. "\u8B49\u660E22/7\u5927\u65BC\u03C0"@zh . . "\u4EBA\u5011\u7D93\u5E38\u4F7F\u7528\u9019\u500B\u6709\u7406\u6578\u4F5C\u70BA\u5713\u5468\u7387\u7684\u4E22\u756A\u5716\u903C\u8FD1\u3002\u5728\u7684\u9023\u5206\u6578\u8868\u9054\u4E2D\uFF0C\u662F\u5B83\u7684\u4E00\u500B\u6E10\u8FD1\u5206\u6578\u3002\u5F9E\u9019\u5169\u500B\u6578\u5B57\u7684\u5C0F\u6578\u5F62\u5F0F\u53EF\u898B\u662F\u5927\u65BC\u7684\uFF1A \u9019\u500B\u8FD1\u4F3C\u503C\u5F9E\u53E4\u4EE3\u5C31\u6709\u4EBA\u4F7F\u7528\u3002\u7E31\u4F7F\u963F\u57FA\u7C73\u5FB7\u4E26\u975E\u9019\u500B\u8FD1\u4F3C\u503C\u7684\u59CB\u5275\u8005\uFF0C\u4F46\u4ED6\u8B49\u660E\u4E86\u9AD8\u4F30\u4E86\u5713\u5468\u7387\u3002\u4ED6\u4EE5\u5927\u65BC\u5916\u5207\u6B6396\u908A\u5F62\u7684\u5468\u754C\uFF1A\u8A72\u5713\u76F4\u5F91\u4E4B\u6BD4\u4F5C\u8B49\u660E\u3002 \u9019\u500B\u8FD1\u4F3C\u503C\u5E38\u88AB\u7A31\u70BA\u300C\u7D04\u7387\u300D\uFF0C\u9664\u9019\u4EE5\u5916\uFF0C\u5E38\u7528\u7684\u8FD1\u4F3C\u503C\u9084\u6709\u540C\u662F\u7531\u7956\u6C96\u4E4B\u57285\u4E16\u7D00\u63D0\u51FA\u7684\u5BC6\u7387\uFF1A\u3002 \u4EE5\u4E0B\u662F\u53E6\u4E00\u500B\u7684\u8B49\u660E\uFF0C\u6240\u7528\u5230\u7684\u53EA\u662F\u5FAE\u7A4D\u5206\u7684\u57FA\u672C\u6280\u5DE7\u3002\u5B83\u672C\u4F86\u53EA\u662F\u7528\u65BC\u986F\u793A\u53EF\u4EE5\u7528\u6709\u7CFB\u7D71\u7684\u65B9\u6CD5\u8A08\u7B97\u03C0\u7684\u503C\uFF0C\u800C\u975E\u4EE5\u8B49\u660E\u70BA\u6700\u7D42\u76EE\u6A19\u3002\u5B83\u6BD4\u8D77\u4E00\u4E9B\u57FA\u672C\u8B49\u660E\u66F4\u5BB9\u6613\u7406\u89E3\u3002\u5B83\u7684\u512A\u96C5\u662F\u7531\u65BC\u5B83\u548C\u4E1F\u756A\u5716\u903C\u8FD1\u7684\u95DC\u9023\u3002\u8DEF\u5361\u65AF\u7A31\u9019\u689D\u516C\u5F0F\u70BA\u300C\u5176\u4E2D\u4E00\u500B\u4F30\u8A08\u03C0\u503C\u7684\u6700\u7F8E\u9E97\u7D50\u679C\u300D\u3002Havil\u4EE5\u9019\u500B\u7D50\u679C\u4F5C\u7232\u4E00\u500B\u6709\u95DC\u4EE5\u9023\u5206\u6578\u4F30\u8A08\u7684\u8A0E\u8AD6\u4E4B\u7D50\u5C3E\uFF0C\u8AAA\u5B83\u5728\u8A72\u7BC4\u7587\u662F\u300C\u4E0D\u5F97\u4E0D\u63D0\u53CA\u300D\u7684\u3002"@zh . . . "\u5186\u5468\u7387\u304C22/7\u3088\u308A\u5C0F\u3055\u3044\u3053\u3068\u306E\u8A3C\u660E"@ja . "13565"^^ . . . "\u6709\u540D\u306A\u6570\u5B66\u7684\u4E8B\u5B9F\u3067\u3042\u308B\u3068\u3053\u308D\u306E\u3001\u5186\u5468\u7387 \u03C0 \u304C 22/7 \u3088\u308A\u5C0F\u3055\u3044\u3053\u3068\u306E\u8A3C\u660E(\u3048\u3093\u3057\u3085\u3046\u308A\u3064\u304C7\u3076\u3093\u306E22\u3088\u308A\u3061\u3044\u3055\u3044\u3053\u3068\u306E\u3057\u3087\u3046\u3081\u3044)\u306F\u3001\u53E4\u4EE3\u30AE\u30EA\u30B7\u30A2\u306E\u30A2\u30EB\u30AD\u30E1\u30C7\u30B9\u306B\u59CB\u307E\u308A\u3001\u4F55\u901A\u308A\u3082\u4E0E\u3048\u3089\u308C\u3066\u3044\u308B\u3002\u672C\u9805\u3067\u306F\u3001\u305D\u306E\u3046\u3061\u306E\u4E00\u3064\u3067\u3001\u5FAE\u5206\u7A4D\u5206\u5B66\u306E\u521D\u7B49\u7684\u306A\u30C6\u30AF\u30CB\u30C3\u30AF\u306E\u307F\u3092\u7528\u3044\u308B\u3001\u8FD1\u5E74\u306B\u767A\u898B\u3055\u308C\u305F\u8A3C\u660E\u3092\u6271\u3046\u3002\u3053\u306E\u8A3C\u660E\u306F\u3001\u305D\u306E\u6570\u5B66\u7684\u306A\u7F8E\u304A\u3088\u3073\u30C7\u30A3\u30AA\u30D5\u30A1\u30F3\u30C8\u30B9\u8FD1\u4F3C\u306E\u7406\u8AD6\u3068\u306E\u95A2\u4FC2\u306B\u3088\u3063\u3066\u3001\u73FE\u4EE3\u6570\u5B66\u306B\u304A\u3044\u3066\u3082\u6CE8\u76EE\u3055\u308C\u3066\u304D\u305F\u3002\u30B9\u30C6\u30A3\u30FC\u30F4\u30F3\u30FB\u30EB\u30FC\u30AB\u30B9\u306F\u3001\u3053\u308C\u3092\u300C\u03C0 \u306E\u8FD1\u4F3C\u306B\u95A2\u3059\u308B\u6700\u3082\u7F8E\u3057\u3044\u7D50\u679C\u306E\u4E00\u3064\u300D\u3068\u547C\u3073\u3001\u30B8\u30E5\u30EA\u30A2\u30F3\u30FB\u30CF\u30F4\u30A3\u30EB\u306F\u3001\u5186\u5468\u7387\u306E\u9023\u5206\u6570\u8FD1\u4F3C\u306E\u8B70\u8AD6\u3092\u7D42\u3048\u308B\u969B\u306B\u300C\u3053\u306E\u7D50\u679C\u306B\u8A00\u53CA\u305B\u3056\u308B\u3092\u5F97\u306A\u3044\u300D\u3068\u8FF0\u3079\u305F\u4E0A\u3067\u8A3C\u660E\u3092\u793A\u3057\u3066\u3044\u308B\u3002 \u3082\u3057\u5186\u5468\u7387\u304C 3.14159 \u306B\u8FD1\u3044\u3053\u3068\u3092\u77E5\u3063\u3066\u3044\u308C\u3070\u300122/7\uFF083.142857 \u306B\u8FD1\u3044\uFF09\u3088\u308A\u3082\u5C0F\u3055\u3044\u3053\u3068\u306F\u81EA\u660E\u3067\u3042\u308B\u3002\u3057\u304B\u3057\u3001\u03C0 < 22/7 \u3092\u793A\u3059\u306E\u306F\u3001\u03C0 \u304C 3.14159 \u306B\u8FD1\u3044\u3053\u3068\u3092\u793A\u3059\u3088\u308A\u3082\u305A\u3063\u3068\u624B\u9593\u306F\u5C0F\u3055\u3044\u3002\u3053\u306E\u8A3C\u660E\u306E\u8A55\u4FA1\u65B9\u6CD5\u306F\u4E00\u822C\u5316\u3055\u308C\u3001\u5186\u5468\u7387\u306E\u5024\u3092\u8A08\u7B97\u3059\u308B\u7CFB\u7D71\u7684\u306A\u65B9\u6CD5\u306B\u306A\u3063\u3066\u3044\u308B\u3002"@ja . "Le dimostrazioni del famoso risultato matematico che il numero razionale \u00E8 maggiore di \u03C0 (pi greco) risalgono fino all'antichit\u00E0. Una di queste dimostrazioni, recentemente sviluppata e che richiede solo conoscenze elementari dell'analisi, ha attirato l'attenzione dei matematici moderni per la sua eleganza matematica e la sua connessione alla teoria delle approssimazioni diofantee. Stephen Lucas defin\u00EC questa dimostrazione \u00ABuno dei pi\u00F9 bei risultati sull'approssimazione di \u00BB.Julian Havil concluse una discussione sulle approssimazioni della frazione continua di con questa