yurkler
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the original equation is 4x^2-6x^2-12x+9=0
I got to this point: (2x^2)(2x-3)+(-3)(4x-3)=0
I got to this point: (2x^2)(2x-3)+(-3)(4x-3)=0
Ah, this looks like the "factoring by grouping" method, which, unfortunately, doesn't work for ALL cubic polynomials. The rational root test, as micromass mentioned, is your best bet.yurkler said:the original equation is 4x^2-6x^2-12x+9=0
I got to this point: (2x^2)(2x-3)+(-3)(4x-3)=0
yurkler said:the original equation is 4x^2-6x^2-12x+9=0
I got to this point: (2x^2)(2x-3)+(-3)(4x-3)=0
Harrisonized said:You mean 4x3-6x2-12x+9=0?
The roots of a polynomial must be a factor of the product of the first term and the last term. Therefore, we have to try all the factors for 4*9=36. There's this really convenient method for factoring polynomials like this. It's kind of like long division, but not really.
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