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2000 (number) - Revision history
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<p><b>New page</b></p><div>{{Redirect|2,000|other uses|2000 (disambiguation)}}<br />
{{see also|millennium|2000|Y2K (disambiguation){{!}}Y2K}}<br />
<noinclude>{{User:RMCD bot/subject notice|1=2000-2999 (numbers)|2=Talk:300 (number)#Requested move 14 April 2024}}<br />
</noinclude><br />
{{Infobox number<br />
| number = 2000<br />
| unicode = MM, mm<br />
|lang1=[[Armenian numerals|Armenian]]|lang1 symbol=Υ|lang3=[[Egyptian numerals|Egyptian hieroglyph]]|lang3 symbol=<span style="font-size:200%;">π½</span>}}<br />
{{wiktionary|two thousand}}<br />
<br />
'''2000''' ('''two thousand''') is a [[natural number]] following 1999 and preceding [[#2001 to 2099|2001]].<br />
<br />
It is:<br />
:*the highest number expressible using only two unmodified characters in [[Roman numerals]] (MM)<br />
:*an [[Achilles number]]<ref>{{cite OEIS|A052486|name=Achilles numbers - powerful but imperfect: if n = Product(p_i^e_i) then all e_i > 1 (i.e., powerful), but the highest common factor of the e_i is 1, i.e., not a perfect power}}</ref><br />
:*smallest four digit [[Ban number|eban number]]<ref>{{cite OEIS|A006933|'Eban' numbers (the letter 'e' is banned!)}}</ref><br />
:*the sum of all the [[Ban number|nban numbers]] in the sequence<ref>{{cite OEIS|A008537|Numbers that do not contain the letter 'n')}}</ref><br />
<br />
== Selected numbers in the range 2001β2999 ==<br />
<br />
===2001 to 2099===<br />
* '''2001''' β [[sphenic number]]<ref>{{cite OEIS|A007304|Sphenic numbers: products of 3 distinct primes)}}</ref><br />
* '''2002''' β [[palindromic number]] in [[decimal]], base 76, 90, 142, and 11 other non-trivial bases<br />
* '''2003''' β [[Sophie Germain prime]] and the smallest prime number in the 2000s<br />
* '''2004''' β Area of the 24th [https://oeis.org/A022264/a022264.jpg crystagon]<ref>{{cite OEIS|A022264|n*(7*n - 1)/2}}</ref><br />
* '''2005''' β A vertically symmetric number<br />
* '''2006''' β number of subsets of {1,2,3,4,5,6,7,8,9,10,11} with relatively prime elements<ref>{{cite OEIS|A085945|Number of subsets of {1,2,...,n} with relatively prime elements}}</ref><br />
* '''2007''' β 2<sup>2007</sup> + 2007<sup>2</sup> is prime<ref>{{cite OEIS|A064539|Numbers n such that 2^n + n^2 is prime}}</ref><br />
* '''2008''' β number of 4 X 4 matrices with nonnegative integer entries and row and column sums equal to 3<ref>{{cite OEIS|A001496|Number of 4 X 4 matrices with nonnegative integer entries and row and column sums equal to n}}</ref><br />
* '''2009''' = 7<sup>4</sup> β 7<sup>3</sup> β 7<sup>2</sup><br />
* '''2010''' β number of compositions of 12 into relatively prime parts<ref>{{cite OEIS|A000740|Number of 2n-bead balanced binary necklaces of fundamental period 2n, equivalent to reversed complement}}</ref><br />
* '''2011''' β [[sexy prime]] with 2017, sum of eleven consecutive primes: 2011 = 157 + 163 + 167 + 173 + 179 + 181 + 191 + 193 + 197 + 199 + 211<br />
* '''2012''' β The number 8 Γ 10<sup>2012</sup> β 1 is a prime number<ref>{{cite OEIS|A056721|Numbers n such that 8*10^n-1 is prime}}</ref><br />
* '''2013''' β [[oeis:A332337|number of widely totally strongly normal compositions of 17]]<br />
* '''2014''' β 5 Γ 2<sup>2014</sup> - 1 is prime<ref>{{cite OEIS|A001770|Numbers k such that 5*2^k - 1 is prime}}</ref><br />
* '''2015''' β [[LucasβCarmichael number]]<ref name=":0">{{Cite OEIS|A006972|Lucas-Carmichael numbers}}</ref><br />
* '''[[2016 (number)|2016]]''' β [[triangular number]], number of 5-cubes in a 9-cube, [[ErdΕsβNicolas number]],<ref>{{Cite OEIS|A194472|ErdΕs-Nicolas numbers}}</ref> 2<sup>11</sup>-2<sup>5</sup><br />
* '''2017''' β [[Mertens function]] zero, [[sexy prime]] with 2011<br />
* '''2018''' β [[oeis:A000607|Number of partitions of 60 into prime parts]]<br />
