### Learning Objectives

By the end of this section, you will be able to:

- Convert fractions to decimals
- Order decimals and fractions
- Simplify expressions using the order of operations
- Find the circumference and area of circles

Before you get started, take this readiness quiz.

Divide: $0.24\xf78.$

If you missed this problem, review Example 5.19.

Order $0.64\_\_0.6$ using $<$ or $\text{>.}$

If you missed this problem, review Example 5.7.

Order $\mathrm{-0.2}\_\_\mathrm{-0.1}$ using $<$ or $\text{>.}$

If you missed this problem, review Example 5.8.

### Convert Fractions to Decimals

In Decimals, we learned to convert decimals to fractions. Now we will do the reverse—convert fractions to decimals. Remember that the fraction bar indicates division. So $\frac{4}{5}$ can be written $4\xf75$ or $5\overline{)4}.$ This means that we can convert a fraction to a decimal by treating it as a division problem.

### Convert a Fraction to a Decimal

To convert a fraction to a decimal, divide the numerator of the fraction by the denominator of the fraction.

### Example 5.28

Write the fraction $\frac{3}{4}$ as a decimal.

Write the fraction as a decimal: $\frac{1}{4}.$

Write the fraction as a decimal: $\frac{3}{8}.$

### Example 5.29

Write the fraction $-\frac{7}{2}$ as a decimal.

Write the fraction as a decimal: $-\frac{9}{4}.$

Write the fraction as a decimal: $-\frac{11}{2}.$

#### Repeating Decimals

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 $3.$

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 $\text{1.333\u2026}$ 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\dots $ we use a shorthand notation by placing a line over the digits that repeat. The repeating decimal $1.333\dots $ is written $1.\stackrel{\u2013}{3}.$ The line above the $3$ tells you that the $3$ repeats endlessly. So $\text{1.333\u2026}=1.\stackrel{\u2013}{3}$

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

$\text{1.333\u2026}=1.\stackrel{\u2013}{3}$ | $3$ is the repeating digit |

$\text{4.1666\u2026}=4.1\stackrel{\u2013}{6}$ | $6$ is the repeating digit |

$\text{4.161616\u2026}=4.\stackrel{\text{\u2014}}{16}$ | $16$ is the repeating block |

$\text{0.271271271\u2026}=0.\stackrel{\text{\u2013\u2013\u2013}}{271}$ | $271$ is the repeating block |

### Example 5.30

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

### Try It 5.59

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

### Try It 5.60

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

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.

### Example 5.31

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

### Try It 5.61

Simplify: $\frac{3}{8}+4.9.$

### Try It 5.62

Simplify: $5.7+\frac{13}{20}.$

### Order Decimals and Fractions

In Decimals, we compared two decimals and determined which was larger. To compare a decimal to a fraction, we will first convert the fraction to a decimal and then compare the decimals.

### Example 5.32

Order $\frac{3}{8}\_\_0.4$ using $<$ or $\text{>.}$

Order each of the following pairs of numbers, using $<$ or $\text{>.}$

$\frac{17}{20}\_\_0.82$

Order each of the following pairs of numbers, using $<$ or $\text{>.}$

$\frac{3}{4}\_\_0.785$

When ordering negative numbers, remember that larger numbers are to the right on the number line and any positive number is greater than any negative number.

### Example 5.33

Order $\mathrm{-0.5}\_\_\_-\frac{3}{4}$ using $<$ or $\text{>.}$

Order each of the following pairs of numbers, using $<$ or $\text{>:}$

$-\frac{5}{8}\_\_\mathrm{-0.58}$

Order each of the following pairs of numbers, using $<$ or $\text{>:}$

$\mathrm{-0.53}\_\_-\frac{11}{20}$

### Example 5.34

Write the numbers $\frac{13}{20},0.61,\frac{11}{16}$ in order from smallest to largest.

Write each set of numbers in order from smallest to largest: $\frac{7}{8},\frac{4}{5},0.82.$

Write each set of numbers in order from smallest to largest: $0.835,\frac{13}{16},\frac{3}{4}.$

### Simplify Expressions Using the Order of Operations

The order of operations introduced in Use the Language of Algebra also applies to decimals. Do you remember what the phrase “Please excuse my dear Aunt Sally” stands for?

