Characteristic polynomial/2 5 -3 4/Eigenvalues/Eigenspaces/Example

For the matrix

${\displaystyle {}M={\begin{pmatrix}2&5\\-3&4\end{pmatrix}}\,,}$

the characteristic polynomial is

${\displaystyle {}\chi _{M}=\det {\begin{pmatrix}X-2&-5\\3&X-4\end{pmatrix}}=(X-2)(X-4)+15=X^{2}-6X+23\,.}$

Finding the zeroes of this polynomial leads to the condition

${\displaystyle {}(X-3)^{2}=-23+9=-14\,,}$

which has no solution over ${\displaystyle {}\mathbb {R} }$, so that the matrix has no eigenvalues over ${\displaystyle {}\mathbb {R} }$. However, considered over the complex numbers ${\displaystyle {}\mathbb {C} }$, we have the two eigenvalues ${\displaystyle {}3+{\sqrt {14}}{\mathrm {i} }}$ and ${\displaystyle {}3-{\sqrt {14}}{\mathrm {i} }}$. For the eigenspace for ${\displaystyle {}3+{\sqrt {14}}{\mathrm {i} }}$, we have to determine

${\displaystyle {}{\begin{aligned}\operatorname {Eig} _{3+{\sqrt {14}}{\mathrm {i} }}{\left(M\right)}&=\operatorname {ker} {\left({\left({\left(3+{\sqrt {14}}{\mathrm {i} }\right)}E_{2}-M\right)}\right)}\\&=\operatorname {ker} {\left({\begin{pmatrix}1+{\sqrt {14}}{\mathrm {i} }&-5\\3&-1+{\sqrt {14}}{\mathrm {i} }\end{pmatrix}}\right)},\end{aligned}}}$

a basis vector (hence an eigenvector) of this is ${\displaystyle {}{\begin{pmatrix}5\\1+{\sqrt {14}}{\mathrm {i} }\end{pmatrix}}}$. Analogously, we get

${\displaystyle {}\operatorname {Eig} _{3-{\sqrt {14}}{\mathrm {i} }}{\left(M\right)}=\operatorname {ker} {\left({\begin{pmatrix}1-{\sqrt {14}}{\mathrm {i} }&-5\\3&-1-{\sqrt {14}}{\mathrm {i} }\end{pmatrix}}\right)}=\langle {\begin{pmatrix}5\\1-{\sqrt {14}}{\mathrm {i} }\end{pmatrix}}\rangle \,.}$