2 1 addition and subtraction i

Addition and Subtraction of Rational Expressions

Only fractions with the same denominator may be added or
subtracted directly.
Example A. Add and subtract and simplify the answer.
a. 5 7
8 8
+ =
b. 3x
2x – 3
– 6 – x
2x – 3
=

Addition and Subtraction Rule
(for rational expressions with the same denominator)
A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
b. 3x
2x – 3
– 6 – x
2x – 3
=

A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
5 + 7
8
=
b. 3x
2x – 3
– 6 – x
2x – 3
=

A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
5 + 7
8
=
12
8
b. 3x
2x – 3
– 6 – x
2x – 3
=

A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
5 + 7
8
=
12
8
b. 3x
2x – 3
– 6 – x
2x – 3
=
Write the result in the factored form, cancel the common
factor and give the simplified answer.

A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
5 + 7
8
=
12
8
=
3
2
3
2
b. 3x
2x – 3
– 6 – x
2x – 3
=

A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
5 + 7
8
=
12
8
=
3
2
3
2
b. 3x
2x – 3
– 6 – x
2x – 3
= 3x – (6 – x)
2x – 3

A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
5 + 7
8
=
12
8
=
3
2
3
2
b. 3x
2x – 3
– 6 – x
2x – 3
= 3x – (6 – x)
2x – 3
= 3x – 6 + x
2x – 3

A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
5 + 7
8
=
12
8
=
3
2
3
2
b. 3x
2x – 3
– 6 – x
2x – 3
= 3x – (6 – x)
2x – 3
= 3x – 6 + x
2x – 3
=
4x – 6
2x – 3

A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
5 + 7
8
=
12
8
=
3
2
3
2
b. 3x
2x – 3
– 6 – x
2x – 3
= 3x – (6 – x)
2x – 3
= 3x – 6 + x
2x – 3
=
4x – 6
2x – 3
=
2(2x – 3)
2x – 3

A B
D D
± =
A±B
D
a. 5 7
8 8
+ =
5 + 7
8
=
12
8
=
3
2
3
2
b. 3x
2x – 3
– 6 – x
2x – 3
= 3x – (6 – x)
2x – 3
= 3x – 6 + x
2x – 3
=
4x – 6
2x – 3
=
2(2x – 3)
2x – 3
= 2

To add or subtract rational expressions with different
denominators, they have to be converted to expressions with
a common denominator.

a common denominator. The easiest common denominator to
work with is their LCM.

Multiplier Method
Given the fraction , to convert it into denominator D as ,
the new numerator N =
A
B
A
B * D.
N
D

Multiplier Method
A
B
A
B * D.
In practice, we write that
A
B
=> A
B
* D D.
new numerator N
N
D

Example B.
a. Convert to a fraction with denominator 12.5
4
Multiplier Method
A
B
A
B * D.
A
B
=> A
B
* D D.
new numerator N
N
D

Example B.
4
5
4
=
Multiplier Method
A
B
A
B * D.
A
B
=> A
B
* D D.
new numerator N
N
D

Example B.
4
5
4
* 12
5
4
= 12
the new numerator
Multiplier Method
A
B
A
B * D.
A
B
=> A
B
* D D.
new numerator N
N
D

Example B.
4
5
4
* 12
35
4
= 12
the new numerator
Multiplier Method
A
B
A
B * D.
A
B
=> A
B
* D D.
new numerator N
N
D

Multiplier Method
Example B.
a. Convert to a fraction with denominator 12.
A
B
A
B * D.
5
4
5
4
* 12
3 15
12
A
B
=> A
B
* D D.
5
4
= 12 =
new numerator N
the new numerator
with the new denominator 12.
N
D

b. Convert into an expression with denominator 12xy2.
3x
4y

3x
4y
3x
4y

3x
4y
*12xy23x
4y
=
3x
4y
12xy2
the new numerator

3x
4y
*12xy23x
4y
=
3x
4y
12xy2
3xy

3x
4y
*12xy23x
4y
=
3x
4y
12xy2 =
9x2y
12xy2
3xy

3x
4y
*12xy2
x + 1
2x + 3
3x
4y
=
3x
4y
12xy2 =
9x2y
12xy2
3xy
c. Convert into an expression denominator 4x2 – 9.

