the u = (-1, 0, 2) as a linear combination of v₁, V₂, and v₂. (f). Let R¹ have the Euclidean inner product. Use the Gram-Schmidt process to transform the basis {u₁,U₂, U3, U4} into an orthonormal basis {9₁,92,93,94 }, where = = (0, 1, −1,0). 19 u₁ = (1,0,0,0), u₂ = (1,1,0,1), u3 = (0,1,1,1) and µ
