@@jaimedeleon1194 *Revelation 3:20* Behold, I stand at the door, and knock: if any man hear my voice, and open the door, I will come in to him, and will sup with him, and he with me. HEY THERE 🤗 JESUS IS CALLING YOU TODAY. Turn away from your sins, confess, forsake them and live the victorious life. God bless. *Revelation 22:12-14* And, behold, I come quickly; and my reward is with me, to give every man according as his work shall be. I am Alpha and Omega, the beginning and the end, the first and the last. Blessed are they that do his commandments, that they may have right to the tree of life, and may enter in through the gates into the city.
I just want to bring attention to the fact that the music effects are synchronized with the visuals, and that makes this video so much better than anything else I've seen about fractals.
I'm guessing the pitch amplitude was factored to the brightness of pixel. Dark blue = low pitches, white = high pitches, black = quiet. If I was going to guess, those relative pitch volumes would be normalized to a reference point of the appearance of the standard Mandelbrot set, right?
@@Phriedah hehehe close enough :) just to be clear, every single automation to every single effect or synth parameter was drawn by hand because I hate myself with the fury of a thousand suns 🥰 but yes, I opened and closed a low pass filter, amongst the other things,according to how jagged was the main part of the fractal (i know it’s infinitely jagged anyways but you know what i mean). But there’s no precise, “scientific” mapping.. it’s always important to keep a human touch! (Although we are planning to automate such things a bit more for next videos, fingers crossed)
The FX on the music that plays when the mandlebrot morphs - rapidly twisting the Delay knob of a reverb plugin to get that stutter - is a fucking genius use of the effect. Hats off
@@6884 Where are you going after you die? What happens next? Have you ever thought about that? Repent today and give your life to Jesus Christ to obtain eternal salvation. Tomorrow may be too late my brethen😢. Hebrews 9:27 says "And as it is appointed unto man once to die, but after that the judgement
make z and c parameters, I think that would work Edit: I was wrong in many ways about this oh well maybe making Re(z),Im(z), and Re(c) dimensions and so that it’s “complete”, Im(c) time would work?
AHHHHHHH MY BRAINS HURTS Every day I grow sadder that we don’t exist in higher dimensional space because of how much beauty there is in higher dimensional math
As a person who used to develop programs making Mandelbrot sets and other fractal renderings in the early 90s, I know first hand how incredibly CPU/GPU intensive these animations are compared to back then. For perspective a single frame of 640x480 pixels with 16 colors on my Intel 386sx 20MHz from 1991 would take 4 hours or so to render. Granted back then if I had a math coprocessor it would have been much faster even then but this rendering here is thousands of times more complex and animated! I’m not sure this could have been calculated in a life time on the old system. How far we have come! Great video
I had the Mandelbrot algorithm in BASIC which I would try on various systems. 1st was a Sinclair QL which took 24 hours to draw a whole Mandelbrot set in 512x256 4 colours, 8 hours running the algorithm in compiled Pascal. Then there was my Epson PX-8 running the algorithm in Microsoft BASIC on its 640x64 mono screen. That also took a day just to generate a 64x64 low res set. Then there was the Acorn A3000, a RISC based system running BBC basic on the forerunner to the ARM processors we all use today. That same algorithm generated the set in 640x256, 256 colours in a little less than 4 hours. Beyond that I had discovered Fractint on PC which generated a set in an instant.
Fond memories of that one 90s screen saver that would slowly zoom in on random part of the Mandlebrot set, subject to a few decades of Moore's Law. Incredible work; thank you for it.
oh my god, man, the audiovisuals.... I wasn't prepared for music frequency filter parameters to change with the parameters on the screen. thats such a great touch
the sound design on this is amazing, really well thought out, it really makes the video really rich. the point tracking sound design bit at 4:20 really was super cool. I think you really pulled of some amazing work here. very well crafted.
@6884 deserves a Grammy for the sound design.The choices you made are so intuitive, and seem to accurately reflect the ambient resonance of these forms and how they might sound in motion. The levels of detail that you modulated your effects to correspond to the visuals is mind blowing. You made very obviously synthesized sounds seem organic as if it's an analog recording of actual physical objects moving in a substrate. I know my way around electronic music production and it's very clear you do too. This is phenomenal work and you should be very proud of what you've acheived with this video.
