its just... so beautiful! It could'nt have happened to a more deserving person hahaha. Nice burning though, i think you are officially a tetris pyromaniac now!
kitaruy at tetris concepts linked me to this. i have to agree with chad that it is not only comically brutal, but also quite impressive. you fought a good fight.
This is the most comically brutal thing I've seen in a long time! Odds of this happening (or worse) is about 1 in 1.6 million! I wonder how much longer it would have held out on you... damn.
Classic Tetris Sorry, just got this message. I just took a 2nd look at this. Assuming an average of 1/7 odds of I block (at least approximately true), the odds of a 0-drought is 1/7 =14.3%, a 1-drought is 6/7 * 1/7 = 12.2%, a 2-drought is (6/7)^2*(1/7) = 10.5%, ..., 80-drought (exactly) is (6/7)^80*(1/7) = 1 in 1,587,966 (which is erroneously where I derived my first number) so odds of 0-80 drought *cumulative* is 99.9996% so odds of 81-drought or worse is actually 1 in 264,661.
@@CrannBethadh a 30 drought is 1/100 so a 60 Drought is 1/10,000. A 21 drought is about 1 in 25, so 81 drought is perfectly at 260k to 1 like you said, yes.
Anyway, this is video proof of NES Tetris' RNG cheating so hard it didn't even bother trying to hide it behind depriving the player of another block (so the I-piece wasn't the rarest). The RNG is usually rather sneaky about depriving the I-block; it'll usually try to hide it by making it SLIGHTLY more common than one of the other blocks.
*long-bar has left the game*
What's worse than getting an I-piece drought? Getting I-piece, L-piece and J-piece droughts simultaneously.
me past level 35 somehow
Yeah if I am in a drought I want to get to the end. I am pissed I didn't see where this one ended.
Yeah, that's the problem with 91-bag
I think I heard "that's ridiculous" as well, heh. An understatement.
The 56 droughts from Joseph at the 2020 CTWC Group A Final broughts me here!
(man what have you done to the Tetris god?)
and a 30 drought in the same game. crazy stuff and super impressive how well he handled it
good capture, amazing that there can be that long!
I see some microtransaction potential for this game, $0.01 for a long bar
I think the probability of an 81 piece drought is (1-1/7)^81, which is approximately 0.0000037784. Pretty, pretty, pretty low.
Oh my gosh, I'm not sure why I didn't notice this video before, but this is absolutely sick! The stats on the left at the end are hilarious too :D.
its just... so beautiful! It could'nt have happened to a more deserving person hahaha. Nice burning though, i think you are officially a tetris pyromaniac now!
ok ben :bearlaugh:
I think this is still WR drought captured on film, 7 years later
The closest is the 65 piece drought from jeff vs svavar in ctwc 2018
kitaruy at tetris concepts linked me to this. i have to agree with chad that it is not only comically brutal, but also quite impressive. you fought a good fight.
The book of Revelations explains hell as an "endless Tetris game without the existence of long bars." Plus some stuff about fire and brimstone
I think the one after the next one was gonna be a long bar kappa
It would've been a z piece
I found something very rare. No comments by agamescout below this video yet. 🤔😁
Definitely ridiculous. Well played
Sometimes I watch this still and just giggle. Is it STILL the longest known drought?
No someone recently got more...on lvl 18 though
El castigo de dios.
Goes to show that Tetris is truly based on skills and luck
0.0003% chance of an 81 drought... that sucks
That's also equivalent to 3 in 1 million
Where's the bar???
BUCOOOOOOOOOOOOO!
_LIIIIIIIINE PIEEECE_
And still there's no sign of it
This is the most comically brutal thing I've seen in a long time! Odds of this happening (or worse) is about 1 in 1.6 million! I wonder how much longer it would have held out on you... damn.
Hi Chad how did you calculate this?
+Classic Tetris WOW, you're here!? DANG!!! Nice to seeing ya... :)
Classic Tetris Sorry, just got this message. I just took a 2nd look at this. Assuming an average of 1/7 odds of I block (at least approximately true), the odds of a 0-drought is 1/7 =14.3%, a 1-drought is 6/7 * 1/7 = 12.2%, a 2-drought is (6/7)^2*(1/7) = 10.5%, ..., 80-drought (exactly) is (6/7)^80*(1/7) = 1 in 1,587,966 (which is erroneously where I derived my first number) so odds of 0-80 drought *cumulative* is 99.9996% so odds of 81-drought or worse is actually 1 in 264,661.
@@CrannBethadh a 30 drought is 1/100 so a 60 Drought is 1/10,000. A 21 drought is about 1 in 25, so 81 drought is perfectly at 260k to 1 like you said, yes.
Also keep in mind the next piece was NOT a long bar, and the piece after that is also random. This was not a completed streak
goddamn. nice survival though
Odds are (9/10)×(17/20)⁸¹, or ~579,194 to 1. Harsh. 😶
Imagine if he bought a lottery ticket instead
Good playing.
I counted 91
maybe I'm dumb
20
20
20
20
20
3
Would’ve been even longer
how to start playing at this speed?
Trust me you wouldn’t be able to
am i right in assuming you also drug it out a little further than normal just to see how far the drought would last?
no
BRUH
oof
Anyway, this is video proof of NES Tetris' RNG cheating so hard it didn't even bother trying to hide it behind depriving the player of another block (so the I-piece wasn't the rarest). The RNG is usually rather sneaky about depriving the I-block; it'll usually try to hide it by making it SLIGHTLY more common than one of the other blocks.