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Subtracting Fractions with COMMON Denominators
Subtracting fractions with COMMON denominators is simple. Just subtract the top numbers (the numerators), and place the resulting answer in the top of a fraction using the existing denominator for the bottom number. Then reduce the fraction, if possible
Example 1: Simple fraction subtraction
| 3/5 | - | 2/5 | = | 1/5 |
Example 2: Reducing the fraction answer
| 5/10 | - | 3/10 | = | 2/10 |
| 2/10 | = | 1/5 |
Example 3: Subtraction with a mixed number
| 1-1/4 | - | 3/4 | = | ? |
| 1-1/4 | = | 5/4 |
| 5/4 | - | 3/4 | = | 2/4 |
| 2/4 | = | 1/2 |
Example 1:
Say you have the fractions 2/3 and 1/4
Select the denominator of the second fraction (4) and multiply the top and bottom of the first fraction (2/3) by that number:
| 4/4 | x | 2/3 | = | 8/12 |
Select the denominator of the first fraction (3) and multiply the top and bottom of the second fraction (1/4) by that number:
| 3/3 | x | 1/4 | = | 3/12 |
These two fractions (8/12 and 3/12) have common denominators - the number 12 on the bottom of the fraction.
Subtract, using these two new fractions:
| 8/12 | - | 3/12 | = | 5/12 |
Example 2:
Say you have the fractions 3/5 and 2/7
Select the denominator of the second fraction (7) and multiply the top and bottom of the first fraction (3/5) by that number
| 7/7 | x | 3/5 | = | 21/35 |
Select the denominator of the first fraction (5) and multiply the top and bottom of the second fraction (2/7) by that number
| 5/5 | x | 2/7 | = | 10/35 |
These two fractions (21/35 and 10/35) have common denominators -- the number 35 on the bottom of the fraction.
We can now subtract, because the two new fractions have a common denominator:
| 21/35 | - | 10/35 | = | 11/35 |
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