{"provider_name":"Hatena Blog","image_url":"https://cdn-ak.f.st-hatena.com/images/fotolife/f/fujidig/20200614/20200614181703.jpg","type":"rich","title":"6\u6708\u524d\u534a\u632f\u308a\u8fd4\u308a","html":"<iframe src=\"https://hatenablog-parts.com/embed?url=https%3A%2F%2Ffujidig.hatenablog.com%2Fentry%2F2020%2F06%2F14%2F183220\" title=\"6\u6708\u524d\u534a\u632f\u308a\u8fd4\u308a - \u7406\u79d1\" class=\"embed-card embed-blogcard\" scrolling=\"no\" frameborder=\"0\" style=\"display: block; width: 100%; height: 190px; max-width: 500px; margin: 10px 0px;\"></iframe>","categories":[],"provider_url":"https://hatena.blog","width":"100%","author_url":"https://blog.hatena.ne.jp/fujidig/","blog_title":"\u7406\u79d1","blog_url":"https://fujidig.hatenablog.com/","url":"https://fujidig.hatenablog.com/entry/2020/06/14/183220","published":"2020-06-14 18:32:20","height":"190","author_name":"fujidig","version":"1.0","description":"\u661f\u53d6\u8868: \u5927\u5b66\u306e\u30b3\u30ed\u30ca\u8b66\u6212\u30ec\u30d9\u30eb\u304c\u4e0b\u304c\u308a\u3001\u9662\u751f\u5ba4\u306b\u884c\u3051\u308b\u3088\u3046\u306b\u306a\u3063\u305f (\u305f\u3060\u81ea\u5206\u306e\u673a\u306f\u307e\u3060\u7528\u610f\u3055\u308c\u3066\u3044\u306a\u3044)\u3002\u307e\u305f\u3001K\u7814\u306e\u30bb\u30df\u30ca\u30fc\u306f\u30aa\u30d5\u30e9\u30a4\u30f3\u3067\u884c\u308f\u308c\u308b\u3088\u3046\u306b\u306a\u3063\u305f\u3002 6\u67081\u65e5\u3002\u6570\u7406\u60c5\u5831\u5b66\u57fa\u790e\u8ad6\u6982\u8ad61\u306e\u30ec\u30dd\u30fc\u30c8\u3092\u63d0\u51fa\u3002f(x)=x^2 + x + 41\u306bx\u306b0\u4ee5\u4e0a39\u4ee5\u4e0b\u306e\u6574\u6570\u3092\u5165\u308c\u305f\u3089\u7d20\u6570\u304c\u51fa\u308b\u3053\u3068\u3092 (\u2212163/p)=1 (p\u306f37\u4ee5\u4e0b\u306e\u7d20\u6570) \u306b\u5e30\u7740\u3055\u305b\u308b\u8a71\u304c\u30ec\u30dd\u2015\u30c8\u306b\u51fa\u305f\u306e\u3060\u304c\u3001\u3053\u308c\u304c\u6210\u308a\u7acb\u3064\u306e\u3082\u4e0d\u601d\u8b70\u306a\u8a71\u306a\u306e\u3067\u30012\u6b21\u4f53\u306e\u6574\u6570\u8ad6\u3092\u4f7f\u3063\u3066\u8a3c\u660e\u3092\u4e0e\u3048\u305f\u3002 6\u67085\u65e5\u3002\u7814\u7a76\u5ba4\u30bb\u30df\u30ca\u30fc\u3002Baumgartner\u306eGeneralized Martin's Axiom\u306e\u7bc0\u3092\u8aad\u3080\u3002\u3044\u308d\u3044\u308d\u3068\u8a18\u8ff0\u304c\u96d1\u3060\u3063\u2026"}