Abstract
In this paper, we study some properties of the determinant of a neutrosophic matrix. Also, we prove that |A.adj(A)|=|A|=|adj(A).A| and define the matrices A_((p_1…p_m |q_1…q_m))and A_((p→q)). Further, a method is presented for calculating the determinant of a neutrosophic matrix that has a large number of columns and rows. KEYWORDS adjoint, identity neutrosophic matrix, permutation, principal submatrix, transpose, triangular NM
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