Line 16: Line 16:
  
 
from [[User:Jayling|James Ayling]]:  Any suggestions on how to go about answering Page 345 Questions 24 and 25?
 
from [[User:Jayling|James Ayling]]:  Any suggestions on how to go about answering Page 345 Questions 24 and 25?
 +
 +
 +
Answer from [[User:Park296|Eun Young]] :
 +
 +
Q. 24. By thm 4, <math>A= X D X^{-1}</math> where <math>X^{-1} = X^T</math>.
 +
 +
If we set <math> X^T x = y </math>, then we have <math> Q = y^T D y </math>.  We just transformed Q  to the canonical form. See P.343.
 +
 +
So, <math> Q = x^T A x = y^T D y  = \lambda_1 y_1^2 + \cdots + \lambda_n y_n^2 </math> where <math>X^T x = y</math>.
 +
 +
Hence, the values of Q are controlled by the sings of the eigenvalues.
 +
 +
We know that there is a one-to-one correspondence between all nonzero x and all nonzero y since X is invertible.
 +
 +
Hence, if Q > 0 for all nonzero x, Q > 0 for all nonzero y.
 +
 +
Consider y = ( 1 0 0 ... ). Then, the first eigenvalue should be positive.
 +
 +
Consider y = ( 0 1 0 ...). Then, the second eigenvalue should be positive.
 +
 +
In this manner,  all eigenvalues are positive.
 +
 +
You can show the others similarly.

Revision as of 05:36, 12 September 2013

Question from Ryan Russon

Ok, what in the world are we supposed to do with p. 345 #1? From what I gather, The problem asks us to find the eigenvectors of this matrix P, A (the given matrix), and then some new 'A' where A = P-1AP and show that x = Py, where y is an eigenvector of P and x is an eigenvector of both A and this new A. The eigenvalues of P are really crummy... are we allowed to use a calculator or MATLAB or something to help us with this one? Maybe I am just over-complicating this problem... HELP!


I could be mistaken, but I think question #1 should read "if y is an eigenvector of 'A' , show that x = Py are eigenvectors of A". Theorem 3 on p. 340 says that "if x is an eigenvector of A, then y = P-1x is an eigenvector of 'A' corresponding to the same eigenvalue". If that is the case, x = Py, and the only calculation you need to do on P is to find P-1 for  'A' = P-1AP. --Andrew Sauseda 23:22, 9 September 2013 (UTC)


from James Ayling: I agree with you Andrew

from Ryan Russon:

That makes A LOT more sense. Thanks guys!

from James Ayling: Any suggestions on how to go about answering Page 345 Questions 24 and 25?


Answer from Eun Young :

Q. 24. By thm 4, $ A= X D X^{-1} $ where $ X^{-1} = X^T $.

If we set $ X^T x = y $, then we have $ Q = y^T D y $. We just transformed Q to the canonical form. See P.343.

So, $ Q = x^T A x = y^T D y = \lambda_1 y_1^2 + \cdots + \lambda_n y_n^2 $ where $ X^T x = y $.

Hence, the values of Q are controlled by the sings of the eigenvalues.

We know that there is a one-to-one correspondence between all nonzero x and all nonzero y since X is invertible.

Hence, if Q > 0 for all nonzero x, Q > 0 for all nonzero y.

Consider y = ( 1 0 0 ... ). Then, the first eigenvalue should be positive.

Consider y = ( 0 1 0 ...). Then, the second eigenvalue should be positive.

In this manner, all eigenvalues are positive.

You can show the others similarly.

Alumni Liaison

Ph.D. 2007, working on developing cool imaging technologies for digital cameras, camera phones, and video surveillance cameras.

Buyue Zhang