Determinant of the matrix exponential

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Homework Statement



Show that det(eA)=etr(A) for A[itex]\in[/itex]Cnxn

Homework Equations





The Attempt at a Solution


I am sooo bad at proofs.
And I am still trying to wrap my brain around the concept of matrix exponentials.
Can someone please get me started ...
 
on Phys.org
Ok
So let A=PDP-1 where D is the Jordan Canonical form of A
then eA=PeDP-1

Now where to from here??
:cry:
 
If A is in Jordan Normal Form, what does [itex]e^A[/itex] look like? What is [itex]det(e^A)[/itex]?

You should be able to see that, since the Jordan Normal Form of any matrix is an "upper triangular matrix", all powers of the Jordan Normal Form is also an upper triangular matrix and so is the exponential. Think about how you would find the determinant of any upper triangular matrix.