meta user
network profile
| bio | website | |
|---|---|---|
| location | Zagreb, Croatia | |
| age | 20 | |
| visits | member for | 6 months |
| seen | 5 hours ago | |
| stats | profile views | 16 |
A student eager to learn.
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May 19 |
revised |
What is $\int x^re^xdx$? what is r? |
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May 19 |
suggested | suggested edit on What is $\int x^re^xdx$? |
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May 7 |
answered | Retrieving coefficients of polynomial from dft |
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Apr 11 |
awarded | Critic |
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Apr 10 |
accepted | Four boxes with black and white pearls and a posteriori probabilities. |
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Apr 10 |
comment |
Four boxes with black and white pearls and a posteriori probabilities. Is there any way to do it with Bayes and law of total probability? Perhaps the right question is, would it be any shorter than this clear answer? |
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Apr 9 |
revised |
Four boxes with black and white pearls and a posteriori probabilities. wording of the problem to make it more clear |
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Apr 9 |
revised |
Four boxes with black and white pearls and a posteriori probabilities. edited tags |
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Apr 9 |
revised |
Four boxes with black and white pearls and a posteriori probabilities. deleted 7 characters in body |
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Apr 9 |
asked | Four boxes with black and white pearls and a posteriori probabilities. |
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Feb 2 |
comment |
Is this an increasing function? exact duplicate math.stackexchange.com/questions/51645/increasing-function |
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Jan 26 |
accepted | In how many ways can people get out of the elevator? |
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Jan 26 |
comment |
In how many ways can people get out of the elevator? I do agree that the above equation doesn't take the people as individuals but I realized that I could "paint" them but couldn't do it properly. Stirling numbers formula works for unlabeled subsets but "painting" the subsets $n \brace {k} $$\cdot 5!$ gives me the desired 126000. Thanks for the hint! |
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Jan 26 |
asked | In how many ways can people get out of the elevator? |
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Jan 16 |
accepted | Proof with function composition |
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Jan 15 |
revised |
Proof with function composition deleted 1 characters in body |
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Jan 15 |
asked | Proof with function composition |
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Jan 14 |
comment |
One of balls and urns Stirling numbers? There's something about distinguishable boxes that makes me believe this is possible... |
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Jan 14 |
comment |
Convergence of the series $\sum\limits_{n=2}^{k}(-1)^{[\sqrt n]}\frac{1}{\ln n}$ What about Leibniz Criterion? |
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Jan 10 |
revised |
Solve a recurrence relation $D_{n} = nD_{n-1} + (n-1)!$ replaced position of two words... |
