Simplify The Expression: \left(-3 J^7 K^5\right)\left(-8 J K^8\right ]

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Introduction

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In mathematics, complex numbers are a fundamental concept that plays a crucial role in various branches of mathematics and physics. A complex number is a number that can be expressed in the form $a + bi$, where $a$ and $b$ are real numbers and $i$ is the imaginary unit, which satisfies the equation $i^2 = -1$. In this article, we will focus on simplifying the expression $\left(-3 j^7 k^5\right)\left(-8 j k^8\right)$, which involves multiplying complex numbers.

Understanding Complex Numbers

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Before we dive into simplifying the expression, let's briefly review the concept of complex numbers. A complex number is a number that can be expressed in the form $a + bi$, where $a$ and $b$ are real numbers and $i$ is the imaginary unit. The real part of a complex number is denoted by $a$, and the imaginary part is denoted by $b$. Complex numbers can be added, subtracted, multiplied, and divided just like real numbers.

Properties of Complex Numbers

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There are several properties of complex numbers that we need to know in order to simplify the expression. These properties include:

• Commutative Property: The commutative property of complex numbers states that the order of the numbers does not change the result of the operation. In other words, $a + bi = b + ai$.
• Associative Property: The associative property of complex numbers states that the order in which we perform the operations does not change the result. In other words, $(a + bi) + (c + di) = (a + c) + (b + d)i$.
• Distributive Property: The distributive property of complex numbers states that we can distribute a complex number to the terms inside the parentheses. In other words, $a(b + c) = ab + ac$.

Simplifying the Expression

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Now that we have reviewed the properties of complex numbers, let's focus on simplifying the expression $\left(-3 j^7 k^5\right)\left(-8 j k^8\right)$. To simplify this expression, we need to multiply the two complex numbers together.

Multiplying Complex Numbers

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When multiplying complex numbers, we need to follow the rules of multiplication. The rules of multiplication for complex numbers are as follows:

• Multiplying Real Numbers: When multiplying real numbers, we simply multiply the numbers together.
• Multiplying Imaginary Numbers: When multiplying imaginary numbers, we need to use the fact that $i^2 = -1$.
• Multiplying Real and Imaginary Numbers: When multiplying real and imaginary numbers, we need to use the fact that $i^2 = -1$.

Applying the Rules of Multiplication

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Now that we have reviewed the rules of multiplication for complex numbers, let's apply these rules to simplify the expression $\left(-3 j^7 k^5\right)\left(-8 j k^8\right)$.

First, we need to multiply the real numbers together. The real numbers in the expression are $-3$ and $-8$. Multiplying these numbers together, we get:

$$(-3)(-8) = 24$$

Next, we need to multiply the imaginary numbers together. The imaginary numbers in the expression are $j^7$ and $j$. Multiplying these numbers together, we get:

$$j^7 \cdot j = j^8$$

Since $j^8 = (j^2)^4 = (-1)^4 = 1$, we can simplify the expression as follows:

$$j^7 \cdot j = j^8 = 1$$

Finally, we need to multiply the real and imaginary numbers together. The real and imaginary numbers in the expression are $-3k^5$ and $-8jk^8$. Multiplying these numbers together, we get:

$$(-3k^5)(-8jk^8) = 24jk^{13}$$

Simplifying the Expression

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Now that we have applied the rules of multiplication to simplify the expression, we can simplify the expression further by combining like terms.

The expression $\left(-3 j^7 k^5\right)\left(-8 j k^8\right)$ can be simplified as follows:

$$\left(-3 j^7 k^5\right)\left(-8 j k^8\right) = 24jk^{13}$$

Conclusion

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In this article, we have simplified the expression $\left(-3 j^7 k^5\right)\left(-8 j k^8\right)$ by applying the rules of multiplication for complex numbers. We have shown that the expression can be simplified as follows:

$$\left(-3 j^7 k^5\right)\left(-8 j k^8\right) = 24jk^{13}$$

We hope that this article has provided a clear and concise explanation of how to simplify complex expressions involving complex numbers. If you have any questions or need further clarification, please don't hesitate to ask.

