Say you have vec(v)_1=[[1],[2],[3]] \ vec(v)_2=[[-1],[-2],[-3]] and vec(v)_3= anything. Is the set {vec(v)_1,vec(v)_2,vec(v)_3} always considered linearly dependent because {vec(v)_1,vec(v)_2} is?

pominjaneh6

pominjaneh6

Answered question

2022-08-09

Say you have v 1 = [ 1 2 3 ] and v 3 = anything.
Is the set { v 1 , v 2 , v 3 } always considered linearly dependent because { v 1 , v 2 } is?

Answer & Explanation

agergadas3b

agergadas3b

Beginner2022-08-10Added 16 answers

The requirement for linear dependence is that a 1 v 1 + a 2 v 2 + a 3 v 3 = 0, where not all the as are zero. So if a 1 = a 2 and a 3 = 0, then that would make it zero, so yes, they will always be linearly dependent
Brooklyn Farrell

Brooklyn Farrell

Beginner2022-08-11Added 6 answers

If you want to check by the definition:
1 v 1 + 1 v 2 + 0 v 3 = 0
and not all the coefficients are zero, thus there is lin. dependence.

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