- Видео 21
- Просмотров 7 760 801
Digital Genius
США
Добавлен 31 июл 2021
Видео
Simulating Particle Life
Просмотров 156 тыс.Месяц назад
Particle Life is a fascinating simulation model that showcases emergent behavior arising from simple rules. Inspired by Jeffrey Ventrella's "Clusters" ( ventrella.com/Clusters ). This simulation resembles real-life organisms, demonstrating that emergent behavior doesn’t require complex processes.
How to Find VERY BIG Prime Numbers?
Просмотров 119 тыс.2 месяца назад
Humans have been looking for prime numbers for a very long time. We still haven’t found the formula for generating prime numbers. However, we have developed methods to discover increasingly larger primes. Chapters: 00:00 The largest prime 00:37 Infinite number of primes 02:38 Sieve of Eratosthenes 03:14 Sieve of Atkin 04:46 Fermat's Little Theorem 06:10 Miller-Rabin test 09:18 AKS primality tes...
"It's just a Coincidence"
Просмотров 506 тыс.2 месяца назад
There are many surprising results in math, and some might say that they are just pure coincidences, but are they really?
The Most Beautiful Equation
Просмотров 523 тыс.6 месяцев назад
To try everything Brilliant has to offer-free-for a full 30 days, visit brilliant.org/DigitalGenius/ . The first 200 of you will get 20% off Brilliant’s annual premium subscription. Euler's Identity is one of the most popular math equations. In this video you'll learn what it really means. Chapters: 00:00 Intro 00:33 Pi 01:28 i 02:07 Derivative 10:00 e This video was sponsored by Brilliant
Can any Number be a Base?
Просмотров 379 тыс.7 месяцев назад
There are many different ways to express numbers. The most popular is definitely the decimal system, or in other words base 10. Base 2 and base 16 are also used in computers. But did you know that we can make number bases not only from integers? Chapters: 00:00 Introduction 02:22 Base 1 03:12 Negative bases 04:34 Fractional bases 10:06 Irrational bases 15:10 Imaginary bases
When Geometry Meets Infinity
Просмотров 397 тыс.8 месяцев назад
When we think about geometry, we often only consider finite shapes, but when we make the shapes infinite many surprises can occur.
Numbers too big to imagine
Просмотров 1,9 млн9 месяцев назад
In mathematics, tetration is an operation based on iterated, or repeated, exponentiation. By using operations such as tetration, pentation or hexation we can create enormous numbers. Graham’s number is one of the most famous big numbers, but there are many even bigger numbers. Chapters: 00:00 First Hyperoperations 00:35 Tetration 01:26 Infinite Towers 02:12 Higher-level operations 03:23 Graham'...
How to 'always' win at Battleship?
Просмотров 658 тыс.9 месяцев назад
Battleship is a strategy type guessing game for two players. It is played on ruled grids on which each player's fleet of warships are marked. The locations of the fleets are concealed from the other player. Players alternate turns calling "shots" at the other player's ships, and the objective of the game is to destroy the opposing player's fleet. In this video you will learn the best strategy t...
Even Computers Can't Solve This Problem
Просмотров 13 тыс.9 месяцев назад
The travelling salesman problem (TSP) asks the following question: "Given a list of cities and the distances between each pair of cities, what is the shortest possible route that visits each city exactly once and returns to the origin city?". The TSP was first formulated in 1930 and is one of the most intensively studied problems in optimization. Even though the problem is computationally diffi...
MATH GRAPHS = ART
Просмотров 46 тыс.10 месяцев назад
If you know any other cool-looking mathematical graphs/functions, comment them down below, there will be a part 2. Music by: @AlekseyChistilin
8 minutes of Counterintuitive Math
Просмотров 400 тыс.10 месяцев назад
Math is logical, but sometimes the logic can be counter intuitive.
Formula for the Area of every Shape | Pick's Theorem
Просмотров 12 тыс.Год назад
Formula for the Area of every Shape | Pick's Theorem
In Japanese high school, log(x) = In(x) = log e (x)
6:30 Erm..what a sigma?
Bro literally teached us how to do math in the correct way
"Dyck path" Bro thinks he didn't say the banned word
2^82589933-1=0.//////873747373737737737737372362781263782638312678213876312697132867132689124678431768124679361973463896314976274727382838278943278972197409798231792170912379923179021387243989471398462398742198653487284982173981712389712396812368921398123987132986123981624981426893126312986347823647832768432876324876432673428634287326478647284827483849348388472462462362462462462462482462582566666663284735666663967676749676766386656777777777835637473646767762856565626355455555555264627455555375737475757735573655555554856356575
I love how this guy can teach me more symbols in 8 minutes than my teacher can in a month.
My head is hurting now😂😂😂😢😢😢
For me 100 is allready too big. I cant render 100... Only because 10x10... I only understand 1 to 10 i think.... I mean 100 people i wouldnt be able to compute the place the would occupy... only by doing 6 people per 1m3... I cant understand Beyond 10 or below -10 really...... Is this why the lottery so popular ?
