[Solution Library] Show that if u and v are any two vectors in n -space having the same length, then the vectors u+v and u-v are perpendicular. Draw a picture
Question: Show that if \(\mathbf{u}\) and \(\mathrm{v}\) are any two vectors in \(n\) -space having the same length, then the vectors \(\mathbf{u}+\mathrm{v}\) and \(\mathbf{u}-\mathrm{v}\) are perpendicular. Draw a picture of the situation, and give a coordinate-free proof using the dot product.
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