How do you use the rational roots theorem to find all possible zeros of $P (x) = x^{5} - 2 x^{4} + 4 x - 8$ $P(x) = x^5 -2x^4 +4x -8$ ?

Question

How do you use the rational roots theorem to find all possible zeros of $P (x) = x^{5} - 2 x^{4} + 4 x - 8$ $P(x) = x^5 -2x^4 +4x -8$ ?

1 Answer

Impact of this question

1323 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2016-04-26T22:00:04

The only Real zero is $x = 2$ $x=2$

Explanation:

By the rational roots theorem, any rational zeros of $P (x)$ $P(x)$ will be expressible in the form $\frac{p}{q}$ $p/q$ for integers $p, q$ $p, q$ with $p$ $p$ a divisor of the constant term $- 8$ $-8$ and $q$ $q$ a divisor of the coefficient $1$ $1$ of the leading term.

That means that the only possible rational zeros are:

$\pm 1$ $+-1$ , $\pm 2$ $+-2$ , $\pm 4$ $+-4$ , $\pm 8$ $+-8$

Trying each in turn, we find:

$P (2) = 32 - 32 + 8 - 8 = 0$ $P(2) = 32-32+8-8 = 0$

So $x = 2$ $x=2$ is a zero and $(x - 2)$ $(x-2)$ a factor of $P (x)$ $P(x)$ :

$x^{5} - 2 x^{4} + 4 x - 8 = (x - 2) (x^{4} + 4)$ $x^5-2x^4+4x-8 = (x-2)(x^4+4)$

Note that $x^{4} \geq 0$ $x^4 >= 0$ for all Real values of $x$ $x$ so $x^{4} + 4 \geq 4$ $x^4+4 >= 4$ has no Real zeros.

It does have Complex zeros $x = 1 \pm i$ $x=1+-i$ and $x = - 1 \pm i$ $x=-1+-i$ , being the $4$ $4$ th roots of $- 4$ $-4$ .

$color(white)()$
Bonus

Note that although $x^{4} + 4$ $x^4+4$ has no Real zeros or linear factors, it is possible to factor it into a product of two quadratics with Real coefficients.

In fact, we find:

$x^{4} + 4 = (x^{2} - 2 x + 2) (x^{2} + 2 x + 2)$ $x^4+4 = (x^2-2x+2)(x^2+2x+2)$

This is an instance of a nice identity for factoring quartics:

$(a^{2} - k a b + b^{2}) (a^{2} + k a b + b^{2}) = a^{4} + (2 - k^{2}) a^{2} b^{2} + b^{4}$ $(a^2-kab+b^2)(a^2+kab+b^2) = a^4+(2-k^2)a^2b^2+b^4$

Note in particular that if we put $k = \sqrt{2}$ $k=sqrt(2)$ we find:

$(a^{2} - \sqrt{2} a b + b^{2}) (a^{2} + \sqrt{2} a b + b^{2}) = a^{4} + b^{4}$ $(a^2-sqrt(2)ab+b^2)(a^2+sqrt(2)ab+b^2) = a^4+b^4$

In our case we used this with $k = \sqrt{2}$ $k=sqrt(2)$ , $a = x$ $a=x$ and $b = \sqrt{2}$ $b=sqrt(2)$

Science

Math

Humanities

... and beyond

How do you use the rational roots theorem to find all possible zeros of $P (x) = x^{5} - 2 x^{4} + 4 x - 8$ $P(x) = x^5 -2x^4 +4x -8$ ?

1 Answer

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

How do you use the rational roots theorem to find all possible zeros of P(x)=x5−2x4+4x−8P(x) = x^5 -2x^4 +4x -8?

1 Answer

Explanation:

Related questions

Impact of this question

How do you use the rational roots theorem to find all possible zeros of $P (x) = x^{5} - 2 x^{4} + 4 x - 8$ $P(x) = x^5 -2x^4 +4x -8$ ?