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Which number is not a rational number?

A. [tex]\(-5 \frac{4}{11}\)[/tex]
B. [tex]\(\sqrt{31}\)[/tex]
C. 7.608
D. [tex]\(18.4 \overline{6}\)[/tex]

Sagot :

GinnyAnswer
To determine which of the given numbers is not a rational number, let's analyze each one in detail:

1. Number: [tex]\(-5 \frac{4}{11}\)[/tex]

We can express this as a single fraction:
[tex]\[ -5 + \frac{4}{11} = -5 + 0.363636363636... = -4.636363636363637 \][/tex]
This number is a terminating or repeating decimal, so it is rational.

2. Number: [tex]\(\sqrt{31}\)[/tex]

The square root of 31 is:
[tex]\[ \sqrt{31} \approx 5.5677643628300215 \][/tex]
Since 31 is not a perfect square, [tex]\(\sqrt{31}\)[/tex] is an irrational number.

3. Number: 7.608

This is a simple decimal number that does not repeat and terminates. Therefore, it is a rational number.

4. Number: [tex]\(18.4 \overline{6}\)[/tex]

The notation [tex]\(18.4 \overline{6}\)[/tex] represents a repeating decimal:
[tex]\[ 18.4666666\ldots \][/tex]
Repeating decimals are rational numbers because they can be expressed as a fraction.

Hence, among the given numbers:

- [tex]\(-5 \frac{4}{11} \approx -4.636363636363637\)[/tex]
- [tex]\(\sqrt{31} \approx 5.5677643628300215\)[/tex]
- [tex]\(7.608\)[/tex]
- [tex]\(18.4 \overline{6}\)[/tex]

The number that is not rational is [tex]\(\sqrt{31}\)[/tex].
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