Solución:Respuesta: hipérbola
$\cot 2\theta =\frac{A-C}{B}=\frac{1+2}{-4}=\frac{3}{4}$ entonces $0^{\circ }<\theta <45^{\circ }$
$2\theta =\text{arccot}\frac{3}{4}=0{,}927\,\cdot \frac{180}{\pi }=53{,}11\Longrightarrow \theta =\frac{53{,}11}{2}\approx 27^{\circ }$
$\cos 27^{\circ }=0{,}891\,\qquad \sen 27^{\circ }=0{,}454$ entonces
$x=x' \cos \theta -y' \sen \theta =0{,}891\,x'-0{,}454y' $
$y=x' \sen \theta +y' \cos \theta =0{,}454x' + 0{,}891\,\,y' $
$x^{2}+4xy-2y^{2}-6=0\Longrightarrow $
$\left( 0{,}891\,x' -0{,}454y' \right) ^{2}+4\left( 0{,}891\,x'
-0{,}454y' \right) \left( 0{,}454x' +0.891\,\,y'
\right) -2\left( 0{,}454x' +0{,}891\,\,y' \right) ^{2}-6=0$
$\left( 0{,}891x' \right)^{2}-2\left( \left( 0{,}891\right) \left(
0{,}454\right)x' y' \right) +\left( 0{,}454y' \right)^{2}+4\left( \left( 0{,}891\right) \left( 0{,}454\right)x'^{2}+\left(0{,}891\right) ^{2}x' y' -\left( 0{,}454\right) ^{2}x' y' -\left( 0{,}891\right) \left( 0{,}454\right)y'^{2}\right) -2(\left( 0{,}454x' \right)^{2}+2\left( \left( 0{,}454\right) \left(0{,}891\right) x'y' \right) +\left( 0{,}891\right) y'^{2})-6=0$
Después de simplificar, tenemos
$2x'^{2}-3y'^{2}=6\Longrightarrow \frac{x'^{2}}{3}-\frac{y'^{2}}{2}=1$
La sección cónica es una hipérbola.