3x
4y
*12xy2
x + 1
2x + 3
x + 1
2x + 3
3x
4y
=
3x
4y
12xy2 =
9x2y
12xy2
3xy
=
x + 1
2x + 3
* (4x2 – 9) (4x2 – 9)
new numerator

3x
4y
*12xy2
x + 1
2x + 3
x + 1
2x + 3
3x
4y
=
3x
4y
12xy2 =
9x2y
12xy2
3xy
=
x + 1
2x + 3
* (4x2 – 9) (4x2 – 9)
=
x + 1
2x + 3
* (2x + 3)(2x – 3) (4x2 – 9)

3x
4y
*12xy2
x + 1
2x + 3
x + 1
2x + 3
3x
4y
=
3x
4y
12xy2 =
9x2y
12xy2
3xy
=
x + 1
2x + 3
* (4x2 – 9) (4x2 – 9)
=
x + 1
2x + 3
* (2x + 3)(2x – 3) (4x2 – 9)
= (x + 1)(2x – 3) (4x2 – 9)

3x
4y
*12xy2
x + 1
2x + 3
x + 1
2x + 3
3x
4y
=
3x
4y
12xy2 =
9x2y
12xy2
3xy
=
x + 1
2x + 3
* (4x2 – 9) (4x2 – 9)
=
x + 1
2x + 3
* (2x + 3)(2x – 3) (4x2 – 9)
= (x + 1)(2x – 3) (4x2 – 9)
=
2x2 – x – 3
4x2 – 9

We give two methods of combining rational expressions below.

The first one is an extension of the above Multiplier Method,
the lengthier traditional method is given later.

Example C. Calculate 7
12
+
5
8
–
4
9
The Multiplier Method (Adding/Subtracting Fractions)

12
+
5
8
–
4
9
The Multiplier Method finds the answer by converting the
entire problem to a new denominator, the LCD of all the terms.
(i.e. * LCD/LCD to the problem.)

12
+
5
8
–
4
9
The LCD is 72.

12
+
5
8
–
4
9
The LCD is 72. Multiply the problem by the LCD,
then put the result over the new LCD denominator.
(i.e. * LCD/LCD.)
7
12
+
5
8
–
4
9
( )

12
+
5
8
–
4
9
(i.e. * LCD/LCD.)
7
12
+
5
8
–
4
9
( )* 72 72

Example C. Calculate
6
7
12
+
5
8
–
4
9
(i.e. * LCD/LCD.)
7
12
+
5
8
–
4
9
( )* 72 72 Distribute the multiplication

6 9 8
7
12
+
5
8
–
4
9
(i.e. * LCD/LCD.)
7
12
+
5
8
–
4
9

6 9 8
7
12
+
5
8
–
4
9
(i.e. * LCD/LCD.)
7
12
+
5
8
–
4
9
= (42 + 45 – 32) 72

6 9 8
7
12
+
5
8
–
4
9
(i.e. * LCD/LCD.)
7
12
+
5
8
–
4
9
= (42 + 45 – 32) 72
55
=
72

Example D. Combine 3
4xy2
– 5x
6y
Example E. Combine 5
x– 2
– 3
x + 4

4xy2
– 5x
6y
The LCD is 12 xy2.
x– 2
– 3
x + 4

4xy2
– 5x
6y
The LCD is 12 xy2.
Multiply then divide the problem by the LCD.
3
4xy2
– 5x
6y
( ) * 12xy2 / (12xy2)
x– 2
– 3
x + 4

4xy2
– 5x
6y
The LCD is 12 xy2.
3
4xy2
– 5x
6y
( ) * 12xy2 / (12xy2) Distribute
3
x– 2
– 3
x + 4

