Which Of The Following Is Equivalent To The Expression Below? − 64 \sqrt{-64} − 64 ​ A. − 8 I -8i − 8 I B. 8 I 8i 8 I C. 8 D. -8

When dealing with expressions involving square roots of negative numbers, we enter the realm of imaginary numbers. Imaginary numbers are a fundamental concept in mathematics, particularly in algebra and calculus. In this article, we will explore the concept of imaginary numbers and determine which of the given options is equivalent to the expression $\sqrt{-64}$.

What are Imaginary Numbers?

Imaginary numbers are a subset of complex numbers, which are numbers that can be expressed in the form $a + bi$, where $a$ and $b$ are real numbers and $i$ is the imaginary unit. The imaginary unit $i$ is defined as the square root of $-1$, denoted by $i = \sqrt{-1}$. This means that $i^2 = -1$.

The Concept of Square Roots of Negative Numbers

When we encounter an expression like $\sqrt{-64}$, we need to understand that the square root of a negative number is not a real number. Instead, it is an imaginary number. To evaluate this expression, we can rewrite it as $\sqrt{-64} = \sqrt{64 \cdot -1} = \sqrt{64} \cdot \sqrt{-1} = 8i$.

Evaluating the Options

Now that we have evaluated the expression $\sqrt{-64}$, let's examine the given options:

A. $-8i$ B. $8i$ C. 8 D. -8

Based on our previous discussion, we know that $\sqrt{-64} = 8i$. Therefore, the correct answer is:

The Correct Answer: $8i$

The expression $\sqrt{-64}$ is equivalent to $8i$, which is an imaginary number. This is because the square root of a negative number is an imaginary number, and in this case, it is $8i$.

Conclusion

In conclusion, when dealing with expressions involving square roots of negative numbers, we need to understand the concept of imaginary numbers. The square root of a negative number is an imaginary number, and in this case, $\sqrt{-64}$ is equivalent to $8i$. This is a fundamental concept in mathematics, particularly in algebra and calculus.

Additional Examples

To further illustrate this concept, let's consider a few more examples:

• $\sqrt{-9} = \sqrt{9 \cdot -1} = \sqrt{9} \cdot \sqrt{-1} = 3i$
• $\sqrt{-16} = \sqrt{16 \cdot -1} = \sqrt{16} \cdot \sqrt{-1} = 4i$
• $\sqrt{-25} = \sqrt{25 \cdot -1} = \sqrt{25} \cdot \sqrt{-1} = 5i$

In each of these examples, we can see that the square root of a negative number is an imaginary number.

Final Thoughts

In conclusion, the expression $\sqrt{-64}$ is equivalent to $8i$, which is an imaginary number. This is a fundamental concept in mathematics, particularly in algebra and calculus. By understanding the concept of imaginary numbers, we can evaluate expressions involving square roots of negative numbers and determine their equivalent values.

References

• "Imaginary Numbers" by Math Open Reference
• "Complex Numbers" by Khan Academy
• "Algebra and Calculus" by MIT OpenCourseWare

Glossary

• Imaginary Unit: The square root of $-1$, denoted by $i$.
• Complex Number: A number that can be expressed in the form $a + bi$, where $a$ and $b$ are real numbers and $i$ is the imaginary unit.
• Square Root of a Negative Number: An imaginary number, which is a subset of complex numbers.
  Imaginary Numbers Q&A =========================

In our previous article, we explored the concept of imaginary numbers and determined that the expression $\sqrt{-64}$ is equivalent to $8i$. In this article, we will answer some frequently asked questions about imaginary numbers.

Q: What is the difference between real and imaginary numbers?

A: Real numbers are numbers that can be expressed on the number line, such as 3, 4, and 5. Imaginary numbers, on the other hand, are numbers that cannot be expressed on the number line and are used to extend the real number system to the complex number system.

Q: What is the imaginary unit?

A: The imaginary unit, denoted by $i$, is defined as the square root of $-1$. This means that $i^2 = -1$.

Q: How do I add and subtract imaginary numbers?

A: To add and subtract imaginary numbers, you can treat them just like real numbers. For example:

• $(3 + 4i) + (2 - 5i) = (3 + 2) + (4i - 5i) = 5 - i$
• $(3 + 4i) - (2 - 5i) = (3 - 2) + (4i + 5i) = 1 + 9i$

Q: How do I multiply imaginary numbers?

A: To multiply imaginary numbers, you can use the following rules:

• $i^2 = -1$
• $i^3 = -i$
• $i^4 = 1$

Using these rules, you can multiply imaginary numbers as follows:

• $(3 + 4i)(2 - 5i) = (3)(2) + (3)(-5i) + (4i)(2) + (4i)(-5i)$
• $= 6 - 15i + 8i - 20i^2$
• $= 6 - 7i + 20$
• $= 26 - 7i$

Q: How do I divide imaginary numbers?

A: To divide imaginary numbers, you can use the following rules:

• $\frac{1}{i} = -i$
• $\frac{1}{-i} = i$

Using these rules, you can divide imaginary numbers as follows:

• $\frac{3 + 4i}{2 - 5i} = \frac{(3 + 4i)(2 + 5i)}{(2 - 5i)(2 + 5i)}$
• $= \frac{6 + 15i + 8i + 20i^2}{4 + 10i - 10i - 25i^2}$
• $= \frac{6 + 23i - 20}{4 + 25}$
• $= \frac{-14 + 23i}{29}$
• $= -\frac{14}{29} + \frac{23}{29}i$

Q: What are some common applications of imaginary numbers?

A: Imaginary numbers have many applications in mathematics, science, and engineering. Some common applications include:

• Electrical Engineering: Imaginary numbers are used to represent AC circuits and analyze their behavior.
• Signal Processing: Imaginary numbers are used to represent signals and analyze their frequency content.
• Navigation: Imaginary numbers are used to represent the position and velocity of objects in navigation systems.
• Computer Graphics: Imaginary numbers are used to represent 3D objects and perform transformations on them.

Q: What are some common mistakes to avoid when working with imaginary numbers?

A: Some common mistakes to avoid when working with imaginary numbers include:

• Forgetting to multiply by $i$: When multiplying imaginary numbers, don't forget to multiply by $i$.
• Forgetting to divide by $i$: When dividing imaginary numbers, don't forget to divide by $i$.
• Not using the correct rules for multiplication and division: Make sure to use the correct rules for multiplication and division of imaginary numbers.

Conclusion

In conclusion, imaginary numbers are a fundamental concept in mathematics, particularly in algebra and calculus. By understanding the concept of imaginary numbers, you can evaluate expressions involving square roots of negative numbers and determine their equivalent values. We hope this Q&A article has helped you to better understand imaginary numbers and their applications.