Polynomial Long Division - Lecture Notes | MAC 1140, Study notes of Mathematics

Material Type: Notes; Class: PRECALCULUS ALGEBRA; Subject: MATHEMATICS - CALCULUS AND PRECALCULUS; University: Florida State University; Term: Fall 2007;

Typology: Study notes

Pre 2010

Uploaded on 08/31/2009

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Polynomial Long Division
An Example.
In this section you will learn how to rewrite a rational function such as
in the form
The expression
is called the quotient, the expression
is called the divisor and the term
is called the remainder. What is special about the way the expression above is
written? The remainder 28
x
+30 has degree 1, and is thus less than the degree of the
divisor .
It is always possible to rewrite a rational function in this manner:
Algebra Solver
Solves your algebra problems with step-by-step explanations. www.Bagatrix.com
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DIVISION ALGORITHM: If
f
(
x
) and are polynomials,
and the degree of
d
(
x
) is less than or equal to the degree of
Page 1 of 10Polynomial Long Division
8/28/2007http://www.sosmath.com/algebra/factor/fac01/fac01.html
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Polynomial Long Division

An Example. In this section you will learn how to rewrite a rational function such as

in the form

The expression

is called the quotient, the expression

is called the divisor and the term

is called the remainder. What is special about the way the expression above is

written? The remainder 28x+30 has degree 1, and is thus less than the degree of the

divisor.

It is always possible to rewrite a rational function in this manner:

Algebra Solver

Solves your algebra problems with step-by-step explanations. www.Bagatrix.com Ads

DIVISION ALGORITHM: If f(x) and are polynomials,

and the degree of d(x) is less than or equal to the degree of

How do you do this? Let's look at our example

in more detail. Write the expression in a form reminiscent of long division:

First divide the leading term of the numerator polynomial by the leading term

of the divisor, and write the answer 3x on the top line:

Now multiply this term 3x by the divisor , and write the answer

under the numerator polynomial, lining up terms of equal degree:

Next subtract the last line from the line above it:

f(x), then there exist unique polynomials q(x) and r(x), so

that

and so that the degree of r(x) is less than the degree of d

(x). In the special case where r(x)=0, we say that d(x)

divides evenly into f(x).

then to multiply out:

and then to simplify the right side:

Indeed, both sides are equal! Other ways of checking include graphing both sides (if you have a graphing calculator), or plugging in a few numbers on both sides (this is not always 100% foolproof).

Another Example. Let's use polynomial long division to rewrite

Write the expression in a form reminiscent of long division:

First divide the leading term of the numerator polynomial by the leading term x

of the divisor, and write the answer on the top line:

Now multiply this term by the divisor x+2, and write the answer

under the numerator polynomial, carefully lining up terms of equal degree:

Next subtract the last line from the line above it:

Now repeat the procedure: Divide the leading term of the polynomial on the

last line by the leading term x of the divisor to obtain -2x, and add this term to

the on the top line:

Then multiply "back": and write the answer under the last line polynomial, lining up terms of equal degree:

Subtract the last line from the line above it:

You have to repeat the procedure one more time. Divide:

Write the expression in a form reminiscent of long division:

First divide the leading term of the numerator polynomial by the leading term

of the divisor, and write the answer x on the top line:

Now multiply this term x by the divisor , and write the answer

under the numerator polynomial, carefully lining up terms of equal degree:

Next subtract the last line from the line above it:

Now repeat the procedure: Divide the leading term of the polynomial on the last line by the leading term of the divisor to obtain -5, and add this term to

the x on the top line:

Then multiply "back": and write the answer under the last line polynomial, lining up terms of equal degree:

Subtract the last line from the line above it:

You are done! In this case, the remainder is 0, so divides evenly into .

Consequently,

Multiplying both sides by the divisor yields:

In this case, we have factored the polynomial , i.e., we have written it as a product of two "easier" (=lower degree) polynomials.

Exercise 1. Use long polynomial division to rewrite

Answer.