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Orthogonal Subspaces
Definition
Two subspaces S_1 and S_2 of R^n are said to be orthogonal if the dot product v_1·v_2 = 0 for all vectors v_1 element S_1 and all v_2 element S_2.
Related terms
Two subspaces S_1 and S_2 of R^n are said to be orthogonal if the dot product v_1·v_2 = 0 for all vectors v_1 element S_1 and all v_2 element S_2.