* '''2019''' β smallest number that can be represented as the sum of 3 prime squares 6 different ways: 2019 = 7<sup>2</sup> + 11<sup>2</sup> + 43<sup>2</sup> = 7<sup>2</sup> + 17<sup>2</sup> + 41<sup>2</sup> = 13<sup>2</sup> + 13<sup>2</sup> + 41<sup>2</sup> = 11<sup>2</sup> + 23<sup>2</sup> + 37<sup>2</sup> = 17<sup>2</sup> + 19<sup>2</sup> + 37<sup>2</sup> = 23<sup>2</sup> + 23<sup>2</sup> + 31<sup>2</sup><ref>{{Cite web|date=2018-12-31|title=Can you solve it? 2019 in numbers|url=http://www.theguardian.com/science/2018/dec/31/can-you-solve-it-2019-in-numbers|access-date=2021-09-19|website=the Guardian|language=en}}</ref><br />
* '''2020''' β sum of the [[totient]] function for the first 81 integers<br />
* '''2021''' = 43 * 47, consecutive [[prime numbers]], next is 2491<br />
* '''2022''' β non-isomorphic colorings of a toroidal 3 Γ 3 grid using exactly three colors under translational symmetry,<ref>{{cite OEIS|A294685|non-isomorphic colorings of a toroidal n X k grid using exactly three colors under translational symmetry}}</ref> beginning of a run of 4 consecutive Niven numbers<ref>{{cite OEIS|A141769|Beginning of a run of 4 consecutive Niven (or Harshad) numbers}}</ref><br />
* '''2023''' = 7 * 17 * 17 β multiple of 7 with digit sum equal to 7,<ref>{{cite OEIS|A063416|Multiples of 7 whose sum of digits is equal to 7}}</ref> sum of squares of digits equals 17<br />
* '''2024''' β [[tetrahedral number]]<ref name=":1">{{Cite OEIS|A000292|Tetrahedral numbers}}</ref><br />
* '''2025''' = 45<sup>2</sup>, sum of the cubes of the first nine positive integers (and therefore square of the sum of the first nine positive integers), [[centered octagonal number]]<ref name=":2">{{Cite OEIS|1=A016754|2=Odd squares: a(n) = (2n+1)^2. Also centered octagonal numbers}}</ref><br />
* '''2027''' β [[super-prime]], [[safe prime]]<ref name=":3">{{Cite OEIS|A005385|Safe primes}}</ref><br />
* '''2029''' β member of the [[MianβChowla sequence]]<ref name=":4">{{Cite OEIS|A005282|Mian-Chowla sequence}}</ref><br />
* '''2030''' = 21<sup>2</sup> + 22<sup>2</sup> + 23<sup>2</sup> + 24<sup>2</sup> = 25<sup>2</sup> + 26<sup>2</sup> + 27<sup>2</sup><br />
* '''2031''' β [[centered pentagonal number]]<ref name=":5">{{Cite OEIS|A005891|Centered pentagonal numbers}}</ref><br />
* '''2039''' β [[Sophie Germain prime]], [[safe prime]]<ref name=":3" /><br />
* '''2045''' β number of [[partially ordered set]] with 7 unlabeled elements<ref>{{cite OEIS|A000112|Number of partially ordered sets (posets) with n unlabeled elements}}</ref><br />
* '''2047''' β [[super-Poulet number]],<ref name=":6">{{Cite OEIS|A050217|Super-Poulet numbers}}</ref> [[Woodall number]],<ref>{{Cite OEIS|A003261|Woodall numbers}}</ref> [[decagonal number]],<ref name=":7">{{Cite OEIS|A001107|10-gonal (or decagonal) numbers}}</ref> a [[centered octahedral number]],<ref name="ReferenceA">{{cite OEIS|A001845|Centered octahedral numbers (crystal ball sequence for cubic lattice)}}</ref> 2047 = 2<sup>11</sup> - 1 = 23 Γ 89 and is the first [[Mersenne number]] that is composite for a prime exponent<br />
* '''2048''' = [[power of two|2<sup>11</sup>]]<br />
* '''2053''' β [[star number]]<br />
* '''2056''' β [[magic constant]] of ''n'' Γ ''n'' normal [[magic square]] and [[Eight queens puzzle|''n''-queens problem]] for ''n'' = 16<br />
* '''2060''' β sum of the [[totient function]] for the first 82 integers<br />
* '''2063''' β [[Sophie Germain prime]], [[safe prime]],<ref name=":3" /> [[super-prime]]<br />
* '''2068''' β number of 16-bead binary necklaces with beads of 2 colors where the colors may be swapped but turning over is not allowed<ref>{{cite OEIS|A000013|Definition (1): Number of n-bead binary necklaces with beads of 2 colors where the colors may be swapped but turning over is not allowed}}</ref><br />
* '''2069''' β [[Sophie Germain prime]]<br />
* '''2070''' β [[pronic number]]<ref name=A002378>{{Cite OEIS|A002378|Oblong (or promic, pronic, or heteromecic) numbers}}</ref><br />
* '''2080''' β triangular number<br />
* '''2081''' β [[super-prime]]<br />
* '''2093''' β Mertens function zero<br />
* '''2095''' β Mertens function zero<br />
* '''2096''' β Mertens function zero<br />
* '''2097''' β Mertens function zero<br />
* '''2099''' β Mertens function zero, [[super-prime]], [[safe prime]],<ref name=":3" /> [[highly cototient number]]<ref name=":9">{{Cite OEIS|A100827|Highly cototient numbers}}</ref><br />
