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#1 2014-07-19 15:36:50
- White_Owl
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- Registered: 2010-03-03
- Posts: 106
Linear transformation from R^{3x3} to R
We have a linear transformation from a matrix space, to a real space defined as a product of all elements in the matrix.
How can we define a matrix representing such transformation with respect to the standard basis?
The 'standard basis' here is a set of matrices:
But the result is not a matrix.
So I can write something like that:
But how to define a matrix representing such transformation?
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#2 2014-08-14 11:07:24
- Olinguito
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- Registered: 2014-08-12
- Posts: 649
Re: Linear transformation from R^{3x3} to R
We have a linear transformation from a matrix space, to a real space defined as a product of all elements in the matrix.
No, we don’t. Such a mapping is not a linear transformation. Example: Let A be the matrix with all entries 1; then A+A is the matrix with all entries 2. However
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so the additivity property of a linear transformation is violated. Hence T is not a linear transformation.
Last edited by Olinguito (2014-08-14 12:08:14)
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