I'm too lazy to make a precise calculation, but yes, the probability of such a card distribution happening within the same fixed minute, assuming that the stacks always go in when 1 of the 5 opponents is dealt KK, is 1 in a few billions.
Even if 1.3 hands are dealt per minute per table (I don't know the speed at Unibet
), AA gets dealt in ~0.6% of cases at 1 table within the minute, hence 1 in 5 million at 3 tables.
The probability of 1 out of 5 opponents at a fixed table being dealt KK (out of the 50 cards not visible to Hero) is 0.024-0.025 (let's denote it 'p', I'm too lazy to do the exact combinatorics; it's 5 times the probability of a fixed opponent having KK (5 times 6/(50*49/2)) minus the probability of 2 opponents having KK at the same time), then, by the
binomial distribution formula, the probability of this happening at exactly 2 out of the 3 independent tables is 3*p*p*(1-p) ~ 0.002 = 1/500 (as C(3,2)=3). Multiplying that by one five-millionth, we get about 1 in 2.5 billion.
P.S. Lol at the aliases of Seats 1 and 4 in hand 3
(the latter is the translation of the b-word into Russian; Slavs like to exploit the fact that English-speaking staff doesn't understand transliterated Russian words). I pity seat 1, who had probably been out of luck at HexaPro [Unibet's jackpot SNGs], switched to cash games to escape the doomswitch but lost with KK to your AA
Last edited by coon74; 12-08-2018 at 09:54 PM.