Hehe Sigma hehehehehehehe Yes i am 4 years old and watach skibidi toilet every day
sin(3√4+9) -76+(3√23÷5) +554=? Solve it guys
"π isn't big number π=3" π:
What is the music you used for this?
I just noticed, kids will be going crazy by knowing how to say "sigma" in math, they wont know it until a further future, this video is interesting though of that
Now give me the $5
For a sec I thought we are gonna summon the Math Demon or cast Spells from the Mathematical School
10:32 it formed the earth.
What?
Sigma
8:00 don't you mean a ray starts at one point and runs through the second point and then on infinitely beyond that (as indicated by the arrow)?
457~742) u
3:57 is that “exsists” a typo? Or is that your way of typing it?
3:57 is that “exsists” a typo?
Imagine this on a mega computer, with like a 100 different particles with different properties and millions of them, would be amazing. Or a simulation like this where every particle represents a molecule or even quarcs and electrons. Maybe that's how our universe is simulated, who knows.
For the conditional and biconditional arrows in the logic portion, #40 and #41, wouldn't both be written with a single line in the middle (-->, <-->), since a double-ligned arrow (as shown for the conditional symbol => and biconditional symbol <=>) is used to represent security (i.e. A=>B means A secures B) under the Sequent Calculus? This (=>) has been used in proofs of the Soundness and Completeness of First Order Logic. Is this an oversight from the video or just a matter of notational ambiguity across different logical systems?
"Last video before going to sleep "
your math is blowing my mind
i used to go by the logic of 'if it isnt a multiple of 2 3 5 or 7 its probably prime'
Infinity is one of those things that we invent a word for but have no chance in hell of imagining.
thx
I tried to recreate this project for my own enjoyment over on codepen. I've gotten it pretty similar but I don't know how you got such complex patterns that stay stable. Particularly, the organisms with striped sections like the one in the thumb nail. If you have any advice I'd love to hear it!
if you try any of these in a different base and it dosent work, it is indeed a coincidence.
6:12 WHAT DOES THIS REMIND YOU OF?
It's just a coincidence
Are you jenius? 😊
The equal sign was created very recently (relatively). Before the sign was created. PPL used to write. "is equal to"
I can see what's going on with the first one, but still can't explain it very good. All of those sequences have a fixed gap between the numbers (1 along the horizontal rows, 3 on the vertical rows, 4 on the positive diagonal and -2 on the negative diagonal) If the first number of each sequence is "A", all of those numbers are 111111A + a constant (may be negative), where both 111111 and the constant are both always divisible by 37. The constant is actually divisible by 12210, of which 37 is a factor. (the 12210 is from the fixed gap - it's really 012210, because the first and sixth digits are A + (0*gap), the second and fifth digits are A + (1*gap), the third and and fourth digits are (A+ 2*gap)
I read the title "When geometry dash meet infinity"
Okay 👍😂😂😂
😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂😂🎉😂 😮😮😮😮😮😮😮😮😮😮😅😅😅😅😅😅😅😅😅😅😂😅😅😂😅😂😅😂😅😂😅😂😅😂😅😂😅😅😂😅😂😅😂😅😂😅😂😂😅😅😂😅😂😅😂😅😂😅😂😅😂😅😂😮😂😮😂😮😂😮😂😮😂😮😂😮😂😮😂😮😮😂😮😂😮😂😮😂😂😮😂😮😮😂😮😂😮😂😮😂😮😂😮😮😮😮😮😮😮😮😮😂😅😂😅😂😅😅😂😅😂😅😂😅😂😅😂😅😂😅😅😂😂😅😂😅😅😂😅😂😅😂😅😂😅😂😅😂😅😂😅😅😂😅😂😅😂😅😅😅😅😂😂😂😂😂😅😂😅😅😂😅😂😅😂😅😂😅😂😅😂
Ohhh 😧
😂😂😂😂
Github repo please!
*Forget any big numbers, I guarantee no humans will even come close to fully comprehending (actually picturing in the brain) this number.* *3↑↑↑3 (or 3^^^^3 which is* *_3^(7,625,597,484,987)._* *To give you some perspective, there are only about 1.3 x 10^50 atoms in this world. That's a 13 followed by 50 zeros (1,300,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000,000).* *Now, let's try this: the number of molecules in all the oceans is approximately 4.7 x 10^46 (give or take several orders of magnitude).* *Can you picture a number with 46 or 48 zeros? If you succeeded, now try to picture a number that has over 3 trillion digits: *3^(7,625,597,484,987)*
Even Utter Oblivion tetrated to Utter Oblivion is infinitely closer to zero than infinity.
1+1=2
Divided I don't know
3 * 7 equals 21
7 - 4 equals 3
5 + 4 equals 9
Big Number Abbreviations for you to use: K = Thousand M = Million B = Billion T = Trillion Q = Quadrillion q = Quintillion S = Sextillion s = Septillion O = Octillion N = Nonillion D = Decillion
❤❤❤👣🐎👀🫁🫀🧲 6:13 thank you thank you