What if you had two rational expressions like and with different denominators? How could you add and subtract them. After completing this Concept, you'll be to perform addition and subtraction with rational expressions like these.

### Watch This

CK-12 Foundation: 1210S Adding and Subtracting Rational Expressions

Watch this video for more examples of how to add and subtract rational expressions.

PatrickJMT: Adding and Subtracting Rational Expressions

### Guidance

Like fractions, rational expressions represent a portion of a quantity. Remember that when we add or subtract fractions we must first make sure that they have the same denominator. Once the fractions have the same denominator, we combine the different portions by adding or subtracting the numerators and writing that answer over the common denominator.

**Add and Subtract Rational Expressions with the Same Denominator**

Fractions with common denominators combine in the following manner:

#### Example A

*Simplify.*

a)

b)

c)

**Solution**

a) Since the denominators are the same we combine the numerators:

b)

c) Since the denominators are the same we combine the numerators. Make sure the subtraction sign is distributed to all terms in the second expression:

**Find the Least Common Denominator of Rational Expressions**

To add and subtract fractions with different denominators, we must first rewrite all fractions so that they have the same denominator. In general, we want to find the **least common denominator**. To find the least common denominator, we find the **least common multiple** (LCM) of the expressions in the denominators of the different fractions. Remember that the least common multiple of two or more integers is the least positive integer that has all of those integers as factors.

The procedure for finding the lowest common multiple of polynomials is similar. We rewrite each polynomial in factored form and we form the LCM by taking each factor to the highest power it appears in any of the separate expressions.

#### Example B

*Find the LCM of and .*

**Solution**

First rewrite the integers in their prime factorization.

The two expressions can be written as:

To find the LCM, take the highest power of each factor that appears in either expression.

#### Example C

*Find the LCM of and *

**Solution**

Factor the polynomials completely:

To find the LCM, take the highest power of each factor that appears in either expression.

It’s customary to leave the LCM in factored form, because this form is useful in simplifying rational expressions and finding any excluded values.

**Add and Subtract Rational Expressions with Different Denominators**

Now we’re ready to add and subtract rational expressions. We use the following procedure.

- Find the
**least common denominator**(LCD) of the fractions. - Express each fraction as an equivalent fraction with the LCD as the denominator.
- Add or subtract and simplify the result.

#### Example D

*Perform the following operation and simplify: *

**Solution**

The denominators can’t be factored any further, so the LCD is just the product of the separate denominators: . That means the first fraction needs to be multiplied by the factor and the second fraction needs to be multiplied by the factor :

#### Example E

*Perform the following operation and simplify: .*

**Solution**

Notice that the denominators are almost the same; they just differ by a factor of -1.

Watch this video for help with the Examples above.

CK-12 Foundation: Adding and Subtracting Rational Expressions

### Guided Practice

*a.) Find the LCM of and .*

*b.) Perform the following operation and simplify: .*

**Solution:**

a.) First factor each polynomial to see if they have any common factors:

and

Since the two polynomials do not have any common factors, this means that the LCM of the two polynomials is:

b.) To subtract the second fraction from the first, subtraction the numerator of the second from the numerator of the first. Make sure to put parenthesis around the numerator of the second fraction, so you remember to subtract each term.

### Explore More

Perform the indicated operation and simplify. Leave the denominator in factored form.

### Answers for Explore More Problems

To view the Explore More answers, open this PDF file and look for section 12.10.