{"id":28838,"date":"2021-03-30T13:00:35","date_gmt":"2021-03-30T13:00:35","guid":{"rendered":"http:\/\/toposuranos.com\/material\/?p=28838"},"modified":"2024-09-22T02:05:47","modified_gmt":"2024-09-22T02:05:47","slug":"%e0%a4%a6%e0%a5%8d%e0%a4%b5%e0%a4%bf%e0%a4%98%e0%a4%be%e0%a4%a4-%e0%a4%ac%e0%a4%b9%e0%a5%81%e0%a4%aa%e0%a4%a6-%e0%a4%94%e0%a4%b0-2n-%e0%a4%98%e0%a4%be%e0%a4%a4-%e0%a4%ac%e0%a4%b9%e0%a5%81%e0%a4%aa","status":"publish","type":"post","link":"https:\/\/toposuranos.com\/material\/hi\/%e0%a4%a6%e0%a5%8d%e0%a4%b5%e0%a4%bf%e0%a4%98%e0%a4%be%e0%a4%a4-%e0%a4%ac%e0%a4%b9%e0%a5%81%e0%a4%aa%e0%a4%a6-%e0%a4%94%e0%a4%b0-2n-%e0%a4%98%e0%a4%be%e0%a4%a4-%e0%a4%ac%e0%a4%b9%e0%a5%81%e0%a4%aa\/","title":{"rendered":"\u0926\u094d\u0935\u093f\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926 \u0914\u0930 2n-\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926 \u0915\u093e \u0915\u093e\u0930\u0915\u0915\u0930\u0923"},"content":{"rendered":"

<\/p>\n

\u0926\u094d\u0935\u093f\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926 \u0914\u0930 2n-\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926 \u0915\u093e \u0915\u093e\u0930\u0915\u0915\u0930\u0923<\/h1>\n

\u0938\u093e\u0930\u093e\u0902\u0936:<\/strong>
\n \u0907\u0938 \u0915\u0915\u094d\u0937\u093e \u092e\u0947\u0902 \u0939\u092e \u0926\u094d\u0935\u093f\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926 P(x) = ax^2 + bx + c<\/span> \u0914\u0930 2n-\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926 (2n)<\/span>-\u092c\u0939\u0941\u092a\u0926 P(x) = ax^{2n} + bx^n + c<\/span> \u0915\u0947 \u0915\u093e\u0930\u0915\u0915\u0930\u0923 \u0915\u0940 \u092a\u094d\u0930\u0915\u094d\u0930\u093f\u092f\u093e \u0915\u094b \u0935\u093f\u0938\u094d\u0924\u093e\u0930 \u0938\u0947 \u0926\u0947\u0916\u0947\u0902\u0917\u0947, \u0909\u0928\u094d\u0939\u0947\u0902 \u0938\u0930\u0932 \u0915\u093e\u0930\u0915\u094b\u0902 \u092e\u0947\u0902 \u0935\u093f\u092d\u093e\u091c\u093f\u0924 \u0915\u0930\u0947\u0902\u0917\u0947\u0964 \u0939\u092e \u0917\u0923\u093f\u0924\u0940\u092f \u0930\u0942\u092a \u0938\u0947 \u092a\u094d\u0930\u0915\u094d\u0930\u093f\u092f\u093e\u0913\u0902 \u0915\u093e \u0935\u093f\u0915\u093e\u0938 \u0915\u0930\u0947\u0902\u0917\u0947 \u0914\u0930 \u0935\u094d\u092f\u093e\u0935\u0939\u093e\u0930\u093f\u0915 \u0909\u0926\u093e\u0939\u0930\u0923 \u0926\u093f\u0916\u093e\u090f\u0902\u0917\u0947\u0964<\/em><\/p>\n

\u0938\u0940\u0916\u0928\u0947 \u0915\u0947 \u0909\u0926\u094d\u0926\u0947\u0936\u094d\u092f<\/strong><\/p>\n

