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| bio | website | |
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| location | ||
| age | ||
| visits | member for | 1 year, 1 month |
| seen | 4 hours ago | |
| stats | profile views | 230 |
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Dec 22 |
revised |
Calculating a function limit latexification |
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Dec 22 |
comment |
Differential Equation Well yes, that clearly is your question, but what approach are you trying, because I don't think this is very clear from what you wrote. |
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Dec 22 |
comment |
Differential Equation In that case, what are you trying to do (in terms of equations)? |
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Dec 22 |
comment |
Calculating a function limit What have you tried? What actually is your question? |
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Dec 22 |
suggested | suggested edit on Calculating a function limit |
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Dec 22 |
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Differential Equation So... what exactly do you expect from us? Just the answer? Or is this homework, and do you want a hint? |
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Dec 22 |
comment |
Algebra question resubmited Your previous question was closed. This is a literal copy. Why did you think it wouldn't get closed this time? |
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Dec 22 |
comment |
Prove that s is finite and find an n so large that $S_n$ approximate s to three decimal places. @rlgordonma: I didn't want to completely give it away, but yes, that is closer to an answer :). |
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Dec 22 |
answered | Prove that s is finite and find an n so large that $S_n$ approximate s to three decimal places. |
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Dec 22 |
answered | Gamma function of negative argument |
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Dec 22 |
suggested | suggested edit on Prove that s is finite and find an n so large that $S_n$ approximate s to three decimal places. |
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Dec 22 |
reviewed | No Action Needed Finding a surface fitting equation for this set of data |
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Dec 22 |
awarded | Citizen Patrol |
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Dec 22 |
comment |
How can I systematically find the roots of $ x^4 + 1?$ Is there some algorithm? Better. Although I'd simply expect this question to be closed as duplicate. |
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Dec 22 |
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How can I systematically find the roots of $ x^4 + 1?$ Is there some algorithm? Yes, those answers are much better and more welcoming. This just smacks an answer to the question, which is technically correct, but the techniques it relies on are not explained at all. |
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Dec 22 |
awarded | Custodian |
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Dec 22 |
reviewed | No Action Needed Hartshorne's proof of Proposition 2.5, Chapter II of his book Algebraic Geometry |
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Dec 22 |
comment |
How can I systematically find the roots of $ x^4 + 1?$ Is there some algorithm? How is someone who doesn't know how to find roots of $x^4+1$ helped by your answer? |
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Dec 22 |
revised |
How can I find $\sum_{k=1}^{1233}f(\frac{k}{1234})$ added 4 characters in body |
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Dec 22 |
comment |
How can I systematically find the roots of $ x^4 + 1?$ Is there some algorithm? If you can understand this answer, you wouldn't have needed it in the first place. |
