Repeating Decimals

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Course:	RWM101: Foundations of Real World Math
Book:	Repeating Decimals

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Date:	Thursday, 3 April 2025, 9:17 PM

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Repeating Decimals
Examples and Exercises
- Answers

Repeating Decimals

Sometimes, we are asked to convert a fraction to a decimal, only to find out it's a repeating decimal. Read this section to see how we indicate a decimal is a repeating decimal by using a line above the repeating portion of the decimal. Then, try the practice problems and check your answers.

So far, in all the examples converting fractions to decimals the division resulted in a remainder of zero. This is not always the case. Let's see what happens when we convert the fraction $\frac{4}{3}$ to a decimal. First, notice that $\frac{4}{3}$ is an improper fraction. Its value is greater than $1$ . The equivalent decimal will also be greater than $1$ .

We divide $4$ by $3$ .

4/3

No matter how many more zeros we write, there will always be a remainder of $1$ , and the threes in the quotient will go on forever. The number $1.333..$ is called a repeating decimal. Remember that the " $...$ " means that the pattern repeats.

REPEATING DECIMAL

A repeating decimal is a decimal in which the last digit or group of digits repeats endlessly.

How do you know how many 'repeats' to write? Instead of writing $1.333$ ... we use a shorthand notation by placing a line over the digits that repeat. The repeating decimal $1.333 \ldots$ is written $1. \overline{3}$ . The line above the $3$ tells you that the $3$ repeats endlessly. So $1.333..=1. \overline{3}$

For other decimals, two or more digits might repeat. Table 5.5 shows some more examples of repeating decimals.

$1.333 \ldots=1 . \overline{3}$	$3$ is the repeating digit
$4.1666 \ldots=4.1 \overline{6}$	$6$ is the repeating digit
$4.161616 \ldots=4 . \overline{16}$	$16$ is the repeating block
$0.271271271 \ldots=0 . \overline{271}$	$271$ is the repeating block

Table 5.5

It is useful to convert between fractions and decimals when we need to add or subtract numbers in different forms. To add a fraction and a decimal, for example, we would need to either convert the fraction to a decimal or the decimal to a fraction.

Source: Rice University, https://openstax.org/books/prealgebra/pages/5-3-decimals-and-fractions
This work is licensed under a Creative Commons Attribution 4.0 License.

Examples and Exercises

EXAMPLE 5.30

Write $\frac{43}{22}$ as a decimal.

EXAMPLE 5.31

Simplify: $\frac{7}{8}+6.4$ .

TRY IT 5.59

Write as a decimal: $\frac{27}{11}$ .

TRY IT 5.60

Write as a decimal: $\frac{51}{22}$ .

Answers

EXAMPLE 5.30

Divide $43$ by $22$ .

divide 43 by 22

Notice that the differences of $120$ and $100$ repeat, so there is a repeat in the digits of the quotient; $54$ will repeat endlessly. The first decimal place in the quotient, $9$ , is not part of the pattern. So,