let v1=[1,0,10], v2=[0,1,0,1] and let W be the subspace of R^4 spanned by v1 and v2....

Let W be a subspace of R^4 spanned by v1 = [1,1,2,0] and v2 = 2,-1,0,4]....

Let W be a subspace of R^4 spanned by v1 = [1,1,2,0] and v2 = 2,-1,0,4]. Find a basis for W^T = {v is in R^2 : w*v = 0 for w inside of W}

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

Let W be the subspace of R4 spanned by the vectors a = 3e1 − 4e2...

Let W be the subspace of R4 spanned by the vectors a = 3e1 − 4e2 and b = e2 + e3 + e4. Find the orthogonal projection of the vector v = [2, 0, 1, 0] onto W. Then calculate the distance of the point v from the subspace W.

Suppose that {v1, v2, u} and {v1, v2, w}, are both bases for some subspace V...

Suppose that {v1, v2, u} and {v1, v2, w}, are both bases for some subspace V ⊆ R n . (a) Demonstrate with an example that it is possible for {u, w} to be linearly independent. (b) Assuming now that {u, w} is linearly independent, decide whether {v1, u, w} is necessarily a basis for V , giving justification for your answer. For both parts it isn’t sufficient just to give answers, you must give convincing arguments, making appropriate use...

Do the vectors v1 =   1 2 3   , v2 = ...

Do the vectors v1 =   1 2 3   , v2 =   √ 3 √ 3 √ 3   , v3   √ 3 √ 5 √ 7   , v4 =   1 0 0   form a basis for R 3 ? Why or why not? (b) Let V ⊂ R 4 be the subspace spanned by the vectors a1 and a2, where a1 =   ...

(a) Do the vectors v1 = 1 2 3 , v2 = √ 3 √ 3...

(a) Do the vectors v1 = 1 2 3 , v2 = √ 3 √ 3 √ 3 , v3=√ 3 √ 5 √ 7, v4 = 1 0 0 form a basis for R 3 ? Why or why not? (b) Let V ⊂ R 4 be the subspace spanned by the vectors a1 and a2, where a1 = (1 0 −1 0) , a2 = 0 1 0 −1. Find a basis for the orthogonal complement V ⊥...

Let W be the subspace of R4 spanned by the vectors u1  =  (−1, 0, 1,...

Let W be the subspace of R4 spanned by the vectors u1  =  (−1, 0, 1, 0), u2  =  (0, 1, 1, 0), and u3  =  (0, 0, 1, 1). Use the Gram-Schmidt process to transform the basis {u1, u2, u3} into an orthonormal basis.

Find the orthogonal projection of v⃗ =⎢4,−11,−36,9⎤ onto the subspace W spanned by ⎢0,0,−5,−2| , |−4,2,5,−5⎢...

Find the orthogonal projection of v⃗ =⎢4,−11,−36,9⎤ onto the subspace W spanned by ⎢0,0,−5,−2| , |−4,2,5,−5⎢ , ⎢−5,−5,0,5|

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]

consider the basis S={v1,v2} for R^2,where v1=(-2,1) and v2=(1,3),and let T:R^2-R^3 be linear transformation such that...

consider the basis S={v1,v2} for R^2,where v1=(-2,1) and v2=(1,3),and let T:R^2-R^3 be linear transformation such that T(v1)=(-1,2,0) And T(v2)=(0,-3,5), find T(2,-3)