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Two polynomials can be added or subtracted by combining their like terms. Additionally, the polynomials can be multiplied by using either the FOIL method, the Box Method, or the Distributive Property. Notice that the result of any of these operations is always a polynomial. Therefore, the set of polynomials is closed under addition, subtraction, and multiplication.
| Operation | Methods | Result |
|---|---|---|
| Addition | Combining Like Terms | Polynomial |
| Subtraction | Combining Like Terms | Polynomial |
| Multiplication | The FOIL Method The Box Method The Distributive Property |
Polynomial |
This lesson completes the set of the four basic operations for polynomials by investigating the methods to divide two polynomials.
Catch-Up and Review
Here are a few recommended readings before getting started with this lesson.
Explore
Analyzing the Product of a Polynomial and
Consider the polynomials and and the constant 
Let be the product of the two given polynomials — that is, Find and evaluate it at Next, consider a different pair of polynomials and repeat the process. What conclusion can be made about Repeat the process as much as needed.
Discussion
Dividing Polynomials
Adding, subtracting, and multiplying polynomials are operations that can be performed by applying the properties of real numbers and the product of powers property and then combining like terms. However, dividing polynomials may not be so intuitive.
The good news is that polynomial division can be performed similarly to dividing integer numbers. In long division notation, the numerator is placed underneath the division symbol and the denominator is placed to the left. As a refresher, the process for calculating is shown.
When the denominator divides the numerator evenly, the remainder is Otherwise, the remainder is a natural number less than the denominator. The division of two integers can always be written in terms of the quotient and remainder as follows.
This process can be imitated for dividing polynomials, but instead of having just numbers, the process involves algebraic expressions. Here, both the quotient and the remainder are polynomials and the division is complete once the remainder's degree is lower than the denominator's degree.
Method
Polynomial Long Division
To perform the division of two polynomials, the degree of the numerator must be greater than or equal to the degree of the denominator. For example, consider the following division.
The process for finding the division of two polynomials is similar to the process of dividing integers and is summarized in the following five steps.
To verify whether the division is correct, substitute the dividend, divisor, quotient, and remainder into the following equation and check if a true statement is obtained.
Notice that unless the remainder is equal to the division of two polynomials is not always a polynomial. Therefore, the set of polynomials is not closed under division.
1
Sort the Terms and Write as Long Division
expand_more To begin, write both polynomials in standard form. If the numerator has missing terms, include them with coefficient For example, the numerator will be written as Then, write the polynomials as in long division notation.
2
Divide the Leading Terms
expand_more Divide the leading term of the numerator by the leading term of the denominator. In this case, divide by
Write the resulting monomial above the horizontal bar.
3
Multiply the Result From Step by the Denominator
expand_more The result from step is Therefore, multiply by the denominator
Next, write the resulting expression below the numerator and try to align the common powers.
4
Subtract the Product From Step From the Numerator
expand_more Subtract the polynomial obtained in step from the numerator.
The result of the subtraction — the remainder — is the polynomial This means that the division of the given polynomials can be written as follows.
However, since the degree of is the same as the degree of the denominator, the division is not done yet. Thus, repeat steps until the remainder's degree is less than the denominator's degree.
5
Repeat Steps Until the Remainder's Degree is Less Than the Denominator's Degree
expand_more Steps are repeated until the polynomial obtained in step has a lower degree than the denominator. Dividing the leading terms and gives as result. Next, multiply the denominator by and write the result at the bottom.
Now, subtract the two polynomials at the bottom.
This time, the resulting polynomial has a degree of which is lower than the denominator's degree. Therefore, the division is complete. This implies that the quotient of the division is and the remainder is
Finally, the initial polynomial division can be written as the plus the division of the and the
Extra
What Happens When the Numerator's Degree Is Less Than the Denominator's Degree?When the numerator has a lower degree than the denominator, the result from dividing the leading terms will have a negative exponent. Therefore, it will not be a term of a polynomial. For example, consider the following division.
The result of dividing the leading terms is which is not a monomial.
Example
Voltage of a Circuit
Electrical power is defined as the product of the voltage of a circuit and the current flowing through it. In other words, electrical power equals voltage times current.
From this relation, a formula for finding the voltage of a circuit can be derived.
Consider a circuit for which the power is modeled by and the current is modeled by Perform the required division to find an algebraic expression that represents the voltage of the circuit.
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Hint
Divide the polynomials using long division.
Solution
According to the formula, the voltage of a circuit is found by dividing the power by the current.
In this case, both the power and the current of the circuit are represented by polynomials.
To find the voltage, these two polynomials have to be divided. Such division can be done following the steps of polynomial long division. First, write both polynomials in standard form, filling in any missing terms in the numerator with zeros. In only the quadratic term is missing.
Now, write the dividend under the division symbol and the divisor to the left.
The first term of the quotient is found by dividing the leading term of by the leading term of
Next, write the monomial above the horizontal bar.
Multiply the divisor by and write the resulting expression below the dividend. In this case, the multiplication gives
Subtract the resulting polynomial from the dividend.
Since the remainder has degree and the divisor has degree the division is not done yet. Therefore, the process will be repeated until the remainder's degree is less than
The division is complete. The polynomial above the line is the quotient and the polynomial at the very bottom is the remainder.
Finally, the voltage of the given circuit can be represented by the following expression. 
Discussion
Dividing a Polynomial by
The polynomial long division is a powerful method that helps dividing any two given polynomials. However, when the divisor is a binomial of the form there is a shortcut that can be applied.
