Louis
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 Nov25 awarded Popular Question Sep24 awarded Autobiographer Jul2 awarded Curious Mar25 awarded Popular Question Jun23 awarded Informed Dec12 comment Are all vectors of the form $(a, b, c)$, where $b = a + c$, subspaces of $R^3$ Thank you for helping set it up in my head properly. Dec12 comment Are all vectors of the form $(a, b, c)$, where $b = a + c$, subspaces of $R^3$ Thank you, I believe the book made a typo. Dec12 accepted Are all vectors of the form $(a, b, c)$, where $b = a + c$, subspaces of $R^3$ Dec12 revised Are all vectors of the form $(a, b, c)$, where $b = a + c$, subspaces of $R^3$ added 71 characters in body Dec12 awarded Commentator Dec12 comment Are all vectors of the form $(a, b, c)$, where $b = a + c$, subspaces of $R^3$ This is homework, but we don't actually submit anything. Dec12 asked Are all vectors of the form $(a, b, c)$, where $b = a + c$, subspaces of $R^3$ Mar20 comment How to calculate $(k^x)^{-1} \pmod m$ Haha, duly noted. I have no idea why you chose 1001. Is there an another way to solve this without knowing about congruence arithmetic? Mar20 comment How to calculate $(k^x)^{-1} \pmod m$ Okay, I will try to think about what you said. Is the reason why $k^{x}$ became 12 also explained in your comment? Mar20 asked How to calculate $(k^x)^{-1} \pmod m$ Jan9 accepted What's a good method to solve for scalars in a vector equality? Jan9 comment What's a good method to solve for scalars in a vector equality? Thanks, I see it now. Jan9 asked What's a good method to solve for scalars in a vector equality? Sep16 accepted What is the language of this DFA? Sep16 comment What is the language of this DFA? Thank you. I never considered unions. Looks like my English definition is wrong too. I'll go over that subject again.