\u4f8b\u984c\u3068\u3057\u3066\u3001\u4ee5\u4e0b\u306e\u554f\u984c\u3092\u89e3\u3044\u3066\u307f\u307e\u3057\u3087\u3046\u3002<\/p>\n
- \n
- \\(\\displaystyle \\lim_{ x \\to 2 } \\displaystyle\\frac{x^2-3x+2}{x-2}\\)<\/li>\n<\/ul>\n
\\(x\\)\u306b2\u3092\u4ee3\u5165\u3059\u308b\u3068\\(\\displaystyle\\frac{0}{0}\\)\u3068\u306a\u308a\u307e\u3059\u3002\u305d\u3053\u3067\u3001\u4ee5\u4e0b\u306e\u3088\u3046\u306b\u56e0\u6570\u5206\u89e3\u3059\u308b\u3053\u3068\u3067\u5206\u6bcd\u3092\u6d88\u3057\u307e\u3057\u3087\u3046\u3002<\/p>\n
\\(\\displaystyle \\lim_{ x \\to 2 } \\displaystyle\\frac{x^2-3x+2}{x-2}\\)<\/p>\n
\\(=\\displaystyle \\lim_{ x \\to 2 } \\displaystyle\\frac{(x-2)(x-1)}{x-2}\\)<\/p>\n
\\(=\\displaystyle \\lim_{ x \\to 2 } (x-1)\\)<\/p>\n
\\(=1\\)<\/p>\n
\u524d\u8ff0\u306e\u901a\u308a\u3001\\(x\\)\u306f2\u306b\u8fd1\u3065\u304f\u3082\u306e\u306e2\u3067\u3042\u308a\u307e\u305b\u3093\u3002\\(x-2\\)\u306f0\u3067\u306f\u306a\u3044\u305f\u3081\u3001\u5206\u5b50\u3068\u5206\u6bcd\u3092\\(x-2\\)\u3067\u5272\u308b\u3053\u3068\u304c\u3067\u304d\u308b\u306e\u3067\u3059\u3002<\/p>\n
\\(x\\)\u3092\u7121\u9650\u5927\u306b\u5927\u304d\u304f\u3059\u308b<\/h3>\n
\u306a\u304a\u3001\\(x\\)\u3092\u7121\u9650\u5927\u306b\u5927\u304d\u304f\u3059\u308b\u3068\u304d\u306e\u8a08\u7b97\u3092\u3057\u306a\u3051\u308c\u3070\u3044\u3051\u306a\u3044\u3053\u3068\u3082\u3042\u308a\u307e\u3059\u3002\u3053\u306e\u5834\u5408\u3001\u6700\u3082\u5927\u304d\u3044\u4fc2\u6570\u3092\u5229\u7528\u3057\u3066\u5f0f\u3092\u5909\u5f62\u3057\u307e\u3059\u3002\u4f8b\u3048\u3070\u3001\\(\\displaystyle \\lim_{ x \\to \\infty } (x^2-5x+2)\\)\u306f\u4ee5\u4e0b\u306e\u3088\u3046\u306b\u8a08\u7b97\u3057\u307e\u3059\u3002<\/p>\n
\\(\\displaystyle \\lim_{ x \\to \\infty } (x^2-5x+2)\\)<\/p>\n
\\(=\\displaystyle \\lim_{ x \\to \\infty } x^2\\left(1-\\displaystyle\\frac{5}{x}+\\displaystyle\\frac{2}{x^2}\\right)\\)<\/p>\n
\\(=\u221e(1-0+0)\\)<\/p>\n
\\(=\u221e\\)<\/p>\n
\u8a08\u7b97\u65b9\u6cd5\u306f\u6570\u5217\u306e\u6975\u9650\u3068\u540c\u3058\u3067\u3059\u3002\u305d\u306e\u305f\u3081\u6570\u5217\u306e\u6975\u9650\u3092\u5b66\u3093\u3067\u3044\u308b\u5834\u5408\u3001\u8a08\u7b97\u65b9\u6cd5\u306f\u65e2\u306b\u77e5\u3063\u3066\u3044\u308b\u3053\u3068\u306b\u306a\u308a\u307e\u3059\u3002<\/p>\n
\u6975\u9650\u5024\u306e\u6761\u4ef6\u3092\u5229\u7528\u3057\u3066\u95a2\u6570\u306e\u4fc2\u6570\u3092\u5f97\u308b<\/h2>\n
