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There are several real-life scenarios that can be modeled using linear expressions. This type of expression is crucial for the development of more advanced topics. This lesson will discuss how to factor linear expressions and how to take advantage of this technique.
Catch-Up and Review
Here are a few recommended readings before getting started with this lesson.
Challenge
Using the Distributive Property
In the following applet, different algebraic expressions are expanded using the Distributive Property.
Is it possible to work these expressions in reverse? Consider the following example.
Try rewriting the above expression as the product of and a different expression.
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Discussion
Monomial
A monomial is an algebraic expression consisting of only one term. It is a product of powers of variables and a constant called the coefficient.
| Expression | Why It Is a Monomial |
|---|---|
| Any constant is a valid monomial. By the Zero Exponent Property, | |
| The coefficient of a monomial can be | |
| The coefficient can be negative. | |
| A monomial can have numbers in the denominator. |
Although they appear to be monomials at first glance, the single-term expressions in the following table do not satisfy the definition of a monomial.
| Expression | Why It Is Not a Monomial |
|---|---|
| The variables of a monomial cannot have negative integer exponents. | |
| Monomials cannot have variables in the denominator. | |
| The variables of a monomial must only have whole number exponents. |
Pop Quiz
Is This a Monomial?
Determine whether the given expression is a monomial.
Discussion
Degree of a Monomial
Pop Quiz
Is This a Linear Expression?
Determine whether the given monomial is a linear expression.
Example
Using a Coupon For Snacks
Diego is having friends over this evening to watch movies and hang out. It would be great if they had some snacks while watching the movies! He suddenly remembers that he has a coupon in his wallet.
a The following expression represents how much Diego will pay for his snacks after using the coupon.
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b Is the expression a linear expression?
{"type":"choice","form":{"alts":["Yes","No"],"noSort":false},"formTextBefore":"","formTextAfter":"","answer":0}
Hint
a Identify the coefficient and the variable of the expression.
b What is the power of the variable shown in the expression?
Solution
a Begin by taking a look at the expression that represents how much Diego will pay after using the coupon.
The only operation involved in this expression is the multiplication of the variable and the coefficient, so this expression is a monomial.
b The given expression has already been determined to be a monomial. Now it is asked whether it is a linear expression. Recall that when no exponent is written on a variable, the exponent is assumed to be
There is only one variable in the above expression and its exponent is one, so it is a linear expression. Think of this monomial as a linear expression that has no constant term.
Discussion
Factoring a Linear Expression by GCF
A monomial whose degree is is a linear expression. Another linear expression can be created by either adding or subtracting a constant from a monomial of degree
1
Find the GCF of the Linear Expression
expand_more Start by finding the GCF of the linear expression. Rewrite each term as the product of its factors.
The GCF of the initial expression is
2
Rewrite Each Term in Terms of the GCF
expand_more Next, rewrite each term of the initial expression as the product of the GCF and another factor.
Now write the initial expression as follows.
3
Factor Out the GCF
expand_more Finally, use the Distributive Property to factor out the GCF.
The expression between the parentheses can to be examined to determine whether it is possible to continue the factorization. Here, the terms do not have any more common factors, so the linear expression is completely factored.
Example
Fruit for Sale
After grabbing the snacks for his get-together, Diego saw that the store had a sale on fruit.
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Hint
Find the common factors of each term.
Solution
The following expression represents the fruit that Diego got at the grocery store.
Diego wants to split the fruit into three equal parts. This should not be a hard task since both and share the factor Begin by writing the factors of each term.
This means that the expression can be rewritten as The factor means that the fruit will be split into equal groups. The factor means that each person will get apples and banana.
Pop Quiz
Find the GCF of a Linear Expression
Consider the given linear expression and identify greatest common factor (GCF) of the terms.
Closure
Factoring a Linear Expression Using GCF
The challenge presented at the start of the lesson can be solved by using the methods learned in this chapter. Consider the given linear expression.
Begin by finding the factors of and
Notice that they only share one factor, This means their greatest common factor (GCF) is Next, rewrite each term as a product involving the GCF.
Finally, rewrite the expression by factoring out
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