### Example 5.35

Simplify the expressions:

- ⓐ$\phantom{\rule{0.2em}{0ex}}7\left(18.3-21.7\right)$
- ⓑ$\phantom{\rule{0.2em}{0ex}}\frac{2}{3}\left(8.3-3.8\right)$

Simplify: ⓐ$\phantom{\rule{0.2em}{0ex}}8(14.6-37.5)$ ⓑ$\phantom{\rule{0.2em}{0ex}}\frac{3}{5}(9.6-2.1)\text{.}$

Simplify: ⓐ$\phantom{\rule{0.2em}{0ex}}25(25.69-56.74)$ ⓑ$\phantom{\rule{0.2em}{0ex}}\frac{2}{7}(11.9-4.2)\text{.}$

### Example 5.36

Simplify each expression:

- ⓐ$\phantom{\rule{0.2em}{0ex}}6\xf70.6+(0.2)4-{(0.1)}^{2}$
- ⓑ$\phantom{\rule{0.2em}{0ex}}{\left(\frac{1}{10}\right)}^{2}+(3.5)(0.9)$

Simplify: $9\xf70.9+(0.4)3-{(0.2)}^{2}.$

Simplify: ${\left(\frac{1}{2}\right)}^{2}+(0.3)(4.2)\text{.}$

### Find the Circumference and Area of Circles

The properties of circles have been studied for over $\mathrm{2,000}$ years. All circles have exactly the same shape, but their sizes are affected by the length of the radius, a line segment from the center to any point on the circle. A line segment that passes through a circle’s center connecting two points on the circle is called a diameter. The diameter is twice as long as the radius. See Figure 5.6.

The size of a circle can be measured in two ways. The distance around a circle is called its circumference.

Archimedes discovered that for circles of all different sizes, dividing the circumference by the diameter always gives the same number. The value of this number is pi, symbolized by Greek letter $\pi $ (pronounced pie). However, the exact value of $\pi $ cannot be calculated since the decimal never ends or repeats (we will learn more about numbers like this in The Properties of Real Numbers.)

### Manipulative Mathematics

If we want the exact circumference or area of a circle, we leave the symbol $\pi $ in the answer. We can get an approximate answer by substituting $3.14$ as the value of $\text{\pi}.$ We use the symbol $\approx $ to show that the result is approximate, not exact.

### Properties of Circles

Since the diameter is twice the radius, another way to find the circumference is to use the formula $C=\phantom{\rule{0.2em}{0ex}}\text{\pi}\mathit{\text{d}}.$

Suppose we want to find the exact area of a circle of radius $10$ inches. To calculate the area, we would evaluate the formula for the area when $r=10$ inches and leave the answer in terms of $\text{\pi .}$

We write $\pi $ after the $100.$ So the exact value of the area is $A=100\text{\pi}$ square inches.

To approximate the area, we would substitute $\pi \approx 3.14.$

Remember to use square units, such as square inches, when you calculate the area.

### Example 5.37

A circle has radius $10$ centimeters. Approximate its ⓐ circumference and ⓑ area.

A circle has radius $50$ inches. Approximate its ⓐ circumference and ⓑ area.

A circle has radius $100$ feet. Approximate its ⓐ circumference and ⓑ area.

### Example 5.38

A circle has radius $42.5$ centimeters. Approximate its ⓐ circumference and ⓑ area.

A circle has radius $51.8$ centimeters. Approximate its ⓐ circumference and ⓑ area.

A circle has radius $26.4$ meters. Approximate its ⓐ circumference and ⓑ area.

#### Approximate $\pi $ with a Fraction

Convert the fraction $\frac{22}{7}$ to a decimal. If you use your calculator, the decimal number will fill up the display and show $3.14285714.$ But if we round that number to two decimal places, we get $3.14,$ the decimal approximation of $\text{\pi}.$ When we have a circle with radius given as a fraction, we can substitute $\frac{22}{7}$ for $\pi $ instead of $3.14.$ And, since $\frac{22}{7}$ is also an approximation of $\text{\pi},$ we will use the $\approx $ symbol to show we have an approximate value.

