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Introductory Econometrics: A Modern Approach 6th Edition by Jeffrey M Wooldridge
Edition 6ISBN: 130527010XIntroductory Econometrics: A Modern Approach 6th Edition by Jeffrey M Wooldridge
Edition 6ISBN: 130527010X Exercise 4
(i) Use the properties of trace to argue that tr(A’A) = tr(AA?) for any n x m matrix A.
(ii) For
, verify that tr(A?A) = tr(AA?).
Step-by-step solution
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Step 1 of 2
If there are two matrixes with number of row and columns, let us say 2 rows and 2 columns, then the trace of multiplication of matrix with its transpose would be same irrespective of place of the matrix.
(i) This can be proved with the help of an example:
Trace (tr) of a matrix is nothing but the sum of its diagonal elements. The sum the diagonal elements of AA” and A”A is the same. It is
. Therefore the following holds true:
Step 2 of 2
Introductory Econometrics: A Modern Approach 6th Edition by Jeffrey M Wooldridge
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