KaanGaming same happened to me multiple times when I was doing some homework and I was so frustrated that I could find my pencil but when I gave up I scratched my head and I felt the pencil in my hand as put my hand on my head.
This song: Exists. Literally every rhythm game for some reason: Ḑ̵̢̢̢̢̧̛͖͇̲͖͍̟̦̲̻̞̼̩̺̼͎̙̣̠͕̩͈̗̮͍͍̼͈̗̤͔̝̫̯̜̦͉̯̬͓̙̮̘͚̥̗͖͉̞̘̘͔͎̮̯̪̺̞̞̫͕̩̩̗̼̯͖͍͉͖̗͍̪̟̗͔̯̹̞̺̬͓̔͊͊́͛̂̈́̃͛́̔̅̽̈́̏͂̈́͜͜͠͝ͅÏ̵̧̢̨̨̡̡̧̧̢̢̧̨̡̢̨̨̢̢̨̡̡̨̧̧̨̢̢̧̛̛̯̜̰̹̘̱̘͚̫̞͓̜̰͓̭͓͉̘͕̜͓̠̗͍͍̬͚̗̮̥͔̟̦̱̬͍̻͖̖̦͖̲̠̠̜̫̫̞͖̳͓̻̬̖̱̬̫̠̝̮͈̠̻͇͇͓̙̗̼͎̭̻̖͙̩̥͈̠͙̝̺̖̝̟̻͈̮͚͈̱͔̳͚̖̣̖̮̟̩͓̳̙͈̠̼̹̜̩͇̹͙̤̦̞̬͎̱̱̗̮͖̞̘̫̤͔̖̙̲̰̖̭͕̘̩͔̬̝̺͕͙̬̠͎͇͈̘͚͚̣̤̗̠̝̩̰̭̺̙̼͎̩̦̰̰͔̬͓̥͕͕̗̹̣̩̪͖̹̲̹̘̟̻̜̫̝͉͖̗͔̗̞̗̹̟͈̗͓̞̘̮͈̹̳̖̝̺̘̟̥̣͕͈̬͙̞͉̩̪̖̲̮̦͇̰͎̪̖̹̝̯͍͓̳̩͚̦̝̰̺̙͔̼̺̹̫̟̗̜̝̏͑̀̌̈́͛͑́͂͗͗̓̎̎̅̾̓̂̆̆͗̀̓͋̾͌̿́̈́̈̽̒̊̍͐̅̀̐̓͂̅̔́̈́͗͒̍̒̂̈́̓̌̃͗͗̏̓̐̏̄͆́͆̀͋̎͊̅̂͆͋͐͂͂͋́̂̒́̾͋̑̏̉̿͑̒́͒̅̾̉̈́̕̚̕̕͘̕̕̚͘̚̕͘͜͜͜͜͜͜͜͠͠͠͝͝͝͝͝͠͝ͅͅͅͅͅͅͅͅͅͅͅȨ̴̡̨̢̢̨̧̢̨̨̨̧̡̨̧̡̧̨̨̧̢̢̡̧̡̧̛̛̛̛̛̛̛̛͔̝̜̞̤͙̦̝̜͓̜͚̖͕̦͙̘̟̻̳̝̩̬͎̩͔̩̳̝͍̮͔̹̺͇͉̮̱̟̹͉̩̼͚̘͖̻͍͈̞͙͖̭͉͈͓̘̲̫͔͍̦̠͎̱̗̲̰̪̦̥͙̝̩͈͔̱͍̘͉̻̫̲̠̰̞͖̗͓̦̦̖̺̹̖̩̘͉̥̮̤̼͔͈̻̗̗̞͖̭͓̟̭̦̭͚̰̞̖̫̭͎̼̲͈͎̟̳͔̙̬̻̘̮̰̫̰̟̥̙͖̪̺͉̦̹̱̳̫̤̯͎̜̤̠̜̣̩͎̗̩̼͙̹̣̭̬͈̩̗̺̹̜͖̦̭͙̬͇̟̦͙̥̠̲̬͍̣̗̫̗̰̞̖̪̟͇̪̥̺̤̬̻̱̘̱̗̘͈͍̘̫̟̟̝̻̹͎̤̲͓͈̭̽͗̌̇̇̐̈̏́̆͊̔̀̈̐͑̈́̓̋̐̇͊̈͛̈̓̌͛́͂̄́̓͆̋̾̽̈́͛̄͊̋͛̈́͒̂̅̐̿̀̐͂̊̽̐͆͋́̑͌̄́̆͆́̔́̔̃̾͂́̆̈̏̃͛̏͌̈́́̈́́̈̏̎̒̐̈̾̋̾̋̍̆̈́̓̀̾̍͂̐̀̅͛̀̒̃̂̋͐̈̈́̆̀̔̇͂̊̈͒̑͆͑́̒̎̑́͛̔̄̂͗́̃́̇̄͌͒͛̉̾͂̿͒̇̄̈́́͛̄̓̓͐͆̔̍͊̃͐́̇̔̈̇͐̏̕͘̚͘̕̕̚͘̚̚̕̕̕͜͜͜͜͜͜͜͜͠͠͝͝͝͝͠͝͝͠͝͝͝͝ͅͅͅͅͅͅ ̷̢̡̢̢̨̢̧̛̛̛̛̛̳͙̠̜̻̹̜͕͈͎̱̝͙̟̤̯͍̹͚̪̻̗͔͎̲͓͉̱͇̳̦̭̱͔͚͍͈̞̗̰̮̯̳͈̣̦̹̤̦̩̖̙͓̬͎͖͖̗̭̟̼̯̯͓̥̠͑̈̐̍́̇̽̽͊̍̀̊́͗̽̉̃͋̽̌̿̊͗̑͗́̽͑̑̊̀́͒͋̓̃̆̂̀̃̒̀̾̎͑̓̈́̈́͌̊͊͊̎̈́̋́̀͌̅̀͑͂̾́̄̈́̿͆͐̾̒̓̾͋̾̆̔͛̎͊̎͑̑͊̐͒̉̇̈́̒́͗̀̄̿̋̑͌̈̈́̊͂̊̀̾̔́͗̓̿̓̀͌̏͆̑́́͑̂̈́̾͑̏̽̂́͒̈̔̓̀͛̊̂̆͒̾̊̀̒̾͌̌̅͐͌͂̈̃̐̈́͐͌̈́̚͘̕̚̕̕̕̕̚͜͝͠͠͝͠͠͠ͅͅM̵̢̡̧̨̨̢̡̧̢̡̡̨̨̨̡̢̛̛̛̛̛̛̛̞̙̪͉̺̯̼̼̟̳̱̟͖͕̮͔̗̻̜̭̯̱͕̠̮