How do you solve x^3-6x^2-4x+24>0 using a sign chart?

1 Answer
Narad T.
Dec 31, 2016

The answer is x in ] -2,+2 [ uu ] 6, +oo[

Explanation:

Let f(x)=x^3-6x^2-4x+24

As a polynomial, the domain of f(x) is D_f(x)=RR

Then, by trial and error,

f(2)=8-24-8+24=0

Therefore,

(x-2) is a factor

To find the other factors, we do a long division

color(white)(aaaa)x^3-6x^2-4x+24color(white)(aaaa)x-2

color(white)(aaaa)x^3-2x^2color(white)(aaaaaaaaaaaaa)x^2-4x-12

color(white)(aaaa)0-4x^2-4x

color(white)(aaaaaa)-4x^2+8x

color(white)(aaaaaaa)-0-12x+24

color(white)(aaaaaaaaaa)-12x+24

color(white)(aaaaaaaaaaaa)-0+0

Therefore,

x^2-4x-12=(x+2)(x-6)

and x^3-6x^2-4x+24=(x-2)(x+2)(x-6)

Now, we can establish the sign chart

color(white)(aaaa)xcolor(white)(aaaa)-oocolor(white)(aaaa)-2color(white)(aaaaa)2color(white)(aaaaa)6color(white)(aaaa)+oo

color(white)(aaaa)x+2color(white)(aaaaa)-color(white)(aaaa)+color(white)(aaaa)+color(white)(aaa)+

color(white)(aaaa)x-2color(white)(aaaaa)-color(white)(aaaa)-color(white)(aaaa)+color(white)(aaa)+

color(white)(aaaa)x-6color(white)(aaaaa)-color(white)(aaaa)-color(white)(aaaa)-color(white)(aaa)+

color(white)(aaaa)f(x)color(white)(aaaaaa)-color(white)(aaaa)+color(white)(aaaa)-color(white)(aaa)+

Therefore,

f(x)>0 when x in ] -2,+2 [ uu ] 6, +oo[

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