Determine three of the given vectors that form a basis for space (R^3) and express the fourth vector as a linear combination of these basis vectors. p=[1,1,- 1], q= [-1,1,1], r= [1,3,-1], s = [1,1,0]
Determine three of the given vectors that form a basis for space (R^3) and express the fourth vector as a linear combination of these basis vectors. p=[1,1,- 1], q= [-1,1,1], r= [1,3,-1], s = [1,1,0]
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 28E
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Determine three of the given
p=[1,1,- 1], q= [-1,1,1], r= [1,3,-1], s = [1,1,0]
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