This HTML5 document contains 1112 embedded RDF statements represented using HTML+Microdata notation.

The embedded RDF content will be recognized by any processor of HTML5 Microdata.

Namespace Prefixes

PrefixIRI
rdfshttp://www.w3.org/2000/01/rdf-schema#
provhttp://www.w3.org/ns/prov#
dbpedia-ruhttp://ru.dbpedia.org/resource/
freebasehttp://rdf.freebase.com/ns/
dbthttp://dbpedia.org/resource/Template:
dbpedia-trhttp://tr.dbpedia.org/resource/
owlhttp://www.w3.org/2002/07/owl#
foafhttp://xmlns.com/foaf/0.1/
wikipedia-enhttp://en.wikipedia.org/wiki/
dbpedia-arhttp://ar.dbpedia.org/resource/
dctermshttp://purl.org/dc/terms/
yago-reshttp://yago-knowledge.org/resource/
dbpedia-ukhttp://uk.dbpedia.org/resource/
dbpedia-thhttp://th.dbpedia.org/resource/
dbpedia-slhttp://sl.dbpedia.org/resource/
rdfhttp://www.w3.org/1999/02/22-rdf-syntax-ns#
dbchttp://dbpedia.org/resource/Category:
dbpedia-zhhttp://zh.dbpedia.org/resource/
dbphttp://dbpedia.org/property/
dbrhttp://dbpedia.org/resource/
xsdhhttp://www.w3.org/2001/XMLSchema#
dbpedia-vihttp://vi.dbpedia.org/resource/
n20https://global.dbpedia.org/id/
goldhttp://purl.org/linguistics/gold/
wikidatahttp://www.wikidata.org/entity/
dbpedia-cyhttp://cy.dbpedia.org/resource/
dbpedia-ithttp://it.dbpedia.org/resource/
dbpedia-frhttp://fr.dbpedia.org/resource/
dbpedia-nlhttp://nl.dbpedia.org/resource/
yagohttp://dbpedia.org/class/yago/
dbohttp://dbpedia.org/ontology/

Statements

Subject Item
dbr:Table_of_prime_factors
rdf:type
yago:WikicatNumbers yago:Group100031264 yago:Abstraction100002137 yago:Table108266235 yago:Magnitude105090441 yago:Measure100033615 yago:DefiniteQuantity113576101 yago:Attribute100024264 yago:Property104916342 yago:Array107939382 yago:Arrangement107938773 yago:WikicatPrimeNumbers yago:Number105121418 yago:Number113582013 yago:Amount105107765 yago:PrimeNumber113594302 yago:Prime113594005 yago:WikicatMathematicalTables
rdfs:label
جدول التفكيك إلى عوامل أولية Table of prime factors Таблиця простих множників Таблица простых множителей 素因子表 Tavola dei fattori primi Table des facteurs premiers Tabel van priemfactoren
rdfs:comment
Cette table contient la décomposition en produit de facteurs premiers des nombres de 2 à 1000. Lecture du tableau * la fonction additive a0(n) a pour valeur la somme des facteurs premiers de n, comptés avec leur multiplicité. * lorsque n est premier, le facteur est en gras * par exemple, le nombre 616 se factorise en 23×7×11 ; le facteur 2 est présent trois fois dans la factorisation et apparaît donc à la puissance trois dans la factorisation. La somme des facteurs premiers vaut 2+2+2+7+11 = 24. Questa tavola contiene la fattorizzazione dei numeri interi da 1 a 1002. Note: * La funzione additiva a0(n) è la somma dei fattori primi di n. * Se n è primo, il fattore è evidenziato. * Il numero 1 ha un solo divisore, che è 1 stesso, non è un primo e non ha fattori primi. La somma dei suoi fattori primi è quindi 0. Deze tabel bevat de ontbinding in priemfactoren voor de getallen 1-1002. Nota bene: * De additieve functie a0(n) = som van de priemfactoren van n. * Als n een priemgetal is, is de priemfactor vet weergegeven. * Het getal 1 is geen priemgetal en heeft géén priemfactoren. Zie ook: Tabel van delers, priem en niet-priemdelers voor de getallen 1-1000. جدول التفكيك إلى عوامل أولية أو جدول التحليل إلى عوامل أولية، وهي عملية تفكيك عدد صحيح في الرياضيات إلى جداء عوامل أولية، وكتابة ذلك العدد على شكل جداء أعداد أولية.