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As somebody used to say:

Does research. Smokes. Battles administration. Smokes. Wishes he could stop battling administration so that he could have more time to do research. Smokes some more.

The same. Except I do not smoke.

	101,907 reputation	bio	website		visits	member for	2 years, 3 months
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1d	awarded	Constituent
1d	comment	Prove $\sin(1/n)<1/n$ for all $n$ "for $x$ in $[0,\infty)$" >> "for $x$ in $[0,1)$".
1d	awarded	Nice Answer
1d	comment	Showing that $\sum_{n=3}^\infty\frac1{n(\log n)(\log\log n)}$ diverges Please learn how to type formulas on the site.
1d	revised	Showing that $\sum_{n=3}^\infty\frac1{n(\log n)(\log\log n)}$ diverges deleted 31 characters in body
1d	comment	Examples of properties that hold almost everywhere, but that explicit examples unknown. This may be not easy but explicit examples exist.
1d	revised	Examples of properties that hold almost everywhere, but that explicit examples unknown. added 46 characters in body
1d	comment	Examples of properties that hold almost everywhere, but that explicit examples unknown. That is, as far as I know.
1d	answered	Examples of properties that hold almost everywhere, but that explicit examples unknown.
1d	comment	$\int_0^1\frac{(f(x)-1)^2 -4x^2}{x^{3.5}}\,dx$ exists. Calculate $f(0)$ and $f'(0)$ LaTeX has two styles for maths, textstyle (encoded by $...$ ) and displaystyle (often encoded by `$$...$$`). The latter is made for displayed maths, the former for intext maths. One should restrict to textstyle in titles of posts on MSE.
1d	comment	$\int_0^1\frac{(f(x)-1)^2 -4x^2}{x^{3.5}}\,dx$ exists. Calculate $f(0)$ and $f'(0)$ @eyal Nobody introduced displaystyle in your other post.
1d	revised	Inequality between 2p-norm and p-norm for random variables edited tags
1d	answered	Inequality between 2p-norm and p-norm for random variables
1d	revised	Explain why a chi-square random variable will approximately have a normal distribution for large n deleted 2 characters in body
1d	revised	Series expansion with remaining $log n$ added 146 characters in body
1d	answered	Series expansion with remaining $log n$
1d	revised	Limit of $L^p$ norm when $p\to0$ edited title
1d	comment	Series expansion with remaining $log n$ Do you need something more precise than the equivalent $1/(4k^2n^2)$? If yes, what form of expansion?
1d	comment	A tricky probability question. Funny that the probability of an event in a finite probability space with the uniform probability could be not rational. :-)
1d	answered	probability of divisibility