« first day (2326 days earlier)      last day (2994 days later) » 
00:00 - 07:0009:00 - 19:0019:00 - 00:00

Evinda
Evinda
19:02
I haven't heard of immanants. What are they about? @TobiasKildetoft
Tobias Kildetoft
Tobias Kildetoft
@Evinda Are you familiar with the other permanents?
ArmaGeddON
ArmaGeddON
Hi
Tobias Kildetoft
Tobias Kildetoft
ohh woops, the immanants are the general ones, the permanent is the special one that looks like the determinant
ArmaGeddON
ArmaGeddON
Can anyone help me? I have a little class 10th question
Tobias Kildetoft
Tobias Kildetoft
(all of which one easily finds out by googling immanant)
Semiclassical
Semiclassical
19:04
permanent of a matrix= "write down the formula for its determinant, then flip all minus signs to positive."
minus signs coming from the determinant, mind, not the matrix elements themselves
Evinda
Evinda
A ok, I haven't heard of permanents before
Semiclassical
Semiclassical
I forget what applications they have.
ArmaGeddON
ArmaGeddON
If sin x = anything.. say 3/4
Find x
Alessandro
Alessandro
permanents have some combinatorial interpretation iirc
Semiclassical
Semiclassical
The only one I know of is in quantum mechanics. When you want to write down an n-fermion wavefunction (e.g. a bunch of electrons in an atom) you write down what's known as a slater determinant
Alessandro
Alessandro
19:07
Like rooks on a chessboard with forbidden cells or similar problems maybe
Semiclassical
Semiclassical
this ensures that the wavefunction is antisymmetric under exchange of fermions, i.e. if i swap two indices it should flip the sign
ArmaGeddON
ArmaGeddON
Uhh.. can anyone spare little time to answer my question?
Semiclassical
Semiclassical
by contrast, a system of bosons should be symmetric under exchange.
@ArmaGeddON Do you know about sin^{-1} aka arcsine?
Evinda
Evinda
@TobiasKildetoft So at the topic you suggested we find the number of steps needed so that we find the permanent of a matrix?
Semiclassical
Semiclassical
So you can't do a determinant in the boson case. For that, you'd need a permanent instead.
Tobias Kildetoft
Tobias Kildetoft
19:08
@Evinda Yes, the complexity of computing the permanent is as far as I recall of interest (actually, I recall it being NP complete)
Semiclassical
Semiclassical
there's an entire wikipedia article on computing the permanent, in fact, which is easily found via google
Evinda
Evinda
@Semiclassical So in what cases do we compute the permanent?
@Semiclassical Ok, I will look for it
ArmaGeddON
ArmaGeddON
Semiclassical.. I read this.. x = (sin 3/4)^-1 but
Semiclassical
Semiclassical
Check out the main page on permanents for applications.
ArmaGeddON
ArmaGeddON
Doesnt seem to be working fpr me
Evinda
Evinda
19:10
@TobiasKildetoft Is there a lot say about this topic?
Balarka Sen
Balarka Sen
Did you mean sqrt(3)/2 and not 3/4?
Tobias Kildetoft
Tobias Kildetoft
@Evinda Have you looked at the wikipedia page yet?
Semiclassical
Semiclassical
When you say it doesn't seem to be working, do you mean that it's not coming out to the number you expect?
If so, you might check whether your calculator is working in radians or degrees.
ArmaGeddON
ArmaGeddON
Yup
Semiclassical
Semiclassical
There shouldn't be a nice answer for $\sin x=3/4$, though. It'll be some approximation.
for $\sin x=\sqrt{3}/2$, by contrast, the answer is nice (in either radians or degrees). hence Tobias's query.
ArmaGeddON
ArmaGeddON
19:12
Approx value is fine for me
Semiclassical
Semiclassical
ok. then what number are you expecting to get, and what are you getting instead?
Balarka Sen
Balarka Sen
@ArmaGeddON You write x = (sin 3/4)^-1. That's not what sin^-1(3/4) means though.