disuguaglianza, affermando che fosse \u00ABimpossibile resistere dal menzionarla\u00BB in quel contesto. Lo scopo principale della dimostrazione non \u00E8 quello di convincere i lettore che \u00E8 effettivamente maggiore di ; esistono infatti dei metodi sistematici per calcolare il valore di . Se si sa che \u00E8 approssimativamente , allora segue banalmente che , il quale \u00E8 circa . Tuttavia \u00E8 pi\u00F9 semplice dimostrare che utilizzando il metodo di questa dimostrazione invece di mostrare che \u00E8 approssimativamente ."@it . "382339"^^ . . "Las demostraciones matem\u00E1ticas que indican el famoso resultado de que el n\u00FAmero racional 22\u20447 es superior a \u03C0 se remontan a la Antig\u00FCedad. Una de estas demostraciones, desarrollada m\u00E1s recientemente pero que requiere solo t\u00E9cnicas elementales del c\u00E1lculo, ha llamado la atenci\u00F3n en las matem\u00E1ticas modernas debido a su belleza matem\u00E1tica y sus conexiones con la teor\u00EDa de las aproximaciones diof\u00E1nticas. Stephen Lucas califica esta proposici\u00F3n de \"uno de los resultados m\u00E1s hermosos relacionados con la aproximaci\u00F3n de \u03C0 \".\u200B"@es . . . . . . . "A demonstra\u00E7\u00E3o da famosa desigualdade remonta \u00E0 antiguidade. A vers\u00E3o apresentada neste verbete usa recursos modernos mas n\u00E3o vai al\u00E9m de conceitos b\u00E1sicos do c\u00E1lculo. O objetivo desta apresenta\u00E7\u00E3o n\u00E3o \u00E9 convencer o leitor da desigualdade, dado que existem m\u00E9todos sistem\u00E1ticos de calcular o valor de pi com aproxima\u00E7\u00E3o arbitr\u00E1ria. A eleg\u00E2ncia desta prova resulta da liga\u00E7\u00E3o com a teoria das aproxima\u00E7\u00F5es diofantinas. Stephen Lucas afirmou ser esta demonstra\u00E7\u00E3o \"um dos mais belos resultados ligados \u00E0 aproxima\u00E7\u00E3o de \u03C0\". Julian Havil finaliza uma discuss\u00E3o sobre fra\u00E7\u00F5es continuadas aproximantes de \u03C0 com este teorema, afirmando ser \"impossivel resistir a mencion\u00E1-lo\" naquele contexto."@pt . . . . . . . . "\u6709\u540D\u306A\u6570\u5B66\u7684\u4E8B\u5B9F\u3067\u3042\u308B\u3068\u3053\u308D\u306E\u3001\u5186\u5468\u7387 \u03C0 \u304C 22/7 \u3088\u308A\u5C0F\u3055\u3044\u3053\u3068\u306E\u8A3C\u660E(\u3048\u3093\u3057\u3085\u3046\u308A\u3064\u304C7\u3076\u3093\u306E22\u3088\u308A\u3061\u3044\u3055\u3044\u3053\u3068\u306E\u3057\u3087\u3046\u3081\u3044)\u306F\u3001\u53E4\u4EE3\u30AE\u30EA\u30B7\u30A2\u306E\u30A2\u30EB\u30AD\u30E1\u30C7\u30B9\u306B\u59CB\u307E\u308A\u3001\u4F55\u901A\u308A\u3082\u4E0E\u3048\u3089\u308C\u3066\u3044\u308B\u3002\u672C\u9805\u3067\u306