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| bio | website | |
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| visits | member for | 6 months |
| seen | 12 hours ago | |
| stats | profile views | 13 |
thank you thales & whoever for derivatives
thank you amsterdam & whoever for stock exchanges
thank you msft for vb
thank you bell & whoever for linux
thank you stroustrup & whoever for c++
thank you darpa & whoever for tcp/ip
thank you cern & whoever for http
thank you mysql ab & whoever for mysql
thank you nscp & whoever for ssl, js
thank you goog for google, ajax, spdy, chrome
thank you stack for stack
thank you resig & whoever for jquery
thank you whoever for websockets
thank you thorson (& whoever?) for websocket++
damn you msft for .net
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Dec 16 |
awarded | Supporter |
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Nov 21 |
awarded | Commentator |
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Nov 21 |
revised |
Non-physical Jounce Examples in Nature edited title |
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Nov 11 |
revised |
Optimizing response times of an ambulance corp: short-term versus average added 67 characters in body |
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Nov 11 |
comment |
Non-physical Jounce Examples in Nature Thank-you, but I'm looking more for descriptions of phenomena rather than pure math. Take the case of finance. A few years ago, all the news nets were abuzz with "the second derivative" that the economy was (de)(ac)celerating. That's a meh example. I was wondering about biology, sociology, etc, where math isn't the perceived prime concern. Thanks again! |
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Nov 11 |
revised |
Non-physical Jounce Examples in Nature added 33 characters in body |
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Nov 9 |
comment |
Non-physical Jounce Examples in Nature Cool link, but I'm really interested non-physics examples. Finance just discovered the second derivative a few years ago (but still has no idea what to do with it or how to express it). That's what I'm interested. But thanks for the visualization! |
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Nov 9 |
answered | Optimizing response times of an ambulance corp: short-term versus average |
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Nov 9 |
awarded | Editor |
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Nov 9 |
revised |
Non-physical Jounce Examples in Nature added 1 characters in body |
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Nov 9 |
comment |
Non-physical Jounce Examples in Nature Non-physical/engineering/etc examples of 4th+ derivatives. I have an idea of how to apply for finance, but I'm not totally sure, so I'd like to see other examples for comparison. |
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Nov 9 |
asked | Non-physical Jounce Examples in Nature |
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Nov 9 |
comment |
Empirical Demand Curve Equation Heh, you can keep the Nobel, I just want the answer for better modeling. I appreciate the reply. I don't want to get into a "school of thought" debate from Keyenesian to Hayekian. Should I post a data set? Is it possible to post data? Thanks again! |
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Nov 9 |
awarded | Student |
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Nov 9 |
comment |
Empirical Demand Curve Equation No. It's taught as linear. All empirical data I have shows it to be some sort of logarithm, but it doesn't "perfectly" fit. I've tried every variation of decay that I can find but to no avail. Considering the asymptotic nature of finance, that seems the way to go, but nothing fits, and it keeps me up at night. ;)) |
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Nov 9 |
asked | Empirical Demand Curve Equation |