Semiclassical
Semiclassical
^
Lozansky
Lozansky
Hello chat
ArmaGeddON
ArmaGeddON
Balarka actually I read the formula wrong.. u r right ..the latter one is correct
But anyone tell me about it plz.. all I know is that its called inverse sine :p
How to calculate inverse sin?
Semiclassical
Semiclassical
19:20
Practically? Use a calculator.
ArmaGeddON
ArmaGeddON
In exams
Or shall I leave it in terms of inverse sine only?
Semiclassical
Semiclassical
Depends on what you're taking the inverse sine of. If it doesn't have a nice answer, then you'd indeed leave it like that.
Balarka Sen
Balarka Sen
You should not leave sin^-1(sqrt(3)/2) just like that, for example. Or sin^-1(1/2).
Semiclassical
Semiclassical
There are just a handful of nice cases, most relating to 30-60-90 or 45-45-90 triangles.
or sin^{-1}(1/sqrt(2)).
all of those have nice answers which you can see by using the unit circle.
on the other hand, some of them are just plain obscure. for instance, $\sin^{-1}(1/2*\sqrt{5-\sqrt{5}})=36$ degrees. that's something you certainly would -not- be expected to know.
it's true, but it'd be way too hard for a 10th grade exam.
Balarka Sen
Balarka Sen
Yup
ArmaGeddON
ArmaGeddON
19:24
M so confused.. not those standard angles.. in these sample questions I came accross 3/4, 2.6 and other weird angles
Semiclassical
Semiclassical
(it has to do with pentagons)
Balarka Sen
Balarka Sen
@ArmaGeddON That's unusual. Can you produce the questions?
Semiclassical
Semiclassical
arccos(3/4) doesn't have a nice answer as far as I remember.
and sin(x)=2.6 definitely doesn't.
ArmaGeddON
ArmaGeddON
Its a physics question. .
Refraction of light
Balarka Sen
Balarka Sen
Oh, then just leave it as sin^-1(3/4).
Semiclassical
Semiclassical
19:26
If it's a physics question and they're giving those numbers, then they probably want a numerical result.
In which case, -use your calculator-
Balarka Sen
Balarka Sen
10th grade does not allow calculator, @SemiC.
Semiclassical
Semiclassical
Depends on the school.
Balarka Sen
Balarka Sen
Ok, I guess.
Semiclassical
Semiclassical
Plus, for a physics versus math course?
ArmaGeddON
ArmaGeddON
Yup and its gonna be a mcq paper..if all values are numeric.. m gone
Semiclassical
Semiclassical
19:27
if it's multiple choice and requires numbers without calculators, that's dickish.
ArmaGeddON
ArmaGeddON
Question is
Balarka Sen
Balarka Sen
jesus man, language :P
Semiclassical
Semiclassical
pffft.
on the note of language, have you seen today's SMBC?
Tobias Kildetoft
Tobias Kildetoft
Hmm, I wonder if "dickish" or "Jesus" is the more offensive from a Christian point of view
ArmaGeddON
ArmaGeddON
At what angle must a ray of light incident on the glass so that it is refracted at an angle of 30 deg. Given refractive index of glass = 1.5
Balarka Sen
Balarka Sen
19:29
@Semiclassical Nope, let me google it
Semiclassical
Semiclassical
Okay. What's the relevant physics?
(I know what it is, but I want you to say it :) )
ArmaGeddON
ArmaGeddON
Refraction of light
Balarka Sen
Balarka Sen
There's a specific thing you want to use here (a law, a rule or whatever you want to call it)
Semiclassical
Semiclassical
Sure. What principle is applicable here to get the angle?
@BalarkaSen The fact that I recognize the stuff in the background as valid vector calculus...not sure how I feel about that :P
ArmaGeddON
ArmaGeddON
sin I / sin r = 1.5
Semiclassical
Semiclassical
19:31
right, Snell's law
ArmaGeddON
ArmaGeddON
Sin r is 30 deg
Yup snells law
Semiclassical
Semiclassical
careful. r is 30 degrees, sin r is not.
