If f(-2)=0 what are all the factors of the function f(x)=x^3-2x^2-68x-120

Since [tex]f(-2)=0[/tex], it follows by the polynomial remainder theorem that [tex]f(x)[/tex] is perfectly divisible by [tex]x+2[/tex]. Dividing, we have

[tex]\dfrac{x^3-2x^2-68x-120}{x+2}=x^2-4x-60[/tex]

and factoring further, we have

[tex]f(x)=(x+2)(x^2-4x-60)=(x+2)(x+6)(x-10)[/tex]

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erato erato · Answer 2 · 2019-07-03T12:41:28+02:00

Answer:

All the factors of the function f(x) are:

[tex](x+2),\ (x+6)\ ,(x-10)[/tex]

i.e.

[tex]f(x)=x^3-2x^2-68x-120=(x+2)\cdot (x+6)\cdot (x-10)[/tex]

Step-by-step explanation:

We are given a cubic function f(x) in terms of variable x as follows;

[tex]f(x)=x^3-2x^2-68x-120[/tex]

Also, we are given that:

[tex]f(-2)=0[/tex]

This means that -2 is a zero of the function f(x)

Hence, f(x) could be written in the form of:

[tex]f(x)=(x+2)q(x)[/tex]

where q(x) is a two degree polynomial.

i.e. we get:

[tex]q(x)=\dfrac{f(x)}{x+2}\\\\i.e.\\\\q(x)=\dfrac{x^3-2x^2-68x-120}{x+2}\\\\i.e.\\\\q(x)=x^2-4x-60[/tex]

We can factorize q(x) further by using the method of splitting the middle term as follows:

[tex]q(x)=x^2-10x+6x-60\\\\i.e.\\\\q(x)=x(x-10)+6(x-10)\\\\i.e.\\\\q(x)=(x+6)(x-10)[/tex]

i.e. The factors of f(x) are:

[tex](x+2),\ (x+6)\ ,(x-10)[/tex]