Answer:
Any rational root of f(x) is a factor of -49 divided by a factor of 25.
Step-by-step explanation:
The Rational Root Theorems states that :
If the polynomial [tex]P(x)= a _nx^n +{a_{n-1}x}^{n-1}+............{a_{2}x}^{2}+{a_{1}x}^{1}+a_0[/tex] has any rational roots, then they must be in the form of
[tex]\pm \frac{factors of a_0}{factors of a_n}[/tex]
Consider the polynomial
[tex]f(x)=25x^7-x^6-5x^4+x-49[/tex]
in this case, we have [tex]a_0=-49[/tex] and [tex]a_n=25[/tex]
Any Rational root of f(x) is a factor of [tex]a_0=-49[/tex] divided by a factor of [tex]a_n=25[/tex]