\u305d\u308c\u3067\u306f\u3001\u6975\u9650\u5024\u306e\u6761\u4ef6\u3092\u5229\u7528\u3057\u3066\u95a2\u6570\u306e\u4fc2\u6570\u3092\u8a08\u7b97\u3057\u307e\u3057\u3087\u3046\u3002\u4ee5\u4e0b\u306e\u554f\u984c\u306e\u7b54\u3048\u306f\u4f55\u3067\u3057\u3087\u3046\u304b\u3002<\/p>\n
- \n
- \\(\\displaystyle \\lim_{ x \\to 1 } \\displaystyle\\frac{a\\sqrt{x+3}-b}{x-1}=2\\)\u304c\u6210\u308a\u7acb\u3064\u3068\u304d\u3001\\(a\\)\u3068\\(b\\)\u3092\u6c42\u3081\u307e\u3057\u3087\u3046\u3002<\/li>\n<\/ul>\n
\\(x\\)\u306b1\u3092\u4ee3\u5165\u3059\u308b\u3068\u5206\u6bcd\u304c0\u306b\u306a\u308a\u307e\u3059\u3002\u305f\u3060\u7b54\u3048\u306f2\u3067\u3042\u308b\u305f\u3081\u3001\u7d04\u5206\u3067\u304d\u306a\u3051\u308c\u3070\u3044\u3051\u307e\u305b\u3093\u3002\u8a00\u3044\u63db\u3048\u308b\u3068\u3001\\(x\\)\u306b1\u3092\u4ee3\u5165\u3059\u308b\u3053\u3068\u3067\u5206\u5b50\u306e\u7b54\u3048\u304c0\u306b\u306a\u308b\u5fc5\u8981\u304c\u3042\u308a\u307e\u3059\u3002<\/span>\u3053\u306e\u5834\u5408\u3001\u5206\u5b50\u3068\u5206\u6bcd\u3092\\(x-1\\)\u3067\u5272\u308b\u3053\u3068\u304c\u3067\u304d\u307e\u3059\u3002<\/p>\n
\\(\\displaystyle \\lim_{ x \\to 1 } (a\\sqrt{x+3}-b)=0\\)\u3067\u3042\u308b\u305f\u3081\u3001\u4ee5\u4e0b\u306e\u3088\u3046\u306b\u8a08\u7b97\u3057\u307e\u3057\u3087\u3046\u3002<\/p>\n
\\(\\displaystyle \\lim_{ x \\to 1 } (a\\sqrt{x+3}-b)=0\\)<\/p>\n
\\(2a-b=0\\)<\/p>\n
\\(b=2a\\)<\/p>\n
\u305d\u3053\u3067\\(b=2a\\)\u3092\u4ee3\u5165\u3059\u308b\u3068\u3001\u4ee5\u4e0b\u306e\u3088\u3046\u306b\u8a08\u7b97\u3067\u304d\u307e\u3059\u3002<\/p>\n
\\(\\displaystyle \\lim_{ x \\to 1 } \\displaystyle\\frac{a\\sqrt{x+3}-b}{x-1}=2\\)<\/p>\n
\\(\\displaystyle \\lim_{ x \\to 1 } \\displaystyle\\frac{a\\sqrt{x+3}-2a}{x-1}=2\\)<\/p>\n
\\(\\displaystyle \\lim_{ x \\to 1 } \\displaystyle\\frac{a(\\sqrt{x+3}-2)}{x-1}=2\\)<\/p>\n
\\(\\displaystyle \\lim_{ x \\to 1 } \\displaystyle\\frac{a(x+3-4)}{(x-1)(\\sqrt{x+3}+2)}=2\\)<\/p>\n
\\(\\displaystyle \\lim_{ x \\to 1 } \\displaystyle\\frac{a(x-1)}{(x-1)(\\sqrt{x+3}+2)}=2\\)<\/p>\n
\\(\\displaystyle \\lim_{ x \\to 1 } \\displaystyle\\frac{a}{\\sqrt{x+3}+2}=2\\)<\/p>\n
\\(\\displaystyle\\frac{a}{4}=2\\)<\/p>\n
\\(a=8\\)<\/p>\n
\\(a=8\\)\u3067\u3042\u308b\u305f\u3081\u3001\\(b=16\\)\u3067\u3059\u3002\u3053\u3046\u3057\u3066\u3001\u95a2\u6570\u306e\u4fc2\u6570\u3092\u5f97\u308b\u3053\u3068\u304c\u3067\u304d\u307e\u3057\u305f\u3002<\/p>\n
