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Prove that the only vectors whose dot product with all vectors is zero is the zero vector

Prove or disprove the following statement about vectors in \mathbb{R}^n:

If A \cdot B = O for every vector B \in \mathbb{R}^n, then A = O.


Proof. Let A,B \in \mathbb{R}^n. If A \cdot B = O for every B we must, in particular, have A \cdot A = O. But A \cdot A = O if and only if A = O. Hence, we must have A = O. \qquad \blacksquare

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