F\u3001\u305D\u306E\u3046\u3061\u306E\u4E00\u3064\u3067\u3001\u5FAE\u5206\u7A4D\u5206\u5B66\u306E\u521D\u7B49\u7684\u306A\u30C6\u30AF\u30CB\u30C3\u30AF\u306E\u307F\u3092\u7528\u3044\u308B\u3001\u8FD1\u5E74\u306B\u767A\u898B\u3055\u308C\u305F\u8A3C\u660E\u3092\u6271\u3046\u3002\u3053\u306E\u8A3C\u660E\u306F\u3001\u305D\u306E\u6570\u5B66\u7684\u306A\u7F8E\u304A\u3088\u3073\u30C7\u30A3\u30AA\u30D5\u30A1\u30F3\u30C8\u30B9\u8FD1\u4F3C\u306E\u7406\u8AD6\u3068\u306E\u95A2\u4FC2\u306B\u3088\u3063\u3066\u3001\u73FE\u4EE3\u6570\u5B66\u306B\u304A\u3044\u3066\u3082\u6CE8\u76EE\u3055\u308C\u3066\u304D\u305F\u3002\u30B9\u30C6\u30A3\u30FC\u30F4\u30F3\u30FB\u30EB\u30FC\u30AB\u30B9\u306F\u3001\u3053\u308C\u3092\u300C\u03C0 \u306E\u8FD1\u4F3C\u306B\u95A2\u3059\u308B\u6700\u3082\u7F8E\u3057\u3044\u7D50\u679C\u306E\u4E00\u3064\u300D\u3068\u547C\u3073\u3001\u30B8\u30E5\u30EA\u30A2\u30F3\u30FB\u30CF\u30F4\u30A3\u30EB\u306F\u3001\u5186\u5468\u7387\u306E\u9023\u5206\u6570\u8FD1\u4F3C\u306E\u8B70\u8AD6\u3092\u7D42\u3048\u308B\u969B\u306B\u300C\u3053\u306E\u7D50\u679C\u306B\u8A00\u53CA\u305B\u3056\u308B\u3092\u5F97\u306A\u3044\u300D\u3068\u8FF0\u3079\u305F\u4E0A\u3067\u8A3C\u660E\u3092\u793A\u3057\u3066\u3044\u308B\u3002 \u3082\u3057\u5186\u5468\u7387\u304C 3.14159 \u306B\u8FD1\u3044\u3053\u3068\u3092\u77E5\u3063\u3066\u3044\u308C\u3070\u300122/7\uFF083.142857 \u306B\u8FD1\u3044\uFF09\u3088\u308A\u3082\u5C0F\u3055\u3044\u3053\u3068\u306F\u81EA\u660E\u3067\u3042\u308B\u3002\u3057\u304B\u3057\u3001\u03C0 < 22/7 \u3092\u793A\u3059\u306E\u306F\u3001\u03C0 \u304C 3.14159 \u306B\u8FD1\u3044\u3053\u3068\u3092\u793A\u3059\u3088\u308A\u3082\u305A\u3063\u3068\u624B\u9593\u306F\u5C0F\u3055\u3044\u3002\u3053\u306E\u8A3C\u660E\u306E\u8A55\u4FA1\u65B9\u6CD5\u306F\u4E00\u822C\u5316\u3055\u308C\u3001\u5186\u5468\u7387\u306E\u5024\u3092\u8A08\u7B97\u3059\u308B\u7CFB\u7D71\u7684\u306A\u65B9\u6CD5\u306B\u306A\u3063\u3066\u3044\u308B\u3002"@ja . . . . "Prova de que 22/7 \u00E9 maior que \u03C0"@pt . "Proofs of the mathematical result that the rational number 22/7 is greater than \u03C0 (pi) date back to antiquity. One of these proofs, more recently developed but requiring only elementary techniques from calculus, has attracted attention in modern mathematics due to its mathematical elegance and its connections to the theory of Diophantine approximations. Stephen Lucas calls this proof \"one of the more beautiful results related to approximating \u03C0\".Julian Havil ends a discussion of continued fraction approximations of \u03C0 with the result, describing it as \"impossible to resist mentioning\" in that context. The purpose of