Which Sign Makes The Statement True?$\frac{2}{4}-\frac{2}{5} \, ? \, \frac{1}{10}$

Feb 25, 2025 by ADMIN 83 views

$Which Sign Makes the Statement True? $\frac{2}{4}-\frac{2}{5} \, ? \, \frac{1}{10}$$

Introduction

In mathematics, the comparison of fractions is a fundamental concept that is often used in various mathematical operations. When comparing fractions, we need to determine which sign makes the statement true. In this article, we will explore the concept of comparing fractions and determine which sign makes the statement true in the given expression $\frac{2}{4}-\frac{2}{5} \, ? \, \frac{1}{10}$ .

Understanding the Concept of Comparing Fractions

Comparing fractions involves determining which fraction is greater or lesser than another fraction. To compare fractions, we need to find a common denominator, which is the least common multiple (LCM) of the denominators of the fractions. Once we have a common denominator, we can compare the numerators of the fractions.

Finding a Common Denominator

To find a common denominator, we need to find the LCM of the denominators of the fractions. In this case, the denominators are 4 and 5. The LCM of 4 and 5 is 20.

Converting Fractions to Have a Common Denominator

Now that we have a common denominator, we can convert the fractions to have a common denominator. We can do this by multiplying the numerator and denominator of each fraction by the necessary factor to get a denominator of 20.

$\frac{2}{4} = \frac{2 \times 5}{4 \times 5} = \frac{10}{20}$

$\frac{2}{5} = \frac{2 \times 4}{5 \times 4} = \frac{8}{20}$

Comparing the Fractions

Now that we have converted the fractions to have a common denominator, we can compare them. We can do this by comparing the numerators of the fractions.

$\frac{10}{20} - \frac{8}{20} = \frac{2}{20}$

Determining Which Sign Makes the Statement True

Now that we have compared the fractions, we can determine which sign makes the statement true. In this case, the statement is $\frac{2}{4}-\frac{2}{5} \, ? \, \frac{1}{10}$ . We can see that $\frac{2}{20}$ is equal to $\frac{1}{10}$ .

Conclusion

In conclusion, the sign that makes the statement true is the equal sign (=). This is because $\frac{2}{4}-\frac{2}{5} = \frac{1}{10}$ .

Examples and Applications

Comparing fractions is a fundamental concept in mathematics that has many applications in real-life situations. Here are a few examples:

Cooking: When cooking, we often need to compare the amount of ingredients in a recipe. For example, if a recipe calls for 2 cups of flour and we have 3 cups of flour, we can compare the fractions to determine which one is greater.
Finance: In finance, we often need to compare the interest rates of different investments. For example, if we have two investment options with interest rates of 5% and 6%, we can compare the fractions to determine which one is greater.
Science: In science, we often need to compare the measurements of different quantities. For example, if we have two measurements of the same quantity with values of 10 cm and 12 cm, we can compare the fractions to determine which one is greater.

Tips and Tricks

Here are a few tips and tricks for comparing fractions:

Use a common denominator: When comparing fractions, it is often helpful to use a common denominator. This can make it easier to compare the fractions.
Compare the numerators: When comparing fractions, we can compare the numerators of the fractions. This can make it easier to determine which fraction is greater.
Use visual aids: When comparing fractions, it can be helpful to use visual aids such as diagrams or charts. This can make it easier to understand the concept of comparing fractions.

Conclusion

In conclusion, comparing fractions is a fundamental concept in mathematics that has many applications in real-life situations. By understanding how to compare fractions, we can make informed decisions in a variety of situations. Whether we are cooking, financing, or conducting scientific experiments, comparing fractions is an essential skill that can help us achieve our goals.

Frequently Asked Questions

Here are a few frequently asked questions about comparing fractions:

Q: What is the best way to compare fractions? A: The best way to compare fractions is to use a common denominator. This can make it easier to compare the fractions.
Q: How do I determine which fraction is greater? A: To determine which fraction is greater, we can compare the numerators of the fractions. The fraction with the greater numerator is the greater fraction.
Q: What are some real-life applications of comparing fractions? A: Comparing fractions has many real-life applications, including cooking, finance, and science. By understanding how to compare fractions, we can make informed decisions in a variety of situations.