4xy2
– 5x
6y
The LCD is 12 xy2.
3
4xy2
– 5x
6y
3 2xy
x– 2
– 3
x + 4

4xy2
– 5x
6y
The LCD is 12 xy2.
3
4xy2
– 5x
6y
3 2xy
9 – 10x2y
12xy2=
x– 2
– 3
x + 4

4xy2
– 5x
6y
The LCD is 12 xy2.
3
4xy2
– 5x
6y
3 2xy
9 – 10x2y
12xy2=
x– 2
– 3
x + 4
The LCD is (x – 2)(x + 4), multiplying the problem by LCD/LCD:

4xy2
– 5x
6y
The LCD is 12 xy2.
3
4xy2
– 5x
6y
3 2xy
9 – 10x2y
12xy2=
x– 2
– 3
x + 4
5
x– 2
– 3
x + 4
( ) (x – 2)(x + 4) / (x – 2)(x + 4)

4xy2
– 5x
6y
The LCD is 12 xy2.
3
4xy2
– 5x
6y
3 2xy
9 – 10x2y
12xy2=
x– 2
– 3
x + 4
5
x– 2
– 3
x + 4
( ) (x – 2)(x + 4) / (x – 2)(x + 4)
(x + 4) (x – 2)

4xy2
– 5x
6y
The LCD is 12 xy2.
3
4xy2
– 5x
6y
3 2xy
9 – 10x2y
12xy2=
x– 2
– 3
x + 4
= [5(x + 4) – 3(x – 2)] / (x – 2)(x + 4)
5
x– 2
– 3
x + 4
( ) (x – 2)(x + 4) / (x – 2)(x + 4)
(x + 4) (x – 2)

4xy2
– 5x
6y
The LCD is 12 xy2.
3
4xy2
– 5x
6y
3 2xy
9 – 10x2y
12xy2=
x– 2
– 3
x + 4
= [5(x + 4) – 3(x – 2)] / (x – 2)(x + 4)
5
x– 2
– 3
x + 4
( ) (x – 2)(x + 4) / (x – 2)(x + 4)
(x + 4) (x – 2)
2x + 26
(x – 2)(x + 4)
= 2(x + 13)
(x – 2)(x + 4)
or

Example F. Combine x
x2 – 2x
– x – 1
x2 – 4

x2 – 2x
– x – 1
x2 – 4
Factor each denominator to find the LCD.

x2 – 2x
– x – 1
x2 – 4
x2 – 2x = x(x – 2)

x2 – 2x
– x – 1
x2 – 4
x2 – 2x = x(x – 2)
x2 – 4 = (x – 2)(x + 2)

x2 – 2x
– x – 1
x2 – 4
x2 – 2x = x(x – 2)
x2 – 4 = (x – 2)(x + 2)
Hence the LCD = x(x – 2)(x + 2).

x2 – 2x
– x – 1
x2 – 4
x2 – 2x = x(x – 2)
x2 – 4 = (x – 2)(x + 2)
* x( x – 2)(x + 2)x
x(x – 2)
– (x – 1)
(x – 2)(x + 2)
[ ] LCD=
x
x2 – 2x
– x – 1
x2 – 4

x2 – 2x
– x – 1
x2 – 4
x2 – 2x = x(x – 2)
x2 – 4 = (x – 2)(x + 2)
* x( x – 2)(x + 2)
(x + 2) x
x
x(x – 2)
– (x – 1)
(x – 2)(x + 2)
[ ] LCD=
x
x2 – 2x
– x – 1
x2 – 4

x2 – 2x
– x – 1
x2 – 4
x2 – 2x = x(x – 2)
x2 – 4 = (x – 2)(x + 2)
* x( x – 2)(x + 2)
(x + 2) x
x
x(x – 2)
– (x – 1)
(x – 2)(x + 2)
[ ] LCD=
x
x2 – 2x
– x – 1
x2 – 4
= [x(x + 2) – x(x – 1)] LCD

x2 – 2x
– x – 1
x2 – 4
x2 – 2x = x(x – 2)
x2 – 4 = (x – 2)(x + 2)
* x( x – 2)(x + 2)
(x + 2) x
x
x(x – 2)
– (x – 1)
(x – 2)(x + 2)
[ ] LCD=
x
x2 – 2x
– x – 1
x2 – 4
= [x(x + 2) – x(x – 1)] LCD
= [x2 + 2x – x2 + x)] LCD
=
3x
x (x – 2)(x + 2)