<br />
===2100 to 2199===<br />
* '''2100''' β Mertens function zero<br />
* '''2101''' β [[centered heptagonal number]]<ref name=":10">{{Cite OEIS|1=A069099|2=Centered heptagonal numbers|access-date=2016-06-13}}</ref><br />
* '''2107''' β member of a [[RuthβAaron pair]] with 2108 (first definition)<br />
* '''2108''' β member of a RuthβAaron pair with 2107 (first definition)<br />
* '''2109''' β [[square pyramidal number]],<ref name=":11">{{Cite OEIS|1=A000330|2=Square pyramidal numbers|access-date=2016-06-13}}</ref> the sum of the third and last trio of three-digit [[permutable prime]]s in [[decimal]]: [[199 (number)|199]] + [[919 (number)|919]] + [[991 (number)|991]] <br />
* '''2112''' β The break-through album of the band [[2112 (album)|Rush]]<br />
* '''2113''' β Mertens function zero, [[Proth prime]],<ref name=":12">{{Cite OEIS|1=A080076|2=Proth primes|access-date=2016-06-13}}</ref> [[centered square number]]<ref name=":13">{{Cite OEIS|1=A001844|2=Centered square numbers|access-date=2016-06-13}}</ref><br />
* '''2116''' = 46<sup>2</sup><br />
* '''2117''' β Mertens function zero<br />
* '''2119''' β Mertens function zero<br />
* '''2120''' β Mertens function zero, Fine number<ref>{{cite OEIS|A000957|2=Fine's sequence (or Fine numbers): number of relations of valence >= 1 on an n-set; also number of ordered rooted trees with n edges having root of even degree}}</ref><br />
* '''2122''' β Mertens function zero<br />
* '''2125''' β [[nonagonal number]]<ref name=":14">{{Cite OEIS|1=A001106|2=9-gonal (or enneagonal or nonagonal) numbers|access-date=2016-06-13}}</ref><br />
* '''2127''' β sum of the first 34 primes<br />
* '''2129''' β [[Sophie Germain prime]]<br />
* '''2135''' β Mertens function zero<br />
* '''2136''' β Mertens function zero<br />
* '''2137''' β prime of the form 2p-1<br />
* '''2138''' β Mertens function zero<br />
* '''2141''' β [[Sophie Germain prime]]<br />
* '''2142''' β sum of the totient function for the first 83 integers<br />
* '''2143''' β almost exactly 22{{pi}}<sup>4</sup><br />
* '''2145''' β triangular number<br />
* '''2153''' β with 2161, smallest consecutive primes that have the same sum of digits as each other's prime indices<br />
* '''2161''' β with 2153, smallest consecutive primes that have the same sum of digits as each other's prime indices<br />
* '''2162''' β pronic number<ref name=A002378/><br />
* '''2166''' β sum of the totient function for the first 84 integers<br />
* '''2169''' β [[Leyland number]]<ref name=":15">{{Cite OEIS|1=A076980|2=Leyland numbers|access-date=2016-06-13}}</ref><br />
* '''2171''' β Mertens function zero<br />
* '''2172''' β Mertens function zero<br />
* '''2175''' β smallest number requiring 143 seventh powers for Waring representation<br />
* '''2176''' β [[pentagonal pyramidal number]],<ref>{{Cite OEIS|1=A002411|2=Pentagonal pyramidal numbers|access-date=2016-06-13}}</ref> centered pentagonal number<ref name=":5" /><br />
* '''2178''' β first natural number whose digits in its decimal representation get reversed when multiplied by 4<ref>{{Cite OEIS|1=A008918|2=Numbers n such that 4*n = (n written backwards)|access-date=2016-06-14}}</ref><br />
* '''2179''' β [[WedderburnβEtherington number|WedderburnβEtherington prime]]<ref>{{Cite OEIS|1=A001190|2=Wedderburn-Etherington numbers|access-date=2016-06-13}}</ref><br />
* '''2184''' β equals both 3<sup>7</sup> β 3 and 13<sup>3</sup> β 13 and is believed to be the only such ''doubly strictly absurd'' number<ref>{{cite journal<br />
| last = Mackenzie<br />
| first = Dana <br />
| title = 2184: An Absurd (and Adsurd) Tale<br />
| url = http://math.colgate.edu/~integers/s33/s33.Abstract.html<br />
| journal = Integers<br />
| volume = 18<br />
| year = 2018<br />
}}</ref>{{Unreliable source?|date=July 2019}}<br />
* '''2187''' = [[power of three|3<sup>7</sup>]], [[vampire number]],<ref>{{Cite OEIS|1=A014575|2=Vampire numbers|access-date=2016-06-13}}</ref> [[perfect totient number]]<ref name=":16">{{Cite OEIS|1=A082897|2=Perfect totient numbers|access-date=2016-06-13}}</ref><br />
* '''2188''' β [[Motzkin number]]<ref>{{Cite OEIS|1=A001006|2=Motzkin numbers|access-date=2016-06-13}}</ref><br />
