Mathematics, 02.11.2020 16:50 austinwag123

Let W, X, Y and Z be full column rank real matrices. What are the conditions (if any) on W, X, Y and Z, such that there exists a real matrix A such that A X = Z and YT A = W T ? Find all such A when the conditions are satisﬁed. How many linearly independent equations were there? What was the dimensionality of the left and right nullspaces? Did the rank-nullity theorem hold? The previous exercise can provide a simple way to approach this problem.

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Let W, X, Y and Z be full column rank real matrices. What are the conditions (if any) on W, X, Y and...

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