a 1 + 3 - 2 b ± + 1 = 1.
a- 3 + x “ x d,Vx + 3 3x
^ Go t It? 1. W hat is the solution of each equation? C heck your solution.
To solve som e rational equations, you n e e d to factor a q uadratic expression.
Think
Is there a different
way to solve this
equation?
Yes. Because it's a
quadratic equation, you
can also solve it by using
the quadratic formula, by
completing the square, or
by graphing.
Problem 2 So l v i n g b y Fact o r i n g^
Multiple Choice What are the solutions of 1 - | = ^§?
CA) -11,12 -4,3 C D -3,4 CD 12, 13
The denominators are x and x 2 .The LCD is x 2.
x2( 1 - - J = x 2 ( 1| ) M ultiply each side by x 2.
x 2 (l) - Xx 2 [ j ~ ) ~ ^ ( ^ r ) Distributive Property
x - x = 12
x 2 - x - 12 = 0
(x - 4)(jc + 3) = 0
x-4 = 0or x + 3 = 0
x = 4 or x = —3
Simplify.
Collect terms on one side.
Factor the quadratic expression.
Zero-Product Property
Solve fo r x.
Ch e c k D eterm ine w h e th e r 4 an d - 3 b o th m ake 1 - ^ H a tru e statem ent.
W hen x = 4:
iJ- - I = I?.o
1 -^1 2 _^12
4 (4 )2
W hen x = —3:
1 _ 1 _ 12
x x 2
1? 12
(~ 3 ) ( - 3 ) 2
1 +U I 2
1 3 9
4 4
The solutions are 4 a n d - 3. The correct answ er is C.
* G o t It? 2. W hat are th e solutions of each eq u a tio n in p arts (a) a n d (b)?
Check your solutions.
, 5 - a. - = -= (^6) ■ c — 6
y y2
b. d + 6 =d+d + 3^11
c. R e a s o n in g How can you tell th a t th e rational eq u a tio n -5 = — 1
has no solutions just by looking at th e equation?
692 C h a p te r 11 Rat io nal Expressions and Funct ions