* '''2197''' = 13<sup>3</sup>, palindromic in base 12 (1331<sub>12</sub>)<br />
* '''2199''' β perfect totient number<ref name=":16" /><br />
<br />
===2200 to 2299===<br />
* '''2201''' β only known non-palindromic number whose [[cube]] is [[palindromic number|palindromic]]; also no known fourth or higher powers are palindromic for non-palindromic numbers<br />
* '''2203''' β Mersenne prime exponent<br />
* '''2205''' β odd [[abundant number]]<ref name=":17">{{Cite OEIS|1=A005231|2=Odd abundant numbers|access-date=2016-06-13}}</ref><br />
* '''2207''' β [[safe prime]],<ref name=":3" /> [[Lucas prime]]<ref>{{Cite OEIS|1=A005479|2=Prime Lucas numbers|access-date=2016-06-13}}</ref><br />
* '''2208''' β [[Keith number]]<ref name=":18">{{Cite OEIS|1=A007629|2=Repfigit (REPetitive FIbonacci-like diGIT) numbers (or Keith numbers)|access-date=2016-06-13}}</ref><br />
* '''2209''' = 47<sup>2</sup>, palindromic in base 14 (B3B<sub>14</sub>), centered octagonal number<ref name=":2" /><br />
* '''2211''' β triangular number<br />
* '''2221''' β [[super-prime]], [[happy number]]<br />
* '''2222''' β [[repdigit]]<br />
* '''2223''' β [[Kaprekar number]]<ref name=":19">{{Cite OEIS|1=A006886|2=Kaprekar numbers|access-date=2016-06-13}}</ref><br />
* '''2230''' β sum of the totient function for the first 85 integers<br />
* '''2232''' β decagonal number<ref name=":7" /><br />
* '''2236''' β Harshad number <br />
* '''2245''' β centered square number<ref name=":13" /><br />
* '''2254''' β member of the MianβChowla sequence<ref name=":4" /><br />
* '''2255''' β [[octahedral number]]<ref name=":20">{{Cite OEIS|1=A005900|2=Octahedral numbers|access-date=2016-06-13}}</ref><br />
* '''2256''' β pronic number<ref name=A002378/><br />
* '''2269''' β [[super-prime]], [[cuban prime]]<ref name=":21">{{Cite OEIS|1=A002407|2=Cuban primes|access-date=2016-06-13}}</ref><br />
* '''2272''' β sum of the totient function for the first 86 integers<br />
* '''2273''' β [[Sophie Germain prime]]<br />
* '''2276''' β sum of the first 35 primes, centered heptagonal number<ref name=":10" /><br />
* '''2278''' β triangular number<br />
* '''2281''' β [[star number]], [[Mersenne prime|Mersenne prime exponent]]<br />
* '''2287''' β [[balanced prime]]<ref name=":22">{{Cite OEIS|1=A006562|2=Balanced primes|access-date=2016-06-13}}</ref><br />
* '''2294''' β Mertens function zero<br />
* '''2295''' β Mertens function zero<br />
* '''2296''' β Mertens function zero<br />
* '''2299''' β member of a RuthβAaron pair with 2300 (first definition)<br />
<br />
===2300 to 2399===<br />
* '''2300''' β tetrahedral number,<ref name=":1" /> member of a RuthβAaron pair with 2299 (first definition)<br />
* '''2301''' β nonagonal number<ref name=":14" /><br />
* '''2304''' = 48<sup>2</sup><br />
* '''2306''' β Mertens function zero<br />
* '''2309''' β [[primorial prime]], [[twin prime]] with 2311, Mertens function zero, highly cototient number<ref name=":9" /><br />
* '''2310''' β fifth [[primorial]]<ref>{{Cite OEIS|1=A002110|2=Primorial numbers|access-date=2016-06-13}}</ref><br />
* '''2311''' β primorial prime, twin prime with 2309<br />
* '''2321''' β Mertens function zero<br />
* '''2322''' β Mertens function zero<br />
* '''2326''' β centered pentagonal number<ref name=":5" /><br />
* '''2328''' β sum of the totient function for the first 87 integers, the number of groups of order 128<ref>{{cite web|url=http://www-public.tu-bs.de:8080/~beick/soft/small/small.html |title=The Small Groups library |access-date=2008-01-22 |url-status=dead |archive-url=https://web.archive.org/web/20070204070922/http://www-public.tu-bs.de:8080/~beick/soft/small/small.html |archive-date=2007-02-04 }}.</ref><br />
* '''2331''' β [[centered cube number]]<ref>{{Cite OEIS|1=A005898|2=Centered cube numbers|access-date=2016-06-13}}</ref><br />
* '''2338''' β Mertens function zero<br />
* '''2339''' β [[Sophie Germain prime]], twin prime with 2341<br />
* '''2341''' β [[super-prime]], twin prime with 2339<br />
* '''2346''' β triangular number<br />
* '''2347''' β sum of seven consecutive primes (313 + 317 + 331 + 337 + 347 + 349 + 353)<br />
