What Is The Value Of ( − 5 ) 4 (-5)^4 ( − 5 ) 4 ?

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Understanding the Concept of Exponents

Exponents are a fundamental concept in mathematics that helps us simplify complex expressions and calculations. In this article, we will delve into the world of exponents and explore the value of $(-5)^4$. To begin with, let's understand the basics of exponents.

What are Exponents?

Exponents are a shorthand way of representing repeated multiplication. For example, $2^3$ can be read as "2 to the power of 3" or "2 multiplied by itself 3 times." This can be written as $2 \times 2 \times 2 = 8$. In general, $a^b$ represents the product of $a$ multiplied by itself $b$ times.

The Order of Operations

When dealing with exponents, it's essential to follow the order of operations. This means that we need to evaluate the expression inside the parentheses first, followed by the exponentiation. In the case of $(-5)^4$, we need to evaluate the expression inside the parentheses first, which is $-5$. Then, we need to raise $-5$ to the power of 4.

Evaluating the Expression

To evaluate the expression $(-5)^4$, we need to follow the order of operations. First, we need to evaluate the expression inside the parentheses, which is $-5$. Then, we need to raise $-5$ to the power of 4.

Raising a Negative Number to a Positive Power

When we raise a negative number to a positive power, the result is always positive. This is because the negative sign is "canceled out" by the positive exponent. In the case of $(-5)^4$, we can rewrite it as $(-5) \times (-5) \times (-5) \times (-5)$.

Simplifying the Expression

Now that we have rewritten the expression as $(-5) \times (-5) \times (-5) \times (-5)$, we can simplify it by multiplying the numbers together. When we multiply a negative number by another negative number, the result is always positive.

Multiplying Negative Numbers

When we multiply two negative numbers together, the result is always positive. This is because the negative signs "cancel out" each other. In the case of $(-5) \times (-5)$, we can rewrite it as $25$. Then, we can multiply $25$ by $-5$ again to get $-125$.

The Final Answer

So, what is the value of $(-5)^4$? By following the order of operations and simplifying the expression, we can see that the final answer is $625$.

Conclusion

In this article, we explored the concept of exponents and how to evaluate expressions with negative numbers. We learned that when we raise a negative number to a positive power, the result is always positive. We also learned that when we multiply two negative numbers together, the result is always positive. By following the order of operations and simplifying the expression, we can see that the final answer to $(-5)^4$ is $625$.

Frequently Asked Questions

• What is the value of $(-5)^4$?
  • The final answer is $625$.
• How do I evaluate an expression with a negative number?
  • First, evaluate the expression inside the parentheses. Then, raise the result to the power of the exponent.
• What happens when I multiply two negative numbers together?
  • The result is always positive.

Additional Resources

• Exponents Tutorial: A comprehensive tutorial on exponents, including examples and practice problems.
• Order of Operations: A guide to the order of operations, including examples and practice problems.
• Negative Numbers: A tutorial on negative numbers, including examples and practice problems.

Conclusion

In conclusion, the value of $(-5)^4$ is $625$. We learned that when we raise a negative number to a positive power, the result is always positive. We also learned that when we multiply two negative numbers together, the result is always positive. By following the order of operations and simplifying the expression, we can see that the final answer is $625$.

Q&A: Exponents and Negative Numbers

In this article, we will answer some of the most frequently asked questions about exponents and negative numbers. Whether you're a student, a teacher, or just someone who wants to learn more about math, this article is for you.

Q: What is the value of $(-5)^4$?

A: The value of $(-5)^4$ is $625$. This is because when we raise a negative number to a positive power, the result is always positive.

Q: How do I evaluate an expression with a negative number?

A: To evaluate an expression with a negative number, you need to follow the order of operations. First, evaluate the expression inside the parentheses. Then, raise the result to the power of the exponent.

Q: What happens when I multiply two negative numbers together?

A: When you multiply two negative numbers together, the result is always positive. This is because the negative signs "cancel out" each other.

Q: Can I simplify an expression with a negative number?

A: Yes, you can simplify an expression with a negative number by following the order of operations. First, evaluate the expression inside the parentheses. Then, raise the result to the power of the exponent.

Q: How do I know when to use parentheses in an expression?

A: You should use parentheses in an expression when you need to evaluate the expression inside the parentheses first. This is especially important when working with exponents and negative numbers.

Q: Can I use exponents with fractions?

A: Yes, you can use exponents with fractions. For example, $(\frac{1}{2})^3$ is equal to $\frac{1}{8}$.

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

A: To evaluate an expression with a negative exponent, you need to follow the rule that $a^{-n} = \frac{1}{a^n}$. For example, $(-5)^{-2}$ is equal to $\frac{1}{(-5)^2}$, which is equal to $\frac{1}{25}$.

Q: Can I use exponents with decimals?

A: Yes, you can use exponents with decimals. For example, $(2.5)^3$ is equal to $15.625$.

Q: How do I know when to use a negative exponent?

A: You should use a negative exponent when you need to indicate that the base is being raised to a power that is the reciprocal of the given power. For example, $(-5)^{-2}$ is equal to $\frac{1}{(-5)^2}$.

Q: Can I simplify an expression with a negative exponent?

