Dividing Fractions by Fractions
Dividing Fractions by Fractions
Dividing fractions might sound tricky, but there is a simple rule that turns every fraction division problem into a multiplication problem. This rule is often called "Keep, Change, Flip."
The "Keep, Change, Flip" Method
To divide one fraction by another, you multiply the first fraction by the reciprocal of the second fraction. The reciprocal is just the fraction flipped upside down.
Here is how the method works in three easy steps:
- Keep the first fraction exactly the same.
- Change the division sign (÷) to a multiplication sign (Ã).
- Flip the second fraction (the divisor) upside down.
Example 1: Standard Fractions
Let's solve: 43â÷52â
- Keep: 43â
- Change: Ã
- Flip: 25â
Now, multiply straight across (numerators together, denominators together): 43âÃ25â=4Ã23Ã5â=815â
You can leave this as an improper fraction or convert it to a mixed number: 187â.
Dividing Mixed Numbers
When dealing with mixed numbers, you must add one extra step at the beginning: convert all mixed numbers into improper fractions first. Once they are improper fractions, you just use "Keep, Change, Flip."
Example 2: Mixed Numbers
Let's solve: 231â÷161â
Step 1: Convert to improper fractions.
- 231â=3(2Ã3)+1â=37â
- 161â=6(1Ã6)+1â=67â
Now the problem is: 37â÷67â
Step 2: Keep, Change, Flip. 37âÃ76â
Step 3: Multiply and simplify. 3Ã77Ã6â=2142â=2
Solving Word Problems
Fraction division is incredibly useful in real life, especially when figuring out how many smaller portions fit into a larger total.
Example 3: Recipe Portions
Problem: A recipe uses 43â cup of flour per serving. How many servings can you make from 6 cups of flour?
Step 1: Set up the equation. You are taking a total of 6 cups and dividing it into portions of 43â cup. 6÷43â
Step 2: Turn the whole number into a fraction. 16â÷43â
Step 3: Keep, Change, Flip. 16âÃ34â
Step 4: Multiply and simplify. 1Ã36Ã4â=324â=8
You can make 8 servings!