[latex]log_2^3x-7log_2^2x+14log_2x-8>0[/latex]
Dziedzina
[latex]x>0[/latex]
Podstawiamy
[latex]log_2x=t[/latex]
[latex]t^3-7t^2+14t-8>0[/latex]
[latex](t^3-8)-(7t^2-14t)>0[/latex]
[latex](t - 2)(t^2 + 2t + 4)-7t(t-2)>0[/latex]
[latex](t - 2)(t^2 + 2t + 4-7t)>0[/latex]
[latex](t - 2)(t^2 -5t + 4)>0[/latex]
---------------------
[latex]Delta=(-5)^2-4 cdot 1 cdot 4=25-16=9[/latex]
[latex]sqrt{Delta}= sqrt{9}=3[/latex]
[latex]t_1= frac{5-3}{2}= frac{2}{2}=1[/latex]
[latex]t_2= frac{5+3}{2}= frac{8}{2}=4[/latex]
---------------------
[latex](t-2)(t-1)(t-4)>0[/latex]
[latex]t in left(1,2
ight) cup left( 4;+ infty
ight)[/latex]
Wężyk w załączniku
[latex]log_2x in left(1,2
ight) cup left( 4;+ infty
ight)[/latex]
1.
[latex]�egin{cases} log_2x>1\ log_2x<2end{cases}[/latex]
[latex]�egin{cases} log_2x>log_22\ log_2x<2log_22end{cases}[/latex]
[latex]�egin{cases} x>2\ log_2x2\ log_2x2\ x<4end{cases}[/latex]
[latex]x in left( 2;4
ight)[/latex]
2.
[latex]log_2x>4[/latex]
[latex]log_2x>4log_22[/latex]
[latex]log_2x>log_22^4[/latex]
[latex]log_2x>log_216[/latex]
[latex]x>16[/latex]
[latex]x in left( 16;+ infty
ight)[/latex]
Z 1 i 2
[latex]x in left( 2;4
ight) cup left( 16;+ infty
ight)[/latex]
