5.08 Tenths and hundredths

A fraction is written as \dfrac{\text{number of shaded parts}}{\text{total number of parts}}.

There are a total of 100 squares and 43 of those are shaded.

Make the denominators of the fractions the same then compare the numerators.

Using the model, \dfrac{6}{10}=\dfrac{60}{100}

60 is greater than 51.

This means that \dfrac{60}{100} is greater than \dfrac{51}{100}. So:

\dfrac{6}{10} \gt \dfrac{51}{100}

We could also have converted \dfrac{6}{10} to a fraction out of 100 by multiplying the numerator and denominator by 10 since 10\times 10=100:

Add \dfrac{1}{10} to the last given value to complete the pattern.

This picture shows \dfrac{4}{10} blocks shaded blue. If another 1 block were shaded, 5 out of 10 would be shaded in total. So the next number is \dfrac{5}{10}.

\dfrac{4}{10} + \dfrac{1}{10} = \dfrac{5}{10}

We can see that the numerator increased by 1 and the denominator stayed the same. Similarly doing this for the following numbers we can complete the pattern:\dfrac{4}{10}, \,\dfrac{5}{10}, \, \dfrac{6}{10}, \,\dfrac{7}{10}, \,\dfrac{8}{10}, \,\dfrac{9}{10}