$cos^23x.cos2x - cos^2x =0$
$\dfrac{1 + \cos{6x}}{2}.\cos{2x} - \dfrac{1 + \cos{2x}}{2} = 0$

 $\Leftrightarrow \cos{2x} + \cos{6x}\cos{2x} - 1 - \cos{2x} = 0$

 $\Leftrightarrow \cos{6x}\cos{2x} - 1 = 0 \Leftrightarrow \dfrac{1}{2}(\cos{8x} + \cos{4x}) - 1 = 0$

 $\Leftrightarrow 2\cos^2{4x} + \cos{4x} - 3 = 0$ $ \Leftrightarrow \left[\begin{matrix} \cos{4x} = 1\\\cos{4x} = \dfrac{-3}{2} \, (VN)\end{matrix}\right.$ $\Rightarrow x = \dfrac{k\pi}{2} \,\, (k \in Z)$
pt $<=>\frac{1+cos6x}{2}.cos2x-\frac{1+cos2x}{2} = 0$

$<=> (1 +cos6x)cos2x - (1+cos2x) = 0$

$<=>(1+4cos^{3}2x-3cos2x)cos2x-(1+cos2x)=0$

$<=>4cos^{4}2x-3cos^{2}2x-1=0$

$=> cos2x =1$ hoặc $cos2x=\frac{-1}{4}$(loại)

$cos^{2}2x = 1< => \frac{1+cos4x}{2} = 1<=>cos4x=1$

tự giải nốt nhá
Hạ bậc bạn nhé:
$cos^23x=(1+cos6x)/2;cos^2x=(1+cos2x)/2$
cos2x ( 1 cos6x 1) - 1 = 0 –  bichdiep48 24-11-13 01:24 PM
nếu đặt cos2x ra ngoài thì phải là cos2x(1 cos6x 1) - 1 = 0 –  bichdiep48 24-11-13 01:22 PM

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