Numbers are all made up stuff, and they’re all the same. Here, lemme prove it; let a=b, and…
a² = ab // multiplying both sides by "a"
2a² = a²+ab // adding a² to both sides
2a²-2ab = a²-ab // subtracting 2ab from both sides
2(a²-ab) = 1(a²-ab) // isolating (a²-ab)
2 = 1 // dividing both sides by (a²-ab)
From there you can prove any number is any number. 36=36 or 36=8 or 36=π.
the trick
If a=b, you can’t divide both sides by (a²-ab), because it’s a division by zero.
Numbers are all made up stuff, and they’re all the same. Here, lemme prove it; let a=b, and…
From there you can prove any number is any number. 36=36 or 36=8 or 36=π.
the trick
If a=b, you can’t divide both sides by (a²-ab), because it’s a division by zero.
Lots of zeros in that due to a=b (before looking at the spoiler text)
Bingo. The whole “a=b” is just a distraction to hide it, otherwise as soon as you hit the third step you cancel both out, and end with 0=0.