fr00ty_l00ps
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 Nov 19 revised Repeating Square Root Simplification Clarified previous edit Nov 19 comment Repeating Square Root Simplification Thank you, I appreciate that :) Nov 19 revised Repeating Square Root Simplification Edited TeX and whatnot Nov 19 awarded Custodian Nov 19 reviewed Approve Repeating Square Root Simplification Nov 19 comment Repeating Square Root Simplification Also, I have no clue what to tag this with... Any ideas? Nov 19 asked Repeating Square Root Simplification Nov 17 awarded Nice Question Nov 16 accepted Careers in Math Nov 16 comment Careers in Math First off, I don't just do math in my classes and call it good. I go to a school where self-studying is encouraged, and I take advantage of that. I am taking myself through calculus. This last Sunday at church, I was able to find the derivative of the equation of a circle in my head ($div{-x,y}) Secondly, I just love how it all flows together, how there are so many patterns that occur throughout, and that there are so many in the world that are yet to be "solved" Nov 16 comment Careers in Math But in my mind it seems that to be a mathematician, you spend your life at home, next to a whiteboard, doing math. I am wondering if a job exists so that I could get paid (so I can eat) for working on math. Nov 16 comment Careers in Math Thanks ;) totally missed that Nov 16 revised Careers in Math Changed some stuff Nov 16 asked Careers in Math Nov 11 comment Numbers to the Power of Zero Ah, that makes sense, thanks ^v^ Nov 11 accepted Numbers to the Power of Zero Nov 11 comment Numbers to the Power of Zero @ShaunAult Oh, trust me, I can tread water in calc. In church today, I was working the derivative of a circle equation. Nov 11 comment Numbers to the Power of Zero @ShaunAult so which is commonly accepted? And what in the heck does "indeterminate form" mean? I am a highschool freshman ^^ Nov 11 comment Numbers to the Power of Zero @ShaunAult Then what kind of number is it? o.O Nov 11 comment Numbers to the Power of Zero For 1), so some mathematician once said that$a^{0} = 1\$? For 2), Which is then correct? Or is it both? For 3), I can kinda wrap my head around that, but I have yet to come across that particular way of denoting a range...