Yes, the music is genius, but let's draw attention to the incredibly timed bitcrush effects on the narration. Just an incredible move to make the narrator feel like they're fractalizing away.
I barely know what a mandelbrot is, or what was going on in this video, but man, it was done so well. The music, the QUALITY of this video is like better than anything i've seen. Insane stuff
Note that raising a number to a non-integer power doesn't behave as good. For instance, for the power of 1/2 you get the square root, which will have two regular branches, meaning you will have to decide arbitrarily which one to pick. And when you smoothly change the input the output doesnz't change smoothly at some seam (which also can be chosen somewhat arbitrarily), so technically you have to choose one of 2 "equally likely" variants for each next point For a power of 1/3 there are 3 options And for an irrational power... infinite options, in a sense So that's my best guess for why this fractal is less well-known and studied (and less well-defined)
Has amyone ever thought to square or cube both z and c together and see ifnthst gives any new insight? Is that a clever and insightful idea on my lart pr that has been done already? Or change one pf them toma fibonacci number or swuare both and THEN add a constant? Just spit balling...
@leif1075 you would end up with the following: z0 = c0 c1 = c0^2 z1 = z0^2+c1 = 2c0^2 so, it would behave like zn = 2^n c0^(2n) which does not seem interesting, because it's just (2sqrt(c0))^n however there's probably something to be done with cubing c or adding w = w^2 + z for recalculation and plotting w instead there are actually a lot of fractals on recursive formulas in polynomials and I suspect that chaning c or adding w might be expressed in a form of just one variable with polynomail recursive relationship, but who can say for sure
@@Neuroszima convergence radius of Taylor expansion can be finite, can it not? Particularly, if you're getting a Taylor expansion of a function it converges on some disk centered around the point where you're getting your expansion from, the Taylor expansion is regular and only equals to the function when it is regular in the disk as well. Square root is not regular at the origin, so the Taylor expansion would only converge on a disk that does not contain 0.
That exact mechanism that makes the plot look incomplete at some spots for example when he shows the 3.5 exponent c-parametrized fractal. It looks like if you broke glass and attempted to put it back together. The only way to resolve those seams is to add another dimension to showcase those branches. P.S. I imagine a method similar to Veritasiums "Logistic Map" video except the extra branches are show above and below the principal branch.
My god, as a misician i want to express how MUCH i love your sounds choise and how it changes with yhe visual, it is so impressive.. ive never seen anyone doing that and so good!!!! I am very impressed!
Hey I just wanted to say THANK YOU for both making an engaging and educational video (I legit feel like Im looking at universes converge across a plane or something) but for also including the tools you used and the technical information. I think most people are capable of learning about these things on their own, but so so often creators will drop an amazing video and never reveal what tools they used or an entry point that we can use to learn more about the topic on our own... and that can be frustrating. So, thank you!
@@KawaiiFlandre495 if I could, in a sense I also had to :) I was in a moral obligation with the universe to make something good to go together with something as amazing as the visuals!
Goated video. Been playing around with mandela browser and fractals we can see are just a small window into a kaleidoscope of high dimensional complex math.
the sound design in this video is amazing, and it's super interesting! Please keep doing what ur doing, it's super awesome and u totally deserve more views! props to 6884 also!
I love this video! The visuals are great, but the beautiful audio design makes this feel so so so much more alluring and amazing. This honestly feels like trekking in alien space/higher dimensions seeing these fractals change and morph. Am honestly stunned. Wow!!
one of the most underrated math channels on youtube, great explanations and visuals, and the sound design, especially the music being synced with the visuals, made it so much cooler. keep it up❤
As a youngster, I wrote a C program that displayed any 2d cross section of the "mandeljulia" 4d shape. If only I had even thought of fiddeling with the "non-variable" 2 as well! Interesting video, subscribed.
Thank you for explaining what the Mandelbrot set is so clearly, now I can finally what it is. Also you sound design with the audio channels reminds me a bit of that "how to draw mushrooms on an oscilloscope video"
This is just amazing work, and I'm just surprised at how underrated your channel is. the music goes great with it. I also like looking at other fractals you can get by iterating other functions (Burning ship, Tricorn, etc.)
