mn cho mik xin ảnh vẽ người chibi ạ mik sẽ tick cho☺
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![](https://rs.olm.vn/images/avt/0.png?1311)
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\(\dfrac{1}{x^2-4}+\dfrac{2x}{x+2}=\dfrac{1}{\left(x-2\right)\left(x+2\right)}+\dfrac{2x}{x+2}=\dfrac{1+2x\left(x-2\right)}{\left(x-2\right)\left(x+2\right)}=\dfrac{1+2x^2-4x}{\left(x+2\right)\left(x-2\right)}\)
trên bài mink đã ẩn đi bước quy đồng!!
\(\dfrac{18}{\left(x-3\right)\left(x^2-9\right)}-\dfrac{3}{x^2-6x+9}-\dfrac{x}{x^2-9}=\dfrac{18}{\left(x-3\right)\left(x+3\right)\left(x-3\right)}-\dfrac{3}{\left(x-3\right)^2}-\dfrac{x}{\left(x-3\right)\left(x+3\right)}\)
\(=\dfrac{18}{\left(x-3\right)^2\left(x+3\right)}-\dfrac{3}{\left(x-3\right)^2}-\dfrac{x}{\left(x-3\right)\left(x+3\right)}=\dfrac{18-3\left(x+3\right)-x\left(x-3\right)}{\left(x-3\right)^2\left(x+3\right)}\)
\(=\dfrac{18-3x-9-x^2+3x}{\left(x-3\right)^2\left(x+3\right)}=\dfrac{9-x^2}{\left(x-3\right)^2\left(x+3\right)}=\dfrac{-\left(x-3\right)\left(x+3\right)}{\left(x-3\right)^2\left(x+3\right)}=\dfrac{-1}{x-3}\)
BN THAM KHẢO:![Vẽ tranh chibi dễ thương tặng mọi người | Vẽ chibi đơn giản by Channel NT - YouTube](data:image/jpeg;base64,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)