the proof is not primarily to convince its readers that 22/7 (or 3+1/7) is indeed bigger than \u03C0; systematic methods of computing the value of \u03C0 exist. If one knows that \u03C0 is approximately 3.14159, then it trivially follows that \u03C0 < 22/7, which is approximately 3.142857. But it takes much less work to show that \u03C0 < 22/7 by the method used in this proof than to show that \u03C0 is approximately 3.14159."@en . . . . . . . "22 / 7 d\u00E9passe \u03C0"@fr . . . . "Demostraci\u00F3n de que 22/7 es mayor que \u03C0"@es . "Proof that 22/7 exceeds \u03C0"@en . . . . . . "1117561931"^^ . "Las demostraciones matem\u00E1ticas que indican el famoso resultado de que el n\u00FAmero racional 22\u20447 es superior a \u03C0 se remontan a la Antig\u00FCedad. Una de estas demostraciones, desarrollada m\u00E1s recientemente pero que requiere solo t\u00E9cnicas elementales del c\u00E1lculo, ha llamado la atenci\u00F3n en las matem\u00E1ticas modernas debido a su belleza matem\u00E1tica y sus conexiones con la teor\u00EDa de las aproximaciones diof\u00E1nticas. Stephen Lucas califica esta proposici\u00F3n de \"uno de los resultados m\u00E1s hermosos relacionados con la aproximaci\u00F3n de \u03C0 \".\u200B El objetivo de esta demostraci\u00F3n no es en esencia convencer al lector de que 22\u20447 es, efectivamente, m\u00E1s grande qu\u00E9 \u03C0. Existen m\u00E9todos de c\u00E1lculo sistem\u00E1tico que obtienen el valor de \u03C0. Lo que sigue es una demostraci\u00F3n matem\u00E1tica moderna que demuestra que 22/7 > \u03C0, utilizando solamente las t\u00E9cnicas elementales del c\u00E1lculo. Su sencillez y su elegancia resultan v\u00EDnculos con la teor\u00EDa de las aproximaciones diof\u00E1nticas."@es . . "\u063A\u0627\u0644\u0628\u064B\u0627 \u0645\u0627 \u064A\u0633\u062A\u062E\u062F\u0645 \u0627\u0644\u0643\u0633\u0631 22/7 \u0623\u0648 3+1/7 \u0642\u064A\u0645\u0629\u064B \u062A\u0642\u0631\u064A\u0628\u064A\u0629\u064B \u0644\u0644\u0639\u062F\u062F \u0628\u0627\u064A\u060C \u0648\u0642\u062F \u0643\u0627\u0646 \u0623\u0631\u062E\u0645\u064A\u062F\u0633 \u0623\u0648\u0644 \u0645\u0646 \u0641\u0637\u0646 \u0625\u0644\u0649 \u062C\u0639\u0644\u0647 \u0642\u064A\u0645\u0629\u064B \u0645\u0642\u0631\u0628\u0629\u064B \u0644\u0647 \u062D\u0648\u0627\u0644\u064A \u0633\u0646\u0629 250 \u0642.