CORRECTION: At 2:29, the identity should say 8pi*k^2, not 8pi^(k^2). ANOTHER CORRECTION: At 1:36 I said the chance of getting 6 of any digit in a row within the first 768 digits is < 0.1%. However, I just ran a simulation (on 10 million 768 digit sequences), and I got 0.68446%. In my opinion a 0.69% chance is still notable enough to be in this video, but it's not quite as rare as I thought. The confusion comes from ambiguity in language. I thought the source meant "the chance that you get at least 1 of these patterns is

In general the chance of a specific coincidence occurring is very low, however the chance of *some* coincidence occurring is very high

This is only half mathematical, but I like how the ratio of miles to kilometers (1.609344) is close to the golden ratio (1.61803...) This means you can approximately convert those units using the Fibonacci sequence. 2 miles is about 3 km, 3 miles is about 5 km, 5 miles is about 8 km, etc.

Here's another one. 82,000 is 10100000001010000 in base 2, 11011111001 in base 3, 110001100 in base 4, and 10111000 in base 5. It is predicted to be the largest number to be represented using only 1s and 0s in all four bases and is thought to be a massive coincidence that a number so large even has that property to begin with.

One that I was waiting to see if you mentioned: 10! seconds = exactly 6 weeks.

My favourite mathematical coincidence is that if you look at space between e and pi on the number line and mark a point exactly two thirds across, that point is almost exactly the number 3 (3.000489)

The first 40 seconds of the video is literally "How to memorize 15 digits of e"

2:20 i envy your ability to convey this much raw happiness in a single drawing

My dude just causally explained the mathematical basis for music in the middle of this.

It should also be noted that these situations only occur in base 10, which is a human-based standard. Other bases may have coincidences like these, either more or fewer, though.

I see average people being surprised by coincidences. I try to explain to them how with the number of things that they see, these coincidences are almost certain.

The fact that 2^31+1 is prime is one of the most useful coincidences in cryptography, since large primes are needed for the math aspect and modulo multiplication’s runtime is based on the number of 1s digits in binary which is useful for the calculation aspect.

It’s worth mentioning that a lot of these coincidences arise because we use base 10. There might be other coincidences in other bases that we don’t know about

Here’s another fun one: 50/49 will spell out the powers of 2, each spaced 2 decimal places apart. (50/49=1.0204081632…)

Math class initially: 6:40 me: *blinks for a nanosec* 7:40

2 points about the 7th US president - he was elected in 1828, and served 2 terms. If you draw a diagonal line across his square picture, you get a triangle with 3 angles: 45, 90, and 45 rewriting all that: 2. 7 1828 1828 45 90 45

As an amateur musician it always fascinated me how actually lucky it is that 12 tone equal temperament (where each note is the previous one multiplied by 2^(1/12) can get you so close to the most important musical intervals such as 3/4 and 2/3. Sure, maybe that's not as surprising, because from all the possible reasonable divisions of an octave, like 13, 14, 15 notes, one of them should be good enough in approximating these crucial intervals, but, idk, it's very pleasing to me

One thing I like a bit more than the fact that π has a string of six 9s at digit 763 is the fact that 2π has a string of seven 9s at digit 837. It isn't the first instance of four characters in a row in 2π's decimal expansion (since there was a "1111" before it) but it's still the first instance of five, six, and seven characters in a row.

For the e memorization thing, next is the first three primes (235) and degrees in a circle (360)

My favorite coincidence is that the sines of the most commonly used angles (0°, 30°, 45°, 60°, 90°) follow a pattern: sin(0°) = 0 = sqrt(0)/2 sin(30°) = 1/2 = sqrt(1)/2 sin(45°) = sqrt(2)/2 sin(60°) = sqrt(3)/2 sin(90°) = 1 = sqrt(4)/2 This doesn't work for any other value though. Despite that, this is how I always memorized them in school (the cosines are the same but the other way around, because cos(x) = sin(90°-x), and tangents are just sin/cos).

