Which Expression Is Equivalent To $36x^2 - 25$?A. $(18x)^2 + (-5)^2$B. \$(18x)^2 - (5)^2$[/tex\]C. $(6x)^2 + (-5)^2$D. $(6x)^2 - (5)^2$

Introduction

In mathematics, algebraic expressions are used to represent various mathematical operations and relationships. One of the fundamental concepts in algebra is the difference of squares, which is a common technique used to simplify and factorize expressions. In this article, we will explore the concept of difference of squares and determine which expression is equivalent to $36x^2 - 25$.

Understanding the Difference of Squares

The difference of squares is a mathematical formula that states:

$$a^2 - b^2 = (a + b)(a - b)$$

This formula can be used to factorize expressions that are in the form of a difference of squares. To apply this formula, we need to identify the values of a and b in the given expression.

Identifying the Values of a and b

In the given expression $36x^2 - 25$, we can identify the values of a and b as follows:

• a = 6x
• b = 5

Applying the Difference of Squares Formula

Now that we have identified the values of a and b, we can apply the difference of squares formula to factorize the expression:

$$36x^2 - 25 = (6x)^2 - 5^2$$

Evaluating the Options

We are given four options to choose from, and we need to determine which one is equivalent to the expression $36x^2 - 25$. Let's evaluate each option:

Option A: $(18x)^2 + (-5)^2$

This option is not equivalent to the expression $36x^2 - 25$ because it adds 5^2 instead of subtracting it.

Option B: $(18x)^2 - (5)^2$

This option is not equivalent to the expression $36x^2 - 25$ because it uses 18x instead of 6x.

Option C: $(6x)^2 + (-5)^2$

This option is not equivalent to the expression $36x^2 - 25$ because it adds 5^2 instead of subtracting it.

Option D: $(6x)^2 - (5)^2$

This option is equivalent to the expression $36x^2 - 25$ because it uses the correct values of a and b and applies the difference of squares formula correctly.

Conclusion

In conclusion, the expression that is equivalent to $36x^2 - 25$ is option D: $(6x)^2 - (5)^2$. This option correctly applies the difference of squares formula and uses the correct values of a and b.

Frequently Asked Questions

• What is the difference of squares formula? The difference of squares formula is a mathematical formula that states: $a^2 - b^2 = (a + b)(a - b)$
• How do I apply the difference of squares formula? To apply the difference of squares formula, you need to identify the values of a and b in the given expression and then use the formula to factorize the expression.
• What are the values of a and b in the expression $36x^2 - 25$? The values of a and b in the expression $36x^2 - 25$ are a = 6x and b = 5.

Final Answer

The final answer is option D: $(6x)^2 - (5)^2$.

Introduction

The difference of squares formula is a fundamental concept in algebra that is used to simplify and factorize expressions. In our previous article, we explored the concept of difference of squares and determined which expression is equivalent to $36x^2 - 25$. In this article, we will answer some frequently asked questions about the difference of squares formula.

Q&A

Q: What is the difference of squares formula?

A: The difference of squares formula is a mathematical formula that states:

$$a^2 - b^2 = (a + b)(a - b)$$

This formula can be used to factorize expressions that are in the form of a difference of squares.

Q: How do I apply the difference of squares formula?

A: To apply the difference of squares formula, you need to identify the values of a and b in the given expression and then use the formula to factorize the expression. Here's a step-by-step guide:

1. Identify the values of a and b in the given expression.
2. Plug these values into the difference of squares formula.
3. Simplify the expression to get the final answer.

Q: What are the values of a and b in the expression $36x^2 - 25$?

A: The values of a and b in the expression $36x^2 - 25$ are a = 6x and b = 5.

Q: Can I use the difference of squares formula with negative numbers?

A: Yes, you can use the difference of squares formula with negative numbers. For example:

$$(-3)^2 - (-4)^2 = ((-3) + 4)((-3) - 4)$$

Q: Can I use the difference of squares formula with fractions?

A: Yes, you can use the difference of squares formula with fractions. For example:

$$(\frac{1}{2})^2 - (\frac{3}{4})^2 = (\frac{1}{2} + \frac{3}{4})(\frac{1}{2} - \frac{3}{4})$$

Q: Can I use the difference of squares formula with variables?

A: Yes, you can use the difference of squares formula with variables. For example:

$$(2x)^2 - (3y)^2 = (2x + 3y)(2x - 3y)$$

Q: What are some common mistakes to avoid when using the difference of squares formula?

A: Here are some common mistakes to avoid when using the difference of squares formula:

• Not identifying the values of a and b correctly.
• Not plugging the values into the formula correctly.
• Not simplifying the expression correctly.
• Using the formula with expressions that are not in the form of a difference of squares.

Conclusion

In conclusion, the difference of squares formula is a powerful tool that can be used to simplify and factorize expressions. By understanding how to apply the formula and avoiding common mistakes, you can use it to solve a wide range of algebraic problems.

Final Tips

• Practice, practice, practice! The more you practice using the difference of squares formula, the more comfortable you will become with it.
• Make sure to identify the values of a and b correctly before plugging them into the formula.
• Simplify the expression carefully to avoid making mistakes.
• Use the formula with expressions that are in the form of a difference of squares.

Final Answer

The final answer is that the difference of squares formula is a powerful tool that can be used to simplify and factorize expressions. By understanding how to apply the formula and avoiding common mistakes, you can use it to solve a wide range of algebraic problems.