x2 – 2x
– x – 1
x2 – 4
x2 – 2x = x(x – 2)
x2 – 4 = (x – 2)(x + 2)
* x( x – 2)(x + 2)
(x + 2) x
x
x(x – 2)
– (x – 1)
(x – 2)(x + 2)
[ ] LCD=
x
x2 – 2x
– x – 1
x2 – 4
= [x(x + 2) – x(x – 1)] LCD
= [x2 + 2x – x2 + x)] LCD
=
3x
x (x – 2)(x + 2)
=
3
(x – 2)(x + 2)

Traditionally, we add/subtract fractions by converting each
fraction separately. (The multiplier–method keeps all the
calculation in one place and shortens the process.)

Example G. Combine
Traditional Method (Optional)
2
3xy
–
x
2y2

Example G. Combine
The LCM of the denominators {3xy, 2y2} is 6xy2.
(Combining fractions with different denominators)
I. Find the LCD of the expressions.
2
3xy
–
x
2y2

Example G. Combine
II. Convert each expression into the LCD.
2
3xy
–
x
2y2

Example G. Combine
Convert
2
3xy
–
x
2y2
2
3xy = 6xy2
x
2y2 =
3x2
6xy2
4y

Example G. Combine
Convert
III. Add or subtract the new numerators.
IV. Simplify the result.
2
3xy
–
x
2y2
2
3xy = 6xy2
x
2y2 =
3x2
6xy2
4y

Example G. Combine
Convert
2
3xy
–
x
2y2
2
3xy = 6xy2
x
2y2 =
3x2
6xy2
2
3xy
–
x
2y2 =
4y
6xy2 –
3x2
6xy2 =Hence
4y – 3x2
6xy2
4y

Example G. Combine
Convert
2
3xy
–
x
2y2
2
3xy = 6xy2
x
2y2 =
3x2
6xy2
2
3xy
–
x
2y2 =
4y
6xy2 –
3x2
6xy2 =Hence
4y – 3x2
6xy2
This is simplified because the numerator is not factorable.
4y

Example H. Combine
x
4x – 2
–
x – 1
2x2 + x – 1

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 =
2x2 + x – 2 =
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 =
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
Hence the LCD = 2(2x – 1)(x + 1)
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
Next, convert each fraction into the LCD
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
x
4x – 2 = x
2(2x – 1)
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
x
4x – 2 = x
2(2x – 1) * 2(2x – 1)(x + 1) LCD
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
x
4x – 2 = x
2(2x – 1) * 2(2x – 1)(x + 1) LCD
= x(x + 1) LCD
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
x
4x – 2 = x
2(2x – 1) * 2(2x – 1)(x + 1) LCD
= x(x + 1) =
x2 + x
LCD
LCD
Example H. Combine

Example D. Combine
x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
x
4x – 2 = x
2(2x – 1) * 2(2x – 1)(x + 1) LCD
= x(x + 1) =
x2 + x
LCD
LCD
x – 1
2x2 + x – 1
=
x – 1
(2x – 1)(x + 1)
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
x
4x – 2 = x
2(2x – 1) * 2(2x – 1)(x + 1) LCD
= x(x + 1) =
x2 + x
LCD
LCD
x – 1
2x2 + x – 1
=
x – 1
(2x – 1)(x + 1)
* 2(2x – 1)(x + 1) LCD
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
x
4x – 2 = x
2(2x – 1) * 2(2x – 1)(x + 1) LCD
= x(x + 1) =
x2 + x
LCD
LCD
x – 1
2x2 + x – 1
=
x – 1
(2x – 1)(x + 1)
* 2(2x – 1)(x + 1) LCD
= 2(x – 1) LCD
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
x
4x – 2 = x
2(2x – 1) * 2(2x – 1)(x + 1) LCD
= x(x + 1) =
x2 + x
LCD
LCD
x – 1
2x2 + x – 1
=
x – 1
(2x – 1)(x + 1)
* 2(2x – 1)(x + 1) LCD
= 2(x – 1) =
2x – 2
LCD LCD
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
4x – 2 = 2(2x – 1),
2x2 + x – 2 = (2x – 1)(x + 1)
x
4x – 2 = x
2(2x – 1) * 2(2x – 1)(x + 1) LCD
= x(x + 1) =
x2 + x
LCD
LCD
x – 1
2x2 + x – 1
=
x – 1
(2x – 1)(x + 1)
* 2(2x – 1)(x + 1) LCD
= 2(x – 1) =
2x – 2
LCD LCD
Hence
x
4x – 2
–
x – 1
2x2 + x – 1
=
x2 + x
LCD
–
2x – 2
LCD
Example H. Combine