Other mathematical coincidences involving pi: sqrt(2)+sqrt(3) ~~ pi 9/5+sqrt(9/5) ~~ pi e^(pi*sqrt(163)) ~~ (640320)^3+744 Not involving exact mathematical numbers (mile*Astronomical unit)/(inch*light year) ~~ 1

the next 6 digits of e are 235 and 360, being the first 3 prime numbers and the angle of a full rotation lol

The fun thing about this is that It's genuinely confusing whether a mathematical coincidence is a thing that makes sense. You have situations like these where there isn't a clear explanation and doesn't seem like there should be, but then everything is still logically determined and interrelated, to some extent just determining that some weird correlation is going on is an explanation.

my favourite mathmatical "coincidence" is that to get the derivative, you just subtract 1 from the power and multiply by the power.

While I don't think it meets the definition of a "coincidence" as provided in this video, something I find really cool is that numbers of the form 1/(99...)8 where you have any number of 9s can display the powers of 2 in their decimal expansions. With m 9s you will get m+1 digits of space for each number. 1/998 gives 0.001 002 004 008 016 032 064 128 256 513 failing at the last digit here because the next number (1024) exceeds the space each number has and adds a one to the previous number, 512. Now 1/8=0.125 which may not seem to follow this pattern, but it turns out the infinite series: sum(n=0 to inf) 2^n/10^(n+1) = 1/8 (0.1+0.02+0.004+0.0008+0.00016+...) generally with m 9s: 1/(999...)8 = sum(n=0 to inf) 2^n/10^((m+1)*(n+1)) There may be better ways of displaying the infinite sums here. Also 1/(999...)7 gives powers of 3, 1/(999...)6 powers of 4 etc. Pretty cool.

There's probably a explanation for why this is the case, but I find it interesting that the first 2 hyper-operations are both commutative and associative but all the following hyper-operations have neither property.

I’m a big fan of the Kibi-prefix system. Having ambiguity about numbers is basically always a recipe for some sort of disaster

To truly answer "why 12 notes" you need to consider more than 3/2 and 4/3. One component is to make sure that approximations to 10/9 and 9/8 coincide into a "meantone" which might as well give you 31 notes per octave. Another component is to make sure that three approximate 5/4 major thirds stack up to an octave (in other words tempered 125/64 and 128/64 sound alike) . 12-tone equal temperament is the only equal division of the octave satisfying both of these requirements.

Recently there were new SI prefixes. "ronna" means 10 to the 27th, "ronto" is 10 to the negative 27, "quetta" is 10 to the 30, and "quecto" is 10 to the negative 30. This also applies to 5:59, where "quettabyte" (QB) means 10 to the 30 bytes and "quettibyte" (?) (QiB) means 1024 to the 10th power (about 1.267651e30).

4:47 - Explains 12 notes per octave - Very cool. 2:1 or 100% pitch increase (double) is an octave up. Why the same keys resonate perfectly. The 3:2 or 50% pitch increase is called a power chord and resonate the next best. Then the 4:3 or 33.3% is next best. Captured well with 12 notes!

Love your channel and videos so much. Super high quality, incredibly interesting, and well explained. Also, there's a modesty / sincerity to your videos, which is very special, because I think you are truly creating and sharing these videos purely for your love and appreciation of math, science, and art.

I like the coincidences of the ALMOST kind. Near Miss Johnson Solids are really fascinating. They're ALMOST Johnson solids, but are just SLIGHTLY irregular.

5:26 specifically its why we have 12TET (12-tone equal temperament). other tuning systems had existed long before 12TET, which were more focused on having neat ratios between the frequencies of the notes than in having them be logarithmically equidistant from one another. the cool coincidence is that they were /almost/ logarithmically equidistant from one another, which allowed 12TET to be used as a more consistent tuning system cool video!!!

kuvina is honestly the one person carrying the entire internet's faith, love, and good now

This was a really fun video! It was nice how you brought up some fun coincidences and what is and isn't actually unlikely about them; a lot of stuff falls prey to overstating that because of a naive view about expectations. My favorite part was the almost 20 + pi result, and the look at the sum that led into. Really cool!

π^2 is almost the gravitational acceleration with 9.81 m/s^2

Im so glad that youtube recommeded me this video. I discovered your series on relativity. Your animations are basic, but they are sufficient in explaining any concept. Keep up the good work, and I will see you when you pass 100k subscribers!