### Example 5.39

A circle has radius $\frac{14}{15}$ meter. Approximate its ⓐ circumference and ⓑ area.

### Try It 5.77

A circle has radius $\frac{5}{21}$ meters. Approximate its ⓐ circumference and ⓑ area.

### Try It 5.78

A circle has radius $\frac{10}{33}$ inches. Approximate its ⓐ circumference and ⓑ area.

### Section 5.3 Exercises

#### Practice Makes Perfect

**Convert Fractions to Decimals**

In the following exercises, convert each fraction to a decimal.

$\frac{4}{5}$

$-\frac{5}{8}$

$\frac{13}{20}$

$\frac{17}{4}$

$-\frac{284}{25}$

$\frac{2}{9}$

$\frac{18}{11}$

$\frac{25}{111}$

In the following exercises, simplify the expression.

$\frac{1}{4}+10.75$

$3.9+\frac{9}{20}$

$6.29+\frac{21}{40}$

**Order Decimals and Fractions**

In the following exercises, order each pair of numbers, using $<$ or $\text{>.}$

$\frac{1}{4}\_\_\_0.4$

$\frac{3}{5}\_\_\_0.35$

$0.92\phantom{\rule{0.2em}{0ex}}\_\_\_\phantom{\rule{0.2em}{0ex}}\frac{7}{8}$

$0.83\phantom{\rule{0.2em}{0ex}}\_\_\_\phantom{\rule{0.2em}{0ex}}\frac{5}{6}$

$\mathrm{-0.44}\_\_\_-\frac{9}{20}$

$-\frac{2}{3}\_\_\_\mathrm{-0.632}$

In the following exercises, write each set of numbers in order from least to greatest.

$\frac{3}{8},\frac{7}{20},0.36$

$0.15,\frac{3}{16},\frac{1}{5}$

$\mathrm{-0.2},-\frac{3}{20},-\frac{1}{6}$

$-\frac{8}{9},-\frac{4}{5},\mathrm{-0.9}$

**Simplify Expressions Using the Order of Operations**

In the following exercises, simplify.

$30(18.1-32.5)$

$42(8.45-5.97)$

$\frac{4}{5}(8.6+3.9)$

$\frac{9}{16}(21.96-9.8)$

$5\xf70.5+(3.9)6-{(0.7)}^{2}$

$(11.4+16.2)\xf7(18\xf760)$

${\left(\frac{1}{2}\right)}^{2}+(2.1)(8.3)$

$-\frac{3}{8}\xb7\frac{14}{15}+0.72$

**Mixed Practice**

In the following exercises, simplify. Give the answer as a decimal.

$5\frac{2}{5}-8.75$

$5.79\xf7\frac{3}{4}$

$\frac{5}{16}(117.6)+2\frac{1}{3}(699)$

$5.1(\frac{12}{5}-3.91)$

**Find the Circumference and Area of Circles**

In the following exercises, approximate the ⓐ circumference and ⓑ area of each circle. If measurements are given in fractions, leave answers in fraction form.

$\text{radius}=\text{20 in.}$

$\text{radius}=\text{4 ft.}$

$\text{radius}=\text{38 cm}$

$\text{radius}=\text{57.3 m}$

$\text{radius}=\frac{7}{11}\phantom{\rule{0.2em}{0ex}}\text{mile}$

$\text{radius}=\frac{5}{12}\phantom{\rule{0.2em}{0ex}}\text{yard}$

$\text{diameter}=\frac{3}{4}\phantom{\rule{0.2em}{0ex}}\text{m}$

#### Everyday Math

Kelly wants to buy a pair of boots that are on sale for $\frac{2}{3}$ of the original price. The original price of the boots is $\text{\$84.99}.$ What is the sale price of the shoes?

An architect is planning to put a circular mosaic in the entry of a new building. The mosaic will be in the shape of a circle with radius of $6$ feet. How many square feet of tile will be needed for the mosaic? (Round your answer up to the next whole number.)

#### Writing Exercises

Describe a situation in your life in which you might need to find the area or circumference of a circle.

#### Self Check

ⓐ After completing the exercises, use this checklist to evaluate your mastery of the objectives of this section.

ⓑ What does this checklist tell you about your mastery of this section? What steps will you take to improve?