\u95a2\u6570\u306e\u4e00\u65b9\u304b\u3089\u306e\u6975\u9650\u3068\u7b54\u3048\u306e\u9055\u3044<\/h3>\n
\u306a\u304a\u6975\u9650\u306e\u8a08\u7b97\u3092\u3059\u308b\u3068\u304d\u3001\u3069\u3061\u3089\u5074\u304b\u3089\u5024\u306b\u8fd1\u3065\u304f\u306e\u304b\u306b\u3088\u3063\u3066\u7b54\u3048\u304c\u5909\u5316\u3059\u308b\u30b1\u30fc\u30b9\u304c\u3042\u308a\u307e\u3059\u3002\u308f\u304b\u308a\u3084\u3059\u3044\u4f8b\u306f\u5206\u6570\u95a2\u6570\u3067\u3059\u3002\u5206\u6570\u95a2\u6570\u3067\u306f\u3001\u30d7\u30e9\u30b9\u5074\u3068\u30de\u30a4\u30ca\u30b9\u5074\u306b\u3064\u3044\u3066\u3001\u3069\u3061\u3089\u5074\u304b\u3089\u5024\u306b\u8fd1\u3065\u304f\u306e\u304b\u306b\u3088\u3063\u3066\u7b54\u3048\u304c\u5909\u5316\u3057\u307e\u3059\u3002<\/p>\n
\u3053\u306e\u3068\u304d\\(\\displaystyle \\lim_{ x \\to 1+0 }\\)\u3067\u3042\u308c\u3070\u30011.00001\u306e\u3088\u3046\u306b\u30011\u306b\u9650\u308a\u306a\u304f\u8fd1\u3044\u3082\u306e\u306e\u30011\u3088\u308a\u3082\u5927\u304d\u3044\u5024\u3092\u6307\u3057\u307e\u3059\u3002\u4e00\u65b9\u3067\\(\\displaystyle \\lim_{ x \\to 1-0 }\\)\u3067\u3042\u308c\u3070\u30011\u306b\u9650\u308a\u306a\u304f\u8fd1\u3044\u3082\u306e\u306e\u30011\u3088\u308a\u3082\u5c0f\u3055\u3044\u5024\u3092\u6307\u3057\u307e\u3059\u3002\u305d\u308c\u3067\u306f\u3001\u4ee5\u4e0b\u306e\u5f0f\u306e\u7b54\u3048\u306f\u4f55\u3067\u3057\u3087\u3046\u304b\u3002<\/p>\n
- \n
- \\(\\displaystyle \\lim_{ x \\to 1+0 } \\displaystyle\\frac{x+3}{x-1}\\)<\/li>\n<\/ul>\n
\u5206\u5b50\u306f\u30d7\u30e9\u30b9\u306e\u5024\u3067\u3042\u308a\u3001\u5206\u6bcd\u306f\u30d7\u30e9\u30b9\u306e\u5024\u3067\u3059\u3002\u305d\u306e\u305f\u3081\u3001\\(\\displaystyle \\lim_{ x \\to 1+0 } \\displaystyle\\frac{x+3}{x-1}=\u221e\\)\u304c\u6b63\u89e3\u3067\u3059\u3002\u4e00\u65b9\u3001\u4ee5\u4e0b\u306e\u554f\u984c\u306e\u7b54\u3048\u306f\u4f55\u3067\u3057\u3087\u3046\u304b\u3002<\/p>\n
- \n
- \\(\\displaystyle \\lim_{ x \\to 1-0 } \\displaystyle\\frac{x+3}{x-1}\\)<\/li>\n<\/ul>\n
\u3053\u306e\u5834\u5408\u3001\u5206\u5b50\u306f\u30d7\u30e9\u30b9\u306e\u5024\u3067\u3042\u308a\u3001\u5206\u6bcd\u306f\u30de\u30a4\u30ca\u30b9\u306e\u5024\u3067\u3059\u3002\u305d\u306e\u305f\u3081\u3001\\(\\displaystyle \\lim_{ x \\to 1+0 } \\displaystyle\\frac{x+3}{x-1}=-\u221e\\)\u3068\u306a\u308a\u307e\u3059\u3002\u3053\u306e\u3088\u3046\u306a\u7b54\u3048\u3092\u5f97\u3089\u308c\u308b\u7406\u7531\u3068\u3057\u3066\u306f\u3001\u4ee5\u4e0b\u306e\u3088\u3046\u306b\u5206\u6570\u95a2\u6570\u306e\u30b0\u30e9\u30d5\u3092\u63cf\u3051\u3070\u5bb9\u6613\u306b\u7406\u89e3\u3067\u304d\u307e\u3059\u3002<\/p>\n