7:30 Woah Woah Woah, the what now? shi went from playing with numbers to hyperdimentional spheres real quick

I just realized... e has the exact digits of pi just scrambled.........

a sidenote about the MB vs MiB etc differences, the original definition was that KB MB GB etc used powers of 1024, however it was changed to be consistent with si prefixes, and the new KiB MiB took its place. for legacy compatibility reasons windows keeps using the old definition even though its no longer correct. linux and mac, as well as a lot of programs, use the newer definition of KB/MB/GB or use KiB/MiB/GiB. so it isn't a case of MB being ambiguous, and MiB being strictly defined, its a case of the old definitions still having hold over, and sometimes still being incorrectly taught or used especially with a lack of awareness.

That "bye" at the end was so ZESTY.

Some old favourites, and several new ones. Great video!

3.14159 is also a coincidence as we have very less chance that random 6 digits are 314159

Another interesting consequence of 2^10 ≈ 10^3 is that 2 ≈ 10^0.3. With this you get nice approximations for 10^0.1, 10^0.2, ... based on powers of 2 and 5: 1, 1.25, 1.6, 2, 2.5, 3.2, 4, 5, 6.25, 8, 10 this can be useful to approximate non-integer powers (in particular roots) without a calculator, for example: 5000^1.2 ≈ 10^(3.7 * 1.2) = 10^4.44, which is between 25000 and 32000, so 5000^1.2 ≈ 28000 (correct result is 27464).

I just stumbled across this video, and was shocked to see that theta function identity I mentioned a few months ago on a Mathologer video! One of my other favorite not-quite-coincidences is that e^(pi*sqrt(163)) is nearly an integer. It's related to lots of interesting number theory, like elliptic curves, unique factorization, Euler's prime generating polynomial x^2+x+41, and the Ulam spiral. I'm looking forward to watching more of your math videos!

Musician here! 4:49 While it's true that we tune many Western instruments to powers of 1/12, it did not cause us to have 12 notes. Long story short, we call this "Equal Temperament" tuning, which is actually quite new. Other systems were used in the past, such as what Pythagorean used. It had 12 notes, but you could argue that the note F# was tuned wildly differently from Gb, so you could say they were separate notes. Other systems evolved, such as Just Intonation, which adopted the "12" notes from Pythagorean tuning. Interested? Search up 12 TET, 17 TET, and 31 TET.

4:41 - Actually, pi has a "continued fraction pattern" too: π = 4 + {1/[1+X]}, where X is the continued fraction (a0)^2/{2+[(a1)^2/(2+…)]}, and an = 2n+1. This arises from the continued fraction for the inverse tangent and the fact that tan^(-1)[1] = π/4.

Regarding the one about 2^(7/12) being close to 3/2, I'm pretty sure that's not a coincidence. I've been researching the maths behind 12 tone equal temperament in music for a while now, and actually this property of 12, of being able to approximate lots of rational numbers when in an exponent, is not unique and actually is related to the properties of the golden ratio

I came from that other video that ripped off your video - yours is much better.

I saw 2^(integer)/12 and immediately thought of music theory. Confirmed when I saw it was aprox 3/2

Hey I discovered a new coincidence that relates e to pi: The solution to x^x*(1-x)^(1-x) = 0.5^0.5 (See A102268 on the OEIS) x=0.889972 is almost nearly pi^2/16/ln(2) = 0.889927 the number pi^2/16/ln(2) didn't come out of nowhere either, it represents the ratio between (arcsin(sqrt(1))-arcsin(sqrt(0.5)))^2 and ln(1)-ln(0.5). For context on the y(x) = arcsin(sqrt(x)) function, it is the integral of 1/sqrt(x(1-x)), so it maps the numbers from 0 to 1 on a scale that is proportional to the standard deviation to account for the fact that there's a bigger difference between 0.99 and 1.00 than 0.50 and 0.51

