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First of all, you can factor (x^2-x-12) to (x-4)(x+3). This gives ((x-4)(x+3))/x)/(x/(x-4)).
Isnt there a formula to factor second degree equations of the type: ax^2+bx+c. I think there is, what is it?
If you find the solutions, ie, x=4 and x=-3, then it is simply x-4=0 and x+3=0 or (x+3)(x-4)=0. That's only if A=1 though. I don't think there is a formula, considering the complexity is basically that of a quadratic formula. There are methods like completing the square that help, though.
you mean stuffs like this?Difference of Squares = (A2-B2) = (A-B)(A+B)Sum of Squares = (A2+B2) = (A-Bi)(A+Bi)