ArmaGeddON
ArmaGeddON
Yh. My bad
Semiclassical
Semiclassical
what is sin(30 deg)?
Balarka Sen
Balarka Sen
In any case his answer is correct
ArmaGeddON
ArmaGeddON
19:33
Sin r is 1/2
Semiclassical
Semiclassical
yeah.
ArmaGeddON
ArmaGeddON
Cmon m not a nerd
Semiclassical
Semiclassical
You're right, the answer would be sin^{-1}(3/4)
Actually
Balarka Sen
Balarka Sen
@Semiclassical I guess I don't find this very funny :/
Semiclassical
Semiclassical
When they say that it's refracted at an angle of 30 degrees---angle with respect to what?
If it's to the vertical, you're right.
If it's to the horizontal, you're not.
ArmaGeddON
ArmaGeddON
19:34
Air / vacuum
Semiclassical
Semiclassical
Not what I asked.
goo.gl/images/VhuoDp
When doing snell's law, the angle in there is relative to the vertical.
However, you could also specify that direction in terms of its angle to the horizontal plane.
So if you're 10 degrees from vertical, it's 80 degrees from horizontal.
Without that clarification, the question is ambiguous.
ArmaGeddON
ArmaGeddON
Its horizontal
They didnt teach is vertical yet
Semiclassical
Semiclassical
...
ArmaGeddON
ArmaGeddON
Us*
Semiclassical
Semiclassical
either we're talking on different wavelengths, or they've taught the subject in a very strange way.
ArmaGeddON
ArmaGeddON
19:38
Looks like we went off topic..
Semiclassical
Semiclassical
Eh, it's not off-topic
it goes to whether or not r in Snell's law is really 30 degrees, or whether it should be in fact 60 degrees
ArmaGeddON
ArmaGeddON
In these sample papers they wrote I = inverse sin of 3/4
Semiclassical
Semiclassical
Ah, okay then.
ArmaGeddON
ArmaGeddON
And then directly answer 48 in next line
Semiclassical
Semiclassical
...without a calculator, that's just
eugh.
ArmaGeddON
ArmaGeddON
19:40
Impossible?
Semiclassical
Semiclassical
not impossible, but not fair.
ArmaGeddON
ArmaGeddON
Hmm ik..
Semiclassical
Semiclassical
I could probably show that sin(48 degrees) is approximately 0.75 given enough gtime.
(or a calculator)
However, was that a multiple choice problem?
ArmaGeddON
ArmaGeddON
Yup
Semiclassical
Semiclassical
what were the other choices?
ArmaGeddON
ArmaGeddON
19:42
32, 48, 63, 72
Semiclassical
Semiclassical
hmm.
i guess you could work it out from those on the following basis.
ArmaGeddON
ArmaGeddON
I just rounded these angles for convenience
Difference in options is big so approximation can work
But I need to sleep now
Semiclassical
Semiclassical
Good call.
ArmaGeddON
ArmaGeddON
Thanks for help semi.. will catch u later
Semiclassical
Semiclassical
np
ArmaGeddON
ArmaGeddON
19:44
1:20am here
Btw whats ur nationality?
Semiclassical
Semiclassical
USA
it's 1:44 pm here, so yeah
ArmaGeddON
ArmaGeddON
K..cool
Semiclassical
Semiclassical
we're not exactly in sync :P
ArmaGeddON
ArmaGeddON
Bbl hope I catch u tomorrow :)
Null
Null
how do you trigger a captcha at MSE?
Sophie
Sophie
19:51
don't you need to fill a captcha to make an account?
Null
Null
mmh, no i mean if you post something, it happened once to me, but the captcha made no sense
it was "i'm no robot" lol
any sophisticated spambot would recognize that i suppose
Balarka Sen
Balarka Sen
@TedShifrin Heya
Ted Shifrin
Ted Shifrin
Hi @Balarka
(@Semiclassic: Isn't Snell's Law always done with the angle from the vertical — orthogonal to the interface?)
Balarka Sen
Balarka Sen
He was just wondering if that's the angle the question was talking of and not the angle from the horizontal
Ted Shifrin
Ted Shifrin
I've never seen a math or physics book do it otherly.
