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PVAL
PVAL
00:06
I seem to have given a rather simple proof for a really nice sounding statement.
I wonder what I did wrong.
Ted Shifrin
Ted Shifrin
LOL, I've been there lots of times, @PVAL.
PVAL
PVAL
If this is correct this must be folklore.
I am almost sure it isn't in the literature and I'm sure someone has come up with before.
Ted Shifrin
Ted Shifrin
If it were folklore, wouldn't you have known it?
PVAL
PVAL
I think some people (for instance my advisor) write down a very small percentage of the things they have proven.
Ted Shifrin
Ted Shifrin
There have been some mathematicians who're notorious for that, yes.
You should ask him in this instance, I guess. The trouble with posting a question on MO is that you can end up scooped if in fact it isn't written down anywhere or even folklore.
OK, I'm out of here for now. Let me know what happens, @PVAL.
PVAL
PVAL
00:14
I like Arnold's philosophy on this. Either tell no one what you are doing or tell every single person you talk to everything you've done so no one can dispute it (he said he abided by the latter.)
Jeff
Jeff
00:57
Hi folks. May I ask what technique to use to integrate $\int \sqrt{2+2 \sin t} dt$?
Or should I ask what trig identity do you use?
Akiva Weinberger
Akiva Weinberger
Perhaps let $x=\sin t$? @Jeff
Then ${\rm d}x$ would be $\cos t~{\rm d}t$, so we'd have ${\rm d}t=\frac1{\cos t}~{\rm d}x=\frac1{\sqrt{1-x^2}}~{\rm d}x$.
MickLH
MickLH
Ooh that one is surprisingly nasty, it breaks my program! Thanks for the new test-case
Jeff
Jeff
01:13
@Akiva Working on it now. But I'm having trouble getting it into a form I can integrate.
@MickLH What program is that?
MickLH
MickLH
It's an analysis engine
Jeff
Jeff
@AkivaWeinberger I keep getting zero. Because (I didn't mention) the bounds go from $t=0$ to $t=2\pi$. Then $x(0)=0$ and $x(2\pi)=0$ and the integral becomes zero (but my TI-84 says it's 8).
MickLH
MickLH
I'm gonna go with the TI-84's answer there :P
Intuitively, I can find at least one point where your integrand is greater than zero, and so assuming you're using the positive square root it can't be zero.
Jeff
Jeff
Well, that's what I keep getting. Using Akiva's subst. and factoring inside the radical I get $$\int \sqrt{\frac{2}{1-x}} dx.$$ Then do another substitution $u=1-x$ and I get the answer $-\sqrt{8} \sqrt{1-\sin t}$. Evaluate that from $t=0$ to $t=2\pi$ and I get 0. What'd I do wrong?
MickLH
MickLH
What happens when $t = \frac{3\pi}{2}$ ?
Jeff
Jeff
01:29
the answer evaluates to 0
i don't see your point
MickLH
MickLH
I don't have a magical solution, I'm just going off my gut with where I'd start looking for weirdness
Jeff
Jeff
Oh. Well in the graph of the integrand, there is sharp point at x=4.7124. But I'm not sure why that would affect the integration.
Here's what the integrand looks like from 0 to 2pi: desmos.com/calculator/el1vfmlaux
MickLH
MickLH
So clearly, not zero :P
Ted Shifrin
Ted Shifrin
01:55
@Jeff: If I wrote the problem as $\int \sqrt{1+\cos 2\theta}d\theta$, would you have an idea? Indeed.
Jeff
Jeff
I could use a trig identity on that.
@Ted
Ted Shifrin
Ted Shifrin
So remember you can turn sin into cos and vice versa by using complementary angles.
Jeff
Jeff
But there are not trig identities I can find for 1+sin(t)
Ted Shifrin
Ted Shifrin
Aha ^^^
It is a sneaky problem, but it shows up in real life, believe it or not.
Jeff
Jeff
well, of course it shows up in real life! how do you think they discovered the homework problems in the texts? :D.... so you're saying use $\sqrt{2+2\cos\left(\frac{\pi}{2}-t\right)}$?
Ted Shifrin
Ted Shifrin
01:58
um, I meant more real than that :P
Yes, I'm saying once you figure out the cos one, you do a $\pi/2-\theta$ substitution :)
Jeff
Jeff
and then use the cosine sum identity?
Ted Shifrin
Ted Shifrin
Yes, @Jeff ... you're on it.
PVAL
PVAL
@TedShifrin My advisor actually has a construcion that implies the "simple" thing I proved was in some sense optimal.
Ted Shifrin
Ted Shifrin
And the 2's in there will work out so that you don't have any $\sqrt2$ to deal with.
Oh, cool, @PVAL. So is it folklore or not?
BTW, I hope you say hi to him for me sometime :)
Jeff
Jeff
After using $\pi/2-\theta$, use the power reduction formula? that seems a bit unwieldy (not that there's anything wrong with that)
PVAL
PVAL
02:00
I don't know I haven't talked to him yet, I just figured out that something that he did proved that you couldn't do any better than what I got. (His construction had very different motivations).
Ted Shifrin
Ted Shifrin
no, no, $1+\cos 2\theta = 2 \cos^2\theta$, @Jeff
ohhhh, cool, @PVAL
Jeff
Jeff
@Ted Yeah, isn't that a power reduction formula (in reverse)? where $2\theta = \pi/2-t$.
Ted Shifrin
Ted Shifrin
no, it's a double-angle formula. Power reduction is all with the same $\theta$, usually.
