Multiply: \[$(x-7)(x+8)\$\]

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Introduction

In algebra, multiplying binomials is a fundamental concept that helps us expand expressions and solve equations. In this article, we will focus on multiplying two binomials, {(x-7)(x+8)$}$, and provide a step-by-step guide on how to expand it.

What are Binomials?

A binomial is an algebraic expression consisting of two terms. It can be written in the form {ax + b$}$ or {ax - b$}$, where {a$}$ and {b$}$ are constants, and {x$}$ is the variable.

The FOIL Method

To multiply two binomials, we can use the FOIL method, which stands for "First, Outer, Inner, Last." This method helps us remember the order in which we multiply the terms.

Step 1: Multiply the First Terms

The first term in the first binomial is {x$}$, and the first term in the second binomial is also {x$}$. We multiply these two terms together to get {x^2$}$.

Step 2: Multiply the Outer Terms

The outer terms are {x$}$ and {-7$}$. We multiply these two terms together to get {-7x$}$.

Step 3: Multiply the Inner Terms

The inner terms are {-7$}$ and {x$}$. We multiply these two terms together to get {-7x$}$.

Step 4: Multiply the Last Terms

The last terms are {-7$}$ and ${8\$}. We multiply these two terms together to get {-56$}$.

Expanding the Expression

Now that we have multiplied all the terms, we can combine them to get the expanded expression.

{(x-7)(x+8) = x^2 - 7x + x - 56$}$

We can simplify this expression by combining like terms.

{x^2 - 6x - 56$}$

Conclusion

Multiplying binomials is an essential skill in algebra that helps us expand expressions and solve equations. By using the FOIL method, we can multiply two binomials and get the expanded expression. In this article, we focused on multiplying {(x-7)(x+8)$}$ and provided a step-by-step guide on how to expand it.

Common Mistakes to Avoid

When multiplying binomials, it's essential to remember the order in which we multiply the terms. Here are some common mistakes to avoid:

• Not using the FOIL method: The FOIL method helps us remember the order in which we multiply the terms.
• Not multiplying all the terms: Make sure to multiply all the terms, including the first, outer, inner, and last terms.
• Not combining like terms: Combine like terms to simplify the expression.

Practice Problems

To practice multiplying binomials, try the following problems:

• {(x+3)(x-4)$]
• [$(x-2)(x+5)$]
• [$(x+1)(x-6)$]

Real-World Applications

Multiplying binomials has many real-world applications, including:

• Science: In physics, multiplying binomials helps us calculate the area of a rectangle.
• Engineering: In engineering, multiplying binomials helps us calculate the volume of a rectangular prism.
• Finance: In finance, multiplying binomials helps us calculate the interest on a loan.

Conclusion

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Introduction

In our previous article, we discussed how to multiply binomials using the FOIL method. In this article, we will provide a Q&A guide to help you understand the concept better.

Q: What is the FOIL method?

A: The FOIL method is a technique used to multiply two binomials. It stands for "First, Outer, Inner, Last" and helps us remember the order in which we multiply the terms.

Q: How do I use the FOIL method?

A: To use the FOIL method, follow these steps:

1. Multiply the first terms of both binomials.
2. Multiply the outer terms of both binomials.
3. Multiply the inner terms of both binomials.
4. Multiply the last terms of both binomials.
5. Combine the terms to get the expanded expression.

Q: What are some common mistakes to avoid when multiplying binomials?

A: Some common mistakes to avoid when multiplying binomials include:

• Not using the FOIL method
• Not multiplying all the terms
• Not combining like terms

Q: How do I simplify the expression after multiplying binomials?

A: To simplify the expression after multiplying binomials, combine like terms. This involves adding or subtracting the coefficients of the same variables.

Q: Can I use the FOIL method to multiply more than two binomials?

A: No, the FOIL method is used to multiply two binomials. If you need to multiply more than two binomials, you can use the distributive property or the FOIL method multiple times.

Q: How do I apply the concept of multiplying binomials to real-world problems?

A: Multiplying binomials has many real-world applications, including:

• Science: In physics, multiplying binomials helps us calculate the area of a rectangle.
• Engineering: In engineering, multiplying binomials helps us calculate the volume of a rectangular prism.
• Finance: In finance, multiplying binomials helps us calculate the interest on a loan.

Q: What are some practice problems to help me master the concept of multiplying binomials?

A: Here are some practice problems to help you master the concept of multiplying binomials:

• [$(x+3)(x-4)$]
• [$(x-2)(x+5)$]
• [$(x+1)(x-6)$]

Q: How do I know if I have made a mistake when multiplying binomials?

A: To check if you have made a mistake when multiplying binomials, follow these steps:

1. Multiply the binomials using the FOIL method.
2. Simplify the expression by combining like terms.
3. Check if the expression is correct by plugging in values for the variable.

Conclusion

Multiplying binomials is an essential skill in algebra that helps us expand expressions and solve equations. By using the FOIL method and following the steps outlined in this article, you can master the concept of multiplying binomials and apply it to real-world problems. Remember to practice regularly and check your work to ensure accuracy.

Common Misconceptions

Here are some common misconceptions about multiplying binomials:

• The FOIL method only works for two binomials: The FOIL method can be used to multiply more than two binomials, but it may require multiple applications.
• Multiplying binomials is only used in algebra: Multiplying binomials has many real-world applications, including science, engineering, and finance.
• The FOIL method is the only way to multiply binomials: There are other methods, such as the distributive property, that can be used to multiply binomials.

Real-World Applications

Multiplying binomials has many real-world applications, including:

• Science: In physics, multiplying binomials helps us calculate the area of a rectangle.
• Engineering: In engineering, multiplying binomials helps us calculate the volume of a rectangular prism.
• Finance: In finance, multiplying binomials helps us calculate the interest on a loan.

Conclusion

Multiplying binomials is an essential skill in algebra that helps us expand expressions and solve equations. By using the FOIL method and following the steps outlined in this article, you can master the concept of multiplying binomials and apply it to real-world problems. Remember to practice regularly and check your work to ensure accuracy.