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![](https://rs.olm.vn/images/avt/0.png?1311)
\(A=3\left(2x-3\right)\left(3x+2\right)-\left(2x+4\right)\left(4x-3\right)+9x\left(4-x\right)\)
\(=\left(6x-9\right)\left(3x+2\right)-8x^2+6x-16x+12+36x-9x^2\)
\(=18x^2+12x-27x-18-17x^2+26x+12\)
\(=x^2+11x-6\)
Để A = 0
\(\Leftrightarrow x^2+11x-6=0\)
\(\Leftrightarrow\left(x^2+11x+\frac{121}{4}\right)-\frac{145}{4}=0\)
\(\Leftrightarrow\left(x+\frac{11}{2}\right)^2-\left(\frac{\sqrt{145}}{2}\right)^2=0\)
\(\Leftrightarrow\left(x+\frac{11}{2}-\frac{\sqrt{145}}{2}\right)\left(x+\frac{11}{2}+\frac{\sqrt{145}}{2}\right)=0\)
\(\Leftrightarrow\left[{}\begin{matrix}x=\frac{\sqrt{145}-11}{2}\\x=\frac{-\sqrt{145}-11}{2}\end{matrix}\right.\)
Vậy..................
![](https://rs.olm.vn/images/avt/0.png?1311)
\(\Leftrightarrow B=-\left(x^2-4x-1\right)\)
\(\Leftrightarrow B=-\left(x^2-4x+4-5\right)\)
\(\Leftrightarrow B=-\left(x-2\right)^2+5\)
Ta có \(\left(x-2\right)^2\ge0\)với mọi x
\(\Leftrightarrow-\left(x-2\right)^2\le0\)
\(\Leftrightarrow-\left(x-2\right)^2+5\le0+5\)
hay \(B\) \(\le5\)
Dấu "=" xảy ra khi \(\left(x-2\right)^2=0\)
. \(\Leftrightarrow x-2\)\(=0\)
\(\Leftrightarrow\)\(x\) \(=2\)
Vậy min B=5 tại x=2
![](https://rs.olm.vn/images/avt/0.png?1311)
![](https://rs.olm.vn/images/avt/0.png?1311)
C= \(\frac{9x^2-16}{3x^2-4x}\)
Đk: \(3x^2-4x\ne0\)\(\Leftrightarrow x\left(3x-4\right)\ne0\)
=> \(x\ne0hoặc\left(3x-4\right)\ne0\)
=> \(x\ne0hoặcx\ne\frac{4}{3}\)
Vậy tập xác định R\ { 0;\(\frac{4}{3}\)} ( Tất cả các số thực đều thỏa mãn trừ 0 và 4/3 )
Tick cho mik nha mọi người ^^ Okem
\(2\left(2x-3\right)\left(3x+2\right)-2\left(x-4\right)\left(4x-3\right)+9x\left(4-x\right)-6=0\)
<=> \(2\left(6x^2-5x-6\right)-2\left(4x^2+13x-12\right)+25x-9x^2-6=0\)
<=> \(12x^2-10x-12-4x^2-26x+24+25x-9x^2-6=0\)
<=>\(-x^2-11x+6=0\)
<=>\(\left[\begin{array}{nghiempt}x=\frac{-11+\sqrt{145}}{2}\\x=\frac{-11-\sqrt{145}}{2}\end{array}\right.\)
cảm ơn bạn nhiều nha hiih![haha haha](/media/olmeditor/plugins/smiley/images/haha.png)
![hihi hihi](/media/olmeditor/plugins/smiley/images/hihi.png)
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)