This puzzle appears in episode 6, and it’s about a dice game called “singles, doubles, triples.” Select the text below if you want to read a hint.
Try selecting the first bullet point alone, see if that helps. If not, select the first two, etc. The answer isn’t really important. The whole point is to enjoy the process of doing a puzzle.
I made an excel spreadsheet to tackle this one. There are 6*6*6=216 possible rolls of three dice, each of which happen with equal probability. For each, I categorized it as single (all three dice are different), double (one matching pair among the three dice), or triple (all three dice are alike). And for each I calculated the product of the three dice.
120/216 were singles, and the total for all of those was 4,410.
90/216 were doubles, and the total for all of those was also 4,410. I was shocked. SHOCKED! That these were equal! There must be a reason. Or is it a fluke? I don’t know. Moving on…
6/216 were triples, and the total for all of those was 441. Weird, right? Exactly one tenth of the other ones? What the hell?
So if you multiply all scores for the triples by ten, everything evens out, and the odds are equal for everyone.
I have to say…. the symmetry of this blows my mind..