#By one more than the one before Concerning the number of decimal places shifted in the quotient per multiple of 1/19: 01/19 = 0.052631578,94736842102/19 = 0.1052631578,9473684204/19 = 0.21052631578,947368408/19 = 0.421052631578,94736816/19 = 0.8421052631578,94736 A factor of 2 in the numerator produces a shift of one decimal place to the right in the quotient. In the square from 1/19, with maximum period 18 and row-and-column total of 81, both diagonals also sum to 81, and this square is therefore fully magic:01/19 = 0·0 5 2 6 3 1 5 7 8 9 4 7 3 6 8 4 2 1...02/19 = 0·1 0 5 2 6 3 1 5 7 8 9 4 7 3 6 8 4 2...03/19 = 0·1 5 7 8 9 4 7 3 6 8 4 2 1 0 5 2 6 3...04/19 = 0·2 1 0 5 2 6 3 1 5 7 8 9 4 7 3 6 8 4...05/19 = 0·2 6 3 1 5 7 8 9 4 7 3 6 8 4 2 1 0 5...06/19 = 0·3 1 5 7 8 9 4 7 3 6 8 4 2 1 0 5 2 6...07/19 = 0·3 6 8 4 2 1 0 5 2 6 3 1 5 7 8 9 4 7...08/19 = 0·4 2 1 0 5 2 6 3 1 5 7 8 9 4 7 3 6 8...09/19 = 0·4 7 3 6 8 4 2 1 0 5 2 6 3 1 5 7 8 9...10/19 = 0·5 2 6 3 1 5 7 8 9 4 7 3 6 8 4 2 1 0...11/19 = 0·5 7 8 9 4 7 3 6 8 4 2 1 0 5 2 6 3 1...12/19 = 0·6 3 1 5 7 8 9 4 7 3 6 8 4 2 1 0 5 2...13/19 = 0·6 8 4 2 1 0 5 2 6 3 1 5 7 8 9 4 7 3...14/19 = 0·7 3 6 8 4 2 1 0 5 2 6 3 1 5 7 8 9 4...15/19 = 0·7 8 9 4 7 3 6 8 4 2 1 0 5 2 6 3 1 5...16/19 = 0·8 4 2 1 0 5 2 6 3 1 5 7 8 9 4 7 3 6...17/19 = 0·8 9 4 7 3 6 8 4 2 1 0 5 2 6 3 1 5 7...18/19 = 0·9 4 7 3 6 8 4 2 1 0 5 2 6 3 1 5 7 8... The same phenomenon occurs with other primes in other bases, and the following table lists some of them, giving the prime, base, and magic total (derived from the formula base−1 × prime−1 / 2): (en)
- 素数倒数幻方(prime reciprocal magic square)是指用素数倒数及其倍數的循環小數各位數組成的幻方。有些素数的倒数則可以形成對角線和也滿足條件的幻方。 考慮在十進制下的1/7,其小數為循環小數1/7 = 0·142857142857142857...,若再考慮其倍數,會看到這六個數字的: 1/7 = 0·1 4 2 8 5 7...2/7 = 0·2 8 5 7 1 4...3/7 = 0·4 2 8 5 7 1...4/7 = 0·5 7 1 4 2 8...5/7 = 0·7 1 4 2 8 5...6/7 = 0·8 5 7 1 4 2... 若用上述數字形成方陣,每一列的和是1+4+2+8+5+7,即為27,每一行的和也是27,若不考慮對角線,因此可以形成一個幻方: 1 4 2 8 5 72 8 5 7 1 44 2 8 5 7 15 7 1 4 2 87 1 4 2 8 58 5 7 1 4 2 不過其對角線不是27。 考慮1/19的倍數,下一行是上一行的二倍,而小數位數似乎右移一位: 01/19 = 0.052631578,94736842102/19 = 0.1052631578,9473684204/19 = 0.21052631578,947368408/19 = 0.421052631578,94736816/19 = 0.8421052631578,94736 分子乘以2會讓小數的位數右移一位: 在1/19形成的方陣中,其最大週期為18,每一行及每一列的和是81,而且對角線也是81,完全符合幻方的條件: 01/19 = 0·0 5 2 6 3 1 5 7 8 9 4 7 3 6 8 4 2 1...02/19 = 0·1 0 5 2 6 3 1 5 7 8 9 4 7 3 6 8 4 2...03/19 = 0·1 5 7 8 9 4 7 3 6 8 4 2 1 0 5 2 6 3...04/19 = 0·2 1 0 5 2 6 3 1 5 7 8 9 4 7 3 6 8 4...05/19 = 0·2 6 3 1 5 7 8 9 4 7 3 6 8 4 2 1 0 5...06/19 = 0·3 1 5 7 8 9 4 7 3 6 8 4 2 1 0 5 2 6...07/19 = 0·3 6 8 4 2 1 0 5 2 6 3 1 5 7 8 9 4 7...08/19 = 0·4 2 1 0 5 2 6 3 1 5 7 8 9 4 7 3 6 8...09/19 = 0·4 7 3 6 8 4 2 1 0 5 2 6 3 1 5 7 8 9...10/19 = 0·5 2 6 3 1 5 7 8 9 4 7 3 6 8 4 2 1 0...11/19 = 0·5 7 8 9 4 7 3 6 8 4 2 1 0 5 2 6 3 1...12/19 = 0·6 3 1 5 7 8 9 4 7 3 6 8 4 2 1 0 5 2...13/19 = 0·6 8 4 2 1 0 5 2 6 3 1 5 7 8 9 4 7 3...14/19 = 0·7 3 6 8 4 2 1 0 5 2 6 3 1 5 7 8 9 4...15/19 = 0·7 8 9 4 7 3 6 8 4 2 1 0 5 2 6 3 1 5...16/19 = 0·8 4 2 1 0 5 2 6 3 1 5 7 8 9 4 7 3 6...17/19 = 0·8 9 4 7 3 6 8 4 2 1 0 5 2 6 3 1 5 7...18/19 = 0·9 4 7 3 6 8 4 2 1 0 5 2 6 3 1 5 7 8... 在各素數在不同進制下,也可能會有相同的現象,以下是列表,列出素數、進制以及幻方和 ((進制-1) 乘 (素數-1) / 2: (zh)
|
![[RDF Data]](/fct/images/sw-rdf-blue.png)
![[cxml]](/fct/images/cxml_doc.png)
![[csv]](/fct/images/csv_doc.png)
![[text]](/fct/images/ntriples_doc.png)
![[turtle]](/fct/images/n3turtle_doc.png)
![[ld+json]](/fct/images/jsonld_doc.png)
![[rdf+json]](/fct/images/json_doc.png)
![[rdf+xml]](/fct/images/xml_doc.png)
![[atom+xml]](/fct/images/atom_doc.png)
![[html]](/fct/images/html_doc.png)