Thank you. The most useful part to me was where you show at about 2:36 how the points on the plane described by the equation then become pixels black or white, finally showing how we actually get an image out of an equation. 😎👍
This is a truly amazing video, the subject matter is so fascinating I can barely wrap my head around it, and the sound design is absolutely perfect. I loved the way the music synced up to what was going on in the video, made it feel a little like those old edutainment videos like the one about how to turn a sphere inside out. Things like this are why math is so endlessly fascinating to me and this video only makes me want to understand these things better. Thank you so much!
Very well presented! I'm particularly impressed at how smoothly your code renders the different fractals as the variables change. One other point of interest is that as you shift through various Julia sets each coming from various different c values, you'll notice that sometimes the Julia set is connected or, roughly speaking, a single blob, while other times it splits up into disparate curves. Turns out, the c values where the Julia set is connected are EXACTLY the c values corresponding to the Mandelbrot set! This definitely holds for the case of the exponent equal to 2 and almost certainly for other exponents and their associated mandelbrot-like sets (though I still have to sit down and rigorously convince myself of that). I've done a couple research projects with other mathematicians studying the Mandelbrot set. We focused particularly how more complicated functions sometimes produce small copies of the Mandelbrot set within their boundedness loci, much like how you saw the julia set curves showing up in the higher dimensional objects. Let me know if you're interested in any more of the details!
This is absolutely incredible. Also, turns out I might have thalassophobia _and_ megalophibia after all, which is a weird combination to get. I'm sure there's a fear of fractals, but I like these ones to describe this deep, unsettling feeling I get from them instead.
I just gave this whole video my undivided attention from start to finish. And I have absolutely no idea what it was about. However, I genuinely loved it.
The transitions are so smooth. Very enjoyable. I have programmed an mandelbrot explore myself, but later found quickman, which was highly optimized, but your transition and visualizations are next level
That was the most captivating and straightforward walkthrough of fractal math I have ever seen. I've played with the formula a fair bit but never put together the various still images that were generated. Putting them into motion and showing the connectedness between the various parameters was really fun to watch. Thanks!
the part where you made the exponent a non integer literally gave me a chill. Numbers have forms that we cannot comprehend but are intuitive when you show this.
I'm guessing there's really just some sort of self-similar 6-dimensional structure that we can only see slices of. Very cool visualization. I like the rotation of the viewing plane.
The sound design and composition of this video is mind blowing. What an incredible level of polish! Careful attention paid to each and every detail, wow
7:00 Absolutely. The relationship between these two really, is that Mandelbrot is a tourist map of c values of Julia. Picking somewhere close to the border will give you something interesting-looking. And, a small neighbourhood around the origin of one plot will look quite similar to the same neighbourhood of the other.
Instant sub. Even though the explanations weren't always as clear to me, the sheer artistry of this video was just hypnotizing to watch. Especially the music/audio being 'reactive' to the video is something I rarely see done like this, let alone with such great execution.
The immersive experience given by the visuals and music is just so stunning. The breakcore drums at 4:06 works so well; the seamless transition between topics and visuals; the efforts put into the voice filtering throughout the whole video… It’s just so wonderful to see such well made piece of art. I’ve long known the beauty of the Mandelbrot and the Julia set, but your work again reminds me of how beautiful math, and the world, is. A slight pity, though, is not mentioning about the relation between the “number of convergent points” and the “blob” the initial point falls into. The usual Mandelbrot set (z=0, c=2) has such phenomenon, but I’m not certain if other sets in the family have similar properties.
As someone who's been a mandelbrot afficionado for years I LOVED this video The way the concepts are presented and the BEAUTIFUL visuals are just mindblowing
Playing with fractional exponents gets a little dicey, doesn't it? You have to settle on a specific branch of a Riemannian manifold (if I have my terms correct). This is why the fractional exponent examples have all those hard edges.
Love your editing style - cool ass video. Your creativity shows, and I think it is inevitable that you will find yourself successful on RUclips as this kind of quality shines and cuts through the junk. Keep it up.
5:28 ah yes, the suburban map set
I want AAAA Suburban home!
@@jaimedeleon1194
*Revelation 3:20*
Behold, I stand at the door, and knock: if any man hear my voice, and open the door, I will come in to him, and will sup with him, and he with me.
HEY THERE 🤗 JESUS IS CALLING YOU TODAY. Turn away from your sins, confess, forsake them and live the victorious life. God bless.