Jeff
Jeff
@Ted OK, I got the names wrong (usually I get more than that wrong :D). But in this case $\theta$ is rather cumbersome, $\theta = \pi/4-t/2$
Ted Shifrin
Ted Shifrin
Do the problem with $\cos$ in there, and then convert at the end (with the appropriate chain rule correction).
BTW, adorable kitties, @Jeff.
Jeff
Jeff
02:06
@Ted Thanks. I lost all my pics of them, and the brown one died recently. That's all I have left of her :D
Ted Shifrin
Ted Shifrin
Aww, I've lost a few, myself. My heart goes out to you.
BTW, @Jeff, with regard to the $0$ discussion up there ... Be very careful when you integrate square roots of squares. :) True/false: $\sqrt{x^2} = x$.
Jeff
Jeff
@Ted false
Ted Shifrin
Ted Shifrin
So, if you're going to do an integral, you need to write ... $\sqrt{x^2} = $?
Jeff
Jeff
$|x|$
Ted Shifrin
Ted Shifrin
Righto. The $0$ mistake comes from omitting the absolute values.
Jeff
Jeff
02:10
Of course, I never lost the square root symbol the way I was trying it.
PVAL
PVAL
My students always had trouble writing $| |$ as a piecewise function.
Jeff
Jeff
so that shouldn't have been a concern
Ted Shifrin
Ted Shifrin
well, now you know the right way to do it, @Jeff :)
Jeff
Jeff
@PVAL mine, too. even when I show them. they are like "huh"
Ted Shifrin
Ted Shifrin
yup, @PVAL ...
but a lot of your students also use $\sqrt{a^2+b^2}=a+b$. :P
Jeff
Jeff
02:12
@Ted Well, I see how to do it. I'm not actually finishing it. It's too much effort for the time I have available. Thanks!
Ted Shifrin
Ted Shifrin
LOL, sure.
It's really not hard, but ok.
Jeff
Jeff
@TedShifrin @Ted So do a lot of mine. I even get some that thing (a+b)^2=a^2+b^2.
@Ted OK. I will try it. But over the weekend.
Ted Shifrin
Ted Shifrin
I didn't get that so often, interestingly.
Akiva Weinberger
Akiva Weinberger
It's cause they think that the distributive property, $a(b+c)=ab+ac$, is a property of parentheses rather than of multiplication. I think.
Ted Shifrin
Ted Shifrin
OK, @Jeff. I'm not here to give orders (except to @Balarka).
Jeff
Jeff
02:14
I had several students use the product rule on the derivative of $\tan(7x^2)$.
Akiva Weinberger
Akiva Weinberger
'Cause the multiplication is hidden.
Ted Shifrin
Ted Shifrin
Whoa. What? DogAteMy
Very interesting comment, DogAteMy ...
Akiva Weinberger
Akiva Weinberger
Which is why they'd write $(a+b)^2$ as $a^2+b^2$…
Ted Shifrin
Ted Shifrin
How do you connect those?
Akiva Weinberger
Akiva Weinberger
'Cause "can't you always do that with parentheses?"
Jeff
Jeff
02:15
And then I have students who think the derivative of $\ln(\sin x)$ is $1/x (\cos x)$
Akiva Weinberger
Akiva Weinberger
@TedShifrin I didn't come up with this. Did you know there's a Mathematics Educators Stack Exchange? :P
Ted Shifrin
Ted Shifrin
Well, let's not spend the rest of the night talking about how students in high school and college don't understand what a function is.
CommonerG
CommonerG
Where do you guys teach?
Ted Shifrin
Ted Shifrin
Yes, DogAteMy ... I've been on there, but I don't go there frequently. I was once a math educator, you know? :D
PVAL
PVAL
indoors
CommonerG
CommonerG
02:16
:)
Ted Shifrin
Ted Shifrin
LOL @Pval
Jeff
Jeff
I teach at several community colleges in NJ. (they're desperate for cheap, part-time math teachers)
Ted Shifrin
Ted Shifrin
@Commoner: I've just retired from 34 years at UGA.
CommonerG
CommonerG
Ted, I'm from Georgia, did undergrad at GT
Akiva Weinberger
Akiva Weinberger
Oh, I thought you were still teaching?
CommonerG
CommonerG
02:17
Congratulations on retirement.
(If it is appropriate)
Ted Shifrin
Ted Shifrin
nope, DogAteMy ... only unofficially (teaching a 2-person topology class long distance) and volunteering in high schools ... and here.
Sure, thanks, @Commoner.
Akiva Weinberger
Akiva Weinberger
So… I can call you Dr. Shifrin but not Prof. Shifrin?
Heh, is Balarka in that "topology long-distance class"?
PVAL
PVAL
@CommonerG Did you ever take a course from Etynre?
CommonerG
CommonerG
I was an economics major.
PVAL
PVAL
Oh i see
CommonerG
CommonerG
02:20
Anyway, looks like he started after I graduated.
MickLH
MickLH
@Jeff I took a minute to attack your problem and I just want to encourage you. Following @TedShifrin's suggestion led me to a nice way to show that the area is 8.
Ted Shifrin
Ted Shifrin
no, no, not Balarka. He's more advanced in topology than I've ever been (except for certain aspects). Two former UGA students.
Jeff
Jeff
@MickLH Yeah, I'm on it now. But I have to type it up. I get too messy and lose my thought writing anything too long.
Ted Shifrin
Ted Shifrin
DogAteMy, I'm fine with Ted. Even most of the high school kids I'm working with call me that. ... I've never insisted on fancy titles.
@PVAL: One of my former students finished her Ph.D. with John.