- \n
- \\(\\displaystyle\\frac{x+3}{x-1}=\\displaystyle\\frac{4}{x-1}+1\\)<\/li>\n<\/ul>\n
![\"\"](\"https:\/\/hatsudy.com\/jp\/wp-content\/uploads\/2023\/02\/pgje1.jpg\")
<\/p>\n\u95a2\u6570\u306e\u6975\u9650\u3067\u306f\u3001\u30d7\u30e9\u30b9\u3068\u30de\u30a4\u30ca\u30b9\u306e\u3069\u3061\u3089\u5074\u304b\u3089\u8fd1\u3065\u304f\u306e\u304b\u306b\u3088\u3063\u3066\u7b54\u3048\u304c\u5909\u308f\u308b\u30b1\u30fc\u30b9\u304c\u3042\u308b\u4e8b\u5b9f\u3092\u5b66\u3073\u307e\u3057\u3087\u3046\u3002<\/p>\n
\u95a2\u6570\u306e\u6975\u9650\u3068\u306f\u3055\u307f\u3046\u3061\u306e\u539f\u7406<\/h3>\n
\u6570\u5217\u306e\u6975\u9650\u3067\u306f\u3001\u306f\u3055\u307f\u3046\u3061\u306e\u539f\u7406\u3092\u5229\u7528\u3059\u308b\u3053\u3068\u306b\u3088\u3063\u3066\u7b54\u3048\u3092\u5f97\u308b\u3053\u3068\u304c\u3067\u304d\u307e\u3059\u3002\u3053\u308c\u306f\u3001\u95a2\u6570\u306e\u6975\u9650\u3082\u540c\u69d8\u3067\u3059\u3002\u6975\u9650\u306e\u8a08\u7b97\u3092\u76f4\u63a5\u3059\u308b\u306e\u304c\u96e3\u3057\u3044\u5834\u5408\u3001\u306f\u3055\u307f\u3046\u3061\u306e\u539f\u7406\u3092\u5229\u7528\u3059\u308b\u3053\u3068\u306b\u3088\u3063\u3066\u7b54\u3048\u3092\u5f97\u307e\u3057\u3087\u3046\u3002<\/p>\n
\u305d\u308c\u3067\u306f\u3001\\(\\displaystyle \\lim_{ x \\to \\infty } \\displaystyle\\frac{sinx}{x}\\)\u306e\u7b54\u3048\u306f\u4f55\u3067\u3057\u3087\u3046\u304b\u3002<\/p>\n
\\(-1\u2266sinx\u22661\\)\u3067\u3042\u308b\u305f\u3081\u3001\\(-\\displaystyle\\frac{1}{x}\u2266\\displaystyle\\frac{sinx}{x}\u2266\\displaystyle\\frac{1}{x}\\)\u3067\u3059\u3002\u305d\u306e\u305f\u3081\u3001\\(x\\)\u306e\u5024\u3092\u7121\u9650\u5927\u306b\u5927\u304d\u304f\u3059\u308b\u3068\u5de6\u8fba\u3082\u53f3\u8fba\u30820\u306b\u306a\u308a\u307e\u3059\u3002\u3053\u3046\u3057\u3066\u3001\\(\\displaystyle \\lim_{ x \\to \\infty } \\displaystyle\\frac{sinx}{x}=0\\)\u3068\u308f\u304b\u308a\u307e\u3059\u3002<\/p>\n
\u6570\u5217\u306e\u6975\u9650\u3067\u5229\u7528\u3059\u308b\u306f\u3055\u307f\u3046\u3061\u306e\u539f\u7406\u306f\u95a2\u6570\u306e\u6975\u9650\u3067\u3082\u5229\u7528\u3059\u308b\u3053\u3068\u304c\u3067\u304d\u307e\u3059\u3002<\/p>\n