Balarka Sen
Balarka Sen
19:59
You misunderstand me. You're correct that the Snell's law is done with angles from the vertical; but the question might talk about the other angle.
Mike Miller
Mike Miller
morning
Balarka Sen
Balarka Sen
In which case you have to plug in 90 - that angle before applying the law.
Ted Shifrin
Ted Shifrin
G'night, @MikeM
@BalarkaSen Well, since I didn't see the original question, I shouldn't have said anything. But I understand complements of angles :P
Fargle
Fargle
Hello chat.
Ted Shifrin
Ted Shifrin
Fargle!
Fargle
Fargle
20:00
How goes it, @Ted?
Ted Shifrin
Ted Shifrin
It goes well. I still have another letter of rec to write, though :( ... How're you doing?
Balarka Sen
Balarka Sen
I forgot that it was called complement. Yeah, I was just clarifying.
Ted Shifrin
Ted Shifrin
How's Rudin faring?
@Balarka: It's not complimentary.
Null
Null
@TedShifrin everything ok?
Ted Shifrin
Ted Shifrin
I dunno, Null. Should it not be?
Alessandro
Alessandro
20:03
Hi @Ted
Balarka Sen
Balarka Sen
That's at least better than the violet pun Akiva made that day
Fargle
Fargle
@Ted: I'm doing well. Rudin is going a little more slowly now. The thing I'm really having trouble with is picking exercises that are non-trivial, but not too, er, advanced.
Balarka Sen
Balarka Sen
Hi @Alessandro, @Fargle
Alessandro
Alessandro
Hi @Balarka!
Fargle
Fargle
Heya @Balarka, what's up?
Ted Shifrin
Ted Shifrin
20:03
@Fargle: Well, you should try to do all levels. You are welcome to ask me for recommendations/comments.
Hi @Alessandro
Fargle
Fargle
@TedShifrin Thanks. I still need to get through chapter 3--I've been trying to make it a habit to read math books more slowly, and to digest proofs as they come.
Ted Shifrin
Ted Shifrin
Better yet, @Fargle. Read a proof, "understand" it, close the book, and try to write it yourself.
Fargle
Fargle
That's great advice. I'm a bit embarrassed I hadn't thought of that yet, haha.
Ted Shifrin
Ted Shifrin
Sometimes you might even try to write your own proof before you read the one in the book. Rudin is way too slick for my taste most of the time.
That's why I like Spivak better for most of this stuff.
robjohn
robjohn
@TedShifrin yes
Ted Shifrin
Ted Shifrin
20:07
I know, @robjohn :P And hi :)
robjohn
robjohn
@TedShifrin heya
Ted Shifrin
Ted Shifrin
Quick question for the room because I'm too lazy to think right now: What are the curves in $\Bbb R^2-\{0\}$ that make a constant angle with lines through the origin (or with circles centered at the origin)?
Mike Miller
Mike Miller
sigh, I guess j need to take this
user image
Balarka Sen
Balarka Sen
oops
Ted Shifrin
Ted Shifrin
need? it looks interesting, though.
Mike Miller
Mike Miller
20:12
it hits a few of my interests, tho ofc is not directly applicable to research
Ted Shifrin
Ted Shifrin
I thought you were learning automorphic forms for one of your friends.
Mike Miller
Mike Miller
haha I quit that class
Ted Shifrin
Ted Shifrin
Uh huh ...
Mike Miller
Mike Miller
too much work, I don't like him that much
Ted Shifrin
Ted Shifrin
LOL, I figured.
Mike Miller
Mike Miller
20:15
probably what will happen with this class too, since our new faculty member is giving a khovanov homology class in the same quarter
Balarka Sen
Balarka Sen
@Fargle Not much yet.
Fargle
Fargle
Busy times ahead, @Balarka?
Balarka Sen
Balarka Sen
nah, exams are over. i can chillax.
Fargle
Fargle
Awesome.
