anonymous
  • anonymous
Need help with vector subspace... V=
Mathematics
  • Stacey Warren - Expert brainly.com
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SOLVED
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schrodinger
  • schrodinger
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anonymous
  • anonymous
\[v=\mathbb{R}^2\] and S consists of all vectors (x,y) satisfying x^2-y^2=0
anonymous
  • anonymous
S will be the pure diagonals of the xy plane. ie. When y = +-x
anonymous
  • anonymous
it has to be determined whether it is a subspace of the given vector space. I know that I have to only show that it has the zero vector and it is closed under addition and scalar multiplication.

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anonymous
  • anonymous
Problem is that I am not sure how I go about doing this. I know that this is not a subspace of the vector, but how do you prove this? any help????

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