MickLH
MickLH
@Jeff If it's any help to you, I did have to treat that point at $t = \frac{3\pi}{2}$ with care while evaluating the anti-derivative I obtained
CommonerG
CommonerG
02:23
He (Etnyre) has an impressive CV.
Ted Shifrin
Ted Shifrin
@Jeff: I'm always in favor of writing stuff on paper and then typing in LaTeX. Unless you get really good (as I did after several textbooks authored).
@Commoner: Yeah, he's good!
Jeff
Jeff
i'm pretty good at typing and latexing. but when i write, it gets too messy. of course, when i'm helping students i have to write. but then i (usually) know the problem in advance
MickLH
MickLH
I got two different values when evaluating the limit from each side, which was a crucial part of my strategy. Without treating that point specially, I found that my anti-derivative was periodic!
Jeff
Jeff
@Ted I just looked you up. You're a geometry specialist?
At georgia?
Ted Shifrin
Ted Shifrin
I used to be, @Jeff. I just retired.
Jeff
Jeff
02:25
Oh. congrats.
Ted Shifrin
Ted Shifrin
I still love teaching (or I wouldn't hang around here), but I decided it was time to move on to a different life.
Jeff
Jeff
i have a tutoring student who liked geometry and hates precalc. he asked if i could relate it to geometry. i failed. i couldn't.
what do you do now? what books did you author?
Ted Shifrin
Ted Shifrin
I try to draw pictures for everything, including abstract algebra. Certain things in precalc can be related, for sure, but not others (exponentials?). Books on abstract algebra, linear algebra, multivariable calculus and linear algebra mixed (more proof-oriented), and differential geometry.
Jeff
Jeff
@Ted @MickLH Well, I got $-4 \sin \left(\frac{\pi}{4}-\frac t2\right)$. But that doesn't seem right. Since it's derivative is not anything as complicated as the question. But I will point out I violated the $\sqrt{x^2}=|x|$ rule.
@Ted Oh. I'm talking about a HS student.
Ted Shifrin
Ted Shifrin
I'm currently volunteering with high school precalculus classes at a charter school, @Jeff. If he means proofs in geometry, not so much, but we can bring lots of geometric problems (similar triangles, trig) into precalculus, for sure.
MickLH
MickLH
02:30
What did you "get" that for?
Jeff
Jeff
For the integral I was trying: $$\int \sqrt{2 + 2 \sin t} dt = -4 \sin \left(\frac{\pi}{4}-\frac t2\right)$$
I didn't plug in the bounds yet. I like to do indefinite integrals before I do the definite one (call me strange)
Ted Shifrin
Ted Shifrin
No, you're right, @Jeff, but be careful with the absolute value issues.
Jeff
Jeff
@Ted I'm actually not sure how to address that. Do I just add the absolute values in this step: $$-2 \int \sqrt{4\cos^2 d\theta} d \theta = -2 \int 2\cos \theta d\theta$$
PVAL
PVAL
@Jeff There's actually many definite integrals cannot be done this way.
Jeff
Jeff
Then do the integral piecewise?
Ted Shifrin
Ted Shifrin
02:34
Yes, $\sqrt{\cos^2\theta} = |\cos\theta|$.
Or, use symmetry, and reduce the problem to some multiple of what happens where things stay positive.
OK, I have dinner guests coming over. I need to skedaddle. Talk to y'all later!
Jeff
Jeff
I'm still not getting quite the right answer. It must be the absolute value. Am I at least getting the right answer (not counting the ab val)?
MickLH
MickLH
@Jeff I have obtained a much different result
(I needed a radical to write my anti-derivative)
Jeff
Jeff
@mick Did you start with this step $$\int \sqrt{2 + 2 \sin t} dt =\int \sqrt{2 + 2 \cos \left(\frac{\pi}{2}-t\right)} dt$$
MickLH
MickLH
Very similar
Jeff
Jeff
Then next is let $2\theta = \frac{\pi}{2}-t$, so you get $$\int \sqrt{2 + 2 \cos \left(\frac{\pi}{2}-t\right)} dt = -2 \int \sqrt{2 + 2 \cos 2\theta} d\theta$$
Then factor out the 2 to get $$-2 \int \sqrt{2\left(1 + \cos 2\theta\right)} d\theta = -2 \int \sqrt{2\left(2\cos^2 \theta\right)} d\theta = -4 \int \cos \theta d\theta$$ (not counting the absolute value issue which I'll come back to later)
@PVAL What way?
PVAL
PVAL
02:42
@Jeff By first finding the indefinite integral.
There are many definite integrals with a closed form for which the corresponding indefinite integral has none.
Jeff
Jeff
Really? I like to do that to check myself. After I get the answer, I can check on WolframAlpha.
Such as? @PVAL
PVAL
PVAL
$\int_{-\infty}^{\infty}e^{-x^2}dx$
Jeff
Jeff
That's the normal distribution (almost)
OK. I'll come back to this tomorrow maybe. I have to get to work writing lesson plans now. Thanks, all.
MickLH
MickLH
@Jeff I'm skeptical of this step
Jeff
Jeff
@MickLH which one?
MickLH
MickLH
02:48
The one I aimed at, -4 cos ...
Well I guess you said "not counting the absolute value issue"
But I think you're torturing yourself by leaving that factor of $\sqrt{2}$ in there
This is the very first thing I did: $$\int_{0}^{t}{\sqrt{2\,\sin x+2}\;dx}=\sqrt{2}\,\int_{-{{\pi}\over{2
}}}^{t-{{\pi}\over{2}}}{\sqrt{\cos x+1}\;dx}$$
God, that machine-generated latex is ugly
Jeff
Jeff
@Mick i have to think about that. I've not seen this technique of putting variables in the bounds.
