If A is non-singular matrix satifying AB...

If A is non-singular matrix satifying AB-BA=A, then prove that det(B+I)=det(B-I)

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If A is a nonsingular matrix satisfying AB-BA=A , then prove that det. (B+I)= det, (B-I) .

If A is a nonsingular matrix satisfying AB-BA=A , then prove that det. (B+I)= det, (B-I) .

If A is a nonsingular matrix satisfying AB-BA=A , then prove that det. (B+I)= det, (B-I) .

If A is a nonsingular matrix satisfying AB-BA=A , then prove that det. (B+I)= det, (B-I) .

If A is a nonsingular matrix satisfying AB - BA = A, then prove that det. (B + I) = det. (B - I).

If is a non-singular matrix, then det (A^(1))=

If a and B are non-singular symmetric matrices such that AB=BA , then prove that A^(-1) B^(-1) is symmetric matrix.

If A and B are non-singular symmetric matrices such that AB=BA , then prove that A^(-1) B^(-1) is symmetric matrix.

If A and B are non-singular symmetric matrices such that AB=BA , then prove that A^(-1) B^(-1) is symmetric matrix.

If a and B are non-singular symmetric matrices such that AB=BA , then prove that A^(-1) B^(-1) is symmetric matrix.

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