* '''2351''' β [[Sophie Germain prime]], [[super-prime]]<br />
* '''2352''' β pronic number<ref name=A002378/><br />
* '''2357''' β [[SmarandacheβWellin prime]]<ref>{{Cite OEIS|1=A069151|2=Concatenations of consecutive primes, starting with 2, that are also prime|access-date=2016-06-13}}</ref><br />
* '''2368''' β sum of the totient function for the first 88 integers<br />
* '''2372''' β logarithmic number<ref>{{cite OEIS|A002104|Logarithmic numbers}}</ref><br />
* '''2378''' β [[Pell number]]<ref>{{Cite OEIS|1=A000129|2=Pell numbers|access-date=2016-06-13}}</ref><br />
* '''2379''' β member of the MianβChowla sequence<ref name=":4" /><br />
* '''2381''' β [[super-prime]], centered square number<ref name=":13" /><br />
* '''2383''' (2384) β number of delegates required to win the [[Democratic Party presidential candidates, 2016|2016 Democratic Party presidential primaries]] (out of 4051)<br />
* '''2393''' β [[Sophie Germain prime]]<br />
* '''2397''' β sum of the squares of the first ten primes<br />
* '''2399''' β [[Sophie Germain prime]]<br />
<br />
===2400 to 2499===<br />
* '''2400''' β perfect score on [[SAT]] tests administered after 2005<br />
* '''2401''' = 49<sup>2</sup> = 7<sup>4</sup>, centered octagonal number<ref name=":2" /><br />
* '''2415''' β triangular number<br />
* '''2417''' β [[super-prime]], balanced prime<ref name=":22" /><br />
* '''2425''' β decagonal number<ref name=":7" /><br />
* '''2427''' β sum of the first 36 primes<br />
* '''2431''' β product of three consecutive primes<br />
* '''2437''' β cuban prime,<ref name=":21" /> largest [[right-truncatable prime]] in base 5<br />
* '''2447''' β [[safe prime]]<ref name=":3" /><br />
* '''2450''' β pronic number<ref name=A002378/><br />
* '''2456''' β sum of the totient function for the first 89 integers<br />
* '''2458''' β centered heptagonal number<ref name=":10" /><br />
* '''2459''' β [[Sophie Germain prime]], [[safe prime]]<ref name=":3" /><br />
* '''2465''' β [[magic constant]] of ''n'' Γ ''n'' normal [[magic square]] and [[Eight queens puzzle|''n''-queens problem]] for ''n'' = 17, [[Carmichael number]]<ref name=":23">{{Cite OEIS|1=A002997|2=Carmichael numbers|access-date=2016-06-13}}</ref><br />
* '''2470''' β square pyramidal number<ref name=":11" /><br />
* '''2471''' β number of ways to partition {1,2,3,4,5,6} and then partition each cell (block) into subcells<ref>{{cite OEIS|A000258|Expansion of e.g.f. exp(exp(exp(x)-1)-1)}}</ref><br />
* '''2477''' β [[super-prime]], [[cousin prime]]<br />
* '''2480''' β sum of the totient function for the first 90 integers<br />
* '''2481''' β centered pentagonal number<ref name=":5" /><br />
* '''2484''' β nonagonal number<ref name=":14" /><br />
* '''2485''' β triangular number, number of planar partitions of 13<ref>{{cite OEIS|A000219|Number of planar partitions (or plane partitions) of n}}</ref><br />
* '''2491''' = 47 * 53, consecutive [[prime numbers]], member of [[RuthβAaron pair]] with 2492 under second definition<br />
* '''2492''' β member of RuthβAaron pair with 2491 under second definition<br />
<br />
===2500 to 2599===<br />
* '''2500''' = 50<sup>2</sup>, [[palindromic]] in base 7 (10201<sub>7</sub>)<br />
* '''2501''' β Mertens function zero<br />
* '''2502''' β Mertens function zero<br />
* '''2503''' β Friedman prime<br />
* '''2510''' β member of the MianβChowla sequence<ref name=":4" /><br />
* '''2513''' β member of the [[Padovan sequence]]<ref>{{Cite OEIS|1=A000931|2=Padovan sequence|access-date=2016-06-13}}</ref><br />
* '''2517''' β Mertens function zero<br />
* '''2519''' β the smallest number congruent to 1 (mod 2), 2 (mod 3), 3 (mod 4), ..., 9 (mod 10)<br />
