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MAT 205 F08 Chapter 12 Complex Numbers
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The Imaginary Number j Previously, when we encountered an equation like x2 + 4 = 0, we said that there was no solution since solving for x yielded There is no real number that can be squared to produce -4. Ah… but mathematicians were not satisfied with these so-called unsolvable equations. If the set of real numbers was not up to the task, they would define an expanded system of numbers that could handle the job! Hence, the development of the set of complex numbers.
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Definition of a Complex Number
The imaginary number j is defined as , where j2 = A complex number is a number in the form x+ yj, where x and y are real numbers. (x is the real part and yj is the imaginary part)
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Simplify:
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The rectangular Form of a Complex Number
Each complex number can be written in the rectangular form x + yj. Example Write the complex numbers in rectangular form.
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Addition & Subtraction of Complex Numbers
To add or subtract two complex numbers, add/subtract the real parts and the imaginary parts separately. Example #1
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Addition & Subtraction of Complex Numbers
Example #2 Simplify and write the result in rectangular form.
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Multiplying Complex Numbers
Multiply complex numbers as you would real numbers, using the distributive property or the FOIL method, as appropriate. Simplify your answer, keeping in mind that j2 = -1. Always write your final answer in rectangular form, x + yj. Example #1
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Multiplying Complex Numbers (continued)
Example #2 Simplify and write the result in rectangular form.
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Multiplying Complex Numbers (continued)
Example #3 Simplify and write the result in rectangular form.
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Multiplying with Complex Numbers (continued)
Example #4 Simplify and write the result in rectangular form. Be careful
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Multiplying with Complex Numbers (continued)
Example #5 Simplify each expression.
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Multiplying with Complex Numbers (continued)
Example #6 Simplify and write the result in rectangular form.
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Powers of j Complete the following: “What pattern do you observe?”
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Powers of j Examples Simplify and write the result in rectangular form. Note: If a complex expression is in simplest form, then the only power of j that should appear in the expression is j1.
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Dividing Complex Numbers
For a quotient of complex numbers to be in rectangular form, it cannot have j in the denominator. Scenario 1: The denominator of an expression is in the form yj Multiply numerator and denominator by j Then use the fact that j2 = -1 to simplify the expression and write in rectangular form.
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Dividing Complex Numbers (continued)
Example #1
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Dividing Complex Numbers (continued)
Example #2 Write the quotient in rectangular form.
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Complex Conjugates Pairs of complex numbers in the form x + yj and x – yj are called complex conjugates. These are important because when you multiply the conjugates together (FOIL), the imaginary terms drop out, leaving only x2 + y2. We will use this idea to simplify a quotient of complex numbers in rectangular form.
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Complex Conjugates (continued)
Scenario 2: The denominator of an expression is in the form x+yj Multiply numerator and denominator by the conjugate of the denominator Then use the fact that j2 = -1 to simplify the expression and write in rectangular form.
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Complex Conjugates (continued)
Example #1
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Complex Conjugates (continued)
Example #2 Write the quotient in rectangular form.
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Graphical Representation of Complex Numbers
A complex number can be represented graphically as a point in the rectangular coordinate system. For a complex number in the form x + yj, the real part, x, is the x-value and the imaginary part, y, is the y-value. In the complex plane, the horizontal axis is the real axis and the vertical axis is the imaginary axis.
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Graphical Representation of Complex Numbers
Graph the points in the complex plane: A: j B: -j C: 6 D: 2 – 7j
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MAT 205 F08 Polar Coordinates Earlier, we saw that a point in the plane could be located by polar coordinates, as well as by rectangular coordinates, and we learned to convert between polar and rectangular.
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Polar Form of a Complex Number
MAT 205 F08 Polar Form of a Complex Number Now, we will use a similar technique with complex numbers, converting between rectangular and polar form*. *The polar form is sometimes called the trigonometric form. We’ll start by plotting the complex number x + yj, drawing a vector from the origin to the point. To convert to polar form, we need to know: r real imaginary
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MAT 205 F08 The polar form is found by substituting the values of x and y into the rectangular form. or A commonly used shortcut notation for the polar form is
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MAT 205 F08 For example,
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MAT 205 F08 Example Represent the complex numbers graphically and give the polar form of each. 1) j 2) 4
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MAT 205 F08 Example Represent the complex numbers graphically and give the polar form of each. 3) 4)
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The current in a certain microprocessor circuit is given by
MAT 205 F08 Example The current in a certain microprocessor circuit is given by Write this in rectangular form.
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The Exponential Form of a Complex Number
MAT 205 F08 The Exponential Form of a Complex Number The exponential form of a complex number is written as This form is used commonly in electronics and physics applications, and is convenient for multiplying complex numbers (you simply use the laws of exponents). Remember, from the chapter on exponential and logarithmic equations, that e is an irrational number that is approximately equal to (It is called the natural base.)
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The Exponential Form of a Complex Number
MAT 205 F08 The Exponential Form of a Complex Number in radians known as Euler’s Formula
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Write the complex number in exponential form.
MAT 205 F08 Example Write the complex number in exponential form.
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Write the complex number in exponential form.
MAT 205 F08 Example Write the complex number in exponential form.
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Write the complex number in exponential form.
MAT 205 F08 Example Write the complex number in exponential form.
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Express the complex number in rectangular and polar forms.
MAT 205 F08 Example Express the complex number in rectangular and polar forms.
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We have have now used three forms of a complex number:
MAT 205 F08 We have have now used three forms of a complex number: Rectangular: Polar: Exponential: So we have,
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MAT 205 F08 End of Section
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