\u0645. \u0644\u0643\u0646 \u0627\u0644\u0643\u0633\u0631 \u0628\u0630\u0627\u062A\u0647 \u064A\u0639\u0637\u064A \u0642\u064A\u0645\u0629 \u0623\u0643\u0628\u0631 \u0645\u0646 \u0642\u064A\u0645\u0629 \u0627\u0644\u0639\u062F\u062F \u0628\u0627\u064A\u060C \u062D\u064A\u062B \u0623\u0646\u0647 \u0639\u0646\u062F \u0642\u0633\u0645\u0629 \u0627\u0644\u0643\u0633\u0631 \u0646\u062C\u062F \u0623\u0646\u0647 \u064A\u062A\u0637\u0627\u0628\u0642 \u0645\u0639 \u0627\u0644\u0639\u062F\u062F \u0628\u0627\u064A \u062D\u062A\u0649 3 \u0631\u062A\u0628 \u0641\u0642\u0637 (3.14) \u0648 \u0628\u0639\u062F\u0647\u0627 \u062A\u062A\u062C\u0627\u0648\u0632 \u0642\u064A\u0645\u062A\u0647 \u0642\u064A\u0645\u0629 \u0627\u0644\u0639\u062F\u062F \u0628\u0627\u064A \u0628\u0646\u0633\u0628\u0629 \u062D\u0648\u0627\u0644\u064A 0.04%."@ar . . . . . . "Les d\u00E9monstrations du c\u00E9l\u00E8bre r\u00E9sultat math\u00E9matique selon lequel le nombre rationnel 22/7 est sup\u00E9rieur \u00E0 \u03C0 remontent \u00E0 l'Antiquit\u00E9. Stephen Lucas qualifie cette proposition de \u00AB l'un des plus beaux r\u00E9sultats li\u00E9s \u00E0 l'approximation de \u03C0 \u00BB. (de) met fin \u00E0 une discussion sur les fractions approchant \u03C0 avec ce r\u00E9sultat, le d\u00E9crivant comme \u00AB impossible de ne pas \u00EAtre mentionn\u00E9 \u00BB dans ce contexte. Le but n'est pas d'abord de convaincre le lecteur que 22/7 est en effet plus grand que \u03C0 ; des m\u00E9thodes de calcul syst\u00E9matiques de la valeur de \u03C0 existent. Ce qui suit est une d\u00E9monstration math\u00E9matique moderne que 22/7 > \u03C0, n\u00E9cessitant uniquement des techniques \u00E9l\u00E9mentaires de calcul. Sa simplicit\u00E9 et son \u00E9l\u00E9gance r\u00E9sultent de ses liens avec la th\u00E9orie des approximations diophantiennes."@fr . . "\u0625\u062B\u0628\u0627\u062A \u0623\u0646 22/7 \u0623\u0643\u0628\u0631 \u0645\u0646 \u03C0"@ar . . . . . . . . . "A demonstra\u00E7\u00E3o da famosa desigualdade remonta \u00E0 antiguidade. A vers\u00E3o apresentada neste verbete usa recursos modernos mas n\u00E3o vai al\u00E9m de conceitos b\u00E1sicos do c\u00E1lculo. O objetivo desta apresenta\u00E7\u00E3o n\u00E3o \u00E9 convencer o leitor da desigualdade, dado que existem m\u00E9todos sistem\u00E1ticos de calcular o valor de pi com aproxima\u00E7\u00E3o arbitr\u00E1ria. A eleg\u00E2ncia desta prova resulta da liga\u00E7\u00E3o com a teoria das aproxima\u00E7\u00F5es diofantinas. Stephen Lucas afirmou ser esta demonstra\u00E7\u00E3o \"um dos mais belos resultados ligados \u00E0 aproxima\u00E7\u00E3o de \u03C0\". Julian Havil finaliza uma discuss\u00E3o sobre fra\u00E7\u00F5es continuadas aproximantes de \u03C0 com este teorema, afirmando ser \"impossivel resistir a mencion\u00E1-lo\" naquele contexto."