References

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• [1] "Complex Numbers" by Math Open Reference. [Online]. Available: https://www.mathopenref.com/complexnumbers.html
• [2] "Multiplying Complex Numbers" by Purplemath. [Online]. Available: https://www.purplemath.com/modules/complexmul.htm
• [3] "Simplifying Complex Expressions" by Khan Academy. [Online]. Available: https://www.khanacademy.org/math/algebra2/x2f1c4d7/x2f1c4d7/simplifying_complex_expressions

Further Reading

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If you want to learn more about complex numbers and how to simplify complex expressions, we recommend checking out the following resources:

• "Complex Numbers" by Math Open Reference
• "Multiplying Complex Numbers" by Purplemath
• "Simplifying Complex Expressions" by Khan Academy

We hope that this article has provided a clear and concise explanation of how to simplify complex expressions involving complex numbers. If you have any questions or need further clarification, please don't hesitate to ask.

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Introduction

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In our previous article, we discussed how to simplify complex expressions involving complex numbers. However, we understand that some readers may still have questions or need further clarification on certain topics. In this article, we will address some of the most frequently asked questions related to simplifying complex expressions.

Q&A

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Q: What is the difference between a complex number and a real number?

A: A complex number is a number that can be expressed in the form $a + bi$, where $a$ and $b$ are real numbers and $i$ is the imaginary unit, which satisfies the equation $i^2 = -1$. A real number, on the other hand, is a number that can be expressed in the form $a$, where $a$ is a real number.

Q: How do I multiply complex numbers?

A: To multiply complex numbers, you need to follow the rules of multiplication. The rules of multiplication for complex numbers are as follows:

• Multiplying Real Numbers: When multiplying real numbers, you simply multiply the numbers together.
• Multiplying Imaginary Numbers: When multiplying imaginary numbers, you need to use the fact that $i^2 = -1$.
• Multiplying Real and Imaginary Numbers: When multiplying real and imaginary numbers, you need to use the fact that $i^2 = -1$.

Q: How do I simplify complex expressions?

A: To simplify complex expressions, you need to apply the rules of multiplication and combine like terms. The steps to simplify a complex expression are as follows:

1. Multiply the real numbers together.
2. Multiply the imaginary numbers together.
3. Multiply the real and imaginary numbers together.
4. Combine like terms.

Q: What is the difference between a complex conjugate and a complex number?

A: A complex conjugate is a complex number that has the same real part but the opposite imaginary part. For example, if we have a complex number $a + bi$, its complex conjugate is $a - bi$.

Q: How do I find the complex conjugate of a complex number?

A: To find the complex conjugate of a complex number, you need to change the sign of the imaginary part. For example, if we have a complex number $a + bi$, its complex conjugate is $a - bi$.

Q: What is the significance of the complex conjugate in simplifying complex expressions?

A: The complex conjugate is used to simplify complex expressions by eliminating the imaginary part. When we multiply a complex number by its complex conjugate, we get a real number.

Q: How do I use the complex conjugate to simplify complex expressions?

A: To use the complex conjugate to simplify complex expressions, you need to multiply the complex number by its complex conjugate. This will eliminate the imaginary part and leave you with a real number.

Conclusion

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In this article, we have addressed some of the most frequently asked questions related to simplifying complex expressions. We hope that this article has provided a clear and concise explanation of how to simplify complex expressions involving complex numbers. If you have any further questions or need further clarification, please don't hesitate to ask.

References

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• [1] "Complex Numbers" by Math Open Reference. [Online]. Available: https://www.mathopenref.com/complexnumbers.html
• [2] "Multiplying Complex Numbers" by Purplemath. [Online]. Available: https://www.purplemath.com/modules/complexmul.htm
• [3] "Simplifying Complex Expressions" by Khan Academy. [Online]. Available: https://www.khanacademy.org/math/algebra2/x2f1c4d7/x2f1c4d7/simplifying_complex_expressions

Further Reading

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If you want to learn more about complex numbers and how to simplify complex expressions, we recommend checking out the following resources:

• "Complex Numbers" by Math Open Reference
• "Multiplying Complex Numbers" by Purplemath
• "Simplifying Complex Expressions" by Khan Academy

We hope that this article has provided a clear and concise explanation of how to simplify complex expressions involving complex numbers. If you have any questions or need further clarification, please don't hesitate to ask.