" (A) If "A_(ij)" is the cofactor of the element "a_(ij)" of "|[2,-3,5],[6,0,4],[1,5,-7]|" then write the value of "

If A_(ij) is the co-factor of the element a_(ij) of the determinant |[2,-3,5],[6,0,4],[1,5,-7]| , then write the value of a_(32)*A_(32)

If A_(ij) is the cofactor of the element a_(ij) of the determinant det[[2,-3,56,0,41,5,-7]], then write the value of a_(32).,A_(32).]|

If A_(ij) is the cofactor of the element a_(ij) of the determinant |(2,-3,5),(6,0,4),(1,5,-7)| , then write the value of a_(32)., A_(32) .

If A_(ij) is the co-factor of the element a_(ij) of the determinant {:|(2,-3,5),(6,0,4),(1,5,-7)| , then write the value of a_(32),A_(32)

If C_(ij) is the cofactor of the element a_(ij) of the determinant |{:(2,-3,5),(6,0,4),(1,5,-7):}| , then write the value of a_(32).c_(32)

If A_("ij") is the cofactor of the element a_("I j") of the determinant |(2,-3,5),(6,0,4),(1,5,-7)| , then write the value of a_(32). A_(32) .

If C_(ij) denotes the cofactor of the elements a_(ij) of the determinant A=|{:(2,-3,5),(6,0,4),(1,5,-7):}| then the value of a_(12)C_(12)+a_(32)C_(32) is :

Find minors and cofactors of the elements of the determinant |[2, -3, 5],[ 6, 0, 4],[ 1 , 5, -7]| and verify that a_(11) A_(31)+a_(12) A_(32)+a_(13) A_(33)=0

If A=[a_(ij)] is a square matrix of order 3 and A_(ij) denote cofactor of the element a_(ij) in |A| then the value of |A| is given by