* '''[[2520 (number)|2520]]''' β [[superior highly composite number]]; smallest number divisible by numbers [[1 (number)|1]], 2, 3, 4, 5, 6, 7, 8, 9, 10, and 12; [[colossally abundant number]]; [[Harshad number]] in several bases. It is also the highest number with more divisors than any number less than double itself {{OEIS|id=A072938}}. Not only it is the 7th (and last) number with more divisors than any number double itself but is also the 7th number that is highly composite and the lowest common multiple of a consecutive set of integers from 1 {{OEIS|id=A095921}} which is a property the previous number with this pattern of divisors does not have ([[360 (number)|360]]). That is, although 360 and 2520 both have more divisors than any number twice themselves, 2520 is the lowest number divisible by both 1 to 9 and 1 to 10, whereas 360 is not the lowest number divisible by 1 to 6 (which [[60 (number)|60]] is) and is not divisible by 1 to 7 (which [[420 (number)|420]] is). It is also the 6th and largest highly composite number that is a divisor of every higher highly composite number {{OEIS|id=A106037}}.<br />
* '''2521''' β [[star prime]], centered square number<ref name=":13" /><br />
* '''2522''' β Mertens function zero<br />
* '''2523''' β Mertens function zero<br />
* '''2524''' β Mertens function zero<br />
* '''2525''' β Mertens function zero<br />
* '''2530''' β Mertens function zero, Leyland number<ref name=":15" /><br />
* '''2533''' β Mertens function zero<br />
* '''2537''' β Mertens function zero<br />
* '''2538''' β Mertens function zero<br />
* '''2543''' β [[Sophie Germain prime]], sexy prime with 2549<br />
* '''2549''' β [[Sophie Germain prime]], [[super-prime]], sexy prime with 2543<br />
* '''2550''' β pronic number<ref name=A002378/><br />
* '''2552''' β sum of the totient function for the first 91 integers<br />
* '''2556''' β triangular number<br />
* '''2567''' β Mertens function zero<br />
* '''2568''' β Mertens function zero, number of digits in the [[decimal]] expansion of 1000[[factorial|!]], or the [[product (mathematics)|product]] of all [[natural number]]s from 1 to 1000<br />
* '''2570''' β Mertens function zero<br />
* '''2579''' β [[safe prime]]<ref name=":3" /><br />
* '''2580''' β [[Keith number]],<ref name=":18" /> forms a column on a telephone or [[PIN pad]]<br />
* '''2584''' β [[Fibonacci number]],<ref>{{Cite OEIS|1=A000045|2=Fibonacci numbers|access-date=2016-06-13}}</ref> sum of the first 37 primes<br />
* '''2592''' β [[3-smooth]] number (2<sup>5</sup>Γ3<sup>4</sup>)<br />
* '''2596''' β sum of the totient function for the first 92 integers<br />
<br />
===2600 to 2699===<br />
* '''2600''' β tetrahedral number,<ref name=":1" /> member of a [[RuthβAaron pair]] with 2601 (first definition)<br />
** 2600 [[Hertz|Hz]] is the tone used by a [[blue box]] to defeat toll charges on [[long distance telephone call]]s<br />
** [[2600: The Hacker Quarterly]] is a magazine named after the above<br />
** The [[Atari 2600]] was a popular [[video game console]]<br />
* '''2601''' = 51<sup>2</sup>, member of a [[RuthβAaron pair]] with 2600 (first definition)<br />
* '''2609''' β [[super-prime]]<br />
* '''2620''' β [[telephone number (mathematics)|telephone number]], [[amicable number]] with 2924<br />
* '''2625''' = a [[centered octahedral number]]<ref name="ReferenceA"/><br />
* '''2626''' β decagonal number<ref name=":7" /><br />
* '''2628''' β triangular number<br />
* '''2632''' β number of consecutive baseball games played by [[Cal Ripken Jr.]]<br />
* '''2633''' β sum of twenty-five consecutive primes (47 + 53 + 59 + 61 + 67 + 71 + 73 + 79 + 83 + 89 + 97 + 101 + 103 + 107 + 109 + 113 + 127 + 131 + 137 + 139 + 149 + 151 + 157 + 163 + 167)<br />
* '''2641''' β centered pentagonal number<ref name=":5" /><br />
* '''2647''' β [[super-prime]], centered heptagonal number<ref name=":10" /><br />
* '''2652''' β pronic number<ref name=A002378/><br />
* '''2656''' β sum of the totient function for the first 93 integers<br />
* '''2665''' β centered square number<ref name=":13" /><br />
* '''2674''' β nonagonal number<ref name=":14" /><br />
* '''2677''' β balanced prime<ref name=":22" /><br />
* '''2680''' β number of [[Eight queens puzzle|11-queens problem]] solutions<br />
* '''2683''' β [[super-prime]]<br />
* '''2689''' β Mertens function zero, Proth prime<ref name=":12" /><br />
* '''2693''' β [[Sophie Germain prime]]<br />
* '''2699''' β [[Sophie Germain prime]]<br />
<br />
===2700 to 2799===<br />
* '''2701''' β triangular number, super-Poulet number<ref name=":6" /><br />
