(3 points) Let 4 2 -4 -13 0.5 2 4 0 4.5 Use the Gram-Schmidt process to determine an orthonormal basis for the subspace of R4 spanned by x, y, and Z.
(3 points) Let 4 2 -4 -13 0.5 2 4 0 4.5 Use the Gram-Schmidt process to determine an orthonormal basis for the subspace of R4 spanned by x, y, and Z.
(1 point) Let 12 6 Use the Gram-Schmidt process to determine an orthonormal basis for the subspace of R4 spanned by ř and ý.
4 | , y-| 4 | and W be the subspace of R3 spanned by x and y 5. Let x 5c. Apply the Gram -Schmidt orthogonalization process to construct an orthonormal basis of W.
question 3 (b)
Problem #3: Let R4 have the inner product <u, v>-#1v1 + 2112v2 + 31/3V3 + 414V4 (a) Let w (0, 6, 3,-1). Find |w (b) Let Wbe the subspace spanned by the vectors u (0, 0, 2,1), and u2-,0,,-1) Use the Gram-Schmidt components of the vector v2 into the answer box below, separated with commas process to transform the basis fui. u2 into an orthonormal basis fvi, v23. Enter the Enter your answer symbolically as in these...
#8. Let W be the subspace of R3 spanned by the two linearly independent vectors v1 = (-1,2,2) and v2 = (3, -3,0). (a) Use the Gram-Schmidt orthogonalization process to find an orthonormal basis for W. (b) Use part (a) to find the matrix M of the orthogonal projection P: R W . (c) Given that im(P) = W, what is rank(M)?
1-
2-
(10 points) Find the closest point to y in the subspace W spanned by vì and v2. -4 -2 у 0 -1 0 -1 2 3 1 1 1 1 (10 points) The given set is a basis for a subspace W. Use 0 0 0 the Gram-Schmidt process to produce an orthogonal basis for W.
Problem #3: Let R4 have the inner product <u, v> = ulv1 + 2u2v2 + 3u3v3 + 40404 (a) Let w = (0,9,5,-2). Find llwll. (b) Let W be the subspace spanned by the vectors U1 = = (0,0, 2, 1), and u2 = (-3,0,–2, 1). Use the Gram-Schmidt process to transform the basis {uj, u2} into an orthonormal basis {V1, V2}. Enter the components of the vector v2 into the answer box below, separated with commas.
Use the Gram-Schmidt process to find an orthonormal basis for the subspace spanned by uz = (1,1,1,1)", u2 = (-1,4,4, -1)", and uz = (4, -2,2,0)".
(1 point) Let u = 1. VE L . and let W the subspace of R4 spanned by {u, v}. Find a basis for WI. Answer:
Use the Gram-Schmidt process to find an or- thonormal basis for the subspace of R4 spanned by Xi = (4, 2, 2, 1)", X2 (2,0, 0, 2)", X3 = (1,1, -1, 1). Let A = (x1 X2 X3) and b = (1, 2, 3,1)7. Factor A into a product QR, where Q has an orthonormal set of column vectors and R is up- per triangular. Solve the least squares problem Ax = b.