Question
Find the matrix so that
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Text solutionVerified
It is given that:
The matrix given on the R.H.S. of the equation is a matrix and the one given on the L.H.S. of the equation is a matrix.
Therefore, we have:
The matrix given on the R.H.S. of the equation is a matrix and the one given on the L.H.S. of the equation is a matrix.
Therefore, has to be a matrix.
Now, let
Now, let
Therefore, we have:
Equating the corresponding elements of the two matrices, we have:
Now,
Now,
Thus,
Hence, the required matrix is
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Question Text | Find the matrix so that |
Answer Type | Text solution:1 |
Upvotes | 150 |