-2 (1 point) Express the vector v= -6 as a linear combination of x = 5...
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Question 5 of 7 Express the vector was a linear combination of the given vector v In the form (W - kl Vi+k2 V2 + 3 V3) Replacing K's with their value VIO V VS Doesn't exist W=2 V1 + 3 V2 + 8 V3 W=3 V1 + 2 V2 +8 V3 W.2V1-3 V2 +8V3 Question 6 of 7 pent of interaction explain pain and
Consider the following vectors. 9 0 6 0 Give the corresponding linear combination. (If an answer does not exist, enter DNE.) 1I Is the vector v a linear combination of the vectors u1 and u? O The vector v is a linear combination of u and u 2 The vector v is not a linear combination of u1 and u2-
Consider the following vectors. 9 0 6 0 Give the corresponding linear combination. (If an answer does not exist, enter...
(1 point) -6 -3 Use Theorem 5.5.2 to write the vector v = -4 as linear combination of -3/V14 1/714 -2/V13 0/V13 -3/V182 -13/V182 uj = u2 = and uz = -2/V14 3/V13 -2/V182 Note that uj, uz and uz are orthonormal. V= uj + u2+ uz Use Parseval's formula to compute ||v1|?. ||5|12=
4 We can write the vector V = | 3 | in the 2. linear combination of basis vectors 4 2. i = 4 12 = -6 6 5 3 = 3 as 4 Select one: 이 A. V = Su + 2 + u3 B. None of these answers 18 2 11 O 0 118 p. V = ful + 2 - ITU3 O E. V = -fu] + 2 - 13
(True or False and explain why) If vector u is a linear combination of vector v and w, then w must be a linear combination of u and v.
Write each vector as a linear combination of the vectors in S. (If not possible, enter IMPOSSIBLE.) S = (6, -7, 8, 6), (4, 6, -4, 1)} (a) (18, 43, -32, 0) -1 6 + 35 89 -14, 4 (b) V = 2. V = 1 23 -4, -14, 8 57 (c) W = 8 61 73 s X W = + 6 24 13 -2, 3 4 (d) Z = 4, | »2 + X
The initial and terminal points of a vector are given. Write the vector as a linear combination of the standard unit vectors i ands Initial Point Terminal Point (-1,2) (5,-4) X Need Help? Read it Find the component form of v, where u = 21 - 3 |(2, - 1) Sketch the vector operation geometrically, y 5 NIN 5 - 5 5 NI . s | sin Find the magnitude and direction angle of the vector v. v = 7(cos...
(1 point) -2 -5 Let x = and y= -2 Find the vector v = 3x-6y and its additive inverse.
Write each vector as a linear combination of the vectors in S. (Use Si and s2, respectively, for the vectors in the set. If not possible, enter IMPOSSIBLE.) S = {(1, 2, -2), (2, -1, 1)} (a) z = (-3,-1, 1) (b) v = (-1, -5, 5) (c) w = (2,-16, 16) (d) u = (1,-6,-6) (d)
Find a linear combination of vectors vi -(1,-1,0,3),v2 (3,1,2,2). v (-2,4,-1, 3) that is equal to vector t - (1,9, 3,-2). If it's impossible, enter all zeros
Find a linear combination of vectors vi -(1,-1,0,3),v2 (3,1,2,2). v (-2,4,-1, 3) that is equal to vector t - (1,9, 3,-2). If it's impossible, enter all zeros