"Decimaltal \u00E4r ett tal som inneh\u00E5ller ett decimaltecken, f\u00F6ljt av en eller flera decimaler. Utskrivningen kallas decimalutveckling, och best\u00E5r av ett heltal och en \u00E4ndlig eller o\u00E4ndlig f\u00F6ljd av decimaler som best\u00E4mmer ett reellt tal. Till exempel har -7/3 (den o\u00E4ndliga) decimalutvecklingen -2,333333... (med ett o\u00E4ndligt antal treor). Talet 1/8 har tv\u00E5 decimalutvecklingar, dels en \u00E4ndlig (0,125) och dels en o\u00E4ndlig (0,124999999... (med ett o\u00E4ndligt antal nior)."@sv . "En math\u00E9matiques, le d\u00E9veloppement d\u00E9cimal est une fa\u00E7on d'\u00E9crire des nombres r\u00E9els positifs \u00E0 l'aide des puissances de dix (d'exposant positif ou n\u00E9gatif). Lorsque les nombres sont des entiers naturels, le d\u00E9veloppement d\u00E9cimal correspond \u00E0 l'\u00E9criture en base dix. Lorsqu'ils sont d\u00E9cimaux, on obtient un d\u00E9veloppement d\u00E9cimal limit\u00E9. Lorsqu'ils sont rationnels, on obtient soit, encore, un d\u00E9veloppement d\u00E9cimal limit\u00E9, soit un d\u00E9veloppement d\u00E9cimal illimit\u00E9, mais alors n\u00E9cessairement p\u00E9riodique. Enfin, lorsqu'ils sont irrationnels, le d\u00E9veloppement d\u00E9cimal est illimit\u00E9 et non p\u00E9riodique."@fr . . "Decimaltal"@sv . . . "Desetinn\u00E9 \u010D\u00EDslo je zp\u016Fsob z\u00E1pisu \u010D\u00EDsla pomoc\u00ED cel\u00E9 \u010D\u00E1sti a desetinn\u00E9 \u010D\u00E1sti odd\u011Blen\u00E9 desetinnou \u010D\u00E1rkou (v anglosask\u00E9m sv\u011Bt\u011B desetinnou te\u010Dkou \u2013 tento zp\u016Fsob z\u00E1pisu je \u010Dasto pou\u017E\u00EDvan\u00FD ve v\u00FDpo\u010Detn\u00ED technice, bez ohledu na jazyk), nap\u0159\u00EDklad 1,5 nebo 122,35. Na prvn\u00EDm m\u00EDst\u011B za desetinnou \u010D\u00E1rkou jsou desetiny, na druh\u00E9m setiny, atd. Pro z\u00E1pis \u010D\u00EDsel s periodick\u00FDm desetinn\u00FDm rozvojem se n\u011Bkdy pou\u017E\u00EDv\u00E1 symbol pruh nad \u010D\u00EDslicemi, kter\u00E9 se opakuj\u00ED: 0,142857. U \u010D\u00EDsel s neperiodick\u00FDm rozvojem se nazna\u010Duje pokra\u010Dov\u00E1n\u00ED rozvoje pomoc\u00ED t\u0159\u00ED te\u010Dek: 3,141592\u2026"@cs . . . . "A decimal representation of a non-negative real number r is its expression as a sequence of symbols consisting of decimal digits traditionally written with a single separator: Here . is the decimal separator, k is a nonnegative integer, and are digits, which are symbols representing integers in the range 0, ..., 9. Commonly, if The sequence of the \u2014the digits after the dot\u2014is generally infinite. If it is finite, the lacking digits are assumed to be 0. If all are 0, the separator is also omitted, resulting in a finite sequence of digits, which represents a natural number. The decimal representation represents the infinite sum: Every nonnegative real number has at least one such representation; it has two such representations (with if ) if and only if one has a trailing infinite sequence of 0, and the other has a trailing infinite sequence of 9. For having a one-to-one correspondence between nonnegative real numbers and decimal representations, decimal representations with a trailing infinite sequence of 9 are sometimes excluded."