@MickLH Yeah, you can't even see negative signs on some of them.
MickLH
MickLH
I wrote it that way to show the thought process I used, secretly I just did indefinite integration
Jeff
Jeff
@MickLH I don't get that step at all. I don't even see the reason for writing the integral as $\int_0^t \sqrt{2\sin x + 2} dx$
I'm starting from the top again. I'm starting with $$\int \sqrt{2 + 2 \sin t} dt$$
OK. I see now (sorry for so many messages). You switched the angle, then changed to cosine.
MickLH
MickLH
Yeah, it's just $\sin(t) = \cos(t - \frac{\pi}{2})$
Jeff
Jeff
That's an unusual way of doing it (well, for me it is).
MickLH
MickLH
02:57
also I used $\sqrt{a\cdot b} = \sqrt{a}\cdot\sqrt{b}$
Jeff
Jeff
That part I figured out :D
MickLH
MickLH
You didn't remove the $\sqrt{2}$ you copied it instead
$2+2\sin(t) = 2\,(1+\sin(t))$
Jeff
Jeff
You're right. But the part I'm worried about is the bounds. $$\int \sqrt{2 + 2 \sin t} dt = \sqrt 2 \int_0^t \sqrt{1 + \sin x} dx. $$ That gives you $\sqrt{1 + \sin t} - \sqrt 2$.
MickLH
MickLH
I don't see it, how do you mean?
Jeff
Jeff
When you integrate the right side, you get some function $F(x)$. Then you evaluate it at $t$ and subtract from that evaluate it at 0, or $F(t)-F(0)$.
It doesn't equal the function on the left hand side.
MickLH
MickLH
03:06
Ah ha! Guess what?
Jeff
Jeff
what?
MickLH
MickLH
The issue you've illustrated became apparent in the next step, the way I did it.
Jeff
Jeff
oh.
MickLH
MickLH
lets simplify that just to draw some conclusions so far
with $f(t) = 1+\sin(t)$ we can more easily see that $\sqrt{2\cdot f(t)} = \sqrt{2}\cdot\sqrt{f(t)}$
Jeff
Jeff
OK. Let's try it without that fancy change of variables technique that I haven't seen before (and am now dubious of). We agree on this (obvious) first step $$\int \sqrt{2 + 2 \sin t} dt = \sqrt 2 \int \sqrt{1 + \sin t} dt.$$
@MickLH Agreed. Same thing I just typed, too.
MickLH
MickLH
03:09
Also we know that $\sin(t) = \cos(t - \frac{\pi}{2})$, so we can substitute that in
Jeff
Jeff
So we get $$= \sqrt 2 \int \sqrt{1 + \cos \left(\frac{\pi}{2}-t\right)} dt$$
MickLH
MickLH
At this point, I used a known result: $$\int {\sqrt{\cos x+1}}{\;dx}={{2\,\sin x}\over{\sqrt{\cos x+1}}}$$
Jeff
Jeff
How do we get that? by rationlizing the numerator?
MickLH
MickLH
Hmm lets put deriving / proving that off until later
I checked that result and it holds
Jeff
Jeff
OK. But I think it might be easier to let $2\theta = \frac{\pi}{2}-t$ in the prev. step and apply the trig id we were discussing earlier.
@MickLH But let's continue this way first
MickLH
MickLH
03:14
It very well may be... I didn't find any optimal route, just one of them
Ok so we substituted $x = t - \frac{\pi}{2}$ earlier, lets come back to that
Jeff
Jeff
OK, so this is what I have now $$= \sqrt 2 \int \frac{2\sin \left(\frac{\pi}{2}-t\right)}{\sqrt{1 + \cos \left(\frac{\pi}{2}-t\right)}} dt$$
MickLH
MickLH
too much! notice the result above has only integration on one side
Jeff
Jeff
OK, but instead, let $x = \frac{\pi}{2}-t$.
Oh.
OK, so now we have $$= \sqrt 2 \frac{2\sin \left(\frac{\pi}{2}-t\right)}{\sqrt{1 + \cos \left(\frac{\pi}{2}-t\right)}}$$
MickLH
MickLH
Ok, so now the roadblock issue is visible
Jeff
Jeff
oh?
I think we should have substitute $x=\frac{\pi}{2}-t$ before using that result. no?
MickLH
MickLH
03:17
We already did
You have a rational function there, which is not defined in some circumstances
Jeff
Jeff
@MickLH Oh, so you have the result directly as the one i am pointing to now
MickLH
MickLH
Yes, sorry if I wasn't clear
That's just a result I've obtained at another time
Jeff
Jeff
@MickLH You're going to fast for me. Also, I think you have the subtraction backwards in the complementary angle formula.
(Sorry)
MickLH
MickLH
It doesn't matter
$\cos(x) = \cos(-x)$
Jeff
Jeff
Ok, right
MickLH
MickLH
03:23
@Jeff Is this where we are at? $${{\sqrt{2}\,2\sin \left(t-{{\pi}\over{2}}\right)}\over{\sqrt{\cos \left(t-{{\pi}\over{2}}\right)+1}}}$$
Jeff
Jeff
Yes, that's where i'm at, too. OK, so the problem is where the denominator is 0.
MickLH
MickLH
exactly
Jeff
Jeff
or where cosine is -1, which is where $t-\pi/2 = -\pi$
plus or minus $2\pi$.