References

Here are a few references for further reading on comparing fractions:

"Comparing Fractions" by Math Open Reference: This article provides a comprehensive overview of comparing fractions, including how to use a common denominator and compare the numerators.
"Comparing Fractions" by Khan Academy: This article provides a step-by-step guide to comparing fractions, including how to use a common denominator and compare the numerators.
"Comparing Fractions" by Mathway: This article provides a comprehensive overview of comparing fractions, including how to use a common denominator and compare the numerators.

Introduction

Comparing fractions is a fundamental concept in mathematics that has many applications in real-life situations. Whether we are cooking, financing, or conducting scientific experiments, comparing fractions is an essential skill that can help us achieve our goals. In this article, we will answer some of the most frequently asked questions about comparing fractions.

Q: What is the best way to compare fractions?

A: The best way to compare fractions is to use a common denominator. This can make it easier to compare the fractions. To find a common denominator, we need to find the least common multiple (LCM) of the denominators of the fractions.

Q: How do I determine which fraction is greater?

A: To determine which fraction is greater, we can compare the numerators of the fractions. The fraction with the greater numerator is the greater fraction. For example, if we have two fractions $\frac{1}{2}$ and $\frac{1}{3}$ , we can compare the numerators to determine which one is greater.

Q: What are some real-life applications of comparing fractions?

A: Comparing fractions has many real-life applications, including cooking, finance, and science. By understanding how to compare fractions, we can make informed decisions in a variety of situations. For example, if we are cooking and we need to compare the amount of ingredients in a recipe, we can use comparing fractions to determine which one is greater.

Q: How do I compare fractions with different denominators?

A: To compare fractions with different denominators, we need to find a common denominator. This can be done by finding the least common multiple (LCM) of the denominators of the fractions. Once we have a common denominator, we can compare the fractions by comparing the numerators.

Q: Can I compare fractions with unlike denominators?

A: Yes, we can compare fractions with unlike denominators. To do this, we need to find a common denominator, which is the least common multiple (LCM) of the denominators of the fractions. Once we have a common denominator, we can compare the fractions by comparing the numerators.

Q: How do I compare fractions with decimals?

A: To compare fractions with decimals, we need to convert the decimals to fractions. This can be done by dividing the decimal by the denominator. Once we have the fractions, we can compare them by comparing the numerators.

Q: Can I compare fractions with negative numbers?

A: Yes, we can compare fractions with negative numbers. To do this, we need to follow the same steps as comparing fractions with positive numbers. We need to find a common denominator and compare the numerators.

Q: How do I compare mixed numbers?

A: To compare mixed numbers, we need to convert them to improper fractions. This can be done by multiplying the whole number by the denominator and adding the numerator. Once we have the improper fractions, we can compare them by comparing the numerators.

Q: Can I compare fractions with variables?

A: Yes, we can compare fractions with variables. To do this, we need to follow the same steps as comparing fractions with constants. We need to find a common denominator and compare the numerators.

Q: How do I compare fractions with different signs?

A: To compare fractions with different signs, we need to follow the same steps as comparing fractions with the same sign. We need to find a common denominator and compare the numerators.

Conclusion

References

Here are a few references for further reading on comparing fractions:

"Comparing Fractions" by Math Open Reference: This article provides a comprehensive overview of comparing fractions, including how to use a common denominator and compare the numerators.
"Comparing Fractions" by Khan Academy: This article provides a step-by-step guide to comparing fractions, including how to use a common denominator and compare the numerators.
"Comparing Fractions" by Mathway: This article provides a comprehensive overview of comparing fractions, including how to use a common denominator and compare the numerators.

Additional Resources

Here are a few additional resources for further reading on comparing fractions:

"Comparing Fractions" by IXL: This article provides a comprehensive overview of comparing fractions, including how to use a common denominator and compare the numerators.
"Comparing Fractions" by Purplemath: This article provides a step-by-step guide to comparing fractions, including how to use a common denominator and compare the numerators.
"Comparing Fractions" by Math Is Fun: This article provides a comprehensive overview of comparing fractions, including how to use a common denominator and compare the numerators.