In algebra, the rational root theorem states a constraint on rational solutions of a polynomial equation
[tex]a_nx^n+a_{n-1}x^{n-1}+\dots +a_1x+a_0=0[/tex]
with integer coefficients. Solutions of the equation are roots of the polynomial on the left side of the equation.
If [tex]a_0[/tex] and [tex]a_n[/tex] are nonzero, then each rational solution x, when written as a fraction [tex]x=\dfrac{p}{q}[/tex] in lowest terms satisfies
For the polynomial [tex]f(x) = 3x^3 -5x^2 - 12x + 20[/tex], [tex]a_3=3,\ a_0=20.[/tex] Find factors of these coefficients:
Therefore, possible roots are
[tex]\pm 1,\ \pm 2,\ \pm 4,\ \pm 5,\ \pm 10,\ \pm 20,\ \pm \dfrac{1}{3}, \ \pm \dfrac{2}{3},\ \pm \dfrac{4}{3},\ \pm \dfrac{5}{3},\ \pm \dfrac{10}{3},\ \pm \dfrac{20}{3}.[/tex]
Check all that apply:
[tex]f(2)=3\cdot 2^3 -5\cdot 2^2 - 12\cdot 2 + 20=3\cdot 8-5\cdot 4-24+20=24-20-24+20=0;[/tex]
[tex]\\f(-2)=3\cdot (-2)^3 -5\cdot (-2)^2 - 12\cdot (-2) + 20=3\cdot (-8)-5\cdot 4+24+20=-24-20-24+20=0;[/tex]
[tex]\\f\left(\dfrac{5}{3}\right)=3\cdot \left(\dfrac{5}{3}\right)^3 -5\cdot \left(\dfrac{5}{3}\right)^2 - 12\cdot \left(\dfrac{5}{3}\right) + 20=3\cdot \left(\dfrac{125}{27}\right)-5\cdot \left(\dfrac{25}{9}\right)-20+20=\dfrac{125}{9}-\dfrac{125}{9}=0.[/tex]
Then
[tex]f(x) = 3x^3 -5x^2 - 12x + 20=3(x-2)(x+2)\left(x-\dfrac{5}{3}\right).[/tex]
Answer: there are three possible factors
[tex](x-2),\ (x+2),\ \left(x-\dfrac{5}{3}\right).[/tex]
The last one can be rewritten as 3x-5, then [tex]f(x) =(x-2)(x+2)\left(3x-5\right).[/tex]
