# Ron Jeremy

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bio website reddit.com/r/… location meatspace age member for 2 years, 4 months seen 2 days ago profile views 1,072

when someone smiles at me, all I see is an ape bearing its teethe

# 592 Actions

 Aug14 asked Calculating a probability mass function (sufficient statistic) Aug8 comment Help Proving that $\frac{(1+\frac{1}{t})^t}{e} = 1 -\frac{1}{2t} + O(\frac{1}{t^2})$ for $t\geq 1$ Ansturm is now banned. Jul22 accepted Sampling 100 widgets to test for defective ones Jul21 comment Sampling 100 widgets to test for defective ones Yah that's right. I believe their reasoning would have been correct if the $P(B_i)$ were uniform for all $i$, but since $P(B_6)$ is very small compared to $i$'s closer to $50$, their reasoning isn't correct. Jul21 comment Sampling 100 widgets to test for defective ones statistical inference 2nd edition exercise 3.2, the answer isn't actually in the book, I found a (apparently less than perfect) pdf of solutions online. Jul21 comment Sampling 100 widgets to test for defective ones The sampling is done without replacement since I won't be checking the same widget for defectiveness multiple times. Jul21 comment Sampling 100 widgets to test for defective ones @ClementC. the summation can go on to $100$ since as you say once it passes $100-k$ it no longer contributes anything. Jul21 comment Sampling 100 widgets to test for defective ones Yah my formula gives $k=4$ (probably accounting for the fact that $P(B) < 1$), so it's far more in agreement with your estimate. So it looks like my book is in error then, thanks. Jul20 revised Sampling 100 widgets to test for defective ones added 1 characters in body Jul20 asked Sampling 100 widgets to test for defective ones Jul11 asked Direct construction of an arbitrary elliptic function of order $2$ with pole set contained in its lattice. Jul6 accepted Prove that the number of ways to put $n$ distinct balls into $n$ distinct boxes is $n^n$ Jul6 revised Prove that the number of ways to put $n$ distinct balls into $n$ distinct boxes is $n^n$ added 9 characters in body; edited title Jul6 asked Prove that the number of ways to put $n$ distinct balls into $n$ distinct boxes is $n^n$ Jun22 comment Why isn't the Ito integral just the Riemann-Stieltjes integral? So what you're saying is that as $|\Pi|\rightarrow 0$, $\sum_{\Pi}f(x_i)(B(x_i)-B(x_{i-1}))$ will converge to different values depending on the choice of partition sequence $\Pi$ with some positive probability? but that it will weakly converge to the same value no matter $\Pi$? Jun22 comment Why isn't the Ito integral just the Riemann-Stieltjes integral? So are you saying that the upper and lower sums will depend on the choice of the sequence of partitions? I was under the impression that that part still worked for Brownian Motion. Jun22 comment Why isn't the Ito integral just the Riemann-Stieltjes integral? But generally when we take the Ito Integral we usually imagine this extra variable of dependence as fixed right? Jun22 comment Why isn't the Ito integral just the Riemann-Stieltjes integral? You just mean not differentiable a.e.? Also don't basically all the nice properties of the Riemann Integral which don't work for the Ito integral end up following from CoV in some way or another? I mean it's all the MVT in the end. Jun22 comment Why isn't the Ito integral just the Riemann-Stieltjes integral? I know you can't apply CoV rule I said that, also if you're devonfangs I'll eat my shoe Jun22 asked Why isn't the Ito integral just the Riemann-Stieltjes integral?