Help Prove Real Eigenvalues of Symmetric Matrix

tom08
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Help! Symmetric matrix

I know that all the eigenvalues of a real symmetric matrix are real numbers.
Now can anyone help out how to prove that "all the eigenvalues of a row-normalized real symmetric matrix are real numbers"? Thank you~~~
 
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?? A "row normalized" symmetric matrix is still a symmetric matrix. Just use the same proof as for any symmetric matrix.
 


Also note this thread.
 


hi everyone please tell me an algorithm for finding if a matrix is symmetric or not
 


What's wrong with the obvious one:

Answer= "symmetric"
For i= 1 to n-1
{
For j= i+1 to n
if a_{ij}\ne a_{ji}
{
Answer= "not symmetric"
exit loops
}
}
report Answer.
 

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