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Polynomial Remainder Theorem

Revision as of 12:22, 29 July 2017 by Awesomepi31415926535 (talk | contribs) (Created page with "==Statement== The Polynomial Remainder Theorem states that for <math>\frac{f(x)}{x-a}</math> the remainder is <math>f(a)</math> ==Proof== Assuming <math>r</math>=re...")
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Statement

The Polynomial Remainder Theorem states that for $\frac{f(x)}{x-a}$ the remainder is $f(a)$

Proof

Assuming $r$=remainder $q(x)$=quotient and $f(x)$ as a polynomial:

$f(x)=q(x)(x-a)+r$

If we plug in $a$ into the polynomial $f(x)$ and $x-a$ (Do not plug $a$ into $q(x)$. Assume $q(x)$ as only a variable for quotient) we get:

$f(a)=r$

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