The fabulous Fibonacci flower formula

Such an elegant an simple proof. What a thing of beauty.

I feel like the quality of your animations are getting even better every video. not only nicely explained, but also nice to look at. i realy love your work!

Something I theorized while watching: It appears there are infinitely many spirals in between the spirals (like with the blue and yellow spirals you drew), with the points making up these spirals being farther away from each other each time you look deeper between two spirals (by what ratio, I wonder, 2?).
This would be interesting to look at as an "orchard problem," and I wonder what would be discovered?
Thank you as always for the elegant, mind-expanding videos! And excellent proof! You are truly amazing!

Wow. I love that proof. That's ace. Very elegant. That's what proofs should be. Great explanation altogether.

That's a beautiful proof at the end. I love it Mathologer.

This is why I like math so much. There are so many amazing relationships between different patterns and things we came up with, and it’s just so neat.

youtubers are better at teaching math than high school teachers

This was a very good and interesting way to show the link between Fibonacci numbers and flowers

I must say, I really like your way of presenting the material. Your methods of explaining is superior to almost everything else I've encountered. The calmness and naturaleness of the video really reflect unto the viewer. Keep up the good work :).

wow. thank you! I wish you were my math teacher when I was in school. I'm still learning SO MUCH from you! Thank you!

You brilliant Teutonic madman! Well done, sir. I have been told ever since childhood that Fibonacci sequences could be seen in flowers, but I never understood what they meant.

I never had the chance to do math and find your explanations fascinating. I'm addicted. Thank you.

This is a clever explanation of why sunflowers, pine apples and acorns grow according to the Fibonacci sequence which is a recursive relation. The golden spiral, golden rectangle, golden ratio and nautilus shell are all related to Fibonacci sequence. I like the proof.

That proof was very beautiful! It was very easily understood even for me!

Thank you for your work. As a dad of two boys who home school, I appreciate the help of your you tube content. These sequences of "1" and "2" make "3" are in the DNA of living creatures as practical purpose, inventive uprising, and ideal envisioning.

I love how you present a different approach to classic maths problems in such an elegant way. Can't wait for part 2!

Very nice proof indeed! In my linear algebra class (1st year college), I usually talk about Fibonacci numbers when discussing the solution of linear difference equations using eigenvalues. This proof is certainly accessible to my engineering students.

Very beautiful proof at the end!
About the explanation: This might be because I am quite tired, but I had a hard time following some of your points, which usually isn't the case.

Congratulations on 100,000 subscribers! Here's to many more!

I feel like if I had access to these types of videos when I was in school I would have done so much better. I learned in the 70's & early 80's before computers and animations. It was so hard for me to get mental pictures from my text books. This is amazing, and every time I watch a video I think, "ooooohhh, so THAT's what WHY that happens". It used to just be rote and remembering the concepts I was taught, but now I have a mental picture and the understanding has taken hold. Unfortunately I'm an old lady now, and my science days are behind me. But I'm boning up so I can teach my grandkids the amazing language and life of maths.

I saw an explanation video in the Stanford channel called fibonnaci fact vs fiction. An hour in it explains the math in flower patterns, something about interference and optimal growth rate. I'll resume viewing your own explanation now.

at about 6 min in I couldn't help but see the green and red lines as vectors with the blue line being their addition. Great video!

Your proof is so easy when you think about it logically, all blue point are the intersection of the spirals, count the number of intersections, and intersections which are due to red/green and the sum is the blue

This elegantly covers and expands on ViHart's series on plants and the fibonacci sequence. The proof at the end is very simple and clever, too.

I must say, I didn't expect much from this video as ViHart (among others) has 3 excellent videos explaining why plants grow in such a way to produce patterns relating to the Fibonacci numbers, but I have to say that that proof you gave at the end is something I've never seen before and it's just beautiful. I've never thought of it that way, so thank you!

The way these UA-camrs are showing these visualizations, I am falling in love with maths again :)
Somewhere in middle, my textbooks made me wonder why I am not understanding things.
Now I know, thanks!