\u95a2\u6570\u306e\u6975\u9650\u3092\u8a08\u7b97\u3059\u308b<\/h2>\n
\u95a2\u6570\u306e\u6975\u9650\u3067\u306f\u3001\\(x\\)\u306b\u5024\u3092\u4ee3\u5165\u3059\u308c\u3070\u7b54\u3048\u3092\u5f97\u308b\u3053\u3068\u304c\u3067\u304d\u307e\u3059\u3002\u305f\u3060\u3001\u3053\u3046\u3057\u305f\u7c21\u5358\u306a\u554f\u984c\u304c\u51fa\u984c\u3055\u308c\u308b\u3053\u3068\u306f\u3042\u308a\u307e\u305b\u3093\u3002\u4ee3\u5165\u3059\u308b\u3053\u3068\u3067\u5206\u6bcd\u304c0\u306b\u306a\u3063\u305f\u308a\u3001\u7121\u9650\u5927\u304b\u3089\u7121\u9650\u5927\u3092\u5f15\u3044\u305f\u308a\u3059\u308b\u554f\u984c\u304c\u51fa\u984c\u3055\u308c\u307e\u3059\u3002<\/p>\n
\u5206\u6bcd\u304c0\u306b\u306a\u308b\u5834\u5408\u3001\u7d04\u5206\u3059\u308b\u3053\u3068\u3067\u5206\u6bcd\u304c0\u306b\u306a\u3089\u306a\u3044\u3088\u3046\u306b\u5f0f\u3092\u5909\u5f62\u3057\u307e\u3057\u3087\u3046\u3002\u307e\u305f\u3001\u6700\u3082\u5927\u304d\u3044\u4fc2\u6570\u306b\u7740\u76ee\u3057\u3066\u5f0f\u3092\u5909\u5f62\u3059\u308b\u3053\u3068\u306b\u3088\u3063\u3066\u3082\u6975\u9650\u306e\u8a08\u7b97\u3092\u884c\u3048\u308b\u3088\u3046\u306b\u306a\u308a\u307e\u3059\u3002<\/p>\n
\u306a\u304a\u95a2\u6570\u306e\u6975\u9650\u3067\u306f\u3001\u306f\u3055\u307f\u3046\u3061\u306e\u539f\u7406\u3082\u5229\u7528\u3067\u304d\u307e\u3059\u3002\u305d\u306e\u305f\u3081\u3001\u8a08\u7b97\u65b9\u6cd5\u306f\u6570\u5217\u306e\u6975\u9650\u3068\u4f3c\u3066\u3044\u307e\u3059\u3002\u305f\u3060\u3001\u95a2\u6570\u306e\u6975\u9650\u306b\u7279\u5fb4\u7684\u306a\u5185\u5bb9\u3082\u5b58\u5728\u3057\u307e\u3059\u3002\u305d\u3053\u3067\u3001\u95a2\u6570\u306e\u6975\u9650\u306e\u6027\u8cea\u3092\u7406\u89e3\u3057\u3066\u8a08\u7b97\u3057\u307e\u3057\u3087\u3046\u3002<\/p>\n","protected":false},"excerpt":{"rendered":"
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- \\(\\displaystyle\\frac{x+3}{x-1}=\\displaystyle\\frac{4}{x-1}+1\\)<\/li>\n<\/ul>\n
- \\(\\displaystyle \\lim_{ x \\to 1-0 } \\displaystyle\\frac{x+3}{x-1}\\)<\/li>\n<\/ul>\n
- \\(\\displaystyle \\lim_{ x \\to 1+0 } \\displaystyle\\frac{x+3}{x-1}\\)<\/li>\n<\/ul>\n
- \\(\\displaystyle \\lim_{ x \\to 1 } \\displaystyle\\frac{a\\sqrt{x+3}-b}{x-1}=2\\)\u304c\u6210\u308a\u7acb\u3064\u3068\u304d\u3001\\(a\\)\u3068\\(b\\)\u3092\u6c42\u3081\u307e\u3057\u3087\u3046\u3002<\/li>\n<\/ul>\n