Vlerëso (complex solution)
\alpha \beta \left(\alpha +\beta \right)=-12,\ \text{true}
Gjej β
\left\{\begin{matrix}\beta =\frac{\sqrt{\alpha ^{2}-\frac{48}{\alpha }}-\alpha }{2}\text{; }\beta =\frac{-\sqrt{\alpha ^{2}-\frac{48}{\alpha }}-\alpha }{2}\text{, }&\alpha \geq 2\sqrt[3]{6}\\\beta =\frac{\sqrt{\alpha ^{4}-48\alpha }}{2\alpha }-\frac{\alpha }{2}\text{; }\beta =-\frac{\sqrt{\alpha ^{4}-48\alpha }}{2\alpha }-\frac{\alpha }{2}\text{, }&\alpha <0\end{matrix}\right.
Gjej α
\left\{\begin{matrix}\alpha =\frac{\sqrt{\beta ^{2}-\frac{48}{\beta }}-\beta }{2}\text{; }\alpha =\frac{-\sqrt{\beta ^{2}-\frac{48}{\beta }}-\beta }{2}\text{, }&\beta \geq 2\sqrt[3]{6}\\\alpha =\frac{\sqrt{\beta ^{4}-48\beta }}{2\beta }-\frac{\beta }{2}\text{; }\alpha =-\frac{\sqrt{\beta ^{4}-48\beta }}{2\beta }-\frac{\beta }{2}\text{, }&\beta <0\end{matrix}\right.
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