A Really Interesting Logic Puzzle to Show How Quadratic Functions Have Two Answers

There's like a really interesting logic puzzle that proves this. I see it on Quora all the time. But, it's +- because when you multiply the same number together, you can turn out different answers if it's either negative or positive, when you have sums involved. And that +- also comes from the two dimensions of a square. You get a 0 integer in cubes, which relates to the augmentation of i. So 0, +- are three separate dimensions.



Something like 



x - y = 6

y*y= 16

x + y = ?



The x can be different numbers. If y is -4 then x is 2, and if y is + 4 x is 10. That represents the quadratic expression. So the third equation can be either -2 or 14.



[Also] a cube will always retain its positive or negative signs. 8^3 can't be both -8 and +8, it'll always keep its negativity or positivity. But the two can cancel out in the quadratic function, and leave you with a quadratic and leave you also with a third dimension zero expression. That's how Cubic Equations work. That's why. [This is] something I learned in grade school.  [W]hat's infinite about a cubed number? And that's also why i doesn't exist in cubic numbers, but it does again in quartic. Omega shouldn't even be involved with it.