How to see a sphere in 4D

replace the a in math with e and the channel has an insane glow up

this video explained in one sentence: We show that 1+1 is intuitively 2, then we use a simple miracle whose explanation is beyond the scope of this video and wow: finished!

As a 4 dimensional being I see this as an absolute win.

I wish the connection between the Gaussian pulse and the surface area of a n-dimensional sphere was explored more

Good video, but there are small things you could improve to engage less knowledgeable people in the audience. For the integral that defines the gamma function, you could show why the integral is related to factorials by doing some integration by parts and showing how the factorial gets built up. From there you can just use (n-1)! directly, and only then say that since the integral doesn't care about having non-integer inputs, it actually extends the factorial and is known as the Gamma function. That makes it softer on people who know less about special functions. Just some feedback, but other than that I enjoyed the video

A thoroughly entertaining video. I realized after 10 seconds that while I understood the meanings of the individual words you used I had no clue whatsoever as to what you were actually talking about. Couple that with formulas that looked like they should have been etched in a sword made it even more enjoyable. You obviously know your subject matter. But for me, this video was akin to watching the 'Dream sequence' in 2001 while listening to Shakespeare in Mongolian.
Bravo!

I enjoyed it very much. Although I really do not have much understanding of proofs and those kinds of mathematical concepts, I appreciated the explanation of the formula for areas of circles and sphere of all dimensions.

It doesn’t need to make sense, it’s just so satisfying to watch math mathing.

1:44 This proves A = rC/2, however circumference C is often found as a derivative of area A with respect to radius.
Assume we do not know that C is linear with respect to r.
C = f(r) = dA/dr = C/2 + r/2 dC/dr --> C = r dC/dr --> C/r = dC/dr But we only know that C = f(r) not that C = pr for some constant p
d^2 C / (dr)^2 = -C/r^2 + 1/r (dC/dr) = -C/r^2 + 1/r (C/r) = -C/r^2 + C/r^2 = 0
Now we know that dC/dr is constant, because the second derivative is 0. Hence we can say C = pr, p = C/r = dC/dr. And pi would be defined as p.

I loved this video, and I'd love to see more like it in the future. I only wish I understood more than a quarter of it...

❤an interesting approach. Thank you very much publisher

The title suggests a gentle, intuitive visualization technique or at most some simple geometrical proof... The content is anything but! Nice proof, but false advertising haha-I almost didn't click because I thought it was going to be yet another "imagine a balloon getting big and then getting small again" video

What a coincidence that the Gaussian bell makes an appearance here... but wait, there are no coincidence in math so there must be a reason!... I get that you might not want to get into the details, but it could've been an opportunity to pose that question to the audience (why are these two things related?)... Also, it would have been nice to talk about how your formula also works for the three dimensional sphere (there you could have talked a bit more about the gamma function)... Cool none the less!

The title: “How to see a sphere in 4D”
The video: “Here’s the equation for a Hypersphere’s volume, the visualization is up to you.”

This video is the equivalent of a Minecraft video where the person does some building off camera.

wow that was so elegant!

Nothing in this video is about visualisation as is implied by the title and the intro.

Hi, I'm Aryd from Indonesia.
I have a question for u, sir.
I found the n-dimensional Area of Sphere is really fascinating, but when I checked the coefficients for the r^n, it starts to decline after n approx 5.257 and converges to zero as n increases. Does it means our universe is actually shrinking after the 5th dimension, or is it possible that sphere doesn't exist in such a very high dimension?

Trying to understand a 4D sphere, in a 3D world, on a 2D screen, with my 1D brain.

Dude you destroyed our Bain 💀

Definitely deserves more subscribers. Very nice voice and good explaining (I think)
(Not the biggest math guy XD)

I have no clue what I just watched but seems like it makes sense

Interesting stuff man

at the end i would've liked to see the equation applied to the 3rd dimension, as on first glance it doesnt seem to work.

The urge to become a math genius after watching this kind of videos is insane 😅

How would this formula be applied when you go above the 4th dimension? It seems like the formula is limiting to the 4th dimension and below. Correct me if I'm wrong though

You forgot to mention what software did you use to make your animations. Great video.

Scientists need this bro

I was with you Up to the third dimension

this is the man teaching me 4d in a 3d world in my 2d screen in my 1d brain😅😅😅😂😂😂😂

Also, there are 4D spherical coordinates as well as the standard 4D Cartesian/Minecraft, polar, and cylindrical coordinates. There are also toric coordinates, that uses tori, or circles with 2 radii, the most common cross-section of a torus is a donut. The formula for volume in 4D spherical coordinates are ⨌(р³ * sin²(φ) * sin(ψ))dрdφdψdθ, where:
w = р * cos(φ)
ρ = р * sin(φ)
z = р * sin(φ) * cos(ψ)
r = р * sin(φ) * sin(ψ)
x = р * sin(φ) * sin(ψ) * cos(θ)
y = р * sin(φ) * sin(ψ) * sin(θ)

Good video. Now do the Mystery of √ -1
lemme see how much of a genius you really are.

at 7:00, the gamma function has input z instead of n

I feel incredibly dumb watching this video...
And I love it. It means I have something to learn still!