مثلا: تفكيك العدد 45 هو 3·3·5 أي 32·5. Таблица содержит факторизацию натуральных чисел от 1 до 1000. Если n - простое число (выделено жирным шрифтом ниже), то разложение состоит только из самого n. Число 1 не имеет простых делителей и не является ни простым, ни составным числом. Смотрите также: Таблица делителей (простые и составные делители чисел от 1 до 1000). The tables contain the prime factorization of the natural numbers from 1 to 1000. When n is a prime number, the prime factorization is just n itself, written in bold below. The number 1 is called a unit. It has no prime factors and is neither prime nor composite. Таблиця містить факторизацію натуральних чисел від 1 до 1000. Якщо n — просте число (виділене жирним шрифтом нижче), то розклад складається тільки з самого n. Число 1 не має простих дільників і не є ні простим, ні складеним числом. Див. також: Таблиця дільників (прості і складені дільники чисел від 1 до 1000). 這個表中包括1-2500的整數分解。 注1:a0(n) 等於n的質因數之和。 注2:當n 本身是質數時,因數顯示為黑色。
dcterms:subject
dbc:Number-related_lists dbc:Prime_numbers dbc:Mathematics-related_lists dbc:Elementary_number_theory dbc:Mathematical_tables
dbo:wikiPageID
222390
dbo:wikiPageRevisionID
1079440952
dbo:wikiPageWikiLink
dbr:775_(number) dbr:224_(number) dbr:317_(number) dbr:913_(number) dbr:644_(number) dbr:660_(number) dbr:914_(number) dbr:277_(number) dbr:352_(number) dbr:562_(number) dbr:645_(number) dbr:102_(number) dbr:770_(number) dbr:61_(number) dbr:915_(number) dbr:137_(number) dbr:771_(number) dbr:640_(number) dbr:12_(number) dbr:238_(number) dbr:350_(number) dbr:563_(number) dbr:140_(number) dbr:241_(number) dbr:843_(number) dbr:476_(number) dbr:86_(number) dbr:772_(number) dbr:720_(number) dbr:132_(number) dbr:844_(number) dbr:667_(number) dbr:641_(number) dbr:569_(number) dbr:605_(number) dbr:845_(number) dbr:204_(number) dbr:Prime_power dbr:477_(number) dbr:846_(number) dbr:779_(number) dbr:118_(number) dbr:664_(number) dbr:18_(number) dbr:642_(number) dbr:847_(number) dbr:478_(number) dbr:999_(number) dbr:178_(number) dbr:848_(number) dbr:665_(number) dbr:479_(number) dbr:99_(number) dbr:882_(number) dbr:Factorial dbr:919_(number) dbr:21_(number) dbr:318_(number) dbr:566_(number) dbr:602_(number) dbr:92_(number) dbr:189_(number) dbr:776_(number) dbr:319_(number) dbr:567_(number) dbr:45_(number) dbr:356_(number) dbr:190_(number) dbr:501_(number) dbr:239_(number) dbr:112_(number) dbr:608_(number) dbr:242_(number) dbr:916_(number) dbr:568_(number) dbr:647_(number) dbr:810_(number) dbr:283_(number) dbr:31_(number) dbr:648_(number) dbr:120_(number) dbr:917_(number) dbr:679_(number) dbr:500_(number) dbr:256_(number) dbr:161_(number) dbr:154_(number) dbr:354_(number) dbr:42_(number) dbr:918_(number) dbr:704_(number) dbr:668_(number) dbr:461_(number) dbr:358_(number) dbr:669_(number) dbr:849_(number) dbr:149_(number) dbr:606_(number) dbr:705_(number) dbr:146_(number) dbr:462_(number