@en . "Desetinn\u00E9 \u010D\u00EDslo je zp\u016Fsob z\u00E1pisu \u010D\u00EDsla pomoc\u00ED cel\u00E9 \u010D\u00E1sti a desetinn\u00E9 \u010D\u00E1sti odd\u011Blen\u00E9 desetinnou \u010D\u00E1rkou (v anglosask\u00E9m sv\u011Bt\u011B desetinnou te\u010Dkou \u2013 tento zp\u016Fsob z\u00E1pisu je \u010Dasto pou\u017E\u00EDvan\u00FD ve v\u00FDpo\u010Detn\u00ED technice, bez ohledu na jazyk), nap\u0159\u00EDklad 1,5 nebo 122,35. Na prvn\u00EDm m\u00EDst\u011B za desetinnou \u010D\u00E1rkou jsou desetiny, na druh\u00E9m setiny, atd. Pro z\u00E1pis \u010D\u00EDsel s periodick\u00FDm desetinn\u00FDm rozvojem se n\u011Bkdy pou\u017E\u00EDv\u00E1 symbol pruh nad \u010D\u00EDslicemi, kter\u00E9 se opakuj\u00ED: 0,142857. U \u010D\u00EDsel s neperiodick\u00FDm rozvojem se nazna\u010Duje pokra\u010Dov\u00E1n\u00ED rozvoje pomoc\u00ED t\u0159\u00ED te\u010Dek: 3,141592\u2026"@cs . . . "Decimal representation"@en . . . "\u5C0F\u6570"@ja . . "\u5C0F\u6570\uFF0C\u662F\u5BE6\u6570\u7684\u4E00\u79CD\u7279\u6B8A\u7684\u8868\u73B0\u5F62\u5F0F\u3002\u6240\u6709\u5206\u6570\u90FD\u53EF\u4EE5\u8868\u793A\u6210\u5C0F\u6570\uFF0C\u5C0F\u6570\u4E2D\u7684\u5706\u70B9\u53EB\u505A\u5C0F\u6570\u70B9\uFF0C\u5B83\u662F\u4E00\u4E2A\u5C0F\u6570\u7684\u6574\u6570\u90E8\u5206\u548C\u5C0F\u6570\u90E8\u5206\u7684\u5206\u754C\u53F7\u3002\u5176\u4E2D\u6574\u6570\u90E8\u5206\u662F\u96F6\u7684\u5C0F\u6570\u79F0\u4E3A\u7EAF\u5C0F\u6570\uFF0C\u6574\u6570\u90E8\u5206\u4E0D\u662F\u96F6\u7684\u5C0F\u6570\u79F0\u4E3A\u5E26\u5C0F\u6570\u3002"@zh . . "1119771459"^^ . "Representa\u00E7\u00E3o decimal de um n\u00FAmero real n\u00E3o-negativo r \u00E9 uma express\u00E3o da forma. onde \u00E9 um n\u00FAmero natural, e s\u00E3o n\u00FAmeros naturais que satisfazem ; Isto \u00E9 frequentemente escrito de modo mais compacto e elegante como segue: Significa-se, com esta \u00FAltima forma, que \u00E9 a parte inteira de , n\u00E3o necessariamente entre 0 e 9, e s\u00E3o os d\u00EDgitos que comp\u00F5em a parte fracion\u00E1ria (ou \"n\u00E3o-inteira\") de"@pt . . . . . . "9978"^^ . . . . . "D\u00E9veloppement d\u00E9cimal"@fr . . . . . . "Una representaci\u00F3 decimal d'un nombre real no negatiu r \u00E9s una expressi\u00F3 en forma d'una s\u00E8rie, que tradicionalment s'escriu com la suma on a0 \u00E9s un enter no negatiu, i a1, a\u2082, \u2026 s\u00F3n enters que satisfan 0 \u2264 ai \u2264 9, que hom anomena els