Write The Expression − 4 − 3 I 5 + 2 I \frac{-4-3 I}{5+2 I} 5 + 2 I − 4 − 3 I ​ As A Complex Number In Standard Form.

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Introduction

Complex numbers are a fundamental concept in mathematics, and they have numerous applications in various fields, including algebra, geometry, and calculus. A complex number is a number that can be expressed in the form a+bia + bi, where aa and bb are real numbers, and ii is the imaginary unit, which satisfies the equation i2=1i^2 = -1. In this article, we will focus on writing the expression 43i5+2i\frac{-4-3 i}{5+2 i} as a complex number in standard form.

The Concept of Complex Numbers

Complex numbers are an extension of the real numbers, and they can be represented in the complex plane, which is a two-dimensional plane with real and imaginary axes. The complex plane is similar to the Cartesian plane, but it has an additional axis, which is the imaginary axis. The complex plane is used to represent complex numbers in the form a+bia + bi, where aa is the real part, and bb is the imaginary part.

Writing the Expression in Standard Form

To write the expression 43i5+2i\frac{-4-3 i}{5+2 i} in standard form, we need to multiply the numerator and denominator by the conjugate of the denominator. The conjugate of a complex number a+bia + bi is abia - bi. In this case, the conjugate of the denominator 5+2i5 + 2i is 52i5 - 2i.

Multiplying the Numerator and Denominator by the Conjugate

We multiply the numerator and denominator by the conjugate of the denominator:

43i5+2i52i52i\frac{-4-3 i}{5+2 i} \cdot \frac{5-2 i}{5-2 i}

Expanding the Expression

We expand the expression by multiplying the numerator and denominator:

(43i)(52i)(5+2i)(52i)\frac{(-4-3 i)(5-2 i)}{(5+2 i)(5-2 i)}

Simplifying the Expression

We simplify the expression by multiplying the terms in the numerator and denominator:

20+8i15i+6i2254i2\frac{-20 + 8 i - 15 i + 6 i^2}{25 - 4 i^2}

Using the Property of i2i^2

We use the property of i2i^2 to simplify the expression:

20+8i15i+6(1)254(1)\frac{-20 + 8 i - 15 i + 6 (-1)}{25 - 4 (-1)}

Simplifying the Expression Further

We simplify the expression further by combining like terms:

20+8i15i625+4\frac{-20 + 8 i - 15 i - 6}{25 + 4}

Simplifying the Expression Even Further

We simplify the expression even further by combining like terms:

267i29\frac{-26 - 7 i}{29}

Writing the Expression in Standard Form

We write the expression in standard form by separating the real and imaginary parts:

2629729i\frac{-26}{29} - \frac{7}{29} i

Conclusion

In this article, we have written the expression 43i5+2i\frac{-4-3 i}{5+2 i} as a complex number in standard form. We have used the concept of complex numbers, the complex plane, and the property of i2i^2 to simplify the expression. The final expression is 2629729i\frac{-26}{29} - \frac{7}{29} i, which is a complex number in standard form.

References

Further Reading

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Introduction

In our previous article, we wrote the expression 43i5+2i\frac{-4-3 i}{5+2 i} as a complex number in standard form. In this article, we will answer some frequently asked questions related to this topic.

Q&A

Q: What is the concept of complex numbers?

A: Complex numbers are a fundamental concept in mathematics, and they have numerous applications in various fields, including algebra, geometry, and calculus. A complex number is a number that can be expressed in the form a+bia + bi, where aa and bb are real numbers, and ii is the imaginary unit, which satisfies the equation i2=1i^2 = -1.

Q: What is the complex plane?

A: The complex plane is a two-dimensional plane with real and imaginary axes. It is used to represent complex numbers in the form a+bia + bi, where aa is the real part, and bb is the imaginary part.

Q: How do I multiply the numerator and denominator by the conjugate of the denominator?

A: To multiply the numerator and denominator by the conjugate of the denominator, you need to multiply the numerator and denominator by the conjugate of the denominator. The conjugate of a complex number a+bia + bi is abia - bi. In this case, the conjugate of the denominator 5+2i5 + 2i is 52i5 - 2i.

Q: What is the property of i2i^2?

A: The property of i2i^2 is that i2=1i^2 = -1. This property is used to simplify complex expressions.

Q: How do I simplify the expression 43i5+2i\frac{-4-3 i}{5+2 i}?

A: To simplify the expression 43i5+2i\frac{-4-3 i}{5+2 i}, you need to multiply the numerator and denominator by the conjugate of the denominator, and then use the property of i2i^2 to simplify the expression.

Q: What is the final expression in standard form?

A: The final expression in standard form is 2629729i\frac{-26}{29} - \frac{7}{29} i.

Common Mistakes

Mistake 1: Not multiplying the numerator and denominator by the conjugate of the denominator

A: This mistake can lead to an incorrect simplification of the expression.

Mistake 2: Not using the property of i2i^2

A: This mistake can lead to an incorrect simplification of the expression.

Mistake 3: Not separating the real and imaginary parts

A: This mistake can lead to an incorrect expression in standard form.

Conclusion

In this article, we have answered some frequently asked questions related to writing the expression 43i5+2i\frac{-4-3 i}{5+2 i} as a complex number in standard form. We have also discussed some common mistakes that can lead to incorrect simplifications.

References

Further Reading