) dbr:815_(number) dbr:272_(number) dbr:173_(number) dbr:186_(number) dbr:576_(number) dbr:706_(number) dbr:607_(number) dbr:432_(number) dbr:816_(number) dbr:817_(number) dbr:172_(number) dbr:47_(number) dbr:818_(number) dbr:126_(number) dbr:225_(number) dbr:819_(number) dbr:851_(number) dbr:169_(number) dbr:460_(number) dbr:686_(number) dbr:37_(number) dbr:201_(number) dbr:852_(number) dbr:357_(number) dbr:430_(number) dbr:243_(number) dbr:853_(number) dbr:258_(number) dbr:72_(number) dbr:703_(number) dbr:Odd_number dbr:781_(number) dbr:193_(number) dbr:Regular_number dbr:854_(number) dbr:257_(number) dbr:782_(number) dbr:620_(number) dbr:812_(number) dbr:205_(number) dbr:783_(number) dbr:62_(number) dbr:708_(number) dbr:813_(number) dbr:784_(number) dbr:141_(number) dbr:185_(number) dbr:Achilles_number dbr:431_(number) dbr:814_(number) dbr:785_(number) dbr:245_(number) dbr:27_(number) dbr:434_(number) dbr:53_(number) dbr:709_(number) dbr:41_(number) dbr:150_(number) dbr:175_(number) dbr:850_(number) dbr:Square-free_integer dbr:87_(number) dbr:674_(number) dbr:920_(number) dbr:435_(number) dbr:301_(number) dbr:510_(number) dbr:244_(number) dbr:Decimal dbr:114_(number) dbr:480_(number) dbr:Prime_factor dbr:247_(number) dbr:675_(number) dbr:196_(number) dbr:676_(number) dbr:226_(number) dbr:263_(number) dbr:555_(number) dbr:677_(number) dbr:574_(number) dbr:789_(number) dbr:678_(number) dbr:108_(number) dbr:147_(number) dbr:433_(number) dbr:575_(number) dbr:670_(number) dbr:881_(number) dbr:75_(number) dbr:206_(number) dbr:923_(number) dbr:855_(number) dbr:671_(number) dbr:516_(number) dbr:652_(number) dbr:924_(number) dbr:856_(number) dbr:Divisor dbr:8_(number) dbr:93_(number) dbr:570_(number) dbr:438_(number) dbr:857_(number) dbr:925_(number) dbr:822_(number) dbr:517_(number) dbr:16_(number) dbr:673_(number) dbr:483_(number) dbr:207_(number) dbr:55_(number) dbr:653_(number) dbr:858_(number) dbr:926_(number) dbr:49_(number) dbr:823_(number) dbr:571_(number) dbr:513_(number) dbr:859_(number) dbr:927_(number) dbr:32_(number) dbr:572_(number) dbr:439_(number) dbr:824_(number) dbr:921_(number) dbr:514_(number) dbr:880_(number) dbr:436_(number) dbr:155_(number) dbr:788_(number) dbr:14_(number) dbr:227_(number) dbr:119_(number) dbr:922_(number) dbr:353_(number) dbr:481_(number) dbr:860_(number) dbr:81_(number) dbr:259_(number) dbr:820_(number) dbr:138_(number) dbr:651_(number) dbr:437_(number) dbr:482_(number) dbr:861_(number) dbr:228_(number) dbr:656_(number) dbr:50_(number) dbr:486_(number) dbr:25_(number) dbr:821_(number) dbr:533_(number) dbr:158_(number) dbr:274_(number) dbr:59_(number) dbr:701_(number) dbr:593_(number) dbr:657_(number) dbr:577_(number) dbr:210_(number) dbr:302_(number) dbr:534_(number) dbr:246_(number) dbr:535_(number) dbr:578_(number) dbr:487_(number) dbr:658_(number) dbr:Square_number