{"id":27972,"date":"2023-12-03T22:56:02","date_gmt":"2023-12-03T22:56:02","guid":{"rendered":"https:\/\/science-hub.click\/%E9%80%9A%E5%B8%B8%E3%81%AE%E5%B0%8E%E9%96%A2%E6%95%B0-%E5%AE%9A%E7%BE%A9\/"},"modified":"2023-12-03T22:56:02","modified_gmt":"2023-12-03T22:56:02","slug":"%E9%80%9A%E5%B8%B8%E3%81%AE%E5%B0%8E%E9%96%A2%E6%95%B0-%E5%AE%9A%E7%BE%A9","status":"publish","type":"post","link":"https:\/\/science-hub.click\/?p=27972","title":{"rendered":"\u901a\u5e38\u306e\u5c0e\u95a2\u6570 – \u5b9a\u7fa9"},"content":{"rendered":"
\u3053\u306e\u8a18\u4e8b\u306f\u30b7\u30ea\u30fc\u30ba\u306e\u4e00\u90e8\u3067\u3059\u5c0f\u5b66\u6821\u6570\u5b66<\/strong><\/small><\/td><\/tr>
\u4ee3\u6570<\/td><\/tr>
\u5206\u6790<\/td><\/tr>
\u7b97\u8853<\/td><\/tr>
\u30b8\u30aa\u30e1\u30c8\u30ea<\/td><\/tr>
\u8ad6\u7406<\/a><\/span><\/td><\/tr>
\u78ba\u7387<\/a><\/span><\/td><\/tr>
\u7d71\u8a08\u7684<\/a><\/span><\/td><\/tr><\/table>

