2 Answers

Florian Brinker · Answer 1 · 2017-06-09T07:08:07+0000

The possible potential root of 5x^{11} – 6x^8 + x^3 – 4x + 3 are

p's possible values are 1 and 3
q's possible values are 1 3 5 and 15
hope it helps

JaggerJo · Answer 2 · 2017-06-11T21:21:12+0000

we have

f(x) = 15x^(11) -6x^(8) + x^(3) - 4x + 3

we know that

The Rational Root Theorem states that when a root 'x' is written as a fraction in lowest terms

x=(p)/(q)

p is an integer factor of the constant term, and q is an integer factor of the coefficient of the first monomial.

So

in this problem

the constant term is equal to

and the first monomial is equal to
15x^(11) -----> coefficient is

So

possible values of p are
$1, and\ 3$

possible values of q are
$1, 3, 5, and\ 15$

therefore

the answer is

The all potential rational roots of f(x) are

(+/-)
(1)/(15) ,(+/-)
(1)/(5) ,(+/-)
(1)/(3) ,(+/-)
(3)/(5) ,(+/-)
,(+/-)

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