͕̩͉̣̟̻̥̤̻̪̹͍̯͓̝͚͚̤̖͙̞̲͔̟͔͚̬͔͚̦̻̩̦̩̫̼̫̝̱̟̥͖̫̹͉̺̫͎̠̝͖̺͕̟̘̞̦̠̰̦̬̘͇͕͍͖̞̬̹͚̠͈̰̙̖̗̻̝̤̟͕͇̝̹̺͍̹̟̬̫̲̞͇̜̗̭̪̗̦̞͍̪͙̺̣̬̘̭̹͉̹͎̮̥͕̫̬͙͕̖̣͇̖̤͇̘͔͈͕̝͇̮̺͓̥̤͙̣̠͚̘̰̠͕̭͔̞̳͓̭̺̯̭̾̔̌̎̆̔̿̆̇́̂̏̇̆̒̇̊͛͆͑̓̈́͗̌̒̊͛͒͆̇̀̆̿̔͊̑̎̈́̊̈̿̄̾̏́̑̀̇̀̓̀̄̄̎̀̉͑͛̊͒̇͑͋̉̈́̿̈̋͛̈́̔̽́̏̍̄̈́͗̄͌͗͆̀͌́̈́̀̏̾̏̽̋͋̏̓͗͗͊̒̊̇̇͋͗͛̀̈́̌͌͋͐̾̇̔̅̌͆̂̓͑̅̅̊̆̎̓̂̓̌͆͑̇̔́́͒̇͒̍̉͒̍̌̅̈͊̔̋͂͗̀͋̀̅͛̒̒͆̓̈͂̓̎̋̀̈́̇̃̽̔̀̽̉́͊͒̅̑͛͌̀͋̀͒̈́̀͌̑̽̾̄̂̉̓̋̀̂̒̐͗̊̄͒͑̽͛͛̊͗̏̊́̐͒̑̑̀̈͐̆̀̐̉̌̊̈̎̽̐̍͂̐̽̈́̊̿̆̐̌̇̒̚̚̚͘̕̕͘̚͘̚̕̕͘̕͘̕̚͘̚̚̚͘̕͘͜͜͜͝͝͝͝͠͝͝͝͝͠͝͝͝͠͝͠͝͝͝͠͝͝͝͝͝ͅͅͅͅͅͅƠ̸̧̨̨̨̡̧̨̧̛̞̝̻̠̩͕̟̝̹̱̩̟̻̜͈̺̗̬̳̮̦̠̰̣̱̳̣̪̳̫̱̠͔̹͍̬͓̪̰̭̼͚̫̜̭̟̗͈̪̺̪̣̰̤͎̜̙̺̦̞̱̩͙̻̰͉̠̣̹͙̣͈͖̩̳̤̤̱̹̻̠͕̟̟̩͎̜͖̙̩̘̲̍͛̓̒̈́̋̑̉̀̋̆̀̋̈́͊̒̀̔̄̾̅͗͗̿̀̐͒́͊̌̿́̔͌̀́͗́̾͋̐́̿́̏̋̽͋̒̓̒͑̇̿̀̈́̎̀́͐̍̀̽͗̈͑̔̄͛̓̄̈́̈́͑̂͑̉̿̑̈́̒̔̃͋́̈́̈̋̐͌̂͌̃̋̐͐̏̓͐̅͂̃̈̋̊̃̈́̋̏͐̔͛̽̈́̆̓͋̏̾͑͊̊͛̄̀̆͒̿̀̇̈́̽̽̍͒̔̊͋̑̎͐́̍͐̇̉́͛̂͑́̋̍̌̌̍̒̀̓̃̈̉͑̄̀̉͛́̍͆̉́͐͐͛̐̇̾̐̀̅̈̏͊̇̊̂͐̑̆͒̇̈͆͌̈̎̿͒͂̃̋̾̋̀͌̂͛͌̽͛̆͌̏͐̏̑͐̃͐̈́͛͆̉͛̌͑̒͛̀͂̉̈̄̏͒̿̓̒̅̀͋͛͐͐̎͛̀͌̉̓͋͊͐͆̏̾͂̉͆́̈́̔͗͗͂̉̕͘͘̚̚̚͘̕̕̕̚̚̕͘͝͠͝͝͝͠͝͝͝͠͠͠ͅͅͅͅŘ̵̡̧̧̢̧̢̡̧̧̡̨̡̡̧̨̨̢̡̢̢̛̛͈̮͚͉̘̬̝̣̤̲͚͔͕͖͍̦̲̭͈̳̗̲͚͎̯̣͖̥͔̰͈͇͇̻̩̱̣͖̬͓̝͎̲̦̞͙̗̤̣̭̟̩̯͍̙̞͓͖̗̻̺̱̠͉̮̫̲͙̻̼̫̭̙͙̬͍͇̤̙̫̣͇̘̣̜͎̖͖̖̗͉̯͍̥̦̼̰̯̤̠̰̯̖̬͕̫͓̟͈͔̮̝̮̲͚̹̭̻̬͎̙̥̱̯̩̺͖̙͔̤̝̬̱̬̤͙̭̜͈͉̪̖̜̝͔̠̮̠͍̪̖̱̹̼͇͍̪̼̬̠͇̘͉̦̤̤̱̭̙̬̙̜̹͉̜͉̪̳͕̗͇͔̦͙͖̹̩̬̞̯̪̪̥̜̞͓̺̳̰̠̉̊͒̍̀̋̐̀̅̿̏̇̐̈́̾̅̄̎̔̃̀̄̅̉̐͑̃̑͆́͊͛͑̒̊̊͊̾͛͌̓̀͌̒̋̐̉͆͌̇́̇̽̈́͆̑̐̌̆̾̊̓̂̐͊̐͐̀̍̿͐̆́́́̓͌̂͒͒̂͊̈́́̐̋͒̄̃̈́͑̐̾̾́͊̒̋̈́̍͑͊͋̀́̇̒̽͌̓̀̑̈̇̅̅̏̄̓͌̽̍̂̀̆̎̈͋̄̏̔͋̓̋̈́͛͑̒̒͛̆̎͗̋͗̈́̂̈̌̎̈̈́̚͘͘͘͘͘̚͘͘̚͘͘͘̚͘͜͜͜͜͜͠͝͠͝͝͝͠͠͝͝͠͠͠͝ͅͅͅT̴̡̧̡̛̛̼̜̱͖̭̰̣͈͎̙̮̺̥̟͙͕̤͍̬̭̟̲̮̱͓̺͎̝̬͉̖͓̫̟̝̩̤̻̜̞̖̹̠͔͎͓͚̳͇̱͙͍̞̖̦͇͖̖͔̦͚̬̠̘̥̦̟̤̖͚͌̒̃́͑̄̀̂̐͑̄̋͌̎̓̈̌͊̂͂͋̔͌͂͗͛̾́͊̂̎͌̀̈́̅͑͒̾̎̾̓̾͋̉̓̃̎̃́̿͋̇̈̋̾̍͐̎̍͋͘͘̕͘̚̕͘̚̕͝͝͝͝͠͝͠͝͝͠͝ͅͅͅĄ̶̢̧̨̧̢̨̢̨̛̛̛̛̛͚̠̰̩̪̼̞͇̜͓͚̩̘̞̳͇̯̖̫̼͍̩̝̦͎̯͙̲̱̗̝̱̖̮̻̞̺̣͕̹̲̮͚̠̝̫̱̺̙̭̬̘̩̫̬̦͕͙̩̼͕̞̬̤̣̰͉̖͇͙͕͚͕̤̯̮̖̳̍̀͛̏̇́̿̽͐́̀̈́͊̄̀̇̌̀̈́̋̀̇̀̆̾͛̒͆̓̐̏̔̈́̅̓̈́̊̊͌̉̊͋̑͆͋̇̄̿̑̿̈́̇̔͆̒͐̈́̋̏̃̾̀̆̔̔͒̃̅̉̿̑̄̔͊̑̌̎́̆̽̚̚̚̚̕̕̕̕̕͘͘̚͜͝͠͠͝͠͠͝͠ͅĻ̸̡̡̨̡̡̡̢̛̛̛̼̼̝͕̖̗͕̱̖̟̞͔͙̗͕̝̫̙̝͍̪̤̳̲̮̣̼̞̝̲͚̭͉̦̬̜̥̱̰̝̥̫͎̺̘̱͕͓͕̣̦͎̦͚͉̮̯͎̩̟̯̳̘͓͎̼̫̭́͐͑͋͊̋̊̊̑͋̋̏͂̿̽̉̄̋̏͛̃̑͋̈́̇̒̇͆͌̇̌̃̌̇̈̇̈̍͋̈́̔́̋̇̂̒̀̔̆͑͊͗̔̈̾͗̄̈̈́͒̈́̐͂̿̂̇͒̊̕͘͘͘͘͘̕͜͝͠͝͝͝͠͝ͅ
