Mixed Operations with Fractions & Decimals
Mixed Operations with Fractions and Decimals
When a math problem includes both a fraction and a decimal, you cannot add, subtract, multiply, or divide them directly. The golden rule for mixed operations is simple: Convert both numbers to the same form.
You can either change the decimal into a fraction, or change the fraction into a decimal. Let's look at both strategies.
Strategy 1: Convert the Decimal to a Fraction
This method works for any problem, and it is the best choice when the fraction would turn into a repeating decimal (like 31â or 95â).
Example: Compute 0.75â31â
- Convert: Change 0.75 into a fraction. 0.75=10075â=43â
- Find a Common Denominator: The denominators are 4 and 3. The least common multiple is 12. 43â=129â 31â=124â
- Subtract: 129ââ124â=125â
Strategy 2: Convert the Fraction to a Decimal
If the fraction can be easily turned into a terminating decimal (like 21â=0.5 or 41â=0.25), converting to decimals is often much faster!
Example: Calculate 41â+0.3
- Convert: Change 41â to a decimal. 41â=0.25
- Add: Line up the decimal points and add. 0.25+0.30=0.55
Comparing Mixed Numbers
You can use these same conversion strategies to compare expressions.
Example: Which is greater: 32â+0.5 or 1.5?
Since 32â is a repeating decimal (0.666...), let's convert everything to fractions.
- Convert 0.5 to a fraction: 0.5=21â
- Add the fractions: Find a common denominator (6). 32â+21â=64â+63â=67â
- Convert 1.5 to a fraction: 1.5=121â=23â=69â
- Compare the results: 67â<69â
Therefore, 1.5 is greater.