Multiplying Fractions by Fractions
Multiplying Fractions by Fractions
Multiplying a fraction by another fraction is just like finding "a part of a part." When you see a math problem asking you to find 52â of 43â, the word "of" usually means you need to multiply!
The Basic Rule
Unlike adding or subtracting, multiplying fractions is very straightforward because you do not need to find a common denominator. Just follow these two simple steps:
- Multiply the numerators (the top numbers) together to get your new numerator.
- Multiply the denominators (the bottom numbers) together to get your new denominator.
baâÃdcâ=bÃdaÃcâ
Example 1: Straightforward Multiplication
Let's solve 32âÃ54â:
- Multiply the numerators: 2Ã4=8
- Multiply the denominators: 3Ã5=15
Put them together to get your answer:
32âÃ54â=158â
Since 8 and 15 share no common factors other than 1, the fraction 158â is already in its simplest form.
Example 2: Simplifying Your Answer
Sometimes, you will need to simplify the final fraction. Let's look at 43âÃ72â:
- Multiply the numerators: 3Ã2=6
- Multiply the denominators: 4Ã7=28
43âÃ72â=286â
Both 6 and 28 are even numbers, which means they can both be divided by 2 to simplify the fraction.
28÷26÷2â=143â
Pro Tip: Simplify Before You Multiply
To make the math easier, you can "cross-simplify" before you multiply. Look at the numbers diagonally from each other.
In the problem 43âÃ72â:
- Notice that the 2 (top right) and the 4 (bottom left) can both be divided by 2.
- The 2 becomes a 1, and the 4 becomes a 2.
- The new problem is 23âÃ71â.
Now multiply: 2Ã73Ã1â=143â
You get the exact same answer, but with smaller, easier numbers to multiply!