The REALLY beautiful part is at 10:18 where you draw a flower in your proof of why the Fibonacci sequence appears in flowers.
😁🌻

To be honest math isn't my cup of tea, but I have to admit that this video and its proof that you made all by yourself really interested me. It was very clear and helpful. Thank you and keep making such nice videos!! ;)

I am happy. This might give me the answer to something that stumped me in 1990, and I had put on the shelf. I wanted to build an interactive display/toy that required fiber optic terminals, arranged in a circular pattern on one side. I also commented tonight on your 'Heart of Math, Multiplication Tables' video, which also tied into my previous artistic work, which now enjoys a renewal of interest, thanks to that clip.

Mathologer ist nicht umsonst einer meiner absoluten Lieblingschannels auf UA-cam!

Has anyone wondered why this pattern exists at all? The math we develop is a structural form of understanding of material configuration, and the math allows for prediction etc. , but it does not explain the cause of the phenomenon. Could it be that mass: gravity and spin Earth's rotation acting together produce the pattern? Could then the Fibonacci sequence predict mass from rotation and shed light on the gravitational force of galaxies etc? Or has this already been done partially by astrophysicists when calculating trajectories of satellites sent into space? As you can guess I am not a mathematician, I studied philosophy and still ask questions at the age of 72.

Seems like the flower does essentially the calculation of the remainder of the fraction, as seen in the "infinite fractions" video. A single new seed comes in, and always "seeks" the biggest remaining space... fills it up with 1 and then the next seed will do the same ad infinitum.

Vihart also did a really nice explanation, also delving into why plants do this, even though they can't do math. It's been a while since I watched it, but I think it had to do with the optimal amount of space per surface area, given that they grow from the center out.

How do you made your animations?? You are amazing!! I am a teacher of math, and I want to make some videos for my students with animations like this! Congratulations for your awesome work! Greetings!

Searching for phyllotaxis ended here. What a clarity in explanation..
Thank-you..

One way to look at the red+green=blue spirals is to look at them as vectors, then you see right away that the triangles that are formed when all of them intersect always lead to this conclusion as well.

Moving 'along' a green spiral, we are crossing red spirals. Moving 'along' a red spiral we are crossing green spirals. We know this accounts for all the green spirals because the 'last' intersection along a red spiral is the turn point and thus lies 'along' a green spiral and thus is marked red. Very elegant.

The reason that you most likely see a Fibonacci or a Lucas number of spirals is that these are the two simplest of the family of Lucas Number Sequences. All adjacent numbers in a generalized Lucas sequence converge to the golden ratio, since they can be determined by the generalized Binet Formula. Since nature has chosen the obtuse Golden Angle as an an iterative angle for distributing plant structures around a radial point of origin in phyllotaxis, two adjacent recurrence sequence numbers are going to best approximate the golden ratio in q band, and they will appear prominently at different bands, depending on the number of plant structures in that band.
The issue you have explored is really only a consequence of the iterative application of the golden angle. The real question, at least to me, is why is the obtuse golden angle the iterative angle of choice in phyllotaxis. First, check out the equi-distribution theorem, which states that the sequence θ, 2θ, 3θ, 4θ, ... will distribute a point to all points on a circle only if θ is an irrational number of turns of a circle. obtuse Golden angle, check.

If you haven't addressed this question already in the previous comments, I noted (first around 10:37-38 or so) that the green nodes don't exhibit quite the same perfection of symmetry as the red: there are only 3 forming the "left side" of the right most leaf, with four nodes on the other highlighted green spiralsl. On the other side, the red spirals have two sets of 5 nodes and 4 nodes respectively. Perhaps this is a trivial point as the proof stands nevertheless, but sometimes such curiosities can lead to interesting consequence. Many thanks! Your videos are a delight to watch, and, if I have raised the question redundantly, my apologies.

This is the most wholesome channel in existence.

The third sequence, 3,4,7,11,18,29, is just the fibonacci sequence plus the fibonacci sequence shifted over twice. The double was shifted 0 times, and one shift would be the fibonacci sequence but with only a single 1. Neat

Only one minor problem at one point in this video: when you say we can't see the green spiral anymore, I can still see it. Other than that, this is great!

