Adding and Subtracting Rational Expressions with a Common Denominator
Description/Explanation/Highlights
Video Description
This video explains how to add and subtract rational expressions when there is a common denominator.
Steps and Key Points to Remember
To add or subtract rational expressions that have a common denominator, follow these steps:
- Operations on rational expressions follow the same rules as operations on any fraction.
- When there is a common denominator, combine the numerators and keep the denominators.
- In the example \(\frac{\textstyle 2x+5}{\textstyle x-7}+\frac{\textstyle 3x-2}{\textstyle x-7}\), the common denominator is \(x-7\) so combine the numerators by combining like terms and put the result over the common denominator.
- Combining \(2x+3x=5x\) and \(5-2=3\) so the numerator is \(5x+3\) and after putting it over the common denominator the final answer is \(\textstyle\frac{\textstyle 5x+3}{\textstyle x-7}\)
- Subtraction is done the same way but care must be taken to distribute the negative sign to all terms in the expression being subtracted.
- In the example \(\frac{\textstyle 4x^2-5x}{\textstyle 2x^2-1}-\frac{\textstyle 3x^2+2x-1}{\textstyle 2x^2-1}\), there is a common denominator of \(2x^2-1\) so combine the numerators taking care to distribute the minus sign to all terms in the second expression.
- It may be helpful to write the numerators over the common denominator adding parenthesis as follows: \(\frac{\textstyle 4x^2-5x-(3x^2+2x-1)}{\textstyle 2x^2-1}\).
- Simplify the numerator by distributing the negative to each term in the parenthesis (changing each sign) \(\frac{\textstyle 4x^2-5x-3x^2-2x+1}{\textstyle 2x^2-1}\) and then combining like terms in the numerator to get the final answer \(\frac{\textstyle x^2-7x+1}{\textstyle 2x^2-1}\).
Here are some key points to keep in mind when adding and subtracting rational expressions that have common denominators.
- Follow the same rules as addition or subtraction of any fraction.
- The denominators must be the same (common).
- Combine like terms in the numerator and put the result over the common denominator.
- If subtracting, pay careful attention to the signs, making sure that every sign in the expression being subtracted is changed.
- It may be helpful to write the entire problem over the common denominator and add parenthesis when subtracting before combining like terms.
Video Highlights
- 00:00 Introduction
- 00:08 \(\frac{\textstyle 2x+5}{\textstyle x-7}+\frac{\textstyle 3x-2}{\textstyle x-7}\) example of adding rational expressions that have a common denominator.
- 00:54 \(\frac{\textstyle 4x^2-5x}{\textstyle 2x^2-1}-\frac{\textstyle 3x^2+2x-1}{\textstyle 2x^2-1}\) example of subtracting rational expressions that have a common denominator.
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