dbr:275_(number) dbr:518_(number) dbr:355_(number) dbr:579_(number) dbr:654_(number) dbr:133_(number) dbr:536_(number) dbr:103_(number) dbr:530_(number) dbr:928_(number) dbr:Cube_(arithmetic) dbr:76_(number) dbr:519_(number) dbr:63_(number) dbr:113_(number) dbr:867_(number) dbr:208_(number) dbr:485_(number) dbr:304_(number) dbr:929_(number) dbr:796_(number) dbr:825_(number) dbr:612_(number) dbr:869_(number) dbr:531_(number) dbr:655_(number) dbr:797_(number) dbr:6_(number) dbr:320_(number) dbr:94_(number) dbr:712_(number) dbr:826_(number) dbr:798_(number) dbr:532_(number) dbr:17_(number) dbr:303_(number) dbr:827_(number) dbr:46_(number) dbr:799_(number) dbr:713_(number) dbr:278_(number) dbr:714_(number) dbr:862_(number) dbr:142_(number) dbr:829_(number) dbr:888_(number) dbr:863_(number) dbr:610_(number) dbr:211_(number) dbr:115_(number) dbr:279_(number) dbr:791_(number) dbr:864_(number) dbr:127_(number) dbr:209_(number) dbr:792_(number) dbr:865_(number) dbr:5_(number) dbr:683_(number) dbr:162_(number) dbr:88_(number) dbr:Additive_function dbr:793_(number) dbr:339_(number) dbr:866_(number) dbr:710_(number) dbr:324_(number) dbr:684_(number) dbr:402_(number) dbr:794_(number) dbr:488_(number) dbr:659_(number) dbr:537_(number) dbr:489_(number) dbr:Powerful_number dbr:795_(number) dbr:20_(number) dbr:685_(number) dbr:183_(number) dbr:615_(number) dbr:192_(number) dbr:280_(number) dbr:248_(number) dbr:538_(number) dbr:309_(number) dbr:188_(number) dbr:Smooth_number dbr:680_(number) dbr:Equidigital_number dbr:719_(number) dbr:539_(number) dbr:148_(number) dbr:249_(number) dbr:109_(number) dbr:176_(number) dbr:933_(number) dbr:326_(number) dbr:338_(number) dbr:359_(number) dbr:934_(number) dbr:800_(number) dbr:681_(number) dbr:43_(number) dbr:212_(number) dbr:139_(number) dbr:834_(number) dbr:682_(number) dbr:935_(number) dbr:384_(number) dbr:15_(number) dbr:716_(number) dbr:361_(number) dbr:835_(number) dbr:229_(number) dbr:Composite_number dbr:870_(number) dbr:837_(number) dbr:327_(number) dbr:54_(number) dbr:412_(number) dbr:838_(number) dbr:871_(number) dbr:930_(number) dbr:156_(number) dbr:872_(number) dbr:22_(number) dbr:582_(number) dbr:325_(number) dbr:718_(number) dbr:Natural_number dbr:931_(number) dbr:874_(number) dbr:153_(number) dbr:403_(number) dbr:687_(number) dbr:583_(number) dbr:30_(number) dbr:413_(number) dbr:830_(number) dbr:82_(number) dbr:875_(number) dbr:932_(number) dbr:281_(number) dbr:584_(number) dbr:831_(number) dbr:688_(number) dbr:151_(number) dbr:617_(number) dbr:876_(number) dbr:100_(number) dbr:89_(number) dbr:Ruth-Aaron_pair dbr:832_(number) dbr:187_(number) dbr:364_(number) dbr:11_(number) dbr:833_(number) dbr:689_(number) dbr:777_(number) dbr:521_(number) dbr:411_(number) dbr:511_(number) dbr:Sphenic_number dbr:540_(number) dbr:24_(number) dbr:35_(number) dbr:580_(number) dbr:38_(number) dbr:159_(number) dbr:490_(number) dbr:936_(number) dbr:260_(number) dbr:801_(number) dbr:491_(number) dbr:362_(number) dbr:213_(number) dbr:541_(number) dbr:441_(number) dbr:581_(number) dbr:937_(number) dbr:742_(number) dbr:184_(number) dbr:95_(number) dbr:163_(number) dbr:938_(number) dbr:134_(number) dbr:405_(number) dbr:121_(number) dbr:328_(number) dbr:64_(number) dbr:417_(number) dbr:939_(number) dbr:Prime_number dbr:744_(number) dbr:48_(number) dbr:195_(number) dbr:745_(number) dbr:525_(number) dbc:Prime_numbers