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Think about the decimal 7.3 . Can we write it as a ratio of two integers? Because 7.3 means 7 3 10 , we can write it as an improper fraction, 73 10 . So 7.3 is the ratio of the integers 73 and 10 . It is a rational number.

In general, any decimal that ends after a number of digits (such as 7.3 or −1.2684 ) is a rational number. We can use the place value of the last digit as the denominator when writing the decimal as a fraction.

Write each as the ratio of two integers: −15 6.81 −3 6 7 .

Solution

−15
Write the integer as a fraction with denominator 1. −15 1
6.81
Write the decimal as a mixed number. 6 81 100
Then convert it to an improper fraction. 681 100
−3 6 7
Convert the mixed number to an improper fraction. 27 7
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Write each as the ratio of two integers: −24 3.57 .

  1. −24 1
  2. 357 100
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Write each as the ratio of two integers: −19 8.41 .

  1. −19 1
  2. 841 100
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Let's look at the decimal form of the numbers we know are rational. We have seen that every integer is a rational number , since a = a 1 for any integer, a . We can also change any integer to a decimal by adding a decimal point and a zero.

Integer −2 , −1 , 0 , 1 , 2 , 3 Decimal −2.0 , −1.0 , 0.0 , 1.0 , 2.0 , 3.0 These decimal numbers stop.

We have also seen that every fraction is a rational number. Look at the decimal form of the fractions we just considered.

Ratio of Integers 4 5 , 7 8 , 13 14 , 20 3 Decimal Forms 0.8 , −0.875 , 3.25 , −6.666… These decimals either stop or repeat. −6 . 66

What do these examples tell you? Every rational number can be written both as a ratio of integers and as a decimal that either stops or repeats. The table below shows the numbers we looked at expressed as a ratio of integers and as a decimal.

Rational Numbers
Fractions Integers
Number 4 5 , 7 8 , 13 4 , −20 3 −2 , −1 , 0 , 1 , 2 , 3
Ratio of Integer 4 5 , −7 8 , 13 4 , −20 3 −2 1 , −1 1 , 0 1 , 1 1 , 2 1 , 3 1
Decimal number 0.8 , −0.875 , 3.25 , −6 . 6 , −2.0 , −1.0 , 0.0 , 1.0 , 2.0 , 3.0

Irrational numbers

Are there any decimals that do not stop or repeat? Yes. The number π (the Greek letter pi, pronounced ‘pie’), which is very important in describing circles, has a decimal form that does not stop or repeat.

π = 3.141592654.......

Similarly, the decimal representations of square roots of numbers that are not perfect squares never stop and never repeat. For example,

5 = 2.236067978.....

A decimal that does not stop and does not repeat cannot be written as the ratio of integers. We call this kind of number an irrational number .

Irrational number

An irrational number is a number that cannot be written as the ratio of two integers. Its decimal form does not stop and does not repeat.

Let's summarize a method we can use to determine whether a number is rational or irrational.

If the decimal form of a number

  • stops or repeats, the number is rational.
  • does not stop and does not repeat, the number is irrational.

Identify each of the following as rational or irrational:

0.58 3

0.475

3.605551275…

Solution

The bar above the 3 indicates that it repeats. Therefore, 0.58 3 is a repeating decimal, and is therefore a rational number. 0.58 3

This decimal stops after the 5 , so it is a rational number. 0.475

The ellipsis (…) means that this number does not stop. There is no repeating pattern of digits. Since the number doesn't stop and doesn't repeat, it is irrational. 3.605551275…

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Source:  OpenStax, Prealgebra. OpenStax CNX. Jul 15, 2016 Download for free at http://legacy.cnx.org/content/col11756/1.9
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