-4 2 -10 10 -2 -2 8 -2 not linearly independent (i.e. they are linearly dependent)....

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-4 2 -10 10 -2 -2 8 -2 not linearly independent (i.e. they are linearly dependent). Use row reduction to find constants C1, C2, C3, not all zero, so that c1v1 +c₂v2 + c3v3 = 0. The vectors v1 An example of such is • V1 Number V2 Number • V3 = Number = ● = = 3 V2 = [c₁, c₂,c3] = We can convert such a linear relation into forms that express one of the vectors in terms of the others. Examples of such relationships between the vectors are: 6 -10 6 V2+ Number V1+ Number V1+ Number V3 V3 V3 V2. = in R4 are -4 2 -10 10 -2 -2 8 -2 not linearly independent (i.e. they are linearly dependent). Use row reduction to find constants C1, C2, C3, not all zero, so that c1v1 +c₂v2 + c3v3 = 0. The vectors v1 An example of such is • V1 Number V2 Number • V3 = Number = ● = = 3 V2 = [c₁, c₂,c3] = We can convert such a linear relation into forms that express one of the vectors in terms of the others. Examples of such relationships between the vectors are: 6 -10 6 V2+ Number V1+ Number V1+ Number V3 V3 V3 V2. = in R4 are

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8 7 1 Given vectors 3 10 2 2 8 0 2 10 10 2 6 84 4 Augmented matrix of Gutenter 6 410 ... View the full answer