You haven’t defined the volume for a 4D sphere though
2D sphere has an area, 3D has a volume. It is not immediately clear what “volume” would mean in 4D

как работает формула (на 9.20) при n=3?

wow great knowledge . who wrote the script is amazing.

nice🎉

love your channel name 😂

So to prove the true dimension of a foreign sphere we could attempt to measure it and see how it matches these values. However, possible not all dimensions contribute mass. And in fact most won’t. More likely forms instability governing harmonics. Static. Radiation. Hums. The whoville.

4D sphere is called glome, it is possible to move in three directions on the surface and not get any closer to the center of the glome

Im your 999th subscriber🙂

underrated

We can generalize further by going to different norm-balls. This video covers the 2-norm but we can also do the 1 norm up to the infinite norm balls.

its really not that hard to make a cross sectional visualization that at least matches the video title

I'll give that the gamma function is the most popular extension of the factorials, but I'd argue it's _not_ the most useful. _That_ honor goes to the pi function (no relation to the other pi... mostly). The difference between the gamma function and the pi function is that Π(n) = n! for all ℕatural numbers n, also meaning that Π(z) = Γ(z + 1). This has the nice bonus of simplifying the integral slightly by replacing the t^(z-1) with just t^z.
(n/2)Γ(n/2)? You mean Γ(n/2 + 1) = Π(n/2)?

instructions unclear:my brain exploded

So what does it look like?

the fourth dimension is merely the variability of the third dimension and therefore stands for the meter value of time in our physical construct of the universe. If you imagine a cube whose vertices are all expanded by one, you get a self-contained teatract, theoretically a cube that has itself as its core. this says that the fourth dimension is first the mutability of all things and can even cause atoms to exist multiple times even though they are all one and the same and have the same origin

Wow

I think like the 1 d sphere have negligible breadth , 2d sphere have negligible height then 3d sphere must have some negligible 4d quantity . All we have to do is to find that quantity and put limit from zero to infinite to get a 4d sphere.

Some random creature in 2D:
"How to see circle in 3D"

Amazing 🫡🫡🫡

using this, we can see what 4d looks like. Example: if we can put a 3d object in 2d ( drawing a sphere on paper ) then we can theoretically draw a 4d sphere. Any objections?

crystal math more like crystal meth(ok just joking, love your videos)

No visualization is shown in this video. It's just a mathematical derivation of the volume. Also the text-to-speech isn't great.

alternative title: how to pass a math test in 9 minutes

THE POWER OF TWWWOOOOOOOOOOOOOOOOO- 5:13

why is the title how to SEE it in 4d? I don't see it in 4d at all, we just got the volume of it

Your math's blowing my mind.

My brain is melting.

Well the question lies... Does it really change its shape or does it change its shape exclusively in other dimensional territories...

that sphere at the start made me think there were smudges on my screen

wow

Crazy to think that we are actually watching a 4d representation on a 2d screen, which realistically is just 1 dimension of pixels at any given time that scan down really fast through time. But further more, it's actually 0 dimensional pixels quickly firing down a 1 dimensional line and then bumping down a notch 100s of times per second.

👍

if n is always a whole number, why would you use the gamma function instead of the regular factorial?

What is R and why with respect?

It's really interesting. I will work with my imagination to imagine 4 dimension in my brain. I guess it's could be done, but really challenging and useless...

the whole time I watched was me trying to comprehend what you were saying

He really titled it “how to see a 4D sphere” instead of “how to find the volume of a 4D sphere” 💀

ok, pero... como se mira la esfera de la cuarta dimensión?

I feel smart when i see an number😊

Me:*confused unga bonga sound*

I don't have enough knowledge to understand this knowledge

I feel like the establishment of all the equations after 3D was sort of arbitrary. Like “here’s this new equation”

There was no proper visualization/equation explanation for the formulae, hard to understand

Dude, the title is misleading. There was no attempt whatsoever to visualize a 4D ball.

I think that there is no 1d because if you think that 1d is a line it have some width so that we can se it otherwise we cannot see it.😊

How about 5th dimension

👽: damn, they found our hiding spot

I like your funny words magic man

"the square root of pi" is the mathiest thing i have ever heard

fun fact: its impossible to draw an 1D line in our 3D universe

What about 0d 4:27

i just spend 10 minutes to not see an 4d sphere

This video proves the guys at crystal math are on crystal me-

When eveything became pi, my braincells turned of.

😵‍💫

Why leave so much explanation out? Like where do you suddenly get d from?

Expected a video on how to smoke meth, hasn’t disappointed so far

As a person in preparatory 3 my brain explode my teacher will suffer to make me understand

I feel bad for the 4 dimensional beings that have to learn how to calculate the area of a sphere in school for their homework

I read a paper on hyperspheres, but forgot which dimension has maximum volume.

What is 2^53|~5

and kids, this is how we learned about the glome, any questions?

My 11th grade ass is watching in awe and stupidity

i didnt get anything but ty bro👍

nobody can see 4th dimension
we can observe it only in our imagination
but i'm sure hypersphere is lots larger because there's more space for it to exist
i like geometric but really bad at math numbers

What about 5d 3:38