That's not what you said in the video. REFILM!

You confused me for 5 minutes.😡😡😡. Thnx for such an amazing video.😊😊😊

Losing points in style!

Why can we use this when the formula only holds true for abs x < 1?

@@JensenPlaysMC int from 0 to 1

agree

I agree, and there was some glare over some of what you wrote.

I was taught that method before i was taught the more general method

I did!

Yeah, he was so happy with this beauty, that he missed that little "2" at the right upper corner of pi :)

that I´d love to see

Interesting, huh?

@@drpeyam yh it really is.

Abidur Rahman It makes sense because 1/N^2 becomes very small for large values of N and the only real contribution is 1/1^2 which is 1, and that is contributed to the odd part.

Thats kinda obvious, because the sum of all reciprocal even squares 1/(2n)^2 is 1/4 of the sum of all reciprocal squares

@@fenhirbr well yh, if you do the calculation it's obvious, but if you looked at the series and compared them term by term, you can see that the odd series would be bigger- but 3 times bigger? 🤔

Sine and exponential functions are not just related, they are the same thing! sin(x) = (e^(ix) - e^(-ix))/(2i) See this blog post for a more in depth explanation of the relationship between pi and e. affinemess(.)quora(.)com/What-is-math-pi-math-and-while-were-at-it-whats-math-e-math

@@martinepstein9826 i know this. Euler's formula is very famous in this regard. I mean the real analysis and in my opinion, the analysis of complex numbers , although it has many beauties but it is merely a shortcut tool and I do not find a clear meaning in the complex numbers. And if you find a clear meaning in these numbers or you know more about the philosophy of introducing them or you knwo a book about the history of the emergence and evolution of these numbers please introduce it to me too.

Well technically you can’t...

Huh, so is it only in some situations that you can treat differentials as variables? In class we are just now learning about separable differential equations and my teacher just says that it's legit to multiply by dx on both sides (then integrate) in stuff like: dy/dx = 1 How do I know when treating differentials like this will yield the correct result, and when it is wrong to do. Is there some way to prove this?

​@@whatsup7341 There is a theory where it gets really close to treating differentials as "variables" which is the theory of differential forms. This tool is commonly used in fields like thermodynamics, statistic physics, general relativity and differential geometry as well as multivariable calculus. However it has to be handled with care. But for example lets say that we have some differentiable function f in 2 variables f(x,y) and you want to know the differential along a way s (df/ds) then you might know df/dx and df/dy so you can write: df = (df/dx) dx + (df/dy) dy Next you know how x and y change along the way s so you know dx/ds and dx/dy so you can write: dx = (dx/ds) ds and dy = (dy/ds) ds Then from that you get: df = df/dx dx/ds ds + df/dy dy/ds ds = (df/dx dx/ds + df/dy dy/ds)ds so "dividing by ds" will give you df/ds. However this is not really what you are doing and there are some subtleties.

Yeah but then with the straight board I’m covering up all my writing since I’m left-handed

But you could just move around if necessary. I couldn't read some of this at any time. So I think that would help. If they need to pause they can.

Thank you :)

I can’t find the link any more :/

@@drpeyam guess what I just found: www.overleaf.com/read/dqspcpbnqyym

Different way though

Beautiful!

Amazing!

I also got that after some time (x/sinh(x)), but I didn't really know how to proceed

I tought about that as well. that would imply that the graph is symmetric about the line y = x. Perhaps we could go somewhere from there?

@@GusTheWolfgang The only way I can think to use the symmetry is to divide the region into 3 pieces; a square in the lower left and two identical pieces to the right and on top. The square has a side length of ln(1+sqrt(2)) so if we could integrate from this lower bound instead of 0 then we could find the whole area easily.

All I know is that it is it's own inverse.

I'm late to this, but for an integral to converge you only actually need (a,b) not [a,b], so you don't need to include the end points. This means we don't actually have to use 1, it is essentially acting as a supremum.

If w=ln(1+u), dw=1/(1+u) du, not just 1/u.

Danke!!! Und ich weiß 😫

If it doesn't converge only at a single point, or more broadly a "set of measure zero" (cf. "Lebesgue integration"), the final result will not be affected.

@@floydmaseda ah. Cool

@@floydmaseda could you explain that to me better? cant wrap my head around why

@@JensenPlaysMC if youre alive I'll explain

Ok

try substituting the whole function, to get this to be ∫_0^∞ x/sinh(x)dx

If v=ln(1+u), dv=1/(1+u) du, not just 1/u.