Is \{(1,4, –6), (1,5, 8), (2, 1, 1), (0, 1,0)\}

interdicoxd

interdicoxd

Answered question

2022-01-06

Is {(1,4,6),(1,5,8),(2,1,1),(0,1,0)} a linearly independent subset of R3?

Answer & Explanation

usumbiix

usumbiix

Beginner2022-01-07Added 33 answers

Consider the set of Vectors
S={(1,4,6),(1,5,8),(2,1,1),(0,1,0)}
Determining whether the set S is a linear independent subset of vector space is our goal R3
No, S is not linearly independent subset of Vector Space R3
We know,
Dimension of Finite Dimensional Vector Space be n.
And Basis the vector space be B
So, Using Converse of Replacement Theorem
|B|=n
Let linear independent subset of Vector Space be L, it contains m elements
And Generating subset of Vector Space be G
So, Using Replacement Theorem
|L||G|
So, |L|n=|B|
Hence, |S|=4>dim(R3)=3
So,
S={(1,4,6),(1,5,8),(2,1,1),(0,1,0)} is not linearly independent.

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