“I’ve actually just made this up in a drawing program.” Some of your drawings are clearly made with a mathematical drawing program. Which program? Mathematica? Maple? I have been playing with visualising Fermat’s spiral and Vogel’s model in Mathematica with some success. But your growth animation looks a lot more difficult to produce. P.S. The visual proof for GREEN + RED = BLUE was delightful.

The proof reminded me a bit of the graphical proof of quasi convexity of the work function for the k-server problem (i.e., `The k-server problem' Koutsoupias).

Very nice proof. When you were talking about how all the flowers follow the same pattern (a+b=c) but may start with a different number but usually start with 1 I thought of offspring in general (usually just 1, less often more for humans).

I love that the closed captions capture the *delighted giggle* at the end of his proof.

This type of structures are also benificial for the organism because after a rotation (i.e. an operation of ±1 cells) the surface stays almost the same as before. It is more dynamically space efficient than in a static manner. The same principle can be seen in that chocolate illusion where when the pieces are rearranged it seems like we have the same chocolate bar plus one piece. I have seen a puzzle that is like that of the chocolate but it is arranged in spirals like these plants and you can rearrange the pieces in a way that you seemingly have the same surface but with ±1 a piece.

Its eerie how the growth pattern of a flower matches the flux lines of a magnet.

At first, I was like “What is really going on?” Then, I was like “Wow, that was cool and satisfying.”

Very nice explanation, and very well illustrated. Have wondered why these patterns appears, and this makes it intuitively and mathematically clear :)

at 6:22 ish with the top diagram, if you treat the green red and blue lines like vectors, and add the green and red, it looks like you would get the blue. just an observation that supports the green+red = blue idea

I love this proof. In general, I'm in favour of using visual proofs in mathematics, because they are often the quickest and the most intuitive method of explaining concepts, particularly relating to real world subject matter.

I do know that for any Fibonacci-like sequence (each element is the sum of the previous 2), regardless of starting numbers (so long as they aren't both zero), the ratio of any element of the sequence to its predecessor approaches the golden ratio the further into the sequence you go.

I love this kind of Math. I could watch this sort of thing for ages.

Brilliant!! The best explanation. Watched lots of videos but only here it’s explained why plants form like this. 👍🏻👏🏻

Why the red dots go 4,5 in a closed loop of iteration (4,5,4,5) and then greens only goes 4,3(only once) like (4,3,4,4)?

It was Pingala the great Hindu Indian mathematician ,in 200 AD first used this series in sanskrit syllables..which later expressed as Fibonacci sequence...please mension the history whenever you use this sequence...as it will be honour for actual discovery..

As explained above, look at any part of the North American rain forest and you'll be looking at fibonacci numbers. But consider this, much of the commercially harvested timber is used for making plywood. Any plywood I've handled has the dimensions of a double square (if short side is length 1, then long side is length 2). Now the diagonal will be square root of 5 . . . so the hypot + short side, divided by long side, will produce the golden ratio (phi).
Since plywood is used worldwide in the construction industry, most buildings in the world are riddled with phi. The golden ratio is literally all around us.

Viheart made a similar video explaining the golden ratio and how it is the angle that each new petal comes out at. If I recall it's somewhere around 136*. I highly suggest checking it out.

The classic golden angle (which is what this video is essentially about) in the best floating point number approximations:
degrees: 137.50777
radians: 2.3999631
However, there exist two more generalized golden angles, the so called morphic golden angles:
For circles:
degrees: 76.34541
radians: 1.3324789
For parabola:
degrees: 126.869896
radians: 2.2142975
I wish Mathologer had addressed those.
Paper from which I've derived those numbers (unfortunately the approximations given by the paper don't cut it for computer graphics, so I had to calculate the optimal floating point approximations myself):
link.springer.com/article/10.1007/s00004-015-0285-1

Great video, thanks a lot ! Its Euclidean-style satisfying to note that each spiral our gestalt brain sees emerging is just the next iteration in the recursive function.
The pattern used for the proof at the end seems to relate to your cardioids etc in the multiplication table video.

