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Isn’t the actual proof of this theorem really complicated?
Prooving 1+1=2 isn’t exactly a one-liner either isn’t it
teehee :c
fence sitting… what about points on the loop, are they inside or out?
no point exists on the loop, a point can only approach the line
Don’t we usual define shapes with points? Like the corners of a triangle, since they have defined coordinates. Would a point at the same coordinate be inside or out?
Why not? The line has to be at a point in space, so we can just define any point on the line
answer: i was lying :)
Next up: Pigeon hole theorem