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IMC / 2009 / Problems / Day 1, P2

IMC 2009 · Day 1 · P2

easy

Let AA, BB and CC be real square matrices of the same size, and suppose that AA is invertible. Prove that if (AB)C=BA1(A - B) C = B A^{-1}, then C(AB)=A1BC (A - B) = A^{-1} B.

Solution (official)

A straightforward calculation shows that (AB)C=BA1(A - B) C = B A^{-1} is equivalent to ACBCBA1+AA1=IAC - BC - BA^{-1} + AA^{-1} = I, where II denotes the identity matrix. This is equivalent to (AB)(C+A1)=I(A - B)(C + A^{-1}) = I. Hence, (AB)1=C+A1(A - B)^{-1} = C + A^{-1}, meaning that (C+A1)(AB)=I(C + A^{-1})(A - B) = I also holds. Expansion yields the desired result.

How the field did

contestants scored
334
average (of 10)
6.41
solved (≥ 80%)
61.4%
near-0 (≤ 10%)
29.0%
discrimination
0.45

Score distribution (field cohort)

Computed on contestants with a meaningful total (field cohort); discrimination is the corrected item–total correlation.

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