MickLH
MickLH
Right, so we encounter this undefined value once every $2\pi$
Which means that without even checking, since we are integrating over at least $2\pi$ units of $x$, we already know we will hit it
Jeff
Jeff
I think we hit it at $t=3\pi/2$.
MickLH
MickLH
03:30
That is what I got also: $\sqrt{\cos \left({{{\pi}}\over{2}}-{{3\,\pi}\over{2}}\right)+1} = 0$
So, this screws over our approach of obtaining the area by straightforward evaluation of the indefinite integral
Jeff
Jeff
actually wait. i think we get zero when $t-\pi/2=-\pi+k\pi$, right?
MickLH
MickLH
Well I'm sure there are at least countably infinite zeros, but we only really care how many are in our bounds of integration
Jeff
Jeff
so that $t = -\pi/2+k\pi = \pi/2, 3\pi/2$ within our range
if i did that right isn't it both $\pi/2$ and $3\pi/2$?
but $\pi/2$ does not give zero in bottom.
MickLH
MickLH
Let me investigate before I say anything
$$\sqrt{\cos \left(x-{{\pi}\over{2}}\right)+1}=0$$
$$\cos \left(x-{{\pi}\over{2}}\right)+1=0$$
$$\cos \left(x-{{\pi}\over{2}}\right)=1$$
$$\sin x=1$$
$$\sin \left(2\,\pi\mathbb{Z}+{{\pi}\over{2}}\right)=1$$
@Jeff
Jeff
Jeff
negative 1 on RHS
MickLH
MickLH
03:40
oops lol, well mirror the relevant parts
This is a tangent, I'm getting claustrophobic in this little tangent here
Jeff
Jeff
BTW, I did mention that this is from a polar coordinates problem. Maybe that makes it easier.
MickLH
MickLH
the points of interest are generated by $t = 2\pi\mathbb{Z} - \frac{\pi}{2}$
Jeff
Jeff
I think you overcomplicated this part. the points are when $\cos(t-\pi/2)=-1$ (just looking at the bottom. We know that cosine is -1 when the inside is $-\pi$ plus multiples of $2\pi$ (aha! there's my mistake -- it's *two*$\pi$....
therefore it's when $t-\pi/2=-pi$ which means $t=-\pi/2$, then the only point in our interval is $3\pi/2$, which is the answer we knew we should have gotten. OK.
MickLH
MickLH
So now you see why my gut wrenched about $\frac{3\pi}{2}$ initially?
Jeff
Jeff
If I'm correct, that means we can evaluate the integral results $\frac{\sqrt 2 2 \sin\left(t-\pi/2\right)}{\sqrt{\cos\left(t-\pi/2\right)+1}}$ from 0 to $3\pi/2$ and then again from $3\pi/2$ to $2\pi$. Is that right?
MickLH
MickLH
03:50
Yes that's where I'm headed with this, though we have to be very careful doing the evaluation
Jeff
Jeff
What else do we have to be careful of?
MickLH
MickLH
$\mathrm{F}(\frac{3\pi}{2})$ is not defined, and the two-sided limit does not exist either
Jeff
Jeff
Limit? we already did the integral (it was your result). what limit is left?
MickLH
MickLH
We need to use a limit because we need to actually reach the undefined point, to have correct integration
Jeff
Jeff
oh yeah. in improper integreal (duh)
MickLH
MickLH
03:54
since $\mathrm{F}(\frac{3\pi}{2})$ is not defined, we have to evaluate both $\lim_{t\uparrow {{3\,\pi}\over{2}}}{F\left(t\right)}$ and $\lim_{t\downarrow {{3\,\pi}\over{2}}}{F\left(t\right)}$
Jeff
Jeff
sigh sadly I don't have time to finish this. sorry. but i am still paying attention while you do (I realize that may not be too exciting to you). i just have a ton of work to get done
MickLH
MickLH
@Jeff Well I've already evaluated them which is why I'm sure that your TI-84 has the correct answer
Jeff
Jeff
OK (I never really doubted it). You basically took the limit of $F(t)$ as $t \to 3\pi/2^-$ minus $F(0)$ and added $F(2\pi)$ minus the limit as $t \to 3\pi/2^+$. Right?
how did you do those limits? i'm seeing an infinity at first glance.
MickLH
MickLH
Yes that's what I did, if I'm reading the + - notation correctly
Jeff
Jeff
that's debatable, since it doesn't print well. the notation $t \to 3\pi/2^-$ means $t$ approaches $3\pi/2$ from the negative side (or left side).
and $t \to 3\pi/2^+$ means approach the value from the positive side.
MickLH
MickLH
04:02
yes that's what I did
Jeff
Jeff
@MickLH I've never seen your notation before. I like it better.
How did you do that limit? because I'm seeing 0/0 at first glance. did you rationalize the denominator?
MickLH
MickLH
My notation probably makes someone out there cringe lol
Jeff
Jeff
i like yours better. it's easier to read and understand
MickLH
MickLH
I cheated on the limit and used another known result lol
Jeff
Jeff
how would you do that limit had you not known that?
MickLH
MickLH
04:14
Well it's not comprehensive, but I re-wrote the point of interest as $$\sqrt{8}\,\left(1-{{\sin \omega}\over{\sqrt{1-\cos \omega}}}\right)$$
MickLH
MickLH
04:25
Bleh, I don't want to derive it. Computer algebra confirms the result, and I'm not sure you're even here anymore anyways @Jeff $$\lim_{\omega\rightarrow 0}{\frac{\sin \omega}{\sqrt{1-\cos \omega}}} = \pm\sqrt{2}$$
Jeff
Jeff
I'm paying attention. but i understand if your done for the night. thanks very much for your help.
