If A and B are square matrices of the same order and A is non-singular, then for a positive integer n,(A−1BA)n is equal to
A
A−nBnAn
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B
AnBnA−n
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C
A−1BnA
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D
n(A−1BA)
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Solution
The correct option is CA−1BnA For n=1,(A−1BA)1=A−1BA For n=2,(A−1BA)2=(A−1BA)(A−1BA) =A−1B(AA−1)BA =A−1B2A For n=3,(A−1BA)3=(A−1BA)2(A−1BA) =(A−1B2A)A−1BA =A−1B2(AA−1)BA =A−1B3A ∴(A−1BA)n=A−1BnA