Mathematics - 2013-06-11 (page 3 of 3)

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Denis Rodman

22:04

@KimJung-un See math.stackexchange.com/questions/412126/…

I'm not entirely sure what you meant by that.

If that's what you meant.

Is it?

Kim Jung-un

What is unclear about that statement?

Denis Rodman

If it's true.

Kim Jung-un

It's true

Denis Rodman

Are you sure?

Kim Jung-un

My statement is true

Denis Rodman

22:13

Not your statement, but Landscape's.

Kim Jung-un

I don't know

Denis Rodman

I think he's right, but it's your wording. What's why I ask...

I think I'll accept the answer, but what about your bounty?

Kim Jung-un

If no other answers are posted, I will give him the bounty

Denis Rodman

Yeah, I'll do the same.

Do you have more interesting problems?

You said something about the unitary semicircle.

And different means.

Do you remember it?

Kim Jung-un

That was a long time ago. I do not remember it.

Denis Rodman

22:23

I think I wrote that down.

Do you want me to find it?

Or is it average?

Kim Jung-un

It is an interesting question. You should post it here.

Denis Rodman

Ok. Will you put another bounty?

I don't have the points.

It's not like I don't want to share.

Kim Jung-un

I could put a bounty on it

Zach L.

Anyone have any idea why lots of logic questions seem to be popping up on MSE? I don't remember seeing this many a few months ago!

Denis Rodman

@KimJung-un I'm sorry to disappoint you, but I can't find it!

Kim Jung-un

22:30

@DenisRodman No worries!

Denis Rodman

Kim, why did everyone but you get banned for posting material related to odd perfect numbers?

Kasper

What does this smiley mean: >,>

I'm trying to find out for an hour

but I don't understand :p

Denis Rodman

Kim, several of your friends were banned, but not you. Why?

Kim Jung-un

I don't know

Denis Rodman

Anyway, what's your topic of research?

Fourier analysis? Galois theory? Analytic number theory?

Ethan

22:47

If $d(n)$ counts how many divisors $n$ has, and $\Omega(n)$ counts how many prime divisors $n$ has,

$$\sum_{n\leq x}\Omega(d(n))=x\ln(\ln(x))+Cx+O(\frac{x}{\ln(x)})$$

$$C=\gamma+\sum_{k=2}^\infty P(k)(\Omega(k+1)-\Omega(k)-\frac{1}{k})$$
$$P(s)=\sum_{p}\frac{1}{p^s}$$

Kim Jung-un

23:09

@DenisRodman homework and algebra-precalculus

Denis Rodman

@KimJung-un Good one.