5.13 Adding fractions with tenths and hundredths
Are you ready?
Let's review the relationship between tenths and hundredths.
Complete the following to make an equivalent fraction:
$\frac{3}{10}$310$=$=$\frac{\editable{}}{100}$100
Learn
Remember that the numerator of a fraction represents a number of parts, and the denominator represents the size of those parts. To add fractions together, we want to add parts that are the same size - that is, we want to add together fractions with the same denominator.
For example, the sum $\frac{3}{100}+\frac{12}{100}$3100+12100 represents "$3$3 hundredths plus another $12$12 hundredths", which is $15$15 hundredths in total. That is,
| $\frac{3}{100}+\frac{12}{100}$3100+12100 | $=$= | $\frac{15}{100}$15100 |
We can use the relationship between tenths and hundredths to add together these types of fractions as well.
For example, the sum $\frac{2}{10}+\frac{7}{100}$210+7100 represents "$2$2 tenths plus $7$7 hundredths". Since we know that $2$2 tenths can also be written as $20$20 hundredths, this means we have "$20$20 hundredths plus another $7$7 hundredths", for a total of $27$27 hundredths. That is,
| $\frac{2}{10}+\frac{7}{100}$210+7100 | $=$= | $\frac{20}{100}+\frac{7}{100}$20100+7100 |
| $=$= | $\frac{27}{100}$27100 |
Apply
Question 1
Find the value of $\frac{4}{10}+\frac{50}{100}$410+50100.
- To add fractions, we want them to have the same denominator.
- We can use the fact that $1$1 tenth is the same as $10$10 hundredths to add fractions involving tenths and hundredths together.