Chapter 6 FaCtoring and the distributive ProPerty 175- 1 23
4
1
123
41
14
423
4− −^42
+=− −
+=⋅+
+− −
+x = +− −
xx
xx
xx
xxx( 33
442 3
47
4)
xxx
xx
x+= +− +
+=−+
+7.^1
3
1
231
31
xx−^2 xxxx 31+
−−=
−+
()−+()=
−⋅ +
++
−+1
31
11
x 31x
xx()()x= ++
−+= +
−x
xxx
x11
312
()()() 3 (xx+1)Summary
In this chapter, we learned how to:• Use the distributive property of multiplication over addition to rewrite expres-
sions. The distributive property is ab()±=±cabac. We generally use this
property where one or more of a, b, and c are variables.
• Combine like terms. Terms are alike if they have the same variables raised
to the same powers. Combine like terms by adding their coefficients.
• Distribute negative numbers and other negative symbols. Distributing a neg-
ative number, negative sign, or minus sign changes the sign of every term
inside the parentheses.
• Perform basic factoring. Begin by writing each term as a product of numbers
and variables, dividing out the common factor(s) from each term. The
common factor goes outside of the parentheses, the terms go inside the
parentheses.
• Factor by grouping. Some expressions having four terms can be factored
with a technique called factoring by grouping. Factor the first two terms
and look at the last pair of terms. If the last pair of terms can be factored
so that it has a common factor with the first pair of terms, factor out that
common factor. You are then left with two terms having a common factor.
Finish by factoring this common factor.