Consider the two-dimensional subspace U of R^3 spanned by the set {u1, u2}. The orthogonal complement V = U∘ of U in R^3 is the one-dimensional subspace of R^3 such that every vector v ∈ V is orthogonal to every vector u ∈ U. In other words, u ∙ v = 0 for all u ∈ U and v ∈ V. Find the first two components v1 and v2 of the vector v ∈ V for which v3 = 1.