Chương I : Số hữu tỉ. Số thực

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Đặng Thị Mai Nga

Tính

\(\left(2x+7\right)^2-36=0\)

Vũ Minh Tuấn
15 tháng 10 2019 lúc 20:40

\(\left(2x+7\right)^2-36=0\)

\(\Rightarrow\left(2x+7\right)^2=0+36\)

\(\Rightarrow\left(2x+7\right)^2=36\)

\(\Rightarrow2x+7=\pm6.\)

\(\Rightarrow\left[{}\begin{matrix}2x+7=6\\2x+7=-6\end{matrix}\right.\Rightarrow\left[{}\begin{matrix}2x=-1\\2x=-13\end{matrix}\right.\Rightarrow\left[{}\begin{matrix}x=\left(-1\right):2\\x=\left(-13\right):2\end{matrix}\right.\)

\(\Rightarrow\left[{}\begin{matrix}x=-\frac{1}{2}\\x=-\frac{13}{2}\end{matrix}\right.\)

Vậy \(x\in\left\{-\frac{1}{2};-\frac{13}{2}\right\}.\)

Chúc bạn học tốt!

Ngô Bá Hùng
15 tháng 10 2019 lúc 21:13

\(\left(2x+7\right)^2-36=0\\ \left(2x+7\right)^2=36\\ \Leftrightarrow\left(2x+7\right)^2=\left(\pm6\right)^2\\ \Rightarrow\left\{{}\begin{matrix}2x+7=6\\2x+7=-6\end{matrix}\right.\Leftrightarrow\left\{{}\begin{matrix}x=-\frac{1}{2}\\x=-\frac{13}{2}\end{matrix}\right.\)

Đoàn Tuấn Anh
17 tháng 10 2019 lúc 20:07

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