Rewrite Using A Single Positive Exponent. 8 9 ⋅ 8 − 3 8^9 \cdot 8^{-3} 8 9 ⋅ 8 − 3

Introduction

In mathematics, exponents are a fundamental concept used to represent repeated multiplication of a number. When dealing with exponential expressions, it is often necessary to simplify them to make calculations easier. One common technique for simplifying exponential expressions is to rewrite them using a single positive exponent. In this article, we will explore how to rewrite the expression $8^9 \cdot 8^{-3}$ using a single positive exponent.

Understanding Exponents

Before we dive into the simplification process, let's review the basics of exponents. An exponent is a small number that is written to the upper right of a number or expression. It represents the number of times the base is multiplied by itself. For example, in the expression $2^3$, the exponent 3 indicates that the base 2 is multiplied by itself 3 times: $2^3 = 2 \cdot 2 \cdot 2 = 8$.

Rewriting Exponential Expressions

To rewrite an exponential expression using a single positive exponent, we need to apply the rule of exponents that states: $a^m \cdot a^n = a^{m+n}$. This rule allows us to combine two exponential expressions with the same base into a single exponential expression with a single exponent.

Simplifying the Expression $8^9 \cdot 8^{-3}$

Now, let's apply the rule of exponents to simplify the expression $8^9 \cdot 8^{-3}$. We can rewrite this expression as:

$$8^9 \cdot 8^{-3} = 8^{9+(-3)}$$

Using the rule of exponents, we can simplify the exponent by adding 9 and -3:

$$8^{9+(-3)} = 8^6$$

Therefore, the expression $8^9 \cdot 8^{-3}$ can be rewritten as $8^6$ using a single positive exponent.

Example 2: Simplifying $x^4 \cdot x^{-2}$

Let's consider another example: $x^4 \cdot x^{-2}$. We can rewrite this expression as:

$$x^4 \cdot x^{-2} = x^{4+(-2)}$$

Using the rule of exponents, we can simplify the exponent by adding 4 and -2:

$$x^{4+(-2)} = x^2$$

Therefore, the expression $x^4 \cdot x^{-2}$ can be rewritten as $x^2$ using a single positive exponent.

Conclusion

In this article, we have learned how to rewrite exponential expressions using a single positive exponent. By applying the rule of exponents, we can simplify complex expressions and make calculations easier. The key takeaway is that when dealing with exponential expressions, we can combine two expressions with the same base into a single expression with a single exponent. This technique is essential in mathematics and is used extensively in algebra, geometry, and other branches of mathematics.

Common Mistakes to Avoid

When rewriting exponential expressions using a single positive exponent, there are a few common mistakes to avoid:

• Incorrect application of the rule of exponents: Make sure to apply the rule of exponents correctly by adding or subtracting the exponents.
• Not simplifying the exponent: Make sure to simplify the exponent by combining like terms.
• Not checking the result: Make sure to check the result to ensure that it is correct.

Practice Problems

To practice rewriting exponential expressions using a single positive exponent, try the following problems:

• Rewrite $2^5 \cdot 2^{-3}$ using a single positive exponent.
• Rewrite $x^3 \cdot x^{-4}$ using a single positive exponent.
• Rewrite $3^2 \cdot 3^{-5}$ using a single positive exponent.

Answer Key

• $2^5 \cdot 2^{-3} = 2^{5+(-3)} = 2^2$
• $x^3 \cdot x^{-4} = x^{3+(-4)} = x^{-1}$
• $3^2 \cdot 3^{-5} = 3^{2+(-5)} = 3^{-3}$
  Q&A: Rewriting Exponential Expressions using a Single Positive Exponent ====================================================================

Introduction

In our previous article, we learned how to rewrite exponential expressions using a single positive exponent. In this article, we will answer some common questions and provide additional examples to help you master this technique.

Q: What is the rule of exponents?

A: The rule of exponents states that when you multiply two exponential expressions with the same base, you can combine them into a single exponential expression with a single exponent. The rule is: $a^m \cdot a^n = a^{m+n}$.

Q: How do I apply the rule of exponents?

A: To apply the rule of exponents, simply add or subtract the exponents. For example, if you have $2^3 \cdot 2^4$, you can rewrite it as $2^{3+4} = 2^7$.

Q: What if the exponents are negative?

A: If the exponents are negative, you can still apply the rule of exponents. For example, if you have $2^{-3} \cdot 2^{-4}$, you can rewrite it as $2^{(-3)+(-4)} = 2^{-7}$.

Q: Can I rewrite an exponential expression with a negative exponent?

A: Yes, you can rewrite an exponential expression with a negative exponent using a single positive exponent. For example, if you have $2^{-3}$, you can rewrite it as $\frac{1}{2^3}$.

Q: How do I simplify an exponential expression with a negative exponent?

A: To simplify an exponential expression with a negative exponent, you can rewrite it as a fraction with a positive exponent. For example, if you have $2^{-3}$, you can rewrite it as $\frac{1}{2^3}$.

Q: What if I have an exponential expression with a variable exponent?

A: If you have an exponential expression with a variable exponent, you can still apply the rule of exponents. For example, if you have $x^3 \cdot x^4$, you can rewrite it as $x^{3+4} = x^7$.

Q: Can I rewrite an exponential expression with a variable exponent?

A: Yes, you can rewrite an exponential expression with a variable exponent using a single positive exponent. For example, if you have $x^3 \cdot x^4$, you can rewrite it as $x^{3+4} = x^7$.

Q: How do I check my work?

A: To check your work, make sure to apply the rule of exponents correctly and simplify the expression. You can also use a calculator to check your answer.

Practice Problems

To practice rewriting exponential expressions using a single positive exponent, try the following problems:

• Rewrite $3^2 \cdot 3^{-5}$ using a single positive exponent.
• Rewrite $x^4 \cdot x^{-2}$ using a single positive exponent.
• Rewrite $2^{-3} \cdot 2^{-4}$ using a single positive exponent.

Answer Key

• $3^2 \cdot 3^{-5} = 3^{2+(-5)} = 3^{-3}$
• $x^4 \cdot x^{-2} = x^{4+(-2)} = x^2$
• $2^{-3} \cdot 2^{-4} = 2^{(-3)+(-4)} = 2^{-7}$

Conclusion

In this article, we have answered some common questions and provided additional examples to help you master the technique of rewriting exponential expressions using a single positive exponent. Remember to apply the rule of exponents correctly and simplify the expression to get the correct answer. With practice, you will become proficient in rewriting exponential expressions using a single positive exponent.