If a nonzero matrix A is transformed from <mi mathvariant="double-struck">R 3 </

sgwriadaufa24r

sgwriadaufa24r

Answered question

2022-06-03

If a nonzero matrix A is transformed from R 3 to R 2 , then the null space of A must be a one dimensional (sub)space of R 3 .
So i know that null space of A is { x : A x = 0 } and I also know the definition of not onto. I don't understand the whole concept of one-dimensional space and would this statement be always true?

Answer & Explanation

snowbargerpgl1f

snowbargerpgl1f

Beginner2022-06-04Added 3 answers

You should learn math markup (most of LaTeX can be used), and you should ask questions with defined terms. Your question, as it stands, is very difficult to read!

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