@Mick
MickLH
MickLH
Well I'll need to get a glass of water but I'll be around for at least a couple more hours
Jeff
Jeff
@mick Thanks for helping. :D
MickLH
MickLH
np! hope it gets you somewhere
Jeff
Jeff
i learned something from it. mostly an integration technique. but also a reminder of improper integrals (which I'm probably going to have to teach this summer, anyway).
MickLH
MickLH
04:57
@Jeff I couldn't resist poking at it again... the limit can be evaluated just using the fact that $\cos(2x) = 2\cos^2(x)-1$
Jeff
Jeff
how did you use that?
MickLH
MickLH
I massaged the expression in a way that I ended up with the part that goes to zero on the top and bottom of the ratio
Then I just let them cancel each other, and evaluated what was left as usual
MickLH
MickLH
05:15
Forgive the latex bombing please:
$$\mathrm{limit}={{\sin {\omega}}\over{\sqrt{1-\cos {\omega}}}}$$
$$\mathrm{limit}^2={{\cos \left(2\,{\omega}\right)-1}\over{2\,\left(\cos {\omega}-1\right)}}$$
$$\mathrm{limit}^2={{\cos \left(2\,{\omega}\right)-1}\over{2\,\left(2\,\cos ^2\left({{{\omega}}\over{2}}\right)-2\right)}}$$
$$\mathrm{limit}^2={{\cos \left(2\,{\omega}\right)-1}\over{4\,\left(\cos \left({{{\omega}}\over{2}}\right)-1\right)\,\left(\cos \left({{{\omega}}\over{2}}\right)+1\right)}}$$
$$\mathrm{limit}^2={{2\,\left(2\,\cos ^2\left({{{\omega}}\over{2}}\right)-1\right)^2-2}\over{4\,\left(
GGG
GGG
Define $f: \mathbb{Z} \to \mathbb{Z}$ via $f(n) = n^2$ for all $n \in \mathbb{Z}$. Why does $f^{-1}(\left\{0,1,2\right\}) = \left\{0,-1,1\right\}$? The definition I'm using is $f^{-1}{(T)} = \left\{a \in A: f(a) \in T \right\}$ so we have $f^{-1}({ \left\{0,1,2\right\} }) = \left\{n \in \mathbb{Z}: n^2 \in \left\{0,1,2\right\} \right\}$. So I could think about this as all the integers whose squares is the set $ \left\{0,1,2\right\}$ but nothing I square would give me $2$.
L33ter
L33ter
06:00
how can I determine that there must be 30 distinct polynomial over F_2 of degree 8.
Eric Stucky
Eric Stucky
irreducible, presumably?
L33ter
L33ter
yeah
@EricStucky
I got there can be no more than 2^6 = 64
Eric Stucky
Eric Stucky
I think there is a general formula which you might try to prove
let me see if I can find it
Yeah here it is: it's $\frac1n\sum_{d|n} \mu(d) q^{n/d}$ for irreducibles of degree $n$ over a field with $2$ elements
If you specialize to $n=8$ then the sum has only two terms: $d=1$ and $d=2$, so it's probably easier to do that than the general case, actually.
Rajesh Dachiraju
Rajesh Dachiraju
Can you comment on this answer?
0
A: A problem on real valued functions in $\mathbb{R}^2$ with least variation

Rajesh DachirajuI roughly sketch a solution without a proof, and also a possible minimum possible value for total variation of $f$. Let $f$ assume values of $J$ on the boundary curve $\alpha$. We construct infinite number of scaled down versions of the curve $\alpha$ with scale factor ranging from $1$ and conve...

I want to know if its correct or any mistakes
L33ter
L33ter
I have an idea how many ways can I choose 4 things from element of 8 ? well, it is (8,4)
Because irreducible polynomials must be of form x^8 + a_7x^7 + ... + a_1x + a0
polynomial is irreducible when it has a linear root
reducible
I meant
since we are in binary those x^n doesn't do anything
hm 1 sec
L33ter
L33ter
06:55
@EricStucky here?
MichaelMitchell
MichaelMitchell
07:18
hey
im having a little trouble understanding why in Z[x]
well
how can you show that the ideal (2, x) cannot be generated by one element?
Tobias Kildetoft
Tobias Kildetoft
07:55
@MichaelMitchell That element would have to divide both $2$ and $x$
So I noticed a paper today on arXiv that looked interesting. When I was about to put it in the correct folder based on the authors I realized that one author is called Clinton Boys. That has got to cause some problems with google searches and such.
MichaelMitchell
MichaelMitchell
@TobiasKildetoft Thanks!
@TobiasKildetoft So if $d | 2$ and $d | x$, would that mean $d$ is either 1 or 2?
Tobias Kildetoft
Tobias Kildetoft
@MichaelMitchell if it divides $2$ then it is $\pm 1$ or $\pm 2$.
But $2$ does not divide $x$.
MichaelMitchell
MichaelMitchell
why can we say that?
Tobias Kildetoft
Tobias Kildetoft
@MichaelMitchell well, we know this is true for integers, so we just need to rule out non-constant polynomials. But there it is clear by considering the degree
(if $f$ divides $g$ then $f$ has at most as large degree as $g$).
MichaelMitchell
MichaelMitchell
I don't understand, in this case isn't 2 degree 0 and $x$ degree 1? So 2 should divide $x$?
