Determinant van $$$\left[\begin{array}{c}- a^{2} g^{2} h^{2} m^{2} n^{2} r^{2} s^{2} t^{4} e^{2 e i n o r s^{2}} - \lambda\end{array}\right]$$$

Bereken $$$\left|\begin{array}{c}- a^{2} g^{2} h^{2} m^{2} n^{2} r^{2} s^{2} t^{4} e^{2 e i n o r s^{2}} - \lambda\end{array}\right|$$$.

De determinant van een 1x1-matrix is $$$\left|\begin{array}{c}a\end{array}\right| = a$$$.

$$$\left|\begin{array}{c}- a^{2} g^{2} h^{2} m^{2} n^{2} r^{2} s^{2} t^{4} e^{2 e i n o r s^{2}} - \lambda\end{array}\right| = - a^{2} g^{2} h^{2} m^{2} n^{2} r^{2} s^{2} t^{4} e^{2 e i n o r s^{2}} - \lambda$$$

$$$\left|\begin{array}{c}- a^{2} g^{2} h^{2} m^{2} n^{2} r^{2} s^{2} t^{4} e^{2 e i n o r s^{2}} - \lambda\end{array}\right| = - a^{2} g^{2} h^{2} m^{2} n^{2} r^{2} s^{2} t^{4} e^{2 e i n o r s^{2}} - \lambda$$$A