show all work please, thanks
Find the projection of vector v onto line L.
v = <5,-1,2>, L: x=3,
show all work please, thanks Find the projection of vector v onto line L. v =...
- Find the projection of a=(−2,1,4) onto the line x=(3,3,−1)+t(1,2,−2) - Find the projection vector of a onto the line given in part a).
show work please Written Homework 10, Due May 2 Name 3. (11 point) (a) (5 points) Find the projection of the vector (3,4) onto the vector (0,6). Sketch a picture of these vectors and its projection vector. (b) (6 points) Find a vector parallel to the vector (3,4) whose projection onto the vector (06) is equal to (0.2). Page 3 Written Homework 10, Due May 2 Name 3. (11 point) (a) (5 points) Find the projection of the vector (3,4)...
5.4. Find the matrix of the orthogonal projection in R2 onto the line x1 = –2x2. Hint: What is the matrix of the projection onto the coordinate axis x1? Problem 5. Problem 5.4 on page 23. The following method is suggested: (1) Find an angle o such that the line x1 = –2x2 is obtained by rotating the x-axis by 0. (2) Convince yourself with geometry that to project a vector v onto the line x1 = –2x2 is the...
(1 point) Find the matrix A of the orthogonal projection onto the line L in R2 that consists of all scalar multiples of the vector [63].
please show ALL work with steps legibly. will rate! thanks 2. Find a f a. - if f(u, v) = cos(uva). Ouv b. xyz if g(x, y, z)= xe.”
-7 (1 point) Compute the orthogonal projection of v = v-3 onto the line L through 4 and the origin. -4 proj( ) =
(Section 11.3) Find the projection of u onto v and find the vector component of u orthogonal to v for: u=8 i+2j v = (2, 1, -2)
I will upvote! (2)()dz in the vector space Cº|0, 1] to find the orthogonal projection of f(a) – 332 – 1 onto the subspaco V (1 point) Use the inner product < 1.9 > spanned by g(x) - and h(x) - 1 proj) (1 point) Find the orthogonal projection of -1 -5 V = 9 -11 onto the subspace V of R4 spanned by -4 -2 -4 -5 X1 = and X2 == 1 -28 -4 0 -32276/5641 -2789775641 projv...
4 1|and b-l-2 Let A-13 a) Find the orthogonal projection p of b onto C(A) with its error vector. b) Find the least squares approximation, £, to the solution vector x of Ai- c) The least squares error is defined to be the length of the vector b - AX. Find this vector and its length. d) What is the relationship between A, , and p? 4 1|and b-l-2 Let A-13 a) Find the orthogonal projection p of b onto...
show all work and explanations for problem 4. please. thanks #3, 4: (a) determine whether lies in , f is par- allel to o but not in ø, or l and go are concurrent. (b) If l and o are concurrent, find the intersection point and the angle between them. (c) Find the plane that includes f and is orthogonal to g. simply y+4 3, -1 ZI2 3. l: x = : 2x + 3y -z+14 = 0 3 (x...