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This question was asked in my linear algebra quiz previous year exam and I was unable to solve it Let V be an inner ( in question it's written integer , but i think he means inner) product space
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What is the meaning of superscript $\perp$ for a vector space Ask Question Asked 14 years, 7 months ago Modified 8 years, 8 months ago
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I am working on a geometry problem involving a right-angled triangle and a rotation, and I am looking for a purely synthetic (Euclidean) proof Hoping for more different answers of different perspe
- real analysis - What is this upside-down T notation: $S^\perp . . .
In this screenshot, I want to know that the upside-down T is (I'm not sure how to research it if I don't know its name) =) (The context, is to prove that that $ (S^ {\perp})^ {\perp}$ is the smallest
- Showing $ (M^\perp)^\perp \subseteq \overline {M}$ without the Hahn . . .
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- $ (U\cap W)^\perp = U^\perp + W^\perp$ in metric vector spaces
$ (U\cap W)^\perp = U^\perp + W^\perp$ in metric vector spaces Ask Question Asked 2 years, 1 month ago Modified 2 years, 1 month ago
- Finding a Basis for S$^\\perp$ - Mathematics Stack Exchange
So I was working through this review question and got stumped My answer isn't completely orthogonal to matrices in a certain subspace, so it's incorrect The question is: Let S be a subspace of $\\
- Showing that $ker(A)^\\perp$ is the weak-* closure of $im(A*)$
I am trying to show that $ker (A)^\perp$ equals the weak-* closure of $im (A^*)$ (Denoted by $cl (im (A^*))$), where $A: X \to Y$ is a continuous linear map between Banach spaces, where $A^*$ denotes the adjoint operator of $A$
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