dbr:329_(number) dbr:721_(number) dbr:13_(number) dbr:746_(number) dbr:877_(number) dbr:418_(number) dbr:4_(number) dbr:585_(number) dbr:878_(number) dbr:879_(number) dbr:200_(number) dbr:722_(number) dbr:367_(number) dbr:143_(number) dbr:545_(number) dbr:443_(number) dbr:305_(number) dbr:306_(number) dbr:522_(number) dbr:307_(number) dbr:368_(number) dbr:587_(number) dbr:691_(number) dbr:308_(number) dbr:269_(number) dbr:546_(number) dbr:440_(number) dbr:415_(number) dbr:83_(number) dbr:Extravagant_number dbr:523_(number) dbr:497_(number) dbr:Almost_prime dbr:547_(number) dbr:26_(number) dbr:310_(number) dbr:588_(number) dbr:Perfect_power dbr:512_(number) dbr:692_(number) dbr:589_(number) dbr:492_(number) dbr:900_(number) dbr:214_(number) dbr:524_(number) dbr:77_(number) dbr:56_(number) dbr:289_(number) dbr:408_(number) dbr:493_(number) dbr:291_(number) dbr:442_(number) dbr:116_(number) dbr:360_(number) dbc:Mathematics-related_lists dbr:968_(number) dbr:726_(number) dbr:528_(number) dbr:284_(number) dbr:969_(number) dbr:366_(number) dbr:748_(number) dbr:Primorial dbr:836_(number) dbr:941_(number) dbr:Coprime dbr:529_(number) dbr:494_(number) dbr:10_(number) dbr:749_(number) dbr:544_(number) dbr:34_(number) dbr:942_(number) dbr:728_(number) dbr:409_(number) dbr:181_(number) dbr:690_(number) dbr:401_(number) dbr:446_(number) dbr:290_(number) dbr:261_(number) dbr:404_(number) dbr:166_(number) dbr:943_(number) dbr:406_(number) dbr:526_(number) dbr:Big_Omega_function_(prime_factor) dbr:407_(number) dbr:262_(number) dbr:840_(number) dbr:698_(number) dbr:723_(number) dbr:414_(number) dbr:416_(number) dbr:419_(number) dbr:944_(number) dbr:80_(number) dbr:699_(number) dbr:527_(number) dbr:700_(number) dbr:447_(number) dbr:444_(number) dbr:724_(number) dbr:110_(number) dbr:885_(number) dbr:312_(number) dbr:314_(number) dbr:623_(number) dbr:548_(number) dbr:321_(number) dbr:725_(number) dbr:322_(number) dbr:886_(number) dbr:323_(number) dbr:498_(number) dbr:590_(number) dbr:336_(number) dbr:887_(number) dbr:343_(number) dbr:549_(number) dbr:940_(number) dbr:624_(number) dbr:351_(number) dbc:Elementary_number_theory dbr:591_(number) dbr:694_(number) dbr:499_(number) dbr:67_(number) dbr:592_(number) dbr:292_(number) dbr:445_(number) dbr:380_(number) dbr:695_(number) dbr:802_(number) dbr:515_(number) dbr:520_(number) dbr:621_(number) dbr:696_(number) dbr:542_(number) dbr:841_(number) dbr:543_(number) dbr:550_(number) dbr:556_(number) dbr:751_(number) dbr:697_(number) dbr:293_(number) dbr:230_(number) dbr:400_(number) dbr:573_(number) dbr:586_(number) dbr:752_(number) dbr:622_(number) dbr:130_(number) dbr:729_(number) dbr:495_(number) dbr:753_(number) dbr:884_(number) dbr:972_(number) dbr:152_(number) dbr:786_(number) dbr:603_(number) dbr:629_(number) dbr:604_(number) dbr:609_(number) dbr:754_(number) dbr:383_(number) dbr:457_(number) dbr:458_(number) dbr:341_(number) dbr:945_(number) dbr:974_(number) dbr:157_(number) dbr:975_(number) dbr:599_(number) dbr:448_(number) dbr:342_(number) dbr:946_(number) dbr:947_(number) dbr:104_(number) dbr:449_(number) dbr:124_(number) dbr:502_(number) dbr:135_(number) dbr:948_(number) dbr:503_(number) dbr:106_(number) dbr:750_(number) dbr:505_(number) dbr:101_(number) dbr:128_(number) dbr:949_(number) dbr:506_(number) dbr:295_(number) dbr:508_(number) dbr:509_(number) dbc:Mathematical_tables