d\u00EDgits de la representaci\u00F3 decimal. La successi\u00F3 de d\u00EDgits pot ser finita, i en aquest cas els d\u00EDgits posteriors ai s\u00F3n 0. Alguns autors estan en contra de les representacions decimals amb una seq\u00FC\u00E8ncia infinita de 9. Tot i aquesta restricci\u00F3, encara existeix una representaci\u00F3 decimal per a cada real no negatiu, i addicionalment fa que aquesta representaci\u00F3 sigui \u00FAnica. El nombre que es defineix per una representaci\u00F3 decimal s'acostuma a escriure:"@ca . "En matem\u00E1ticas, la representaci\u00F3n decimal es una manera de escribir n\u00FAmeros reales positivos, por medio de potencias del n\u00FAmero 10 (negativas y/o positivas). En el caso de los n\u00FAmeros naturales, la representaci\u00F3n decimal corresponde a la escritura en base 10 usual; para los n\u00FAmeros racionales, se obtiene una representaci\u00F3n decimal limitada, o ilimitada peri\u00F3dica si son n\u00FAmeros peri\u00F3dicos; si son irracionales, la representaci\u00F3n decimal es ilimitada y no peri\u00F3dica."@es . . . "Representaci\u00F3 decimal"@ca . "Representasi desimal adalah simbol untuk memisahkan bilangan bulat dengan bagian angka yang ditulis dalam bentuk desimal. Simbol dalam representasi desimal berbeda dalam setiap budaya. Pemilihan dari simbol representasi desimal akan memengaruhi pilihan dari simbol yang digunakan untuk pemisah bilangan ribuan. \n* l \n* \n* s"@in . . "En math\u00E9matiques, le d\u00E9veloppement d\u00E9cimal est une fa\u00E7on d'\u00E9crire des nombres r\u00E9els positifs \u00E0 l'aide des puissances de dix (d'exposant positif ou n\u00E9gatif). Lorsque les nombres sont des entiers naturels, le d\u00E9veloppement d\u00E9cimal correspond \u00E0 l'\u00E9criture en base dix. Lorsqu'ils sont d\u00E9cimaux, on obtient un d\u00E9veloppement d\u00E9cimal limit\u00E9. Lorsqu'ils sont rationnels, on obtient soit, encore, un d\u00E9veloppement d\u00E9cimal limit\u00E9, soit un d\u00E9veloppement d\u00E9cimal illimit\u00E9, mais alors n\u00E9cessairement p\u00E9riodique. Enfin, lorsqu'ils sont irrationnels, le d\u00E9veloppement d\u00E9cimal est illimit\u00E9 et non p\u00E9riodique."@fr . . "\uC18C\uC218 (\uAE30\uC218\uBC95)"@ko . . . . . "\u5C0F\u6570\uFF08\u3057\u3087\u3046\u3059\u3046\u3001 \u82F1: decimal\uFF09\u3068\u306F\u3001\u4F4D\u53D6\u308A\u8A18\u6570\u6CD5\u3068\u5C0F\u6570\u70B9\u3092\u7528\u3044\u3066\u5B9F\u6570\u3092\u8868\u73FE\u3059\u308B\u305F\u3081\u306E\u8868\u8A18\u6CD5\u3067\u3042\u308B\u3002"@ja . . . "Decimaltal \u00E4r ett tal som inneh\u00E5ller ett decimaltecken, f\u00F6ljt av en eller flera decimaler. Utskrivningen kallas decimalutveckling, och best\u00E5r av ett heltal och en \u00E4ndlig eller o\u00E4ndlig f\u00F6ljd av decimaler som best\u00E4mmer ett reellt tal. Till exempel har -7/3 (den o\u00E4ndliga) decimalutvecklingen -2,333333... (med ett o\u00E4ndligt antal treor). Talet 1/8 har tv\u00E5 decimalutvecklingar, dels en \u00E4ndlig (0,125) och dels en o\u00E4ndlig (0,124999999... (med ett o\u00E4ndligt antal nior)."