* '''2702''' β sum of the totient function for the first 94 integers<br />
* '''2704''' = 52<sup>2</sup><br />
* '''2707''' β model number for the concept supersonic airliner [[Boeing 2707]]<br />
* '''{{Vanchor|2719}}''' β [[super-prime]], largest known odd number which cannot be expressed in the form [[Ramanujan's ternary quadratic form|''x''<sup>2</sup> + ''y''<sup>2</sup> + 10''z''<sup>2</sup>]] where ''x'', ''y'' and ''z'' are integers.<ref>{{cite encyclopedia|title=Odd numbers that are not of the form x^2+y^2+10*z^2.|url=http://oeis.org/search?q=3%2C+7%2C+21%2C+31%2C+33%2C+43%2C&language=english&go=Search|encyclopedia=The Online Encyclopedia of Integer Sequences|publisher=The OEIS Foundation, Inc.|access-date=13 November 2012}}</ref> In 1997 it was conjectured that this is also the largest such odd number.<ref name=Ono>{{cite journal|last=Ono|first=Ken|title=Ramanujan, taxicabs, birthdates, zipcodes and twists|journal=American Mathematical Monthly|year=1997|volume=104|issue=10|pages=912β917|url=http://www.mathcs.emory.edu/~ono/publications-cv/pdfs/023.pdf|access-date=11 November 2012|doi=10.2307/2974471|jstor=2974471|citeseerx=10.1.1.514.8070|archive-date=15 October 2015|archive-url=https://web.archive.org/web/20151015193211/http://www.mathcs.emory.edu/~ono/publications-cv/pdfs/023.pdf|url-status=dead}}</ref> It is now{{When|date=April 2024|reason=When is "now"?}} known this is true if the [[generalized Riemann hypothesis]] is true.<ref name=Ken>{{cite journal|last=Ono|first=Ken|author2=K Soundararajan|title=Ramanujan's ternary quadratic forms|journal=Inventiones Mathematicae|year=1997|volume=130|issue=3|pages=415β454|url=http://mathcs.emory.edu/~ono/publications-cv/pdfs/025.pdf|access-date=12 November 2012|doi=10.1007/s002220050191|bibcode=1997InMat.130..415O|citeseerx=10.1.1.585.8840|s2cid=122314044|archive-url=https://web.archive.org/web/20190718155256/http://www.mathcs.emory.edu/~ono/publications-cv/pdfs/025.pdf|archive-date=18 July 2019|url-status=dead}}</ref><br />
* '''2728''' β [[Kaprekar number]]<ref name=":19" /><br />
* '''2729''' β highly cototient number<ref name=":9" /><br />
* '''2731''' β the only [[Wagstaff prime]] with four digits,<ref>{{Cite OEIS|1=A000979|2=Wagstaff primes|access-date=2016-06-13}}</ref> [[Jacobsthal prime]]<br />
* '''2736''' β octahedral number<ref name=":20" /><br />
* '''2741''' β [[Sophie Germain prime]], 400th prime number<br />
* '''2744''' = 14<sup>3</sup>, palindromic in base 13 (1331<sub>13</sub>)<br />
* '''2747''' β sum of the first 38 primes<br />
* '''2749''' β [[super-prime]], [[cousin prime]] with 2753<br />
* '''2753''' β [[Sophie Germain prime]], Proth prime<ref name=":12" /><br />
* '''2756''' β pronic number<ref name=A002378/><br />
* '''2774''' β sum of the totient function for the first 95 integers<br />
* '''2775''' β triangular number<br />
* '''2780''' β member of the MianβChowla sequence<ref name=":4" /><br />
* '''2783''' β member of a RuthβAaron pair with 2784 (first definition)<br />
* '''2784''' β member of a RuthβAaron pair with 2783 (first definition)<br />
* '''2791''' β cuban prime<ref name=":21" /><br />
<br />
===2800 to 2899===<br />
* '''2801''' β first base 7 [[repunit]] prime<br />
* '''2803''' β [[super-prime]]<br />
* '''2806''' β [[centered pentagonal number]],<ref name=":5" /> sum of the totient function for the first 96 integers<br />
* '''2809''' = 53<sup>2</sup>, centered octagonal number<ref name=":2" /><br />
* '''2813''' β centered square number<ref name=":13" /><br />
* '''2816''' β number of parts in all compositions of 10<ref>{{cite OEIS|A001792|2=a(n) = (n+2)*2^(n-1)}}</ref><br />
* '''2819''' β [[Sophie Germain prime]], [[safe prime]], sum of seven consecutive primes (383 + 389 + 397 + 401 + 409 + 419 + 421)<ref name=":3" /><br />
* '''2821''' β Carmichael number<ref name=":23" /><br />
* '''2835''' β odd abundant number,<ref name=":17" /> decagonal number<ref name=":7" /><br />
* '''2843''' β centered heptagonal prime<ref>{{Cite OEIS|1=A144974|2=Centered heptagonal prime numbers|access-date=2016-06-13}}</ref><br />
* '''2850''' β triangular number<br />
* '''2862''' β pronic number<ref name=A002378/><br />
