I don't know how to plot them!
Pl 1. Consider 3-space with the dot product. Algebraically find the projection of ū onto ü....
Consider 3-space with the dot product. Your subspace S will be the plane z = 0 with orthogonal basis is {}} (a) Confirm that the given basis for z = 0 is orthogonal. (b) Algebraically find the projection of ū = -101 onto z = 0. (c) Plot ū , both basis elements of S, the projection of ū onto each basis element, and projs ū (That is 5 vectors total). z х
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2. Use the polynomial inner product to find the projection of f(*) onto g(x). (a) f(x) = -12 -1, 9(20) = ? (b) f(x) = 2x2, g(x) = 2+1 (C) f(c) = -1-1, g(x) = r2 +3 3. Use the continuous function on the interval [0,1) inner product to find the projection of f(x) onto g(2). (Feel free to use an integral calculator. I use wolfram alpha. Just make sure to type the problem in carefully)....
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3. Use the continuous function on the interval (0,1) inner product to find the projection of f(x) onto g(x). (Feel free to use an integral calculator. I use wolfram alpha. Just make sure to type the problem in carefully). (a) f(x) = -22 - 1, g(x) = -2 (b) f(x) = 2r?, g(x) = 2+1 (e) f(x)=-1-1, g(x) = x2 +3 4. Consider 3-space with the dot product. Your subspace S will be the plane z...
Given the following vectors: ū= 3 ū= W = > (a) Find the projection of ū onto ū. BOX YOUR ANSWER. (b) Find the projection matrix of the projection in part (a). BOX YOUR ANSWER. (c) Find the projection of ū onto the subspace V of R3 spanned by ✓ and W. (You may use MATLAB for matrix multiplication in this part, but you must provide the expressions in terms of matrices.) BOX YOUR ANSWER. (d) Find the distance from...
how to do number 16
16) (6pts) Find the projection of ü onto w. a) Find ui --Son 347 2 25 26 b) Find 펄 orthogonal to in such that iiitül ü 2 Page Score Check ( 13 For problems on this page, use the vectors described graphically here. Your work should include correct vector notation of u, i,and w 13) What is (w+u) v E xplat 3 U=(2、1) w (3, .. 4) 14) Find the cxact magnitudes of i,...
The answers are incorrect.
(1 point) Find the orthogonal projection of ū 20 onto the subspace W of R’ spanned by and -7 -31 -13.011 projw(ū) = 1 18.362 -23.170
ܟ ܚ 4 1 ܕ 3-1 (1 point) Find the orthogonal projection of ū=| onto the subspace W spanned by 1- ܟܬ ܟܬ ܘ ܝܙ ܕ ܠ
-4 -2 -5 (1 point) Find the orthogonal projection of ū onto the subspace W spanned by -26 11 -35 -3 -3 2 3 -219 -806 projw(Ū) = -17 -950
+1 (a) (3 points) Find the projection of -300 onto the span of 0 (b) (3 points) Find the projection of onto the span of (c) (4 points) Observe that H = 1 V2 has orthonormal columns. Note that 1 = 2 +1 +1 +1 +1 +1 +1 -1 H H H2 can be written as a block matrix as H2 +1 +1 -1 -1 V2 H -H1 +1 H2 H2 and an 8 x 8 matrix H3 can be...
1. Let ū= (2,4,-1), v = (3.-3,-1) (a) Compute: x ū (b) Compute: ü x 7 (c) Is the cross product commutative? If not, what is it instead? 2. Let A = (7, -11,3), B = (1,9, -3), C = (-6,3, -2), D= (0,-8, 12), E = (1, -13,2) (a) Give the vector equation of a line passing through the points A, B. (b) Find the equation of the plane containing the points C,D,E. (c) Find the point of intersection...