The projection of the vector (1,1,-1) onto the subspace span{(1,-1,1), (1,1,0)} is given by: a)(1,-1,0) b)(1,1,0)...

(1 point) What is the matrix P=(Pij) for the projection of a vector b∈R3 onto the...

(1 point) What is the matrix P=(Pij) for the projection of a vector b∈R3 onto the subspace spanned by the vector a=

Find the orthogonal projection of u onto the subspace of R4 spanned by the vectors v1,...

Find the orthogonal projection of u onto the subspace of R4 spanned by the vectors v1, v2 and v3. u = (3, 4, 2, 4) ; v1 = (3, 2, 3, 0), v2 = (-8, 3, 6, 3), v3 = (6, 3, -8, 3) Let (x, y, z, w) denote the orthogonal projection of u onto the given subspace. Then, the components of the target orthogonal projection are

Find the orthogonal projection of v=[−2,10,−16,−19] onto the subspace W spanned by [-4,0,-2,1],[-4,-2,5,1],[3,-1,-3,4]

Find the orthogonal projection of v=[−2,10,−16,−19] onto the subspace W spanned by [-4,0,-2,1],[-4,-2,5,1],[3,-1,-3,4]

Let v1=(0,1,2,3),v2=(1,0,-1,0),v3=(0,4,-1,2), and v4=(0,5,1,5). Let S=(v1,v2,v3,v4) (1)find a basis for span(S) (2)is the vector e1=(1,0,0,0) in...

Let v1=(0,1,2,3),v2=(1,0,-1,0),v3=(0,4,-1,2), and v4=(0,5,1,5). Let S=(v1,v2,v3,v4) (1)find a basis for span(S) (2)is the vector e1=(1,0,0,0) in the span of S? Why?

1. Find the orthogonal projection of the matrix [[3,2][4,5]] onto the space of diagonal 2x2 matrices...

1. Find the orthogonal projection of the matrix [[3,2][4,5]] onto the space of diagonal 2x2 matrices of the form lambda?I.   [[4.5,0][0,4.5]]  [[5.5,0][0,5.5]]  [[4,0][0,4]]  [[3.5,0][0,3.5]]  [[5,0][0,5]]  [[1.5,0][0,1.5]] 2. Find the orthogonal projection of the matrix [[2,1][2,6]] onto the space of symmetric 2x2 matrices of trace 0.   [[-1,3][3,1]]  [[1.5,1][1,-1.5]]  [[0,4][4,0]]  [[3,3.5][3.5,-3]]  [[0,1.5][1.5,0]]  [[-2,1.5][1.5,2]]  [[0.5,4.5][4.5,-0.5]]  [[-1,6][6,1]]  [[0,3.5][3.5,0]]  [[-1.5,3.5][3.5,1.5]] 3. Find the orthogonal projection of the matrix [[1,5][1,2]] onto the space of anti-symmetric 2x2 matrices.   [[0,-1] [1,0]]  [[0,2] [-2,0]]  [[0,-1.5] [1.5,0]]  [[0,2.5] [-2.5,0]]  [[0,0] [0,0]]  [[0,-0.5] [0.5,0]]  [[0,1] [-1,0]] [[0,1.5] [-1.5,0]]  [[0,-2.5] [2.5,0]]  [[0,0.5] [-0.5,0]] 4. Let p be the orthogonal projection of u=[40,-9,91]T onto the...

A vector space V and a subset S are given. Determine if S is a subspace...

A vector space V and a subset S are given. Determine if S is a subspace of V by determining which conditions of the definition of a subspace are satisfied. (Select all that apply.) V = C[−4, 4] and S = P. S contains the zero vector. S is closed under vector addition. S is closed under scalar multiplication. None of these

4. Prove the Following: a. Prove that if V is a vector space with subspace W...

4. Prove the Following: a. Prove that if V is a vector space with subspace W ⊂ V, and if U ⊂ W is a subspace of the vector space W, then U is also a subspace of V b. Given span of a finite collection of vectors {v1, . . . , vn} ⊂ V as follows: Span(v1, . . . , vn) := {a1v1 + · · · + anvn : ai are scalars in the scalar field}...

Given vector ? = 2? + 3?, ? = −5? + ? + ?. Find the...

Given vector ? = 2? + 3?, ? = −5? + ? + ?. Find the followings. a) The projection of u onto v b) A vector that is orthogonal to both u and v

Consider W = Span{p1(t),p2(t)} where p1(t) = 1−t^2 and p2(t) = 3+2t are the polynomials defined...

Consider W = Span{p1(t),p2(t)} where p1(t) = 1−t^2 and p2(t) = 3+2t are the polynomials defined on the interval [−1,1]. Find the orthogonal projection of q(t) = t^2−t−1 onto W.

1) Let a = 〈4,−5,−2〉 and b = 〈2,−4,−5〉 Find the projection of b onto a....

1) Let a = 〈4,−5,−2〉 and b = 〈2,−4,−5〉 Find the projection of b onto a. proj a b= 2) Find the area of a triangle PQR, where P=(−2,−4,0), Q=(1,2,−1), and R=(−3,−6,5) 3) Complete the parametric equations of the line through the points (7,6,-1) and (-4,4,8) x(t)=7−11 y(t)= z(t)=