If X begin bmatrix M N end bmatrix and Y begin bmatrix Q P end-18705
If \( X =\begin{bmatrix} M \ N \ end{bmatrix} \) and \( Y=\begin{bmatrix} Q & P \ end{bmatrix} \) whare \(mathbf{M, N, Q}\) and \(mathbf{P}\) are saqure sub-matrices of same size), then Which of the following is possible?
This multiple choice question (MCQ) is related to the book/course
vu mth501 Linear Algebra.
It can also be found in
vu mth501 Final Term - Quiz No.3.
If \( X =\begin{bmatrix} M \ N \ end{bmatrix} \) and \( Y=\begin{bmatrix} Q & P \ end{bmatrix} \) whare \(mathbf{M, N, Q}\) and \(mathbf{P}\) are saqure sub-matrices of same size), then Which of the following is possible?
The product $$mathbf{XY}$$ and $$mathbf{YX}$$ both are not defined
The product $$mathbf{XY}$$ and $$mathbf{YX}$$ both are defined
The product $$mathbf{XY}$$ is defied but $$mathbf{YX}$$ is not defined
None of the given
