Timeless Theorems of Mathematics/Rational Root Theorem

The rational root theorem states that, if a rational number ${\displaystyle {\frac {p}{q}}}$ (where ${\displaystyle p}$ and ${\displaystyle q}$ are relatively prime) is a root of a polynomial with integer coefficients, then ${\displaystyle p}$ is a factor of the constant term and ${\displaystyle q}$ is a factor of the leading coefficient. In other words, for the polynomial, ${\displaystyle P(x)=a_{n}x^{n}+a_{n-1}x^{n-1}+a_{n-2}x^{n-2}+...+a_{0}}$, if ${\displaystyle P\left({\frac {p}{q}}\right)=0}$, (where ${\displaystyle a_{i}\in \mathbb {Z} }$ and ${\displaystyle a_{0},a_{n}\neq 0}$) then ${\displaystyle {\frac {a_{0}}{p}}\in \mathbb {Z} }$ and ${\displaystyle {\frac {a_{n}}{q}}\in \mathbb {Z} }$

Proof[edit | edit source]

Let ${\displaystyle P(x)=a_{n}x^{n}+a_{n-1}x^{n-1}+a_{n-2}x^{n-2}+...+a_{0}}$, where ${\displaystyle a_{i}\in \mathbb {Z} }$.

Assume ${\displaystyle P({\frac {p}{q}})=0}$ for coprime ${\displaystyle p,q\in \mathbb {Z} }$. Therefore, ${\displaystyle P({\frac {p}{q}})=a_{n}({\frac {p}{q}})^{n}+a_{n-1}({\frac {p}{q}})^{n-1}+a_{n-2}({\frac {p}{q}})^{n-2}+...+a_{1}({\frac {p}{q}})+a_{0}=0}$ ${\displaystyle \Rightarrow a_{n}p^{n}+a_{n-1}p^{n-1}q+a_{n-2}p^{n-2}q^{2}+...+a_{1}pq^{n-1}+a_{0}q^{n}=0}$ ${\displaystyle \Rightarrow p(a_{n}p^{n}-1+a_{n-1}p^{n-2}q+a_{n-3}p^{n-2}q^{2}+...+a_{1}q^{n-1})=-a_{0}q^{n}}$

Let ${\displaystyle w=a_{n}p^{n}-1+a_{n-1}p^{n-2}q+a_{n-3}p^{n-2}q^{2}+...+a_{1}q^{n-1}\in \mathbb {Z} }$

Thus, ${\displaystyle w=-{\frac {a_{0}q^{n}}{p}}}$

As ${\displaystyle p}$ is coprime to ${\displaystyle q}$ and ${\displaystyle w\in \mathbb {Z} .}$, thus ${\displaystyle {\frac {a_{0}}{p}}\in \mathbb {Z} }$.

Again, ${\displaystyle a_{n}p^{n}+a_{n-1}p^{n-1}q+a_{n-2}p^{n-2}q^{2}+...+a_{1}pq^{n-1}+a_{0}q^{n}=0}$ ${\displaystyle \Rightarrow q(a_{n-1}p^{n-1}+a_{n-2}p^{n-2}q+...+a_{1}pq^{n-2}+a_{0}q^{n-1})=-a_{n}p^{n}}$

Let ${\displaystyle (a_{n-1}p^{n-1}+a_{n-2}p^{n-2}q+...+a_{1}pq^{n-2}+a_{0}q^{n-1})=v\in \mathbb {Z} }$

Thus, ${\displaystyle qv=-a_{n}p^{n}}$ ${\displaystyle \Rightarrow v=-{\frac {a_{n}p^{n}}{q}}}$

As ${\displaystyle q}$ is coprime to ${\displaystyle p}$ and ${\displaystyle v\in \mathbb {Z} .}$, thus ${\displaystyle {\frac {a_{n}}{p}}\in \mathbb {Z} }$.

${\displaystyle \therefore }$ For ${\displaystyle P(x)=a_{n}x^{n}+a_{n-1}x^{n-1}+a_{n-2}x^{n-2}+...+a_{0}}$, if ${\displaystyle P({\frac {p}{q}})=0}$, (where ${\displaystyle a_{i}\in \mathbb {Z} }$ and ${\displaystyle a_{0},a_{n}\neq 0}$) then ${\displaystyle {\frac {(a_{0})}{p}}\in \mathbb {Z} }$ and ${\displaystyle {\frac {a_{n}}{q}}\in \mathbb {Z} }$. [Proved]