Let u = (1,−3,3,9) and v = (2,1,0,−2). Find scalars a and b so that au...

Let V be a three-dimensional vector space with ordered basis B = {u, v, w}. Suppose...

Let V be a three-dimensional vector space with ordered basis B = {u, v, w}. Suppose that T is a linear transformation from V to itself and T(u) = u + v, T(v) = u, T(w) = v. 1. Find the matrix of T relative to the ordered basis B. 2. A typical element of V looks like au + bv + cw, where a, b and c are scalars. Find T(au + bv + cw). Now that you know...

1) If u and v are orthogonal unit vectors, under what condition au+bv is orthogonal to...

1) If u and v are orthogonal unit vectors, under what condition au+bv is orthogonal to cu+dv (where a, b, c, d are scalars)? What are the lengths of those vectors (express them using a, b, c, d)? 2) Given two vectors u and v that are not orthogonal, prove that w=‖u‖2v−uuT v is orthogonal to u, where ‖x‖ is the L^2 norm of x.

Let the linear transformation T: V--->W be such that T (u) = u2 If a, b...

Let the linear transformation T: V--->W be such that T (u) = u2 If a, b are Real. Find T (au + bv) , if u = (x, y) v = (z, w) and uv = (xz-yw, xw + yz) Let the linear transformation T: V---> W be such that T (u) = T (x, y) = (xy, 0) where u = (x, y), with 2, -3. Then, if u = ( 1.0) and v = (0.1). Find the value...

Let u=[6,2 ], v=[3,3 ], and b=[4,1 ]. Find (x⋅u+y⋅v-b)×2 u, where x,y are scalars.

Let u=[6,2 ], v=[3,3 ], and b=[4,1 ]. Find (x⋅u+y⋅v-b)×2 u, where x,y are scalars.

Let A be the matrix below and define a transformation T:ℝ3→ℝ3 by T(U) = AU. For...

Let A be the matrix below and define a transformation T:ℝ3→ℝ3 by T(U) = AU. For the vector B below, find a vector U such that T maps U to B, if possible. Otherwise state that there is no such U. A = 2 6 6 −1 −3 −2 −1 −3 −1 B = −22 6 1 < Select an answer >

In R^2, let u = (1,-1) and v = (1,2). a) Show that (u,v) form a...

In R^2, let u = (1,-1) and v = (1,2). a) Show that (u,v) form a basis. Call it B. b) If we call x the coordinates along the canonical basis and y the coordinates along the ordered B basis, find the matrix A such that y = Ax.

1. Let ⃗u = −2[4,0,1]+[−1,3,−2] and ⃗v = 3[4,0,1]+5[−1,3,−2]. Let w⃗ = 3⃗u−⃗v. Express w⃗ as...

1. Let ⃗u = −2[4,0,1]+[−1,3,−2] and ⃗v = 3[4,0,1]+5[−1,3,−2]. Let w⃗ = 3⃗u−⃗v. Express w⃗ as a linear combination of the vectors [4, 0, 1] and [−1, 3, −2]. 2. Let ⃗u and ⃗v be two vectors in Rn. Suppose that ||⃗u|| = 3, ||⃗u − ⃗v|| = 5, and that⃗u.⃗v = 1. What is ||⃗v||?. 3. Let ⃗u and ⃗v be two vectors in Rn. Suppose that ||⃗u|| = 5 and that ||⃗v|| = 2. Show that ||⃗u −...

Let u=<a+1, b, c+1> find and describe all vectors v such that |uxv| =2 u.v a=7...

Let u=<a+1, b, c+1> find and describe all vectors v such that |uxv| =2 u.v a=7 , b=9 , c=9 .

Let u=〈5,-1,6〉, v=〈0,1,2〉, and w=〈1,3,4〉. Find (a)u×(v×w) (b)(u×v)×w (c)(u×v)×(v×w) d)(v×w)×(u×v).

Let u=〈5,-1,6〉, v=〈0,1,2〉, and w=〈1,3,4〉. Find (a)u×(v×w) (b)(u×v)×w (c)(u×v)×(v×w) d)(v×w)×(u×v).

Let u = <-2, 2> and v = <3,3>. Compute: a) projv u   b) Write u...

Let u = <-2, 2> and v = <3,3>. Compute: a) projv u   b) Write u = w1 + w2, where w1 is parallel to v and w2 is orthogonal to v.