@sv . . "\u5C0F\u6570"@zh . . "Representasi desimal adalah simbol untuk memisahkan bilangan bulat dengan bagian angka yang ditulis dalam bentuk desimal. Simbol dalam representasi desimal berbeda dalam setiap budaya. Pemilihan dari simbol representasi desimal akan memengaruhi pilihan dari simbol yang digunakan untuk pemisah bilangan ribuan. \n* l \n* \n* s"@in . . . . . . . "Desetinn\u00E9 \u010D\u00EDslo"@cs . . . . "Representasi desimal"@in . "Representa\u00E7\u00E3o decimal de um n\u00FAmero real n\u00E3o-negativo r \u00E9 uma express\u00E3o da forma. onde \u00E9 um n\u00FAmero natural, e s\u00E3o n\u00FAmeros naturais que satisfazem ; Isto \u00E9 frequentemente escrito de modo mais compacto e elegante como segue: Significa-se, com esta \u00FAltima forma, que \u00E9 a parte inteira de , n\u00E3o necessariamente entre 0 e 9, e s\u00E3o os d\u00EDgitos que comp\u00F5em a parte fracion\u00E1ria (ou \"n\u00E3o-inteira\") de A aparente exig\u00EAncia de ser o n\u00FAmero real \"n\u00E3o-negativo\" justifica-se: para os n\u00FAmeros reais negativos, a representa\u00E7\u00E3o formal \u00E9 a mesma precisamente, bastando juntar-se-lhe o sinal convencional de n\u00FAmero negativo (o sinal \"\u2013\"). O sinal \"\u2013\" entende-se, ent\u00E3o, como um operador de invers\u00E3o ou simetria aditiva: o operador capaz de transformar um dado n\u00FAmero no seu inverso aditivo (ou sim\u00E9trico aditivo)."@pt . "\u5C0F\u6570\uFF0C\u662F\u5BE6\u6570\u7684\u4E00\u79CD\u7279\u6B8A\u7684\u8868\u73B0\u5F62\u5F0F\u3002\u6240\u6709\u5206\u6570\u90FD\u53EF\u4EE5\u8868\u793A\u6210\u5C0F\u6570\uFF0C\u5C0F\u6570\u4E2D\u7684\u5706\u70B9\u53EB\u505A\u5C0F\u6570\u70B9\uFF0C\u5B83\u662F\u4E00\u4E2A\u5C0F\u6570\u7684\u6574\u6570\u90E8\u5206\u548C\u5C0F\u6570\u90E8\u5206\u7684\u5206\u754C\u53F7\u3002\u5176\u4E2D\u6574\u6570\u90E8\u5206\u662F\u96F6\u7684\u5C0F\u6570\u79F0\u4E3A\u7EAF\u5C0F\u6570\uFF0C\u6574\u6570\u90E8\u5206\u4E0D\u662F\u96F6\u7684\u5C0F\u6570\u79F0\u4E3A\u5E26\u5C0F\u6570\u3002"@zh . "( 1\uACFC \uC790\uAE30 \uC790\uC2E0\uB9CC\uC744 \uC57D\uC218\uB85C \uAC16\uB294 \uC218(\u7D20\u6578, prime number)\uC5D0 \uB300\uD574\uC11C\uB294 \uC18C\uC218 (\uC218\uB860) \uBB38\uC11C\uB97C \uCC38\uACE0\uD558\uC2ED\uC2DC\uC624.) \uC218\uD559\uC758 \uAE30\uC218\uBC95\uC5D0\uC11C \uC18C\uC218(\u5C0F\u6578, \uC601\uC5B4: decimal)\uB294 \uAC01\uAC01\uC758 \uC790\uB9AC\uC5D0 \uB193\uC778 \uC22B\uC790\uC640 \uC18C\uC218\uC810\uC744 \uD1B5\uD574 \uB098\uD0C0\uB0B8 \uC2E4\uC218\uC774\uB2E4. \uC18C\uC218\uC810 \uC67C\uCABD\uC5D0 \uB193\uC778 \uC22B\uC790\uB4E4\uC740 \uC2E4\uC218\uC758 \uC815\uC218 \uBD80\uBD84, \uC18C\uC218\uC810 \uC624\uB978\uCABD\uC5D0 \uB193\uC778 \uC22B\uC790\uB4E4\uC740 \uC2E4\uC218\uC758 \uC18C\uC218 \uBD80\uBD84\uC744 \uB098\uD0C0\uB0B8\uB2E4."