x
4x – 2
–
x – 1
2x2 + x – 1
=
x2 + x
LCD –
2x – 2
LCD

=
x2 + x – (2x – 2)
LCD
x
4x – 2
–
x – 1
2x2 + x – 1
=
x2 + x
LCD –
2x – 2
LCD

=
x2 + x – (2x – 2)
LCD
x
4x – 2
–
x – 1
2x2 + x – 1
=
x2 + x
LCD –
2x – 2
LCD
=
x2 + x – 2x + 2
LCD

=
x2 + x – (2x – 2)
LCD
x
4x – 2
–
x – 1
2x2 + x – 1
=
x2 + x
LCD –
2x – 2
LCD
=
x2 + x – 2x + 2
LCD
=
x2 – x + 2
2(2x – 1)(x + 1)
Self–Check:
Do it by the multiplier method to see which way you prefer.
x
2(2x – 1)
–
x – 1
( x + 1)(2x – 1)
[ ]* 2(2x – 1)(x + 1) / LCD

Ex. A. Combine and simplify the answers.
x
x – 2
– 2
x – 2
1.
2x
x – 2
+
4
x – 2
2.
3x
x + 3
+ 6
x + 3
3. – 2x
x – 4
+ 8
x – 4
4.
x + 2
2x – 1
–
2x – 1
5.
2x + 5
x – 2
–
4 – 3x
2 – x
6.
x2 – 2
x – 2
– x
x – 27.
9x2
3x – 2 –
4
3x – 28.
Ex. B. Combine and simplify the answers.
3
12
+ 5
6
– 2
3
9. 11
12
+
5
8
– 7
6
10. –5
6
+ 3
8
– 311.
12.
6
5xy2
– x
6y13.
3
4xy2
– 5x
6y
15. 7
12xy
– 5x
8y316.
5
4xy
– 7x
6y214.
3
4xy2
– 5y
12x217.
–5
6 –
7
12+ 2
+ 1 – 7x
9y2
4 – 3x

Ex. C. Combine and simplify the answers.
x
2x – 4
– 2
3x – 6
18.
2x
3x + 9
–
4
2x + 6
19.
–3
2x + 1
+ 2x
4x + 2
20. 2x – 3
x – 2
– 3x + 4
5 – 10x
21.
3x + 1
6x – 4
– 2x + 3
2 – 3x22.
–5x + 7
3x – 12+
4x – 3
–2x + 823.
x
x – 2
– 2
x – 3
24. 2x
3x + 1
+ 4
x – 6
25.
–3
2x + 1
+ 2x
3x + 2
26.
2x – 3
x – 2
+
3x + 4
x – 5
27.
3x + 1
+
x + 3
x2 – 428.
x2 – 4x + 4
x – 4
–
x + 5
x2 – x – 2
29.
x2 – 5x + 6
3x + 1
+
2x + 3
9 – x230.
x2 – x – 6
3x – 4
–
2x + 5
x2 + x – 6
31.
x2 + 5x + 6
3x + 4
+
2x – 3
–x2 – 2x + 3
32.
x2 – x
5x – 4
–
3x – 5
1 – x233.
x2 + 2x – 3

2 1 addition and subtraction i

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