\u3053\u306e\u8a18\u4e8b\u3067\u306f\u3001\u6700\u3082\u4e00\u822c\u7684\u306a\u95a2\u6570<\/a><\/span>\u304b\u3089\u6d3e\u751f\u3057\u305f\u95a2\u6570\u3092\u30ea\u30b9\u30c8\u3057\u307e\u3059\u3002<\/p>
\u5b9a\u7fa9<\/a><\/span>\u30c9\u30e1\u30a4\u30f3<\/strong>
$$ {D_f \\,\\!} $$<\/div><\/th>
\u95a2\u6570<\/strong>
$$ {f(x) \\,\\!} $$<\/div><\/th>
\u5b9a\u7fa9\u30c9\u30e1\u30a4\u30f3<\/strong>
$$ {D_{f’} \\,\\!} $$<\/div><\/th>
\u30c7\u30ea\u30d0\u30c6\u30a3\u30d6<\/a><\/span><\/strong>
$$ {f'(x) \\,\\!} $$<\/div><\/th>
\u72b6\u614b<\/strong><\/th><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {c \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {0 \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {x \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {1 \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {x^2 \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {2x \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R_+ \\,\\!} $$<\/div><\/td>
$$ {\\sqrt{x} \\,\\!} $$<\/div><\/td>
$$ {\\R_+^* \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{2\\sqrt{x}} \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R^* \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{x} \\,\\!} $$<\/div><\/td>
$$ {\\R^* \\,\\!} $$<\/div><\/td>
$$ {-\\frac{1}{x^2} \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {x^n \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {nx^{n-1} \\,\\!} $$<\/div><\/td>
$$ {n \\in \\N \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{x^n} \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {-\\frac{n}{x^{n+1}} \\,\\!} $$<\/div><\/td>
$$ {n \\in \\N \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R_+ \\,\\!} $$<\/div><\/td>
$$ {\\sqrt[n]{x} \\,\\!} $$<\/div><\/td>
$$ {\\R_+ \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{n\\sqrt[n]{x^{n-1}}} \\,\\!} $$<\/div><\/td>
$$ {n\\in\\N~} $$<\/div><\/td><\/tr>
$$ {\\R_+ \\,\\!} $$<\/div><\/td>
$$ {x^{\\alpha} \\,\\!} $$<\/div><\/td>
$$ {\\R_+ \\,\\!} $$<\/div><\/td>
$$ {\\alpha x^{\\alpha-1} \\,\\!} $$<\/div><\/td>
$$ {\\alpha \\geq 1 \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R_+ \\,\\!} $$<\/div><\/td>
$$ {x^{\\alpha} \\,\\!} $$<\/div><\/td>
$$ {\\R_+^* \\,\\!} $$<\/div><\/td>
$$ {\\alpha x^{\\alpha – 1} \\,\\!} $$<\/div><\/td>
$$ {0 < \\alpha < 1 \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R_+^* \\,\\!} $$<\/div><\/td>
$$ {x^{\\alpha} \\,\\!} $$<\/div><\/td>
$$ {\\R_+^* \\,\\!} $$<\/div><\/td>
$$ {\\alpha x^{\\alpha – 1} \\,\\!} $$<\/div><\/td>
$$ {\\alpha < 0 \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\sin x \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\cos x \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\cos x \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {- \\sin x \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\backslash\\left(\\frac\\pi2+\\pi\\Z\\right) \\,\\!} $$<\/div><\/td>
$$ {\\tan x \\,\\!} $$<\/div><\/td>
$$ {\\R \\backslash\\left(\\frac\\pi2+\\pi\\Z\\right) \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{\\cos^2 x} = 1+\\tan^2 x \\,\\!} $$<\/div><\/td><\/tr>
$$ {[ -1 , 1 ] \\,\\!} $$<\/div><\/td>
$$ {\\arcsin x \\,\\!} $$<\/div><\/td>
$$ {] -1 , 1 [ \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{\\sqrt{1-x^2}} \\, \\!} $$<\/div><\/td><\/tr>
$$ {[ -1 , 1 ] \\,\\!} $$<\/div><\/td>
$$ {\\arccos x \\,\\!} $$<\/div><\/td>
$$ {] -1 , 1 [ \\,\\!} $$<\/div><\/td>
$$ {-\\frac{1}{\\sqrt{1-x^2}} \\, \\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\arctan x \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{1+x^2} \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R_+^* \\,\\!} $$<\/div><\/td>
$$ {\\ln x \\,\\!} $$<\/div><\/td>
$$ {\\R_+^* \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{x} \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {e^x \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {e^x \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R_+^* \\,\\!} $$<\/div><\/td>
$$ {\\log_a x \\,\\!} $$<\/div><\/td>
$$ {\\R_+^* \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{x \\ln a} \\,\\!} $$<\/div><\/td>
$$ {a width=} $$<\/div> 0\\,\\!” > <\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {a^x \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {a^x \\ln a \\,\\!} $$<\/div><\/td>
$$ {a width=} $$<\/div> 0\\,\\!” > <\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\operatorname{sh} x \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\operatorname{ch} x \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\operatorname{ch} x \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\operatorname{sh} x \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\operatorname{th} x \\,\\!} $$<\/div><\/td>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{\\operatorname{ch}^2 x} \\,\\!} $$<\/div><\/td><\/tr>
$$ {\\R \\,\\!} $$<\/div><\/td>
$$ {\\ \\operatorname{argsh}\\, x \\,\\!} $$<\/div><\/td>
$$ {\\R \\, \\!} $$<\/div><\/td>
$$ {\\frac{1}{\\sqrt{1+x^2}} \\, \\!} $$<\/div><\/td><\/tr>
$$ {] 1 , +\\infty [ \\,\\!} $$<\/div><\/td>
$$ {\\ \\operatorname{argch}\\, x \\,\\!} $$<\/div><\/td>
$$ {] 1 , +\\infty [ \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{\\sqrt{x^2-1}} \\, \\!} $$<\/div><\/td><\/tr>
$$ {] -1 , 1 [ \\,\\!} $$<\/div><\/td>
$$ {\\ \\operatorname{argth}\\, x \\,\\!} $$<\/div><\/td>
$$ {] -1 , 1 [ \\,\\!} $$<\/div><\/td>
$$ {\\frac{1}{1-x^2} \\, \\!} $$<\/div><\/td><\/tr><\/table><\/div>

\u53c2\u8003\u8cc7\u6599<\/h2>
  1. \u0645\u0634\u062a\u0642\u0627\u062a \u0639\u0627\u062f\u064a\u0629 \u2013 arabe<\/a><\/li>
  2. \u178f\u17b6\u179a\u17b6\u1784\u178a\u17c1\u179a\u17b8\u179c\u17c1\u1792\u1798\u17d2\u1798\u178f\u17b6 \u2013 khmer<\/a><\/li>
  3. Nuus \u2013 afrikaans<\/a><\/li>
  4. The – – – – \u2013 ancien anglais<\/a><\/li>
  5. \u062e\u0628\u0631 (\u0625\u0639\u0644\u0627\u0645) \u2013 arabe<\/a><\/li>
  6. \u071b\u0710\u0712\u0710 \u2013 aram\u00e9en<\/a><\/li><\/ol><\/div>\n
    \n

    \n \u901a\u5e38\u306e\u5c0e\u95a2\u6570 – \u5b9a\u7fa9\u30fb\u95a2\u9023\u52d5\u753b\n <\/h2>\n
    \n \n
    \n
    \n