Adding Fractions with Related Denominators
Adding and Subtracting Fractions with Related Denominators
When we want to add or subtract fractions, they must have the same denominator (the bottom number). But what happens if the denominators are different?
Sometimes, the denominators are related, meaning one denominator is a multiple of the other. For example, in halves and fourths (2 and 4), 4 is a multiple of 2. In this case, you only need to change one of the fractions to make the denominators match.
Steps to Solve
- Identify the related denominators: Find the smaller denominator and figure out what number you need to multiply it by to get the larger denominator.
- Create an equivalent fraction: Multiply both the top (numerator) and bottom (denominator) of the fraction with the smaller denominator by that number.
- Add or subtract: Now that the denominators are the same, just add or subtract the numerators. Keep the denominator exactly the same!
Example 1: Addition
Let's add 21â and 43â.
First, look at the denominators: 2 and 4. Since 2Ã2=4, we can turn halves into fourths.
Multiply the top and bottom of 21â by 2:
2Ã21Ã2â=42â
Now, add the fractions together:
42â+43â=45â
Example 2: Subtraction
Let's subtract 65ââ31â.
Look at the denominators: 6 and 3. Since 3Ã2=6, we can turn thirds into sixths.
Multiply the top and bottom of 31â by 2:
3Ã21Ã2â=62â
Now, subtract the numerators:
65ââ62â=63â
(Note: 63â can be simplified to 21â, but finding the common denominator is the main goal!)
Example 3: Tenths and Hundredths
Let's add 103â+1007â.
Here, 10Ã10=100. We need to change tenths into hundredths. Multiply the top and bottom of 103â by 10:
10Ã103Ã10â=10030â
Now add them together:
10030â+1007â=10037â