Here is a hypothesis: Counterintuitive thought about law of conservation of matter
let's say a ball is 1kg for now. if we divide it by 2, we both pieces are 0.5kg and add them up 1kg. if we divide by 3, the same logic applies. so, if we divide the ball into ∞ pieces, then because there is ∞ pieces adding them up with create a larger mass then we started. this is why the law of conservation of mass is not true. lets call the mass of ball n, as n → ∞ most think the mass is asymptotic so infinitesimal though still diverging to 1, but we are literally dividing the ball by ∞ so not some huge number. so the law of conservation of mass is not true in "actual ∞ division". naive approach can say "it still converges to 1kg" but that is naive and incorrect because they are uncountable collections. you can't use ordinary addition, like you can't do 1/∞ + 1/∞ + ... so I am correct right. why didn't people think it this way and why is the law flawed. am i correct