please help answer both thank you Write each vector as a linear combination of the vectors in S. (If not possible, enter IMPOSSIBLE.)S = {(2, –1, 3), (5, 0, 4)}(a)z = (5, –5, 11)z =+2(b) v-(s, -)127V =44v =|S1S2(c)w = (2, -6, 10)$1 +S2W =(d)u = (7, 1, –1)+S2u = Find a basis for the column space and the rank of the matrix.2 -3 -647 -6 -3 14-21 -2 -42 -2 -24(a) a basis for the column space(b) the rank of the matrix

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Answered: Write each vector as a linear…

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter4: Vector Spaces

Section4.1: Vector In R^n

Problem 27E: Determine whether each vector is a scalar multiple of z=(3,2,5). a v=(92,3,152) b w=(9,6,15)

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Take this test to review the material in Chapters 4and Chapters 5. After you are finished, check your work against the answers in the back of the book. Write w=(7,2,4) as a linear combination of the vectors v1, v2 and v3 if possible. v1=(2,1,0), v2=(1,1,0), v3=(0,0,6)
Take this test to review the material in Chapters 4 and 5. After you are finished, check your work against the answers in the back of the book. a Explain what it means to say that a set of vectors is linearly independent. b Determine whether the set S is linearly dependent or independent. S={(1,0,1,0),(0,3,0,1),(1,1,2,2),(3,4,1,2)}
Use a software program or a graphing utility to write v as a linear combination of u1, u2, u3, u4, u5 and u6. Then verify your solution. v=(10,30,13,14,7,27) u1=(1,2,3,4,1,2) u2=(1,2,1,1,2,1) u3=(0,2,1,2,1,1) u4=(1,0,3,4,1,2) u5=(1,2,1,1,2,3) u6=(3,2,1,2,3,0)
Find a basis for R2 that includes the vector (2,2).
Determine whether each vector is a scalar multiple of z=(3,2,5). a v=(92,3,152) b w=(9,6,15)
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Let v1, v2, and v3 be three linearly independent vectors in a vector space V. Is the set {v12v2,2v23v3,3v3v1} linearly dependent or linearly independent? Explain.

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Write each vector as a linear combination of the vectors in S. (If not possible, enter IMPOSSIBLE.) S = {(2, –1, 3), (5, 0, 4)} (a) (5, -5, 11) z = z = + 1 8, 27 (b) V = 4 s2 V = (c) w = (2, -6, 10) W = + S2 (d) u = (7, 1, –1) u = +