Ted Shifrin
Ted Shifrin
No one's answering my question about curves making a constant angle with lines through the origin? :(
Mike Miller
Mike Miller
20:22
Too hard.
Kidding, of course.
Ted Shifrin
Ted Shifrin
It's coming from an MSE question asking in essence for the geodesics in the punctured plane with metric $1/r^2$ times the usual one.
Just submitted a rec at UCLA for one of my former students, @MikeM.
@MikeMiller Oddly, I haven't yet figured the right way to look at this to solve it.
Balarka Sen
Balarka Sen
assume you are arclength parametrized. you want $(x'(t), y'(t)) \cdot (x(t), y(t))/\sqrt{x^2 +y^2}$ to be constant, yeah?
Ted Shifrin
Ted Shifrin
@Balarka: Angle doesn't need the conformal fudge factor.
Oh, but let's see.
You're doing the dot product, so I need the correct lengths in there.
Balarka Sen
Balarka Sen
Yep
Ted Shifrin
Ted Shifrin
OK, I agree.
Balarka Sen
Balarka Sen
20:33
Squaring $\alpha' \cdot \alpha/\|\alpha\|$ and differentiating would give you a differential equation but solving that would be a pain. I don't see anything slick coming out of this.
Ted Shifrin
Ted Shifrin
Switch to polar coordinates, of course.
Balarka Sen
Balarka Sen
Ah, yeah, that's better.
Ted Shifrin
Ted Shifrin
You get $r'=c$, but you have to impose the arclength restriction, which is $x'^2+y'^2=1/r^2$, I think.
Balarka Sen
Balarka Sen
Right, agreed.
Ted Shifrin
Ted Shifrin
No, actually, I don't agree any more.
The unit radial vector field is just $(x,y)$ in this metric.
I'll work this out after lunch.
Balarka Sen
Balarka Sen
20:37
Alright. I'm chickening out though :P
I should do spectral sequences
Ted Shifrin
Ted Shifrin
If you say so.
Bubye.
Balarka Sen
Balarka Sen
bon appetit
Mike Miller
Mike Miller
@Ted: Who? Maybe I'll see them at open house.
Semiclassical
Semiclassical
20:54
My vote right now is that in polar coordinates it's any curve of the form $r(\theta)=m(\theta-\theta_0)$
Balarka Sen
Balarka Sen
A spiral does satisfy that, yeah, I think.
Semiclassical
Semiclassical
in fact, I think it'd have $m=\tan \phi$ where $\phi$ is the constant angle to the circles.
Zach Hauk
Zach Hauk
hello
Mike Miller
Mike Miller
Up to rotation there's clearly only one such curve for each angle so if yours satisfy the condition...
Semiclassical
Semiclassical
(so long as $\tan \phi$ finite, of course. when $\phi=\pi/2$ you've got radial lines i.e. $r=$const)
The only thing I need to convince myself of is that it's $r'(\theta)$ that's constant rather than $\frac{1}{r}r'(\theta)$
Balarka Sen
Balarka Sen
20:59
Your solution is exactly what Ted figured though, $r' = c$
Semiclassical
Semiclassical
Yeah.
Actually, though, I think it really might be $\frac{r'(\theta)}{r(\theta)}=c$.
Balarka Sen
Balarka Sen
Shrug. I guess; too lazy to do the calculus right now
Semiclassical
Semiclassical
Since if I think in terms of differentials i'd best be working in terms of the changes in arc length and radius, i.e. $rd\theta$ and $dr$.
I'm not too lazy to do plotting, thankfully.
Null
Null
which tag has most of the easy questions?
Semiclassical
Semiclassical
^ vote to close: opinion-based.
Mike Miller
Mike Miller
21:03
geometric-topology
Semiclassical
Semiclassical
okay, here's an r'=c spiral
user image
That's with $c=\tan(\pi/4)$.