dbr:285_(number) dbr:702_(number) dbr:707_(number) dbr:711_(number) dbr:717_(number) dbr:340_(number) dbr:970_(number) dbr:727_(number) dbr:594_(number) dbr:381_(number) dbr:734_(number) dbr:737_(number) dbr:177_(number) dbr:889_(number) dbr:250_(number) dbr:330_(number) dbr:191_(number) dbr:628_(number) dbr:741_(number) dbr:595_(number) dbr:747_(number) dbr:194_(number) dbr:759_(number) dbr:382_(number) dbr:757_(number) dbr:767_(number) dbr:296_(number) dbr:551_(number) dbr:778_(number) dbr:215_(number) dbr:84_(number) dbr:596_(number) dbr:787_(number) dbr:344_(number) dbr:170_(number) dbr:282_(number) dbr:597_(number) dbr:96_(number) dbr:387_(number) dbr:23_(number) dbr:90_(number) dbr:331_(number) dbr:611_(number) dbr:552_(number) dbr:Semiprime dbr:614_(number) dbr:618_(number) dbr:619_(number) dbr:294_(number) dbr:598_(number) dbr:311_(number) dbr:287_(number) dbr:755_(number) dbr:Greatest_common_divisor dbr:465_(number) dbr:388_(number) dbr:625_(number) dbr:626_(number) dbr:496_(number) dbr:971_(number) dbr:345_(number) dbr:268_(number) dbr:363_(number) dbr:627_(number) dbr:756_(number) dbr:646_(number) dbr:649_(number) dbr:650_(number) dbr:122_(number) dbr:672_(number) dbr:60_(number) dbr:977_(number) dbr:385_(number) dbr:732_(number) dbr:978_(number) dbr:298_(number) dbr:78_(number) dbr:979_(number) dbr:951_(number) dbr:164_(number) dbr:51_(number) dbr:758_(number) dbr:911_(number) dbr:733_(number) dbr:313_(number) dbr:333_(number) dbr:952_(number) dbr:908_(number) dbr:Liouville_function dbr:463_(number) dbr:976_(number) dbr:953_(number) dbr:790_(number) dbr:386_(number) dbr:954_(number) dbr:231_(number) dbr:299_(number) dbr:286_(number) dbr:57_(number) dbr:Integer_factorization dbr:70_(number) dbr:955_(number) dbr:464_(number) dbr:730_(number) dbr:348_(number) dbr:270_(number) dbr:199_(number) dbr:893_(number) dbr:902_(number) dbr:484_(number) dbr:469_(number) dbr:423_(number) dbr:894_(number) dbr:895_(number) dbr:297_(number) dbr:808_(number) dbr:811_(number) dbr:349_(number) dbr:3_(number) dbr:896_(number) dbr:332_(number) dbr:365_(number) dbr:828_(number) dbr:144_(number) dbr:903_(number) dbr:731_(number) dbr:897_(number) dbr:Möbius_function dbr:Frugal_number dbr:898_(number) dbr:630_(number) dbr:553_(number) dbr:899_(number) dbr:2_(number) dbr:868_(number) dbr:424_(number) dbr:873_(number) dbr:97_(number) dbr:554_(number) dbr:950_(number) dbr:842_(number) dbr:44_(number) dbr:389_(number) dbr:883_(number) dbr:600_(number) dbr:167_(number) dbr:466_(number) dbr:65_(number) dbr:346_(number) dbr:558_(number) dbr:507_(number) dbr:370_(number) dbr:68_(number) dbr:316_(number) dbr:421_(number) dbr:182_(number) dbr:233_(number) dbr:559_(number) dbr:467_(number) dbr:347_(number) dbr:738_(number) dbr:973_(number) dbr:271_(number) dbr:890_(number) dbr:735_(number) dbr:422_(number) dbr:371_(number) dbr:451_(number) dbr:232_(number) dbr:891_(number) dbr:216_(number) dbr:985_(number) dbr:468_(number) dbr:736_(number) dbr:892_(number) dbr:39_(number) dbr:634_(number) dbr:956_(number) dbr:986_(number) dbr:251_(number) dbr:452_(number) dbr:909_(number) dbr:957_(number) dbr:987_(number) dbr:635_(number) dbr:334_(number) dbr:958_(number) dbr:988_(number) dbr:19_(number) dbr:959_(number) dbr:636_(number) dbr:428_(number) dbr:504_(number) dbr:450_(number) dbr:217_(number) dbr:288_(number) dbr:980_(number) dbr:335_(number) dbr:904_(number) dbr:234_(number) dbr:Least_common_multiple