*Revelation 22:12-14*
And, behold, I come quickly; and my reward is with me, to give every man according as his work shall be.
I am Alpha and Omega, the beginning and the end, the first and the last.
Blessed are they that do his commandments, that they may have right to the tree of life, and may enter in through the gates into the city.
only 1 reply?
5:31 the fractals have eyes
@@Shotgunspixie That's the pi from @3Blue1Brown
STOP MOVING THROUGH THE SIXTH DIMENSION MY BRAIN CAN’T TAKE IT
yes you will
Your brain _will_ be taken through the 6th dimension and you’re going to *_like it._*
DRINK THIS SPACE ALCOHOL AND JOURNY WITH ME TO THE SIXTH DIMENSION!
I have a very basic understanding of math and this is way out if my ballpark.
When imaginairy numbers were taught I threw in the towel.
@@ijriccanme that one time i smoked dmt
I just want to bring attention to the fact that the music effects are synchronized with the visuals, and that makes this video so much better than anything else I've seen about fractals.
I'm guessing the pitch amplitude was factored to the brightness of pixel. Dark blue = low pitches, white = high pitches, black = quiet. If I was going to guess, those relative pitch volumes would be normalized to a reference point of the appearance of the standard Mandelbrot set, right?
@@Phriedah hehehe close enough :) just to be clear, every single automation to every single effect or synth parameter was drawn by hand because I hate myself with the fury of a thousand suns 🥰 but yes, I opened and closed a low pass filter, amongst the other things,according to how jagged was the main part of the fractal (i know it’s infinitely jagged anyways but you know what i mean). But there’s no precise, “scientific” mapping.. it’s always important to keep a human touch! (Although we are planning to automate such things a bit more for next videos, fingers crossed)
@@6884thank mr 6884 the music was wonderful
I noticed that too but at some point I was really immersed and it was just very interesting.
truly
The FX on the music that plays when the mandlebrot morphs - rapidly twisting the Delay knob of a reverb plugin to get that stutter - is a fucking genius use of the effect. Hats off
🧙♂️
@@6884
Where are you going after you die?
What happens next? Have you ever thought about that?
Repent today and give your life to Jesus Christ to obtain eternal salvation. Tomorrow may be too late my brethen😢.
Hebrews 9:27 says "And as it is appointed unto man once to die, but after that the judgement
@@JesusPlsSaveMe silence, brand.
i find the fact the bot targetted 6884 themself really funny for some reason
@@JesusPlsSaveMe His name wasn't even Jesus, dumbass. It was Yeshua.
The deepest dream to be able to visualize this as a three dimensional object.
Sounds like you've never installed MB3D or Mandelbulber
Or visions of chaos
make z and c parameters, I think that would work
Edit: I was wrong in many ways about this
oh well
maybe making Re(z),Im(z), and Re(c) dimensions and so that it’s “complete”, Im(c) time would work?
(edited) wait, you can NOT just split the 1 6D shape into 3 2D shapes actually
Why to dream of three when you can dream of four, why to dream of the possible when you can dream of the impossible?
AHHHHHHH MY BRAINS HURTS
Every day I grow sadder that we don’t exist in higher dimensional space because of how much beauty there is in higher dimensional math
U will be able to access that once u die and join God in his glory
Reading Greg Egan's Diaspora will either make you much sadder or give you some solace as read about the higher-dimension travels of the characters.
Blood doesn't know its fingers lmfao
But we do -- we just have trouble perceiving it :-)
@@gracetonsanthmayor6687 what if there is no god
6884 did some genius music work here
Generic beep boop so good on my Adderall brain hurr durr.
@@Sub2meifurgay YESSS my first hater!!! 🙌
50% inspiration, 50% perspiration, 100% reason to remember the name - or however that one went 🤔
@@6884 Congrats! 🎉 I'm sure there will be many more! 🥰
@@6884as a synth head i found it really tasteful gg
As a person who used to develop programs making Mandelbrot sets and other fractal renderings in the early 90s, I know first hand how incredibly CPU/GPU intensive these animations are compared to back then. For perspective a single frame of 640x480 pixels with 16 colors on my Intel 386sx 20MHz from 1991 would take 4 hours or so to render. Granted back then if I had a math coprocessor it would have been much faster even then but this rendering here is thousands of times more complex and animated! I’m not sure this could have been calculated in a life time on the old system. How far we have come! Great video
He explained it so clearly and elegantly as well.
