Toán TÍNH LẬP PHƯƠNG CỦA HẰNG ĐẲNG THỨC SAU (5a-3b)(5a+3b) 27/09/2021 By Raelynn TÍNH LẬP PHƯƠNG CỦA HẰNG ĐẲNG THỨC SAU (5a-3b)(5a+3b)
\[\begin{array}{l} A = \left( {5a – 3b} \right)\left( {5a + 3b} \right) = 25{a^2} – 9{b^2}\\ \Rightarrow {A^3} = {\left( {25{a^2} – 9{b^2}} \right)^3} = {\left( {25{a^2}} \right)^3} – 3.{\left( {25{a^2}} \right)^2}.9{b^2} + 3.25{a^2}.{\left( {9{b^2}} \right)^2} – {\left( {9{b^2}} \right)^3}\\ = {25^3}{a^6} – {3.25^2}.{a^4}.9{b^2} + 3.25{a^2}{.9^2}{b^4} – {9^3}{b^6}\\ = {5^6}{a^6} – {3.5^4}.{a^4}{b^2}{.3^2} + {3.5^2}{a^2}{.3^4}.{b^4} – {3^9}.{b^6}\\ = {\left( {5a} \right)^6} – {3^3}{.5^4}{a^4}{b^2} + {3^5}{.5^2}{a^2}{b^4} – {3^9}.{b^6}. \end{array}\] Trả lời
\[\begin{array}{l}
A = \left( {5a – 3b} \right)\left( {5a + 3b} \right) = 25{a^2} – 9{b^2}\\
\Rightarrow {A^3} = {\left( {25{a^2} – 9{b^2}} \right)^3} = {\left( {25{a^2}} \right)^3} – 3.{\left( {25{a^2}} \right)^2}.9{b^2} + 3.25{a^2}.{\left( {9{b^2}} \right)^2} – {\left( {9{b^2}} \right)^3}\\
= {25^3}{a^6} – {3.25^2}.{a^4}.9{b^2} + 3.25{a^2}{.9^2}{b^4} – {9^3}{b^6}\\
= {5^6}{a^6} – {3.5^4}.{a^4}{b^2}{.3^2} + {3.5^2}{a^2}{.3^4}.{b^4} – {3^9}.{b^6}\\
= {\left( {5a} \right)^6} – {3^3}{.5^4}{a^4}{b^2} + {3^5}{.5^2}{a^2}{b^4} – {3^9}.{b^6}.
\end{array}\]