Quay lại đáp án

	2	bớt 1 ký tự trong đáp án
nếu coi $\sqrt 2 + 1 = t $ thì $\sqrt 2 -1 =\dfrac{1}{t}$ vì $(\sqrt 2 +1)(\sqrt 2 -1) = 1$Vậy ta có $t^{\frac{6x-6}{x+1}} \le \dfrac{1}{t^{-x}}$$\Leftrightarrow t^{\frac{6x-6}{x+1}-x} \le 1 =t^0$$\Leftrightarrow \frac{6x-6}{x+1}-x \le0$ tự xử nếu coi $\sqrt 2 + 1 = t $ thì $\sqrt 2 -1 =\dfrac{1}{t}$ vì $(\sqrt 2 +1)(\sqrt 2 -1) = 1$Vậy ta có $t^{\frac{6x-6}{x+1}} \le \dfrac{1}{t^{-x}}$$\Leftrightarrow t^{\frac{6x-6}{x+1}-x} \le 1 =t^0$$\Leftrightarrow \frac{6x-6}{x+1}-x <0$ tự xử nếu coi $\sqrt 2 + 1 = t $ thì $\sqrt 2 -1 =\dfrac{1}{t}$ vì $(\sqrt 2 +1)(\sqrt 2 -1) = 1$Vậy ta có $t^{\frac{6x-6}{x+1}} \le \dfrac{1}{t^{-x}}$$\Leftrightarrow t^{\frac{6x-6}{x+1}-x} \le 1 =t^0$$\Leftrightarrow \frac{6x-6}{x+1}-x \le0$ tự xử

	1	tạo mới
nếu coi $\sqrt 2 + 1 = t $ thì $\sqrt 2 -1 =\dfrac{1}{t}$ vì $(\sqrt 2 +1)(\sqrt 2 -1) = 1$Vậy ta có $t^{\frac{6x-6}{x+1}} \le \dfrac{1}{t^{-x}}$$\Leftrightarrow t^{\frac{6x-6}{x+1}-x} \le 1 =t^0$$\Leftrightarrow \frac{6x-6}{x+1}-x <0$ tự xử

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