I had the Mandelbrot algorithm in BASIC which I would try on various systems. 1st was a Sinclair QL which took 24 hours to draw a whole Mandelbrot set in 512x256 4 colours, 8 hours running the algorithm in compiled Pascal. Then there was my Epson PX-8 running the algorithm in Microsoft BASIC on its 640x64 mono screen. That also took a day just to generate a 64x64 low res set. Then there was the Acorn A3000, a RISC based system running BBC basic on the forerunner to the ARM processors we all use today. That same algorithm generated the set in 640x256, 256 colours in a little less than 4 hours. Beyond that I had discovered Fractint on PC which generated a set in an instant.
A complicated comment about a complicated thing which makes sense?! A rare sight to see!
@@zapod20 Damn, I've gotta check that out! Does Fractint cost anything?
thousands? more like billions
I think more RUclips videos should be like this. The immersion of the music pairing with the visuals makes this an experience like no other!
This video sure was the real official canon to everything about the mandelbrot set
woah its voxeldoesart i sure hope nothing happens to the *thing* in this video
here, the *thing* is the mandelbrot set
os c
There are 100s of 1000s of these videos in this site. What are you talking about dude.
Fond memories of that one 90s screen saver that would slowly zoom in on random part of the Mandlebrot set, subject to a few decades of Moore's Law. Incredible work; thank you for it.
this guy went from connect 4 strategy to the most beautiful math video ever created.
literally
holy shit it's this guy?
@@akasakasvault7597 I need to know who this is now
I'd say Animation Vs Math is a close second.
This production is an instant subscribe
This is the first time I've ever had an intuitive understanding of the Mandelbrot set. Excellent video
Bro watch any Numberphile or 3blue1brown video on it. There are several.
Yeah the explanation of how to visualise the set was amazingly concise!
It's just a color coded coordinate system 🤯
oh my god, man, the audiovisuals.... I wasn't prepared for music frequency filter parameters to change with the parameters on the screen. thats such a great touch
the sound design on this is amazing, really well thought out, it really makes the video really rich. the point tracking sound design bit at 4:20 really was super cool. I think you really pulled of some amazing work here. very well crafted.
@ beautiful work.
@6884 deserves a Grammy for the sound design.The choices you made are so intuitive, and seem to accurately reflect the ambient resonance of these forms and how they might sound in motion. The levels of detail that you modulated your effects to correspond to the visuals is mind blowing. You made very obviously synthesized sounds seem organic as if it's an analog recording of actual physical objects moving in a substrate. I know my way around electronic music production and it's very clear you do too. This is phenomenal work and you should be very proud of what you've acheived with this video.
Yes, the music is genius, but let's draw attention to the incredibly timed bitcrush effects on the narration. Just an incredible move to make the narrator feel like they're fractalizing away.
H e h e h e 😊 it’s so nice when your efforts get noticed 🥹
idk i kinda thought it was just distracting to me
it's like ur brains on ket
@@6884probably the best sounding brain melt I've ever experienced. I'm returning to listen while high for extra entertainment later haha!
@@vii-ka how
I barely know what a mandelbrot is, or what was going on in this video, but man, it was done so well. The music, the QUALITY of this video is like better than anything i've seen. Insane stuff
Note that raising a number to a non-integer power doesn't behave as good.
For instance, for the power of 1/2 you get the square root, which will have two regular branches, meaning you will have to decide arbitrarily which one to pick. And when you smoothly change the input the output doesnz't change smoothly at some seam (which also can be chosen somewhat arbitrarily), so technically you have to choose one of 2 "equally likely" variants for each next point
For a power of 1/3 there are 3 options
And for an irrational power... infinite options, in a sense
So that's my best guess for why this fractal is less well-known and studied (and less well-defined)
Has amyone ever thought to square or cube both z and c together and see ifnthst gives any new insight? Is that a clever and insightful idea on my lart pr that has been done already? Or change one pf them toma fibonacci number or swuare both and THEN add a constant? Just spit balling...
