Drag And Drop The Correct Answers Into The Boxes.The Rational Number $\frac{1}{3}$ Has A Decimal Expansion Of $\square$. The Irrational Number $ 3 \sqrt{3} 3 ​ [/tex] Has A Decimal Expansion Of $\square$.

Introduction

In mathematics, numbers can be broadly classified into two categories: rational and irrational. Rational numbers are those that can be expressed as the ratio of two integers, while irrational numbers are those that cannot be expressed in this form. In this article, we will delve into the decimal expansion of rational and irrational numbers, exploring the characteristics that distinguish them.

Rational Numbers: A Decimal Expansion Perspective

Rational numbers have a decimal expansion that either terminates or repeats. This means that the decimal representation of a rational number will eventually become a repeating pattern of digits. For example, the decimal expansion of the rational number $\frac{1}{3}$ is $0.\overline{3}$, where the bar above the 3 indicates that it repeats indefinitely.

Decimal Expansion of $\frac{1}{3}$

The decimal expansion of $\frac{1}{3}$ is $0.\overline{3}$. This means that the digit 3 repeats indefinitely, resulting in a decimal representation that never terminates. To understand why this is the case, let's consider the following:

$$\frac{1}{3} = 0.333...$$

To convert this decimal representation to a fraction, we can use the following method:

$$\frac{1}{3} = \frac{3}{10} - \frac{9}{100} + \frac{27}{1000} - \frac{81}{10000} + ...$$

This series of fractions can be expressed as a single fraction, resulting in the following:

$$\frac{1}{3} = \frac{3}{10} - \frac{9}{100} + \frac{27}{1000} - \frac{81}{10000} + ... = \frac{1}{3}$$

This demonstrates that the decimal representation of $\frac{1}{3}$ is indeed $0.\overline{3}$.

Irrational Numbers: A Decimal Expansion Perspective

Irrational numbers, on the other hand, have a decimal expansion that never terminates or repeats. This means that the decimal representation of an irrational number will continue indefinitely without any repeating pattern. For example, the decimal expansion of the irrational number $\sqrt{3}$ is approximately $1.73205080757...$, where the dots indicate that the decimal representation continues indefinitely.

Decimal Expansion of $\sqrt{3}$

The decimal expansion of $\sqrt{3}$ is approximately $1.73205080757...$. This means that the decimal representation of $\sqrt{3}$ never terminates or repeats, resulting in a decimal expansion that continues indefinitely. To understand why this is the case, let's consider the following:

$$\sqrt{3} = 1.73205080757...$$

This decimal representation is an approximation of the actual value of $\sqrt{3}$. To understand why this is the case, let's consider the following:

$$\sqrt{3} = \sqrt{3} \approx 1.73205080757...$$

This demonstrates that the decimal representation of $\sqrt{3}$ is indeed an approximation of the actual value.

Key Differences between Rational and Irrational Numbers

The key differences between rational and irrational numbers lie in their decimal expansions. Rational numbers have a decimal expansion that either terminates or repeats, while irrational numbers have a decimal expansion that never terminates or repeats. This distinction is crucial in mathematics, as it allows us to classify numbers into different categories and understand their properties.

Conclusion

In conclusion, the decimal expansion of rational and irrational numbers is a fundamental concept in mathematics. Rational numbers have a decimal expansion that either terminates or repeats, while irrational numbers have a decimal expansion that never terminates or repeats. Understanding these differences is crucial in mathematics, as it allows us to classify numbers into different categories and understand their properties.

Key Takeaways

• Rational numbers have a decimal expansion that either terminates or repeats.
• Irrational numbers have a decimal expansion that never terminates or repeats.
• The decimal representation of a rational number can be expressed as a fraction.
• The decimal representation of an irrational number is an approximation of the actual value.

Further Reading

For further reading on this topic, we recommend the following resources:

• "Rational and Irrational Numbers" by Math Open Reference
• "Decimal Expansion of Rational and Irrational Numbers" by Khan Academy
• "Rational and Irrational Numbers" by Wolfram MathWorld

References

• "Rational and Irrational Numbers" by Math Open Reference
• "Decimal Expansion of Rational and Irrational Numbers" by Khan Academy
• "Rational and Irrational Numbers" by Wolfram MathWorld

Appendix

The following is a list of common rational and irrational numbers, along with their decimal expansions:

Number	Decimal Expansion
$\frac{1}{3}$	$0.\overline{3}$
$\frac{1}{2}$	$0.5$
$\sqrt{2}$	$1.41421356237...$
$\sqrt{3}$	$1.73205080757...$

Introduction

In our previous article, we explored the decimal expansion of rational and irrational numbers. In this article, we will answer some of the most frequently asked questions about rational and irrational numbers.

