Відео

What ISN'T Grahams number an upper bound for 😅

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2:47 "OMG!! What's *THAT* ? ...It wasn't there this morning." "Perhaps it fell out of James' luggage."

Naprawdę cieszę się że mogę spodziewać się nowego filmu co miesiąc, mam nadzieję że udz ci się rozwinąć swój kanał.

Bardzo ciekawy flilm już czekam na następny

to calculate pentation, i will fruck this up for you 2↑↑↑3 = 2↑↑2↑↑2 2↑↑2↑↑2 = 2↑↑4 2↑↑4 = 65,536 so 2↑↑↑3 = 65,536

take the vid down or change the title

in my circle we say, if you can en passant, you literally have to en passant

ahh yes, new tutorial about chess or a chess video... it's nice.

Great to know that others share the idea of if one can en passent, one is to en passen.

Sorry you had to wait for so long! I had relocated to Iceland couple of weeks ago for a few months. I didn't finish editing this video at home, had to do it on my laptop and had many various problems. But, eventually, the video is here! I promise the next video comes quicker!

g_g_g_g_64=mega grahms number

1:56 MAP MEN MAP MEN MAP MAP MAP MEN MEN MEN

I can't understand your thick accent

An ordered pair is not bigger than infinity should've just used infinite cardinals

banger video

how can an ordered pair exceed infinity, thyre two different thing, that wouldnt work right?

wait what about Bird's Array Notation

7:36 the number of up arrows is placed above it, not below

3^^^^3 is the number G0 in construction of Graham's number, where G(n+1)= 3, G(n) arrows, and another 3. Graham's number would be G(64).

i expected mroe from them

the hells a H

dam

You found a hidden hard disk with 50 TB of stock images on it. But the math is nice

this channel is so underrated

bad video! :-:D:(;

Free. 🇵🇱

Orthodox chirstianity aswell as other religions with monk traditions have separate monasteries for men and women. Thats like toilet gender question. Should be males allowed in nun places? I mean if people consciously want to split up by gender, its weird trying to undo that because of muh progressivism.

Thats like monastary reservation or beardy orthodox dudes taking whole peninsula, 3 thousands people, see no reason to distrupt it for no important reason whatsoever. Most of the women never heard of that place, and have no reason to take tour there.

I enjoyed not just the content, but how you presented the content. Would love to see more videos like this one. 🙂

We see in 2D, but we perceive in 3D. If we saw in 3D, we could perceive 4D.

I like to imagine a future where handling these insanely huge numbers would lead humans into making more efficient calculators which would in turn better the average computer processor. Nvidia would of course charge $4000 dollars for it and keep me from ever affording one, but it would be cool.

g0=4 ðen

Only a god or goddess could comprehend numbers like these!

Seriously underrated 🔥 very interesting

I KNOW SOMETHING BIGGER THEN EVEN G64, TREE(3)

I'm not sure I got pentation 100% right. so 3 pentation 3 would equal 3 to the power of 7.625.597.484.987?

When you learn that in the fast growing hierarchy, the Graham sequence is only equal to f(ω+1) which is barely getting started

But what if you do pentation with different numbers?

"a number which we'll call your mom" 💀💀💀💀💀💀💀

"let's call this number Bob" 💀💀💀💀💀 just call it C₀

I'm not gonna sugarcoat it (BIGFOOT*g1000000)⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆⬆(BIGFOOT*g1000000)

Great video! Thought the video'd for sure have at least like 100k views!

Can't wait for him to see BEAF and Hyper E

what about g65

enter infinitynum.sb3. v0.1 can reach up to {10, 10, 10, 9e15}. let me explain how insanely uncomparable that is to grahams number. first. lets define a{c}b. a{c}b = a^^^...^^^b (with c up arrows) example: 3{4}3 = 3^^^^3 = g1 then, we define a{{1}b. a{{1}}b = a{a{a{...}a}a}a with b-1 nestings. example: 3{{1}}65 = 3{3{3{3{3{...}3}3}3}3}3 > grahams number after that, we define a{{c}}b. a{{c}}b = a{c}b but with 2 brackets (a{{c}}b = a{{c-1}}(a{{c-1}}(a{{c-1}}...)) and in general, a{{...{{1}}...}}b (with n brackets) is the same as a{{1}}b but with n brackets a{{...{{c}}...}}b (with n brackets) is the same as a{c}b and a{{c}}b but with n brackets. we can rewrite a{{...{{c}}...}}b as: {a, b, c, n} (n is the amount of brackets) so, infinitynum.sb3 v0.1 can reach up to {10, 10, 10, 9e15}, or 10{{{...{{{10}}}...}}}10 with 9e15 brackets. (btw 9e15 = 9,000,000,000,000,000 or 9x(10^15))

jumpscare alert 2:26