Rewrite The Expression.Evaluate The Expression: $ -5 \cdot (7 - 9) $

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Understanding the Basics of Mathematical Expressions

Mathematical expressions are a combination of numbers, variables, and mathematical operations that are used to represent a value or a relationship between values. In this article, we will focus on evaluating expressions, which involves simplifying mathematical expressions to obtain a single value. Evaluating expressions is an essential skill in mathematics, as it helps us to solve problems and make informed decisions.

The Order of Operations: A Key to Evaluating Expressions

When evaluating expressions, it is essential to follow the order of operations, which is a set of rules that dictate the order in which mathematical operations should be performed. The order of operations is often remembered using the acronym PEMDAS, which stands for:

  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.

Evaluating the Expression: $ -5 \cdot (7 - 9) $

Now that we have a basic understanding of mathematical expressions and the order of operations, let's evaluate the expression: $ -5 \cdot (7 - 9) $. To evaluate this expression, we need to follow the order of operations.

Step 1: Evaluate the Expression Inside the Parentheses

The expression inside the parentheses is $ 7 - 9 $. To evaluate this expression, we need to subtract 9 from 7.

$ 7 - 9 = -2 $

Step 2: Multiply -5 by the Result

Now that we have evaluated the expression inside the parentheses, we can multiply -5 by the result.

$ -5 \cdot (-2) = 10 $

Conclusion

Evaluating expressions is an essential skill in mathematics, and by following the order of operations, we can simplify complex expressions and obtain a single value. In this article, we evaluated the expression: $ -5 \cdot (7 - 9) $, and we obtained a result of 10. By understanding the basics of mathematical expressions and the order of operations, we can tackle even the most complex mathematical problems.

Common Mistakes to Avoid When Evaluating Expressions

When evaluating expressions, there are several common mistakes to avoid. These include:

  • Not following the order of operations: Failing to follow the order of operations can lead to incorrect results.
  • Not evaluating expressions inside parentheses first: Failing to evaluate expressions inside parentheses first can lead to incorrect results.
  • Not multiplying and dividing from left to right: Failing to multiply and divide from left to right can lead to incorrect results.
  • Not adding and subtracting from left to right: Failing to add and subtract from left to right can lead to incorrect results.

Tips for Evaluating Expressions

When evaluating expressions, there are several tips to keep in mind. These include:

  • Read the expression carefully: Before evaluating an expression, read it carefully to ensure that you understand what is being asked.
  • Follow the order of operations: Always follow the order of operations to ensure that you are evaluating the expression correctly.
  • Use parentheses to clarify the expression: If an expression is unclear, use parentheses to clarify it.
  • Check your work: Finally, always check your work to ensure that you have obtained the correct result.

Real-World Applications of Evaluating Expressions

Evaluating expressions has numerous real-world applications. These include:

  • Science and engineering: Evaluating expressions is essential in science and engineering, where complex mathematical models are used to describe and analyze real-world phenomena.
  • Finance: Evaluating expressions is essential in finance, where complex mathematical models are used to analyze and predict financial markets.
  • Computer programming: Evaluating expressions is essential in computer programming, where complex mathematical algorithms are used to solve problems and make decisions.
  • Data analysis: Evaluating expressions is essential in data analysis, where complex mathematical models are used to analyze and interpret data.

Conclusion

Evaluating expressions is an essential skill in mathematics, and by following the order of operations, we can simplify complex expressions and obtain a single value. In this article, we evaluated the expression: $ -5 \cdot (7 - 9) $, and we obtained a result of 10. By understanding the basics of mathematical expressions and the order of operations, we can tackle even the most complex mathematical problems.

Understanding the Basics of Mathematical Expressions

Mathematical expressions are a combination of numbers, variables, and mathematical operations that are used to represent a value or a relationship between values. In this article, we will focus on evaluating expressions, which involves simplifying mathematical expressions to obtain a single value. Evaluating expressions is an essential skill in mathematics, as it helps us to solve problems and make informed decisions.

Q&A: Evaluating Expressions

Q: What is the order of operations?

A: The order of operations is a set of rules that dictate the order in which mathematical operations should be performed. The order of operations is often remembered using the acronym PEMDAS, which stands for:

  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 evaluate an expression with parentheses?

A: To evaluate an expression with parentheses, you need to follow the order of operations. First, evaluate the expression inside the parentheses, and then multiply or divide the result by the number outside the parentheses.

Q: What is the difference between multiplication and division?

A: Multiplication and division are both operations that involve combining numbers. However, multiplication involves adding a number a certain number of times, while division involves sharing a number into equal parts.

Q: How do I evaluate an expression with exponents?

A: To evaluate an expression with exponents, you need to raise the base number to the power of the exponent. For example, $ 2^3 $ means 2 to the power of 3, which is equal to 8.

Q: What is the difference between addition and subtraction?

A: Addition and subtraction are both operations that involve combining numbers. However, addition involves combining numbers by adding them together, while subtraction involves combining numbers by subtracting one number from another.

Q: How do I evaluate an expression with multiple operations?

A: To evaluate an expression with multiple operations, you need to follow the order of operations. First, evaluate any expressions inside parentheses, and then evaluate any exponential expressions. Next, evaluate any multiplication and division operations from left to right, and finally, evaluate any addition and subtraction operations from left to right.

Common Mistakes to Avoid When Evaluating Expressions

When evaluating expressions, there are several common mistakes to avoid. These include:

  • Not following the order of operations: Failing to follow the order of operations can lead to incorrect results.
  • Not evaluating expressions inside parentheses first: Failing to evaluate expressions inside parentheses first can lead to incorrect results.
  • Not multiplying and dividing from left to right: Failing to multiply and divide from left to right can lead to incorrect results.
  • Not adding and subtracting from left to right: Failing to add and subtract from left to right can lead to incorrect results.

Tips for Evaluating Expressions

When evaluating expressions, there are several tips to keep in mind. These include:

  • Read the expression carefully: Before evaluating an expression, read it carefully to ensure that you understand what is being asked.
  • Follow the order of operations: Always follow the order of operations to ensure that you are evaluating the expression correctly.
  • Use parentheses to clarify the expression: If an expression is unclear, use parentheses to clarify it.
  • Check your work: Finally, always check your work to ensure that you have obtained the correct result.

Real-World Applications of Evaluating Expressions

Evaluating expressions has numerous real-world applications. These include:

  • Science and engineering: Evaluating expressions is essential in science and engineering, where complex mathematical models are used to describe and analyze real-world phenomena.
  • Finance: Evaluating expressions is essential in finance, where complex mathematical models are used to analyze and predict financial markets.
  • Computer programming: Evaluating expressions is essential in computer programming, where complex mathematical algorithms are used to solve problems and make decisions.
  • Data analysis: Evaluating expressions is essential in data analysis, where complex mathematical models are used to analyze and interpret data.

Conclusion

Evaluating expressions is an essential skill in mathematics, and by following the order of operations, we can simplify complex expressions and obtain a single value. In this article, we have provided a Q&A guide to help you understand the basics of mathematical expressions and the order of operations. By following the tips and avoiding common mistakes, you can become proficient in evaluating expressions and tackle even the most complex mathematical problems.