Proving BA=I using Elementary Row Operations and Determinants

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Let A and B be 2x2 matrices s.t. AB=I . Then how can I prove that BA=I?


I assumed that there must exist some sequence of elementary row operations which carries B into I, and I denoted this sequence by the matrix A.

But here, I realized there's some pieces that I' m missing, which I colored red.

How can I explain it ? or is the way of proving this statement even valid?

Somebody help me please!
 
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If, for example, A is regular, then its inverse A^-1 = B and hence AB = BA = I. But, in general AB does not equal BA.
 
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