We diagnalize the matrix:
We find the eigenvalues
λ-6=0; λ-8=0
λ=6; λ=8
by writing it as
where D is the diagonal matrix with the two eigenvalues on the
main diagonal:
and the matrix P is
where the V's are the two column eigenvectors for the two eigenvalues
We find V1 which is the eigengvector for the eigenvalue λ=6.
We find solutions for
Divide thru by -2
We can take x1=1 and x1=1
So
Now we do the same for the other eigenvalue
---
We find solutions for
Divide thru by -4
We can take x1=1 and x2=1
So
So
And since the determinant of P is 1, to find P-1 we only
need to swap the elements on the the main diagonal and change the
signs of the other two elements"
Then
So
to n factors
Any power of a diagonal matrix is the matrix whose elements are that
power of the elements, so we have the final answer as:
Edwin
