SECTION 7.1 The Fundamental Property of Rational Expressions 423NOTE The numerator orthe denominator could have been factored in the first step
in Example 5.Factor - 1 from the numerator, and confirm that the result is the same.(b)Factor. (Step 1)Factor the numerator completely.=y- 2 Fundamental property (Step 2)=
21 y+ 221 y- 22
21 y+ 22=
21 y^2 - 42
21 y+ 222 y^2 - 8
2 y+ 4since the
denominator is 0
for this value.yZ-2,(c)Factor. (Step 1)= Fundamental property (Step 2)m+ 4
2 m+ 3=
1 m+ 421 m- 22
12 m + 321 m- 22m^2 + 2 m- 8
2 m^2 - m- 6NOW TRYWe write statements of equality of rational expressions with the understanding
that they apply only to real numbers that make neither denominator equal to 0.CAUTION Rational expressions cannot be written in lowest terms until after
the numerator and denominator have been factored.Numerator cannot be factored.6 +x
4 x6 x+ 9
4 x+ 6=
312 x+ 32
212 x+ 32=
3
2
Divide out the
common factor.⎧⎨⎩
Already in lowest termsWriting in Lowest Terms (Factors Are Opposites)
Write in lowest terms.
To get a common factor, the denominator can be factored as follows.Factor out.
=- 11 x-y 2 Commutative property= - 11 - y+x 2 - 1y-xy-xx-y
y-xEXAMPLE 5With this result in mind, we simplify.from above.= Fundamental property NOW TRY1
- 1
, or - 1
= y-x=- 11 x-y 211 x-y 2- 11 x-y 2
x-y
y-xNOW TRY
EXERCISE 4
Write each rational expres-
sion in lowest terms.
(a)
(b)
k^2 - 36
k^2 + 8 k+ 123 x+ 15
5 x+ 25NOW TRY ANSWERS
- (a)^35 (b)kk-+^62
NOW TRY
EXERCISE 5
Write in lowest terms.
10 - a^2
a^2 - 10
- 1
mZ-^32 , mZ 2We are factoring out ,
NOTmultiplying by it.- 1