Let have the Euclidean inner product. (a) Find a vector in that is orthogonal to and and
Chapter 6, Problem 1(choose chapter or problem)
Let have the Euclidean inner product. (a) Find a vector in that is orthogonal to and and makes equal angles with and . (b) Find a vector of length 1 that is orthogonal to and above and such that the cosine of the angle between x and is twice the cosine of the angle between x and .
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