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{{Infobox number |
{{Infobox number |
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| number = 363 |
| number = 363 |
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| divisor = [[1 (number)|1]], [[3 (number)|3]], [[11 (number)|11]], [[33 (number)|33]], [[121 (number)|121]], 363 |
| divisor = [[1 (number)|1]], [[3 (number)|3]], [[11 (number)|11]], [[33 (number)|33]], [[121 (number)|121]], 363 |
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'''363''' |
'''363''' ('''three hundred [and] sixty-three''') is the [[natural number]] following [[362 (number)|362]] and preceding [[364 (number)|364]]. |
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==In mathematics== |
==In mathematics== |
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* It is an odd, [[composite number|composite]], [[Positive number|positive]], [[real number|real]] integer, composed of a [[prime number|prime]] (3) and a prime squared (11<sup>2</sup>). |
* It is an odd, [[composite number|composite]], [[Positive number|positive]], [[real number|real]] integer, composed of a [[prime number|prime]] (3) and a prime squared (11<sup>2</sup>). |
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* The 363rd day in a year is 29 December (28 December in [[leap year]]s). |
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* 363 is a [[palindromic number]] in bases 3, 10, 11 and 32. |
* 363 is a [[palindromic number]] in bases 3, 10, 11 and 32. |
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* 363 is a [[repdigit]] (BB) in base 32. |
* 363 is a [[repdigit]] (BB) in base 32. |
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* The [[Mertens function]] returns 0.<ref>{{cite web|title=Sloane's A028442 : Numbers n such that Mertens' function is zero|url=https://oeis.org/A028442|website=The On-Line Encyclopedia of Integer Sequences|publisher=OEIS Foundation|access-date=2016-06-02}}</ref> |
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* 363 is a 122-gonal number. |
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* 363 is the sum of |
* 363 is the sum of nine consecutive primes (23 + 29 + 31 + 37 + 41 + 43 + 47 + 53 + 59). |
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* The [[Mertens function]] returns 0 |
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* 363 can be expressed as the sum of three squares in four different ways: 11<sup>2</sup> + 11<sup>2</sup> + 11<sup>2</sup>, 5<sup>2</sup> + 7<sup>2</sup> + 17<sup>2</sup>, 1<sup>2</sup> + 1<sup>2</sup> + 19<sup>2</sup>, and 13<sup>2</sup> + 13<sup>2</sup> + 5<sup>2</sup>. |
* 363 can be expressed as the sum of three squares in four different ways: 11<sup>2</sup> + 11<sup>2</sup> + 11<sup>2</sup>, 5<sup>2</sup> + 7<sup>2</sup> + 17<sup>2</sup>, 1<sup>2</sup> + 1<sup>2</sup> + 19<sup>2</sup>, and 13<sup>2</sup> + 13<sup>2</sup> + 5<sup>2</sup>. |
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==In other fields== |
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* The years AD 363 (in base 35 written AD AD) and [[363 BC]] (in base 32 written BB BC). |
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* 363 may be associated with the [[messiah]] |
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* [[Food additive]] E363 is [[succinic acid]] a [[food acid]]. |
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* [[363 Padua]] is a (probably typical Main Band) [[asteroid]]. |
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* 363 is attested in [[Egyptian mythology]]. In the [[Edfu]] texts for example it appears to be associated with [[Thoth]]. |
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* 363 numerology main keys: The [[Creativity|Creative]], [[Innovation|Innovative]]. |
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* [[USS Balch (DD-363)]] was a [[Porter-class destroyer]] in the [[United States Navy]]. |
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* 363 is the number of communes of the [[Maine-et-Loire]] département in [[France]]. |
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* 363 is the London ''Laburnum'' dialling code for [[Winchmore Hill]]. |
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* [[Technetium]]'s first [[spectral line]] is at 363 nm. |
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* The [[Saturn V]] rocket is 363 feet tall. |
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* In [[Unicode]] the [[macron]] ū is <nowiki>&#363;</nowiki> |
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* In the [[2000 U.S. election]] [[George W. Bush]] won [[New Mexico]] by 363 votes, and [[Florida]] by 363 votes on the two-corner [[Chad (paper)|chad]] standard. |
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* In May 1877, 363 [[France|French]] deputies passed the vote of no confidence in the [[duc de Broglie]] - the [[Seize Mai]]. |
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* The [[Erie Canal]] is 363 miles long. |
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* The two [[Sender Donebach]] at 363 m are the second tallest structures in [[Germany]]. |
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* [[DARPA|Arpa]] [[mailing list]]s are dealt with in RFC 363 |
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* [[Resource Reservation Protocol|RSVP]] is assigned port 363 see RFC 2205 |
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* [[Naphthalene]] is dealt with in PIM (Poisons Information Monograph) 363 |
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* Form 363 is the [[Companies House]] annual return filed in the [[United Kingdom]]. |
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* The 363 Group is a consulting firm in [[Chicago]].<ref>[http://www.363group.com/]</ref> |
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==Products== |
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* The 363 is model of mid-size [[cruiser]].{{Citation needed|date=May 2015}} |
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==References== |
==References== |
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{{Integers|3}} |
{{Integers|3}} |
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[[Category:Integers |
[[Category:Integers]] |
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{{Num-stub}} |
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Latest revision as of 17:26, 1 January 2025
 | This article relies largely or entirely on a single source. (January 2025) |
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|---|---|---|---|---|
| Cardinal | three hundred sixty-three | |||
| Ordinal | 363rd (three hundred sixty-third) | |||
| Factorization | 3 × 112 | |||
| Divisors | 1, 3, 11, 33, 121, 363 | |||
| Greek numeral | ΤΞΓ´ | |||
| Roman numeral | CCCLXIII, ccclxiii | |||
| Binary | 1011010112 | |||
| Ternary | 1111103 | |||
| Senary | 14036 | |||
| Octal | 5538 | |||
| Duodecimal | 26312 | |||
| Hexadecimal | 16B16 | |||
363 (three hundred [and] sixty-three) is the natural number following 362 and preceding 364.
In mathematics
[edit]- It is an odd, composite, positive, real integer, composed of a prime (3) and a prime squared (112).
- 363 is a deficient number and a perfect totient number.
- 363 is a palindromic number in bases 3, 10, 11 and 32.
- 363 is a repdigit (BB) in base 32.
- The Mertens function returns 0.[1]
- Any subset of its digits is divisible by three.
- 363 is the sum of nine consecutive primes (23 + 29 + 31 + 37 + 41 + 43 + 47 + 53 + 59).
- 363 is the sum of five consecutive powers of 3 (3 + 9 + 27 + 81 + 243).
- 363 can be expressed as the sum of three squares in four different ways: 112 + 112 + 112, 52 + 72 + 172, 12 + 12 + 192, and 132 + 132 + 52.
- 363 cubits is the solution given to Rhind Mathematical Papyrus question 50 – find the side length of an octagon with the same area as a circle 9 khet in diameter [1].
References
[edit]- ^ "Sloane's A028442 : Numbers n such that Mertens' function is zero". The On-Line Encyclopedia of Integer Sequences. OEIS Foundation. Retrieved 2016-06-02.
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