@@slamopfpnoobneverunsub5362 normally instead we would have (a^b) be b repeats of a, so the limit of BMS would be (0)(1^w). This means that you can have (0)(2,1^w) = (0)(2,1,1,1,...). But I will use a different system, which is more convenient to program.
3:14. The end of the massive journey, as the numbers became too obscure at the end of BMS.
do part 34
can you make more BMS LNGI with extension?
eventually, I will. Also the movie BMS LNGI got deleted due to an error in the video, I am fixing it.
Can you do Normal LNGI next?
ruclips.net/video/pDhOGV9sRsA/видео.html
@@solarzone7247 thanks
BMS LNGI part 33: To the limit of BMS
What's next?
BMS LNGI part FINAL: Beyond the limit of BMS
Is(0)(1,1… with an infinite amount of 1’s)
The same as absolute infinity
not close. It's not even w_1^CK.
The end. GG!
Can you try and extend BMS 🤨
I can. For this is not the last video in the series...
@@solarzone7247
Can you do something like
(0,) x (0)
While the number after “x” is the number of (0,0,…)s they have?
@@slamopfpnoobneverunsub5362 normally instead we would have (a^b) be b repeats of a, so the limit of BMS would be (0)(1^w). This means that you can have (0)(2,1^w) = (0)(2,1,1,1,...). But I will use a different system, which is more convenient to program.
2nd!