Rikka's Left Thigh lemme explain real quick, in rhythm games, when this song starts playing, the game acts weird, there is an entire video showing that ru-vid.com/video/%D0%B2%D0%B8%D0%B4%D0%B5%D0%BE-zmhsiErQs0g.html
0:06 Sierpiński tetrahedron 0:10 looks like a simple diverging recursion 0:12 Cantor set 0:13 n+1-th iteration of Menger sponge 0:14 Length of Sierpiński curves after n iterations (should be "the The Euclidean length of the nth iteration curve S_n is ") 0:14 iterations of the "Dragon" curve 0:15 Area of a Koch snowflake after n iterations 0:16 Barnsley fern 0:17 denumerable set 0:18 Burning Ship fractal 0:19 the set of attractors of an iterated function system, but only on the complexes 0:20 Special case of f(z) that can use some Newton 's method for its Julia set (see its Wikipedia for some beautiful graphics) 0:21 A snippet of Wikipedia's derivation of the real iteration number of a Julia set 0:22 Same as 0:20 0:23 ??? 0:24 Lévy flight (More generally, a property of Pareto distribution with xm = 1) 0:25 Newton's method 0:42 Menger sponge
WHO ARE YOU AND WHAT DO YOU WANT????????????? ARE YOU SOME KIND OF GOD OR SOMETHING????!?!?!?11?!2?2!2?2!2!2!2292928087987896789879976&7886554765434535313135315431654165716581977188
Aleph0, or Aleph null is a mathematical idea, a concept that the aleph numbers describe every number. Aleph0 is the smallest of these, meaning that aleph0 is every countable number in the world, that does not include commas