@leif1075 you would end up with the following:
z0 = c0
c1 = c0^2
z1 = z0^2+c1 = 2c0^2
so, it would behave like zn = 2^n c0^(2n)
which does not seem interesting, because it's just (2sqrt(c0))^n
however there's probably something to be done with cubing c
or adding w = w^2 + z for recalculation and plotting w instead
there are actually a lot of fractals on recursive formulas in polynomials and I suspect that chaning c or adding w might be expressed in a form of just one variable with polynomail recursive relationship, but who can say for sure
Uhhhhhh Taylor expansion would have a word with you...
@@Neuroszima convergence radius of Taylor expansion can be finite, can it not?
Particularly, if you're getting a Taylor expansion of a function it converges on some disk centered around the point where you're getting your expansion from, the Taylor expansion is regular and only equals to the function when it is regular in the disk as well. Square root is not regular at the origin, so the Taylor expansion would only converge on a disk that does not contain 0.
That exact mechanism that makes the plot look incomplete at some spots for example when he shows the 3.5 exponent c-parametrized fractal. It looks like if you broke glass and attempted to put it back together. The only way to resolve those seams is to add another dimension to showcase those branches.
P.S. I imagine a method similar to Veritasiums "Logistic Map" video except the extra branches are show above and below the principal branch.
Mind had exploded by 0:45
Mooom help, this guy is warping space and time
Mom said it is my turn to ponder the imponderable!!!
Moooom! Phineas and Ferb are warping space time!
7:26 This is happening because the shape keeps getting put at right angles to itself. Pretty fantastic. The 6D shape was something else.
Exquisite sound design, narration and use of math. Perfect fractal video.
0:19 hey my name is Julia:D
yooooo me too!!! :D
That’s what they want you to believe
lol
👍k
Slide me your number
Shoutout to 6884 for making the video 50x better
Eyyyy cmon cmon i just uncovered its beauty in… hehe, in another dimension 😉😊
you mean 50x+2i, surely 😄
? what y mean 6884
@@NoNoahhhh itsa me
@NoNoahhhh 7:36
Absolutely disgusting and horrifying. Thank you for your amazing work and video! Im petrified of fractals...
My god, as a misician i want to express how MUCH i love your sounds choise and how it changes with yhe visual, it is so impressive.. ive never seen anyone doing that and so good!!!! I am very impressed!
hi :3
@@6884 can you tell me the name of the music?
@@vaiyaktikasolarbeam1906 ah hello again! well there's no real name because I composed the whole thing specifically as a soundtrack for the video
@@6884 ah then can you upload the music separately? Please?
Hey I just wanted to say THANK YOU for both making an engaging and educational video (I legit feel like Im looking at universes converge across a plane or something) but for also including the tools you used and the technical information. I think most people are capable of learning about these things on their own, but so so often creators will drop an amazing video and never reveal what tools they used or an entry point that we can use to learn more about the topic on our own... and that can be frustrating. So, thank you!
This is INSANELY cool. I've never considered making the exponent an imaginary number, and the music really ties it all together. Nice!
Visuals, sound, narration are amazing. 10/10 video
Nice work with soundtrack, 6884!!! 🌌 Relay my thanks.
my thanks back!
@@6884 can you upload the music?
@@6884 You never had to make such awesome music but you did. Did you make this song just for this video in collaboration with 2swap?
@@KawaiiFlandre495 if I could, in a sense I also had to :) I was in a moral obligation with the universe to make something good to go together with something as amazing as the visuals!
truly amazing animations and beautiful visualizations
may the algorithm bless you 🙏
I absolutely love how the music and sound effects change with the fractal
Never have I been this entertained by a video explaining the Mandelbrot set. Astonishingly beautiful.
the music reminds me of the way the music changed when rotating in 4-space in 4D golf
Absolutely! Also considering that this video is too sort of about making cuts of a multidimensional space
What 4d golf? :0
@@JuiceboxSnail It's a PC game made by CodeParade, really recommend checking its devlogs and (if you like golf of couse) the game itself too
@@JuiceboxSnail It's a PC game, really recommend checking its devlogs and (if you like golf of couse) the game itself too
ohh i didn't know the game but you have my curiosity now
I feel like an insect just being shown things, like I don't know what's going on, but the colors are pretty
Goated video. Been playing around with mandela browser and fractals we can see are just a small window into a kaleidoscope of high dimensional complex math.
