Polynomial function

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Polynomial functions is of degree ${\displaystyle n}$ is a function of the form:

${\displaystyle f(x)=a_{n}{x^{n}}+a_{n-1}{x^{n-1}}+a_{x-2}{x^{x-2}}+...+a_{0^{3}}}$

where ${\displaystyle n}$ is a integer,and
${\displaystyle a_{n},a_{n-1},a_{n-2},...,a_{0},}$ are real numbers, and ${\displaystyle a_{n}\neq 0.}$

If a polynomial P(c) is divided by x-c,where c is a real number,then the Remainder is P(c).

Consider this Division:

${\displaystyle {\frac {x^{3}-3x^{2}+x+4}{x-2}}=2\leftarrow remainder}$

The qoutient here is ${\displaystyle x^{2}-x-1\,}$,and the remainder is 2.This result may also be expressed as ${\displaystyle x^{2}-x-1+{\frac {2}{x-2}}}$. This means that there is a difference of 2 between the dividend ${\displaystyle x^{3}-3x^{2}+x+4\,}$,and the product of the quotient ${\displaystyle x^{2}-x-1\,}$ and the divisor ${\displaystyle x-2\,}$.

For each polynomial ${\displaystyle P(x)\,}$ of the positive degree ${\displaystyle n\,}$ and any real number ${\displaystyle c\,}$ , there exist a unique polynomial ${\displaystyle Q(x)\,}$ and a real number ${\displaystyle R\,}$ such that:

${\displaystyle P(x)=(x-c)\bullet Q(x)+R}$

where ${\displaystyle Q(x)\,}$ is a degree ${\displaystyle n-1\,}$ , and ${\displaystyle R\,}$ is the remainder.

Proof:

1.${\displaystyle P(x)=(x-c)\times Q(x)+R}$

2.${\displaystyle P(c)=(c-c)\times Q(c)+R}$

3.${\displaystyle P(c)=0\times Q(c)+R}$

4.${\displaystyle P(c)=R\,}$

The Equation is

Synthetic Division, hand-in-hand with the Remainder Theorem can be used as a convenient way to find values of polynomial functions.

The Remainder Theorem states that when the polynomial P(x) is divided by x-c, the remainder is P(c).

For examples,if the polynomial ${\displaystyle P(x)=2x^{3}-8x^{2}+19x-12\,}$ is divided by x-3, the remainder is P(3).

Illustrative Examples

A. Use synthetic division and the Remainder Theorem to Find The Value of ${\displaystyle P(x)=2x^{3}-8x^{2}+19x-12\,}$ at 3.

Solution:

By Synthetic Division By Remainder Theorem

The Remainder is 27 .Therefore ,P(3)=27

• Soledad Jose-Diloa,Ed.d.,Fernando B. Orines & Julieta G. Bernabe,"Advanced Algebra (Trigonometry and Statistics)" Textbook for Fourth Year ISBN 971-07-2227-1

• Polynomial
• Function(Mathematics)
• Polynomial remainder theorem

• Polynomial Functions
• Polynomial Functions