dbr:557_(number) dbr:374_(number) dbr:981_(number) dbr:631_(number) dbr:905_(number) dbr:425_(number) dbr:117_(number) dbr:91_(number) dbr:763_(number) dbr:780_(number) dbr:454_(number) dbr:982_(number) dbr:79_(number) dbr:632_(number) dbr:375_(number) dbr:73_(number) dbr:220_(number) dbr:131_(number) dbr:983_(number) dbr:906_(number) dbr:984_(number) dbr:764_(number) dbr:633_(number) dbr:426_(number) dbr:369_(number) dbr:264_(number) dbr:455_(number) dbr:907_(number) dbr:739_(number) dbr:997_(number) dbr:765_(number) dbr:105_(number) dbr:252_(number) dbr:998_(number) dbr:766_(number) dbr:427_(number) dbr:36_(number) dbr:372_(number) dbr:136_(number) dbr:174_(number) dbr:221_(number) dbr:666_(number) dbr:125_(number) dbr:1_(number) dbr:760_(number) dbr:111_(number) dbr:989_(number) dbr:28_(number) dbr:803_(number) dbr:373_(number) dbr:7_(number) dbr:453_(number) dbr:637_(number) dbr:761_(number) dbr:218_(number) dbr:378_(number) dbr:740_(number) dbr:410_(number) dbr:638_(number) dbr:762_(number) dbr:379_(number) dbr:639_(number) dbr:420_(number) dbr:273_(number) dbr:693_(number) dbr:429_(number) dbr:52_(number) dbr:901_(number) dbr:40_(number) dbr:616_(number) dbr:165_(number) dbr:222_(number) dbr:459_(number) dbr:66_(number) dbr:613_(number) dbr:253_(number) dbr:171_(number) dbr:123_(number) dbr:265_(number) dbr:Unit_(ring_theory) dbr:33_(number) dbr:376_(number) dbr:235_(number) dbr:456_(number) dbr:85_(number) dbr:393_(number) dbr:240_(number) dbr:470_(number) dbr:715_(number) dbr:990_(number) dbr:266_(number) dbr:377_(number) dbr:1000_(number) dbr:129_(number) dbr:390_(number) dbr:768_(number) dbr:267_(number) dbr:769_(number) dbr:471_(number) dbr:219_(number) dbr:315_(number) dbr:Even_number dbr:963_(number) dbr:300_(number) dbr:804_(number) dbr:98_(number) dbr:391_(number) dbr:964_(number) dbr:29_(number) dbr:560_(number) dbr:805_(number) dbr:965_(number) dbr:168_(number) dbr:392_(number) dbr:202_(number) dbr:398_(number) dbr:966_(number) dbr:107_(number) dbr:806_(number) dbr:967_(number) dbr:399_(number) dbr:145_(number) dbr:160_(number) dbr:561_(number) dbr:807_(number) dbr:474_(number) dbr:960_(number) dbr:743_(number) dbr:254_(number) dbr:180_(number) dbr:236_(number) dbr:69_(number) dbr:255_(number) dbr:991_(number) dbr:394_(number) dbr:237_(number) dbr:475_(number) dbr:961_(number) dbr:List_of_prime_numbers dbr:71_(number) dbr:9_(number) dbr:992_(number) dbr:661_(number) dbr:203_(number) dbr:962_(number) dbr:395_(number) dbr:993_(number) dbr:74_(number) dbr:662_(number) dbr:276_(number) dbr:994_(number) dbr:601_(number) dbr:396_(number) dbr:472_(number) dbr:663_(number) dbr:197_(number) dbr:995_(number) dbr:773_(number) dbr:223_(number) dbr:397_(number) dbr:564_(number) dbr:996_(number) dbr:910_(number) dbr:179_(number) dbr:Table_of_divisors dbr:774_(number) dbr:58_(number) dbr:473_(number) dbr:809_(number) dbc:Number-related_lists dbr:565_(number) dbr:337_(number) dbr:912_(number) dbr:643_(number) dbr:839_(number)
