Which Equation Shows An Example Of The Associative Property Of Addition?A. $(-4+i)+4i = -4+(i+4i$\]B. $(-4+i)+4i = 4i+(-4i+i$\]C. $4i \times (-4i+i) = (4i-4i)+(4i \times I$\]D. $(-4i+i)+0 = (-4i+i$\]

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The associative property of addition is a fundamental concept in mathematics that helps us understand how numbers can be grouped and combined in different ways. In this article, we will explore the associative property of addition and examine which equation shows an example of this property.

What is the Associative Property of Addition?

The associative property of addition states that when we add three or more numbers together, the order in which we group the numbers does not change the result. In other words, the associative property of addition allows us to regroup the numbers in different ways without affecting the final answer.

Mathematical Representation of the Associative Property of Addition

The associative property of addition can be represented mathematically as:

(a + b) + c = a + (b + c)

This equation shows that the order in which we add the numbers a, b, and c does not change the result.

Examples of the Associative Property of Addition

Let's consider some examples to illustrate the associative property of addition:

  • 2 + 3 + 4 = (2 + 3) + 4 = 5 + 4 = 9
  • 5 + 2 + 1 = 5 + (2 + 1) = 5 + 3 = 8

In these examples, we can see that the order in which we add the numbers does not change the result.

Which Equation Shows an Example of the Associative Property of Addition?

Now, let's examine the four equations provided and determine which one shows an example of the associative property of addition.

A. (4+i)+4i=4+(i+4i)(-4+i)+4i = -4+(i+4i)

This equation does not show an example of the associative property of addition. The left-hand side of the equation is a sum of two complex numbers, while the right-hand side is a sum of two complex numbers with a different grouping.

B. (4+i)+4i=4i+(4i+i)(-4+i)+4i = 4i+(-4i+i)

This equation does not show an example of the associative property of addition. The left-hand side of the equation is a sum of two complex numbers, while the right-hand side is a sum of three complex numbers with a different grouping.

C. 4i×(4i+i)=(4i4i)+(4i×i)4i \times (-4i+i) = (4i-4i)+(4i \times i)

This equation shows an example of the associative property of addition. The left-hand side of the equation is a product of two complex numbers, while the right-hand side is a sum of two complex numbers with a different grouping.

D. (4i+i)+0=(4i+i)(-4i+i)+0 = (-4i+i)

This equation does not show an example of the associative property of addition. The left-hand side of the equation is a sum of two complex numbers with a zero added, while the right-hand side is the same sum without the zero.

Conclusion

In conclusion, the equation that shows an example of the associative property of addition is:

4i×(4i+i)=(4i4i)+(4i×i)4i \times (-4i+i) = (4i-4i)+(4i \times i)

This equation illustrates the associative property of addition by showing that the order in which we group the numbers does not change the result.

Understanding the Associative Property of Addition in Real-Life Scenarios

The associative property of addition has many real-life applications. For example, when we are working with a team to complete a project, we can use the associative property of addition to regroup the tasks and complete them in a more efficient way.

Real-Life Example of the Associative Property of Addition

Let's consider a real-life scenario where we are working on a project to build a house. We have three tasks to complete: building the foundation, framing the house, and installing the electrical system. We can use the associative property of addition to regroup the tasks and complete them in a more efficient way.

For example, we can group the tasks as follows:

  • Building the foundation and framing the house: (building the foundation) + (framing the house)
  • Installing the electrical system: (installing the electrical system)

By using the associative property of addition, we can regroup the tasks and complete them in a more efficient way.

Conclusion

In conclusion, the associative property of addition is a fundamental concept in mathematics that helps us understand how numbers can be grouped and combined in different ways. The equation that shows an example of the associative property of addition is:

4i×(4i+i)=(4i4i)+(4i×i)4i \times (-4i+i) = (4i-4i)+(4i \times i)

This equation illustrates the associative property of addition by showing that the order in which we group the numbers does not change the result. The associative property of addition has many real-life applications, and understanding it can help us complete tasks more efficiently.

Frequently Asked Questions

Q: What is the associative property of addition?

A: The associative property of addition states that when we add three or more numbers together, the order in which we group the numbers does not change the result.

Q: How can we use the associative property of addition in real-life scenarios?

A: We can use the associative property of addition to regroup tasks and complete them in a more efficient way.

Q: What is an example of the associative property of addition?

A: An example of the associative property of addition is the equation:

4i×(4i+i)=(4i4i)+(4i×i)4i \times (-4i+i) = (4i-4i)+(4i \times i)

This equation illustrates the associative property of addition by showing that the order in which we group the numbers does not change the result.

Q: Why is the associative property of addition important?

The associative property of addition is a fundamental concept in mathematics that helps us understand how numbers can be grouped and combined in different ways. In this article, we will answer some frequently asked questions about the associative property of addition.

Q: What is the associative property of addition?

A: The associative property of addition states that when we add three or more numbers together, the order in which we group the numbers does not change the result.

Q: How can we use the associative property of addition in real-life scenarios?

A: We can use the associative property of addition to regroup tasks and complete them in a more efficient way. For example, when working on a project, we can group tasks together and complete them in a specific order to save time and resources.

Q: What is an example of the associative property of addition?

A: An example of the associative property of addition is the equation:

4i×(4i+i)=(4i4i)+(4i×i)4i \times (-4i+i) = (4i-4i)+(4i \times i)

This equation illustrates the associative property of addition by showing that the order in which we group the numbers does not change the result.

Q: Why is the associative property of addition important?

A: The associative property of addition is important because it helps us understand how numbers can be grouped and combined in different ways. It also has many real-life applications, and understanding it can help us complete tasks more efficiently.

Q: Can the associative property of addition be applied to subtraction?

A: Yes, the associative property of addition can be applied to subtraction. The associative property of subtraction states that when we subtract three or more numbers, the order in which we group the numbers does not change the result.

Q: How can we prove the associative property of addition?

A: We can prove the associative property of addition by using mathematical induction. We can start with a simple example and then generalize it to more complex examples.

Q: What are some common mistakes to avoid when using the associative property of addition?

A: Some common mistakes to avoid when using the associative property of addition include:

  • Not following the order of operations
  • Not grouping numbers correctly
  • Not using the correct mathematical symbols

Q: Can the associative property of addition be applied to fractions?

A: Yes, the associative property of addition can be applied to fractions. We can add fractions together and regroup them in different ways to simplify the calculation.

Q: How can we use the associative property of addition to solve real-world problems?

A: We can use the associative property of addition to solve real-world problems by regrouping tasks and completing them in a more efficient way. For example, when working on a project, we can group tasks together and complete them in a specific order to save time and resources.

Conclusion

In conclusion, the associative property of addition is a fundamental concept in mathematics that helps us understand how numbers can be grouped and combined in different ways. By understanding the associative property of addition, we can solve real-world problems more efficiently and effectively.

Additional Resources

For more information on the associative property of addition, please refer to the following resources:

Final Thoughts

The associative property of addition is an important concept in mathematics that has many real-life applications. By understanding the associative property of addition, we can solve real-world problems more efficiently and effectively. We hope that this article has provided you with a better understanding of the associative property of addition and how it can be applied in real-life scenarios.