Doesn't look terribly constant-angle
Mike Miller
Mike Miller
Your condition is probably th right one
so (log r)' = c, so r = e^{ct}
Semiclassical
Semiclassical
right.
and it looks more correct as well:
user image
Balarka Sen
Balarka Sen
these would still be spirals tho
Semiclassical
Semiclassical
that's with c=tan(pi/10)
Balarka Sen
Balarka Sen
21:05
yeah, better
Semiclassical
Semiclassical
main problem is that it grows rapidly due to the exponential dependence
user image
that's what i get if i go down to c=tan(pi/60)
As a final argument, from Mathworld one has: "The logarithmic spiral is also known as the growth spiral, equiangular spiral, and spira mirabilis." [emphasis added]
So I think that settles it.
Balarka Sen
Balarka Sen
proof by mathworld and mathematica
Xammm
Xammm
What's that?
Semiclassical
Semiclassical
Another cute thing from there: "The logarithmic spiral was first studied by Descartes in 1638 and Jakob Bernoulli. Bernoulli was so fascinated by the spiral that he had one engraved on his tombstone (although the engraver did not draw it true to form) together with the words "eadem mutata resurgo" ("I shall arise the same though changed")."
Xammm
Xammm
Wow
Mike Miller
Mike Miller
21:09
Just calculate the damn angles :p
Semiclassical
Semiclassical
Psh.
Balarka Sen
Balarka Sen
nah
Semiclassical
Semiclassical
I'm satisfied enough from the ODE, if I'm honest.
Now, harder question: What if we're on a sphere? (The Mathworld page has the answer)
Balarka Sen
Balarka Sen
loxodrome, iirc
Xammm
Xammm
:D
Semiclassical
Semiclassical
21:12
spoilsport
Amusingly, it's very simple on a Mercator projection. it's just straight lines.
Balarka Sen
Balarka Sen
i just remembered seeing it before
Semiclassical
Semiclassical
gotcha.
(I wonder what it is on a pseudosphere)
Balarka Sen
Balarka Sen
should still look swirly, but cluttering near the middle instead of cluttering towards infinity
Semiclassical
Semiclassical
yeah.
I'm partly wondering what happens to the spacing of the lines, since parallel lines diverge on it (negative curvature)
Ted Shifrin
Ted Shifrin
@Balarka: The curves are logarithmic spirals: $r = ce^{k\theta}$. It's more useful to eliminate the parameter and actually see the curves.
Oh, it seems @Semiclassic already said this above.
Selfless Sociopath
Selfless Sociopath
21:24
Does anyone know how to obtain $x$ when $x^x-x = 1 - \log_g(y)$?
Ted Shifrin
Ted Shifrin
@MikeM: If he gets accepted, I'll certainly make sure you know each other's names :)
@Selfless: Impossible to do so explicitly.
Zach Hauk
Zach Hauk
Hi @TedShifrin
Mike Miller
Mike Miller
@Ted: A fair enough condition.
Ted Shifrin
Ted Shifrin
Hi @Zach.
Selfless Sociopath
Selfless Sociopath
If we take $f(x) = x^x - x$, then can anything be analytically known about the inverse $f^{-1}(x)$ ?
Semiclassical
Semiclassical
21:28
In terms of Taylor series expansion, sure.
In terms of elementary functions, nadda.
Zach Hauk
Zach Hauk
@TedShifrin working my way though section 2 exercises
Ted Shifrin
Ted Shifrin
@Selfless: It's not a one-to-one function unless you limit yourself to $x>1$ or $x<1$.
Enjoying some of 'em, @Zach?
Zach Hauk
Zach Hauk
yeah :)
Selfless Sociopath
Selfless Sociopath
@TedShifrin Can this notion be translated to a finite field?
Zach Hauk
Zach Hauk
still pondering exercise 11
Ted Shifrin
Ted Shifrin
21:29
If you want to write up a few interesting ones carefully, I'll look at 'em, @Zach.
Zach Hauk
Zach Hauk
i think maybe desargues is involved, but im not sure.
@TedShifrin i have some of my solutions typed up on LaTeX, if you'd like to see them,
Semiclassical
Semiclassical
If you're asking about finite fields, you're in a much different context than the one we assumed.
Ted Shifrin
Ted Shifrin
@Zach: I'm skeptical re Desargues and #11.
