Question

Q: The determinant of the matrix (257 001)​

Answer 1

Step-by-step explanation:

sry I don't know , I'm so sorry

Answer 2

Answer:

The determinant of the matrix (257 001)​ is Not Applicable (N.A.)

Explanation:

• The determinant in mathematics is a scalar quantity that is a function of the rows and columns of a square matrix.
• It enables characterizing a few aspects of the matrix and the linear map that the matrix represents.
• In particular, the matrix must be invertible and the linear map it represents must be an isomorphism for the determinant to be nonzero.
• A matrix product's determinant is the sum of its constituent determinants (the preceding property is a corollary of this one).
• In this equation, each determinant of a 2x2 matrix is referred to as a minor of matrix A.
• The Laplace expansion, which may be used in this approach, provides a recursive definition for the determinant of an nxn matrix.
• A determinant is only for a square matrix like 2x2, 3x3, etc., not other matrices.

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