The end of this video just ruthlessly escelates

Some more coincidences (and explanations): The 3² + 4² = 5² and 10² + 11² + 12² = 13² + 14² are part of an infinite family of these sums: 21² + 22² + 23² + 24² = 25² + 26² + 27² Where the largest term on the left is exactly 4 * a triangular number. This even works in 1st powers (for 2 * a triangular number) 1¹ + 2¹ = 3¹ 4¹ + 5¹ + 6¹ = 7¹ + 8¹ 9¹ + 10¹ + 11¹ + 12¹ = 13¹ + 14¹ + 15¹ As well as 3rd (6 * a triangular number) and 4th (8 * a triangular number) powers, though with slight modification... 5³ + 6³ + 2(1³) = 7³ 16³ + 17³ + 18³ + 2(1³ + 2³) = 19³ + 20³ 33³ + 34³ + 35³ + 36³ + 2(1³ + 2³ + 3³) = 37³ + 38³ + 39³ 7⁴ + 8⁴ + (8/2)³ = 9⁴ 22⁴ + 23⁴ + 24⁴ + (24/2)³ = 25⁴ + 26⁴ 45⁴ + 46⁴ + 47⁴ + 48⁴ + (48/2)³ = 49⁴ + 50⁴ + 51⁴ There's a great explanation of these on Mathologer, and the comments may leave some insight about the higher powers. sqrt(2) + sqrt(3) ≈ pi. This one comes from two different approximations of pi. Start with a circle of radius 1. Its circumference should be 2pi. If you inscribe a square in the circle, its perimeter should be 4sqrt(2), meaning pi is about 2sqrt(2). If you circumscribe a hexagon outside the circle, the circumference should be 4sqrt(3), meaning pi is about 2sqrt(3). If 2sqrt(2) is an underestimate, and 2sqrt(3) is an overestimate, then the average should come pretty close, and indeed it is. Thus, sqrt(2) + sqrt(3) ≈ pi.

Why hasn't anyone made a video like this until now? its was a great idea!

Saw Gelfond's constant (my favorite number) in the thumbnail and knew I had to watch the video 😂

The leech lattice could be really useful to create my input vectors to randomly associate them to an output and train the model in a supervised way...

The first 360 digits, after the decimal point, of pi end with 3, 6, 0.

This is like math asmr. I love this

wonderful video kuvina!! i loved the chords you made for 12th roots of 2!!

A really cool "coincidence" that actually has an explanation is the near-approximation of pi in the Borwein integral. 3brown1blue did a video on it recently.

this video has both comforted me and put my brain into a number-obsessed mode thank you very much :3

I realized that : - In 1 dimension you need 1 support point to not fall (you can't need 0 but there is no down) - In 2 dimensions you need 2 support points to not fall /\ (like a card castle) - In 3 dimensions you need 3 support points to not fall /|\ (like stools have) Does that mean in n dimension you need n support points even if gravity only takes act in 1 of them ?

2:32 it was at this moment my brain.exe stopped working and now i am ded

0:54 Regarding these criteria: try representing numbers in other bases. You'll find these coincidences disappear… while others appear.

240 has its digits arranged in descending order in base 2, base 3 and in base 4.

Also noteworthy is 13,14,15. If you take just the 3 from 13, it's 31415 which are the first few digits of pi.

You note around 1:20 that the pie coincidence is a product of language, but it's important to also note that a lot of the coincidences in this video are a product of using a base 10 system, and that they thus are "arbitrary"

the reason we have 12 notes in an octave is much more historical than mathematical, though it is intuitive to choose an octave (×2) rather than a tritave (×3) or anything higher. the western 12-tone equal temperament tuning has only been in use since around the mid-1580s at the very earliest. there are a lot more tunings out there based on things other than the twelfth root of two for 12-tone octave subdivision that have been around a lot longer, all with different benefits and drawbacks, though 12TET became standardized as it allowed things in any key to sound equal with the same tuning, whereas most other tuning systems result in needing to retune to the specific key of a piece or different keys having different qualities.

i love it when people acknowledge that tau exists instead if using 2π

My favorite is from physics, where pi^2 is very close to the gravity constant for earth in meters per second

I really enjoyed this, and I didn't expect a stack of 4ths to show up, so even better!