for those who want help with rhythm games: start bpm at 0:46 is 130 every drop, BPM adjusts by 5, then 10, then 15 and so on, leaving with you with a BPM of 265 gl and let us players live :)
@@monsieurassembling6139 right!! I honestly can't wait someone to mod with this song. Honestly? A whole week of just LeaF music and gotta save the best for last, which is Aleph-0. I'm down for a Leaf FNF Mod
0:01 Octahedron 0:07 Sierpiński tetrahedron 0:11 Mandelbrot set equation 0:12 Cantor set equation 0:13 (n-1)th iteration of Menger sponge equation 0:14 Length of Sierpiński triangle curves after n iterations equation and dragon curve equation 0:15 Area of Koch snowflake equation 0:16 Barnsley fern equation 0:17 Denumerable set 0:18 Burning ship fractal equation Edit: How the heck did I get 60 likes in over a year? 😅😅😅
She?...... Wait... She, "The Maths" in spanish its "Las Matemáticas" so is "the song" being "La cancion", "Las" & "la" are female terms, so... Holy cow you have a point
Aleph-0 is a type of infinity, the 3d fractals are a calculation of aleph-0, and the glitches are in internal errors, because no computer can hold the data of all of aleph-0
@@donandremikhaelibarra6421 the number of digits of aleph 0 can't be held in such a computer as well. nor the digits of the digits. there's an aleph 0 number of layers that can't be fit probably
Sad that this just got recommended to me 6 years after. This is such a good recording of the creation of the universe. Very cool that you got to go back in time just to film it for us.