@pt . "Le dimostrazioni del famoso risultato matematico che il numero razionale \u00E8 maggiore di \u03C0 (pi greco) risalgono fino all'antichit\u00E0. Una di queste dimostrazioni, recentemente sviluppata e che richiede solo conoscenze elementari dell'analisi, ha attirato l'attenzione dei matematici moderni per la sua eleganza matematica e la sua connessione alla teoria delle approssimazioni diofantee. Stephen Lucas defin\u00EC questa dimostrazione \u00ABuno dei pi\u00F9 bei risultati sull'approssimazione di \u00BB.Julian Havil concluse una discussione sulle approssimazioni della frazione continua di con questa disuguaglianza, affermando che fosse \u00ABimpossibile resistere dal menzionarla\u00BB in quel contesto."@it . . . "Les d\u00E9monstrations du c\u00E9l\u00E8bre r\u00E9sultat math\u00E9matique selon lequel le nombre rationnel 22/7 est sup\u00E9rieur \u00E0 \u03C0 remontent \u00E0 l'Antiquit\u00E9. Stephen Lucas qualifie cette proposition de \u00AB l'un des plus beaux r\u00E9sultats li\u00E9s \u00E0 l'approximation de \u03C0 \u00BB. (de) met fin \u00E0 une discussion sur les fractions approchant \u03C0 avec ce r\u00E9sultat, le d\u00E9crivant comme \u00AB impossible de ne pas \u00EAtre mentionn\u00E9 \u00BB dans ce contexte."@fr . . "\u063A\u0627\u0644\u0628\u064B\u0627 \u0645\u0627 \u064A\u0633\u062A\u062E\u062F\u0645 \u0627\u0644\u0643\u0633\u0631 22/7 \u0623\u0648 3+1/7 \u0642\u064A\u0645\u0629\u064B \u062A\u0642\u0631\u064A\u0628\u064A\u0629\u064B \u0644\u0644\u0639\u062F\u062F \u0628\u0627\u064A\u060C \u0648\u0642\u062F \u0643\u0627\u0646 \u0623\u0631\u062E\u0645\u064A\u062F\u0633 \u0623\u0648\u0644 \u0645\u0646 \u0641\u0637\u0646 \u0625\u0644\u0649 \u062C\u0639\u0644\u0647 \u0642\u064A\u0645\u0629\u064B \u0645\u0642\u0631\u0628\u0629\u064B \u0644\u0647 \u062D\u0648\u0627\u0644\u064A \u0633\u0646\u0629 250 \u0642.\u0645. \u0644\u0643\u0646 \u0627\u0644\u0643\u0633\u0631 \u0628\u0630\u0627\u062A\u0647 \u064A\u0639\u0637\u064A \u0642\u064A\u0645\u0629 \u0623\u0643\u0628\u0631 \u0645\u0646 \u0642\u064A\u0645\u0629 \u0627\u0644\u0639\u062F\u062F \u0628\u0627\u064A\u060C \u062D\u064A\u062B \u0623\u0646\u0647 \u0639\u0646\u062F \u0642\u0633\u0645\u0629 \u0627\u0644\u0643\u0633\u0631 \u0646\u062C\u062F \u0623\u0646\u0647 \u064A\u062A\u0637\u0627\u0628\u0642 \u0645\u0639 \u0627\u0644\u0639\u062F\u062F \u0628\u0627\u064A \u062D\u062A\u0649 3 \u0631\u062A\u0628 \u0641\u0642\u0637 (3.14) \u0648 \u0628\u0639\u062F\u0647\u0627 \u062A\u062A\u062C\u0627\u0648\u0632 \u0642\u064A\u0645\u062A\u0647 \u0642\u064A\u0645\u0629 \u0627\u0644\u0639\u062F\u062F \u0628\u0627\u064A \u0628\u0646\u0633\u0628\u0629 \u062D\u0648\u0627\u0644\u064A 0.04%."