People are notoriously bad at intuiting how (un)likely something is. I'd be very suspicious of my own intuition in this case, especially since the patterns we're looking for have *not* been specified in advance. "An interesting coincidence" covers so much ground, that you're virtually guaranteed to run into one looking at almost any sequence of random digits.

i came from the ripped video hi guys

Wow, I thought it would be some person, far from math explaining, how 13 is the devils number because of some coincidence, but it was really interesting, especially the last cannon-ball part

The real coincidence was the maths we learned along the way

wake up babe! new video from the nerdy enby is here!

If you divide or multiply pi by 2, there will be 7 9s in a row there because the 6 9s have 4 before them and 8 after them.

Not really a coincidence but the square root of 2 added with the square root of 3 is almost pi.

Here's a weird coincidence, I only just now watched this video, after completely missing it when it released. And both this video and the new one care about 70.

The Leech lattice indeed has a cool construction using its Weyl vector, but the even unimodular lattice in 8 dimensions does not have this construction (although the construction for this lattice is way simpler). It is a bit of a coincidence, also 1 is a cannonball number as well.

I personally like how e/π is very close to (√3)/2, the value of cos(30°).

It is accidental. By the way ... The approximation of exact real values such as e^π = 20 + π is of the form e^x = (1)(x + 20) where the Lambert W function solves for x. It might approximate to π (checking in Wolfram Alpha online calculator) with sufficient error minumal in significant digits truncated and rounded, etc.

Pi plus pi squared is very close to 13 and 1/90.

It's a coincidence that 2+2 is 4 minus 1 is 3, quick maths... 😂

I belive that the kilobyte idea comes from the binary system. Since computers use base 2 some people decided to use base 2 for their bases, and 2^10=1024, however some other people decided they'd rather use the base 10 system as it is the one we typically use and they changed the units accordingly, this makes it different to coordinate

Here's a big one: 2^100,000 is about 9.99002093x10^30102 The number starts with 999 then 00. Also, 2^200,000 is ≈ 9.98x10^60205 2^300,000 is about 9.97x10^90308 all start with 99.

fun fact: the sequence 24242424 occurs in the 242,424th digit of pi

hey there's an error in the sound at 5:13, you seem to have forgotten the flats when playing it (played C F B E A instead of C F Bb Eb Ab), making the interval from F to B a tritone instead of a fourth. this does not at all detract from the video quality, best esomath video ive seen since the cursed units video, but just fyi.

1828 is the birth year of a famous Russian poet Alexander Pushkin.

0:57 I'd say the mathematical explanation is precisely that it's just a coincidence. Coincidences don't need "explanation" in some sense. Also notice some of these are mathematical coincidences but only in base 10. This serves to show that there's nothing "fundamental" about them. But they're not useless! as the video gives some examples on how sometimes paying them attention can result in practical use cases.

i have been trying to tell a the 22/7 is closer one to everyone for ages

It's like a massage for my brain ☺

the sum of all the digits of a number acquired for a multiple of 9 is 9: 9 x 2 = 18 (1 + 8 = 9) 9 x 16 = 144 (1 + 4 + 4 = 9) if you wanna know if a number is divisible by 3, just add all its digits, and if they equal 3, 6 or nine, then it's divisible by 3: is 74223 divisible by 3? yes, because 7 + 4 + 2 + 2 + 3 = 11 + 7 = 18 -> 1 + 8 = 9.

my fav is that when you have a point A=(x_1,y_1) that when you take the graph x/y=x_1/y_1 that just is a straight line that goes trough (0,0) and A

Look at pi and e in binary out to about 23 places. Look for the parts where they both have six 1s in a row. Reverse one around the midpoint of those six bits. 19 of the bits line up perfectly with the other number. The odds of this are about one in half a million. (Also, since tau = 2pi, its bits are the same, so tau can stand in for pi here.)

A lot of these coincidences also rely on a base 10 number system. If you examine things through another number system, you would probably find new coincidences

2:45 is a good explanation, i dont think it needs more explanation

whenever unusual structure and design comes from seemingly random events or actions, i assume there is a fractal buried in it somewhere... and, like the population growth formula, [N(t) = 2N(t - 1) ], it will fits right in the mandelbrot structure

12, 1 *3, 14, 15* , 16, 17

i don’t remember any specifics rn but i remember being fascinated by repeated multiples of some N in the digits of a number divided by that N, i think mainly 7 but also possibly others, maybe it has to be coprime to the base