3:00 Manipulating the starting value and seeing the effects in real time genuinely blew my mind 😮
the sound design in this video is amazing, and it's super interesting! Please keep doing what ur doing, it's super awesome and u totally deserve more views! props to 6884 also!
This is the first time i've actually _understood_ someone explaining the Mandelbrot set! Great job!
The sound design is phenomenal
thanks :)))
you did a good job 6884
I love this video! The visuals are great, but the beautiful audio design makes this feel so so so much more alluring and amazing. This honestly feels like trekking in alien space/higher dimensions seeing these fractals change and morph. Am honestly stunned. Wow!!
one of the most underrated math channels on youtube, great explanations and visuals, and the sound design, especially the music being synced with the visuals, made it so much cooler. keep it up❤
The way the music effects get modulated with the visuals of the mandelbrot was very cool and engaging. I'll definitely check out 6884's stuff.
logo checks out
I mean profile picture. I am sleepy.
As a youngster, I wrote a C program that displayed any 2d cross section of the "mandeljulia" 4d shape. If only I had even thought of fiddeling with the "non-variable" 2 as well!
Interesting video, subscribed.
THE most elegant, straight forward explanation of the mandelbrot sets i've ever seen. Not to mention the incredible music/sound design. Thank you
such an insane video, absolutely love the sound design, visual design and how everything works together to make just a phenomenal video
It takes a witch to recognize some magic 😉
This video is mind-blowing! What the hell this is great! the scoring is insane, and the explanations are better than I've seen before. Incredible
Because of sounds and visuals I thought that you have at least 300 000 subscribers. Nice work
Thank you for explaining what the Mandelbrot set is so clearly, now I can finally what it is. Also you sound design with the audio channels reminds me a bit of that "how to draw mushrooms on an oscilloscope video"
This is just amazing work, and I'm just surprised at how underrated your channel is. the music goes great with it. I also like looking at other fractals you can get by iterating other functions (Burning ship, Tricorn, etc.)
This was the most concise explanation of the Mandelbrot / Julia set I've seen.
best video ever, best content creator ever, love the raw appreciation for fractals
my favourite ost ever btw
Thank you. The most useful part to me was where you show at about 2:36 how the points on the plane described by the equation then become pixels black or white, finally showing how we actually get an image out of an equation. 😎👍
At 6:20 feels like a toby fox background for the secret boss.
The sound design around 4:05 is great! Really nice touch!
holy cow amazing video its the best fractal video ive ever seen and it finally made me understand how drawing the mandelbrot works
This is a truly amazing video, the subject matter is so fascinating I can barely wrap my head around it, and the sound design is absolutely perfect. I loved the way the music synced up to what was going on in the video, made it feel a little like those old edutainment videos like the one about how to turn a sphere inside out. Things like this are why math is so endlessly fascinating to me and this video only makes me want to understand these things better. Thank you so much!
the main star of the show is the math, but the sound design also deserves some praise. well done man
Genius. Highly educational and the dynamic background track is a sweet gimmick.
Well played.
Unsolicited potato at 2:32
Lol
Very well presented! I'm particularly impressed at how smoothly your code renders the different fractals as the variables change. One other point of interest is that as you shift through various Julia sets each coming from various different c values, you'll notice that sometimes the Julia set is connected or, roughly speaking, a single blob, while other times it splits up into disparate curves. Turns out, the c values where the Julia set is connected are EXACTLY the c values corresponding to the Mandelbrot set! This definitely holds for the case of the exponent equal to 2 and almost certainly for other exponents and their associated mandelbrot-like sets (though I still have to sit down and rigorously convince myself of that).
I've done a couple research projects with other mathematicians studying the Mandelbrot set. We focused particularly how more complicated functions sometimes produce small copies of the Mandelbrot set within their boundedness loci, much like how you saw the julia set curves showing up in the higher dimensional objects. Let me know if you're interested in any more of the details!
I can't believe this has only 1500 views. Incredible work. I hope you find great success on RUclips soon.
This is absolutely incredible. Also, turns out I might have thalassophobia _and_ megalophibia after all, which is a weird combination to get. I'm sure there's a fear of fractals, but I like these ones to describe this deep, unsettling feeling I get from them instead.
I just gave this whole video my undivided attention from start to finish. And I have absolutely no idea what it was about. However, I genuinely loved it.