Method
Synthetic Division
When dividing a polynomial by a linear binomial, a binomial of the form there is an alternative method to the polynomial long division called the synthetic division. This method uses the constant term of the binomial and the coefficients of the numerator to compute the quotient. Consider the following division.
This division can be found following the next six steps.
The steps of synthetic division are shown below.
Once the quotient and the remainder are found, the original division can be written as the plus the division of the and the divisor.
1
Set Up the Division Using and the Coefficients of the Numerator
expand_more Recall that the denominator is a linear binomial in the form The denominator is so the value of is The division symbol for synthetic division is L-shaped. The number is written to the left.
After the numerator is written in standard form, its coefficients and constant term are written to the right of the division symbol. Fill in any missing terms with a zero.
The numerator does not have a linear term, so a was added between and Note that the number at the left of the division symbol is the opposite to the constant term of the divisor.
2
Bring Down the Leading Coefficient
expand_more Bring the leftmost coefficient down across the line. In this case, is written below the horizontal line.
3
Multiply by the New Number Below the Line
expand_more Multiply the number written under the line in the previous step by and write the product below the next coefficient above the line. In this case, is multiplied by The product is written in the next column below
4
Add the Numbers in the Column Above the Line
expand_more Now, add the numbers in the column above the horizontal line, then write the result below the horizontal line in the same column. In this case, and are added and their sum, is written below them and under the horizontal line.
5
Repeat Steps and Through the Last Column
expand_more Steps and are repeated through the last column. In this exercise, is multiplied by and the product is written in the next column and above the line.
The numbers in this column are added and the sum is written below the line.
Then is multiplied by and the product is written in the next column and above the line.
Finally, the numbers in the last column are added together and the sum is written below the line.
The division is now complete.
6
Write the Quotient and Remainder
expand_more The rightmost number below the line is the remainder of the division. The remaining numbers below the line represent the coefficients of the quotient.
In this case, the remainder is The quotient is a quadratic polynomial with coefficients and
Notice that the quotient is always one degree lower than the numerator because the denominator is a linear binomial. For the same reason, the remainder is always a number.
Example
Using Synthetic Division
Consider the following polynomial.
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b Find the quotient and remainder of the division
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Hint
a Use synthetic division. Remember to fill in the missing terms with zeros.
b Use synthetic division. Remember to fill in the missing terms with zeros.
Solution
a Since the divisor is a binomial of the form synthetic division can be used. First, note that has neither a cubic term nor a linear term. Therefore, fill in these two terms with zeros.
b As in Part A, the denominator is a linear binomial, For that reason, synthetic division can be used again. The coefficients at the right of the division symbol are the same, but this time the value of is
Discussion
The Remainder of a Polynomial Division
From synthetic division, the division can be written as the quotient plus and the division of the remainder and Here, is a real number.
However, this relation can be further manipulated. For example, the fractions can be eliminated entirely by multiplying both sides of the equation by
Two important results follow from the last equation.
Rule
The Remainder Theorem
If a polynomial is divided by a binomial of the form then the remainder of the division is equal to
Proof
Consider the division of and a binomial of the form
The division can be written in terms of the quotient and the remainder by synthetic division or polynomial long division.
Since the divisor has degree and the degree of the remainder has to be lower, the remainder has degree This implies that is a constant. Thus, write instead of
Now, multiply both sides of the last equation by
Finally, evaluate the last equation at
Discussion
Remainder
As when dividing integers, there is special significance when the remainder of a polynomial division is zero. First, it implies that the denominator divides the numerator perfectly, and, consequently, that the result of the division is a polynomial.
Additionally, if the divisor is a linear binomial the fact that the remainder is gives a connection between the denominator and the roots of the numerator. The following theorem expands on this concept.
Rule
The Factor Theorem
Let be a polynomial and a real number. The binomial is a factor of if and only if
The binomial is a factor of if and only if
Notice that means that is a zero of Therefore, the theorem can also be stated as follows.
The binomial is a factor of if and only if is a zero of
The Factor Theorem is a special case of the Remainder Theorem and establishes a connection between the zeros of a polynomial and its factors.
Proof
Since the theorem is a biconditional statement, the proof will consists of two parts.
- Part I: If is a factor of then
- Part II: If then is a factor of
Part I
If is a factor of then can be written as the product of and a certain polynomialPart II
Consider the division of andExample
Applying The Remainder Theorem
a What is the remainder when is divided by
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b Consider the polynomial Without evaluating the polynomial, find
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Hint
a Use the Remainder Theorem.
b Use the process of synthetic division to find
Solution
a According to the Remainder Theorem, the remainder when a polynomial is divided by a binomial of the form is equal to the polynomial evaluated at
▼
Substitute for and evaluate
b Synthetic division can be used to find without evaluating the polynomial. Rather, the process of synthetic substitution will be used. First, set up the division symbol and the coefficients of Remember to fill in the missing terms with zeros. Then, write to the left.
Pop Quiz
Finding Remainders
Find the remainder of the given polynomial division.
Closure
Comparing Polynomial Long Division and Synthetic Division
When it comes to dividing polynomials, there are two main methods that can be applied — namely, polynomial long division and synthetic division. The table below lists some pros and cons of each method.
| Pros | Cons | |
|---|---|---|
| Polynomial Long Division | Works for every polynomial division | Involves variables, powers, and many computations |
| Synthetic Division | Involves only numbers | Works only when the divisor has the form |
To clarify or simplify the calculations, the minus signs can be removed by distributing them to the parentheses. Also, the remaining terms in the dividend can be hidden in the third, fifth, and seventh rows until the terms are needed. This cleaner look can be seen below.
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