@ko . . . . . . . . . . . . . . . . . "Una representaci\u00F3 decimal d'un nombre real no negatiu r \u00E9s una expressi\u00F3 en forma d'una s\u00E8rie, que tradicionalment s'escriu com la suma on a0 \u00E9s un enter no negatiu, i a1, a\u2082, \u2026 s\u00F3n enters que satisfan 0 \u2264 ai \u2264 9, que hom anomena els d\u00EDgits de la representaci\u00F3 decimal. La successi\u00F3 de d\u00EDgits pot ser finita, i en aquest cas els d\u00EDgits posteriors ai s\u00F3n 0. Alguns autors estan en contra de les representacions decimals amb una seq\u00FC\u00E8ncia infinita de 9. Tot i aquesta restricci\u00F3, encara existeix una representaci\u00F3 decimal per a cada real no negatiu, i addicionalment fa que aquesta representaci\u00F3 sigui \u00FAnica. El nombre que es defineix per una representaci\u00F3 decimal s'acostuma a escriure: \u00C9s a dir, a0 \u00E9s la part entera de r, no necess\u00E0riament entre 0 i 9, i a1, a\u2082, a\u2083, \u2026 s\u00F3n els d\u00EDgits que configuren la part fraccion\u00E0ria de r. Totes dues notacions s\u00F3n, per definici\u00F3, el seg\u00FCent l\u00EDmit: ."@ca . "3293594"^^ . "Representaci\u00F3n decimal"@es . "( 1\uACFC \uC790\uAE30 \uC790\uC2E0\uB9CC\uC744 \uC57D\uC218\uB85C \uAC16\uB294 \uC218(\u7D20\u6578, prime number)\uC5D0 \uB300\uD574\uC11C\uB294 \uC18C\uC218 (\uC218\uB860) \uBB38\uC11C\uB97C \uCC38\uACE0\uD558\uC2ED\uC2DC\uC624.) \uC218\uD559\uC758 \uAE30\uC218\uBC95\uC5D0\uC11C \uC18C\uC218(\u5C0F\u6578, \uC601\uC5B4: decimal)\uB294 \uAC01\uAC01\uC758 \uC790\uB9AC\uC5D0 \uB193\uC778 \uC22B\uC790\uC640 \uC18C\uC218\uC810\uC744 \uD1B5\uD574 \uB098\uD0C0\uB0B8 \uC2E4\uC218\uC774\uB2E4. \uC18C\uC218\uC810 \uC67C\uCABD\uC5D0 \uB193\uC778 \uC22B\uC790\uB4E4\uC740 \uC2E4\uC218\uC758 \uC815\uC218 \uBD80\uBD84, \uC18C\uC218\uC810 \uC624\uB978\uCABD\uC5D0 \uB193\uC778 \uC22B\uC790\uB4E4\uC740 \uC2E4\uC218\uC758 \uC18C\uC218 \uBD80\uBD84\uC744 \uB098\uD0C0\uB0B8\uB2E4."@ko . "A decimal representation of a non-negative real number r is its expression as a sequence of symbols consisting of decimal digits traditionally written with a single separator: Here . is the decimal separator, k is a nonnegative integer, and are digits, which are symbols representing integers in the range 0, ..., 9. Commonly, if The sequence of the \u2014the digits after the dot\u2014is generally infinite. If it is finite, the lacking digits are assumed to be 0. If all are 0, the separator is also omitted, resulting in a finite sequence of digits, which represents a natural number."