What Is The Product Of The Following Expression? { (3x + 6)^2$}$A. ${ 6x^2 + 12\$} B. ${ 9x^2 + 36\$} C. ${ 9x^2 + 18x + 36\$} D. ${ 9x^2 + 36x + 36\$}

Introduction

In this article, we will explore the concept of expanding a squared binomial expression and find the product of the given expression. The expression is {(3x + 6)^2$}$, and we need to find the resulting quadratic expression.

Understanding the Concept of Expanding a Squared Binomial

Expanding a squared binomial involves multiplying the binomial by itself. This process can be done using the FOIL method, which stands for First, Outer, Inner, Last. The FOIL method is a helpful technique for expanding squared binomials.

The FOIL Method

The FOIL method involves multiplying the first terms of each binomial, then the outer terms, then the inner terms, and finally the last terms. The resulting terms are then combined to form the expanded expression.

Applying the FOIL Method to the Given Expression

Let's apply the FOIL method to the given expression {(3x + 6)^2$}$. We will multiply the first terms of each binomial, then the outer terms, then the inner terms, and finally the last terms.

• First terms: ${3x \cdot 3x = 9x^2\$}
• Outer terms: ${3x \cdot 6 = 18x\$}
• Inner terms: ${6 \cdot 3x = 18x\$}
• Last terms: ${6 \cdot 6 = 36\$}

Combining the Terms

Now that we have multiplied the terms, we need to combine them to form the expanded expression. We can do this by adding the like terms together.

• The like terms are ${18x\$} and ${18x\$}, which can be combined to form ${36x\$}.
• The constant term is ${36\$}.

The Final Answer

The final answer is the expanded expression ${9x^2 + 36x + 36\$}. This is the product of the given expression {(3x + 6)^2$}$.

Conclusion

In this article, we explored the concept of expanding a squared binomial expression and found the product of the given expression. We applied the FOIL method to multiply the terms and combined the like terms to form the expanded expression. The final answer is ${9x^2 + 36x + 36\$}.

Comparison of the Answer Choices

Let's compare the answer choices to see which one matches our final answer.

• A. ${6x^2 + 12\$}: This answer choice is incorrect because it does not match our final answer.
• B. ${9x^2 + 36\$}: This answer choice is incorrect because it does not match our final answer.
• C. ${9x^2 + 18x + 36\$}: This answer choice is incorrect because it does not match our final answer.
• D. ${9x^2 + 36x + 36\$}: This answer choice matches our final answer.

Conclusion

Introduction

In the previous article, we explored the concept of expanding a squared binomial expression and found the product of the given expression. In this article, we will answer some frequently asked questions (FAQs) about expanding squared binomials.

Q: What is a squared binomial?

A: A squared binomial is an algebraic expression that is the result of multiplying a binomial by itself. For example, {(x + 3)^2$}$ is a squared binomial.

Q: How do I expand a squared binomial?

A: To expand a squared binomial, you can use the FOIL method, which stands for First, Outer, Inner, Last. This method involves multiplying the first terms of each binomial, then the outer terms, then the inner terms, and finally the last terms.

Q: What is the FOIL method?

A: The FOIL method is a helpful technique for expanding squared binomials. It involves multiplying the first terms of each binomial, then the outer terms, then the inner terms, and finally the last terms.

Q: How do I apply the FOIL method to a squared binomial?

A: To apply the FOIL method to a squared binomial, you need to multiply the first terms of each binomial, then the outer terms, then the inner terms, and finally the last terms. For example, if you have the squared binomial {(x + 3)^2$}$, you would multiply the first terms as follows:

• First terms: {x \cdot x = x^2$}$
• Outer terms: {x \cdot 3 = 3x$}$
• Inner terms: ${3 \cdot x = 3x\$}
• Last terms: ${3 \cdot 3 = 9\$}

Q: How do I combine the terms in a squared binomial?

A: To combine the terms in a squared binomial, you need to add the like terms together. For example, if you have the squared binomial {(x + 3)^2$}$, you would combine the like terms as follows:

• The like terms are ${3x\$} and ${3x\$}, which can be combined to form ${6x\$}.
• The constant term is ${9\$}.

Q: What is the final answer for the squared binomial {(3x + 6)^2$}$?

A: The final answer for the squared binomial {(3x + 6)^2$}$ is ${9x^2 + 36x + 36\$}.

Q: How do I know which answer choice is correct?

A: To know which answer choice is correct, you need to compare the answer choices to the final answer. In this case, the final answer is ${9x^2 + 36x + 36\$}, so the correct answer choice is D.

Conclusion

In conclusion, expanding squared binomials involves using the FOIL method to multiply the terms and combining the like terms to form the expanded expression. By following these steps, you can find the product of a squared binomial and choose the correct answer choice.

Additional Tips and Resources

• To practice expanding squared binomials, try using the FOIL method on different expressions.
• You can also use online resources, such as Khan Academy or Mathway, to help you with expanding squared binomials.
• If you are struggling with expanding squared binomials, try breaking down the problem into smaller steps and using visual aids, such as diagrams or charts, to help you understand the process.