Jump to content

260 (number)

From Wikipedia, the free encyclopedia

This is an old revision of this page, as edited by Gulumeemee (talk | contribs) at 04:56, 20 April 2016 (Added that 263 and 269 have their own articles). The present address (URL) is a permanent link to this revision, which may differ significantly from the current revision.

← 259 260 261 →
Cardinaltwo hundred sixty
Ordinal260th
(two hundred sixtieth)
Factorization22 × 5 × 13
Greek numeralΣΞ´
Roman numeralCCLX
Binary1000001002
Ternary1001223
Senary11126
Octal4048
Duodecimal19812
Hexadecimal10416

260 (two hundred [and] sixty) is the magic constant of the n×n normal magic square and n-queens problem for n = 8, the size of an actual chess board.

260 is also the magic constant of the Franklin magic square devised by Benjamin Franklin.

52 61 4 13 20 29 36 45
14 3 62 51 46 35 30 19
53 60 5 12 21 28 37 44
11 6 59 54 43 38 27 22
55 58 7 10 23 26 39 42
9 8 57 56 41 40 25 24
50 63 2 15 18 31 34 47
16 1 64 49 48 33 32 17

The minor diagonal gives 260, and in addition a number of combinations of two half diagonals of four numbers from a corner to the center give 260.

260 may also refer to the years AD 260 and 260 BC.

261–269

261 = 32·29, lucky number, nonagonal number, Harshad number, unique period in base 2, number of possible unfolded tesseract patterns


262 = 2·131, meandric number, open meandric number, untouchable number, happy number, palindrome number, semiprime


263 has its own article. 263 is a prime, safe prime, happy number, sum of five consecutive primes (43 + 47 + 53 + 59 + 61), balanced prime, Chen prime, Eisenstein prime with no imaginary part, strictly non-palindromic number, Bernoulli irregular prime, Euler irregular prime, Gaussian prime, full reptend prime, Solinas prime, Ramanujan prime.


264 = 23·3·11, Harshad number. If you take the sum of all 2-digit numbers you can make from 264, you get 264: 24 + 42 + 26 + 62 + 46 + 64 = 264. 132 and 396 share this property.[1]

264 equals the sum of the squares of the digits of its own square in base 15. This property is shared with 1, 159, 284, 306 and 387.


265 = 5·53, semiprime, lucky number, Padovan number, number of derangements of 6 elements, centered square number, Smith number, subfactorial 6.


266 = 2·7·19, sphenic number, Harshad number, nontotient, noncototient, self number, repdigit in base 11 (222). 266 is also the index of the largest proper subgroups of the sporadic group known as the Janko group J1.


267 = 3·89, semiprime, the number of groups of order 64.[2]

  • 267 is also the area code for Pennsylvania, USA (Philadelphia area including its suburbs in eastern Montgomery County and most of Bucks County, overlays with 215)

268 = 22·67, noncototient, untouchable number


269 has its own article. 269 is a prime, twin prime with 271, sum of three consecutive primes (83 + 89 + 97), Chen prime, Eisenstein prime with no imaginary part, highly cototient number, strictly non-palindromic number, full reptend prime

References