Selfless Sociopath
Selfless Sociopath
@Semiclassical I realized, though I didn't want to influence the response. I often find insight from other areas of mathematics leading me to unexpected solutions to the overall problem.
Ted Shifrin
Ted Shifrin
I'm not sure I know what exponentiation means in a finite field.
Zach Hauk
Zach Hauk
21:31
> re Desargues
what?
Ted Shifrin
Ted Shifrin
#11, @Zach.
Zach Hauk
Zach Hauk
i don't know what you mean though
what is "re"?
Semiclassical
Semiclassical
well, 3*3*3=3^3 still makes sense
Selfless Sociopath
Selfless Sociopath
@TedShifrin It could be restricted to integer values (mod $2^n$ in my case)
It actually doesn't necessarily need to be a field at all
Ted Shifrin
Ted Shifrin
@Zach: re = regarding
Zach Hauk
Zach Hauk
21:35
oh, sorry :P
Ted Shifrin
Ted Shifrin
@Semiclassic: But what do you do with a finite field that is not $\Bbb Z_p$? I'm not sure what this means for other elements of $\Bbb F_{p^k}$.
Hi, @Ali. You finally got some sleep? :)
Selfless Sociopath
Selfless Sociopath
@TedShifrin Sorry, the choice of ring is rather arbitrary here. Anything finite is sufficient.
It just seems simpler to work in a field, but maybe it admits a nicer solution somewhere else!
Ted Shifrin
Ted Shifrin
I have no idea what it means, @Selfless.
Balarka Sen
Balarka Sen
I can't sleep because of the blister on my face
Ted Shifrin
Ted Shifrin
:( @Balarka
Balarka Sen
Balarka Sen
21:40
at least the doctor said it's not serious
Ted Shifrin
Ted Shifrin
I'm sure it's stress-related.
BTW, I've had cold sores and shingles ... stress caused the latter, for sure.
Selfless Sociopath
Selfless Sociopath
@TedShifrin Well my strategy is mind-numbingly basic, I'd end up defining it as an algorithm: To compute $x^n$, assume $n$ is always a multiple of the $1$ element, and then take $x\cdot x\cdots$ as many times as you have to subtract $1$ from $n$ to achieve $0$. (Or any algorithm that produces identical result)
Balarka Sen
Balarka Sen
yeah, very possible. Especially considering the history of psychosomatic diseases I have
Ted Shifrin
Ted Shifrin
@Selfless: That's fine if your ring is $\Bbb Z_m$, but won't make sense more generally.
Mike Miller
Mike Miller
I'm just surprised you're still alive.
Anis Souames
Anis Souames
21:43
Greetings Everyone :)
Selfless Sociopath
Selfless Sociopath
@TedShifrin I can give good confidence that such a definition will be useful on any ring where the rest of my crazy idea applies :P
Ted Shifrin
Ted Shifrin
Well, I've said all I have to say, @Selfless. You're on your own.
Selfless Sociopath
Selfless Sociopath
(actually I might be wrong, but I can just use Zp if it comes down to it lol, so it definitely can apply)
thanks for engaging!
Ted Shifrin
Ted Shifrin
LOL, sure.
Balarka Sen
Balarka Sen
@MikeM Working on it.
Anis Souames
Anis Souames
21:48
I would like to know how can you solve calculus test faster ? Should I get stronger at algebra ? Should I learn some silly algebra tricks ? What should I do to improve my current solving time, because even if when I try to speed up, I fall in mistakes most of the time ....
Selfless Sociopath
Selfless Sociopath
Very interesting anecdote: For odd values of $x$, the function $x^x \;(\text{mod} \,2^n)$ appears to cyclically generate a random-looking permutation of the odd values.
mick
mick
22:09
Bounty !! ( i advice Reading comments ) math.stackexchange.com/questions/1553888/…
barto
barto
If $X$ is a set, is there a name for a subset $F\subset P(X)$ such that the complements of the elements of $F$ form a filter? proofwiki.org/wiki/Definition:Filter_on_Set
something like "inverse filter" or "anti-filter"?
yes, found it: en.wikipedia.org/wiki/Ideal_(set_theory)
Sophie
Sophie
is there a better way to calculate the continued fraction of $2^{1/3}$? Which hopefully doesn't involve $2^{1/3}$ to stupidly high precision because I hit the limit with that method
mick
mick
22:49
Should i accept the answer here ?? Seems too short and sketchy to me + divergent series ?? But i do not want to be mean or ignorant !! Maybe it is ok ??
