First, Find The Partial Products. Write Numbers As Integers, Decimals, Or Improper Fractions.Now, Write The Product.$8(0.25 + 0.5r) =$ $\square$

Introduction

In mathematics, multiplying expressions is a fundamental operation that involves combining variables and constants to obtain a product. When dealing with expressions containing variables and constants, it's essential to follow a step-by-step approach to ensure accuracy and efficiency. In this article, we will focus on finding the partial products of an expression and then writing the product.

Understanding Partial Products

Partial products are the individual products obtained by multiplying each term in the expression with the other terms. To find the partial products, we need to multiply each term in the expression with the other terms, taking into account the order of operations.

Step 1: Identify the Terms

The given expression is $8(0.25 + 0.5r)$. To find the partial products, we need to identify the terms in the expression. In this case, the terms are $8$, $0.25$, and $0.5r$.

Step 2: Multiply Each Term

Now that we have identified the terms, we can multiply each term with the other terms. We will start by multiplying $8$ with $0.25$ and $0.5r$.

Multiply 8 with 0.25

To multiply $8$ with $0.25$, we can simply multiply the numbers.

$8 \times 0.25 = 2$

Multiply 8 with 0.5r

To multiply $8$ with $0.5r$, we need to multiply the numbers and the variable.

$8 \times 0.5r = 4r$

Multiply 0.25 with 0.5r

To multiply $0.25$ with $0.5r$, we need to multiply the numbers and the variable.

$0.25 \times 0.5r = 0.125r$

Step 3: Write the Product

Now that we have found the partial products, we can write the product by combining the partial products.

$8(0.25 + 0.5r) = 2 + 4r + 0.125r$

We can simplify the expression by combining like terms.

$8(0.25 + 0.5r) = 2 + 4.125r$

Conclusion

In this article, we have discussed the importance of finding partial products when multiplying expressions. We have identified the terms in the expression, multiplied each term with the other terms, and written the product by combining the partial products. By following these steps, we can ensure accuracy and efficiency when multiplying expressions.

Tips and Tricks

• When multiplying expressions, it's essential to follow the order of operations.
• Identify the terms in the expression and multiply each term with the other terms.
• Write the product by combining the partial products.
• Simplify the expression by combining like terms.

Practice Problems

1. Multiply the expression $5(2x + 3y)$.
2. Multiply the expression $3(4a - 2b)$.
3. Multiply the expression $2(6c + 9d)$.

Answer Key

1. $10x + 15y$
2. $12a - 6b$
3. $12c + 18d$

References

• Mathematics Handbook
• Algebra Handbook

About the Author

Q: What is the order of operations when multiplying expressions?

A: The order of operations when multiplying expressions is to follow the order of operations (PEMDAS):

1. Parentheses: Evaluate expressions inside parentheses first.
2. Exponents: Evaluate any exponential expressions next.
3. Multiplication and Division: Evaluate any multiplication and division operations from left to right.
4. Addition and Subtraction: Finally, evaluate any addition and subtraction operations from left to right.

Q: How do I identify the terms in an expression?

A: To identify the terms in an expression, look for the individual parts of the expression that are separated by addition or subtraction signs. For example, in the expression $2x + 3y$, the terms are $2x$ and $3y$.

Q: How do I multiply each term with the other terms?

A: To multiply each term with the other terms, follow the order of operations. First, multiply the terms inside the parentheses, then multiply the terms outside the parentheses.

Q: What is the difference between a partial product and a product?

A: A partial product is the individual product obtained by multiplying each term in the expression with the other terms. The product is the final result obtained by combining the partial products.

Q: How do I write the product by combining the partial products?

A: To write the product by combining the partial products, add or subtract the partial products as necessary. For example, in the expression $8(0.25 + 0.5r)$, the partial products are $2$, $4r$, and $0.125r$. The product is $2 + 4r + 0.125r$.

Q: Can I simplify the expression by combining like terms?

A: Yes, you can simplify the expression by combining like terms. For example, in the expression $2 + 4r + 0.125r$, you can combine the like terms $4r$ and $0.125r$ to get $4.125r$.

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

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

• Not following the order of operations
• Not identifying the terms in the expression
• Not multiplying each term with the other terms
• Not writing the product by combining the partial products
• Not simplifying the expression by combining like terms

Q: How can I practice multiplying expressions?

A: You can practice multiplying expressions by working through example problems, such as the ones listed below:

• Multiply the expression $5(2x + 3y)$.
• Multiply the expression $3(4a - 2b)$.
• Multiply the expression $2(6c + 9d)$.

Q: What are some real-world applications of multiplying expressions?

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

• Calculating the area of a rectangle
• Finding the volume of a cube
• Determining the cost of a product
• Calculating the interest on a loan

Q: Can I use technology to help me multiply expressions?

A: Yes, you can use technology to help you multiply expressions. Many calculators and computer programs have built-in functions for multiplying expressions.

Q: How can I check my work when multiplying expressions?

A: You can check your work when multiplying expressions by:

• Using a calculator or computer program to verify your answer
• Working through the problem again to ensure that you followed the correct steps
• Checking your work for any errors or mistakes.