The transitions are so smooth. Very enjoyable. I have programmed an mandelbrot explore myself, but later found quickman, which was highly optimized, but your transition and visualizations are next level
I was very happy to be connected to my speakers when i heard this music. Hats off to 6884, very immersive
Dude, I'm totally here for this. Great channel, please never stop.
I fucking love the sound design here, also FRACTAAAAALS!!!
crazy how you did a math video in the form of a true crime documentary, i usually save to watch later but the insane quality made me watch right now.
0:29 youtube compression at it's max 💀
Also RUclips: this video is 4k ultra resolution , one of the best on RUclips
Average fever dream
That was the most captivating and straightforward walkthrough of fractal math I have ever seen. I've played with the formula a fair bit but never put together the various still images that were generated. Putting them into motion and showing the connectedness between the various parameters was really fun to watch. Thanks!
This is awesome 👏
The way the music shapes around the visuals is absolutely mesmerizing, what a demonstration!
5:15 Best part
And *THATS* how you fold reality! 👏
🤣
the part where you made the exponent a non integer literally gave me a chill. Numbers have forms that we cannot comprehend but are intuitive when you show this.
7:31 the singularity forms
Love the high pass filter on the narration at key moments... great sound design!
I'm guessing there's really just some sort of self-similar 6-dimensional structure that we can only see slices of. Very cool visualization. I like the rotation of the viewing plane.
althoug some humans are working on getting us closer 😉 look for 4D Miner and 4D Golf. Crazy stuff and some kids already play it like it's nothing.
The sound design and composition of this video is mind blowing. What an incredible level of polish! Careful attention paid to each and every detail, wow
Dziękuję, ale niestety jestem tylko Włochem
7:00 Absolutely. The relationship between these two really, is that Mandelbrot is a tourist map of c values of Julia. Picking somewhere close to the border will give you something interesting-looking. And, a small neighbourhood around the origin of one plot will look quite similar to the same neighbourhood of the other.
Instant sub. Even though the explanations weren't always as clear to me, the sheer artistry of this video was just hypnotizing to watch. Especially the music/audio being 'reactive' to the video is something I rarely see done like this, let alone with such great execution.
5:17 kinda looks like the pov of someone being crushed by portals in the portal game
Anyways cool vid
this is some damn good narration and music! this might be one of the best math explanation videos i've ever seen
5:08 Corrupted Minecraft world generation be like:
Bro, this music and sound effects are amazing
Looks like Eldritch horror.
This video was phenomenal, with excellent sound design and captivating subject matter, as well as stunning visuals!
The immersive experience given by the visuals and music is just so stunning.
The breakcore drums at 4:06 works so well; the seamless transition between topics and visuals; the efforts put into the voice filtering throughout the whole video… It’s just so wonderful to see such well made piece of art.
I’ve long known the beauty of the Mandelbrot and the Julia set, but your work again reminds me of how beautiful math, and the world, is.
A slight pity, though, is not mentioning about the relation between the “number of convergent points” and the “blob” the initial point falls into. The usual Mandelbrot set (z=0, c=2) has such phenomenon, but I’m not certain if other sets in the family have similar properties.
maybe ill talk to this sone day :)
"breakcore drums" 🙄 jfc
this is by far the best fractal video I have ever watched. the music, the visuals, the explanations. perfect.
3:26 Ukraine founded
lol😂
This is the most informative and visually stimulating of any fractal explanation I've seen yet!
3:13 from this point on I am confused
As someone who's been a mandelbrot afficionado for years I LOVED this video
The way the concepts are presented and the BEAUTIFUL visuals are just mindblowing
Playing with fractional exponents gets a little dicey, doesn't it? You have to settle on a specific branch of a Riemannian manifold (if I have my terms correct). This is why the fractional exponent examples have all those hard edges.
That's why it's an *evil* twin
yep
Oooooh right!!!! 😮
Love your editing style - cool ass video. Your creativity shows, and I think it is inevitable that you will find yourself successful on RUclips as this kind of quality shines and cuts through the junk. Keep it up.
thank you :)
And at 5:35, it even shows pi!
as a musician/sound designer, this is one of the coolest usages of sound design i've ever heard. 6884 is a sound design genius
*blush*
The music warping is funny here 4:12
superb production value oml... cant believe this is accessible for free