@ar . . . "Dimostrazione che 22/7 \u00E8 maggiore di \u03C0"@it . . . . . "Proofs of the mathematical result that the rational number 22/7 is greater than \u03C0 (pi) date back to antiquity. One of these proofs, more recently developed but requiring only elementary techniques from calculus, has attracted attention in modern mathematics due to its mathematical elegance and its connections to the theory of Diophantine approximations. Stephen Lucas calls this proof \"one of the more beautiful results related to approximating \u03C0\".Julian Havil ends a discussion of continued fraction approximations of \u03C0 with the result, describing it as \"impossible to resist mentioning\" in that context."@en . "\u4EBA\u5011\u7D93\u5E38\u4F7F\u7528\u9019\u500B\u6709\u7406\u6578\u4F5C\u70BA\u5713\u5468\u7387\u7684\u4E22\u756A\u5716\u903C\u8FD1\u3002\u5728\u7684\u9023\u5206\u6578\u8868\u9054\u4E2D\uFF0C\u662F\u5B83\u7684\u4E00\u500B\u6E10\u8FD1\u5206\u6578\u3002\u5F9E\u9019\u5169\u500B\u6578\u5B57\u7684\u5C0F\u6578\u5F62\u5F0F\u53EF\u898B\u662F\u5927\u65BC\u7684\uFF1A \u9019\u500B\u8FD1\u4F3C\u503C\u5F9E\u53E4\u4EE3\u5C31\u6709\u4EBA\u4F7F\u7528\u3002\u7E31\u4F7F\u963F\u57FA\u7C73\u5FB7\u4E26\u975E\u9019\u500B\u8FD1\u4F3C\u503C\u7684\u59CB\u5275\u8005\uFF0C\u4F46\u4ED6\u8B49\u660E\u4E86\u9AD8\u4F30\u4E86\u5713\u5468\u7387\u3002\u4ED6\u4EE5\u5927\u65BC\u5916\u5207\u6B6396\u908A\u5F62\u7684\u5468\u754C\uFF1A\u8A72\u5713\u76F4\u5F91\u4E4B\u6BD4\u4F5C\u8B49\u660E\u3002 \u9019\u500B\u8FD1\u4F3C\u503C\u5E38\u88AB\u7A31\u70BA\u300C\u7D04\u7387\u300D\uFF0C\u9664\u9019\u4EE5\u5916\uFF0C\u5E38\u7528\u7684\u8FD1\u4F3C\u503C\u9084\u6709\u540C\u662F\u7531\u7956\u6C96\u4E4B\u57285\u4E16\u7D00\u63D0\u51FA\u7684\u5BC6\u7387\uFF1A\u3002 \u4EE5\u4E0B\u662F\u53E6\u4E00\u500B\u7684\u8B49\u660E\uFF0C\u6240\u7528\u5230\u7684\u53EA\u662F\u5FAE\u7A4D\u5206\u7684\u57FA\u672C\u6280\u5DE7\u3002\u5B83\u672C\u4F86\u53EA\u662F\u7528\u65BC\u986F\u793A\u53EF\u4EE5\u7528\u6709\u7CFB\u7D71\u7684\u65B9\u6CD5\u8A08\u7B97\u03C0\u7684\u503C\uFF0C\u800C\u975E\u4EE5\u8B49\u660E\u70BA\u6700\u7D42\u76EE\u6A19\u3002\u5B83\u6BD4\u8D77\u4E00\u4E9B\u57FA\u672C\u8B49\u660E\u66F4\u5BB9\u6613\u7406\u89E3\u3002\u5B83\u7684\u512A\u96C5\u662F\u7531\u65BC\u5B83\u548C\u4E1F\u756A\u5716\u903C\u8FD1\u7684\u95DC\u9023\u3002\u8DEF\u5361\u65AF\u7A31\u9019\u689D\u516C\u5F0F\u70BA\u300C\u5176\u4E2D\u4E00\u500B\u4F30\u8A08\u03C0\u503C\u7684\u6700\u7F8E\u9E97\u7D50\u679C\u300D\u3002Havil\u4EE5\u9019\u500B\u7D50\u679C\u4F5C\u7232\u4E00\u500B\u6709\u95DC\u4EE5\u9023\u5206\u6578\u4F30\u8A08\u7684\u8A0E\u8AD6\u4E4B\u7D50\u5C3E\uFF0C\u8AAA\u5B83\u5728\u8A72\u7BC4\u7587\u662F\u300C\u4E0D\u5F97\u4E0D\u63D0\u53CA\u300D\u7684\u3002"@zh . . . . . . . .