Tobias Kildetoft
Tobias Kildetoft
08:07
@MichaelMitchell that was a necessary, but not sufficient criterion
MichaelMitchell
MichaelMitchell
:(
sharaf zaman
sharaf zaman
check this link math.stackexchange.com/questions/1598719/… and see the last comment of answer
anyone has seen??
Tobias Kildetoft
Tobias Kildetoft
@sharafzaman seen what?
sharaf zaman
sharaf zaman
@TobiasKildetoft the link i sent see the last comment under answer
Tobias Kildetoft
Tobias Kildetoft
@sharafzaman what about it?
sharaf zaman
sharaf zaman
08:16
@TobiasKildetoft limits
Tobias Kildetoft
Tobias Kildetoft
@sharafzaman Please ask a full question
sharaf zaman
sharaf zaman
@TobiasKildetoft Assuming you have a finite sum, we can have sum of limits equal to limit of sums if each of the limits in the expression converges.
then what happens for infinite sum
@TobiasKildetoft ??
Tobias Kildetoft
Tobias Kildetoft
@sharafzaman Pretty much anything could happen, depending on the sum
sharaf zaman
sharaf zaman
@TobiasKildetoft did you see the answer and question?
Tobias Kildetoft
Tobias Kildetoft
@sharafzaman briefly. Why?
sharaf zaman
sharaf zaman
08:30
in the answer it is given"Because the number of terms goes up exactly as the size of each term goes down." does this mean if we sum up all the small $\frac{1}{n}$ this will tend to 1
Tobias Kildetoft
Tobias Kildetoft
@sharafzaman Depends on how many you sum. Please just ask whatever question you have precisely.
Josué Molina
Josué Molina
What topological property do metric spaces have that makes sequential compactness and compactness equivalent?
Is it that they are Hausdorff?
sharaf zaman
sharaf zaman
@TobiasKildetoft i am having exactly the same question as given in the link math.stackexchange.com/questions/1598719/…
Tobias Kildetoft
Tobias Kildetoft
@sharafzaman and in what way does the answer not help?
sharaf zaman
sharaf zaman
@TobiasKildetoft i didn't understand answer you please explain that!
Tobias Kildetoft
Tobias Kildetoft
08:34
@sharafzaman which part of the answer?
sharaf zaman
sharaf zaman
@TobiasKildetoft you explain the whole answer!
Tobias Kildetoft
Tobias Kildetoft
@sharafzaman No, the answer looks fine to me, so you need to explain what part you are having trouble with
sharaf zaman
sharaf zaman
@TobiasKildetoft "Because the number of terms goes up exactly as the size of each term goes down" this part
Tobias Kildetoft
Tobias Kildetoft
@sharafzaman Just ignore that part. It is specified what he means on the line just below it
sharaf zaman
sharaf zaman
@TobiasKildetoft the next line he has just given the general representation that doesn't explain my answer
Tobias Kildetoft
Tobias Kildetoft
08:39
@sharafzaman The next line is quite clear to me, so again you need to explain your problem with it
sharaf zaman
sharaf zaman
@TobiasKildetoft i think i got it by reading the comments again and again
GGG
GGG
09:02
Hello!
Suppose we have a pair of functions $f: A \to B$ and $g: B \to A$ such that $g \circ f = 1_{A}$. I've read that $f$ has a left inverse if and only if $f$ is injective. I've proven the $ \Rightarrow$ direction. How do I prove the $\Leftarrow$ direction?
Tobias Kildetoft
Tobias Kildetoft
@GGG To make a left inverse, you just need to pick what each element in the image is sent to and then send the rest wherever
Huy
Huy
@DanielFischer: "if eigenfunctions (of the Laplacian) are our aim, we first need to show compactness of the inverse". here, is compactness of the inverse likely meant to be that the image of any bounded set under $\Delta^{-1}$ is relatively compact? or rather $(\Delta - \lambda)^{-1}$ in this context?
Daniel Fischer
Daniel Fischer
09:20
@Huy I don't know.
GGG
GGG
09:36
@TobiasKildetoft how would you write that? Suppose $f(a) = f(a') \implies a = a'$ for all $a' \in A$. Then by definition of identity mapping, we have the map $1_{A}: A \to A$. Also if we have a function defined by $f: A \to B$ then $f \circ 1_{A} = f = 1_{B} \circ f$. Therefore there exists $h: A \to B$ such that $h \circ f = I_{A}$.
For all $a,a' \in A$ I meant.
Tobias Kildetoft
Tobias Kildetoft
@GGG You have not actually written what I said. You need to construct that left inverse
GGG
GGG
@TobiasKildetoft Oh, I see what you mean now I think. I'll try to construct it.
Huy
Huy
10:04
@DanielFischer: no problem. something else I'm wondering: the Sobolev space $H^1$ is often defined as the completion of $C_c^\infty$ with respect to the Sobolev norm. what happens if I instead consider the completion of $C^\infty$ with respect to the same norm? will I get something bigger or end up with the same space?
Daniel Fischer
Daniel Fischer
10:19
@Huy The Sobolev norm isn't finite on $C^{\infty}$ in general. If $\Omega$ is a bounded region, then one can look at the completions of $C_c^{\infty}(\Omega)$ and of $C^{\infty}(\overline{\Omega})$ with respect to that norm. The first is often denoted by $H_0^1(\Omega)$ and the second by $H^1(\Omega)$. These are different spaces, $H_0^1 \subsetneqq H^1$.
