the determinant of the diagonal matrix is equal to?
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Step-by-step explanation:
The determinant of a lower triangular matrix (or an upper triangular matrix) is the product of the diagonal entries. In particular, the determinant of a diagonal matrix is the product of the diagonal entries.
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The determinant of the diagonal matrix is equal to the product of the diagonal matrix.
- In a diagonal matrix, the non-principal diagonal elements are zero.
- The sum of two diagonal matrices is a diagonal matrix itself.
- A Diagonal matrix is found as a square matrix, i.e the orders of their matrix will be the same.
- A symmetry is followed by a diagonal matrix.
- The entries of the main diagonal in a diagonal matrix may or may not be zero.
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