Finding Characteristic Polynomial of Matrix B

Boom101
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Homework Statement


B =
|a 1 -5 |
|-2 b -8 |
|2 3 c |

Find the characteristic polynomial of the following matrix.


Homework Equations


None


The Attempt at a Solution


So basically I have to find the det(B-λI). No matter what I do to the matrix I can't make the result simple. I can't find a simple answer using any cofactor expansion of the matrix. I get to (a-λ)[(b-λ)(c-λ)+24)] - [(-2c+2λ)+16] -5[-6-(2b-2λ)] which comes out to about 20 different characters. I tried rearranging the matrix to add a 0 to help with cofactor expansion but that doesn't help cause I'm left with like b+3-λ which doesn't help. Is there just no simple answer or am I doing something wrong?
 
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Your characteristic polynomial seems correct to me. You only need to simplify it further...
 
Ok thanks. I just have another question. Let M be an nxn matrix this is invertible and let A be an nxn matrix. show that the eigenvalues of (inverse of M) are the roots of the polynomial p(λ) = det(A-λM). I just have no idea where to go on this one.
 
Boom101 said:
Ok thanks. I just have another question. Let M be an nxn matrix this is invertible and let A be an nxn matrix. show that the eigenvalues of (inverse of M) are the roots of the polynomial p(λ) = det(A-λM). I just have no idea where to go on this one.
What's the exact problem statement? I haven't done any work on this, but there don't seem to be enough conditions on A and M for this to be true.

However, for this to be true, if λ1 is an eigenvalue of M-1, then for some nonzero vector x, M-1x = λ1x.
 
That was the exact problem statement. It was b) from which a) was the question above. Regarding my first question, I'm left with about 20 different combinations of variables which I can't simplify. If I can't simplify, should I just leave it the way it is?
 
The problem is just asking for the characteristic polynomial. You could multiply things out and give it in terms of λ3, λ2, λ, and a constant.

For the second question you asked, it seems to me that you're supposed to conclude that matrix A is actually the identity matrix I.
 
Thanks again mark.
 
Thanks again mark.
 

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