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Calligraphy exam: Write down the number 37, spelled out, nicely.
explananation: https://explainxkcd.com/wiki/index.php/2966:_Exam_Numbers
Man, I remember getting the kindergarten question at a point where my older brother had already told me that you can just add more digits and it always gets bigger.
I was so angry at that question, because what the hell do you want me to do here? I think, I ended up just cramming as many 9s into the box as I could, but that question is almost philosophical.
Clearly, I’m able to think of an even larger number by cramming one more 9 into there. So, what I’ve written down is always wrong. It is never the largest number that I’m actually able to think of. I’m telling you, I got forced into this life of lies and crime at a young age.
the real answer is n+1
My dad is a retired Math professor.
The laughter had around this started at Cosmology, then erupted at Game theory and he couldn’t breathe after the last one.
This is probably one of his most clever comics.
2 is pretty big. Oh, or π! That’s probably the biggest number I’ve seen this month.
0
is bigger than
1
but my
2
is bigger than yours
draw a picture of the galaxy with a giant 1 going through it. that’s pretty reasonable.
The game theory one is easy. Put down 999,999,999,999 factorial. Then everyone got it wrong, and the curve will reflect that.
Basically, write down the biggest number you can think of
Only if it’s “10 more” in the sense that anything bigger than that is also accepted. If you need to hit 57, because the average is 47, then yeah, good luck.
The goal in the upstream comment wasn’t to get the answer right for you, it’s to skew the average so badly that nobody gets it right, and the bell curve adjusts accordingly for everyone.
Not a bad strategy to be honest
That’s why it’s always between 1 and 100. Never seen one without an upper and lower bound.
Write NaN to destroy your classmates
sqrt(-1)
Joke is on you, I wrote Tree(Tree(3))
For the final answer, I guess Big Omega, unless you don’t count infinities in which case my answer is getting up and arguing with the professor because "the number of times I can recursively write
TREE(TREE(TREE...
is just as arbitrary as declaring a biggest theoretical number and assigning it a new symbol.That’s actually the correct answer. If you don’t get angry and start an argument, you fail.
The set of real numbers between 0 & 1 is larger than any countable infinity.
Yass baby compare infinites to me harder