@en . . "En matem\u00E1ticas, la representaci\u00F3n decimal es una manera de escribir n\u00FAmeros reales positivos, por medio de potencias del n\u00FAmero 10 (negativas y/o positivas). En el caso de los n\u00FAmeros naturales, la representaci\u00F3n decimal corresponde a la escritura en base 10 usual; para los n\u00FAmeros racionales, se obtiene una representaci\u00F3n decimal limitada, o ilimitada peri\u00F3dica si son n\u00FAmeros peri\u00F3dicos; si son irracionales, la representaci\u00F3n decimal es ilimitada y no peri\u00F3dica."@es . . "\u062A\u0645\u062B\u064A\u0644 \u0639\u0634\u0631\u064A"@ar . "\u0641\u064A \u0639\u0644\u0645 \u0627\u0644\u0631\u064A\u0627\u0636\u064A\u0627\u062A \u0627\u0644\u062A\u0641\u0643\u064A\u0643 \u0627\u0644\u0639\u0634\u0631\u064A \u0647\u0648 \u0637\u0631\u064A\u0642\u0629 \u0644\u0643\u062A\u0627\u0628\u0629 \u0627\u0644\u0639\u062F\u062F \u0627\u0644\u062D\u0642\u064A\u0642\u064A \u0627\u0644\u0645\u0648\u062C\u0628\u0629 \u0628\u0627\u0633\u062A\u0639\u0645\u0627\u0644 \u0642\u0648\u0649 \u0644\u0644\u0639\u062F\u062F \u0639\u0634\u0631\u0629 10 (\u0633\u0644\u0628\u064A\u0629 \u0623\u0648 \u0625\u064A\u062C\u0627\u0628\u064A\u0629). \u0639\u0646\u062F\u0645\u0627 \u062A\u0643\u0648\u0646 \u0627\u0644\u0627\u0639\u062F\u0627\u062F \u0635\u062D\u064A\u062D\u0629 \u0637\u0628\u064A\u0639\u064A\u0629\u060C \u064A\u062A\u0648\u0627\u0641\u0642 \u0627\u0644\u062A\u0641\u0643\u064A\u0643 \u0627\u0644\u0639\u0634\u0631\u064A \u0645\u0639 \u0627\u0644\u0643\u062A\u0627\u0628\u0629 \u0641\u064A \u0627\u0644\u0642\u0627\u0639\u062F\u0629 10 \u0648\u0639\u0646\u062F\u0645\u0627 \u062A\u0643\u0648\u0646 \u0627\u0644\u0627\u0639\u062F\u0627\u062F \u0639\u062F\u062F \u0639\u0634\u0631\u064A\u060C \u0646\u062D\u0635\u0644 \u0639\u0644\u0649 \u062A\u0641\u0643\u064A\u0643 \u0639\u0634\u0631\u064A \u0645\u062D\u062F\u0648\u062F. \u0639\u0646\u062F\u0645\u0627 \u064A\u0643\u0648\u0646 \u0627\u0644\u0639\u062F\u062F \u0643\u0633\u0631\u064A\u0627\u060C \u064A\u0643\u0648\u0646 \u0627\u0644\u062A\u0641\u0643\u064A\u0643 \u0627\u0644\u0639\u0634\u0631\u064A \u063A\u064A\u0631 \u0645\u062D\u062F\u0648\u062F . \u0648\u0623\u062E\u064A\u0631\u0627\u060C \u0639\u0646\u062F\u0645\u0627 \u064A\u0643\u0648\u0646 \u0627\u0644\u0639\u062F\u062F \u062D\u0642\u064A\u0642\u064A\u0627 \u063A\u064A\u0631 \u0646\u0633\u0628\u064A \u0641\u0627\u0644\u062A\u0641\u0643\u064A\u0643 \u0627\u0644\u0639\u0634\u0631\u064A \u064A\u0643\u0648\u0646 \u063A\u064A\u0631 \u0645\u062D\u062F\u0648\u062F \u0648\u063A\u064A\u0631 \u062F\u0648\u0631\u064A. \u0623\u0645\u062B\u0644\u0629 \u0639\u0644\u0649 \u0627\u0644\u0643\u0633\u0631 \u0627\u0644\u0639\u0634\u0631\u064A: 4\u06480 \u060C\u0648\u0645\u062B\u0627\u0644 \u0622\u062E\u0631 71\u06483 \u060C \u0648\u0645\u062B\u0627\u0644 \u062B\u0627\u0644\u062B \u0644\u0643\u0633\u0631 \u0639\u0634\u0631\u064A 5437\u064843 \u0646\u062C\u062F \u0623\u0646 \u0627\u0644\u0639\u062F\u062F 5437\u064843 \u0645\u0643\u0648\u0646 \u0645\u0646 \u0639\u062F\u062F \u0635\u062D\u064A\u062D \u0645\u0642\u062F\u0627\u0631\u0647 43 \u0628\u0627\u0644\u0625\u0636\u0627\u0641\u0629 \u0625\u0644\u0649 5 \u0623\u062C\u0632\u0627\u0621 \u0645\u0646 10 \u0628\u0627\u0644\u0625\u0636\u0627\u0641\u0629 \u0625\u0644\u0649 4 \u0623\u062C\u0632\u0627\u0621 \u0645\u0646 100 \u0628\u0627\u0644\u0625\u0636\u0627\u0641\u0629 \u0625\u0644\u0649 3 \u0623\u062C\u0632\u0627\u0621 \u0645\u0646 1000 ."@ar . . . . . . . "Representa\u00E7\u00E3o decimal"@pt . . "\u0641\u064A \u0639\u0644\u0645 \u0627\u0644\u0631\u064A\u0627\u0636\u064A\u0627\u062A \u0627\u0644\u062A\u0641\u0643\u064A\u0643 \u0627\u0644\u0639\u0634\u0631\u064A \u0647\u0648 \u0637\u0631\u064A\u0642\u0629 \u0644\u0643\u062A\u0627\u0628\u0629 \u0627\u0644\u0639\u062F\u062F \u0627\u0644\u062D\u0642\u064A\u0642\u064A \u0627\u0644\u0645\u0648\u062C\u0628\u0629 \u0628\u0627\u0633\u062A\u0639\u0645\u0627\u0644 \u0642\u0648\u0649 \u0644\u0644\u0639\u062F\u062F \u0639\u0634\u0631\u0629 10 (\u0633\u0644\u0628\u064A\u0629 \u0623\u0648 \u0625\u064A\u062C\u0627\u0628\u064A\u0629). \u0639\u0646\u062F\u0645\u0627 \u062A\u0643\u0648\u0646 \u0627\u0644\u0627\u0639\u062F\u0627\u062F \u0635\u062D\u064A\u062D\u0629 \u0637\u0628\u064A\u0639\u064A\u0629\u060C \u064A\u062A\u0648\u0627\u0641\u0642 \u0627\u0644\u062A\u0641\u0643\u064A\u0643 \u0627\u0644\u0639\u0634\u0631\u064A \u0645\u0639 \u0627\u0644\u0643\u062A\u0627\u0628\u0629 \u0641\u064A \u0627\u0644\u0642\u0627\u0639\u062F\u0629 10 \u0648\u0639\u0646\u062F\u0645\u0627 \u062A\u0643\u0648\u0646 \u0627\u0644\u0627\u0639\u062F\u0627\u062F \u0639\u062F\u062F \u0639\u0634\u0631\u064A\u060C \u0646\u062D\u0635\u0644 \u0639\u0644\u0649 \u062A\u0641\u0643\u064A\u0643 \u0639\u0634\u0631\u064A \u0645\u062D\u062F\u0648\u062F. \u0639\u0646\u062F\u0645\u0627 \u064A\u0643\u0648\u0646 \u0627\u0644\u0639\u062F\u062F \u0643\u0633\u0631\u064A\u0627\u060C \u064A\u0643\u0648\u0646 \u0627\u0644\u062A\u0641\u0643\u064A\u0643 \u0627\u0644\u0639\u0634\u0631\u064A \u063A\u064A\u0631 \u0645\u062D\u062F\u0648\u062F . \u0648\u0623\u062E\u064A\u0631\u0627\u060C \u0639\u0646\u062F\u0645\u0627 \u064A\u0643\u0648\u0646 \u0627\u0644\u0639\u062F\u062F \u062D\u0642\u064A\u0642\u064A\u0627 \u063A\u064A\u0631 \u0646\u0633\u0628\u064A \u0641\u0627\u0644\u062A\u0641\u0643\u064A\u0643 \u0627\u0644\u0639\u0634\u0631\u064A \u064A\u0643\u0648\u0646 \u063A\u064A\u0631 \u0645\u062D\u062F\u0648\u062F \u0648\u063A\u064A\u0631 \u062F\u0648\u0631\u064A. \u0623\u0645\u062B\u0644\u0629 \u0639\u0644\u0649 \u0627\u0644\u0643\u0633\u0631 \u0627\u0644\u0639\u0634\u0631\u064A: 4\u06480 \u060C\u0648\u0645\u062B\u0627\u0644 \u0622\u062E\u0631 71\u06483 \u060C \u0648\u0645\u062B\u0627\u0644 \u062B\u0627\u0644\u062B \u0644\u0643\u0633\u0631 \u0639\u0634\u0631\u064A 5437\u064843 \u0646\u062C\u062F \u0623\u0646 \u0627\u0644\u0639\u062F\u062F 5437\u064843 \u0645\u0643\u0648\u0646 \u0645\u0646 \u0639\u062F\u062F \u0635\u062D\u064A\u062D \u0645\u0642\u062F\u0627\u0631\u0647 43 \u0628\u0627\u0644\u0625\u0636\u0627\u0641\u0629 \u0625\u0644\u0649 5 \u0623\u062C\u0632\u0627\u0621 \u0645\u0646 10 \u0628\u0627\u0644\u0625\u0636\u0627\u0641\u0629 \u0625\u0644\u0649 4 \u0623\u062C\u0632\u0627\u0621 \u0645\u0646 100 \u0628\u0627\u0644\u0625\u0636\u0627\u0641\u0629 \u0625\u0644\u0649 3 \u0623\u062C\u0632\u0627\u0621 \u0645\u0646 1000 \u064A\u0627\u0644\u0625\u0636\u0627\u0641\u0629 \u0625\u0644\u0649 7 \u0623\u062C\u0632\u0627\u0621 \u0645\u0646 10000. \u0645\u062B\u0627\u0644 \u0639\u0644\u0649 \u0643\u0633\u0631 \u0639\u0634\u0631\u064A \u062F\u0648\u0631\u064A (\u0623\u0648 \u063A\u064A\u0631 \u0645\u062D\u062F\u0648\u062F): \u0645\u062B\u0644 \u0647\u0630\u0627 \u0627\u0644\u0643\u0633\u0631 \u0627\u0644\u0639\u0634\u0631\u064A \u0627\u0644\u062F\u0648\u0631\u064A \u064A\u062A\u0648\u0644\u062F \u0639\u0646\u062F\u0645\u0627 \u0646\u0642\u0633\u0645 1 /3 \u0639\u0634\u0631\u064A\u0627\u060C \u0641\u0627\u0644\u0646\u062A\u064A\u062C\u0629 \u062A\u0643\u0648\u0646 : ...33333333\u06480 ( \u0628\u0644\u0627 \u0646\u0647\u0627\u064A\u0629). \u0627\u0644\u062A\u0645\u062B\u064A\u0644 \u0627\u0644\u0639\u0634\u0631\u064A \u0644\u0639\u062F\u062F \u062D\u0642\u064A\u0642\u064A \u063A\u064A\u0631 \u0633\u0627\u0644\u0628 r \u0647\u0648 \u062A\u0639\u0628\u064A\u0631 \u0639\u0644\u0649 \u0627\u0644\u0635\u0648\u0631\u0629: \u062D\u064A\u062B: \u0647\u064A \u0639\u0644\u0627\u0645\u0629 \u0645\u062C\u0645\u0648\u0639\u060C \u0648 a0 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\u0641\u064A \u0627\u0644\u0625\u0646\u0643\u0644\u064A\u0632\u064A\u0629 \u0641\u064A\u0633\u062A\u062E\u062F\u0645\u0648\u0646 \u0646\u0642\u0637\u0629 (.) \u0644\u0644\u0639\u0644\u0627\u0645\u0629 \u0627\u0644\u0639\u0634\u0631\u064A\u0629.) \u064A\u064F\u062F\u0639\u0649 a0 \u0627\u0644\u062C\u0632\u0621 \u0627\u0644\u0635\u062D\u064A\u062D \u0644 r. \u0647\u0648 \u0644\u064A\u0633 \u0628\u0627\u0644\u0636\u0631\u0648\u0631\u0629 \u0645\u062D\u0635\u0648\u0631\u0627 \u0628\u064A\u0646 0 \u0648 9, \u0648a1, a2, a3, \u2026 \u0647\u064A \u062E\u0627\u0646\u0627\u062A \u062A\u0634\u0643\u0644 \u0627\u0644\u062C\u0632\u0621 \u0627\u0644\u0643\u0633\u0631\u064A \u0644 r.\u0645\u0646 \u0627\u0644\u062A\u0639\u0631\u064A\u0641: ."@ar . . "\u5C0F\u6570\uFF08\u3057\u3087\u3046\u3059\u3046\u3001 \u82F1: decimal\uFF09\u3068\u306F\u3001\u4F4D\u53D6\u308A\u8A18\u6570\u6CD5\u3068\u5C0F\u6570\u70B9\u3092\u7528\u3044\u3066\u5B9F\u6570\u3092\u8868\u73FE\u3059\u308B\u305F\u3081\u306E\u8868\u8A18\u6CD5\u3067\u3042\u308B\u3002"@ja .