Very nice! Maybe I will do a simulation of "plant growth"...
But I was sort of expecting the answers for last "paradox" of 1=2

Again an awesome video. Thank you.
I hope you'll keep up with the top-notch quality videos

Is it true that in a flower head where all the buds are organized as Fibonacci numbers, no 3 buds lie on a straight line?

Very well explained. I also like how your proof is very visual. Keep making these, I am starting to share them!

Fibanocci must have been a genius or real lucky. How can you look at natural processes and see this mathematical connection. The sequence is everywhere.

These sequences and ratios are Designed intelligently smart.
QUESTION:
(A) Is this Evolution?
(B) IS this Creation?
(C) None of the Above?
(D) All of the all of the above?

So could this mean that flowers (and other things in nature/universe) who inherently follow the “least effort / least energy / least action?” method of filling up space from a central point of certain shape -> causes Fibonacci / Lucas or similar number series ( or spirals such as golden ratio) to appear, is that it?
In short, my question is:
Could a rule such as: “Minimize energy use” have causality with -> Fibonacci/Lucas number series or certain Spirals appearing?

That's quite an elegant proof.

Thanks for these elegant little lectures, so confidently-delivered, Dr Polster

Great video. Thank you for keeping them free of any subscriber-hunting phrases and channel promotion.

Never been good at math, never was a fan of math, no i am a lover of math.
Thank you.

I have no doubt that the universe is built upon sequence , an unfolding infinite sequence algorithm such as the one you are talking about here. I think the current knowledge of cosmology physics is shy of the complete variants but when we find out it will be started by a very basic sequence

you deserve a nobel price in maths for THAT proove!

I would think it's extremely obvious why the Fibonacci sequence appears rather than for instance the Lucas sequence, simply because it starts with the number 1 (1 bud). But apparently it's more complicated than that.

I really love it! Very clear and objective! Even for me, a Brazilian girl with a lot of English difficulties!

I must say I greatly enjoy watching your videos. My only complaint is that you're fairly quiet in almost all of your videos, sometimes I can hardly hear through my speakers, even at maxed volume. Other than that, your videos are exhibit superb quality and you are exceptionally good at explaining your content. :)

Nicely done. although one could make the argument that F(0)=0 and F(1) =1, and I wonder if doing so would not have made you proof a little easier to follow. After all when a plant starts to grow in starts with 1 + 0 cells, doesn't it?

Interesting that there is a fractal characteristic to the sequence, that the spirals are interconnected via addition.😱👍neat!

It took me a third of the video to realize he was saying "bud" and not "butt":P

Hey Mathologer, you should explain
"The integral sec y dy from 0 to one sixth of pi
is log to base e
of the square root of 3
to the 64th power of i"

The 34 and 55 spiral arms going in opposing directions in your flower head diagram occupy the same region, that is they completely overlap. Therefore together each set must have the same total quantity of seeds, though each spiral arm in the 34 must have more seeds than one in the 55. How much more? Well, in your diagram each 55er seems to alternate from 6 to 7, and each 34er from 11 to 12, Is this based on empirical observation or just how you happened to draw things? Anyway, let's assume a consecutive pair of those Fibonacci numbers that most closely approximate: 13 for the 34ers and 8 for the 55ers. So the total seeds in the 34ers would be 34*13=442 and in the 55ers we have 55*8=440. So pretty close, eh? Is this a result specific to the Fibonacci sequence would you say? Moreover the average of 442 and 440 is 441, the exact square of 21 which is the Fib number between 8 13 and 34 55.

So far, from what I can glean =
European(namely GB) maths educators = show you how to love maths.
American modern physicists = show you how to love physics and the wonky concepts.
Chemistry = everything teaches you chemistry, silly, that's all that exists!
Will be doing a paper on this and proof for my doctorate in liberal arts.