Q: What is the difference between a rational and an irrational number?

A: A rational number is a number that can be expressed as the ratio of two integers, while an irrational number is a number that cannot be expressed in this form.

Q: Can you give me an example of a rational number?

A: Yes, the number $\frac{1}{3}$ is a rational number. It can be expressed as the ratio of two integers, 1 and 3.

Q: Can you give me an example of an irrational number?

A: Yes, the number $\sqrt{3}$ is an irrational number. It cannot be expressed as the ratio of two integers.

Q: How do I know if a number is rational or irrational?

A: To determine if a number is rational or irrational, you can try to express it as the ratio of two integers. If you can do so, then the number is rational. If you cannot do so, then the number is irrational.

Q: What is the decimal expansion of a rational number?

A: The decimal expansion of a rational number is either terminating or repeating. For example, the decimal expansion of $\frac{1}{3}$ is $0.\overline{3}$, where the bar above the 3 indicates that it repeats indefinitely.

Q: What is the decimal expansion of an irrational number?

A: The decimal expansion of an irrational number is non-terminating and non-repeating. For example, the decimal expansion of $\sqrt{3}$ is approximately $1.73205080757...$, where the dots indicate that the decimal representation continues indefinitely.

Q: Can you give me some examples of rational and irrational numbers?

A: Yes, here are some examples:

• Rational numbers: $\frac{1}{3}$, $\frac{1}{2}$, $\frac{3}{4}$
• Irrational numbers: $\sqrt{3}$, $\sqrt{2}$, $\pi$

Q: How do I convert a decimal representation to a fraction?

A: To convert a decimal representation to a fraction, you can use the following method:

1. Write the decimal representation as a series of fractions.
2. Simplify the fractions.
3. Combine the fractions.

For example, to convert the decimal representation $0.\overline{3}$ to a fraction, you can use the following method:

$$0.\overline{3} = \frac{3}{10} - \frac{9}{100} + \frac{27}{1000} - \frac{81}{10000} + ...$$

Simplifying the fractions, you get:

$$0.\overline{3} = \frac{1}{3}$$

Q: How do I convert a fraction to a decimal representation?

A: To convert a fraction to a decimal representation, you can use the following method:

1. Divide the numerator by the denominator.
2. Write the result as a decimal representation.

For example, to convert the fraction $\frac{1}{3}$ to a decimal representation, you can use the following method:

$$\frac{1}{3} = 0.\overline{3}$$

Q: What are some common applications of rational and irrational numbers?

A: Rational and irrational numbers have many common applications in mathematics and science. Some examples include:

• Geometry: Rational and irrational numbers are used to describe the lengths of sides and diagonals of triangles and other geometric shapes.
• Algebra: Rational and irrational numbers are used to solve equations and inequalities.
• Calculus: Rational and irrational numbers are used to describe the rates of change of functions and the accumulation of quantities.

Conclusion

In conclusion, rational and irrational numbers are two fundamental concepts in mathematics. Understanding the difference between these two types of numbers is crucial in mathematics and science. We hope that this Q&A guide has helped to clarify any questions you may have had about rational and irrational numbers.

Key Takeaways

• Rational numbers can be expressed as the ratio of two integers.
• Irrational numbers cannot be expressed as the ratio of two integers.
• The decimal expansion of a rational number is either terminating or repeating.
• The decimal expansion of an irrational number is non-terminating and non-repeating.
• Rational and irrational numbers have many common applications in mathematics and science.

Further Reading

For further reading on this topic, we recommend the following resources:

• "Rational and Irrational Numbers" by Math Open Reference
• "Decimal Expansion of Rational and Irrational Numbers" by Khan Academy
• "Rational and Irrational Numbers" by Wolfram MathWorld

References

• "Rational and Irrational Numbers" by Math Open Reference
• "Decimal Expansion of Rational and Irrational Numbers" by Khan Academy
• "Rational and Irrational Numbers" by Wolfram MathWorld

Appendix

The following is a list of common rational and irrational numbers, along with their decimal expansions:

Number	Decimal Expansion
$\frac{1}{3}$	$0.\overline{3}$
$\frac{1}{2}$	$0.5$
$\sqrt{2}$	$1.41421356237...$
$\sqrt{3}$	$1.73205080757...$

Note: The decimal expansions listed above are approximate values.