    \n
  1. \u0938\u0940\u0916\u0947\u0902<\/strong> \u0915\u093f P(x) = ax^2 + bx + c<\/span> \u0915\u0947 \u0930\u0942\u092a \u0935\u093e\u0932\u0947 \u0926\u094d\u0935\u093f\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926\u094b\u0902 \u0915\u093e \u0915\u093e\u0930\u0915\u0915\u0930\u0923 \u0915\u0948\u0938\u0947 \u0915\u0930\u0947\u0902\u0964<\/li>\n
  2. \u0909\u0924\u094d\u092a\u0928\u094d\u0928 \u0915\u0930\u0947\u0902<\/strong> \u0914\u0930 \u0926\u094d\u0935\u093f\u0918\u093e\u0924 \u0938\u0942\u0924\u094d\u0930 \u0915\u093e \u0909\u092a\u092f\u094b\u0917 \u0915\u0930\u0947\u0902 x = \\displaystyle \\frac{-b \\pm \\sqrt{b^2 - 4ac}}{2a}<\/span> \u091c\u0921\u093c\u094b\u0902 \u0915\u094b \u0916\u094b\u091c\u0928\u0947 \u0915\u0947 \u0932\u093f\u090f\u0964<\/li>\n
  3. \u0932\u093e\u0917\u0942 \u0915\u0930\u0947\u0902<\/strong> \u0915\u093e\u0930\u0915\u0915\u0930\u0923 \u0924\u0915\u0928\u0940\u0915\u094b\u0902 \u0915\u094b (2n)-\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926\u094b\u0902 \u092a\u0930 P(x) = ax^{2n} + bx^n + c<\/span> \u0915\u0947 \u0930\u0942\u092a \u092e\u0947\u0902\u0964<\/li>\n
  4. \u092a\u0939\u091a\u093e\u0928\u0947\u0902<\/strong> \u0926\u094d\u0935\u093f\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926\u094b\u0902 \u0915\u0947 \u0915\u093e\u0930\u0915\u0915\u0930\u0923 \u0915\u0947 \u0932\u093f\u090f \u0906\u0935\u0936\u094d\u092f\u0915 \u0936\u0930\u094d\u0924\u094b\u0902 \u0915\u094b\u0964<\/li>\n
  5. \u0909\u092a\u092f\u094b\u0917 \u0915\u0930\u0947\u0902<\/strong> \u092a\u0942\u0930\u094d\u0923 \u0935\u0930\u094d\u0917 \u092c\u0928\u093e\u0928\u0947 \u0915\u0940 \u0935\u093f\u0927\u093f \u0915\u093e\u0930\u0915\u0915\u0930\u0923 \u092a\u094d\u0930\u0915\u094d\u0930\u093f\u092f\u093e \u092e\u0947\u0902\u0964<\/li>\n<\/ol>\n

    \u0935\u093f\u0937\u092f \u0938\u0942\u091a\u0940:<\/strong>
    \n \u092a\u0930\u093f\u091a\u092f<\/a>
    \n     \u0926\u094d\u0935\u093f\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926 \u0914\u0930 2n-\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926<\/a>
    \n     \u0926\u094d\u0935\u093f\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926 \u0915\u093e \u0915\u093e\u0930\u0915\u0915\u0930\u0923<\/a>
    \n     \u0926\u094d\u0935\u093f\u0918\u093e\u0924-\u091a\u0924\u0941\u0930\u094d\u0918\u093e\u0924 \u092c\u0939\u0941\u092a\u0926 \u0915\u093e \u0915\u093e\u0930\u0915\u0915\u0930\u0923 \u0935\u093f\u0938\u094d\u0924\u093e\u0930<\/a>
    \n     \u0909\u0926\u093e\u0939\u0930\u0923 \u0905\u092d\u094d\u092f\u093e\u0938<\/a>\n <\/p>\n

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