Let `A,B` and `C` be square matrices of order `3xx3` with real elements. If `A` is invertible and `(A-B)C=BA^(-1),` thenA. `C(A-B)=BA^(-1)`B. `C(A-B)=A^(-1)B`C. `(A-B)C=A^(-1)B`D. `C(B-A)=A^(-1)B`

Let `A,B` and `C` be square matrices of order `3xx3` with real element

1.	Let `A,B` and `C` be square matrices of order `3xx3` with real elements. If `A` is invertible and `(A-B)C=BA^(-1),` thenA. `C(A-B)=BA^(-1)`B. `C(A-B)=A^(-1)B`C. `(A-B)C=A^(-1)B`D. `C(B-A)=A^(-1)B`
Answer» Correct Answer - B `(A-B)C+BA^(-1)` `impliesAC-BC-BA^(-1)+"AA"^(-1)=I_(3)` `implies(A-B)(C+A^(-1))=I_(3)implies(A-B)^(-1)=C+A^(-1)` `implies(C+A^(-1))(A-B)=I_(3)` `impliesC(A-B)+A^(-1)A-A^(-1)B=I_(3)` `impliesC(A-B)=A^(-1)B`

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Let `A,B` and `C` be square matrices of order `3xx3` with real elements. If `A` is invertible and `(A-B)C=BA^(-1),` thenA. `C(A-B)=BA^(-1)`B. `C(A-B)=A^(-1)B`C. `(A-B)C=A^(-1)B`D. `C(B-A)=A^(-1)B`

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