1
Q: Telescoping exercise with iterations?

mickIm assuming the identities below can be proven with telescoping techniques and / or differentiation. For $x>0$ let $f(x) = \sqrt{x + {1\over2}} ,\; f(x,0) = x,\; f(x,n) = f( f(x,n-1) )$. Now we get $$ - f(x)^4 + f(x,2)^4 - f(x,3)^4 + f(x,4)^4 - ... = 1/8 - x^2 $$ Where the LHS uses Cesàro s...

sequences-and-series polynomials dynamical-systems
Null
Null
@mick if it got you further, yes, if not it's imo no answer
you can also only upvote, but keep it the question unanswered ;)
mick
mick
@Null it is confusing to me so basically no, but Maybe my skills are to bad :/ but i assume other ppl are not getting it either.
Or Maybe you should answer ;)
Adeek
Adeek
Hi @TedShifrin
Semiclassical
Semiclassical
@TedShifrin yeah, I get it now. I was thinking of the exponent as still being in Z, when of course it would also have to be in the field
[x]^x is well defined but [x]^[x] needn't be
Sophie
Sophie
23:04
can someone describe me how the roots of $a^3+4b^3+4c^3-6abc$ look like in 3d space? I mean something like the roots of $Ax^2+Bxy+Cy^2+Dx+Ey+f=0$ are a conic and such
it is related to the problem of writing $\frac{1}{a+b2^{1/3}+c2^{2/3}}$ as $x+y2^{1/3}+z2^{2/3}$
Null
Null
23:20
is not playing a game an option in gametheory?
lo, someone upvoted a truthtable of mine haha
mick
mick
I did :)
Null
Null
@mick scary haha
mick
mick
Dont be a pussy
Null
Null
being a pussy doesn't fit well with being a vampire :D
mick
mick
Oh god
Anyway are there " proofs " of the prime twin conjecture based on divergent series ??
Null
Null
23:29
Hardy is the guy with ramunjan right?
Zach Hauk
Zach Hauk
@Null yes
mick
mick
Yes but was Hz gay ?
I wonder 😜
Null
Null
eh
haha
my conjecture is: you need much less evidence for a conjecture, than it is given by today computational standards. It makes searching for provable statements easier, but brain.exe is still neccessary :s
Mary Star
Mary Star
23:50
Hello!! Let $f : \mathbb{R}\rightarrow \mathbb{R}$ be a function with $ f(x + y) = f(x) + f(y)$ for all $x, y \in \mathbb{R}$.
I want to show that $f$ is continuous if and only if $f$ is continuous in $0$.

The direction $\Rightarrow$ is trivial.

For the direction $\Leftarrow$ : Suppose that $f$ is continuous at $0$ then $\lim_{x\rightarrow 0)f(x)=f(0)$ and from the property above we have that $f(0)=0$.
How could we continue? I got stuck right now...
Null
Null
@MaryStar but $bf(x)=f(bx)$ is not given?
Mary Star
Mary Star
@Null Do we need that property to show the continuity?
Null
Null
no, it's just that linear functions are nice ;)
@MaryStar did you try out some "counterexamples"?
Mary Star
Mary Star
No... What kind of counterexamples do you mean? @Null
Null
Null
well, you got a set of statements that $f$ has to fullfill, can you build something which satisfies those, but is not continuous everywhere?
(it helps to think of counterexamples ;) )
Balarka Sen
Balarka Sen
23:58
In this case it doesn't.
00:00 - 07:0009:00 - 19:0019:00 - 00:00

« first day (2326 days earlier)      last day (2994 days later) »