owl:sameAs
dbpedia-tr:Asal_çarpanlar_tablosu dbpedia-cy:Tabl_o_ffactorau_cysefin freebase:m.01gg2j dbpedia-th:ตารางตัวประกอบเฉพาะ dbpedia-sl:Tabela_prafaktorjev_števil dbpedia-nl:Tabel_van_priemfactoren dbpedia-ar:جدول_التفكيك_إلى_عوامل_أولية yago-res:Table_of_prime_factors n20:4nyxx dbpedia-uk:Таблиця_простих_множників dbpedia-zh:素因子表 dbpedia-it:Tavola_dei_fattori_primi dbpedia-ru:Таблица_простых_множителей dbpedia-vi:Bảng_thừa_số_nguyên_tố dbpedia-fr:Table_des_facteurs_premiers wikidata:Q611422
dbp:wikiPageUsesTemplate
dbt:Pp dbt:OEIS
dbo:abstract
Таблиця містить факторизацію натуральних чисел від 1 до 1000. Якщо n — просте число (виділене жирним шрифтом нижче), то розклад складається тільки з самого n. Число 1 не має простих дільників і не є ні простим, ні складеним числом. Див. також: Таблиця дільників (прості і складені дільники чисел від 1 до 1000). Questa tavola contiene la fattorizzazione dei numeri interi da 1 a 1002. Note: * La funzione additiva a0(n) è la somma dei fattori primi di n. * Se n è primo, il fattore è evidenziato. * Il numero 1 ha un solo divisore, che è 1 stesso, non è un primo e non ha fattori primi. La somma dei suoi fattori primi è quindi 0. The tables contain the prime factorization of the natural numbers from 1 to 1000. When n is a prime number, the prime factorization is just n itself, written in bold below. The number 1 is called a unit. It has no prime factors and is neither prime nor composite. 這個表中包括1-2500的整數分解。 注1:a0(n) 等於n的質因數之和。 注2:當n 本身是質數時,因數顯示為黑色。 Cette table contient la décomposition en produit de facteurs premiers des nombres de 2 à 1000. Lecture du tableau * la fonction additive a0(n) a pour valeur la somme des facteurs premiers de n, comptés avec leur multiplicité. * lorsque n est premier, le facteur est en gras * par exemple, le nombre 616 se factorise en 23×7×11 ; le facteur 2 est présent trois fois dans la factorisation et apparaît donc à la puissance trois dans la factorisation. La somme des facteurs premiers vaut 2+2+2+7+11 = 24. جدول التفكيك إلى عوامل أولية أو جدول التحليل إلى عوامل أولية، وهي عملية تفكيك عدد صحيح في الرياضيات إلى جداء عوامل أولية، وكتابة ذلك العدد على شكل جداء أعداد أولية.مثلا: تفكيك العدد 45 هو 3·3·5 أي 32·5. Deze tabel bevat de ontbinding in priemfactoren voor de getallen 1-1002. Nota bene: * De additieve functie a0(n) = som van de priemfactoren van n. * Als n een priemgetal is, is de priemfactor vet weergegeven. * Het getal 1 is geen priemgetal en heeft géén priemfactoren. Zie ook: Tabel van delers, priem en niet-priemdelers voor de getallen 1-1000. Таблица содержит факторизацию натуральных чисел от 1 до 1000. Если n - простое число (выделено жирным шрифтом ниже), то разложение состоит только из самого n. Число 1 не имеет простых делителей и не является ни простым, ни составным числом. Смотрите также: Таблица делителей (простые и составные делители чисел от 1 до 1000).
gold:hypernym
dbr:Number
prov:wasDerivedFrom
wikipedia-en:Table_of_prime_factors?oldid=1079440952&ns=0
dbo:wikiPageLength
48499
foaf:isPrimaryTopicOf
wikipedia-en:Table_of_prime_factors