I know I expressed my skepticism about that grand importance of the Fibonacci numbers and the golden ratio with regards to biology (and science) in general, but I do still hold it. Nonetheless, it does seem to be useful as an abstract solution to this particular problem of seed dispersion, and I thank you for making a video on this topic.
What is always entertaining, however, is that many people (the Mathologer not included here) go way overboard with the Fibonacci stuff so that it turns into numerology, finding the golden ratio in any physical measurement between 1.5 and 1.8 as evidence of the golden ratio in the "optimum". Upon closer inspection almost none of the claims of the golden ratio appearing are borne out by actual measurements and end up being cherry-picked examples.

Great graphics.
Exponential growth makes spirals of spirals.

Great video. I was about to ask about Lucas numbers, but you answered my question in the video :)
It would be neat to see a timelapse video of a plant growing like this.
Do you know if the mathematical sequence depends on the species, or the individual? For example are there plant species which only exhibit the Lucas numbers? Awesome proof by the way. Keep up the great work.

Have a look at "spiral enya" where I present two example of animated rotating spiral. I wrote this application using LabView from National Instrument, a programming language using graphical objects.
The kind of curves demonstrated here are smoothly appearing as the spiral rotate.

Beautiful, visual and mathematical explanation. Thank you!

QUESTION; Mr Polster. I'm searching the web without success for a mathematical method that a surveyor could use to pinpoint around 60 intersection points of an 8-13 double spiral that would be drawn on a 30 hectares (75 acres) land. Would you happen to know one formula that would make it possible to calculate the coordinates ? Either angle:distance or XY graph. Thanks for your time.

Such a fabulous presentation of the profound power of math, especially as a tool to understand our world!

I don't fully understand the whole thing but the drawings are super pretty!

It would be great to build a visualization model of pushing seeds over the surface of the torus; and we get a spiral vortex; perhaps the sunflower is hinting to us precisely at such an idea of the structure of the universe!

This is an amazingly well made video, and as always you're a fantastic educator. But I don't think you've given a complete answer to why the Fibonacci sequence appears in nature. Almost every living being contains phi somewhere in its design - even DNA is laid out in waves which correspond to the golden ratio. So while this video does explain why flower buds would tend towards Fibonacci spirals, the answer of "close packing" doesn't apply to most of the cases in other living organisms where Fibonacci appears. I know this is an old video and you're not a biologist or a philosopher, but if you were, I know you'd make a damn good video on a more general explanation of phi's role in nature.

Has anybody ever mentioned (apart of me of course), that even cristal-structures (better: invers cristal structures) can be showed by Fibonacci numbers... this may be a nice subject for a futur video....

Seems like the blue line between buds is the vector sum of the red and green vectors (if you call them vectors, the distance between the buds). So could you prove it by a sum of vectors?
I love your videos! Keep them coming :)

You've dumbed it down nicely for a non maths guy like me, but I'm wondering if this geometric depiction of spirals and their diagonal intersections is as simple? I reckon this wouldn't just work with any two random numbers but numbers of a SET A, where each number starting the 3rd number can be defined by Y= x+(x-1) or Y= 2x-1. Doesn't this look something from the Complex algebra thing that was used to plot the Mandelbrot set (or was it called something else. My memory fails me). The Mandelbrot set (or something similar) has a lot of colored points (where supposedly the result is not easily determined and can only be gauged by it's rate of deviation or something.)
I may be thinking nonsense right now. I guess I'll just sleep.

In 2:10, what is the position of the 1st guy (for eg. why it is not in the center)? Later, what is the position of the next guys? Any suggestion how to draw these spirals X(n)=? and Y(n)=? .

Now that you got the 100k subs milestone we DEMAND more videos both in quantity and quality. Also your videos are watched by more than a 100k people from all over the world. Focus in youtube videos more than the University pls !!!

From 6:00 to 6:54 also shows signs of nature teaching us how to do vector addition. Is that relationship dead-on for cartesian coordinates in euclidian space or am I just seeing things?

Clear explanation and killer proof! Thank you, Mathologist!