Regardless of what $\Omega$ is, the completion of $C_c^{\infty}(\Omega)$ with respect to the Sobolev norm is often called $H_0^1(\Omega)$, and $H^1(\Omega)$ is often defined in a different way, as the space of square-integrable functions whose first distributional derivatives are given by square-integrable functions, for example. Then typically you have $H^1_0(\Omega) \subsetneqq H^1(\Omega)$, but $H^1_0(\mathbb{R}^n) = H^1(\mathbb{R}^n)$.
But notations for Sobolev spaces are a terrible mess, everybody uses different conventions.
(and different definitions)
GGG
GGG
@TobiasKildetoft Suppose $f$ is injective. Define $g(a) = a'$ if there exists $a' \in A$ such that $f(a') = a$, in which case we have $g \circ f(a) = g(f(a)) = g(a) = a'= 1_{A}.$ If not, suppose that $\alpha \in A$. We say that $g(a) = \alpha$, in which case $g \circ f = \alpha \circ f$. However, I can't get this equal to the identity.
Tobias Kildetoft
Tobias Kildetoft
@GGG when considering $g\circ f$ it doesn't matter what happened to those things no in the image of $f$ (as whatever you evaluate the composite function on, it will involve evaluating $g$ at something in the image of $f$)
GGG
GGG
10:36
Ah, I understand. Many thanks @TobiasKildetoft
Jessy Cat
Jessy Cat
0
Q: Find and sketch the image of the straight line $z = (1+ia)t+ib$ under the map $w=e^{z}$

Jessy CatI need to find and sketch the image of the straight line $z = (1+ia)t +aib$, where $-\infty < t < + \infty$, $a,b\in \mathbb{R}$, and $a \neq 0$, under the map $w = e^{z}$. In order to accomplish this thus far, I have substituted the expression for $z$ into the expresison for $w$ to yield $...

complex-analysis complex-numbers transformation parametric
I am so very, very confused :(
Please take a look at my question and see if you can help!
Jessy Cat
Jessy Cat
10:52
Maybe it's a bad time of morning to post a question on Stack Exchange.
So far, that question has only had 3 views :(
GGG
GGG
@JessyCat I've noticed that when it's late in North America there's less activity in the site.
Jessy Cat
Jessy Cat
@GGG, yeah, it's awful.
Hopefully it gets some attention.
Anyway, I've got to get ready to go to school.
Huy
Huy
11:47
@DanielFischer Thanks for your answer, and I agree about the terrible mess.
GGG
GGG
12:21
Below I'm trying to prove that $f$ has a right inverse if and only if $f$ is surjective.
Suppose $f$ has a right inverse $g$. To show that $f$ is surjective, we need to show that for all $y \in B$ there is $x \in A$ such that $f(x) = y$. If $y \in B$ we have $y = f(g(y)) $ since $f \circ g = 1_{A}$. Therefore $y$ is of the form $f(x)$ for $x = g(y).$ Hence $f$ is surjective.
To prove the converse, suppose that $f$ is surjective. Let $\alpha \in B$. Since $f$ is surjective, there exists at least one element $x$ such that $f(x) = \alpha$. Choose the minimum of these and call it $x_0$. Define $g(\alpha) = x_0$. Then we have $f \circ g = f(g(\alpha)) = f(x_0) = \alpha = 1_{A}.$
Tobias Kildetoft
Tobias Kildetoft
@GGG What do you mean by the minimum? Have you put some well-order on the set?
GGG
GGG
@TobiasKildetoft You're right. I should have said "choose one of these".
Tobias Kildetoft
Tobias Kildetoft
@GGG It amounts to the same thing (applying axiom of choice in some form).
GGG
GGG
@TobiasKildetoft How do I fix this?
Tobias Kildetoft
Tobias Kildetoft
@GGG You can't (i.e. you will need to invoke choice to do this)
GGG
GGG
12:32
That's surprising to me!
Tobias Kildetoft
Tobias Kildetoft
@GGG Well, you might be able to get away with a bit less (though as far as I recall, it is still open how much less, if at all)
Agawa001
Agawa001
13:15
@robjohn how long hav u not seen chris so far ?
skull petrol
skull petrol
aka the artist formerly known as...
robjohn
robjohn
@Agawa001 I haven't seen her here for over a week.
@Agawa001 But she's been on the main site an hour ago.
skull petrol
skull petrol
How about anon?
Mithlesh Upadhayay
Mithlesh Upadhayay
13:31
Hello everyone, would you like to check this shortest path question.
0
Q: Computing shortest path including specific edge

Mithlesh UpadhayayConsider the weighted undirected graph with $4$ vertices, where the weight of edge $\{i, j\}$ is given by the entry $W_{i, j}$ in the matrix $W$. $$W = \begin{bmatrix} 0&2&8&5\\ 2&0&5&8\\ 8&5&0&x\\ 5&8&x&0\\ \end{bmatrix} $$ The largest possible integer value of $x$, for which at least one short...

algebra-precalculus discrete-mathematics graph-theory arithmetic trees
robjohn
robjohn
@skullpetrol Not since Dec 29.
GGG
GGG
Problem: Prove that if $g \circ f$ is injective then $f$ is injective. Why is the proof below wrong?

Proof: Let $g(x) = b$. Then $g(f(x)) = b$ and by injectivity $f(x) = b$ which implies $x = b$.
robjohn
robjohn
13:47
@GGG why does $g(x)=b$ imply that $g(f(x))=b$?
what you want to show is that if $f(x)=f(y)$, then $x=y$.
GGG
GGG
13:58
@robjohn what I haven't quite grasped is how to infer $x = y$ from $g(f(x)) = g(f(y)) \implies f(x) = f(y)$
00:00 - 14:0014:00 - 20:0020:00 - 00:00

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