356 Ordinary Differential EquationsEXAMPLE 4 A 2 x 2 Matrix with Complex Eigenvalues
and Eigenvectors
Find the eigenvalues and associated eigenvectors of the matrix-2) 3.
SOLUTION
The characteristic equation of the matrix A isSolving the quadratic equation >-^2 - 4>-+ 5 = 0 , we find the eigenvalues of the
matrix A are >- 1 = 2 + i and >- 2 = 2 - i.
An eigenvector
X1-_ (X11)
X21of the matrix A corresponding to the eigenvalue >- 1 = 2 + i must satisfy
-2 ) (X11)
3 - (2 + i) X211 --2 i ) (X11X21 ) - (0) 0.
Multiplying, we see that x 11 and x 21 must simultaneously satisfy the system
of equations
( -1 - i)x11 -2x21 = 0
(5)
X11 + (1 - i)X21 = 0.
Since det (A->- 1 1) = 0, these two equations must be multiples of one another.
(To check this fact, multiply the second equation by ( -1 - i) and obtain the