* '''2870''' β square pyramidal number<ref name=":11" /><br />
* '''2871''' β nonagonal number<ref name=":14" /><br />
* '''2872''' β [[tetranacci number]]<ref>{{Cite OEIS|1=A000078|2=Tetranacci numbers|access-date=2016-06-13}}</ref><br />
* '''2875''' β number of lines on a [[quintic threefold]]<ref>{{Citation | last1=Pandharipande | first1=Rahul | title=Rational curves on hypersurfaces (after A. Givental) | url=http://www.numdam.org/item?id=SB_1997-1998__40__307_0 | mr=1685628 | year=1998 | journal=AstΓ©risque |volume=1997/98 |issue=252 | pages=307β340| arxiv=math/9806133 | bibcode=1998math......6133P }}</ref><br />
* '''2879''' β [[safe prime]]<ref name=":3" /><br />
* '''2897''' β [[super-prime]], [[Markov prime]]<ref>{{Cite OEIS|1=A002559|2=Markoff (or Markov) numbers|access-date=2016-06-13}}</ref><br />
<br />
===2900 to 2999===<br />
* '''2902''' β sum of the [[totient function]] for the first 97 integers<br />
* '''2903''' β [[Sophie Germain prime]], [[safe prime]],<ref name=":3" /> balanced prime<ref name=":22" /><br />
* '''2909''' β [[super-prime]]<br />
* '''2914''' β sum of the first 39 primes<br />
* '''2915''' β LucasβCarmichael number<ref name=":0" /><br />
* '''2916''' = 54<sup>2</sup><br />
* '''2924''' β amicable number with 2620<br />
* '''2925''' β [[magic constant]] of ''n'' Γ ''n'' normal [[magic square]] and [[Eight queens puzzle|''n''-queens problem]] for ''n'' = 18, tetrahedral number,<ref name=":1" /> member of the Mian-Chowla sequence<ref name=":4" /><br />
* '''2926''' β triangular number<br />
* '''2939''' β [[Sophie Germain prime]]<br />
* '''2944''' β sum of the totient function for the first 98 integers<br />
* '''2963''' β [[Sophie Germain prime]], [[safe prime]], balanced prime<ref name=":22" /><br />
* '''2964''' β number of parallelogram polyominoes with 11 cells<ref>{{cite OEIS|A006958|Number of parallelogram polyominoes with n cells (also called staircase polyominoes, although that term is overused)}}</ref><br />
* '''2965''' β greater of second pair of [[Smith number|Smith brothers]], centered square number<ref name=":13" /><br />
* '''2969''' β [[Sophie Germain prime]]<br />
* '''2970''' β [[harmonic divisor number]],<ref>{{Cite OEIS|1=A001599|2=Harmonic or Ore numbers|access-date=2016-06-13}}</ref> pronic number<ref name=A002378/><br />
* '''2976''' β centered pentagonal number<ref name=":5" /><br />
* '''2988''' β number of reduced trees with 20 nodes<ref>{{cite OEIS|A000014|Number of series-reduced trees with n nodes}}</ref><br />
* '''2989''' β in [[hexadecimal]], reads as "[[evil|BAD]]"<br />
* '''2997''' β 1000-gonal number<ref>{{Cite OEIS|1=A195163|2=1000-gonal numbers|access-date=2016-06-13}}</ref><br />
* '''2999''' β [[safe prime]]<br />
<br />
===Prime numbers===<br />
There are 127 [[prime number]]s between 2000 and 3000:<ref>{{Cite OEIS|A038823|Number of primes between n*1000 and (n+1)*1000}}</ref><ref>{{cite web |last=Stein |first=William A. |author-link=William A. Stein |title=The Riemann Hypothesis and The Birch and Swinnerton-Dyer Conjecture |url=https://wstein.org/talks/2017-02-10-wing-rh_and_bsd/ |website=wstein.org |date=10 February 2017 |access-date=6 February 2021}}</ref><br />
:2003, 2011, 2017, 2027, 2029, 2039, 2053, 2063, 2069, 2081, 2083, 2087, 2089, 2099, 2111, 2113, 2129, 2131, 2137, 2141, 2143, 2153, 2161, 2179, 2203, 2207, 2213, 2221, 2237, 2239, 2243, 2251, 2267, 2269, 2273, 2281, 2287, 2293, 2297, 2309, 2311, 2333, 2339, 2341, 2347, 2351, 2357, 2371, 2377, 2381, 2383, 2389, 2393, 2399, 2411, 2417, 2423, 2437, 2441, 2447, 2459, 2467, 2473, 2477, 2503, 2521, 2531, 2539, 2543, 2549, 2551, 2557, 2579, 2591, 2593, 2609, 2617, 2621, 2633, 2647, 2657, 2659, 2663, 2671, 2677, 2683, 2687, 2689, 2693, 2699, 2707, 2711, 2713, 2719, 2729, 2731, 2741, 2749, 2753, 2767, 2777, 2789, 2791, 2797, 2801, 2803, 2819, 2833, 2837, 2843, 2851, 2857, 2861, 2879, 2887, 2897, 2903, 2909, 2917, 2927, 2939, 2953, 2957, 2963, 2969, 2971, 2999<br />
<br />
== References ==<br />
{{reflist}}<br />
<br />
{{Integers|10}}<br />
<br />
[[Category:Integers]]</div>
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