A: Yes, you can simplify an expression with a negative exponent by following the rule that $a^{-n} = \frac{1}{a^n}$. For example, $(-5)^{-2}$ is equal to $\frac{1}{(-5)^2}$, which is equal to $\frac{1}{25}$.

Q: How do I evaluate an expression with a zero exponent?

A: To evaluate an expression with a zero exponent, you need to follow the rule that $a^0 = 1$. For example, $(-5)^0$ is equal to $1$.

Q: Can I use exponents with variables?

A: Yes, you can use exponents with variables. For example, $x^2$ is equal to $x \times x$.

Q: How do I know when to use a variable with an exponent?

A: You should use a variable with an exponent when you need to indicate that the variable is being raised to a power. For example, $x^2$ is equal to $x \times x$.

Q: Can I simplify an expression with a variable and an exponent?

A: Yes, you can simplify an expression with a variable and an exponent by following the rules of exponents. For example, $x^2 \times x^3$ is equal to $x^5$.

Q: How do I evaluate an expression with a variable and a negative exponent?

A: To evaluate an expression with a variable and a negative exponent, you need to follow the rule that $a^{-n} = \frac{1}{a^n}$. For example, $x^{-2}$ is equal to $\frac{1}{x^2}$.

Q: Can I use exponents with radicals?

A: Yes, you can use exponents with radicals. For example, $\sqrt{x}^2$ is equal to $x$.

Q: How do I know when to use a radical with an exponent?

A: You should use a radical with an exponent when you need to indicate that the radical is being raised to a power. For example, $\sqrt{x}^2$ is equal to $x$.

Q: Can I simplify an expression with a radical and an exponent?

A: Yes, you can simplify an expression with a radical and an exponent by following the rules of exponents. For example, $\sqrt{x}^2 \times \sqrt{x}^3$ is equal to $\sqrt{x^5}$.

Q: How do I evaluate an expression with a radical and a negative exponent?

A: To evaluate an expression with a radical and a negative exponent, you need to follow the rule that $a^{-n} = \frac{1}{a^n}$. For example, $\sqrt{x}^{-2}$ is equal to $\frac{1}{\sqrt{x^2}}$.

Q: Can I use exponents with absolute value?

A: Yes, you can use exponents with absolute value. For example, $|x|^2$ is equal to $x^2$.

Q: How do I know when to use absolute value with an exponent?

A: You should use absolute value with an exponent when you need to indicate that the absolute value is being raised to a power. For example, $|x|^2$ is equal to $x^2$.

Q: Can I simplify an expression with absolute value and an exponent?

A: Yes, you can simplify an expression with absolute value and an exponent by following the rules of exponents. For example, $|x|^2 \times |x|^3$ is equal to $|x|^5$.

Q: How do I evaluate an expression with absolute value and a negative exponent?

A: To evaluate an expression with absolute value and a negative exponent, you need to follow the rule that $a^{-n} = \frac{1}{a^n}$. For example, $|x|^{-2}$ is equal to $\frac{1}{|x|^2}$.

Q: Can I use exponents with complex numbers?

A: Yes, you can use exponents with complex numbers. For example, $(2 + 3i)^2$ is equal to $-5 + 12i$.

Q: How do I know when to use complex numbers with an exponent?

A: You should use complex numbers with an exponent when you need to indicate that the complex number is being raised to a power. For example, $(2 + 3i)^2$ is equal to $-5 + 12i$.

Q: Can I simplify an expression with complex numbers and an exponent?

A: Yes, you can simplify an expression with complex numbers and an exponent by following the rules of exponents. For example, $(2 + 3i)^2 \times (2 + 3i)^3$ is equal to $(2 + 3i)^5$.

Q: How do I evaluate an expression with complex numbers and a negative exponent?

A: To evaluate an expression with complex numbers and a negative exponent, you need to follow the rule that $a^{-n} = \frac{1}{a^n}$. For example, $(2 + 3i)^{-2}$ is equal to $\frac{1}{(2 + 3i)^2}$.

Q: Can I use exponents with matrices?

A: Yes, you can use exponents with matrices. For example, $\begin{bmatrix} 1 & 2 \\ 3 & 4 \end{bmatrix}^2$ is equal to $\begin{bmatrix} 7 & 10 \\ 15 & 22 \end{bmatrix}$.

Q: How do I know when to use matrices with an exponent?

A: You should use matrices with an exponent when you need to indicate that the matrix is being raised to a power. For example, $\begin{bmatrix} 1 & 2 \\ 3 & 4 \end{bmatrix}^2$ is equal to $\begin{bmatrix} 7 & 10 \\ 15 & 22 \end{bmatrix}$.

Q: Can I simplify an expression with matrices and an exponent?

A: Yes, you can simplify an expression with matrices and an exponent by following the rules of exponents. For example, $\begin{bmatrix} 1 & 2 \\ 3 & 4 \end{bmatrix}^2 \times \begin{bmatrix} 1 & 2 \\ 3 & 4 \end{bmatrix}^3$ is equal to $\begin{bmatrix} 1 & 2 \\ 3 & 4 \end{bmatrix}^5$.

Q: How do I evaluate an expression with matrices and a negative exponent?

A: To evaluate an expression with matrices and a negative exponent, you need to follow the rule that $a^{-n} = \frac{1}{a^n}$. For example, $\begin{bmatrix} 1